\begin{verbatim} % Running with arguments: 65537 -tex \end{verbatim} \[p_{0,0} = -1,000000000000\] \[p_{1,0} = \tfrac{p_{0,0} + \sqrt{p_{0,0}^2 - 4(16384p_{0,0})}}{2} = \frac{-1+\sqrt{65537}}{2}\] \[p_{1,1} = \tfrac{p_{0,0} - \sqrt{p_{0,0}^2 - 4(16384p_{0,0})}}{2} = \frac{-1-\sqrt{65537}}{2}\] \[p_{2,0} = \tfrac{p_{1,0} - \sqrt{p_{1,0}^2 - 4(4096p_{0,0})}}{2}\] \[p_{2,2} = \tfrac{p_{1,0} + \sqrt{p_{1,0}^2 - 4(4096p_{0,0})}}{2}\] \[p_{2,1} = \tfrac{p_{1,1} - \sqrt{p_{1,1}^2 - 4(4096p_{0,0})}}{2}\] \[p_{2,3} = \tfrac{p_{1,1} + \sqrt{p_{1,1}^2 - 4(4096p_{0,0})}}{2}\] \[p_{3,0} = \tfrac{p_{2,0} - \sqrt{p_{2,0}^2 - 4(992p_{2,0}+1024p_{2,2}+1040p_{1,1})}}{2}\] \[p_{3,4} = \tfrac{p_{2,0} + \sqrt{p_{2,0}^2 - 4(992p_{2,0}+1024p_{2,2}+1040p_{1,1})}}{2}\] \[p_{3,2} = \tfrac{p_{2,2} + \sqrt{p_{2,2}^2 - 4(1024p_{2,0}+992p_{2,2}+1040p_{1,1})}}{2}\] \[p_{3,6} = \tfrac{p_{2,2} - \sqrt{p_{2,2}^2 - 4(1024p_{2,0}+992p_{2,2}+1040p_{1,1})}}{2}\] \[p_{3,1} = \tfrac{p_{2,1} + \sqrt{p_{2,1}^2 - 4(1040p_{1,0}+992p_{2,1}+1024p_{2,3})}}{2}\] \[p_{3,5} = \tfrac{p_{2,1} - \sqrt{p_{2,1}^2 - 4(1040p_{1,0}+992p_{2,1}+1024p_{2,3})}}{2}\] \[p_{3,3} = \tfrac{p_{2,3} - \sqrt{p_{2,3}^2 - 4(1040p_{1,0}+1024p_{2,1}+992p_{2,3})}}{2}\] \[p_{3,7} = \tfrac{p_{2,3} + \sqrt{p_{2,3}^2 - 4(1040p_{1,0}+1024p_{2,1}+992p_{2,3})}}{2}\] {\footnotesize \[p_{4,0} = \frac{1}{2}p_{3,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,0}^2 - 4(284p_{3,0}+256p_{3,4}+272p_{3,2} \\ &+256p_{3,6}+237p_{3,1}+269p_{3,5}+237p_{2,3}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,8} = \frac{1}{2}p_{3,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,0}^2 - 4(284p_{3,0}+256p_{3,4}+272p_{3,2} \\ &+256p_{3,6}+237p_{3,1}+269p_{3,5}+237p_{2,3}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,4} = \frac{1}{2}p_{3,4} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,4}^2 - 4(256p_{3,0}+284p_{3,4}+256p_{3,2} \\ &+272p_{3,6}+269p_{3,1}+237p_{3,5}+237p_{2,3}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,12} = \frac{1}{2}p_{3,4} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,4}^2 - 4(256p_{3,0}+284p_{3,4}+256p_{3,2} \\ &+272p_{3,6}+269p_{3,1}+237p_{3,5}+237p_{2,3}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,2} = \frac{1}{2}p_{3,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,2}^2 - 4(256p_{3,0}+272p_{3,4}+284p_{3,2} \\ &+256p_{3,6}+237p_{2,1}+237p_{3,3}+269p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,10} = \frac{1}{2}p_{3,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,2}^2 - 4(256p_{3,0}+272p_{3,4}+284p_{3,2} \\ &+256p_{3,6}+237p_{2,1}+237p_{3,3}+269p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,6} = \frac{1}{2}p_{3,6} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,6}^2 - 4(272p_{3,0}+256p_{3,4}+256p_{3,2} \\ &+284p_{3,6}+237p_{2,1}+269p_{3,3}+237p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,14} = \frac{1}{2}p_{3,6} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,6}^2 - 4(272p_{3,0}+256p_{3,4}+256p_{3,2} \\ &+284p_{3,6}+237p_{2,1}+269p_{3,3}+237p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,1} = \frac{1}{2}p_{3,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,1}^2 - 4(237p_{2,0}+237p_{3,2}+269p_{3,6} \\ &+284p_{3,1}+256p_{3,5}+272p_{3,3}+256p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,9} = \frac{1}{2}p_{3,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,1}^2 - 4(237p_{2,0}+237p_{3,2}+269p_{3,6} \\ &+284p_{3,1}+256p_{3,5}+272p_{3,3}+256p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,5} = \frac{1}{2}p_{3,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,5}^2 - 4(237p_{2,0}+269p_{3,2}+237p_{3,6} \\ &+256p_{3,1}+284p_{3,5}+256p_{3,3}+272p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,13} = \frac{1}{2}p_{3,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,5}^2 - 4(237p_{2,0}+269p_{3,2}+237p_{3,6} \\ &+256p_{3,1}+284p_{3,5}+256p_{3,3}+272p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,3} = \frac{1}{2}p_{3,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,3}^2 - 4(269p_{3,0}+237p_{3,4}+237p_{2,2} \\ &+256p_{3,1}+272p_{3,5}+284p_{3,3}+256p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,11} = \frac{1}{2}p_{3,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,3}^2 - 4(269p_{3,0}+237p_{3,4}+237p_{2,2} \\ &+256p_{3,1}+272p_{3,5}+284p_{3,3}+256p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,7} = \frac{1}{2}p_{3,7} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,7}^2 - 4(237p_{3,0}+269p_{3,4}+237p_{2,2} \\ &+272p_{3,1}+256p_{3,5}+256p_{3,3}+284p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{4,15} = \frac{1}{2}p_{3,7} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{3,7}^2 - 4(237p_{3,0}+269p_{3,4}+237p_{2,2} \\ &+272p_{3,1}+256p_{3,5}+256p_{3,3}+284p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,0} = \frac{1}{2}p_{4,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,0}^2 - 4(80p_{4,0}+68p_{4,8}+57p_{4,4}+65p_{4,12} \\ &+60p_{4,2}+64p_{4,10}+61p_{3,6}+62p_{4,1}+64p_{4,9}+60p_{4,5} \\ &+70p_{4,13}+64p_{4,3}+58p_{4,11}+60p_{4,7}+70p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,16} = \frac{1}{2}p_{4,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,0}^2 - 4(80p_{4,0}+68p_{4,8}+57p_{4,4}+65p_{4,12} \\ &+60p_{4,2}+64p_{4,10}+61p_{3,6}+62p_{4,1}+64p_{4,9}+60p_{4,5} \\ &+70p_{4,13}+64p_{4,3}+58p_{4,11}+60p_{4,7}+70p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,8} = \frac{1}{2}p_{4,8} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,8}^2 - 4(68p_{4,0}+80p_{4,8}+65p_{4,4}+57p_{4,12} \\ &+64p_{4,2}+60p_{4,10}+61p_{3,6}+64p_{4,1}+62p_{4,9}+70p_{4,5} \\ &+60p_{4,13}+58p_{4,3}+64p_{4,11}+70p_{4,7}+60p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,24} = \frac{1}{2}p_{4,8} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,8}^2 - 4(68p_{4,0}+80p_{4,8}+65p_{4,4}+57p_{4,12} \\ &+64p_{4,2}+60p_{4,10}+61p_{3,6}+64p_{4,1}+62p_{4,9}+70p_{4,5} \\ &+60p_{4,13}+58p_{4,3}+64p_{4,11}+70p_{4,7}+60p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,4} = \frac{1}{2}p_{4,4} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,4}^2 - 4(65p_{4,0}+57p_{4,8}+80p_{4,4}+68p_{4,12} \\ &+61p_{3,2}+60p_{4,6}+64p_{4,14}+70p_{4,1}+60p_{4,9}+62p_{4,5} \\ &+64p_{4,13}+70p_{4,3}+60p_{4,11}+64p_{4,7}+58p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,20} = \frac{1}{2}p_{4,4} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,4}^2 - 4(65p_{4,0}+57p_{4,8}+80p_{4,4}+68p_{4,12} \\ &+61p_{3,2}+60p_{4,6}+64p_{4,14}+70p_{4,1}+60p_{4,9}+62p_{4,5} \\ &+64p_{4,13}+70p_{4,3}+60p_{4,11}+64p_{4,7}+58p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,12} = \frac{1}{2}p_{4,12} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,12}^2 - 4(57p_{4,0}+65p_{4,8}+68p_{4,4}+80p_{4,12} \\ &+61p_{3,2}+64p_{4,6}+60p_{4,14}+60p_{4,1}+70p_{4,9}+64p_{4,5} \\ &+62p_{4,13}+60p_{4,3}+70p_{4,11}+58p_{4,7}+64p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,28} = \frac{1}{2}p_{4,12} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,12}^2 - 4(57p_{4,0}+65p_{4,8}+68p_{4,4}+80p_{4,12} \\ &+61p_{3,2}+64p_{4,6}+60p_{4,14}+60p_{4,1}+70p_{4,9}+64p_{4,5} \\ &+62p_{4,13}+60p_{4,3}+70p_{4,11}+58p_{4,7}+64p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,2} = \frac{1}{2}p_{4,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,2}^2 - 4(61p_{3,0}+60p_{4,4}+64p_{4,12}+80p_{4,2} \\ &+68p_{4,10}+57p_{4,6}+65p_{4,14}+70p_{4,1}+60p_{4,9} \\ &+64p_{4,5}+58p_{4,13}+62p_{4,3}+64p_{4,11}+60p_{4,7} \\ &+70p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,18} = \frac{1}{2}p_{4,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,2}^2 - 4(61p_{3,0}+60p_{4,4}+64p_{4,12}+80p_{4,2} \\ &+68p_{4,10}+57p_{4,6}+65p_{4,14}+70p_{4,1}+60p_{4,9} \\ &+64p_{4,5}+58p_{4,13}+62p_{4,3}+64p_{4,11}+60p_{4,7} \\ &+70p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,10} = \frac{1}{2}p_{4,10} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,10}^2 - 4(61p_{3,0}+64p_{4,4}+60p_{4,12}+68p_{4,2} \\ &+80p_{4,10}+65p_{4,6}+57p_{4,14}+60p_{4,1}+70p_{4,9}+58p_{4,5} \\ &+64p_{4,13}+64p_{4,3}+62p_{4,11}+70p_{4,7}+60p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,26} = \frac{1}{2}p_{4,10} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,10}^2 - 4(61p_{3,0}+64p_{4,4}+60p_{4,12}+68p_{4,2} \\ &+80p_{4,10}+65p_{4,6}+57p_{4,14}+60p_{4,1}+70p_{4,9}+58p_{4,5} \\ &+64p_{4,13}+64p_{4,3}+62p_{4,11}+70p_{4,7}+60p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,6} = \frac{1}{2}p_{4,6} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,6}^2 - 4(64p_{4,0}+60p_{4,8}+61p_{3,4}+65p_{4,2} \\ &+57p_{4,10}+80p_{4,6}+68p_{4,14}+58p_{4,1}+64p_{4,9} \\ &+70p_{4,5}+60p_{4,13}+70p_{4,3}+60p_{4,11}+62p_{4,7} \\ &+64p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,22} = \frac{1}{2}p_{4,6} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,6}^2 - 4(64p_{4,0}+60p_{4,8}+61p_{3,4}+65p_{4,2} \\ &+57p_{4,10}+80p_{4,6}+68p_{4,14}+58p_{4,1}+64p_{4,9} \\ &+70p_{4,5}+60p_{4,13}+70p_{4,3}+60p_{4,11}+62p_{4,7} \\ &+64p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,14} = \frac{1}{2}p_{4,14} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,14}^2 - 4(60p_{4,0}+64p_{4,8}+61p_{3,4}+57p_{4,2} \\ &+65p_{4,10}+68p_{4,6}+80p_{4,14}+64p_{4,1}+58p_{4,9} \\ &+60p_{4,5}+70p_{4,13}+60p_{4,3}+70p_{4,11}+64p_{4,7} \\ &+62p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,30} = \frac{1}{2}p_{4,14} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,14}^2 - 4(60p_{4,0}+64p_{4,8}+61p_{3,4}+57p_{4,2} \\ &+65p_{4,10}+68p_{4,6}+80p_{4,14}+64p_{4,1}+58p_{4,9} \\ &+60p_{4,5}+70p_{4,13}+60p_{4,3}+70p_{4,11}+64p_{4,7} \\ &+62p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,1} = \frac{1}{2}p_{4,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,1}^2 - 4(70p_{4,0}+60p_{4,8}+64p_{4,4}+58p_{4,12} \\ &+62p_{4,2}+64p_{4,10}+60p_{4,6}+70p_{4,14}+80p_{4,1} \\ &+68p_{4,9}+57p_{4,5}+65p_{4,13}+60p_{4,3}+64p_{4,11} \\ &+61p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,17} = \frac{1}{2}p_{4,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,1}^2 - 4(70p_{4,0}+60p_{4,8}+64p_{4,4}+58p_{4,12} \\ &+62p_{4,2}+64p_{4,10}+60p_{4,6}+70p_{4,14}+80p_{4,1} \\ &+68p_{4,9}+57p_{4,5}+65p_{4,13}+60p_{4,3}+64p_{4,11} \\ &+61p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,9} = \frac{1}{2}p_{4,9} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,9}^2 - 4(60p_{4,0}+70p_{4,8}+58p_{4,4}+64p_{4,12} \\ &+64p_{4,2}+62p_{4,10}+70p_{4,6}+60p_{4,14}+68p_{4,1} \\ &+80p_{4,9}+65p_{4,5}+57p_{4,13}+64p_{4,3}+60p_{4,11} \\ &+61p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,25} = \frac{1}{2}p_{4,9} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,9}^2 - 4(60p_{4,0}+70p_{4,8}+58p_{4,4}+64p_{4,12} \\ &+64p_{4,2}+62p_{4,10}+70p_{4,6}+60p_{4,14}+68p_{4,1} \\ &+80p_{4,9}+65p_{4,5}+57p_{4,13}+64p_{4,3}+60p_{4,11} \\ &+61p_{3,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,5} = \frac{1}{2}p_{4,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,5}^2 - 4(58p_{4,0}+64p_{4,8}+70p_{4,4}+60p_{4,12} \\ &+70p_{4,2}+60p_{4,10}+62p_{4,6}+64p_{4,14}+65p_{4,1} \\ &+57p_{4,9}+80p_{4,5}+68p_{4,13}+61p_{3,3}+60p_{4,7} \\ &+64p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,21} = \frac{1}{2}p_{4,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,5}^2 - 4(58p_{4,0}+64p_{4,8}+70p_{4,4}+60p_{4,12} \\ &+70p_{4,2}+60p_{4,10}+62p_{4,6}+64p_{4,14}+65p_{4,1} \\ &+57p_{4,9}+80p_{4,5}+68p_{4,13}+61p_{3,3}+60p_{4,7} \\ &+64p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,13} = \frac{1}{2}p_{4,13} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,13}^2 - 4(64p_{4,0}+58p_{4,8}+60p_{4,4}+70p_{4,12} \\ &+60p_{4,2}+70p_{4,10}+64p_{4,6}+62p_{4,14}+57p_{4,1} \\ &+65p_{4,9}+68p_{4,5}+80p_{4,13}+61p_{3,3}+64p_{4,7} \\ &+60p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,29} = \frac{1}{2}p_{4,13} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,13}^2 - 4(64p_{4,0}+58p_{4,8}+60p_{4,4}+70p_{4,12} \\ &+60p_{4,2}+70p_{4,10}+64p_{4,6}+62p_{4,14}+57p_{4,1} \\ &+65p_{4,9}+68p_{4,5}+80p_{4,13}+61p_{3,3}+64p_{4,7} \\ &+60p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,3} = \frac{1}{2}p_{4,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,3}^2 - 4(70p_{4,0}+60p_{4,8}+62p_{4,4}+64p_{4,12} \\ &+70p_{4,2}+60p_{4,10}+64p_{4,6}+58p_{4,14}+61p_{3,1} \\ &+60p_{4,5}+64p_{4,13}+80p_{4,3}+68p_{4,11}+57p_{4,7} \\ &+65p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,19} = \frac{1}{2}p_{4,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,3}^2 - 4(70p_{4,0}+60p_{4,8}+62p_{4,4}+64p_{4,12} \\ &+70p_{4,2}+60p_{4,10}+64p_{4,6}+58p_{4,14}+61p_{3,1} \\ &+60p_{4,5}+64p_{4,13}+80p_{4,3}+68p_{4,11}+57p_{4,7} \\ &+65p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,11} = \frac{1}{2}p_{4,11} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,11}^2 - 4(60p_{4,0}+70p_{4,8}+64p_{4,4}+62p_{4,12} \\ &+60p_{4,2}+70p_{4,10}+58p_{4,6}+64p_{4,14}+61p_{3,1}+64p_{4,5} \\ &+60p_{4,13}+68p_{4,3}+80p_{4,11}+65p_{4,7}+57p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,27} = \frac{1}{2}p_{4,11} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,11}^2 - 4(60p_{4,0}+70p_{4,8}+64p_{4,4}+62p_{4,12} \\ &+60p_{4,2}+70p_{4,10}+58p_{4,6}+64p_{4,14}+61p_{3,1}+64p_{4,5} \\ &+60p_{4,13}+68p_{4,3}+80p_{4,11}+65p_{4,7}+57p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,7} = \frac{1}{2}p_{4,7} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,7}^2 - 4(64p_{4,0}+62p_{4,8}+70p_{4,4}+60p_{4,12} \\ &+58p_{4,2}+64p_{4,10}+70p_{4,6}+60p_{4,14}+64p_{4,1} \\ &+60p_{4,9}+61p_{3,5}+65p_{4,3}+57p_{4,11}+80p_{4,7} \\ &+68p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,23} = \frac{1}{2}p_{4,7} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,7}^2 - 4(64p_{4,0}+62p_{4,8}+70p_{4,4}+60p_{4,12} \\ &+58p_{4,2}+64p_{4,10}+70p_{4,6}+60p_{4,14}+64p_{4,1} \\ &+60p_{4,9}+61p_{3,5}+65p_{4,3}+57p_{4,11}+80p_{4,7} \\ &+68p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,15} = \frac{1}{2}p_{4,15} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,15}^2 - 4(62p_{4,0}+64p_{4,8}+60p_{4,4}+70p_{4,12} \\ &+64p_{4,2}+58p_{4,10}+60p_{4,6}+70p_{4,14}+60p_{4,1} \\ &+64p_{4,9}+61p_{3,5}+57p_{4,3}+65p_{4,11}+68p_{4,7} \\ &+80p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{5,31} = \frac{1}{2}p_{4,15} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{4,15}^2 - 4(62p_{4,0}+64p_{4,8}+60p_{4,4}+70p_{4,12} \\ &+64p_{4,2}+58p_{4,10}+60p_{4,6}+70p_{4,14}+60p_{4,1} \\ &+64p_{4,9}+61p_{3,5}+57p_{4,3}+65p_{4,11}+68p_{4,7} \\ &+80p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,0} = \frac{1}{2}p_{5,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,0}^2 - 4(4p_{5,0}+20p_{5,16}+19p_{5,8}+29p_{5,24}+20p_{5,4} \\ &+16p_{5,20}+13p_{4,12}+20p_{5,2}+25p_{5,18}+12p_{5,10}+7p_{5,26} \\ &+16p_{4,6}+11p_{5,14}+13p_{5,30}+12p_{5,1}+15p_{5,17}+22p_{5,9} \\ &+16p_{5,25}+18p_{5,5}+12p_{5,21}+13p_{5,13}+17p_{5,29}+13p_{5,3} \\ &+12p_{5,19}+22p_{5,11}+17p_{5,27}+19p_{5,7}+17p_{5,23}+22p_{5,15} \\ &+11p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,32} = \frac{1}{2}p_{5,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,0}^2 - 4(4p_{5,0}+20p_{5,16}+19p_{5,8}+29p_{5,24}+20p_{5,4} \\ &+16p_{5,20}+13p_{4,12}+20p_{5,2}+25p_{5,18}+12p_{5,10}+7p_{5,26} \\ &+16p_{4,6}+11p_{5,14}+13p_{5,30}+12p_{5,1}+15p_{5,17}+22p_{5,9} \\ &+16p_{5,25}+18p_{5,5}+12p_{5,21}+13p_{5,13}+17p_{5,29}+13p_{5,3} \\ &+12p_{5,19}+22p_{5,11}+17p_{5,27}+19p_{5,7}+17p_{5,23}+22p_{5,15} \\ &+11p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,16} = \frac{1}{2}p_{5,16} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,16}^2 - 4(20p_{5,0}+4p_{5,16}+29p_{5,8}+19p_{5,24}+16p_{5,4} \\ &+20p_{5,20}+13p_{4,12}+25p_{5,2}+20p_{5,18}+7p_{5,10}+12p_{5,26} \\ &+16p_{4,6}+13p_{5,14}+11p_{5,30}+15p_{5,1}+12p_{5,17}+16p_{5,9} \\ &+22p_{5,25}+12p_{5,5}+18p_{5,21}+17p_{5,13}+13p_{5,29}+12p_{5,3} \\ &+13p_{5,19}+17p_{5,11}+22p_{5,27}+17p_{5,7}+19p_{5,23}+11p_{5,15} \\ &+22p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,48} = \frac{1}{2}p_{5,16} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,16}^2 - 4(20p_{5,0}+4p_{5,16}+29p_{5,8}+19p_{5,24}+16p_{5,4} \\ &+20p_{5,20}+13p_{4,12}+25p_{5,2}+20p_{5,18}+7p_{5,10}+12p_{5,26} \\ &+16p_{4,6}+13p_{5,14}+11p_{5,30}+15p_{5,1}+12p_{5,17}+16p_{5,9} \\ &+22p_{5,25}+12p_{5,5}+18p_{5,21}+17p_{5,13}+13p_{5,29}+12p_{5,3} \\ &+13p_{5,19}+17p_{5,11}+22p_{5,27}+17p_{5,7}+19p_{5,23}+11p_{5,15} \\ &+22p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,8} = \frac{1}{2}p_{5,8} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,8}^2 - 4(29p_{5,0}+19p_{5,16}+4p_{5,8}+20p_{5,24}+13p_{4,4} \\ &+20p_{5,12}+16p_{5,28}+7p_{5,2}+12p_{5,18}+20p_{5,10}+25p_{5,26} \\ &+13p_{5,6}+11p_{5,22}+16p_{4,14}+16p_{5,1}+22p_{5,17}+12p_{5,9} \\ &+15p_{5,25}+17p_{5,5}+13p_{5,21}+18p_{5,13}+12p_{5,29}+17p_{5,3} \\ &+22p_{5,19}+13p_{5,11}+12p_{5,27}+11p_{5,7}+22p_{5,23}+19p_{5,15} \\ &+17p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,40} = \frac{1}{2}p_{5,8} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,8}^2 - 4(29p_{5,0}+19p_{5,16}+4p_{5,8}+20p_{5,24}+13p_{4,4} \\ &+20p_{5,12}+16p_{5,28}+7p_{5,2}+12p_{5,18}+20p_{5,10}+25p_{5,26} \\ &+13p_{5,6}+11p_{5,22}+16p_{4,14}+16p_{5,1}+22p_{5,17}+12p_{5,9} \\ &+15p_{5,25}+17p_{5,5}+13p_{5,21}+18p_{5,13}+12p_{5,29}+17p_{5,3} \\ &+22p_{5,19}+13p_{5,11}+12p_{5,27}+11p_{5,7}+22p_{5,23}+19p_{5,15} \\ &+17p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,24} = \frac{1}{2}p_{5,24} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,24}^2 - 4(19p_{5,0}+29p_{5,16}+20p_{5,8}+4p_{5,24}+13p_{4,4} \\ &+16p_{5,12}+20p_{5,28}+12p_{5,2}+7p_{5,18}+25p_{5,10}+20p_{5,26} \\ &+11p_{5,6}+13p_{5,22}+16p_{4,14}+22p_{5,1}+16p_{5,17}+15p_{5,9} \\ &+12p_{5,25}+13p_{5,5}+17p_{5,21}+12p_{5,13}+18p_{5,29}+22p_{5,3} \\ &+17p_{5,19}+12p_{5,11}+13p_{5,27}+22p_{5,7}+11p_{5,23}+17p_{5,15} \\ &+19p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,56} = \frac{1}{2}p_{5,24} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,24}^2 - 4(19p_{5,0}+29p_{5,16}+20p_{5,8}+4p_{5,24}+13p_{4,4} \\ &+16p_{5,12}+20p_{5,28}+12p_{5,2}+7p_{5,18}+25p_{5,10}+20p_{5,26} \\ &+11p_{5,6}+13p_{5,22}+16p_{4,14}+22p_{5,1}+16p_{5,17}+15p_{5,9} \\ &+12p_{5,25}+13p_{5,5}+17p_{5,21}+12p_{5,13}+18p_{5,29}+22p_{5,3} \\ &+17p_{5,19}+12p_{5,11}+13p_{5,27}+22p_{5,7}+11p_{5,23}+17p_{5,15} \\ &+19p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,4} = \frac{1}{2}p_{5,4} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,4}^2 - 4(13p_{4,0}+20p_{5,8}+16p_{5,24}+4p_{5,4}+20p_{5,20} \\ &+19p_{5,12}+29p_{5,28}+13p_{5,2}+11p_{5,18}+16p_{4,10}+20p_{5,6} \\ &+25p_{5,22}+12p_{5,14}+7p_{5,30}+17p_{5,1}+13p_{5,17}+18p_{5,9} \\ &+12p_{5,25}+12p_{5,5}+15p_{5,21}+22p_{5,13}+16p_{5,29}+11p_{5,3} \\ &+22p_{5,19}+19p_{5,11}+17p_{5,27}+13p_{5,7}+12p_{5,23}+22p_{5,15} \\ &+17p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,36} = \frac{1}{2}p_{5,4} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,4}^2 - 4(13p_{4,0}+20p_{5,8}+16p_{5,24}+4p_{5,4}+20p_{5,20} \\ &+19p_{5,12}+29p_{5,28}+13p_{5,2}+11p_{5,18}+16p_{4,10}+20p_{5,6} \\ &+25p_{5,22}+12p_{5,14}+7p_{5,30}+17p_{5,1}+13p_{5,17}+18p_{5,9} \\ &+12p_{5,25}+12p_{5,5}+15p_{5,21}+22p_{5,13}+16p_{5,29}+11p_{5,3} \\ &+22p_{5,19}+19p_{5,11}+17p_{5,27}+13p_{5,7}+12p_{5,23}+22p_{5,15} \\ &+17p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,20} = \frac{1}{2}p_{5,20} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,20}^2 - 4(13p_{4,0}+16p_{5,8}+20p_{5,24}+20p_{5,4}+4p_{5,20} \\ &+29p_{5,12}+19p_{5,28}+11p_{5,2}+13p_{5,18}+16p_{4,10}+25p_{5,6} \\ &+20p_{5,22}+7p_{5,14}+12p_{5,30}+13p_{5,1}+17p_{5,17}+12p_{5,9} \\ &+18p_{5,25}+15p_{5,5}+12p_{5,21}+16p_{5,13}+22p_{5,29}+22p_{5,3} \\ &+11p_{5,19}+17p_{5,11}+19p_{5,27}+12p_{5,7}+13p_{5,23}+17p_{5,15} \\ &+22p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,52} = \frac{1}{2}p_{5,20} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,20}^2 - 4(13p_{4,0}+16p_{5,8}+20p_{5,24}+20p_{5,4}+4p_{5,20} \\ &+29p_{5,12}+19p_{5,28}+11p_{5,2}+13p_{5,18}+16p_{4,10}+25p_{5,6} \\ &+20p_{5,22}+7p_{5,14}+12p_{5,30}+13p_{5,1}+17p_{5,17}+12p_{5,9} \\ &+18p_{5,25}+15p_{5,5}+12p_{5,21}+16p_{5,13}+22p_{5,29}+22p_{5,3} \\ &+11p_{5,19}+17p_{5,11}+19p_{5,27}+12p_{5,7}+13p_{5,23}+17p_{5,15} \\ &+22p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,12} = \frac{1}{2}p_{5,12} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,12}^2 - 4(16p_{5,0}+20p_{5,16}+13p_{4,8}+29p_{5,4}+19p_{5,20} \\ &+4p_{5,12}+20p_{5,28}+16p_{4,2}+13p_{5,10}+11p_{5,26}+7p_{5,6} \\ &+12p_{5,22}+20p_{5,14}+25p_{5,30}+12p_{5,1}+18p_{5,17}+17p_{5,9} \\ &+13p_{5,25}+16p_{5,5}+22p_{5,21}+12p_{5,13}+15p_{5,29}+17p_{5,3} \\ &+19p_{5,19}+11p_{5,11}+22p_{5,27}+17p_{5,7}+22p_{5,23}+13p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,44} = \frac{1}{2}p_{5,12} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,12}^2 - 4(16p_{5,0}+20p_{5,16}+13p_{4,8}+29p_{5,4}+19p_{5,20} \\ &+4p_{5,12}+20p_{5,28}+16p_{4,2}+13p_{5,10}+11p_{5,26}+7p_{5,6} \\ &+12p_{5,22}+20p_{5,14}+25p_{5,30}+12p_{5,1}+18p_{5,17}+17p_{5,9} \\ &+13p_{5,25}+16p_{5,5}+22p_{5,21}+12p_{5,13}+15p_{5,29}+17p_{5,3} \\ &+19p_{5,19}+11p_{5,11}+22p_{5,27}+17p_{5,7}+22p_{5,23}+13p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,28} = \frac{1}{2}p_{5,28} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,28}^2 - 4(20p_{5,0}+16p_{5,16}+13p_{4,8}+19p_{5,4}+29p_{5,20} \\ &+20p_{5,12}+4p_{5,28}+16p_{4,2}+11p_{5,10}+13p_{5,26}+12p_{5,6} \\ &+7p_{5,22}+25p_{5,14}+20p_{5,30}+18p_{5,1}+12p_{5,17}+13p_{5,9} \\ &+17p_{5,25}+22p_{5,5}+16p_{5,21}+15p_{5,13}+12p_{5,29}+19p_{5,3} \\ &+17p_{5,19}+22p_{5,11}+11p_{5,27}+22p_{5,7}+17p_{5,23}+12p_{5,15} \\ &+13p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,60} = \frac{1}{2}p_{5,28} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,28}^2 - 4(20p_{5,0}+16p_{5,16}+13p_{4,8}+19p_{5,4}+29p_{5,20} \\ &+20p_{5,12}+4p_{5,28}+16p_{4,2}+11p_{5,10}+13p_{5,26}+12p_{5,6} \\ &+7p_{5,22}+25p_{5,14}+20p_{5,30}+18p_{5,1}+12p_{5,17}+13p_{5,9} \\ &+17p_{5,25}+22p_{5,5}+16p_{5,21}+15p_{5,13}+12p_{5,29}+19p_{5,3} \\ &+17p_{5,19}+22p_{5,11}+11p_{5,27}+22p_{5,7}+17p_{5,23}+12p_{5,15} \\ &+13p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,2} = \frac{1}{2}p_{5,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,2}^2 - 4(13p_{5,0}+11p_{5,16}+16p_{4,8}+20p_{5,4}+25p_{5,20} \\ &+12p_{5,12}+7p_{5,28}+4p_{5,2}+20p_{5,18}+19p_{5,10}+29p_{5,26} \\ &+20p_{5,6}+16p_{5,22}+13p_{4,14}+11p_{5,1}+22p_{5,17}+19p_{5,9} \\ &+17p_{5,25}+13p_{5,5}+12p_{5,21}+22p_{5,13}+17p_{5,29}+12p_{5,3} \\ &+15p_{5,19}+22p_{5,11}+16p_{5,27}+18p_{5,7}+12p_{5,23}+13p_{5,15} \\ &+17p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,34} = \frac{1}{2}p_{5,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,2}^2 - 4(13p_{5,0}+11p_{5,16}+16p_{4,8}+20p_{5,4}+25p_{5,20} \\ &+12p_{5,12}+7p_{5,28}+4p_{5,2}+20p_{5,18}+19p_{5,10}+29p_{5,26} \\ &+20p_{5,6}+16p_{5,22}+13p_{4,14}+11p_{5,1}+22p_{5,17}+19p_{5,9} \\ &+17p_{5,25}+13p_{5,5}+12p_{5,21}+22p_{5,13}+17p_{5,29}+12p_{5,3} \\ &+15p_{5,19}+22p_{5,11}+16p_{5,27}+18p_{5,7}+12p_{5,23}+13p_{5,15} \\ &+17p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,18} = \frac{1}{2}p_{5,18} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,18}^2 - 4(11p_{5,0}+13p_{5,16}+16p_{4,8}+25p_{5,4}+20p_{5,20} \\ &+7p_{5,12}+12p_{5,28}+20p_{5,2}+4p_{5,18}+29p_{5,10}+19p_{5,26} \\ &+16p_{5,6}+20p_{5,22}+13p_{4,14}+22p_{5,1}+11p_{5,17}+17p_{5,9} \\ &+19p_{5,25}+12p_{5,5}+13p_{5,21}+17p_{5,13}+22p_{5,29}+15p_{5,3} \\ &+12p_{5,19}+16p_{5,11}+22p_{5,27}+12p_{5,7}+18p_{5,23}+17p_{5,15} \\ &+13p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,50} = \frac{1}{2}p_{5,18} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,18}^2 - 4(11p_{5,0}+13p_{5,16}+16p_{4,8}+25p_{5,4}+20p_{5,20} \\ &+7p_{5,12}+12p_{5,28}+20p_{5,2}+4p_{5,18}+29p_{5,10}+19p_{5,26} \\ &+16p_{5,6}+20p_{5,22}+13p_{4,14}+22p_{5,1}+11p_{5,17}+17p_{5,9} \\ &+19p_{5,25}+12p_{5,5}+13p_{5,21}+17p_{5,13}+22p_{5,29}+15p_{5,3} \\ &+12p_{5,19}+16p_{5,11}+22p_{5,27}+12p_{5,7}+18p_{5,23}+17p_{5,15} \\ &+13p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,10} = \frac{1}{2}p_{5,10} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,10}^2 - 4(16p_{4,0}+13p_{5,8}+11p_{5,24}+7p_{5,4}+12p_{5,20} \\ &+20p_{5,12}+25p_{5,28}+29p_{5,2}+19p_{5,18}+4p_{5,10}+20p_{5,26} \\ &+13p_{4,6}+20p_{5,14}+16p_{5,30}+17p_{5,1}+19p_{5,17}+11p_{5,9} \\ &+22p_{5,25}+17p_{5,5}+22p_{5,21}+13p_{5,13}+12p_{5,29}+16p_{5,3} \\ &+22p_{5,19}+12p_{5,11}+15p_{5,27}+17p_{5,7}+13p_{5,23}+18p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,42} = \frac{1}{2}p_{5,10} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,10}^2 - 4(16p_{4,0}+13p_{5,8}+11p_{5,24}+7p_{5,4}+12p_{5,20} \\ &+20p_{5,12}+25p_{5,28}+29p_{5,2}+19p_{5,18}+4p_{5,10}+20p_{5,26} \\ &+13p_{4,6}+20p_{5,14}+16p_{5,30}+17p_{5,1}+19p_{5,17}+11p_{5,9} \\ &+22p_{5,25}+17p_{5,5}+22p_{5,21}+13p_{5,13}+12p_{5,29}+16p_{5,3} \\ &+22p_{5,19}+12p_{5,11}+15p_{5,27}+17p_{5,7}+13p_{5,23}+18p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,26} = \frac{1}{2}p_{5,26} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,26}^2 - 4(16p_{4,0}+11p_{5,8}+13p_{5,24}+12p_{5,4}+7p_{5,20} \\ &+25p_{5,12}+20p_{5,28}+19p_{5,2}+29p_{5,18}+20p_{5,10}+4p_{5,26} \\ &+13p_{4,6}+16p_{5,14}+20p_{5,30}+19p_{5,1}+17p_{5,17}+22p_{5,9} \\ &+11p_{5,25}+22p_{5,5}+17p_{5,21}+12p_{5,13}+13p_{5,29}+22p_{5,3} \\ &+16p_{5,19}+15p_{5,11}+12p_{5,27}+13p_{5,7}+17p_{5,23}+12p_{5,15} \\ &+18p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,58} = \frac{1}{2}p_{5,26} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,26}^2 - 4(16p_{4,0}+11p_{5,8}+13p_{5,24}+12p_{5,4}+7p_{5,20} \\ &+25p_{5,12}+20p_{5,28}+19p_{5,2}+29p_{5,18}+20p_{5,10}+4p_{5,26} \\ &+13p_{4,6}+16p_{5,14}+20p_{5,30}+19p_{5,1}+17p_{5,17}+22p_{5,9} \\ &+11p_{5,25}+22p_{5,5}+17p_{5,21}+12p_{5,13}+13p_{5,29}+22p_{5,3} \\ &+16p_{5,19}+15p_{5,11}+12p_{5,27}+13p_{5,7}+17p_{5,23}+12p_{5,15} \\ &+18p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,6} = \frac{1}{2}p_{5,6} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,6}^2 - 4(7p_{5,0}+12p_{5,16}+20p_{5,8}+25p_{5,24}+13p_{5,4} \\ &+11p_{5,20}+16p_{4,12}+13p_{4,2}+20p_{5,10}+16p_{5,26}+4p_{5,6} \\ &+20p_{5,22}+19p_{5,14}+29p_{5,30}+17p_{5,1}+22p_{5,17}+13p_{5,9} \\ &+12p_{5,25}+11p_{5,5}+22p_{5,21}+19p_{5,13}+17p_{5,29}+17p_{5,3} \\ &+13p_{5,19}+18p_{5,11}+12p_{5,27}+12p_{5,7}+15p_{5,23}+22p_{5,15} \\ &+16p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,38} = \frac{1}{2}p_{5,6} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,6}^2 - 4(7p_{5,0}+12p_{5,16}+20p_{5,8}+25p_{5,24}+13p_{5,4} \\ &+11p_{5,20}+16p_{4,12}+13p_{4,2}+20p_{5,10}+16p_{5,26}+4p_{5,6} \\ &+20p_{5,22}+19p_{5,14}+29p_{5,30}+17p_{5,1}+22p_{5,17}+13p_{5,9} \\ &+12p_{5,25}+11p_{5,5}+22p_{5,21}+19p_{5,13}+17p_{5,29}+17p_{5,3} \\ &+13p_{5,19}+18p_{5,11}+12p_{5,27}+12p_{5,7}+15p_{5,23}+22p_{5,15} \\ &+16p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,22} = \frac{1}{2}p_{5,22} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,22}^2 - 4(12p_{5,0}+7p_{5,16}+25p_{5,8}+20p_{5,24}+11p_{5,4} \\ &+13p_{5,20}+16p_{4,12}+13p_{4,2}+16p_{5,10}+20p_{5,26}+20p_{5,6} \\ &+4p_{5,22}+29p_{5,14}+19p_{5,30}+22p_{5,1}+17p_{5,17}+12p_{5,9} \\ &+13p_{5,25}+22p_{5,5}+11p_{5,21}+17p_{5,13}+19p_{5,29}+13p_{5,3} \\ &+17p_{5,19}+12p_{5,11}+18p_{5,27}+15p_{5,7}+12p_{5,23}+16p_{5,15} \\ &+22p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,54} = \frac{1}{2}p_{5,22} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,22}^2 - 4(12p_{5,0}+7p_{5,16}+25p_{5,8}+20p_{5,24}+11p_{5,4} \\ &+13p_{5,20}+16p_{4,12}+13p_{4,2}+16p_{5,10}+20p_{5,26}+20p_{5,6} \\ &+4p_{5,22}+29p_{5,14}+19p_{5,30}+22p_{5,1}+17p_{5,17}+12p_{5,9} \\ &+13p_{5,25}+22p_{5,5}+11p_{5,21}+17p_{5,13}+19p_{5,29}+13p_{5,3} \\ &+17p_{5,19}+12p_{5,11}+18p_{5,27}+15p_{5,7}+12p_{5,23}+16p_{5,15} \\ &+22p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,14} = \frac{1}{2}p_{5,14} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,14}^2 - 4(25p_{5,0}+20p_{5,16}+7p_{5,8}+12p_{5,24}+16p_{4,4} \\ &+13p_{5,12}+11p_{5,28}+16p_{5,2}+20p_{5,18}+13p_{4,10}+29p_{5,6} \\ &+19p_{5,22}+4p_{5,14}+20p_{5,30}+12p_{5,1}+13p_{5,17}+17p_{5,9} \\ &+22p_{5,25}+17p_{5,5}+19p_{5,21}+11p_{5,13}+22p_{5,29}+12p_{5,3} \\ &+18p_{5,19}+17p_{5,11}+13p_{5,27}+16p_{5,7}+22p_{5,23}+12p_{5,15} \\ &+15p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,46} = \frac{1}{2}p_{5,14} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,14}^2 - 4(25p_{5,0}+20p_{5,16}+7p_{5,8}+12p_{5,24}+16p_{4,4} \\ &+13p_{5,12}+11p_{5,28}+16p_{5,2}+20p_{5,18}+13p_{4,10}+29p_{5,6} \\ &+19p_{5,22}+4p_{5,14}+20p_{5,30}+12p_{5,1}+13p_{5,17}+17p_{5,9} \\ &+22p_{5,25}+17p_{5,5}+19p_{5,21}+11p_{5,13}+22p_{5,29}+12p_{5,3} \\ &+18p_{5,19}+17p_{5,11}+13p_{5,27}+16p_{5,7}+22p_{5,23}+12p_{5,15} \\ &+15p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,30} = \frac{1}{2}p_{5,30} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,30}^2 - 4(20p_{5,0}+25p_{5,16}+12p_{5,8}+7p_{5,24}+16p_{4,4} \\ &+11p_{5,12}+13p_{5,28}+20p_{5,2}+16p_{5,18}+13p_{4,10}+19p_{5,6} \\ &+29p_{5,22}+20p_{5,14}+4p_{5,30}+13p_{5,1}+12p_{5,17}+22p_{5,9} \\ &+17p_{5,25}+19p_{5,5}+17p_{5,21}+22p_{5,13}+11p_{5,29}+18p_{5,3} \\ &+12p_{5,19}+13p_{5,11}+17p_{5,27}+22p_{5,7}+16p_{5,23}+15p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,62} = \frac{1}{2}p_{5,30} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,30}^2 - 4(20p_{5,0}+25p_{5,16}+12p_{5,8}+7p_{5,24}+16p_{4,4} \\ &+11p_{5,12}+13p_{5,28}+20p_{5,2}+16p_{5,18}+13p_{4,10}+19p_{5,6} \\ &+29p_{5,22}+20p_{5,14}+4p_{5,30}+13p_{5,1}+12p_{5,17}+22p_{5,9} \\ &+17p_{5,25}+19p_{5,5}+17p_{5,21}+22p_{5,13}+11p_{5,29}+18p_{5,3} \\ &+12p_{5,19}+13p_{5,11}+17p_{5,27}+22p_{5,7}+16p_{5,23}+15p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,1} = \frac{1}{2}p_{5,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,1}^2 - 4(11p_{5,0}+22p_{5,16}+19p_{5,8}+17p_{5,24}+13p_{5,4} \\ &+12p_{5,20}+22p_{5,12}+17p_{5,28}+12p_{5,2}+15p_{5,18}+22p_{5,10} \\ &+16p_{5,26}+18p_{5,6}+12p_{5,22}+13p_{5,14}+17p_{5,30}+4p_{5,1} \\ &+20p_{5,17}+19p_{5,9}+29p_{5,25}+20p_{5,5}+16p_{5,21}+13p_{4,13} \\ &+20p_{5,3}+25p_{5,19}+12p_{5,11}+7p_{5,27}+16p_{4,7}+11p_{5,15} \\ &+13p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,33} = \frac{1}{2}p_{5,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,1}^2 - 4(11p_{5,0}+22p_{5,16}+19p_{5,8}+17p_{5,24}+13p_{5,4} \\ &+12p_{5,20}+22p_{5,12}+17p_{5,28}+12p_{5,2}+15p_{5,18}+22p_{5,10} \\ &+16p_{5,26}+18p_{5,6}+12p_{5,22}+13p_{5,14}+17p_{5,30}+4p_{5,1} \\ &+20p_{5,17}+19p_{5,9}+29p_{5,25}+20p_{5,5}+16p_{5,21}+13p_{4,13} \\ &+20p_{5,3}+25p_{5,19}+12p_{5,11}+7p_{5,27}+16p_{4,7}+11p_{5,15} \\ &+13p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,17} = \frac{1}{2}p_{5,17} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,17}^2 - 4(22p_{5,0}+11p_{5,16}+17p_{5,8}+19p_{5,24}+12p_{5,4} \\ &+13p_{5,20}+17p_{5,12}+22p_{5,28}+15p_{5,2}+12p_{5,18}+16p_{5,10} \\ &+22p_{5,26}+12p_{5,6}+18p_{5,22}+17p_{5,14}+13p_{5,30}+20p_{5,1} \\ &+4p_{5,17}+29p_{5,9}+19p_{5,25}+16p_{5,5}+20p_{5,21}+13p_{4,13} \\ &+25p_{5,3}+20p_{5,19}+7p_{5,11}+12p_{5,27}+16p_{4,7}+13p_{5,15} \\ &+11p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,49} = \frac{1}{2}p_{5,17} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,17}^2 - 4(22p_{5,0}+11p_{5,16}+17p_{5,8}+19p_{5,24}+12p_{5,4} \\ &+13p_{5,20}+17p_{5,12}+22p_{5,28}+15p_{5,2}+12p_{5,18}+16p_{5,10} \\ &+22p_{5,26}+12p_{5,6}+18p_{5,22}+17p_{5,14}+13p_{5,30}+20p_{5,1} \\ &+4p_{5,17}+29p_{5,9}+19p_{5,25}+16p_{5,5}+20p_{5,21}+13p_{4,13} \\ &+25p_{5,3}+20p_{5,19}+7p_{5,11}+12p_{5,27}+16p_{4,7}+13p_{5,15} \\ &+11p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,9} = \frac{1}{2}p_{5,9} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,9}^2 - 4(17p_{5,0}+19p_{5,16}+11p_{5,8}+22p_{5,24}+17p_{5,4} \\ &+22p_{5,20}+13p_{5,12}+12p_{5,28}+16p_{5,2}+22p_{5,18}+12p_{5,10} \\ &+15p_{5,26}+17p_{5,6}+13p_{5,22}+18p_{5,14}+12p_{5,30}+29p_{5,1} \\ &+19p_{5,17}+4p_{5,9}+20p_{5,25}+13p_{4,5}+20p_{5,13}+16p_{5,29}+7p_{5,3} \\ &+12p_{5,19}+20p_{5,11}+25p_{5,27}+13p_{5,7}+11p_{5,23}+16p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,41} = \frac{1}{2}p_{5,9} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,9}^2 - 4(17p_{5,0}+19p_{5,16}+11p_{5,8}+22p_{5,24}+17p_{5,4} \\ &+22p_{5,20}+13p_{5,12}+12p_{5,28}+16p_{5,2}+22p_{5,18}+12p_{5,10} \\ &+15p_{5,26}+17p_{5,6}+13p_{5,22}+18p_{5,14}+12p_{5,30}+29p_{5,1} \\ &+19p_{5,17}+4p_{5,9}+20p_{5,25}+13p_{4,5}+20p_{5,13}+16p_{5,29}+7p_{5,3} \\ &+12p_{5,19}+20p_{5,11}+25p_{5,27}+13p_{5,7}+11p_{5,23}+16p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,25} = \frac{1}{2}p_{5,25} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,25}^2 - 4(19p_{5,0}+17p_{5,16}+22p_{5,8}+11p_{5,24}+22p_{5,4} \\ &+17p_{5,20}+12p_{5,12}+13p_{5,28}+22p_{5,2}+16p_{5,18}+15p_{5,10} \\ &+12p_{5,26}+13p_{5,6}+17p_{5,22}+12p_{5,14}+18p_{5,30}+19p_{5,1} \\ &+29p_{5,17}+20p_{5,9}+4p_{5,25}+13p_{4,5}+16p_{5,13}+20p_{5,29} \\ &+12p_{5,3}+7p_{5,19}+25p_{5,11}+20p_{5,27}+11p_{5,7}+13p_{5,23} \\ &+16p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,57} = \frac{1}{2}p_{5,25} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,25}^2 - 4(19p_{5,0}+17p_{5,16}+22p_{5,8}+11p_{5,24}+22p_{5,4} \\ &+17p_{5,20}+12p_{5,12}+13p_{5,28}+22p_{5,2}+16p_{5,18}+15p_{5,10} \\ &+12p_{5,26}+13p_{5,6}+17p_{5,22}+12p_{5,14}+18p_{5,30}+19p_{5,1} \\ &+29p_{5,17}+20p_{5,9}+4p_{5,25}+13p_{4,5}+16p_{5,13}+20p_{5,29} \\ &+12p_{5,3}+7p_{5,19}+25p_{5,11}+20p_{5,27}+11p_{5,7}+13p_{5,23} \\ &+16p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,5} = \frac{1}{2}p_{5,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,5}^2 - 4(17p_{5,0}+22p_{5,16}+13p_{5,8}+12p_{5,24}+11p_{5,4} \\ &+22p_{5,20}+19p_{5,12}+17p_{5,28}+17p_{5,2}+13p_{5,18}+18p_{5,10} \\ &+12p_{5,26}+12p_{5,6}+15p_{5,22}+22p_{5,14}+16p_{5,30}+13p_{4,1} \\ &+20p_{5,9}+16p_{5,25}+4p_{5,5}+20p_{5,21}+19p_{5,13}+29p_{5,29} \\ &+13p_{5,3}+11p_{5,19}+16p_{4,11}+20p_{5,7}+25p_{5,23}+12p_{5,15} \\ &+7p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,37} = \frac{1}{2}p_{5,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,5}^2 - 4(17p_{5,0}+22p_{5,16}+13p_{5,8}+12p_{5,24}+11p_{5,4} \\ &+22p_{5,20}+19p_{5,12}+17p_{5,28}+17p_{5,2}+13p_{5,18}+18p_{5,10} \\ &+12p_{5,26}+12p_{5,6}+15p_{5,22}+22p_{5,14}+16p_{5,30}+13p_{4,1} \\ &+20p_{5,9}+16p_{5,25}+4p_{5,5}+20p_{5,21}+19p_{5,13}+29p_{5,29} \\ &+13p_{5,3}+11p_{5,19}+16p_{4,11}+20p_{5,7}+25p_{5,23}+12p_{5,15} \\ &+7p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,21} = \frac{1}{2}p_{5,21} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,21}^2 - 4(22p_{5,0}+17p_{5,16}+12p_{5,8}+13p_{5,24}+22p_{5,4} \\ &+11p_{5,20}+17p_{5,12}+19p_{5,28}+13p_{5,2}+17p_{5,18}+12p_{5,10} \\ &+18p_{5,26}+15p_{5,6}+12p_{5,22}+16p_{5,14}+22p_{5,30}+13p_{4,1} \\ &+16p_{5,9}+20p_{5,25}+20p_{5,5}+4p_{5,21}+29p_{5,13}+19p_{5,29} \\ &+11p_{5,3}+13p_{5,19}+16p_{4,11}+25p_{5,7}+20p_{5,23}+7p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,53} = \frac{1}{2}p_{5,21} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,21}^2 - 4(22p_{5,0}+17p_{5,16}+12p_{5,8}+13p_{5,24}+22p_{5,4} \\ &+11p_{5,20}+17p_{5,12}+19p_{5,28}+13p_{5,2}+17p_{5,18}+12p_{5,10} \\ &+18p_{5,26}+15p_{5,6}+12p_{5,22}+16p_{5,14}+22p_{5,30}+13p_{4,1} \\ &+16p_{5,9}+20p_{5,25}+20p_{5,5}+4p_{5,21}+29p_{5,13}+19p_{5,29} \\ &+11p_{5,3}+13p_{5,19}+16p_{4,11}+25p_{5,7}+20p_{5,23}+7p_{5,15} \\ &+12p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,13} = \frac{1}{2}p_{5,13} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,13}^2 - 4(12p_{5,0}+13p_{5,16}+17p_{5,8}+22p_{5,24}+17p_{5,4} \\ &+19p_{5,20}+11p_{5,12}+22p_{5,28}+12p_{5,2}+18p_{5,18}+17p_{5,10} \\ &+13p_{5,26}+16p_{5,6}+22p_{5,22}+12p_{5,14}+15p_{5,30}+16p_{5,1} \\ &+20p_{5,17}+13p_{4,9}+29p_{5,5}+19p_{5,21}+4p_{5,13}+20p_{5,29} \\ &+16p_{4,3}+13p_{5,11}+11p_{5,27}+7p_{5,7}+12p_{5,23}+20p_{5,15} \\ &+25p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,45} = \frac{1}{2}p_{5,13} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,13}^2 - 4(12p_{5,0}+13p_{5,16}+17p_{5,8}+22p_{5,24}+17p_{5,4} \\ &+19p_{5,20}+11p_{5,12}+22p_{5,28}+12p_{5,2}+18p_{5,18}+17p_{5,10} \\ &+13p_{5,26}+16p_{5,6}+22p_{5,22}+12p_{5,14}+15p_{5,30}+16p_{5,1} \\ &+20p_{5,17}+13p_{4,9}+29p_{5,5}+19p_{5,21}+4p_{5,13}+20p_{5,29} \\ &+16p_{4,3}+13p_{5,11}+11p_{5,27}+7p_{5,7}+12p_{5,23}+20p_{5,15} \\ &+25p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,29} = \frac{1}{2}p_{5,29} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,29}^2 - 4(13p_{5,0}+12p_{5,16}+22p_{5,8}+17p_{5,24}+19p_{5,4} \\ &+17p_{5,20}+22p_{5,12}+11p_{5,28}+18p_{5,2}+12p_{5,18}+13p_{5,10} \\ &+17p_{5,26}+22p_{5,6}+16p_{5,22}+15p_{5,14}+12p_{5,30}+20p_{5,1} \\ &+16p_{5,17}+13p_{4,9}+19p_{5,5}+29p_{5,21}+20p_{5,13}+4p_{5,29} \\ &+16p_{4,3}+11p_{5,11}+13p_{5,27}+12p_{5,7}+7p_{5,23}+25p_{5,15} \\ &+20p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,61} = \frac{1}{2}p_{5,29} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,29}^2 - 4(13p_{5,0}+12p_{5,16}+22p_{5,8}+17p_{5,24}+19p_{5,4} \\ &+17p_{5,20}+22p_{5,12}+11p_{5,28}+18p_{5,2}+12p_{5,18}+13p_{5,10} \\ &+17p_{5,26}+22p_{5,6}+16p_{5,22}+15p_{5,14}+12p_{5,30}+20p_{5,1} \\ &+16p_{5,17}+13p_{4,9}+19p_{5,5}+29p_{5,21}+20p_{5,13}+4p_{5,29} \\ &+16p_{4,3}+11p_{5,11}+13p_{5,27}+12p_{5,7}+7p_{5,23}+25p_{5,15} \\ &+20p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,3} = \frac{1}{2}p_{5,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,3}^2 - 4(17p_{5,0}+13p_{5,16}+18p_{5,8}+12p_{5,24}+12p_{5,4} \\ &+15p_{5,20}+22p_{5,12}+16p_{5,28}+11p_{5,2}+22p_{5,18}+19p_{5,10} \\ &+17p_{5,26}+13p_{5,6}+12p_{5,22}+22p_{5,14}+17p_{5,30}+13p_{5,1} \\ &+11p_{5,17}+16p_{4,9}+20p_{5,5}+25p_{5,21}+12p_{5,13}+7p_{5,29}+4p_{5,3} \\ &+20p_{5,19}+19p_{5,11}+29p_{5,27}+20p_{5,7}+16p_{5,23}+13p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,35} = \frac{1}{2}p_{5,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,3}^2 - 4(17p_{5,0}+13p_{5,16}+18p_{5,8}+12p_{5,24}+12p_{5,4} \\ &+15p_{5,20}+22p_{5,12}+16p_{5,28}+11p_{5,2}+22p_{5,18}+19p_{5,10} \\ &+17p_{5,26}+13p_{5,6}+12p_{5,22}+22p_{5,14}+17p_{5,30}+13p_{5,1} \\ &+11p_{5,17}+16p_{4,9}+20p_{5,5}+25p_{5,21}+12p_{5,13}+7p_{5,29}+4p_{5,3} \\ &+20p_{5,19}+19p_{5,11}+29p_{5,27}+20p_{5,7}+16p_{5,23}+13p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,19} = \frac{1}{2}p_{5,19} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,19}^2 - 4(13p_{5,0}+17p_{5,16}+12p_{5,8}+18p_{5,24}+15p_{5,4} \\ &+12p_{5,20}+16p_{5,12}+22p_{5,28}+22p_{5,2}+11p_{5,18}+17p_{5,10} \\ &+19p_{5,26}+12p_{5,6}+13p_{5,22}+17p_{5,14}+22p_{5,30}+11p_{5,1} \\ &+13p_{5,17}+16p_{4,9}+25p_{5,5}+20p_{5,21}+7p_{5,13}+12p_{5,29} \\ &+20p_{5,3}+4p_{5,19}+29p_{5,11}+19p_{5,27}+16p_{5,7}+20p_{5,23} \\ &+13p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,51} = \frac{1}{2}p_{5,19} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,19}^2 - 4(13p_{5,0}+17p_{5,16}+12p_{5,8}+18p_{5,24}+15p_{5,4} \\ &+12p_{5,20}+16p_{5,12}+22p_{5,28}+22p_{5,2}+11p_{5,18}+17p_{5,10} \\ &+19p_{5,26}+12p_{5,6}+13p_{5,22}+17p_{5,14}+22p_{5,30}+11p_{5,1} \\ &+13p_{5,17}+16p_{4,9}+25p_{5,5}+20p_{5,21}+7p_{5,13}+12p_{5,29} \\ &+20p_{5,3}+4p_{5,19}+29p_{5,11}+19p_{5,27}+16p_{5,7}+20p_{5,23} \\ &+13p_{4,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,11} = \frac{1}{2}p_{5,11} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,11}^2 - 4(12p_{5,0}+18p_{5,16}+17p_{5,8}+13p_{5,24}+16p_{5,4} \\ &+22p_{5,20}+12p_{5,12}+15p_{5,28}+17p_{5,2}+19p_{5,18}+11p_{5,10} \\ &+22p_{5,26}+17p_{5,6}+22p_{5,22}+13p_{5,14}+12p_{5,30}+16p_{4,1} \\ &+13p_{5,9}+11p_{5,25}+7p_{5,5}+12p_{5,21}+20p_{5,13}+25p_{5,29} \\ &+29p_{5,3}+19p_{5,19}+4p_{5,11}+20p_{5,27}+13p_{4,7}+20p_{5,15} \\ &+16p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,43} = \frac{1}{2}p_{5,11} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,11}^2 - 4(12p_{5,0}+18p_{5,16}+17p_{5,8}+13p_{5,24}+16p_{5,4} \\ &+22p_{5,20}+12p_{5,12}+15p_{5,28}+17p_{5,2}+19p_{5,18}+11p_{5,10} \\ &+22p_{5,26}+17p_{5,6}+22p_{5,22}+13p_{5,14}+12p_{5,30}+16p_{4,1} \\ &+13p_{5,9}+11p_{5,25}+7p_{5,5}+12p_{5,21}+20p_{5,13}+25p_{5,29} \\ &+29p_{5,3}+19p_{5,19}+4p_{5,11}+20p_{5,27}+13p_{4,7}+20p_{5,15} \\ &+16p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,27} = \frac{1}{2}p_{5,27} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,27}^2 - 4(18p_{5,0}+12p_{5,16}+13p_{5,8}+17p_{5,24}+22p_{5,4} \\ &+16p_{5,20}+15p_{5,12}+12p_{5,28}+19p_{5,2}+17p_{5,18}+22p_{5,10} \\ &+11p_{5,26}+22p_{5,6}+17p_{5,22}+12p_{5,14}+13p_{5,30}+16p_{4,1} \\ &+11p_{5,9}+13p_{5,25}+12p_{5,5}+7p_{5,21}+25p_{5,13}+20p_{5,29} \\ &+19p_{5,3}+29p_{5,19}+20p_{5,11}+4p_{5,27}+13p_{4,7}+16p_{5,15} \\ &+20p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,59} = \frac{1}{2}p_{5,27} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,27}^2 - 4(18p_{5,0}+12p_{5,16}+13p_{5,8}+17p_{5,24}+22p_{5,4} \\ &+16p_{5,20}+15p_{5,12}+12p_{5,28}+19p_{5,2}+17p_{5,18}+22p_{5,10} \\ &+11p_{5,26}+22p_{5,6}+17p_{5,22}+12p_{5,14}+13p_{5,30}+16p_{4,1} \\ &+11p_{5,9}+13p_{5,25}+12p_{5,5}+7p_{5,21}+25p_{5,13}+20p_{5,29} \\ &+19p_{5,3}+29p_{5,19}+20p_{5,11}+4p_{5,27}+13p_{4,7}+16p_{5,15} \\ &+20p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,7} = \frac{1}{2}p_{5,7} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,7}^2 - 4(16p_{5,0}+22p_{5,16}+12p_{5,8}+15p_{5,24}+17p_{5,4} \\ &+13p_{5,20}+18p_{5,12}+12p_{5,28}+17p_{5,2}+22p_{5,18}+13p_{5,10} \\ &+12p_{5,26}+11p_{5,6}+22p_{5,22}+19p_{5,14}+17p_{5,30}+7p_{5,1} \\ &+12p_{5,17}+20p_{5,9}+25p_{5,25}+13p_{5,5}+11p_{5,21}+16p_{4,13} \\ &+13p_{4,3}+20p_{5,11}+16p_{5,27}+4p_{5,7}+20p_{5,23}+19p_{5,15} \\ &+29p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,39} = \frac{1}{2}p_{5,7} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,7}^2 - 4(16p_{5,0}+22p_{5,16}+12p_{5,8}+15p_{5,24}+17p_{5,4} \\ &+13p_{5,20}+18p_{5,12}+12p_{5,28}+17p_{5,2}+22p_{5,18}+13p_{5,10} \\ &+12p_{5,26}+11p_{5,6}+22p_{5,22}+19p_{5,14}+17p_{5,30}+7p_{5,1} \\ &+12p_{5,17}+20p_{5,9}+25p_{5,25}+13p_{5,5}+11p_{5,21}+16p_{4,13} \\ &+13p_{4,3}+20p_{5,11}+16p_{5,27}+4p_{5,7}+20p_{5,23}+19p_{5,15} \\ &+29p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,23} = \frac{1}{2}p_{5,23} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,23}^2 - 4(22p_{5,0}+16p_{5,16}+15p_{5,8}+12p_{5,24}+13p_{5,4} \\ &+17p_{5,20}+12p_{5,12}+18p_{5,28}+22p_{5,2}+17p_{5,18}+12p_{5,10} \\ &+13p_{5,26}+22p_{5,6}+11p_{5,22}+17p_{5,14}+19p_{5,30}+12p_{5,1} \\ &+7p_{5,17}+25p_{5,9}+20p_{5,25}+11p_{5,5}+13p_{5,21}+16p_{4,13} \\ &+13p_{4,3}+16p_{5,11}+20p_{5,27}+20p_{5,7}+4p_{5,23}+29p_{5,15} \\ &+19p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,55} = \frac{1}{2}p_{5,23} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,23}^2 - 4(22p_{5,0}+16p_{5,16}+15p_{5,8}+12p_{5,24}+13p_{5,4} \\ &+17p_{5,20}+12p_{5,12}+18p_{5,28}+22p_{5,2}+17p_{5,18}+12p_{5,10} \\ &+13p_{5,26}+22p_{5,6}+11p_{5,22}+17p_{5,14}+19p_{5,30}+12p_{5,1} \\ &+7p_{5,17}+25p_{5,9}+20p_{5,25}+11p_{5,5}+13p_{5,21}+16p_{4,13} \\ &+13p_{4,3}+16p_{5,11}+20p_{5,27}+20p_{5,7}+4p_{5,23}+29p_{5,15} \\ &+19p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,15} = \frac{1}{2}p_{5,15} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,15}^2 - 4(15p_{5,0}+12p_{5,16}+16p_{5,8}+22p_{5,24}+12p_{5,4} \\ &+18p_{5,20}+17p_{5,12}+13p_{5,28}+12p_{5,2}+13p_{5,18}+17p_{5,10} \\ &+22p_{5,26}+17p_{5,6}+19p_{5,22}+11p_{5,14}+22p_{5,30}+25p_{5,1} \\ &+20p_{5,17}+7p_{5,9}+12p_{5,25}+16p_{4,5}+13p_{5,13}+11p_{5,29} \\ &+16p_{5,3}+20p_{5,19}+13p_{4,11}+29p_{5,7}+19p_{5,23}+4p_{5,15} \\ &+20p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,47} = \frac{1}{2}p_{5,15} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,15}^2 - 4(15p_{5,0}+12p_{5,16}+16p_{5,8}+22p_{5,24}+12p_{5,4} \\ &+18p_{5,20}+17p_{5,12}+13p_{5,28}+12p_{5,2}+13p_{5,18}+17p_{5,10} \\ &+22p_{5,26}+17p_{5,6}+19p_{5,22}+11p_{5,14}+22p_{5,30}+25p_{5,1} \\ &+20p_{5,17}+7p_{5,9}+12p_{5,25}+16p_{4,5}+13p_{5,13}+11p_{5,29} \\ &+16p_{5,3}+20p_{5,19}+13p_{4,11}+29p_{5,7}+19p_{5,23}+4p_{5,15} \\ &+20p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,31} = \frac{1}{2}p_{5,31} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,31}^2 - 4(12p_{5,0}+15p_{5,16}+22p_{5,8}+16p_{5,24}+18p_{5,4} \\ &+12p_{5,20}+13p_{5,12}+17p_{5,28}+13p_{5,2}+12p_{5,18}+22p_{5,10} \\ &+17p_{5,26}+19p_{5,6}+17p_{5,22}+22p_{5,14}+11p_{5,30}+20p_{5,1} \\ &+25p_{5,17}+12p_{5,9}+7p_{5,25}+16p_{4,5}+11p_{5,13}+13p_{5,29} \\ &+20p_{5,3}+16p_{5,19}+13p_{4,11}+19p_{5,7}+29p_{5,23}+20p_{5,15} \\ &+4p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{6,63} = \frac{1}{2}p_{5,31} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{5,31}^2 - 4(12p_{5,0}+15p_{5,16}+22p_{5,8}+16p_{5,24}+18p_{5,4} \\ &+12p_{5,20}+13p_{5,12}+17p_{5,28}+13p_{5,2}+12p_{5,18}+22p_{5,10} \\ &+17p_{5,26}+19p_{5,6}+17p_{5,22}+22p_{5,14}+11p_{5,30}+20p_{5,1} \\ &+25p_{5,17}+12p_{5,9}+7p_{5,25}+16p_{4,5}+11p_{5,13}+13p_{5,29} \\ &+20p_{5,3}+16p_{5,19}+13p_{4,11}+19p_{5,7}+29p_{5,23}+20p_{5,15} \\ &+4p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,0} = \frac{1}{2}p_{6,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,0}^2 - 4(p_{6,32}+6p_{6,16}+7p_{6,48}+2p_{6,8}+3p_{6,40}+3p_{6,24} \\ &+2p_{6,56}+5p_{6,4}+p_{6,36}+2p_{6,20}+5p_{6,52}+p_{6,12}+3p_{6,44}+4p_{6,28} \\ &+3p_{6,60}+2p_{6,2}+3p_{6,34}+3p_{6,18}+4p_{6,50}+5p_{6,10}+4p_{6,42}+3p_{5,26} \\ &+2p_{6,6}+7p_{6,38}+5p_{6,22}+8p_{6,54}+3p_{5,14}+p_{6,30}+8p_{6,62}+3p_{6,1} \\ &+6p_{6,33}+8p_{6,17}+7p_{6,49}+6p_{6,9}+3p_{6,41}+10p_{6,25}+4p_{6,57}+5p_{6,5} \\ &+p_{6,37}+5p_{6,21}+6p_{6,53}+6p_{6,13}+2p_{6,45}+5p_{5,29}+5p_{6,3}+2p_{6,35} \\ &+5p_{6,19}+4p_{6,51}+6p_{5,11}+3p_{6,27}+4p_{6,59}+5p_{6,7}+3p_{6,39}+p_{6,23} \\ &+2p_{6,55}+5p_{6,15}+4p_{6,47}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,64} = \frac{1}{2}p_{6,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,0}^2 - 4(p_{6,32}+6p_{6,16}+7p_{6,48}+2p_{6,8}+3p_{6,40}+3p_{6,24} \\ &+2p_{6,56}+5p_{6,4}+p_{6,36}+2p_{6,20}+5p_{6,52}+p_{6,12}+3p_{6,44}+4p_{6,28} \\ &+3p_{6,60}+2p_{6,2}+3p_{6,34}+3p_{6,18}+4p_{6,50}+5p_{6,10}+4p_{6,42}+3p_{5,26} \\ &+2p_{6,6}+7p_{6,38}+5p_{6,22}+8p_{6,54}+3p_{5,14}+p_{6,30}+8p_{6,62}+3p_{6,1} \\ &+6p_{6,33}+8p_{6,17}+7p_{6,49}+6p_{6,9}+3p_{6,41}+10p_{6,25}+4p_{6,57}+5p_{6,5} \\ &+p_{6,37}+5p_{6,21}+6p_{6,53}+6p_{6,13}+2p_{6,45}+5p_{5,29}+5p_{6,3}+2p_{6,35} \\ &+5p_{6,19}+4p_{6,51}+6p_{5,11}+3p_{6,27}+4p_{6,59}+5p_{6,7}+3p_{6,39}+p_{6,23} \\ &+2p_{6,55}+5p_{6,15}+4p_{6,47}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,32} = \frac{1}{2}p_{6,32} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,32}^2 - 4(p_{6,0}+7p_{6,16}+6p_{6,48}+3p_{6,8}+2p_{6,40}+2p_{6,24} \\ &+3p_{6,56}+p_{6,4}+5p_{6,36}+5p_{6,20}+2p_{6,52}+3p_{6,12}+p_{6,44}+3p_{6,28} \\ &+4p_{6,60}+3p_{6,2}+2p_{6,34}+4p_{6,18}+3p_{6,50}+4p_{6,10}+5p_{6,42}+3p_{5,26} \\ &+7p_{6,6}+2p_{6,38}+8p_{6,22}+5p_{6,54}+3p_{5,14}+8p_{6,30}+p_{6,62}+6p_{6,1} \\ &+3p_{6,33}+7p_{6,17}+8p_{6,49}+3p_{6,9}+6p_{6,41}+4p_{6,25}+10p_{6,57}+p_{6,5} \\ &+5p_{6,37}+6p_{6,21}+5p_{6,53}+2p_{6,13}+6p_{6,45}+5p_{5,29}+2p_{6,3}+5p_{6,35} \\ &+4p_{6,19}+5p_{6,51}+6p_{5,11}+4p_{6,27}+3p_{6,59}+3p_{6,7}+5p_{6,39}+2p_{6,23} \\ &+p_{6,55}+4p_{6,15}+5p_{6,47}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,96} = \frac{1}{2}p_{6,32} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,32}^2 - 4(p_{6,0}+7p_{6,16}+6p_{6,48}+3p_{6,8}+2p_{6,40}+2p_{6,24} \\ &+3p_{6,56}+p_{6,4}+5p_{6,36}+5p_{6,20}+2p_{6,52}+3p_{6,12}+p_{6,44}+3p_{6,28} \\ &+4p_{6,60}+3p_{6,2}+2p_{6,34}+4p_{6,18}+3p_{6,50}+4p_{6,10}+5p_{6,42}+3p_{5,26} \\ &+7p_{6,6}+2p_{6,38}+8p_{6,22}+5p_{6,54}+3p_{5,14}+8p_{6,30}+p_{6,62}+6p_{6,1} \\ &+3p_{6,33}+7p_{6,17}+8p_{6,49}+3p_{6,9}+6p_{6,41}+4p_{6,25}+10p_{6,57}+p_{6,5} \\ &+5p_{6,37}+6p_{6,21}+5p_{6,53}+2p_{6,13}+6p_{6,45}+5p_{5,29}+2p_{6,3}+5p_{6,35} \\ &+4p_{6,19}+5p_{6,51}+6p_{5,11}+4p_{6,27}+3p_{6,59}+3p_{6,7}+5p_{6,39}+2p_{6,23} \\ &+p_{6,55}+4p_{6,15}+5p_{6,47}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,16} = \frac{1}{2}p_{6,16} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,16}^2 - 4(7p_{6,0}+6p_{6,32}+p_{6,48}+2p_{6,8}+3p_{6,40}+2p_{6,24} \\ &+3p_{6,56}+5p_{6,4}+2p_{6,36}+5p_{6,20}+p_{6,52}+3p_{6,12}+4p_{6,44}+p_{6,28} \\ &+3p_{6,60}+4p_{6,2}+3p_{6,34}+2p_{6,18}+3p_{6,50}+3p_{5,10}+5p_{6,26}+4p_{6,58} \\ &+8p_{6,6}+5p_{6,38}+2p_{6,22}+7p_{6,54}+8p_{6,14}+p_{6,46}+3p_{5,30}+7p_{6,1} \\ &+8p_{6,33}+3p_{6,17}+6p_{6,49}+4p_{6,9}+10p_{6,41}+6p_{6,25}+3p_{6,57}+6p_{6,5} \\ &+5p_{6,37}+5p_{6,21}+p_{6,53}+5p_{5,13}+6p_{6,29}+2p_{6,61}+4p_{6,3}+5p_{6,35} \\ &+5p_{6,19}+2p_{6,51}+4p_{6,11}+3p_{6,43}+6p_{5,27}+2p_{6,7}+p_{6,39}+5p_{6,23} \\ &+3p_{6,55}+3p_{6,15}+4p_{6,47}+5p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,80} = \frac{1}{2}p_{6,16} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,16}^2 - 4(7p_{6,0}+6p_{6,32}+p_{6,48}+2p_{6,8}+3p_{6,40}+2p_{6,24} \\ &+3p_{6,56}+5p_{6,4}+2p_{6,36}+5p_{6,20}+p_{6,52}+3p_{6,12}+4p_{6,44}+p_{6,28} \\ &+3p_{6,60}+4p_{6,2}+3p_{6,34}+2p_{6,18}+3p_{6,50}+3p_{5,10}+5p_{6,26}+4p_{6,58} \\ &+8p_{6,6}+5p_{6,38}+2p_{6,22}+7p_{6,54}+8p_{6,14}+p_{6,46}+3p_{5,30}+7p_{6,1} \\ &+8p_{6,33}+3p_{6,17}+6p_{6,49}+4p_{6,9}+10p_{6,41}+6p_{6,25}+3p_{6,57}+6p_{6,5} \\ &+5p_{6,37}+5p_{6,21}+p_{6,53}+5p_{5,13}+6p_{6,29}+2p_{6,61}+4p_{6,3}+5p_{6,35} \\ &+5p_{6,19}+2p_{6,51}+4p_{6,11}+3p_{6,43}+6p_{5,27}+2p_{6,7}+p_{6,39}+5p_{6,23} \\ &+3p_{6,55}+3p_{6,15}+4p_{6,47}+5p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,48} = \frac{1}{2}p_{6,48} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,48}^2 - 4(6p_{6,0}+7p_{6,32}+p_{6,16}+3p_{6,8}+2p_{6,40}+3p_{6,24} \\ &+2p_{6,56}+2p_{6,4}+5p_{6,36}+p_{6,20}+5p_{6,52}+4p_{6,12}+3p_{6,44}+3p_{6,28} \\ &+p_{6,60}+3p_{6,2}+4p_{6,34}+3p_{6,18}+2p_{6,50}+3p_{5,10}+4p_{6,26}+5p_{6,58} \\ &+5p_{6,6}+8p_{6,38}+7p_{6,22}+2p_{6,54}+p_{6,14}+8p_{6,46}+3p_{5,30}+8p_{6,1} \\ &+7p_{6,33}+6p_{6,17}+3p_{6,49}+10p_{6,9}+4p_{6,41}+3p_{6,25}+6p_{6,57}+5p_{6,5} \\ &+6p_{6,37}+p_{6,21}+5p_{6,53}+5p_{5,13}+2p_{6,29}+6p_{6,61}+5p_{6,3}+4p_{6,35} \\ &+2p_{6,19}+5p_{6,51}+3p_{6,11}+4p_{6,43}+6p_{5,27}+p_{6,7}+2p_{6,39}+3p_{6,23} \\ &+5p_{6,55}+4p_{6,15}+3p_{6,47}+4p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,112} = \frac{1}{2}p_{6,48} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,48}^2 - 4(6p_{6,0}+7p_{6,32}+p_{6,16}+3p_{6,8}+2p_{6,40}+3p_{6,24} \\ &+2p_{6,56}+2p_{6,4}+5p_{6,36}+p_{6,20}+5p_{6,52}+4p_{6,12}+3p_{6,44}+3p_{6,28} \\ &+p_{6,60}+3p_{6,2}+4p_{6,34}+3p_{6,18}+2p_{6,50}+3p_{5,10}+4p_{6,26}+5p_{6,58} \\ &+5p_{6,6}+8p_{6,38}+7p_{6,22}+2p_{6,54}+p_{6,14}+8p_{6,46}+3p_{5,30}+8p_{6,1} \\ &+7p_{6,33}+6p_{6,17}+3p_{6,49}+10p_{6,9}+4p_{6,41}+3p_{6,25}+6p_{6,57}+5p_{6,5} \\ &+6p_{6,37}+p_{6,21}+5p_{6,53}+5p_{5,13}+2p_{6,29}+6p_{6,61}+5p_{6,3}+4p_{6,35} \\ &+2p_{6,19}+5p_{6,51}+3p_{6,11}+4p_{6,43}+6p_{5,27}+p_{6,7}+2p_{6,39}+3p_{6,23} \\ &+5p_{6,55}+4p_{6,15}+3p_{6,47}+4p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,8} = \frac{1}{2}p_{6,8} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,8}^2 - 4(2p_{6,0}+3p_{6,32}+2p_{6,16}+3p_{6,48}+p_{6,40}+6p_{6,24} \\ &+7p_{6,56}+3p_{6,4}+4p_{6,36}+p_{6,20}+3p_{6,52}+5p_{6,12}+p_{6,44}+2p_{6,28} \\ &+5p_{6,60}+3p_{5,2}+5p_{6,18}+4p_{6,50}+2p_{6,10}+3p_{6,42}+3p_{6,26}+4p_{6,58} \\ &+8p_{6,6}+p_{6,38}+3p_{5,22}+2p_{6,14}+7p_{6,46}+5p_{6,30}+8p_{6,62}+4p_{6,1} \\ &+10p_{6,33}+6p_{6,17}+3p_{6,49}+3p_{6,9}+6p_{6,41}+8p_{6,25}+7p_{6,57}+5p_{5,5} \\ &+6p_{6,21}+2p_{6,53}+5p_{6,13}+p_{6,45}+5p_{6,29}+6p_{6,61}+4p_{6,3}+3p_{6,35} \\ &+6p_{5,19}+5p_{6,11}+2p_{6,43}+5p_{6,27}+4p_{6,59}+3p_{6,7}+4p_{6,39}+5p_{6,23} \\ &+4p_{6,55}+5p_{6,15}+3p_{6,47}+p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,72} = \frac{1}{2}p_{6,8} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,8}^2 - 4(2p_{6,0}+3p_{6,32}+2p_{6,16}+3p_{6,48}+p_{6,40}+6p_{6,24} \\ &+7p_{6,56}+3p_{6,4}+4p_{6,36}+p_{6,20}+3p_{6,52}+5p_{6,12}+p_{6,44}+2p_{6,28} \\ &+5p_{6,60}+3p_{5,2}+5p_{6,18}+4p_{6,50}+2p_{6,10}+3p_{6,42}+3p_{6,26}+4p_{6,58} \\ &+8p_{6,6}+p_{6,38}+3p_{5,22}+2p_{6,14}+7p_{6,46}+5p_{6,30}+8p_{6,62}+4p_{6,1} \\ &+10p_{6,33}+6p_{6,17}+3p_{6,49}+3p_{6,9}+6p_{6,41}+8p_{6,25}+7p_{6,57}+5p_{5,5} \\ &+6p_{6,21}+2p_{6,53}+5p_{6,13}+p_{6,45}+5p_{6,29}+6p_{6,61}+4p_{6,3}+3p_{6,35} \\ &+6p_{5,19}+5p_{6,11}+2p_{6,43}+5p_{6,27}+4p_{6,59}+3p_{6,7}+4p_{6,39}+5p_{6,23} \\ &+4p_{6,55}+5p_{6,15}+3p_{6,47}+p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,40} = \frac{1}{2}p_{6,40} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,40}^2 - 4(3p_{6,0}+2p_{6,32}+3p_{6,16}+2p_{6,48}+p_{6,8}+7p_{6,24} \\ &+6p_{6,56}+4p_{6,4}+3p_{6,36}+3p_{6,20}+p_{6,52}+p_{6,12}+5p_{6,44}+5p_{6,28} \\ &+2p_{6,60}+3p_{5,2}+4p_{6,18}+5p_{6,50}+3p_{6,10}+2p_{6,42}+4p_{6,26}+3p_{6,58} \\ &+p_{6,6}+8p_{6,38}+3p_{5,22}+7p_{6,14}+2p_{6,46}+8p_{6,30}+5p_{6,62}+10p_{6,1} \\ &+4p_{6,33}+3p_{6,17}+6p_{6,49}+6p_{6,9}+3p_{6,41}+7p_{6,25}+8p_{6,57}+5p_{5,5} \\ &+2p_{6,21}+6p_{6,53}+p_{6,13}+5p_{6,45}+6p_{6,29}+5p_{6,61}+3p_{6,3}+4p_{6,35} \\ &+6p_{5,19}+2p_{6,11}+5p_{6,43}+4p_{6,27}+5p_{6,59}+4p_{6,7}+3p_{6,39}+4p_{6,23} \\ &+5p_{6,55}+3p_{6,15}+5p_{6,47}+2p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,104} = \frac{1}{2}p_{6,40} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,40}^2 - 4(3p_{6,0}+2p_{6,32}+3p_{6,16}+2p_{6,48}+p_{6,8}+7p_{6,24} \\ &+6p_{6,56}+4p_{6,4}+3p_{6,36}+3p_{6,20}+p_{6,52}+p_{6,12}+5p_{6,44}+5p_{6,28} \\ &+2p_{6,60}+3p_{5,2}+4p_{6,18}+5p_{6,50}+3p_{6,10}+2p_{6,42}+4p_{6,26}+3p_{6,58} \\ &+p_{6,6}+8p_{6,38}+3p_{5,22}+7p_{6,14}+2p_{6,46}+8p_{6,30}+5p_{6,62}+10p_{6,1} \\ &+4p_{6,33}+3p_{6,17}+6p_{6,49}+6p_{6,9}+3p_{6,41}+7p_{6,25}+8p_{6,57}+5p_{5,5} \\ &+2p_{6,21}+6p_{6,53}+p_{6,13}+5p_{6,45}+6p_{6,29}+5p_{6,61}+3p_{6,3}+4p_{6,35} \\ &+6p_{5,19}+2p_{6,11}+5p_{6,43}+4p_{6,27}+5p_{6,59}+4p_{6,7}+3p_{6,39}+4p_{6,23} \\ &+5p_{6,55}+3p_{6,15}+5p_{6,47}+2p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,24} = \frac{1}{2}p_{6,24} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,24}^2 - 4(3p_{6,0}+2p_{6,32}+2p_{6,16}+3p_{6,48}+7p_{6,8}+6p_{6,40} \\ &+p_{6,56}+3p_{6,4}+p_{6,36}+3p_{6,20}+4p_{6,52}+5p_{6,12}+2p_{6,44}+5p_{6,28} \\ &+p_{6,60}+4p_{6,2}+5p_{6,34}+3p_{5,18}+4p_{6,10}+3p_{6,42}+2p_{6,26}+3p_{6,58} \\ &+3p_{5,6}+8p_{6,22}+p_{6,54}+8p_{6,14}+5p_{6,46}+2p_{6,30}+7p_{6,62}+3p_{6,1} \\ &+6p_{6,33}+4p_{6,17}+10p_{6,49}+7p_{6,9}+8p_{6,41}+3p_{6,25}+6p_{6,57}+2p_{6,5} \\ &+6p_{6,37}+5p_{5,21}+6p_{6,13}+5p_{6,45}+5p_{6,29}+p_{6,61}+6p_{5,3}+4p_{6,19} \\ &+3p_{6,51}+4p_{6,11}+5p_{6,43}+5p_{6,27}+2p_{6,59}+4p_{6,7}+5p_{6,39}+3p_{6,23} \\ &+4p_{6,55}+2p_{6,15}+p_{6,47}+5p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,88} = \frac{1}{2}p_{6,24} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,24}^2 - 4(3p_{6,0}+2p_{6,32}+2p_{6,16}+3p_{6,48}+7p_{6,8}+6p_{6,40} \\ &+p_{6,56}+3p_{6,4}+p_{6,36}+3p_{6,20}+4p_{6,52}+5p_{6,12}+2p_{6,44}+5p_{6,28} \\ &+p_{6,60}+4p_{6,2}+5p_{6,34}+3p_{5,18}+4p_{6,10}+3p_{6,42}+2p_{6,26}+3p_{6,58} \\ &+3p_{5,6}+8p_{6,22}+p_{6,54}+8p_{6,14}+5p_{6,46}+2p_{6,30}+7p_{6,62}+3p_{6,1} \\ &+6p_{6,33}+4p_{6,17}+10p_{6,49}+7p_{6,9}+8p_{6,41}+3p_{6,25}+6p_{6,57}+2p_{6,5} \\ &+6p_{6,37}+5p_{5,21}+6p_{6,13}+5p_{6,45}+5p_{6,29}+p_{6,61}+6p_{5,3}+4p_{6,19} \\ &+3p_{6,51}+4p_{6,11}+5p_{6,43}+5p_{6,27}+2p_{6,59}+4p_{6,7}+5p_{6,39}+3p_{6,23} \\ &+4p_{6,55}+2p_{6,15}+p_{6,47}+5p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,56} = \frac{1}{2}p_{6,56} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,56}^2 - 4(2p_{6,0}+3p_{6,32}+3p_{6,16}+2p_{6,48}+6p_{6,8}+7p_{6,40} \\ &+p_{6,24}+p_{6,4}+3p_{6,36}+4p_{6,20}+3p_{6,52}+2p_{6,12}+5p_{6,44}+p_{6,28} \\ &+5p_{6,60}+5p_{6,2}+4p_{6,34}+3p_{5,18}+3p_{6,10}+4p_{6,42}+3p_{6,26}+2p_{6,58} \\ &+3p_{5,6}+p_{6,22}+8p_{6,54}+5p_{6,14}+8p_{6,46}+7p_{6,30}+2p_{6,62}+6p_{6,1} \\ &+3p_{6,33}+10p_{6,17}+4p_{6,49}+8p_{6,9}+7p_{6,41}+6p_{6,25}+3p_{6,57}+6p_{6,5} \\ &+2p_{6,37}+5p_{5,21}+5p_{6,13}+6p_{6,45}+p_{6,29}+5p_{6,61}+6p_{5,3}+3p_{6,19} \\ &+4p_{6,51}+5p_{6,11}+4p_{6,43}+2p_{6,27}+5p_{6,59}+5p_{6,7}+4p_{6,39}+4p_{6,23} \\ &+3p_{6,55}+p_{6,15}+2p_{6,47}+3p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,120} = \frac{1}{2}p_{6,56} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,56}^2 - 4(2p_{6,0}+3p_{6,32}+3p_{6,16}+2p_{6,48}+6p_{6,8}+7p_{6,40} \\ &+p_{6,24}+p_{6,4}+3p_{6,36}+4p_{6,20}+3p_{6,52}+2p_{6,12}+5p_{6,44}+p_{6,28} \\ &+5p_{6,60}+5p_{6,2}+4p_{6,34}+3p_{5,18}+3p_{6,10}+4p_{6,42}+3p_{6,26}+2p_{6,58} \\ &+3p_{5,6}+p_{6,22}+8p_{6,54}+5p_{6,14}+8p_{6,46}+7p_{6,30}+2p_{6,62}+6p_{6,1} \\ &+3p_{6,33}+10p_{6,17}+4p_{6,49}+8p_{6,9}+7p_{6,41}+6p_{6,25}+3p_{6,57}+6p_{6,5} \\ &+2p_{6,37}+5p_{5,21}+5p_{6,13}+6p_{6,45}+p_{6,29}+5p_{6,61}+6p_{5,3}+3p_{6,19} \\ &+4p_{6,51}+5p_{6,11}+4p_{6,43}+2p_{6,27}+5p_{6,59}+5p_{6,7}+4p_{6,39}+4p_{6,23} \\ &+3p_{6,55}+p_{6,15}+2p_{6,47}+3p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,4} = \frac{1}{2}p_{6,4} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,4}^2 - 4(3p_{6,0}+4p_{6,32}+p_{6,16}+3p_{6,48}+5p_{6,8}+p_{6,40} \\ &+2p_{6,24}+5p_{6,56}+p_{6,36}+6p_{6,20}+7p_{6,52}+2p_{6,12}+3p_{6,44}+3p_{6,28} \\ &+2p_{6,60}+8p_{6,2}+p_{6,34}+3p_{5,18}+2p_{6,10}+7p_{6,42}+5p_{6,26}+8p_{6,58} \\ &+2p_{6,6}+3p_{6,38}+3p_{6,22}+4p_{6,54}+5p_{6,14}+4p_{6,46}+3p_{5,30}+5p_{5,1} \\ &+6p_{6,17}+2p_{6,49}+5p_{6,9}+p_{6,41}+5p_{6,25}+6p_{6,57}+3p_{6,5}+6p_{6,37} \\ &+8p_{6,21}+7p_{6,53}+6p_{6,13}+3p_{6,45}+10p_{6,29}+4p_{6,61}+3p_{6,3}+4p_{6,35} \\ &+5p_{6,19}+4p_{6,51}+5p_{6,11}+3p_{6,43}+p_{6,27}+2p_{6,59}+5p_{6,7}+2p_{6,39} \\ &+5p_{6,23}+4p_{6,55}+6p_{5,15}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,68} = \frac{1}{2}p_{6,4} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,4}^2 - 4(3p_{6,0}+4p_{6,32}+p_{6,16}+3p_{6,48}+5p_{6,8}+p_{6,40} \\ &+2p_{6,24}+5p_{6,56}+p_{6,36}+6p_{6,20}+7p_{6,52}+2p_{6,12}+3p_{6,44}+3p_{6,28} \\ &+2p_{6,60}+8p_{6,2}+p_{6,34}+3p_{5,18}+2p_{6,10}+7p_{6,42}+5p_{6,26}+8p_{6,58} \\ &+2p_{6,6}+3p_{6,38}+3p_{6,22}+4p_{6,54}+5p_{6,14}+4p_{6,46}+3p_{5,30}+5p_{5,1} \\ &+6p_{6,17}+2p_{6,49}+5p_{6,9}+p_{6,41}+5p_{6,25}+6p_{6,57}+3p_{6,5}+6p_{6,37} \\ &+8p_{6,21}+7p_{6,53}+6p_{6,13}+3p_{6,45}+10p_{6,29}+4p_{6,61}+3p_{6,3}+4p_{6,35} \\ &+5p_{6,19}+4p_{6,51}+5p_{6,11}+3p_{6,43}+p_{6,27}+2p_{6,59}+5p_{6,7}+2p_{6,39} \\ &+5p_{6,23}+4p_{6,55}+6p_{5,15}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,36} = \frac{1}{2}p_{6,36} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,36}^2 - 4(4p_{6,0}+3p_{6,32}+3p_{6,16}+p_{6,48}+p_{6,8}+5p_{6,40} \\ &+5p_{6,24}+2p_{6,56}+p_{6,4}+7p_{6,20}+6p_{6,52}+3p_{6,12}+2p_{6,44}+2p_{6,28} \\ &+3p_{6,60}+p_{6,2}+8p_{6,34}+3p_{5,18}+7p_{6,10}+2p_{6,42}+8p_{6,26}+5p_{6,58} \\ &+3p_{6,6}+2p_{6,38}+4p_{6,22}+3p_{6,54}+4p_{6,14}+5p_{6,46}+3p_{5,30}+5p_{5,1} \\ &+2p_{6,17}+6p_{6,49}+p_{6,9}+5p_{6,41}+6p_{6,25}+5p_{6,57}+6p_{6,5}+3p_{6,37} \\ &+7p_{6,21}+8p_{6,53}+3p_{6,13}+6p_{6,45}+4p_{6,29}+10p_{6,61}+4p_{6,3}+3p_{6,35} \\ &+4p_{6,19}+5p_{6,51}+3p_{6,11}+5p_{6,43}+2p_{6,27}+p_{6,59}+2p_{6,7}+5p_{6,39} \\ &+4p_{6,23}+5p_{6,55}+6p_{5,15}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,100} = \frac{1}{2}p_{6,36} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,36}^2 - 4(4p_{6,0}+3p_{6,32}+3p_{6,16}+p_{6,48}+p_{6,8}+5p_{6,40} \\ &+5p_{6,24}+2p_{6,56}+p_{6,4}+7p_{6,20}+6p_{6,52}+3p_{6,12}+2p_{6,44}+2p_{6,28} \\ &+3p_{6,60}+p_{6,2}+8p_{6,34}+3p_{5,18}+7p_{6,10}+2p_{6,42}+8p_{6,26}+5p_{6,58} \\ &+3p_{6,6}+2p_{6,38}+4p_{6,22}+3p_{6,54}+4p_{6,14}+5p_{6,46}+3p_{5,30}+5p_{5,1} \\ &+2p_{6,17}+6p_{6,49}+p_{6,9}+5p_{6,41}+6p_{6,25}+5p_{6,57}+6p_{6,5}+3p_{6,37} \\ &+7p_{6,21}+8p_{6,53}+3p_{6,13}+6p_{6,45}+4p_{6,29}+10p_{6,61}+4p_{6,3}+3p_{6,35} \\ &+4p_{6,19}+5p_{6,51}+3p_{6,11}+5p_{6,43}+2p_{6,27}+p_{6,59}+2p_{6,7}+5p_{6,39} \\ &+4p_{6,23}+5p_{6,55}+6p_{5,15}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,20} = \frac{1}{2}p_{6,20} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,20}^2 - 4(3p_{6,0}+p_{6,32}+3p_{6,16}+4p_{6,48}+5p_{6,8}+2p_{6,40} \\ &+5p_{6,24}+p_{6,56}+7p_{6,4}+6p_{6,36}+p_{6,52}+2p_{6,12}+3p_{6,44}+2p_{6,28} \\ &+3p_{6,60}+3p_{5,2}+8p_{6,18}+p_{6,50}+8p_{6,10}+5p_{6,42}+2p_{6,26}+7p_{6,58} \\ &+4p_{6,6}+3p_{6,38}+2p_{6,22}+3p_{6,54}+3p_{5,14}+5p_{6,30}+4p_{6,62}+2p_{6,1} \\ &+6p_{6,33}+5p_{5,17}+6p_{6,9}+5p_{6,41}+5p_{6,25}+p_{6,57}+7p_{6,5}+8p_{6,37} \\ &+3p_{6,21}+6p_{6,53}+4p_{6,13}+10p_{6,45}+6p_{6,29}+3p_{6,61}+4p_{6,3}+5p_{6,35} \\ &+3p_{6,19}+4p_{6,51}+2p_{6,11}+p_{6,43}+5p_{6,27}+3p_{6,59}+4p_{6,7}+5p_{6,39} \\ &+5p_{6,23}+2p_{6,55}+4p_{6,15}+3p_{6,47}+6p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,84} = \frac{1}{2}p_{6,20} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,20}^2 - 4(3p_{6,0}+p_{6,32}+3p_{6,16}+4p_{6,48}+5p_{6,8}+2p_{6,40} \\ &+5p_{6,24}+p_{6,56}+7p_{6,4}+6p_{6,36}+p_{6,52}+2p_{6,12}+3p_{6,44}+2p_{6,28} \\ &+3p_{6,60}+3p_{5,2}+8p_{6,18}+p_{6,50}+8p_{6,10}+5p_{6,42}+2p_{6,26}+7p_{6,58} \\ &+4p_{6,6}+3p_{6,38}+2p_{6,22}+3p_{6,54}+3p_{5,14}+5p_{6,30}+4p_{6,62}+2p_{6,1} \\ &+6p_{6,33}+5p_{5,17}+6p_{6,9}+5p_{6,41}+5p_{6,25}+p_{6,57}+7p_{6,5}+8p_{6,37} \\ &+3p_{6,21}+6p_{6,53}+4p_{6,13}+10p_{6,45}+6p_{6,29}+3p_{6,61}+4p_{6,3}+5p_{6,35} \\ &+3p_{6,19}+4p_{6,51}+2p_{6,11}+p_{6,43}+5p_{6,27}+3p_{6,59}+4p_{6,7}+5p_{6,39} \\ &+5p_{6,23}+2p_{6,55}+4p_{6,15}+3p_{6,47}+6p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,52} = \frac{1}{2}p_{6,52} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,52}^2 - 4(p_{6,0}+3p_{6,32}+4p_{6,16}+3p_{6,48}+2p_{6,8}+5p_{6,40} \\ &+p_{6,24}+5p_{6,56}+6p_{6,4}+7p_{6,36}+p_{6,20}+3p_{6,12}+2p_{6,44}+3p_{6,28} \\ &+2p_{6,60}+3p_{5,2}+p_{6,18}+8p_{6,50}+5p_{6,10}+8p_{6,42}+7p_{6,26}+2p_{6,58} \\ &+3p_{6,6}+4p_{6,38}+3p_{6,22}+2p_{6,54}+3p_{5,14}+4p_{6,30}+5p_{6,62}+6p_{6,1} \\ &+2p_{6,33}+5p_{5,17}+5p_{6,9}+6p_{6,41}+p_{6,25}+5p_{6,57}+8p_{6,5}+7p_{6,37} \\ &+6p_{6,21}+3p_{6,53}+10p_{6,13}+4p_{6,45}+3p_{6,29}+6p_{6,61}+5p_{6,3}+4p_{6,35} \\ &+4p_{6,19}+3p_{6,51}+p_{6,11}+2p_{6,43}+3p_{6,27}+5p_{6,59}+5p_{6,7}+4p_{6,39} \\ &+2p_{6,23}+5p_{6,55}+3p_{6,15}+4p_{6,47}+6p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,116} = \frac{1}{2}p_{6,52} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,52}^2 - 4(p_{6,0}+3p_{6,32}+4p_{6,16}+3p_{6,48}+2p_{6,8}+5p_{6,40} \\ &+p_{6,24}+5p_{6,56}+6p_{6,4}+7p_{6,36}+p_{6,20}+3p_{6,12}+2p_{6,44}+3p_{6,28} \\ &+2p_{6,60}+3p_{5,2}+p_{6,18}+8p_{6,50}+5p_{6,10}+8p_{6,42}+7p_{6,26}+2p_{6,58} \\ &+3p_{6,6}+4p_{6,38}+3p_{6,22}+2p_{6,54}+3p_{5,14}+4p_{6,30}+5p_{6,62}+6p_{6,1} \\ &+2p_{6,33}+5p_{5,17}+5p_{6,9}+6p_{6,41}+p_{6,25}+5p_{6,57}+8p_{6,5}+7p_{6,37} \\ &+6p_{6,21}+3p_{6,53}+10p_{6,13}+4p_{6,45}+3p_{6,29}+6p_{6,61}+5p_{6,3}+4p_{6,35} \\ &+4p_{6,19}+3p_{6,51}+p_{6,11}+2p_{6,43}+3p_{6,27}+5p_{6,59}+5p_{6,7}+4p_{6,39} \\ &+2p_{6,23}+5p_{6,55}+3p_{6,15}+4p_{6,47}+6p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,12} = \frac{1}{2}p_{6,12} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,12}^2 - 4(5p_{6,0}+2p_{6,32}+5p_{6,16}+p_{6,48}+3p_{6,8}+4p_{6,40} \\ &+p_{6,24}+3p_{6,56}+2p_{6,4}+3p_{6,36}+2p_{6,20}+3p_{6,52}+p_{6,44}+6p_{6,28} \\ &+7p_{6,60}+8p_{6,2}+5p_{6,34}+2p_{6,18}+7p_{6,50}+8p_{6,10}+p_{6,42}+3p_{5,26} \\ &+3p_{5,6}+5p_{6,22}+4p_{6,54}+2p_{6,14}+3p_{6,46}+3p_{6,30}+4p_{6,62}+6p_{6,1} \\ &+5p_{6,33}+5p_{6,17}+p_{6,49}+5p_{5,9}+6p_{6,25}+2p_{6,57}+4p_{6,5}+10p_{6,37} \\ &+6p_{6,21}+3p_{6,53}+3p_{6,13}+6p_{6,45}+8p_{6,29}+7p_{6,61}+2p_{6,3}+p_{6,35} \\ &+5p_{6,19}+3p_{6,51}+3p_{6,11}+4p_{6,43}+5p_{6,27}+4p_{6,59}+4p_{6,7}+3p_{6,39} \\ &+6p_{5,23}+5p_{6,15}+2p_{6,47}+5p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,76} = \frac{1}{2}p_{6,12} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,12}^2 - 4(5p_{6,0}+2p_{6,32}+5p_{6,16}+p_{6,48}+3p_{6,8}+4p_{6,40} \\ &+p_{6,24}+3p_{6,56}+2p_{6,4}+3p_{6,36}+2p_{6,20}+3p_{6,52}+p_{6,44}+6p_{6,28} \\ &+7p_{6,60}+8p_{6,2}+5p_{6,34}+2p_{6,18}+7p_{6,50}+8p_{6,10}+p_{6,42}+3p_{5,26} \\ &+3p_{5,6}+5p_{6,22}+4p_{6,54}+2p_{6,14}+3p_{6,46}+3p_{6,30}+4p_{6,62}+6p_{6,1} \\ &+5p_{6,33}+5p_{6,17}+p_{6,49}+5p_{5,9}+6p_{6,25}+2p_{6,57}+4p_{6,5}+10p_{6,37} \\ &+6p_{6,21}+3p_{6,53}+3p_{6,13}+6p_{6,45}+8p_{6,29}+7p_{6,61}+2p_{6,3}+p_{6,35} \\ &+5p_{6,19}+3p_{6,51}+3p_{6,11}+4p_{6,43}+5p_{6,27}+4p_{6,59}+4p_{6,7}+3p_{6,39} \\ &+6p_{5,23}+5p_{6,15}+2p_{6,47}+5p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,44} = \frac{1}{2}p_{6,44} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,44}^2 - 4(2p_{6,0}+5p_{6,32}+p_{6,16}+5p_{6,48}+4p_{6,8}+3p_{6,40} \\ &+3p_{6,24}+p_{6,56}+3p_{6,4}+2p_{6,36}+3p_{6,20}+2p_{6,52}+p_{6,12}+7p_{6,28} \\ &+6p_{6,60}+5p_{6,2}+8p_{6,34}+7p_{6,18}+2p_{6,50}+p_{6,10}+8p_{6,42}+3p_{5,26} \\ &+3p_{5,6}+4p_{6,22}+5p_{6,54}+3p_{6,14}+2p_{6,46}+4p_{6,30}+3p_{6,62}+5p_{6,1} \\ &+6p_{6,33}+p_{6,17}+5p_{6,49}+5p_{5,9}+2p_{6,25}+6p_{6,57}+10p_{6,5}+4p_{6,37} \\ &+3p_{6,21}+6p_{6,53}+6p_{6,13}+3p_{6,45}+7p_{6,29}+8p_{6,61}+p_{6,3}+2p_{6,35} \\ &+3p_{6,19}+5p_{6,51}+4p_{6,11}+3p_{6,43}+4p_{6,27}+5p_{6,59}+3p_{6,7}+4p_{6,39} \\ &+6p_{5,23}+2p_{6,15}+5p_{6,47}+4p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,108} = \frac{1}{2}p_{6,44} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,44}^2 - 4(2p_{6,0}+5p_{6,32}+p_{6,16}+5p_{6,48}+4p_{6,8}+3p_{6,40} \\ &+3p_{6,24}+p_{6,56}+3p_{6,4}+2p_{6,36}+3p_{6,20}+2p_{6,52}+p_{6,12}+7p_{6,28} \\ &+6p_{6,60}+5p_{6,2}+8p_{6,34}+7p_{6,18}+2p_{6,50}+p_{6,10}+8p_{6,42}+3p_{5,26} \\ &+3p_{5,6}+4p_{6,22}+5p_{6,54}+3p_{6,14}+2p_{6,46}+4p_{6,30}+3p_{6,62}+5p_{6,1} \\ &+6p_{6,33}+p_{6,17}+5p_{6,49}+5p_{5,9}+2p_{6,25}+6p_{6,57}+10p_{6,5}+4p_{6,37} \\ &+3p_{6,21}+6p_{6,53}+6p_{6,13}+3p_{6,45}+7p_{6,29}+8p_{6,61}+p_{6,3}+2p_{6,35} \\ &+3p_{6,19}+5p_{6,51}+4p_{6,11}+3p_{6,43}+4p_{6,27}+5p_{6,59}+3p_{6,7}+4p_{6,39} \\ &+6p_{5,23}+2p_{6,15}+5p_{6,47}+4p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,28} = \frac{1}{2}p_{6,28} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,28}^2 - 4(p_{6,0}+5p_{6,32}+5p_{6,16}+2p_{6,48}+3p_{6,8}+p_{6,40} \\ &+3p_{6,24}+4p_{6,56}+3p_{6,4}+2p_{6,36}+2p_{6,20}+3p_{6,52}+7p_{6,12}+6p_{6,44} \\ &+p_{6,60}+7p_{6,2}+2p_{6,34}+8p_{6,18}+5p_{6,50}+3p_{5,10}+8p_{6,26}+p_{6,58} \\ &+4p_{6,6}+5p_{6,38}+3p_{5,22}+4p_{6,14}+3p_{6,46}+2p_{6,30}+3p_{6,62}+p_{6,1} \\ &+5p_{6,33}+6p_{6,17}+5p_{6,49}+2p_{6,9}+6p_{6,41}+5p_{5,25}+3p_{6,5}+6p_{6,37} \\ &+4p_{6,21}+10p_{6,53}+7p_{6,13}+8p_{6,45}+3p_{6,29}+6p_{6,61}+3p_{6,3}+5p_{6,35} \\ &+2p_{6,19}+p_{6,51}+4p_{6,11}+5p_{6,43}+3p_{6,27}+4p_{6,59}+6p_{5,7}+4p_{6,23} \\ &+3p_{6,55}+4p_{6,15}+5p_{6,47}+5p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,92} = \frac{1}{2}p_{6,28} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,28}^2 - 4(p_{6,0}+5p_{6,32}+5p_{6,16}+2p_{6,48}+3p_{6,8}+p_{6,40} \\ &+3p_{6,24}+4p_{6,56}+3p_{6,4}+2p_{6,36}+2p_{6,20}+3p_{6,52}+7p_{6,12}+6p_{6,44} \\ &+p_{6,60}+7p_{6,2}+2p_{6,34}+8p_{6,18}+5p_{6,50}+3p_{5,10}+8p_{6,26}+p_{6,58} \\ &+4p_{6,6}+5p_{6,38}+3p_{5,22}+4p_{6,14}+3p_{6,46}+2p_{6,30}+3p_{6,62}+p_{6,1} \\ &+5p_{6,33}+6p_{6,17}+5p_{6,49}+2p_{6,9}+6p_{6,41}+5p_{5,25}+3p_{6,5}+6p_{6,37} \\ &+4p_{6,21}+10p_{6,53}+7p_{6,13}+8p_{6,45}+3p_{6,29}+6p_{6,61}+3p_{6,3}+5p_{6,35} \\ &+2p_{6,19}+p_{6,51}+4p_{6,11}+5p_{6,43}+3p_{6,27}+4p_{6,59}+6p_{5,7}+4p_{6,23} \\ &+3p_{6,55}+4p_{6,15}+5p_{6,47}+5p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,60} = \frac{1}{2}p_{6,60} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,60}^2 - 4(5p_{6,0}+p_{6,32}+2p_{6,16}+5p_{6,48}+p_{6,8}+3p_{6,40} \\ &+4p_{6,24}+3p_{6,56}+2p_{6,4}+3p_{6,36}+3p_{6,20}+2p_{6,52}+6p_{6,12}+7p_{6,44} \\ &+p_{6,28}+2p_{6,2}+7p_{6,34}+5p_{6,18}+8p_{6,50}+3p_{5,10}+p_{6,26}+8p_{6,58} \\ &+5p_{6,6}+4p_{6,38}+3p_{5,22}+3p_{6,14}+4p_{6,46}+3p_{6,30}+2p_{6,62}+5p_{6,1} \\ &+p_{6,33}+5p_{6,17}+6p_{6,49}+6p_{6,9}+2p_{6,41}+5p_{5,25}+6p_{6,5}+3p_{6,37} \\ &+10p_{6,21}+4p_{6,53}+8p_{6,13}+7p_{6,45}+6p_{6,29}+3p_{6,61}+5p_{6,3}+3p_{6,35} \\ &+p_{6,19}+2p_{6,51}+5p_{6,11}+4p_{6,43}+4p_{6,27}+3p_{6,59}+6p_{5,7}+3p_{6,23} \\ &+4p_{6,55}+5p_{6,15}+4p_{6,47}+2p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,124} = \frac{1}{2}p_{6,60} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,60}^2 - 4(5p_{6,0}+p_{6,32}+2p_{6,16}+5p_{6,48}+p_{6,8}+3p_{6,40} \\ &+4p_{6,24}+3p_{6,56}+2p_{6,4}+3p_{6,36}+3p_{6,20}+2p_{6,52}+6p_{6,12}+7p_{6,44} \\ &+p_{6,28}+2p_{6,2}+7p_{6,34}+5p_{6,18}+8p_{6,50}+3p_{5,10}+p_{6,26}+8p_{6,58} \\ &+5p_{6,6}+4p_{6,38}+3p_{5,22}+3p_{6,14}+4p_{6,46}+3p_{6,30}+2p_{6,62}+5p_{6,1} \\ &+p_{6,33}+5p_{6,17}+6p_{6,49}+6p_{6,9}+2p_{6,41}+5p_{5,25}+6p_{6,5}+3p_{6,37} \\ &+10p_{6,21}+4p_{6,53}+8p_{6,13}+7p_{6,45}+6p_{6,29}+3p_{6,61}+5p_{6,3}+3p_{6,35} \\ &+p_{6,19}+2p_{6,51}+5p_{6,11}+4p_{6,43}+4p_{6,27}+3p_{6,59}+6p_{5,7}+3p_{6,23} \\ &+4p_{6,55}+5p_{6,15}+4p_{6,47}+2p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,2} = \frac{1}{2}p_{6,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,2}^2 - 4(8p_{6,0}+p_{6,32}+3p_{5,16}+2p_{6,8}+7p_{6,40}+5p_{6,24} \\ &+8p_{6,56}+2p_{6,4}+3p_{6,36}+3p_{6,20}+4p_{6,52}+5p_{6,12}+4p_{6,44}+3p_{5,28} \\ &+p_{6,34}+6p_{6,18}+7p_{6,50}+2p_{6,10}+3p_{6,42}+3p_{6,26}+2p_{6,58}+5p_{6,6} \\ &+p_{6,38}+2p_{6,22}+5p_{6,54}+p_{6,14}+3p_{6,46}+4p_{6,30}+3p_{6,62}+3p_{6,1} \\ &+4p_{6,33}+5p_{6,17}+4p_{6,49}+5p_{6,9}+3p_{6,41}+p_{6,25}+2p_{6,57}+5p_{6,5} \\ &+2p_{6,37}+5p_{6,21}+4p_{6,53}+6p_{5,13}+3p_{6,29}+4p_{6,61}+3p_{6,3}+6p_{6,35} \\ &+8p_{6,19}+7p_{6,51}+6p_{6,11}+3p_{6,43}+10p_{6,27}+4p_{6,59}+5p_{6,7}+p_{6,39} \\ &+5p_{6,23}+6p_{6,55}+6p_{6,15}+2p_{6,47}+5p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,66} = \frac{1}{2}p_{6,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,2}^2 - 4(8p_{6,0}+p_{6,32}+3p_{5,16}+2p_{6,8}+7p_{6,40}+5p_{6,24} \\ &+8p_{6,56}+2p_{6,4}+3p_{6,36}+3p_{6,20}+4p_{6,52}+5p_{6,12}+4p_{6,44}+3p_{5,28} \\ &+p_{6,34}+6p_{6,18}+7p_{6,50}+2p_{6,10}+3p_{6,42}+3p_{6,26}+2p_{6,58}+5p_{6,6} \\ &+p_{6,38}+2p_{6,22}+5p_{6,54}+p_{6,14}+3p_{6,46}+4p_{6,30}+3p_{6,62}+3p_{6,1} \\ &+4p_{6,33}+5p_{6,17}+4p_{6,49}+5p_{6,9}+3p_{6,41}+p_{6,25}+2p_{6,57}+5p_{6,5} \\ &+2p_{6,37}+5p_{6,21}+4p_{6,53}+6p_{5,13}+3p_{6,29}+4p_{6,61}+3p_{6,3}+6p_{6,35} \\ &+8p_{6,19}+7p_{6,51}+6p_{6,11}+3p_{6,43}+10p_{6,27}+4p_{6,59}+5p_{6,7}+p_{6,39} \\ &+5p_{6,23}+6p_{6,55}+6p_{6,15}+2p_{6,47}+5p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,34} = \frac{1}{2}p_{6,34} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,34}^2 - 4(p_{6,0}+8p_{6,32}+3p_{5,16}+7p_{6,8}+2p_{6,40}+8p_{6,24} \\ &+5p_{6,56}+3p_{6,4}+2p_{6,36}+4p_{6,20}+3p_{6,52}+4p_{6,12}+5p_{6,44}+3p_{5,28} \\ &+p_{6,2}+7p_{6,18}+6p_{6,50}+3p_{6,10}+2p_{6,42}+2p_{6,26}+3p_{6,58}+p_{6,6} \\ &+5p_{6,38}+5p_{6,22}+2p_{6,54}+3p_{6,14}+p_{6,46}+3p_{6,30}+4p_{6,62}+4p_{6,1} \\ &+3p_{6,33}+4p_{6,17}+5p_{6,49}+3p_{6,9}+5p_{6,41}+2p_{6,25}+p_{6,57}+2p_{6,5} \\ &+5p_{6,37}+4p_{6,21}+5p_{6,53}+6p_{5,13}+4p_{6,29}+3p_{6,61}+6p_{6,3}+3p_{6,35} \\ &+7p_{6,19}+8p_{6,51}+3p_{6,11}+6p_{6,43}+4p_{6,27}+10p_{6,59}+p_{6,7}+5p_{6,39} \\ &+6p_{6,23}+5p_{6,55}+2p_{6,15}+6p_{6,47}+5p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,98} = \frac{1}{2}p_{6,34} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,34}^2 - 4(p_{6,0}+8p_{6,32}+3p_{5,16}+7p_{6,8}+2p_{6,40}+8p_{6,24} \\ &+5p_{6,56}+3p_{6,4}+2p_{6,36}+4p_{6,20}+3p_{6,52}+4p_{6,12}+5p_{6,44}+3p_{5,28} \\ &+p_{6,2}+7p_{6,18}+6p_{6,50}+3p_{6,10}+2p_{6,42}+2p_{6,26}+3p_{6,58}+p_{6,6} \\ &+5p_{6,38}+5p_{6,22}+2p_{6,54}+3p_{6,14}+p_{6,46}+3p_{6,30}+4p_{6,62}+4p_{6,1} \\ &+3p_{6,33}+4p_{6,17}+5p_{6,49}+3p_{6,9}+5p_{6,41}+2p_{6,25}+p_{6,57}+2p_{6,5} \\ &+5p_{6,37}+4p_{6,21}+5p_{6,53}+6p_{5,13}+4p_{6,29}+3p_{6,61}+6p_{6,3}+3p_{6,35} \\ &+7p_{6,19}+8p_{6,51}+3p_{6,11}+6p_{6,43}+4p_{6,27}+10p_{6,59}+p_{6,7}+5p_{6,39} \\ &+6p_{6,23}+5p_{6,55}+2p_{6,15}+6p_{6,47}+5p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,18} = \frac{1}{2}p_{6,18} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,18}^2 - 4(3p_{5,0}+8p_{6,16}+p_{6,48}+8p_{6,8}+5p_{6,40}+2p_{6,24} \\ &+7p_{6,56}+4p_{6,4}+3p_{6,36}+2p_{6,20}+3p_{6,52}+3p_{5,12}+5p_{6,28}+4p_{6,60} \\ &+7p_{6,2}+6p_{6,34}+p_{6,50}+2p_{6,10}+3p_{6,42}+2p_{6,26}+3p_{6,58}+5p_{6,6} \\ &+2p_{6,38}+5p_{6,22}+p_{6,54}+3p_{6,14}+4p_{6,46}+p_{6,30}+3p_{6,62}+4p_{6,1} \\ &+5p_{6,33}+3p_{6,17}+4p_{6,49}+2p_{6,9}+p_{6,41}+5p_{6,25}+3p_{6,57}+4p_{6,5} \\ &+5p_{6,37}+5p_{6,21}+2p_{6,53}+4p_{6,13}+3p_{6,45}+6p_{5,29}+7p_{6,3}+8p_{6,35} \\ &+3p_{6,19}+6p_{6,51}+4p_{6,11}+10p_{6,43}+6p_{6,27}+3p_{6,59}+6p_{6,7}+5p_{6,39} \\ &+5p_{6,23}+p_{6,55}+5p_{5,15}+6p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,82} = \frac{1}{2}p_{6,18} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,18}^2 - 4(3p_{5,0}+8p_{6,16}+p_{6,48}+8p_{6,8}+5p_{6,40}+2p_{6,24} \\ &+7p_{6,56}+4p_{6,4}+3p_{6,36}+2p_{6,20}+3p_{6,52}+3p_{5,12}+5p_{6,28}+4p_{6,60} \\ &+7p_{6,2}+6p_{6,34}+p_{6,50}+2p_{6,10}+3p_{6,42}+2p_{6,26}+3p_{6,58}+5p_{6,6} \\ &+2p_{6,38}+5p_{6,22}+p_{6,54}+3p_{6,14}+4p_{6,46}+p_{6,30}+3p_{6,62}+4p_{6,1} \\ &+5p_{6,33}+3p_{6,17}+4p_{6,49}+2p_{6,9}+p_{6,41}+5p_{6,25}+3p_{6,57}+4p_{6,5} \\ &+5p_{6,37}+5p_{6,21}+2p_{6,53}+4p_{6,13}+3p_{6,45}+6p_{5,29}+7p_{6,3}+8p_{6,35} \\ &+3p_{6,19}+6p_{6,51}+4p_{6,11}+10p_{6,43}+6p_{6,27}+3p_{6,59}+6p_{6,7}+5p_{6,39} \\ &+5p_{6,23}+p_{6,55}+5p_{5,15}+6p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,50} = \frac{1}{2}p_{6,50} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,50}^2 - 4(3p_{5,0}+p_{6,16}+8p_{6,48}+5p_{6,8}+8p_{6,40}+7p_{6,24} \\ &+2p_{6,56}+3p_{6,4}+4p_{6,36}+3p_{6,20}+2p_{6,52}+3p_{5,12}+4p_{6,28}+5p_{6,60} \\ &+6p_{6,2}+7p_{6,34}+p_{6,18}+3p_{6,10}+2p_{6,42}+3p_{6,26}+2p_{6,58}+2p_{6,6} \\ &+5p_{6,38}+p_{6,22}+5p_{6,54}+4p_{6,14}+3p_{6,46}+3p_{6,30}+p_{6,62}+5p_{6,1} \\ &+4p_{6,33}+4p_{6,17}+3p_{6,49}+p_{6,9}+2p_{6,41}+3p_{6,25}+5p_{6,57}+5p_{6,5} \\ &+4p_{6,37}+2p_{6,21}+5p_{6,53}+3p_{6,13}+4p_{6,45}+6p_{5,29}+8p_{6,3}+7p_{6,35} \\ &+6p_{6,19}+3p_{6,51}+10p_{6,11}+4p_{6,43}+3p_{6,27}+6p_{6,59}+5p_{6,7}+6p_{6,39} \\ &+p_{6,23}+5p_{6,55}+5p_{5,15}+2p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,114} = \frac{1}{2}p_{6,50} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,50}^2 - 4(3p_{5,0}+p_{6,16}+8p_{6,48}+5p_{6,8}+8p_{6,40}+7p_{6,24} \\ &+2p_{6,56}+3p_{6,4}+4p_{6,36}+3p_{6,20}+2p_{6,52}+3p_{5,12}+4p_{6,28}+5p_{6,60} \\ &+6p_{6,2}+7p_{6,34}+p_{6,18}+3p_{6,10}+2p_{6,42}+3p_{6,26}+2p_{6,58}+2p_{6,6} \\ &+5p_{6,38}+p_{6,22}+5p_{6,54}+4p_{6,14}+3p_{6,46}+3p_{6,30}+p_{6,62}+5p_{6,1} \\ &+4p_{6,33}+4p_{6,17}+3p_{6,49}+p_{6,9}+2p_{6,41}+3p_{6,25}+5p_{6,57}+5p_{6,5} \\ &+4p_{6,37}+2p_{6,21}+5p_{6,53}+3p_{6,13}+4p_{6,45}+6p_{5,29}+8p_{6,3}+7p_{6,35} \\ &+6p_{6,19}+3p_{6,51}+10p_{6,11}+4p_{6,43}+3p_{6,27}+6p_{6,59}+5p_{6,7}+6p_{6,39} \\ &+p_{6,23}+5p_{6,55}+5p_{5,15}+2p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,10} = \frac{1}{2}p_{6,10} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,10}^2 - 4(8p_{6,0}+5p_{6,32}+2p_{6,16}+7p_{6,48}+8p_{6,8}+p_{6,40} \\ &+3p_{5,24}+3p_{5,4}+5p_{6,20}+4p_{6,52}+2p_{6,12}+3p_{6,44}+3p_{6,28}+4p_{6,60} \\ &+2p_{6,2}+3p_{6,34}+2p_{6,18}+3p_{6,50}+p_{6,42}+6p_{6,26}+7p_{6,58}+3p_{6,6} \\ &+4p_{6,38}+p_{6,22}+3p_{6,54}+5p_{6,14}+p_{6,46}+2p_{6,30}+5p_{6,62}+2p_{6,1} \\ &+p_{6,33}+5p_{6,17}+3p_{6,49}+3p_{6,9}+4p_{6,41}+5p_{6,25}+4p_{6,57}+4p_{6,5} \\ &+3p_{6,37}+6p_{5,21}+5p_{6,13}+2p_{6,45}+5p_{6,29}+4p_{6,61}+4p_{6,3}+10p_{6,35} \\ &+6p_{6,19}+3p_{6,51}+3p_{6,11}+6p_{6,43}+8p_{6,27}+7p_{6,59}+5p_{5,7}+6p_{6,23} \\ &+2p_{6,55}+5p_{6,15}+p_{6,47}+5p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,74} = \frac{1}{2}p_{6,10} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,10}^2 - 4(8p_{6,0}+5p_{6,32}+2p_{6,16}+7p_{6,48}+8p_{6,8}+p_{6,40} \\ &+3p_{5,24}+3p_{5,4}+5p_{6,20}+4p_{6,52}+2p_{6,12}+3p_{6,44}+3p_{6,28}+4p_{6,60} \\ &+2p_{6,2}+3p_{6,34}+2p_{6,18}+3p_{6,50}+p_{6,42}+6p_{6,26}+7p_{6,58}+3p_{6,6} \\ &+4p_{6,38}+p_{6,22}+3p_{6,54}+5p_{6,14}+p_{6,46}+2p_{6,30}+5p_{6,62}+2p_{6,1} \\ &+p_{6,33}+5p_{6,17}+3p_{6,49}+3p_{6,9}+4p_{6,41}+5p_{6,25}+4p_{6,57}+4p_{6,5} \\ &+3p_{6,37}+6p_{5,21}+5p_{6,13}+2p_{6,45}+5p_{6,29}+4p_{6,61}+4p_{6,3}+10p_{6,35} \\ &+6p_{6,19}+3p_{6,51}+3p_{6,11}+6p_{6,43}+8p_{6,27}+7p_{6,59}+5p_{5,7}+6p_{6,23} \\ &+2p_{6,55}+5p_{6,15}+p_{6,47}+5p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,42} = \frac{1}{2}p_{6,42} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,42}^2 - 4(5p_{6,0}+8p_{6,32}+7p_{6,16}+2p_{6,48}+p_{6,8}+8p_{6,40} \\ &+3p_{5,24}+3p_{5,4}+4p_{6,20}+5p_{6,52}+3p_{6,12}+2p_{6,44}+4p_{6,28}+3p_{6,60} \\ &+3p_{6,2}+2p_{6,34}+3p_{6,18}+2p_{6,50}+p_{6,10}+7p_{6,26}+6p_{6,58}+4p_{6,6} \\ &+3p_{6,38}+3p_{6,22}+p_{6,54}+p_{6,14}+5p_{6,46}+5p_{6,30}+2p_{6,62}+p_{6,1} \\ &+2p_{6,33}+3p_{6,17}+5p_{6,49}+4p_{6,9}+3p_{6,41}+4p_{6,25}+5p_{6,57}+3p_{6,5} \\ &+4p_{6,37}+6p_{5,21}+2p_{6,13}+5p_{6,45}+4p_{6,29}+5p_{6,61}+10p_{6,3}+4p_{6,35} \\ &+3p_{6,19}+6p_{6,51}+6p_{6,11}+3p_{6,43}+7p_{6,27}+8p_{6,59}+5p_{5,7}+2p_{6,23} \\ &+6p_{6,55}+p_{6,15}+5p_{6,47}+6p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,106} = \frac{1}{2}p_{6,42} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,42}^2 - 4(5p_{6,0}+8p_{6,32}+7p_{6,16}+2p_{6,48}+p_{6,8}+8p_{6,40} \\ &+3p_{5,24}+3p_{5,4}+4p_{6,20}+5p_{6,52}+3p_{6,12}+2p_{6,44}+4p_{6,28}+3p_{6,60} \\ &+3p_{6,2}+2p_{6,34}+3p_{6,18}+2p_{6,50}+p_{6,10}+7p_{6,26}+6p_{6,58}+4p_{6,6} \\ &+3p_{6,38}+3p_{6,22}+p_{6,54}+p_{6,14}+5p_{6,46}+5p_{6,30}+2p_{6,62}+p_{6,1} \\ &+2p_{6,33}+3p_{6,17}+5p_{6,49}+4p_{6,9}+3p_{6,41}+4p_{6,25}+5p_{6,57}+3p_{6,5} \\ &+4p_{6,37}+6p_{5,21}+2p_{6,13}+5p_{6,45}+4p_{6,29}+5p_{6,61}+10p_{6,3}+4p_{6,35} \\ &+3p_{6,19}+6p_{6,51}+6p_{6,11}+3p_{6,43}+7p_{6,27}+8p_{6,59}+5p_{5,7}+2p_{6,23} \\ &+6p_{6,55}+p_{6,15}+5p_{6,47}+6p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,26} = \frac{1}{2}p_{6,26} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,26}^2 - 4(7p_{6,0}+2p_{6,32}+8p_{6,16}+5p_{6,48}+3p_{5,8}+8p_{6,24} \\ &+p_{6,56}+4p_{6,4}+5p_{6,36}+3p_{5,20}+4p_{6,12}+3p_{6,44}+2p_{6,28}+3p_{6,60} \\ &+3p_{6,2}+2p_{6,34}+2p_{6,18}+3p_{6,50}+7p_{6,10}+6p_{6,42}+p_{6,58}+3p_{6,6} \\ &+p_{6,38}+3p_{6,22}+4p_{6,54}+5p_{6,14}+2p_{6,46}+5p_{6,30}+p_{6,62}+3p_{6,1} \\ &+5p_{6,33}+2p_{6,17}+p_{6,49}+4p_{6,9}+5p_{6,41}+3p_{6,25}+4p_{6,57}+6p_{5,5} \\ &+4p_{6,21}+3p_{6,53}+4p_{6,13}+5p_{6,45}+5p_{6,29}+2p_{6,61}+3p_{6,3}+6p_{6,35} \\ &+4p_{6,19}+10p_{6,51}+7p_{6,11}+8p_{6,43}+3p_{6,27}+6p_{6,59}+2p_{6,7}+6p_{6,39} \\ &+5p_{5,23}+6p_{6,15}+5p_{6,47}+5p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,90} = \frac{1}{2}p_{6,26} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,26}^2 - 4(7p_{6,0}+2p_{6,32}+8p_{6,16}+5p_{6,48}+3p_{5,8}+8p_{6,24} \\ &+p_{6,56}+4p_{6,4}+5p_{6,36}+3p_{5,20}+4p_{6,12}+3p_{6,44}+2p_{6,28}+3p_{6,60} \\ &+3p_{6,2}+2p_{6,34}+2p_{6,18}+3p_{6,50}+7p_{6,10}+6p_{6,42}+p_{6,58}+3p_{6,6} \\ &+p_{6,38}+3p_{6,22}+4p_{6,54}+5p_{6,14}+2p_{6,46}+5p_{6,30}+p_{6,62}+3p_{6,1} \\ &+5p_{6,33}+2p_{6,17}+p_{6,49}+4p_{6,9}+5p_{6,41}+3p_{6,25}+4p_{6,57}+6p_{5,5} \\ &+4p_{6,21}+3p_{6,53}+4p_{6,13}+5p_{6,45}+5p_{6,29}+2p_{6,61}+3p_{6,3}+6p_{6,35} \\ &+4p_{6,19}+10p_{6,51}+7p_{6,11}+8p_{6,43}+3p_{6,27}+6p_{6,59}+2p_{6,7}+6p_{6,39} \\ &+5p_{5,23}+6p_{6,15}+5p_{6,47}+5p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,58} = \frac{1}{2}p_{6,58} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,58}^2 - 4(2p_{6,0}+7p_{6,32}+5p_{6,16}+8p_{6,48}+3p_{5,8}+p_{6,24} \\ &+8p_{6,56}+5p_{6,4}+4p_{6,36}+3p_{5,20}+3p_{6,12}+4p_{6,44}+3p_{6,28}+2p_{6,60} \\ &+2p_{6,2}+3p_{6,34}+3p_{6,18}+2p_{6,50}+6p_{6,10}+7p_{6,42}+p_{6,26}+p_{6,6} \\ &+3p_{6,38}+4p_{6,22}+3p_{6,54}+2p_{6,14}+5p_{6,46}+p_{6,30}+5p_{6,62}+5p_{6,1} \\ &+3p_{6,33}+p_{6,17}+2p_{6,49}+5p_{6,9}+4p_{6,41}+4p_{6,25}+3p_{6,57}+6p_{5,5} \\ &+3p_{6,21}+4p_{6,53}+5p_{6,13}+4p_{6,45}+2p_{6,29}+5p_{6,61}+6p_{6,3}+3p_{6,35} \\ &+10p_{6,19}+4p_{6,51}+8p_{6,11}+7p_{6,43}+6p_{6,27}+3p_{6,59}+6p_{6,7}+2p_{6,39} \\ &+5p_{5,23}+5p_{6,15}+6p_{6,47}+p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,122} = \frac{1}{2}p_{6,58} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,58}^2 - 4(2p_{6,0}+7p_{6,32}+5p_{6,16}+8p_{6,48}+3p_{5,8}+p_{6,24} \\ &+8p_{6,56}+5p_{6,4}+4p_{6,36}+3p_{5,20}+3p_{6,12}+4p_{6,44}+3p_{6,28}+2p_{6,60} \\ &+2p_{6,2}+3p_{6,34}+3p_{6,18}+2p_{6,50}+6p_{6,10}+7p_{6,42}+p_{6,26}+p_{6,6} \\ &+3p_{6,38}+4p_{6,22}+3p_{6,54}+2p_{6,14}+5p_{6,46}+p_{6,30}+5p_{6,62}+5p_{6,1} \\ &+3p_{6,33}+p_{6,17}+2p_{6,49}+5p_{6,9}+4p_{6,41}+4p_{6,25}+3p_{6,57}+6p_{5,5} \\ &+3p_{6,21}+4p_{6,53}+5p_{6,13}+4p_{6,45}+2p_{6,29}+5p_{6,61}+6p_{6,3}+3p_{6,35} \\ &+10p_{6,19}+4p_{6,51}+8p_{6,11}+7p_{6,43}+6p_{6,27}+3p_{6,59}+6p_{6,7}+2p_{6,39} \\ &+5p_{5,23}+5p_{6,15}+6p_{6,47}+p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,6} = \frac{1}{2}p_{6,6} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,6}^2 - 4(3p_{5,0}+5p_{6,16}+4p_{6,48}+2p_{6,8}+3p_{6,40}+3p_{6,24} \\ &+4p_{6,56}+8p_{6,4}+p_{6,36}+3p_{5,20}+2p_{6,12}+7p_{6,44}+5p_{6,28}+8p_{6,60} \\ &+3p_{6,2}+4p_{6,34}+p_{6,18}+3p_{6,50}+5p_{6,10}+p_{6,42}+2p_{6,26}+5p_{6,58} \\ &+p_{6,38}+6p_{6,22}+7p_{6,54}+2p_{6,14}+3p_{6,46}+3p_{6,30}+2p_{6,62}+4p_{6,1} \\ &+3p_{6,33}+6p_{5,17}+5p_{6,9}+2p_{6,41}+5p_{6,25}+4p_{6,57}+3p_{6,5}+4p_{6,37} \\ &+5p_{6,21}+4p_{6,53}+5p_{6,13}+3p_{6,45}+p_{6,29}+2p_{6,61}+5p_{5,3}+6p_{6,19} \\ &+2p_{6,51}+5p_{6,11}+p_{6,43}+5p_{6,27}+6p_{6,59}+3p_{6,7}+6p_{6,39}+8p_{6,23} \\ &+7p_{6,55}+6p_{6,15}+3p_{6,47}+10p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,70} = \frac{1}{2}p_{6,6} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,6}^2 - 4(3p_{5,0}+5p_{6,16}+4p_{6,48}+2p_{6,8}+3p_{6,40}+3p_{6,24} \\ &+4p_{6,56}+8p_{6,4}+p_{6,36}+3p_{5,20}+2p_{6,12}+7p_{6,44}+5p_{6,28}+8p_{6,60} \\ &+3p_{6,2}+4p_{6,34}+p_{6,18}+3p_{6,50}+5p_{6,10}+p_{6,42}+2p_{6,26}+5p_{6,58} \\ &+p_{6,38}+6p_{6,22}+7p_{6,54}+2p_{6,14}+3p_{6,46}+3p_{6,30}+2p_{6,62}+4p_{6,1} \\ &+3p_{6,33}+6p_{5,17}+5p_{6,9}+2p_{6,41}+5p_{6,25}+4p_{6,57}+3p_{6,5}+4p_{6,37} \\ &+5p_{6,21}+4p_{6,53}+5p_{6,13}+3p_{6,45}+p_{6,29}+2p_{6,61}+5p_{5,3}+6p_{6,19} \\ &+2p_{6,51}+5p_{6,11}+p_{6,43}+5p_{6,27}+6p_{6,59}+3p_{6,7}+6p_{6,39}+8p_{6,23} \\ &+7p_{6,55}+6p_{6,15}+3p_{6,47}+10p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,38} = \frac{1}{2}p_{6,38} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,38}^2 - 4(3p_{5,0}+4p_{6,16}+5p_{6,48}+3p_{6,8}+2p_{6,40}+4p_{6,24} \\ &+3p_{6,56}+p_{6,4}+8p_{6,36}+3p_{5,20}+7p_{6,12}+2p_{6,44}+8p_{6,28}+5p_{6,60} \\ &+4p_{6,2}+3p_{6,34}+3p_{6,18}+p_{6,50}+p_{6,10}+5p_{6,42}+5p_{6,26}+2p_{6,58} \\ &+p_{6,6}+7p_{6,22}+6p_{6,54}+3p_{6,14}+2p_{6,46}+2p_{6,30}+3p_{6,62}+3p_{6,1} \\ &+4p_{6,33}+6p_{5,17}+2p_{6,9}+5p_{6,41}+4p_{6,25}+5p_{6,57}+4p_{6,5}+3p_{6,37} \\ &+4p_{6,21}+5p_{6,53}+3p_{6,13}+5p_{6,45}+2p_{6,29}+p_{6,61}+5p_{5,3}+2p_{6,19} \\ &+6p_{6,51}+p_{6,11}+5p_{6,43}+6p_{6,27}+5p_{6,59}+6p_{6,7}+3p_{6,39}+7p_{6,23} \\ &+8p_{6,55}+3p_{6,15}+6p_{6,47}+4p_{6,31}+10p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,102} = \frac{1}{2}p_{6,38} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,38}^2 - 4(3p_{5,0}+4p_{6,16}+5p_{6,48}+3p_{6,8}+2p_{6,40}+4p_{6,24} \\ &+3p_{6,56}+p_{6,4}+8p_{6,36}+3p_{5,20}+7p_{6,12}+2p_{6,44}+8p_{6,28}+5p_{6,60} \\ &+4p_{6,2}+3p_{6,34}+3p_{6,18}+p_{6,50}+p_{6,10}+5p_{6,42}+5p_{6,26}+2p_{6,58} \\ &+p_{6,6}+7p_{6,22}+6p_{6,54}+3p_{6,14}+2p_{6,46}+2p_{6,30}+3p_{6,62}+3p_{6,1} \\ &+4p_{6,33}+6p_{5,17}+2p_{6,9}+5p_{6,41}+4p_{6,25}+5p_{6,57}+4p_{6,5}+3p_{6,37} \\ &+4p_{6,21}+5p_{6,53}+3p_{6,13}+5p_{6,45}+2p_{6,29}+p_{6,61}+5p_{5,3}+2p_{6,19} \\ &+6p_{6,51}+p_{6,11}+5p_{6,43}+6p_{6,27}+5p_{6,59}+6p_{6,7}+3p_{6,39}+7p_{6,23} \\ &+8p_{6,55}+3p_{6,15}+6p_{6,47}+4p_{6,31}+10p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,22} = \frac{1}{2}p_{6,22} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,22}^2 - 4(4p_{6,0}+5p_{6,32}+3p_{5,16}+4p_{6,8}+3p_{6,40}+2p_{6,24} \\ &+3p_{6,56}+3p_{5,4}+8p_{6,20}+p_{6,52}+8p_{6,12}+5p_{6,44}+2p_{6,28}+7p_{6,60} \\ &+3p_{6,2}+p_{6,34}+3p_{6,18}+4p_{6,50}+5p_{6,10}+2p_{6,42}+5p_{6,26}+p_{6,58} \\ &+7p_{6,6}+6p_{6,38}+p_{6,54}+2p_{6,14}+3p_{6,46}+2p_{6,30}+3p_{6,62}+6p_{5,1} \\ &+4p_{6,17}+3p_{6,49}+4p_{6,9}+5p_{6,41}+5p_{6,25}+2p_{6,57}+4p_{6,5}+5p_{6,37} \\ &+3p_{6,21}+4p_{6,53}+2p_{6,13}+p_{6,45}+5p_{6,29}+3p_{6,61}+2p_{6,3}+6p_{6,35} \\ &+5p_{5,19}+6p_{6,11}+5p_{6,43}+5p_{6,27}+p_{6,59}+7p_{6,7}+8p_{6,39}+3p_{6,23} \\ &+6p_{6,55}+4p_{6,15}+10p_{6,47}+6p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,86} = \frac{1}{2}p_{6,22} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,22}^2 - 4(4p_{6,0}+5p_{6,32}+3p_{5,16}+4p_{6,8}+3p_{6,40}+2p_{6,24} \\ &+3p_{6,56}+3p_{5,4}+8p_{6,20}+p_{6,52}+8p_{6,12}+5p_{6,44}+2p_{6,28}+7p_{6,60} \\ &+3p_{6,2}+p_{6,34}+3p_{6,18}+4p_{6,50}+5p_{6,10}+2p_{6,42}+5p_{6,26}+p_{6,58} \\ &+7p_{6,6}+6p_{6,38}+p_{6,54}+2p_{6,14}+3p_{6,46}+2p_{6,30}+3p_{6,62}+6p_{5,1} \\ &+4p_{6,17}+3p_{6,49}+4p_{6,9}+5p_{6,41}+5p_{6,25}+2p_{6,57}+4p_{6,5}+5p_{6,37} \\ &+3p_{6,21}+4p_{6,53}+2p_{6,13}+p_{6,45}+5p_{6,29}+3p_{6,61}+2p_{6,3}+6p_{6,35} \\ &+5p_{5,19}+6p_{6,11}+5p_{6,43}+5p_{6,27}+p_{6,59}+7p_{6,7}+8p_{6,39}+3p_{6,23} \\ &+6p_{6,55}+4p_{6,15}+10p_{6,47}+6p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,54} = \frac{1}{2}p_{6,54} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,54}^2 - 4(5p_{6,0}+4p_{6,32}+3p_{5,16}+3p_{6,8}+4p_{6,40}+3p_{6,24} \\ &+2p_{6,56}+3p_{5,4}+p_{6,20}+8p_{6,52}+5p_{6,12}+8p_{6,44}+7p_{6,28}+2p_{6,60} \\ &+p_{6,2}+3p_{6,34}+4p_{6,18}+3p_{6,50}+2p_{6,10}+5p_{6,42}+p_{6,26}+5p_{6,58} \\ &+6p_{6,6}+7p_{6,38}+p_{6,22}+3p_{6,14}+2p_{6,46}+3p_{6,30}+2p_{6,62}+6p_{5,1} \\ &+3p_{6,17}+4p_{6,49}+5p_{6,9}+4p_{6,41}+2p_{6,25}+5p_{6,57}+5p_{6,5}+4p_{6,37} \\ &+4p_{6,21}+3p_{6,53}+p_{6,13}+2p_{6,45}+3p_{6,29}+5p_{6,61}+6p_{6,3}+2p_{6,35} \\ &+5p_{5,19}+5p_{6,11}+6p_{6,43}+p_{6,27}+5p_{6,59}+8p_{6,7}+7p_{6,39}+6p_{6,23} \\ &+3p_{6,55}+10p_{6,15}+4p_{6,47}+3p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,118} = \frac{1}{2}p_{6,54} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,54}^2 - 4(5p_{6,0}+4p_{6,32}+3p_{5,16}+3p_{6,8}+4p_{6,40}+3p_{6,24} \\ &+2p_{6,56}+3p_{5,4}+p_{6,20}+8p_{6,52}+5p_{6,12}+8p_{6,44}+7p_{6,28}+2p_{6,60} \\ &+p_{6,2}+3p_{6,34}+4p_{6,18}+3p_{6,50}+2p_{6,10}+5p_{6,42}+p_{6,26}+5p_{6,58} \\ &+6p_{6,6}+7p_{6,38}+p_{6,22}+3p_{6,14}+2p_{6,46}+3p_{6,30}+2p_{6,62}+6p_{5,1} \\ &+3p_{6,17}+4p_{6,49}+5p_{6,9}+4p_{6,41}+2p_{6,25}+5p_{6,57}+5p_{6,5}+4p_{6,37} \\ &+4p_{6,21}+3p_{6,53}+p_{6,13}+2p_{6,45}+3p_{6,29}+5p_{6,61}+6p_{6,3}+2p_{6,35} \\ &+5p_{5,19}+5p_{6,11}+6p_{6,43}+p_{6,27}+5p_{6,59}+8p_{6,7}+7p_{6,39}+6p_{6,23} \\ &+3p_{6,55}+10p_{6,15}+4p_{6,47}+3p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,14} = \frac{1}{2}p_{6,14} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,14}^2 - 4(4p_{6,0}+3p_{6,32}+2p_{6,16}+3p_{6,48}+3p_{5,8}+5p_{6,24} \\ &+4p_{6,56}+8p_{6,4}+5p_{6,36}+2p_{6,20}+7p_{6,52}+8p_{6,12}+p_{6,44}+3p_{5,28} \\ &+5p_{6,2}+2p_{6,34}+5p_{6,18}+p_{6,50}+3p_{6,10}+4p_{6,42}+p_{6,26}+3p_{6,58} \\ &+2p_{6,6}+3p_{6,38}+2p_{6,22}+3p_{6,54}+p_{6,46}+6p_{6,30}+7p_{6,62}+4p_{6,1} \\ &+5p_{6,33}+5p_{6,17}+2p_{6,49}+4p_{6,9}+3p_{6,41}+6p_{5,25}+2p_{6,5}+p_{6,37} \\ &+5p_{6,21}+3p_{6,53}+3p_{6,13}+4p_{6,45}+5p_{6,29}+4p_{6,61}+6p_{6,3}+5p_{6,35} \\ &+5p_{6,19}+p_{6,51}+5p_{5,11}+6p_{6,27}+2p_{6,59}+4p_{6,7}+10p_{6,39}+6p_{6,23} \\ &+3p_{6,55}+3p_{6,15}+6p_{6,47}+8p_{6,31}+7p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,78} = \frac{1}{2}p_{6,14} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,14}^2 - 4(4p_{6,0}+3p_{6,32}+2p_{6,16}+3p_{6,48}+3p_{5,8}+5p_{6,24} \\ &+4p_{6,56}+8p_{6,4}+5p_{6,36}+2p_{6,20}+7p_{6,52}+8p_{6,12}+p_{6,44}+3p_{5,28} \\ &+5p_{6,2}+2p_{6,34}+5p_{6,18}+p_{6,50}+3p_{6,10}+4p_{6,42}+p_{6,26}+3p_{6,58} \\ &+2p_{6,6}+3p_{6,38}+2p_{6,22}+3p_{6,54}+p_{6,46}+6p_{6,30}+7p_{6,62}+4p_{6,1} \\ &+5p_{6,33}+5p_{6,17}+2p_{6,49}+4p_{6,9}+3p_{6,41}+6p_{5,25}+2p_{6,5}+p_{6,37} \\ &+5p_{6,21}+3p_{6,53}+3p_{6,13}+4p_{6,45}+5p_{6,29}+4p_{6,61}+6p_{6,3}+5p_{6,35} \\ &+5p_{6,19}+p_{6,51}+5p_{5,11}+6p_{6,27}+2p_{6,59}+4p_{6,7}+10p_{6,39}+6p_{6,23} \\ &+3p_{6,55}+3p_{6,15}+6p_{6,47}+8p_{6,31}+7p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,46} = \frac{1}{2}p_{6,46} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,46}^2 - 4(3p_{6,0}+4p_{6,32}+3p_{6,16}+2p_{6,48}+3p_{5,8}+4p_{6,24} \\ &+5p_{6,56}+5p_{6,4}+8p_{6,36}+7p_{6,20}+2p_{6,52}+p_{6,12}+8p_{6,44}+3p_{5,28} \\ &+2p_{6,2}+5p_{6,34}+p_{6,18}+5p_{6,50}+4p_{6,10}+3p_{6,42}+3p_{6,26}+p_{6,58} \\ &+3p_{6,6}+2p_{6,38}+3p_{6,22}+2p_{6,54}+p_{6,14}+7p_{6,30}+6p_{6,62}+5p_{6,1} \\ &+4p_{6,33}+2p_{6,17}+5p_{6,49}+3p_{6,9}+4p_{6,41}+6p_{5,25}+p_{6,5}+2p_{6,37} \\ &+3p_{6,21}+5p_{6,53}+4p_{6,13}+3p_{6,45}+4p_{6,29}+5p_{6,61}+5p_{6,3}+6p_{6,35} \\ &+p_{6,19}+5p_{6,51}+5p_{5,11}+2p_{6,27}+6p_{6,59}+10p_{6,7}+4p_{6,39}+3p_{6,23} \\ &+6p_{6,55}+6p_{6,15}+3p_{6,47}+7p_{6,31}+8p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,110} = \frac{1}{2}p_{6,46} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,46}^2 - 4(3p_{6,0}+4p_{6,32}+3p_{6,16}+2p_{6,48}+3p_{5,8}+4p_{6,24} \\ &+5p_{6,56}+5p_{6,4}+8p_{6,36}+7p_{6,20}+2p_{6,52}+p_{6,12}+8p_{6,44}+3p_{5,28} \\ &+2p_{6,2}+5p_{6,34}+p_{6,18}+5p_{6,50}+4p_{6,10}+3p_{6,42}+3p_{6,26}+p_{6,58} \\ &+3p_{6,6}+2p_{6,38}+3p_{6,22}+2p_{6,54}+p_{6,14}+7p_{6,30}+6p_{6,62}+5p_{6,1} \\ &+4p_{6,33}+2p_{6,17}+5p_{6,49}+3p_{6,9}+4p_{6,41}+6p_{5,25}+p_{6,5}+2p_{6,37} \\ &+3p_{6,21}+5p_{6,53}+4p_{6,13}+3p_{6,45}+4p_{6,29}+5p_{6,61}+5p_{6,3}+6p_{6,35} \\ &+p_{6,19}+5p_{6,51}+5p_{5,11}+2p_{6,27}+6p_{6,59}+10p_{6,7}+4p_{6,39}+3p_{6,23} \\ &+6p_{6,55}+6p_{6,15}+3p_{6,47}+7p_{6,31}+8p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,30} = \frac{1}{2}p_{6,30} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,30}^2 - 4(3p_{6,0}+2p_{6,32}+4p_{6,16}+3p_{6,48}+4p_{6,8}+5p_{6,40} \\ &+3p_{5,24}+7p_{6,4}+2p_{6,36}+8p_{6,20}+5p_{6,52}+3p_{5,12}+8p_{6,28}+p_{6,60} \\ &+p_{6,2}+5p_{6,34}+5p_{6,18}+2p_{6,50}+3p_{6,10}+p_{6,42}+3p_{6,26}+4p_{6,58} \\ &+3p_{6,6}+2p_{6,38}+2p_{6,22}+3p_{6,54}+7p_{6,14}+6p_{6,46}+p_{6,62}+2p_{6,1} \\ &+5p_{6,33}+4p_{6,17}+5p_{6,49}+6p_{5,9}+4p_{6,25}+3p_{6,57}+3p_{6,5}+5p_{6,37} \\ &+2p_{6,21}+p_{6,53}+4p_{6,13}+5p_{6,45}+3p_{6,29}+4p_{6,61}+p_{6,3}+5p_{6,35} \\ &+6p_{6,19}+5p_{6,51}+2p_{6,11}+6p_{6,43}+5p_{5,27}+3p_{6,7}+6p_{6,39}+4p_{6,23} \\ &+10p_{6,55}+7p_{6,15}+8p_{6,47}+3p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,94} = \frac{1}{2}p_{6,30} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,30}^2 - 4(3p_{6,0}+2p_{6,32}+4p_{6,16}+3p_{6,48}+4p_{6,8}+5p_{6,40} \\ &+3p_{5,24}+7p_{6,4}+2p_{6,36}+8p_{6,20}+5p_{6,52}+3p_{5,12}+8p_{6,28}+p_{6,60} \\ &+p_{6,2}+5p_{6,34}+5p_{6,18}+2p_{6,50}+3p_{6,10}+p_{6,42}+3p_{6,26}+4p_{6,58} \\ &+3p_{6,6}+2p_{6,38}+2p_{6,22}+3p_{6,54}+7p_{6,14}+6p_{6,46}+p_{6,62}+2p_{6,1} \\ &+5p_{6,33}+4p_{6,17}+5p_{6,49}+6p_{5,9}+4p_{6,25}+3p_{6,57}+3p_{6,5}+5p_{6,37} \\ &+2p_{6,21}+p_{6,53}+4p_{6,13}+5p_{6,45}+3p_{6,29}+4p_{6,61}+p_{6,3}+5p_{6,35} \\ &+6p_{6,19}+5p_{6,51}+2p_{6,11}+6p_{6,43}+5p_{5,27}+3p_{6,7}+6p_{6,39}+4p_{6,23} \\ &+10p_{6,55}+7p_{6,15}+8p_{6,47}+3p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,62} = \frac{1}{2}p_{6,62} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,62}^2 - 4(2p_{6,0}+3p_{6,32}+3p_{6,16}+4p_{6,48}+5p_{6,8}+4p_{6,40} \\ &+3p_{5,24}+2p_{6,4}+7p_{6,36}+5p_{6,20}+8p_{6,52}+3p_{5,12}+p_{6,28}+8p_{6,60} \\ &+5p_{6,2}+p_{6,34}+2p_{6,18}+5p_{6,50}+p_{6,10}+3p_{6,42}+4p_{6,26}+3p_{6,58} \\ &+2p_{6,6}+3p_{6,38}+3p_{6,22}+2p_{6,54}+6p_{6,14}+7p_{6,46}+p_{6,30}+5p_{6,1} \\ &+2p_{6,33}+5p_{6,17}+4p_{6,49}+6p_{5,9}+3p_{6,25}+4p_{6,57}+5p_{6,5}+3p_{6,37} \\ &+p_{6,21}+2p_{6,53}+5p_{6,13}+4p_{6,45}+4p_{6,29}+3p_{6,61}+5p_{6,3}+p_{6,35} \\ &+5p_{6,19}+6p_{6,51}+6p_{6,11}+2p_{6,43}+5p_{5,27}+6p_{6,7}+3p_{6,39}+10p_{6,23} \\ &+4p_{6,55}+8p_{6,15}+7p_{6,47}+6p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,126} = \frac{1}{2}p_{6,62} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,62}^2 - 4(2p_{6,0}+3p_{6,32}+3p_{6,16}+4p_{6,48}+5p_{6,8}+4p_{6,40} \\ &+3p_{5,24}+2p_{6,4}+7p_{6,36}+5p_{6,20}+8p_{6,52}+3p_{5,12}+p_{6,28}+8p_{6,60} \\ &+5p_{6,2}+p_{6,34}+2p_{6,18}+5p_{6,50}+p_{6,10}+3p_{6,42}+4p_{6,26}+3p_{6,58} \\ &+2p_{6,6}+3p_{6,38}+3p_{6,22}+2p_{6,54}+6p_{6,14}+7p_{6,46}+p_{6,30}+5p_{6,1} \\ &+2p_{6,33}+5p_{6,17}+4p_{6,49}+6p_{5,9}+3p_{6,25}+4p_{6,57}+5p_{6,5}+3p_{6,37} \\ &+p_{6,21}+2p_{6,53}+5p_{6,13}+4p_{6,45}+4p_{6,29}+3p_{6,61}+5p_{6,3}+p_{6,35} \\ &+5p_{6,19}+6p_{6,51}+6p_{6,11}+2p_{6,43}+5p_{5,27}+6p_{6,7}+3p_{6,39}+10p_{6,23} \\ &+4p_{6,55}+8p_{6,15}+7p_{6,47}+6p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,1} = \frac{1}{2}p_{6,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,1}^2 - 4(3p_{6,0}+4p_{6,32}+5p_{6,16}+4p_{6,48}+5p_{6,8}+3p_{6,40} \\ &+p_{6,24}+2p_{6,56}+5p_{6,4}+2p_{6,36}+5p_{6,20}+4p_{6,52}+6p_{5,12}+3p_{6,28} \\ &+4p_{6,60}+3p_{6,2}+6p_{6,34}+8p_{6,18}+7p_{6,50}+6p_{6,10}+3p_{6,42}+10p_{6,26} \\ &+4p_{6,58}+5p_{6,6}+p_{6,38}+5p_{6,22}+6p_{6,54}+6p_{6,14}+2p_{6,46}+5p_{5,30} \\ &+p_{6,33}+6p_{6,17}+7p_{6,49}+2p_{6,9}+3p_{6,41}+3p_{6,25}+2p_{6,57}+5p_{6,5} \\ &+p_{6,37}+2p_{6,21}+5p_{6,53}+p_{6,13}+3p_{6,45}+4p_{6,29}+3p_{6,61}+2p_{6,3} \\ &+3p_{6,35}+3p_{6,19}+4p_{6,51}+5p_{6,11}+4p_{6,43}+3p_{5,27}+2p_{6,7}+7p_{6,39} \\ &+5p_{6,23}+8p_{6,55}+3p_{5,15}+p_{6,31}+8p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,65} = \frac{1}{2}p_{6,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,1}^2 - 4(3p_{6,0}+4p_{6,32}+5p_{6,16}+4p_{6,48}+5p_{6,8}+3p_{6,40} \\ &+p_{6,24}+2p_{6,56}+5p_{6,4}+2p_{6,36}+5p_{6,20}+4p_{6,52}+6p_{5,12}+3p_{6,28} \\ &+4p_{6,60}+3p_{6,2}+6p_{6,34}+8p_{6,18}+7p_{6,50}+6p_{6,10}+3p_{6,42}+10p_{6,26} \\ &+4p_{6,58}+5p_{6,6}+p_{6,38}+5p_{6,22}+6p_{6,54}+6p_{6,14}+2p_{6,46}+5p_{5,30} \\ &+p_{6,33}+6p_{6,17}+7p_{6,49}+2p_{6,9}+3p_{6,41}+3p_{6,25}+2p_{6,57}+5p_{6,5} \\ &+p_{6,37}+2p_{6,21}+5p_{6,53}+p_{6,13}+3p_{6,45}+4p_{6,29}+3p_{6,61}+2p_{6,3} \\ &+3p_{6,35}+3p_{6,19}+4p_{6,51}+5p_{6,11}+4p_{6,43}+3p_{5,27}+2p_{6,7}+7p_{6,39} \\ &+5p_{6,23}+8p_{6,55}+3p_{5,15}+p_{6,31}+8p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,33} = \frac{1}{2}p_{6,33} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,33}^2 - 4(4p_{6,0}+3p_{6,32}+4p_{6,16}+5p_{6,48}+3p_{6,8}+5p_{6,40} \\ &+2p_{6,24}+p_{6,56}+2p_{6,4}+5p_{6,36}+4p_{6,20}+5p_{6,52}+6p_{5,12}+4p_{6,28} \\ &+3p_{6,60}+6p_{6,2}+3p_{6,34}+7p_{6,18}+8p_{6,50}+3p_{6,10}+6p_{6,42}+4p_{6,26} \\ &+10p_{6,58}+p_{6,6}+5p_{6,38}+6p_{6,22}+5p_{6,54}+2p_{6,14}+6p_{6,46}+5p_{5,30} \\ &+p_{6,1}+7p_{6,17}+6p_{6,49}+3p_{6,9}+2p_{6,41}+2p_{6,25}+3p_{6,57}+p_{6,5} \\ &+5p_{6,37}+5p_{6,21}+2p_{6,53}+3p_{6,13}+p_{6,45}+3p_{6,29}+4p_{6,61}+3p_{6,3} \\ &+2p_{6,35}+4p_{6,19}+3p_{6,51}+4p_{6,11}+5p_{6,43}+3p_{5,27}+7p_{6,7}+2p_{6,39} \\ &+8p_{6,23}+5p_{6,55}+3p_{5,15}+8p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,97} = \frac{1}{2}p_{6,33} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,33}^2 - 4(4p_{6,0}+3p_{6,32}+4p_{6,16}+5p_{6,48}+3p_{6,8}+5p_{6,40} \\ &+2p_{6,24}+p_{6,56}+2p_{6,4}+5p_{6,36}+4p_{6,20}+5p_{6,52}+6p_{5,12}+4p_{6,28} \\ &+3p_{6,60}+6p_{6,2}+3p_{6,34}+7p_{6,18}+8p_{6,50}+3p_{6,10}+6p_{6,42}+4p_{6,26} \\ &+10p_{6,58}+p_{6,6}+5p_{6,38}+6p_{6,22}+5p_{6,54}+2p_{6,14}+6p_{6,46}+5p_{5,30} \\ &+p_{6,1}+7p_{6,17}+6p_{6,49}+3p_{6,9}+2p_{6,41}+2p_{6,25}+3p_{6,57}+p_{6,5} \\ &+5p_{6,37}+5p_{6,21}+2p_{6,53}+3p_{6,13}+p_{6,45}+3p_{6,29}+4p_{6,61}+3p_{6,3} \\ &+2p_{6,35}+4p_{6,19}+3p_{6,51}+4p_{6,11}+5p_{6,43}+3p_{5,27}+7p_{6,7}+2p_{6,39} \\ &+8p_{6,23}+5p_{6,55}+3p_{5,15}+8p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,17} = \frac{1}{2}p_{6,17} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,17}^2 - 4(4p_{6,0}+5p_{6,32}+3p_{6,16}+4p_{6,48}+2p_{6,8}+p_{6,40} \\ &+5p_{6,24}+3p_{6,56}+4p_{6,4}+5p_{6,36}+5p_{6,20}+2p_{6,52}+4p_{6,12}+3p_{6,44} \\ &+6p_{5,28}+7p_{6,2}+8p_{6,34}+3p_{6,18}+6p_{6,50}+4p_{6,10}+10p_{6,42}+6p_{6,26} \\ &+3p_{6,58}+6p_{6,6}+5p_{6,38}+5p_{6,22}+p_{6,54}+5p_{5,14}+6p_{6,30}+2p_{6,62} \\ &+7p_{6,1}+6p_{6,33}+p_{6,49}+2p_{6,9}+3p_{6,41}+2p_{6,25}+3p_{6,57}+5p_{6,5} \\ &+2p_{6,37}+5p_{6,21}+p_{6,53}+3p_{6,13}+4p_{6,45}+p_{6,29}+3p_{6,61}+4p_{6,3} \\ &+3p_{6,35}+2p_{6,19}+3p_{6,51}+3p_{5,11}+5p_{6,27}+4p_{6,59}+8p_{6,7}+5p_{6,39} \\ &+2p_{6,23}+7p_{6,55}+8p_{6,15}+p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,81} = \frac{1}{2}p_{6,17} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,17}^2 - 4(4p_{6,0}+5p_{6,32}+3p_{6,16}+4p_{6,48}+2p_{6,8}+p_{6,40} \\ &+5p_{6,24}+3p_{6,56}+4p_{6,4}+5p_{6,36}+5p_{6,20}+2p_{6,52}+4p_{6,12}+3p_{6,44} \\ &+6p_{5,28}+7p_{6,2}+8p_{6,34}+3p_{6,18}+6p_{6,50}+4p_{6,10}+10p_{6,42}+6p_{6,26} \\ &+3p_{6,58}+6p_{6,6}+5p_{6,38}+5p_{6,22}+p_{6,54}+5p_{5,14}+6p_{6,30}+2p_{6,62} \\ &+7p_{6,1}+6p_{6,33}+p_{6,49}+2p_{6,9}+3p_{6,41}+2p_{6,25}+3p_{6,57}+5p_{6,5} \\ &+2p_{6,37}+5p_{6,21}+p_{6,53}+3p_{6,13}+4p_{6,45}+p_{6,29}+3p_{6,61}+4p_{6,3} \\ &+3p_{6,35}+2p_{6,19}+3p_{6,51}+3p_{5,11}+5p_{6,27}+4p_{6,59}+8p_{6,7}+5p_{6,39} \\ &+2p_{6,23}+7p_{6,55}+8p_{6,15}+p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,49} = \frac{1}{2}p_{6,49} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,49}^2 - 4(5p_{6,0}+4p_{6,32}+4p_{6,16}+3p_{6,48}+p_{6,8}+2p_{6,40} \\ &+3p_{6,24}+5p_{6,56}+5p_{6,4}+4p_{6,36}+2p_{6,20}+5p_{6,52}+3p_{6,12}+4p_{6,44} \\ &+6p_{5,28}+8p_{6,2}+7p_{6,34}+6p_{6,18}+3p_{6,50}+10p_{6,10}+4p_{6,42}+3p_{6,26} \\ &+6p_{6,58}+5p_{6,6}+6p_{6,38}+p_{6,22}+5p_{6,54}+5p_{5,14}+2p_{6,30}+6p_{6,62} \\ &+6p_{6,1}+7p_{6,33}+p_{6,17}+3p_{6,9}+2p_{6,41}+3p_{6,25}+2p_{6,57}+2p_{6,5} \\ &+5p_{6,37}+p_{6,21}+5p_{6,53}+4p_{6,13}+3p_{6,45}+3p_{6,29}+p_{6,61}+3p_{6,3} \\ &+4p_{6,35}+3p_{6,19}+2p_{6,51}+3p_{5,11}+4p_{6,27}+5p_{6,59}+5p_{6,7}+8p_{6,39} \\ &+7p_{6,23}+2p_{6,55}+p_{6,15}+8p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,113} = \frac{1}{2}p_{6,49} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,49}^2 - 4(5p_{6,0}+4p_{6,32}+4p_{6,16}+3p_{6,48}+p_{6,8}+2p_{6,40} \\ &+3p_{6,24}+5p_{6,56}+5p_{6,4}+4p_{6,36}+2p_{6,20}+5p_{6,52}+3p_{6,12}+4p_{6,44} \\ &+6p_{5,28}+8p_{6,2}+7p_{6,34}+6p_{6,18}+3p_{6,50}+10p_{6,10}+4p_{6,42}+3p_{6,26} \\ &+6p_{6,58}+5p_{6,6}+6p_{6,38}+p_{6,22}+5p_{6,54}+5p_{5,14}+2p_{6,30}+6p_{6,62} \\ &+6p_{6,1}+7p_{6,33}+p_{6,17}+3p_{6,9}+2p_{6,41}+3p_{6,25}+2p_{6,57}+2p_{6,5} \\ &+5p_{6,37}+p_{6,21}+5p_{6,53}+4p_{6,13}+3p_{6,45}+3p_{6,29}+p_{6,61}+3p_{6,3} \\ &+4p_{6,35}+3p_{6,19}+2p_{6,51}+3p_{5,11}+4p_{6,27}+5p_{6,59}+5p_{6,7}+8p_{6,39} \\ &+7p_{6,23}+2p_{6,55}+p_{6,15}+8p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,9} = \frac{1}{2}p_{6,9} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,9}^2 - 4(2p_{6,0}+p_{6,32}+5p_{6,16}+3p_{6,48}+3p_{6,8}+4p_{6,40} \\ &+5p_{6,24}+4p_{6,56}+4p_{6,4}+3p_{6,36}+6p_{5,20}+5p_{6,12}+2p_{6,44}+5p_{6,28} \\ &+4p_{6,60}+4p_{6,2}+10p_{6,34}+6p_{6,18}+3p_{6,50}+3p_{6,10}+6p_{6,42}+8p_{6,26} \\ &+7p_{6,58}+5p_{5,6}+6p_{6,22}+2p_{6,54}+5p_{6,14}+p_{6,46}+5p_{6,30}+6p_{6,62} \\ &+2p_{6,1}+3p_{6,33}+2p_{6,17}+3p_{6,49}+p_{6,41}+6p_{6,25}+7p_{6,57}+3p_{6,5} \\ &+4p_{6,37}+p_{6,21}+3p_{6,53}+5p_{6,13}+p_{6,45}+2p_{6,29}+5p_{6,61}+3p_{5,3} \\ &+5p_{6,19}+4p_{6,51}+2p_{6,11}+3p_{6,43}+3p_{6,27}+4p_{6,59}+8p_{6,7}+p_{6,39} \\ &+3p_{5,23}+2p_{6,15}+7p_{6,47}+5p_{6,31}+8p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,73} = \frac{1}{2}p_{6,9} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,9}^2 - 4(2p_{6,0}+p_{6,32}+5p_{6,16}+3p_{6,48}+3p_{6,8}+4p_{6,40} \\ &+5p_{6,24}+4p_{6,56}+4p_{6,4}+3p_{6,36}+6p_{5,20}+5p_{6,12}+2p_{6,44}+5p_{6,28} \\ &+4p_{6,60}+4p_{6,2}+10p_{6,34}+6p_{6,18}+3p_{6,50}+3p_{6,10}+6p_{6,42}+8p_{6,26} \\ &+7p_{6,58}+5p_{5,6}+6p_{6,22}+2p_{6,54}+5p_{6,14}+p_{6,46}+5p_{6,30}+6p_{6,62} \\ &+2p_{6,1}+3p_{6,33}+2p_{6,17}+3p_{6,49}+p_{6,41}+6p_{6,25}+7p_{6,57}+3p_{6,5} \\ &+4p_{6,37}+p_{6,21}+3p_{6,53}+5p_{6,13}+p_{6,45}+2p_{6,29}+5p_{6,61}+3p_{5,3} \\ &+5p_{6,19}+4p_{6,51}+2p_{6,11}+3p_{6,43}+3p_{6,27}+4p_{6,59}+8p_{6,7}+p_{6,39} \\ &+3p_{5,23}+2p_{6,15}+7p_{6,47}+5p_{6,31}+8p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,41} = \frac{1}{2}p_{6,41} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,41}^2 - 4(p_{6,0}+2p_{6,32}+3p_{6,16}+5p_{6,48}+4p_{6,8}+3p_{6,40} \\ &+4p_{6,24}+5p_{6,56}+3p_{6,4}+4p_{6,36}+6p_{5,20}+2p_{6,12}+5p_{6,44}+4p_{6,28} \\ &+5p_{6,60}+10p_{6,2}+4p_{6,34}+3p_{6,18}+6p_{6,50}+6p_{6,10}+3p_{6,42}+7p_{6,26} \\ &+8p_{6,58}+5p_{5,6}+2p_{6,22}+6p_{6,54}+p_{6,14}+5p_{6,46}+6p_{6,30}+5p_{6,62} \\ &+3p_{6,1}+2p_{6,33}+3p_{6,17}+2p_{6,49}+p_{6,9}+7p_{6,25}+6p_{6,57}+4p_{6,5} \\ &+3p_{6,37}+3p_{6,21}+p_{6,53}+p_{6,13}+5p_{6,45}+5p_{6,29}+2p_{6,61}+3p_{5,3} \\ &+4p_{6,19}+5p_{6,51}+3p_{6,11}+2p_{6,43}+4p_{6,27}+3p_{6,59}+p_{6,7}+8p_{6,39} \\ &+3p_{5,23}+7p_{6,15}+2p_{6,47}+8p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,105} = \frac{1}{2}p_{6,41} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,41}^2 - 4(p_{6,0}+2p_{6,32}+3p_{6,16}+5p_{6,48}+4p_{6,8}+3p_{6,40} \\ &+4p_{6,24}+5p_{6,56}+3p_{6,4}+4p_{6,36}+6p_{5,20}+2p_{6,12}+5p_{6,44}+4p_{6,28} \\ &+5p_{6,60}+10p_{6,2}+4p_{6,34}+3p_{6,18}+6p_{6,50}+6p_{6,10}+3p_{6,42}+7p_{6,26} \\ &+8p_{6,58}+5p_{5,6}+2p_{6,22}+6p_{6,54}+p_{6,14}+5p_{6,46}+6p_{6,30}+5p_{6,62} \\ &+3p_{6,1}+2p_{6,33}+3p_{6,17}+2p_{6,49}+p_{6,9}+7p_{6,25}+6p_{6,57}+4p_{6,5} \\ &+3p_{6,37}+3p_{6,21}+p_{6,53}+p_{6,13}+5p_{6,45}+5p_{6,29}+2p_{6,61}+3p_{5,3} \\ &+4p_{6,19}+5p_{6,51}+3p_{6,11}+2p_{6,43}+4p_{6,27}+3p_{6,59}+p_{6,7}+8p_{6,39} \\ &+3p_{5,23}+7p_{6,15}+2p_{6,47}+8p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,25} = \frac{1}{2}p_{6,25} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,25}^2 - 4(3p_{6,0}+5p_{6,32}+2p_{6,16}+p_{6,48}+4p_{6,8}+5p_{6,40} \\ &+3p_{6,24}+4p_{6,56}+6p_{5,4}+4p_{6,20}+3p_{6,52}+4p_{6,12}+5p_{6,44}+5p_{6,28} \\ &+2p_{6,60}+3p_{6,2}+6p_{6,34}+4p_{6,18}+10p_{6,50}+7p_{6,10}+8p_{6,42}+3p_{6,26} \\ &+6p_{6,58}+2p_{6,6}+6p_{6,38}+5p_{5,22}+6p_{6,14}+5p_{6,46}+5p_{6,30}+p_{6,62} \\ &+3p_{6,1}+2p_{6,33}+2p_{6,17}+3p_{6,49}+7p_{6,9}+6p_{6,41}+p_{6,57}+3p_{6,5} \\ &+p_{6,37}+3p_{6,21}+4p_{6,53}+5p_{6,13}+2p_{6,45}+5p_{6,29}+p_{6,61}+4p_{6,3} \\ &+5p_{6,35}+3p_{5,19}+4p_{6,11}+3p_{6,43}+2p_{6,27}+3p_{6,59}+3p_{5,7}+8p_{6,23} \\ &+p_{6,55}+8p_{6,15}+5p_{6,47}+2p_{6,31}+7p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,89} = \frac{1}{2}p_{6,25} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,25}^2 - 4(3p_{6,0}+5p_{6,32}+2p_{6,16}+p_{6,48}+4p_{6,8}+5p_{6,40} \\ &+3p_{6,24}+4p_{6,56}+6p_{5,4}+4p_{6,20}+3p_{6,52}+4p_{6,12}+5p_{6,44}+5p_{6,28} \\ &+2p_{6,60}+3p_{6,2}+6p_{6,34}+4p_{6,18}+10p_{6,50}+7p_{6,10}+8p_{6,42}+3p_{6,26} \\ &+6p_{6,58}+2p_{6,6}+6p_{6,38}+5p_{5,22}+6p_{6,14}+5p_{6,46}+5p_{6,30}+p_{6,62} \\ &+3p_{6,1}+2p_{6,33}+2p_{6,17}+3p_{6,49}+7p_{6,9}+6p_{6,41}+p_{6,57}+3p_{6,5} \\ &+p_{6,37}+3p_{6,21}+4p_{6,53}+5p_{6,13}+2p_{6,45}+5p_{6,29}+p_{6,61}+4p_{6,3} \\ &+5p_{6,35}+3p_{5,19}+4p_{6,11}+3p_{6,43}+2p_{6,27}+3p_{6,59}+3p_{5,7}+8p_{6,23} \\ &+p_{6,55}+8p_{6,15}+5p_{6,47}+2p_{6,31}+7p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,57} = \frac{1}{2}p_{6,57} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,57}^2 - 4(5p_{6,0}+3p_{6,32}+p_{6,16}+2p_{6,48}+5p_{6,8}+4p_{6,40} \\ &+4p_{6,24}+3p_{6,56}+6p_{5,4}+3p_{6,20}+4p_{6,52}+5p_{6,12}+4p_{6,44}+2p_{6,28} \\ &+5p_{6,60}+6p_{6,2}+3p_{6,34}+10p_{6,18}+4p_{6,50}+8p_{6,10}+7p_{6,42}+6p_{6,26} \\ &+3p_{6,58}+6p_{6,6}+2p_{6,38}+5p_{5,22}+5p_{6,14}+6p_{6,46}+p_{6,30}+5p_{6,62} \\ &+2p_{6,1}+3p_{6,33}+3p_{6,17}+2p_{6,49}+6p_{6,9}+7p_{6,41}+p_{6,25}+p_{6,5} \\ &+3p_{6,37}+4p_{6,21}+3p_{6,53}+2p_{6,13}+5p_{6,45}+p_{6,29}+5p_{6,61}+5p_{6,3} \\ &+4p_{6,35}+3p_{5,19}+3p_{6,11}+4p_{6,43}+3p_{6,27}+2p_{6,59}+3p_{5,7}+p_{6,23} \\ &+8p_{6,55}+5p_{6,15}+8p_{6,47}+7p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,121} = \frac{1}{2}p_{6,57} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,57}^2 - 4(5p_{6,0}+3p_{6,32}+p_{6,16}+2p_{6,48}+5p_{6,8}+4p_{6,40} \\ &+4p_{6,24}+3p_{6,56}+6p_{5,4}+3p_{6,20}+4p_{6,52}+5p_{6,12}+4p_{6,44}+2p_{6,28} \\ &+5p_{6,60}+6p_{6,2}+3p_{6,34}+10p_{6,18}+4p_{6,50}+8p_{6,10}+7p_{6,42}+6p_{6,26} \\ &+3p_{6,58}+6p_{6,6}+2p_{6,38}+5p_{5,22}+5p_{6,14}+6p_{6,46}+p_{6,30}+5p_{6,62} \\ &+2p_{6,1}+3p_{6,33}+3p_{6,17}+2p_{6,49}+6p_{6,9}+7p_{6,41}+p_{6,25}+p_{6,5} \\ &+3p_{6,37}+4p_{6,21}+3p_{6,53}+2p_{6,13}+5p_{6,45}+p_{6,29}+5p_{6,61}+5p_{6,3} \\ &+4p_{6,35}+3p_{5,19}+3p_{6,11}+4p_{6,43}+3p_{6,27}+2p_{6,59}+3p_{5,7}+p_{6,23} \\ &+8p_{6,55}+5p_{6,15}+8p_{6,47}+7p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,5} = \frac{1}{2}p_{6,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,5}^2 - 4(4p_{6,0}+3p_{6,32}+6p_{5,16}+5p_{6,8}+2p_{6,40}+5p_{6,24} \\ &+4p_{6,56}+3p_{6,4}+4p_{6,36}+5p_{6,20}+4p_{6,52}+5p_{6,12}+3p_{6,44}+p_{6,28} \\ &+2p_{6,60}+5p_{5,2}+6p_{6,18}+2p_{6,50}+5p_{6,10}+p_{6,42}+5p_{6,26}+6p_{6,58} \\ &+3p_{6,6}+6p_{6,38}+8p_{6,22}+7p_{6,54}+6p_{6,14}+3p_{6,46}+10p_{6,30}+4p_{6,62} \\ &+3p_{6,1}+4p_{6,33}+p_{6,17}+3p_{6,49}+5p_{6,9}+p_{6,41}+2p_{6,25}+5p_{6,57} \\ &+p_{6,37}+6p_{6,21}+7p_{6,53}+2p_{6,13}+3p_{6,45}+3p_{6,29}+2p_{6,61}+8p_{6,3} \\ &+p_{6,35}+3p_{5,19}+2p_{6,11}+7p_{6,43}+5p_{6,27}+8p_{6,59}+2p_{6,7}+3p_{6,39} \\ &+3p_{6,23}+4p_{6,55}+5p_{6,15}+4p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,69} = \frac{1}{2}p_{6,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,5}^2 - 4(4p_{6,0}+3p_{6,32}+6p_{5,16}+5p_{6,8}+2p_{6,40}+5p_{6,24} \\ &+4p_{6,56}+3p_{6,4}+4p_{6,36}+5p_{6,20}+4p_{6,52}+5p_{6,12}+3p_{6,44}+p_{6,28} \\ &+2p_{6,60}+5p_{5,2}+6p_{6,18}+2p_{6,50}+5p_{6,10}+p_{6,42}+5p_{6,26}+6p_{6,58} \\ &+3p_{6,6}+6p_{6,38}+8p_{6,22}+7p_{6,54}+6p_{6,14}+3p_{6,46}+10p_{6,30}+4p_{6,62} \\ &+3p_{6,1}+4p_{6,33}+p_{6,17}+3p_{6,49}+5p_{6,9}+p_{6,41}+2p_{6,25}+5p_{6,57} \\ &+p_{6,37}+6p_{6,21}+7p_{6,53}+2p_{6,13}+3p_{6,45}+3p_{6,29}+2p_{6,61}+8p_{6,3} \\ &+p_{6,35}+3p_{5,19}+2p_{6,11}+7p_{6,43}+5p_{6,27}+8p_{6,59}+2p_{6,7}+3p_{6,39} \\ &+3p_{6,23}+4p_{6,55}+5p_{6,15}+4p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,37} = \frac{1}{2}p_{6,37} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,37}^2 - 4(3p_{6,0}+4p_{6,32}+6p_{5,16}+2p_{6,8}+5p_{6,40}+4p_{6,24} \\ &+5p_{6,56}+4p_{6,4}+3p_{6,36}+4p_{6,20}+5p_{6,52}+3p_{6,12}+5p_{6,44}+2p_{6,28} \\ &+p_{6,60}+5p_{5,2}+2p_{6,18}+6p_{6,50}+p_{6,10}+5p_{6,42}+6p_{6,26}+5p_{6,58} \\ &+6p_{6,6}+3p_{6,38}+7p_{6,22}+8p_{6,54}+3p_{6,14}+6p_{6,46}+4p_{6,30}+10p_{6,62} \\ &+4p_{6,1}+3p_{6,33}+3p_{6,17}+p_{6,49}+p_{6,9}+5p_{6,41}+5p_{6,25}+2p_{6,57} \\ &+p_{6,5}+7p_{6,21}+6p_{6,53}+3p_{6,13}+2p_{6,45}+2p_{6,29}+3p_{6,61}+p_{6,3} \\ &+8p_{6,35}+3p_{5,19}+7p_{6,11}+2p_{6,43}+8p_{6,27}+5p_{6,59}+3p_{6,7}+2p_{6,39} \\ &+4p_{6,23}+3p_{6,55}+4p_{6,15}+5p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,101} = \frac{1}{2}p_{6,37} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,37}^2 - 4(3p_{6,0}+4p_{6,32}+6p_{5,16}+2p_{6,8}+5p_{6,40}+4p_{6,24} \\ &+5p_{6,56}+4p_{6,4}+3p_{6,36}+4p_{6,20}+5p_{6,52}+3p_{6,12}+5p_{6,44}+2p_{6,28} \\ &+p_{6,60}+5p_{5,2}+2p_{6,18}+6p_{6,50}+p_{6,10}+5p_{6,42}+6p_{6,26}+5p_{6,58} \\ &+6p_{6,6}+3p_{6,38}+7p_{6,22}+8p_{6,54}+3p_{6,14}+6p_{6,46}+4p_{6,30}+10p_{6,62} \\ &+4p_{6,1}+3p_{6,33}+3p_{6,17}+p_{6,49}+p_{6,9}+5p_{6,41}+5p_{6,25}+2p_{6,57} \\ &+p_{6,5}+7p_{6,21}+6p_{6,53}+3p_{6,13}+2p_{6,45}+2p_{6,29}+3p_{6,61}+p_{6,3} \\ &+8p_{6,35}+3p_{5,19}+7p_{6,11}+2p_{6,43}+8p_{6,27}+5p_{6,59}+3p_{6,7}+2p_{6,39} \\ &+4p_{6,23}+3p_{6,55}+4p_{6,15}+5p_{6,47}+3p_{5,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,21} = \frac{1}{2}p_{6,21} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,21}^2 - 4(6p_{5,0}+4p_{6,16}+3p_{6,48}+4p_{6,8}+5p_{6,40}+5p_{6,24} \\ &+2p_{6,56}+4p_{6,4}+5p_{6,36}+3p_{6,20}+4p_{6,52}+2p_{6,12}+p_{6,44}+5p_{6,28} \\ &+3p_{6,60}+2p_{6,2}+6p_{6,34}+5p_{5,18}+6p_{6,10}+5p_{6,42}+5p_{6,26}+p_{6,58} \\ &+7p_{6,6}+8p_{6,38}+3p_{6,22}+6p_{6,54}+4p_{6,14}+10p_{6,46}+6p_{6,30}+3p_{6,62} \\ &+3p_{6,1}+p_{6,33}+3p_{6,17}+4p_{6,49}+5p_{6,9}+2p_{6,41}+5p_{6,25}+p_{6,57} \\ &+7p_{6,5}+6p_{6,37}+p_{6,53}+2p_{6,13}+3p_{6,45}+2p_{6,29}+3p_{6,61}+3p_{5,3} \\ &+8p_{6,19}+p_{6,51}+8p_{6,11}+5p_{6,43}+2p_{6,27}+7p_{6,59}+4p_{6,7}+3p_{6,39} \\ &+2p_{6,23}+3p_{6,55}+3p_{5,15}+5p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,85} = \frac{1}{2}p_{6,21} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,21}^2 - 4(6p_{5,0}+4p_{6,16}+3p_{6,48}+4p_{6,8}+5p_{6,40}+5p_{6,24} \\ &+2p_{6,56}+4p_{6,4}+5p_{6,36}+3p_{6,20}+4p_{6,52}+2p_{6,12}+p_{6,44}+5p_{6,28} \\ &+3p_{6,60}+2p_{6,2}+6p_{6,34}+5p_{5,18}+6p_{6,10}+5p_{6,42}+5p_{6,26}+p_{6,58} \\ &+7p_{6,6}+8p_{6,38}+3p_{6,22}+6p_{6,54}+4p_{6,14}+10p_{6,46}+6p_{6,30}+3p_{6,62} \\ &+3p_{6,1}+p_{6,33}+3p_{6,17}+4p_{6,49}+5p_{6,9}+2p_{6,41}+5p_{6,25}+p_{6,57} \\ &+7p_{6,5}+6p_{6,37}+p_{6,53}+2p_{6,13}+3p_{6,45}+2p_{6,29}+3p_{6,61}+3p_{5,3} \\ &+8p_{6,19}+p_{6,51}+8p_{6,11}+5p_{6,43}+2p_{6,27}+7p_{6,59}+4p_{6,7}+3p_{6,39} \\ &+2p_{6,23}+3p_{6,55}+3p_{5,15}+5p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,53} = \frac{1}{2}p_{6,53} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,53}^2 - 4(6p_{5,0}+3p_{6,16}+4p_{6,48}+5p_{6,8}+4p_{6,40}+2p_{6,24} \\ &+5p_{6,56}+5p_{6,4}+4p_{6,36}+4p_{6,20}+3p_{6,52}+p_{6,12}+2p_{6,44}+3p_{6,28} \\ &+5p_{6,60}+6p_{6,2}+2p_{6,34}+5p_{5,18}+5p_{6,10}+6p_{6,42}+p_{6,26}+5p_{6,58} \\ &+8p_{6,6}+7p_{6,38}+6p_{6,22}+3p_{6,54}+10p_{6,14}+4p_{6,46}+3p_{6,30}+6p_{6,62} \\ &+p_{6,1}+3p_{6,33}+4p_{6,17}+3p_{6,49}+2p_{6,9}+5p_{6,41}+p_{6,25}+5p_{6,57} \\ &+6p_{6,5}+7p_{6,37}+p_{6,21}+3p_{6,13}+2p_{6,45}+3p_{6,29}+2p_{6,61}+3p_{5,3} \\ &+p_{6,19}+8p_{6,51}+5p_{6,11}+8p_{6,43}+7p_{6,27}+2p_{6,59}+3p_{6,7}+4p_{6,39} \\ &+3p_{6,23}+2p_{6,55}+3p_{5,15}+4p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,117} = \frac{1}{2}p_{6,53} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,53}^2 - 4(6p_{5,0}+3p_{6,16}+4p_{6,48}+5p_{6,8}+4p_{6,40}+2p_{6,24} \\ &+5p_{6,56}+5p_{6,4}+4p_{6,36}+4p_{6,20}+3p_{6,52}+p_{6,12}+2p_{6,44}+3p_{6,28} \\ &+5p_{6,60}+6p_{6,2}+2p_{6,34}+5p_{5,18}+5p_{6,10}+6p_{6,42}+p_{6,26}+5p_{6,58} \\ &+8p_{6,6}+7p_{6,38}+6p_{6,22}+3p_{6,54}+10p_{6,14}+4p_{6,46}+3p_{6,30}+6p_{6,62} \\ &+p_{6,1}+3p_{6,33}+4p_{6,17}+3p_{6,49}+2p_{6,9}+5p_{6,41}+p_{6,25}+5p_{6,57} \\ &+6p_{6,5}+7p_{6,37}+p_{6,21}+3p_{6,13}+2p_{6,45}+3p_{6,29}+2p_{6,61}+3p_{5,3} \\ &+p_{6,19}+8p_{6,51}+5p_{6,11}+8p_{6,43}+7p_{6,27}+2p_{6,59}+3p_{6,7}+4p_{6,39} \\ &+3p_{6,23}+2p_{6,55}+3p_{5,15}+4p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,13} = \frac{1}{2}p_{6,13} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,13}^2 - 4(4p_{6,0}+5p_{6,32}+5p_{6,16}+2p_{6,48}+4p_{6,8}+3p_{6,40} \\ &+6p_{5,24}+2p_{6,4}+p_{6,36}+5p_{6,20}+3p_{6,52}+3p_{6,12}+4p_{6,44}+5p_{6,28} \\ &+4p_{6,60}+6p_{6,2}+5p_{6,34}+5p_{6,18}+p_{6,50}+5p_{5,10}+6p_{6,26}+2p_{6,58} \\ &+4p_{6,6}+10p_{6,38}+6p_{6,22}+3p_{6,54}+3p_{6,14}+6p_{6,46}+8p_{6,30}+7p_{6,62} \\ &+5p_{6,1}+2p_{6,33}+5p_{6,17}+p_{6,49}+3p_{6,9}+4p_{6,41}+p_{6,25}+3p_{6,57} \\ &+2p_{6,5}+3p_{6,37}+2p_{6,21}+3p_{6,53}+p_{6,45}+6p_{6,29}+7p_{6,61}+8p_{6,3} \\ &+5p_{6,35}+2p_{6,19}+7p_{6,51}+8p_{6,11}+p_{6,43}+3p_{5,27}+3p_{5,7}+5p_{6,23} \\ &+4p_{6,55}+2p_{6,15}+3p_{6,47}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,77} = \frac{1}{2}p_{6,13} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,13}^2 - 4(4p_{6,0}+5p_{6,32}+5p_{6,16}+2p_{6,48}+4p_{6,8}+3p_{6,40} \\ &+6p_{5,24}+2p_{6,4}+p_{6,36}+5p_{6,20}+3p_{6,52}+3p_{6,12}+4p_{6,44}+5p_{6,28} \\ &+4p_{6,60}+6p_{6,2}+5p_{6,34}+5p_{6,18}+p_{6,50}+5p_{5,10}+6p_{6,26}+2p_{6,58} \\ &+4p_{6,6}+10p_{6,38}+6p_{6,22}+3p_{6,54}+3p_{6,14}+6p_{6,46}+8p_{6,30}+7p_{6,62} \\ &+5p_{6,1}+2p_{6,33}+5p_{6,17}+p_{6,49}+3p_{6,9}+4p_{6,41}+p_{6,25}+3p_{6,57} \\ &+2p_{6,5}+3p_{6,37}+2p_{6,21}+3p_{6,53}+p_{6,45}+6p_{6,29}+7p_{6,61}+8p_{6,3} \\ &+5p_{6,35}+2p_{6,19}+7p_{6,51}+8p_{6,11}+p_{6,43}+3p_{5,27}+3p_{5,7}+5p_{6,23} \\ &+4p_{6,55}+2p_{6,15}+3p_{6,47}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,45} = \frac{1}{2}p_{6,45} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,45}^2 - 4(5p_{6,0}+4p_{6,32}+2p_{6,16}+5p_{6,48}+3p_{6,8}+4p_{6,40} \\ &+6p_{5,24}+p_{6,4}+2p_{6,36}+3p_{6,20}+5p_{6,52}+4p_{6,12}+3p_{6,44}+4p_{6,28} \\ &+5p_{6,60}+5p_{6,2}+6p_{6,34}+p_{6,18}+5p_{6,50}+5p_{5,10}+2p_{6,26}+6p_{6,58} \\ &+10p_{6,6}+4p_{6,38}+3p_{6,22}+6p_{6,54}+6p_{6,14}+3p_{6,46}+7p_{6,30}+8p_{6,62} \\ &+2p_{6,1}+5p_{6,33}+p_{6,17}+5p_{6,49}+4p_{6,9}+3p_{6,41}+3p_{6,25}+p_{6,57} \\ &+3p_{6,5}+2p_{6,37}+3p_{6,21}+2p_{6,53}+p_{6,13}+7p_{6,29}+6p_{6,61}+5p_{6,3} \\ &+8p_{6,35}+7p_{6,19}+2p_{6,51}+p_{6,11}+8p_{6,43}+3p_{5,27}+3p_{5,7}+4p_{6,23} \\ &+5p_{6,55}+3p_{6,15}+2p_{6,47}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,109} = \frac{1}{2}p_{6,45} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,45}^2 - 4(5p_{6,0}+4p_{6,32}+2p_{6,16}+5p_{6,48}+3p_{6,8}+4p_{6,40} \\ &+6p_{5,24}+p_{6,4}+2p_{6,36}+3p_{6,20}+5p_{6,52}+4p_{6,12}+3p_{6,44}+4p_{6,28} \\ &+5p_{6,60}+5p_{6,2}+6p_{6,34}+p_{6,18}+5p_{6,50}+5p_{5,10}+2p_{6,26}+6p_{6,58} \\ &+10p_{6,6}+4p_{6,38}+3p_{6,22}+6p_{6,54}+6p_{6,14}+3p_{6,46}+7p_{6,30}+8p_{6,62} \\ &+2p_{6,1}+5p_{6,33}+p_{6,17}+5p_{6,49}+4p_{6,9}+3p_{6,41}+3p_{6,25}+p_{6,57} \\ &+3p_{6,5}+2p_{6,37}+3p_{6,21}+2p_{6,53}+p_{6,13}+7p_{6,29}+6p_{6,61}+5p_{6,3} \\ &+8p_{6,35}+7p_{6,19}+2p_{6,51}+p_{6,11}+8p_{6,43}+3p_{5,27}+3p_{5,7}+4p_{6,23} \\ &+5p_{6,55}+3p_{6,15}+2p_{6,47}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,29} = \frac{1}{2}p_{6,29} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,29}^2 - 4(2p_{6,0}+5p_{6,32}+4p_{6,16}+5p_{6,48}+6p_{5,8}+4p_{6,24} \\ &+3p_{6,56}+3p_{6,4}+5p_{6,36}+2p_{6,20}+p_{6,52}+4p_{6,12}+5p_{6,44}+3p_{6,28} \\ &+4p_{6,60}+p_{6,2}+5p_{6,34}+6p_{6,18}+5p_{6,50}+2p_{6,10}+6p_{6,42}+5p_{5,26} \\ &+3p_{6,6}+6p_{6,38}+4p_{6,22}+10p_{6,54}+7p_{6,14}+8p_{6,46}+3p_{6,30}+6p_{6,62} \\ &+p_{6,1}+5p_{6,33}+5p_{6,17}+2p_{6,49}+3p_{6,9}+p_{6,41}+3p_{6,25}+4p_{6,57} \\ &+3p_{6,5}+2p_{6,37}+2p_{6,21}+3p_{6,53}+7p_{6,13}+6p_{6,45}+p_{6,61}+7p_{6,3} \\ &+2p_{6,35}+8p_{6,19}+5p_{6,51}+3p_{5,11}+8p_{6,27}+p_{6,59}+4p_{6,7}+5p_{6,39} \\ &+3p_{5,23}+4p_{6,15}+3p_{6,47}+2p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,93} = \frac{1}{2}p_{6,29} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,29}^2 - 4(2p_{6,0}+5p_{6,32}+4p_{6,16}+5p_{6,48}+6p_{5,8}+4p_{6,24} \\ &+3p_{6,56}+3p_{6,4}+5p_{6,36}+2p_{6,20}+p_{6,52}+4p_{6,12}+5p_{6,44}+3p_{6,28} \\ &+4p_{6,60}+p_{6,2}+5p_{6,34}+6p_{6,18}+5p_{6,50}+2p_{6,10}+6p_{6,42}+5p_{5,26} \\ &+3p_{6,6}+6p_{6,38}+4p_{6,22}+10p_{6,54}+7p_{6,14}+8p_{6,46}+3p_{6,30}+6p_{6,62} \\ &+p_{6,1}+5p_{6,33}+5p_{6,17}+2p_{6,49}+3p_{6,9}+p_{6,41}+3p_{6,25}+4p_{6,57} \\ &+3p_{6,5}+2p_{6,37}+2p_{6,21}+3p_{6,53}+7p_{6,13}+6p_{6,45}+p_{6,61}+7p_{6,3} \\ &+2p_{6,35}+8p_{6,19}+5p_{6,51}+3p_{5,11}+8p_{6,27}+p_{6,59}+4p_{6,7}+5p_{6,39} \\ &+3p_{5,23}+4p_{6,15}+3p_{6,47}+2p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,61} = \frac{1}{2}p_{6,61} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,61}^2 - 4(5p_{6,0}+2p_{6,32}+5p_{6,16}+4p_{6,48}+6p_{5,8}+3p_{6,24} \\ &+4p_{6,56}+5p_{6,4}+3p_{6,36}+p_{6,20}+2p_{6,52}+5p_{6,12}+4p_{6,44}+4p_{6,28} \\ &+3p_{6,60}+5p_{6,2}+p_{6,34}+5p_{6,18}+6p_{6,50}+6p_{6,10}+2p_{6,42}+5p_{5,26} \\ &+6p_{6,6}+3p_{6,38}+10p_{6,22}+4p_{6,54}+8p_{6,14}+7p_{6,46}+6p_{6,30}+3p_{6,62} \\ &+5p_{6,1}+p_{6,33}+2p_{6,17}+5p_{6,49}+p_{6,9}+3p_{6,41}+4p_{6,25}+3p_{6,57} \\ &+2p_{6,5}+3p_{6,37}+3p_{6,21}+2p_{6,53}+6p_{6,13}+7p_{6,45}+p_{6,29}+2p_{6,3} \\ &+7p_{6,35}+5p_{6,19}+8p_{6,51}+3p_{5,11}+p_{6,27}+8p_{6,59}+5p_{6,7}+4p_{6,39} \\ &+3p_{5,23}+3p_{6,15}+4p_{6,47}+3p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,125} = \frac{1}{2}p_{6,61} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,61}^2 - 4(5p_{6,0}+2p_{6,32}+5p_{6,16}+4p_{6,48}+6p_{5,8}+3p_{6,24} \\ &+4p_{6,56}+5p_{6,4}+3p_{6,36}+p_{6,20}+2p_{6,52}+5p_{6,12}+4p_{6,44}+4p_{6,28} \\ &+3p_{6,60}+5p_{6,2}+p_{6,34}+5p_{6,18}+6p_{6,50}+6p_{6,10}+2p_{6,42}+5p_{5,26} \\ &+6p_{6,6}+3p_{6,38}+10p_{6,22}+4p_{6,54}+8p_{6,14}+7p_{6,46}+6p_{6,30}+3p_{6,62} \\ &+5p_{6,1}+p_{6,33}+2p_{6,17}+5p_{6,49}+p_{6,9}+3p_{6,41}+4p_{6,25}+3p_{6,57} \\ &+2p_{6,5}+3p_{6,37}+3p_{6,21}+2p_{6,53}+6p_{6,13}+7p_{6,45}+p_{6,29}+2p_{6,3} \\ &+7p_{6,35}+5p_{6,19}+8p_{6,51}+3p_{5,11}+p_{6,27}+8p_{6,59}+5p_{6,7}+4p_{6,39} \\ &+3p_{5,23}+3p_{6,15}+4p_{6,47}+3p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,3} = \frac{1}{2}p_{6,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,3}^2 - 4(5p_{5,0}+6p_{6,16}+2p_{6,48}+5p_{6,8}+p_{6,40}+5p_{6,24} \\ &+6p_{6,56}+3p_{6,4}+6p_{6,36}+8p_{6,20}+7p_{6,52}+6p_{6,12}+3p_{6,44}+10p_{6,28} \\ &+4p_{6,60}+3p_{6,2}+4p_{6,34}+5p_{6,18}+4p_{6,50}+5p_{6,10}+3p_{6,42}+p_{6,26} \\ &+2p_{6,58}+5p_{6,6}+2p_{6,38}+5p_{6,22}+4p_{6,54}+6p_{5,14}+3p_{6,30}+4p_{6,62} \\ &+8p_{6,1}+p_{6,33}+3p_{5,17}+2p_{6,9}+7p_{6,41}+5p_{6,25}+8p_{6,57}+2p_{6,5} \\ &+3p_{6,37}+3p_{6,21}+4p_{6,53}+5p_{6,13}+4p_{6,45}+3p_{5,29}+p_{6,35}+6p_{6,19} \\ &+7p_{6,51}+2p_{6,11}+3p_{6,43}+3p_{6,27}+2p_{6,59}+5p_{6,7}+p_{6,39}+2p_{6,23} \\ &+5p_{6,55}+p_{6,15}+3p_{6,47}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,67} = \frac{1}{2}p_{6,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,3}^2 - 4(5p_{5,0}+6p_{6,16}+2p_{6,48}+5p_{6,8}+p_{6,40}+5p_{6,24} \\ &+6p_{6,56}+3p_{6,4}+6p_{6,36}+8p_{6,20}+7p_{6,52}+6p_{6,12}+3p_{6,44}+10p_{6,28} \\ &+4p_{6,60}+3p_{6,2}+4p_{6,34}+5p_{6,18}+4p_{6,50}+5p_{6,10}+3p_{6,42}+p_{6,26} \\ &+2p_{6,58}+5p_{6,6}+2p_{6,38}+5p_{6,22}+4p_{6,54}+6p_{5,14}+3p_{6,30}+4p_{6,62} \\ &+8p_{6,1}+p_{6,33}+3p_{5,17}+2p_{6,9}+7p_{6,41}+5p_{6,25}+8p_{6,57}+2p_{6,5} \\ &+3p_{6,37}+3p_{6,21}+4p_{6,53}+5p_{6,13}+4p_{6,45}+3p_{5,29}+p_{6,35}+6p_{6,19} \\ &+7p_{6,51}+2p_{6,11}+3p_{6,43}+3p_{6,27}+2p_{6,59}+5p_{6,7}+p_{6,39}+2p_{6,23} \\ &+5p_{6,55}+p_{6,15}+3p_{6,47}+4p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,35} = \frac{1}{2}p_{6,35} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,35}^2 - 4(5p_{5,0}+2p_{6,16}+6p_{6,48}+p_{6,8}+5p_{6,40}+6p_{6,24} \\ &+5p_{6,56}+6p_{6,4}+3p_{6,36}+7p_{6,20}+8p_{6,52}+3p_{6,12}+6p_{6,44}+4p_{6,28} \\ &+10p_{6,60}+4p_{6,2}+3p_{6,34}+4p_{6,18}+5p_{6,50}+3p_{6,10}+5p_{6,42}+2p_{6,26} \\ &+p_{6,58}+2p_{6,6}+5p_{6,38}+4p_{6,22}+5p_{6,54}+6p_{5,14}+4p_{6,30}+3p_{6,62} \\ &+p_{6,1}+8p_{6,33}+3p_{5,17}+7p_{6,9}+2p_{6,41}+8p_{6,25}+5p_{6,57}+3p_{6,5} \\ &+2p_{6,37}+4p_{6,21}+3p_{6,53}+4p_{6,13}+5p_{6,45}+3p_{5,29}+p_{6,3}+7p_{6,19} \\ &+6p_{6,51}+3p_{6,11}+2p_{6,43}+2p_{6,27}+3p_{6,59}+p_{6,7}+5p_{6,39}+5p_{6,23} \\ &+2p_{6,55}+3p_{6,15}+p_{6,47}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,99} = \frac{1}{2}p_{6,35} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,35}^2 - 4(5p_{5,0}+2p_{6,16}+6p_{6,48}+p_{6,8}+5p_{6,40}+6p_{6,24} \\ &+5p_{6,56}+6p_{6,4}+3p_{6,36}+7p_{6,20}+8p_{6,52}+3p_{6,12}+6p_{6,44}+4p_{6,28} \\ &+10p_{6,60}+4p_{6,2}+3p_{6,34}+4p_{6,18}+5p_{6,50}+3p_{6,10}+5p_{6,42}+2p_{6,26} \\ &+p_{6,58}+2p_{6,6}+5p_{6,38}+4p_{6,22}+5p_{6,54}+6p_{5,14}+4p_{6,30}+3p_{6,62} \\ &+p_{6,1}+8p_{6,33}+3p_{5,17}+7p_{6,9}+2p_{6,41}+8p_{6,25}+5p_{6,57}+3p_{6,5} \\ &+2p_{6,37}+4p_{6,21}+3p_{6,53}+4p_{6,13}+5p_{6,45}+3p_{5,29}+p_{6,3}+7p_{6,19} \\ &+6p_{6,51}+3p_{6,11}+2p_{6,43}+2p_{6,27}+3p_{6,59}+p_{6,7}+5p_{6,39}+5p_{6,23} \\ &+2p_{6,55}+3p_{6,15}+p_{6,47}+3p_{6,31}+4p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,19} = \frac{1}{2}p_{6,19} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,19}^2 - 4(2p_{6,0}+6p_{6,32}+5p_{5,16}+6p_{6,8}+5p_{6,40}+5p_{6,24} \\ &+p_{6,56}+7p_{6,4}+8p_{6,36}+3p_{6,20}+6p_{6,52}+4p_{6,12}+10p_{6,44}+6p_{6,28} \\ &+3p_{6,60}+4p_{6,2}+5p_{6,34}+3p_{6,18}+4p_{6,50}+2p_{6,10}+p_{6,42}+5p_{6,26} \\ &+3p_{6,58}+4p_{6,6}+5p_{6,38}+5p_{6,22}+2p_{6,54}+4p_{6,14}+3p_{6,46}+6p_{5,30} \\ &+3p_{5,1}+8p_{6,17}+p_{6,49}+8p_{6,9}+5p_{6,41}+2p_{6,25}+7p_{6,57}+4p_{6,5} \\ &+3p_{6,37}+2p_{6,21}+3p_{6,53}+3p_{5,13}+5p_{6,29}+4p_{6,61}+7p_{6,3}+6p_{6,35} \\ &+p_{6,51}+2p_{6,11}+3p_{6,43}+2p_{6,27}+3p_{6,59}+5p_{6,7}+2p_{6,39}+5p_{6,23} \\ &+p_{6,55}+3p_{6,15}+4p_{6,47}+p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,83} = \frac{1}{2}p_{6,19} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,19}^2 - 4(2p_{6,0}+6p_{6,32}+5p_{5,16}+6p_{6,8}+5p_{6,40}+5p_{6,24} \\ &+p_{6,56}+7p_{6,4}+8p_{6,36}+3p_{6,20}+6p_{6,52}+4p_{6,12}+10p_{6,44}+6p_{6,28} \\ &+3p_{6,60}+4p_{6,2}+5p_{6,34}+3p_{6,18}+4p_{6,50}+2p_{6,10}+p_{6,42}+5p_{6,26} \\ &+3p_{6,58}+4p_{6,6}+5p_{6,38}+5p_{6,22}+2p_{6,54}+4p_{6,14}+3p_{6,46}+6p_{5,30} \\ &+3p_{5,1}+8p_{6,17}+p_{6,49}+8p_{6,9}+5p_{6,41}+2p_{6,25}+7p_{6,57}+4p_{6,5} \\ &+3p_{6,37}+2p_{6,21}+3p_{6,53}+3p_{5,13}+5p_{6,29}+4p_{6,61}+7p_{6,3}+6p_{6,35} \\ &+p_{6,51}+2p_{6,11}+3p_{6,43}+2p_{6,27}+3p_{6,59}+5p_{6,7}+2p_{6,39}+5p_{6,23} \\ &+p_{6,55}+3p_{6,15}+4p_{6,47}+p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,51} = \frac{1}{2}p_{6,51} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,51}^2 - 4(6p_{6,0}+2p_{6,32}+5p_{5,16}+5p_{6,8}+6p_{6,40}+p_{6,24} \\ &+5p_{6,56}+8p_{6,4}+7p_{6,36}+6p_{6,20}+3p_{6,52}+10p_{6,12}+4p_{6,44}+3p_{6,28} \\ &+6p_{6,60}+5p_{6,2}+4p_{6,34}+4p_{6,18}+3p_{6,50}+p_{6,10}+2p_{6,42}+3p_{6,26} \\ &+5p_{6,58}+5p_{6,6}+4p_{6,38}+2p_{6,22}+5p_{6,54}+3p_{6,14}+4p_{6,46}+6p_{5,30} \\ &+3p_{5,1}+p_{6,17}+8p_{6,49}+5p_{6,9}+8p_{6,41}+7p_{6,25}+2p_{6,57}+3p_{6,5} \\ &+4p_{6,37}+3p_{6,21}+2p_{6,53}+3p_{5,13}+4p_{6,29}+5p_{6,61}+6p_{6,3}+7p_{6,35} \\ &+p_{6,19}+3p_{6,11}+2p_{6,43}+3p_{6,27}+2p_{6,59}+2p_{6,7}+5p_{6,39}+p_{6,23} \\ &+5p_{6,55}+4p_{6,15}+3p_{6,47}+3p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,115} = \frac{1}{2}p_{6,51} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,51}^2 - 4(6p_{6,0}+2p_{6,32}+5p_{5,16}+5p_{6,8}+6p_{6,40}+p_{6,24} \\ &+5p_{6,56}+8p_{6,4}+7p_{6,36}+6p_{6,20}+3p_{6,52}+10p_{6,12}+4p_{6,44}+3p_{6,28} \\ &+6p_{6,60}+5p_{6,2}+4p_{6,34}+4p_{6,18}+3p_{6,50}+p_{6,10}+2p_{6,42}+3p_{6,26} \\ &+5p_{6,58}+5p_{6,6}+4p_{6,38}+2p_{6,22}+5p_{6,54}+3p_{6,14}+4p_{6,46}+6p_{5,30} \\ &+3p_{5,1}+p_{6,17}+8p_{6,49}+5p_{6,9}+8p_{6,41}+7p_{6,25}+2p_{6,57}+3p_{6,5} \\ &+4p_{6,37}+3p_{6,21}+2p_{6,53}+3p_{5,13}+4p_{6,29}+5p_{6,61}+6p_{6,3}+7p_{6,35} \\ &+p_{6,19}+3p_{6,11}+2p_{6,43}+3p_{6,27}+2p_{6,59}+2p_{6,7}+5p_{6,39}+p_{6,23} \\ &+5p_{6,55}+4p_{6,15}+3p_{6,47}+3p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,11} = \frac{1}{2}p_{6,11} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,11}^2 - 4(6p_{6,0}+5p_{6,32}+5p_{6,16}+p_{6,48}+5p_{5,8}+6p_{6,24} \\ &+2p_{6,56}+4p_{6,4}+10p_{6,36}+6p_{6,20}+3p_{6,52}+3p_{6,12}+6p_{6,44}+8p_{6,28} \\ &+7p_{6,60}+2p_{6,2}+p_{6,34}+5p_{6,18}+3p_{6,50}+3p_{6,10}+4p_{6,42}+5p_{6,26} \\ &+4p_{6,58}+4p_{6,6}+3p_{6,38}+6p_{5,22}+5p_{6,14}+2p_{6,46}+5p_{6,30}+4p_{6,62} \\ &+8p_{6,1}+5p_{6,33}+2p_{6,17}+7p_{6,49}+8p_{6,9}+p_{6,41}+3p_{5,25}+3p_{5,5} \\ &+5p_{6,21}+4p_{6,53}+2p_{6,13}+3p_{6,45}+3p_{6,29}+4p_{6,61}+2p_{6,3}+3p_{6,35} \\ &+2p_{6,19}+3p_{6,51}+p_{6,43}+6p_{6,27}+7p_{6,59}+3p_{6,7}+4p_{6,39}+p_{6,23} \\ &+3p_{6,55}+5p_{6,15}+p_{6,47}+2p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,75} = \frac{1}{2}p_{6,11} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,11}^2 - 4(6p_{6,0}+5p_{6,32}+5p_{6,16}+p_{6,48}+5p_{5,8}+6p_{6,24} \\ &+2p_{6,56}+4p_{6,4}+10p_{6,36}+6p_{6,20}+3p_{6,52}+3p_{6,12}+6p_{6,44}+8p_{6,28} \\ &+7p_{6,60}+2p_{6,2}+p_{6,34}+5p_{6,18}+3p_{6,50}+3p_{6,10}+4p_{6,42}+5p_{6,26} \\ &+4p_{6,58}+4p_{6,6}+3p_{6,38}+6p_{5,22}+5p_{6,14}+2p_{6,46}+5p_{6,30}+4p_{6,62} \\ &+8p_{6,1}+5p_{6,33}+2p_{6,17}+7p_{6,49}+8p_{6,9}+p_{6,41}+3p_{5,25}+3p_{5,5} \\ &+5p_{6,21}+4p_{6,53}+2p_{6,13}+3p_{6,45}+3p_{6,29}+4p_{6,61}+2p_{6,3}+3p_{6,35} \\ &+2p_{6,19}+3p_{6,51}+p_{6,43}+6p_{6,27}+7p_{6,59}+3p_{6,7}+4p_{6,39}+p_{6,23} \\ &+3p_{6,55}+5p_{6,15}+p_{6,47}+2p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,43} = \frac{1}{2}p_{6,43} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,43}^2 - 4(5p_{6,0}+6p_{6,32}+p_{6,16}+5p_{6,48}+5p_{5,8}+2p_{6,24} \\ &+6p_{6,56}+10p_{6,4}+4p_{6,36}+3p_{6,20}+6p_{6,52}+6p_{6,12}+3p_{6,44}+7p_{6,28} \\ &+8p_{6,60}+p_{6,2}+2p_{6,34}+3p_{6,18}+5p_{6,50}+4p_{6,10}+3p_{6,42}+4p_{6,26} \\ &+5p_{6,58}+3p_{6,6}+4p_{6,38}+6p_{5,22}+2p_{6,14}+5p_{6,46}+4p_{6,30}+5p_{6,62} \\ &+5p_{6,1}+8p_{6,33}+7p_{6,17}+2p_{6,49}+p_{6,9}+8p_{6,41}+3p_{5,25}+3p_{5,5} \\ &+4p_{6,21}+5p_{6,53}+3p_{6,13}+2p_{6,45}+4p_{6,29}+3p_{6,61}+3p_{6,3}+2p_{6,35} \\ &+3p_{6,19}+2p_{6,51}+p_{6,11}+7p_{6,27}+6p_{6,59}+4p_{6,7}+3p_{6,39}+3p_{6,23} \\ &+p_{6,55}+p_{6,15}+5p_{6,47}+5p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,107} = \frac{1}{2}p_{6,43} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,43}^2 - 4(5p_{6,0}+6p_{6,32}+p_{6,16}+5p_{6,48}+5p_{5,8}+2p_{6,24} \\ &+6p_{6,56}+10p_{6,4}+4p_{6,36}+3p_{6,20}+6p_{6,52}+6p_{6,12}+3p_{6,44}+7p_{6,28} \\ &+8p_{6,60}+p_{6,2}+2p_{6,34}+3p_{6,18}+5p_{6,50}+4p_{6,10}+3p_{6,42}+4p_{6,26} \\ &+5p_{6,58}+3p_{6,6}+4p_{6,38}+6p_{5,22}+2p_{6,14}+5p_{6,46}+4p_{6,30}+5p_{6,62} \\ &+5p_{6,1}+8p_{6,33}+7p_{6,17}+2p_{6,49}+p_{6,9}+8p_{6,41}+3p_{5,25}+3p_{5,5} \\ &+4p_{6,21}+5p_{6,53}+3p_{6,13}+2p_{6,45}+4p_{6,29}+3p_{6,61}+3p_{6,3}+2p_{6,35} \\ &+3p_{6,19}+2p_{6,51}+p_{6,11}+7p_{6,27}+6p_{6,59}+4p_{6,7}+3p_{6,39}+3p_{6,23} \\ &+p_{6,55}+p_{6,15}+5p_{6,47}+5p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,27} = \frac{1}{2}p_{6,27} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,27}^2 - 4(p_{6,0}+5p_{6,32}+6p_{6,16}+5p_{6,48}+2p_{6,8}+6p_{6,40} \\ &+5p_{5,24}+3p_{6,4}+6p_{6,36}+4p_{6,20}+10p_{6,52}+7p_{6,12}+8p_{6,44}+3p_{6,28} \\ &+6p_{6,60}+3p_{6,2}+5p_{6,34}+2p_{6,18}+p_{6,50}+4p_{6,10}+5p_{6,42}+3p_{6,26} \\ &+4p_{6,58}+6p_{5,6}+4p_{6,22}+3p_{6,54}+4p_{6,14}+5p_{6,46}+5p_{6,30}+2p_{6,62} \\ &+7p_{6,1}+2p_{6,33}+8p_{6,17}+5p_{6,49}+3p_{5,9}+8p_{6,25}+p_{6,57}+4p_{6,5} \\ &+5p_{6,37}+3p_{5,21}+4p_{6,13}+3p_{6,45}+2p_{6,29}+3p_{6,61}+3p_{6,3}+2p_{6,35} \\ &+2p_{6,19}+3p_{6,51}+7p_{6,11}+6p_{6,43}+p_{6,59}+3p_{6,7}+p_{6,39}+3p_{6,23} \\ &+4p_{6,55}+5p_{6,15}+2p_{6,47}+5p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,91} = \frac{1}{2}p_{6,27} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,27}^2 - 4(p_{6,0}+5p_{6,32}+6p_{6,16}+5p_{6,48}+2p_{6,8}+6p_{6,40} \\ &+5p_{5,24}+3p_{6,4}+6p_{6,36}+4p_{6,20}+10p_{6,52}+7p_{6,12}+8p_{6,44}+3p_{6,28} \\ &+6p_{6,60}+3p_{6,2}+5p_{6,34}+2p_{6,18}+p_{6,50}+4p_{6,10}+5p_{6,42}+3p_{6,26} \\ &+4p_{6,58}+6p_{5,6}+4p_{6,22}+3p_{6,54}+4p_{6,14}+5p_{6,46}+5p_{6,30}+2p_{6,62} \\ &+7p_{6,1}+2p_{6,33}+8p_{6,17}+5p_{6,49}+3p_{5,9}+8p_{6,25}+p_{6,57}+4p_{6,5} \\ &+5p_{6,37}+3p_{5,21}+4p_{6,13}+3p_{6,45}+2p_{6,29}+3p_{6,61}+3p_{6,3}+2p_{6,35} \\ &+2p_{6,19}+3p_{6,51}+7p_{6,11}+6p_{6,43}+p_{6,59}+3p_{6,7}+p_{6,39}+3p_{6,23} \\ &+4p_{6,55}+5p_{6,15}+2p_{6,47}+5p_{6,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,59} = \frac{1}{2}p_{6,59} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,59}^2 - 4(5p_{6,0}+p_{6,32}+5p_{6,16}+6p_{6,48}+6p_{6,8}+2p_{6,40} \\ &+5p_{5,24}+6p_{6,4}+3p_{6,36}+10p_{6,20}+4p_{6,52}+8p_{6,12}+7p_{6,44}+6p_{6,28} \\ &+3p_{6,60}+5p_{6,2}+3p_{6,34}+p_{6,18}+2p_{6,50}+5p_{6,10}+4p_{6,42}+4p_{6,26} \\ &+3p_{6,58}+6p_{5,6}+3p_{6,22}+4p_{6,54}+5p_{6,14}+4p_{6,46}+2p_{6,30}+5p_{6,62} \\ &+2p_{6,1}+7p_{6,33}+5p_{6,17}+8p_{6,49}+3p_{5,9}+p_{6,25}+8p_{6,57}+5p_{6,5} \\ &+4p_{6,37}+3p_{5,21}+3p_{6,13}+4p_{6,45}+3p_{6,29}+2p_{6,61}+2p_{6,3}+3p_{6,35} \\ &+3p_{6,19}+2p_{6,51}+6p_{6,11}+7p_{6,43}+p_{6,27}+p_{6,7}+3p_{6,39}+4p_{6,23} \\ &+3p_{6,55}+2p_{6,15}+5p_{6,47}+p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,123} = \frac{1}{2}p_{6,59} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,59}^2 - 4(5p_{6,0}+p_{6,32}+5p_{6,16}+6p_{6,48}+6p_{6,8}+2p_{6,40} \\ &+5p_{5,24}+6p_{6,4}+3p_{6,36}+10p_{6,20}+4p_{6,52}+8p_{6,12}+7p_{6,44}+6p_{6,28} \\ &+3p_{6,60}+5p_{6,2}+3p_{6,34}+p_{6,18}+2p_{6,50}+5p_{6,10}+4p_{6,42}+4p_{6,26} \\ &+3p_{6,58}+6p_{5,6}+3p_{6,22}+4p_{6,54}+5p_{6,14}+4p_{6,46}+2p_{6,30}+5p_{6,62} \\ &+2p_{6,1}+7p_{6,33}+5p_{6,17}+8p_{6,49}+3p_{5,9}+p_{6,25}+8p_{6,57}+5p_{6,5} \\ &+4p_{6,37}+3p_{5,21}+3p_{6,13}+4p_{6,45}+3p_{6,29}+2p_{6,61}+2p_{6,3}+3p_{6,35} \\ &+3p_{6,19}+2p_{6,51}+6p_{6,11}+7p_{6,43}+p_{6,27}+p_{6,7}+3p_{6,39}+4p_{6,23} \\ &+3p_{6,55}+2p_{6,15}+5p_{6,47}+p_{6,31}+5p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,7} = \frac{1}{2}p_{6,7} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,7}^2 - 4(4p_{6,0}+10p_{6,32}+6p_{6,16}+3p_{6,48}+3p_{6,8}+6p_{6,40} \\ &+8p_{6,24}+7p_{6,56}+5p_{5,4}+6p_{6,20}+2p_{6,52}+5p_{6,12}+p_{6,44}+5p_{6,28} \\ &+6p_{6,60}+4p_{6,2}+3p_{6,34}+6p_{5,18}+5p_{6,10}+2p_{6,42}+5p_{6,26}+4p_{6,58} \\ &+3p_{6,6}+4p_{6,38}+5p_{6,22}+4p_{6,54}+5p_{6,14}+3p_{6,46}+p_{6,30}+2p_{6,62} \\ &+3p_{5,1}+5p_{6,17}+4p_{6,49}+2p_{6,9}+3p_{6,41}+3p_{6,25}+4p_{6,57}+8p_{6,5} \\ &+p_{6,37}+3p_{5,21}+2p_{6,13}+7p_{6,45}+5p_{6,29}+8p_{6,61}+3p_{6,3}+4p_{6,35} \\ &+p_{6,19}+3p_{6,51}+5p_{6,11}+p_{6,43}+2p_{6,27}+5p_{6,59}+p_{6,39}+6p_{6,23} \\ &+7p_{6,55}+2p_{6,15}+3p_{6,47}+3p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,71} = \frac{1}{2}p_{6,7} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,7}^2 - 4(4p_{6,0}+10p_{6,32}+6p_{6,16}+3p_{6,48}+3p_{6,8}+6p_{6,40} \\ &+8p_{6,24}+7p_{6,56}+5p_{5,4}+6p_{6,20}+2p_{6,52}+5p_{6,12}+p_{6,44}+5p_{6,28} \\ &+6p_{6,60}+4p_{6,2}+3p_{6,34}+6p_{5,18}+5p_{6,10}+2p_{6,42}+5p_{6,26}+4p_{6,58} \\ &+3p_{6,6}+4p_{6,38}+5p_{6,22}+4p_{6,54}+5p_{6,14}+3p_{6,46}+p_{6,30}+2p_{6,62} \\ &+3p_{5,1}+5p_{6,17}+4p_{6,49}+2p_{6,9}+3p_{6,41}+3p_{6,25}+4p_{6,57}+8p_{6,5} \\ &+p_{6,37}+3p_{5,21}+2p_{6,13}+7p_{6,45}+5p_{6,29}+8p_{6,61}+3p_{6,3}+4p_{6,35} \\ &+p_{6,19}+3p_{6,51}+5p_{6,11}+p_{6,43}+2p_{6,27}+5p_{6,59}+p_{6,39}+6p_{6,23} \\ &+7p_{6,55}+2p_{6,15}+3p_{6,47}+3p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,39} = \frac{1}{2}p_{6,39} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,39}^2 - 4(10p_{6,0}+4p_{6,32}+3p_{6,16}+6p_{6,48}+6p_{6,8}+3p_{6,40} \\ &+7p_{6,24}+8p_{6,56}+5p_{5,4}+2p_{6,20}+6p_{6,52}+p_{6,12}+5p_{6,44}+6p_{6,28} \\ &+5p_{6,60}+3p_{6,2}+4p_{6,34}+6p_{5,18}+2p_{6,10}+5p_{6,42}+4p_{6,26}+5p_{6,58} \\ &+4p_{6,6}+3p_{6,38}+4p_{6,22}+5p_{6,54}+3p_{6,14}+5p_{6,46}+2p_{6,30}+p_{6,62} \\ &+3p_{5,1}+4p_{6,17}+5p_{6,49}+3p_{6,9}+2p_{6,41}+4p_{6,25}+3p_{6,57}+p_{6,5} \\ &+8p_{6,37}+3p_{5,21}+7p_{6,13}+2p_{6,45}+8p_{6,29}+5p_{6,61}+4p_{6,3}+3p_{6,35} \\ &+3p_{6,19}+p_{6,51}+p_{6,11}+5p_{6,43}+5p_{6,27}+2p_{6,59}+p_{6,7}+7p_{6,23} \\ &+6p_{6,55}+3p_{6,15}+2p_{6,47}+2p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,103} = \frac{1}{2}p_{6,39} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,39}^2 - 4(10p_{6,0}+4p_{6,32}+3p_{6,16}+6p_{6,48}+6p_{6,8}+3p_{6,40} \\ &+7p_{6,24}+8p_{6,56}+5p_{5,4}+2p_{6,20}+6p_{6,52}+p_{6,12}+5p_{6,44}+6p_{6,28} \\ &+5p_{6,60}+3p_{6,2}+4p_{6,34}+6p_{5,18}+2p_{6,10}+5p_{6,42}+4p_{6,26}+5p_{6,58} \\ &+4p_{6,6}+3p_{6,38}+4p_{6,22}+5p_{6,54}+3p_{6,14}+5p_{6,46}+2p_{6,30}+p_{6,62} \\ &+3p_{5,1}+4p_{6,17}+5p_{6,49}+3p_{6,9}+2p_{6,41}+4p_{6,25}+3p_{6,57}+p_{6,5} \\ &+8p_{6,37}+3p_{5,21}+7p_{6,13}+2p_{6,45}+8p_{6,29}+5p_{6,61}+4p_{6,3}+3p_{6,35} \\ &+3p_{6,19}+p_{6,51}+p_{6,11}+5p_{6,43}+5p_{6,27}+2p_{6,59}+p_{6,7}+7p_{6,23} \\ &+6p_{6,55}+3p_{6,15}+2p_{6,47}+2p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,23} = \frac{1}{2}p_{6,23} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,23}^2 - 4(3p_{6,0}+6p_{6,32}+4p_{6,16}+10p_{6,48}+7p_{6,8}+8p_{6,40} \\ &+3p_{6,24}+6p_{6,56}+2p_{6,4}+6p_{6,36}+5p_{5,20}+6p_{6,12}+5p_{6,44}+5p_{6,28} \\ &+p_{6,60}+6p_{5,2}+4p_{6,18}+3p_{6,50}+4p_{6,10}+5p_{6,42}+5p_{6,26}+2p_{6,58} \\ &+4p_{6,6}+5p_{6,38}+3p_{6,22}+4p_{6,54}+2p_{6,14}+p_{6,46}+5p_{6,30}+3p_{6,62} \\ &+4p_{6,1}+5p_{6,33}+3p_{5,17}+4p_{6,9}+3p_{6,41}+2p_{6,25}+3p_{6,57}+3p_{5,5} \\ &+8p_{6,21}+p_{6,53}+8p_{6,13}+5p_{6,45}+2p_{6,29}+7p_{6,61}+3p_{6,3}+p_{6,35} \\ &+3p_{6,19}+4p_{6,51}+5p_{6,11}+2p_{6,43}+5p_{6,27}+p_{6,59}+7p_{6,7}+6p_{6,39} \\ &+p_{6,55}+2p_{6,15}+3p_{6,47}+2p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,87} = \frac{1}{2}p_{6,23} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,23}^2 - 4(3p_{6,0}+6p_{6,32}+4p_{6,16}+10p_{6,48}+7p_{6,8}+8p_{6,40} \\ &+3p_{6,24}+6p_{6,56}+2p_{6,4}+6p_{6,36}+5p_{5,20}+6p_{6,12}+5p_{6,44}+5p_{6,28} \\ &+p_{6,60}+6p_{5,2}+4p_{6,18}+3p_{6,50}+4p_{6,10}+5p_{6,42}+5p_{6,26}+2p_{6,58} \\ &+4p_{6,6}+5p_{6,38}+3p_{6,22}+4p_{6,54}+2p_{6,14}+p_{6,46}+5p_{6,30}+3p_{6,62} \\ &+4p_{6,1}+5p_{6,33}+3p_{5,17}+4p_{6,9}+3p_{6,41}+2p_{6,25}+3p_{6,57}+3p_{5,5} \\ &+8p_{6,21}+p_{6,53}+8p_{6,13}+5p_{6,45}+2p_{6,29}+7p_{6,61}+3p_{6,3}+p_{6,35} \\ &+3p_{6,19}+4p_{6,51}+5p_{6,11}+2p_{6,43}+5p_{6,27}+p_{6,59}+7p_{6,7}+6p_{6,39} \\ &+p_{6,55}+2p_{6,15}+3p_{6,47}+2p_{6,31}+3p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,55} = \frac{1}{2}p_{6,55} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,55}^2 - 4(6p_{6,0}+3p_{6,32}+10p_{6,16}+4p_{6,48}+8p_{6,8}+7p_{6,40} \\ &+6p_{6,24}+3p_{6,56}+6p_{6,4}+2p_{6,36}+5p_{5,20}+5p_{6,12}+6p_{6,44}+p_{6,28} \\ &+5p_{6,60}+6p_{5,2}+3p_{6,18}+4p_{6,50}+5p_{6,10}+4p_{6,42}+2p_{6,26}+5p_{6,58} \\ &+5p_{6,6}+4p_{6,38}+4p_{6,22}+3p_{6,54}+p_{6,14}+2p_{6,46}+3p_{6,30}+5p_{6,62} \\ &+5p_{6,1}+4p_{6,33}+3p_{5,17}+3p_{6,9}+4p_{6,41}+3p_{6,25}+2p_{6,57}+3p_{5,5} \\ &+p_{6,21}+8p_{6,53}+5p_{6,13}+8p_{6,45}+7p_{6,29}+2p_{6,61}+p_{6,3}+3p_{6,35} \\ &+4p_{6,19}+3p_{6,51}+2p_{6,11}+5p_{6,43}+p_{6,27}+5p_{6,59}+6p_{6,7}+7p_{6,39} \\ &+p_{6,23}+3p_{6,15}+2p_{6,47}+3p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,119} = \frac{1}{2}p_{6,55} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,55}^2 - 4(6p_{6,0}+3p_{6,32}+10p_{6,16}+4p_{6,48}+8p_{6,8}+7p_{6,40} \\ &+6p_{6,24}+3p_{6,56}+6p_{6,4}+2p_{6,36}+5p_{5,20}+5p_{6,12}+6p_{6,44}+p_{6,28} \\ &+5p_{6,60}+6p_{5,2}+3p_{6,18}+4p_{6,50}+5p_{6,10}+4p_{6,42}+2p_{6,26}+5p_{6,58} \\ &+5p_{6,6}+4p_{6,38}+4p_{6,22}+3p_{6,54}+p_{6,14}+2p_{6,46}+3p_{6,30}+5p_{6,62} \\ &+5p_{6,1}+4p_{6,33}+3p_{5,17}+3p_{6,9}+4p_{6,41}+3p_{6,25}+2p_{6,57}+3p_{5,5} \\ &+p_{6,21}+8p_{6,53}+5p_{6,13}+8p_{6,45}+7p_{6,29}+2p_{6,61}+p_{6,3}+3p_{6,35} \\ &+4p_{6,19}+3p_{6,51}+2p_{6,11}+5p_{6,43}+p_{6,27}+5p_{6,59}+6p_{6,7}+7p_{6,39} \\ &+p_{6,23}+3p_{6,15}+2p_{6,47}+3p_{6,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,15} = \frac{1}{2}p_{6,15} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,15}^2 - 4(7p_{6,0}+8p_{6,32}+3p_{6,16}+6p_{6,48}+4p_{6,8}+10p_{6,40} \\ &+6p_{6,24}+3p_{6,56}+6p_{6,4}+5p_{6,36}+5p_{6,20}+p_{6,52}+5p_{5,12}+6p_{6,28} \\ &+2p_{6,60}+4p_{6,2}+5p_{6,34}+5p_{6,18}+2p_{6,50}+4p_{6,10}+3p_{6,42}+6p_{5,26} \\ &+2p_{6,6}+p_{6,38}+5p_{6,22}+3p_{6,54}+3p_{6,14}+4p_{6,46}+5p_{6,30}+4p_{6,62} \\ &+4p_{6,1}+3p_{6,33}+2p_{6,17}+3p_{6,49}+3p_{5,9}+5p_{6,25}+4p_{6,57}+8p_{6,5} \\ &+5p_{6,37}+2p_{6,21}+7p_{6,53}+8p_{6,13}+p_{6,45}+3p_{5,29}+5p_{6,3}+2p_{6,35} \\ &+5p_{6,19}+p_{6,51}+3p_{6,11}+4p_{6,43}+p_{6,27}+3p_{6,59}+2p_{6,7}+3p_{6,39} \\ &+2p_{6,23}+3p_{6,55}+p_{6,47}+6p_{6,31}+7p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,79} = \frac{1}{2}p_{6,15} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,15}^2 - 4(7p_{6,0}+8p_{6,32}+3p_{6,16}+6p_{6,48}+4p_{6,8}+10p_{6,40} \\ &+6p_{6,24}+3p_{6,56}+6p_{6,4}+5p_{6,36}+5p_{6,20}+p_{6,52}+5p_{5,12}+6p_{6,28} \\ &+2p_{6,60}+4p_{6,2}+5p_{6,34}+5p_{6,18}+2p_{6,50}+4p_{6,10}+3p_{6,42}+6p_{5,26} \\ &+2p_{6,6}+p_{6,38}+5p_{6,22}+3p_{6,54}+3p_{6,14}+4p_{6,46}+5p_{6,30}+4p_{6,62} \\ &+4p_{6,1}+3p_{6,33}+2p_{6,17}+3p_{6,49}+3p_{5,9}+5p_{6,25}+4p_{6,57}+8p_{6,5} \\ &+5p_{6,37}+2p_{6,21}+7p_{6,53}+8p_{6,13}+p_{6,45}+3p_{5,29}+5p_{6,3}+2p_{6,35} \\ &+5p_{6,19}+p_{6,51}+3p_{6,11}+4p_{6,43}+p_{6,27}+3p_{6,59}+2p_{6,7}+3p_{6,39} \\ &+2p_{6,23}+3p_{6,55}+p_{6,47}+6p_{6,31}+7p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,47} = \frac{1}{2}p_{6,47} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,47}^2 - 4(8p_{6,0}+7p_{6,32}+6p_{6,16}+3p_{6,48}+10p_{6,8}+4p_{6,40} \\ &+3p_{6,24}+6p_{6,56}+5p_{6,4}+6p_{6,36}+p_{6,20}+5p_{6,52}+5p_{5,12}+2p_{6,28} \\ &+6p_{6,60}+5p_{6,2}+4p_{6,34}+2p_{6,18}+5p_{6,50}+3p_{6,10}+4p_{6,42}+6p_{5,26} \\ &+p_{6,6}+2p_{6,38}+3p_{6,22}+5p_{6,54}+4p_{6,14}+3p_{6,46}+4p_{6,30}+5p_{6,62} \\ &+3p_{6,1}+4p_{6,33}+3p_{6,17}+2p_{6,49}+3p_{5,9}+4p_{6,25}+5p_{6,57}+5p_{6,5} \\ &+8p_{6,37}+7p_{6,21}+2p_{6,53}+p_{6,13}+8p_{6,45}+3p_{5,29}+2p_{6,3}+5p_{6,35} \\ &+p_{6,19}+5p_{6,51}+4p_{6,11}+3p_{6,43}+3p_{6,27}+p_{6,59}+3p_{6,7}+2p_{6,39} \\ &+3p_{6,23}+2p_{6,55}+p_{6,15}+7p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,111} = \frac{1}{2}p_{6,47} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,47}^2 - 4(8p_{6,0}+7p_{6,32}+6p_{6,16}+3p_{6,48}+10p_{6,8}+4p_{6,40} \\ &+3p_{6,24}+6p_{6,56}+5p_{6,4}+6p_{6,36}+p_{6,20}+5p_{6,52}+5p_{5,12}+2p_{6,28} \\ &+6p_{6,60}+5p_{6,2}+4p_{6,34}+2p_{6,18}+5p_{6,50}+3p_{6,10}+4p_{6,42}+6p_{5,26} \\ &+p_{6,6}+2p_{6,38}+3p_{6,22}+5p_{6,54}+4p_{6,14}+3p_{6,46}+4p_{6,30}+5p_{6,62} \\ &+3p_{6,1}+4p_{6,33}+3p_{6,17}+2p_{6,49}+3p_{5,9}+4p_{6,25}+5p_{6,57}+5p_{6,5} \\ &+8p_{6,37}+7p_{6,21}+2p_{6,53}+p_{6,13}+8p_{6,45}+3p_{5,29}+2p_{6,3}+5p_{6,35} \\ &+p_{6,19}+5p_{6,51}+4p_{6,11}+3p_{6,43}+3p_{6,27}+p_{6,59}+3p_{6,7}+2p_{6,39} \\ &+3p_{6,23}+2p_{6,55}+p_{6,15}+7p_{6,31}+6p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,31} = \frac{1}{2}p_{6,31} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,31}^2 - 4(6p_{6,0}+3p_{6,32}+7p_{6,16}+8p_{6,48}+3p_{6,8}+6p_{6,40} \\ &+4p_{6,24}+10p_{6,56}+p_{6,4}+5p_{6,36}+6p_{6,20}+5p_{6,52}+2p_{6,12}+6p_{6,44} \\ &+5p_{5,28}+2p_{6,2}+5p_{6,34}+4p_{6,18}+5p_{6,50}+6p_{5,10}+4p_{6,26}+3p_{6,58} \\ &+3p_{6,6}+5p_{6,38}+2p_{6,22}+p_{6,54}+4p_{6,14}+5p_{6,46}+3p_{6,30}+4p_{6,62} \\ &+3p_{6,1}+2p_{6,33}+4p_{6,17}+3p_{6,49}+4p_{6,9}+5p_{6,41}+3p_{5,25}+7p_{6,5} \\ &+2p_{6,37}+8p_{6,21}+5p_{6,53}+3p_{5,13}+8p_{6,29}+p_{6,61}+p_{6,3}+5p_{6,35} \\ &+5p_{6,19}+2p_{6,51}+3p_{6,11}+p_{6,43}+3p_{6,27}+4p_{6,59}+3p_{6,7}+2p_{6,39} \\ &+2p_{6,23}+3p_{6,55}+7p_{6,15}+6p_{6,47}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,95} = \frac{1}{2}p_{6,31} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,31}^2 - 4(6p_{6,0}+3p_{6,32}+7p_{6,16}+8p_{6,48}+3p_{6,8}+6p_{6,40} \\ &+4p_{6,24}+10p_{6,56}+p_{6,4}+5p_{6,36}+6p_{6,20}+5p_{6,52}+2p_{6,12}+6p_{6,44} \\ &+5p_{5,28}+2p_{6,2}+5p_{6,34}+4p_{6,18}+5p_{6,50}+6p_{5,10}+4p_{6,26}+3p_{6,58} \\ &+3p_{6,6}+5p_{6,38}+2p_{6,22}+p_{6,54}+4p_{6,14}+5p_{6,46}+3p_{6,30}+4p_{6,62} \\ &+3p_{6,1}+2p_{6,33}+4p_{6,17}+3p_{6,49}+4p_{6,9}+5p_{6,41}+3p_{5,25}+7p_{6,5} \\ &+2p_{6,37}+8p_{6,21}+5p_{6,53}+3p_{5,13}+8p_{6,29}+p_{6,61}+p_{6,3}+5p_{6,35} \\ &+5p_{6,19}+2p_{6,51}+3p_{6,11}+p_{6,43}+3p_{6,27}+4p_{6,59}+3p_{6,7}+2p_{6,39} \\ &+2p_{6,23}+3p_{6,55}+7p_{6,15}+6p_{6,47}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,63} = \frac{1}{2}p_{6,63} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,63}^2 - 4(3p_{6,0}+6p_{6,32}+8p_{6,16}+7p_{6,48}+6p_{6,8}+3p_{6,40} \\ &+10p_{6,24}+4p_{6,56}+5p_{6,4}+p_{6,36}+5p_{6,20}+6p_{6,52}+6p_{6,12}+2p_{6,44} \\ &+5p_{5,28}+5p_{6,2}+2p_{6,34}+5p_{6,18}+4p_{6,50}+6p_{5,10}+3p_{6,26}+4p_{6,58} \\ &+5p_{6,6}+3p_{6,38}+p_{6,22}+2p_{6,54}+5p_{6,14}+4p_{6,46}+4p_{6,30}+3p_{6,62} \\ &+2p_{6,1}+3p_{6,33}+3p_{6,17}+4p_{6,49}+5p_{6,9}+4p_{6,41}+3p_{5,25}+2p_{6,5} \\ &+7p_{6,37}+5p_{6,21}+8p_{6,53}+3p_{5,13}+p_{6,29}+8p_{6,61}+5p_{6,3}+p_{6,35} \\ &+2p_{6,19}+5p_{6,51}+p_{6,11}+3p_{6,43}+4p_{6,27}+3p_{6,59}+2p_{6,7}+3p_{6,39} \\ &+3p_{6,23}+2p_{6,55}+6p_{6,15}+7p_{6,47}+p_{6,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{7,127} = \frac{1}{2}p_{6,63} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{6,63}^2 - 4(3p_{6,0}+6p_{6,32}+8p_{6,16}+7p_{6,48}+6p_{6,8}+3p_{6,40} \\ &+10p_{6,24}+4p_{6,56}+5p_{6,4}+p_{6,36}+5p_{6,20}+6p_{6,52}+6p_{6,12}+2p_{6,44} \\ &+5p_{5,28}+5p_{6,2}+2p_{6,34}+5p_{6,18}+4p_{6,50}+6p_{5,10}+3p_{6,26}+4p_{6,58} \\ &+5p_{6,6}+3p_{6,38}+p_{6,22}+2p_{6,54}+5p_{6,14}+4p_{6,46}+4p_{6,30}+3p_{6,62} \\ &+2p_{6,1}+3p_{6,33}+3p_{6,17}+4p_{6,49}+5p_{6,9}+4p_{6,41}+3p_{5,25}+2p_{6,5} \\ &+7p_{6,37}+5p_{6,21}+8p_{6,53}+3p_{5,13}+p_{6,29}+8p_{6,61}+5p_{6,3}+p_{6,35} \\ &+2p_{6,19}+5p_{6,51}+p_{6,11}+3p_{6,43}+4p_{6,27}+3p_{6,59}+2p_{6,7}+3p_{6,39} \\ &+3p_{6,23}+2p_{6,55}+6p_{6,15}+7p_{6,47}+p_{6,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,0} = \frac{1}{2}p_{7,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,0}^2 - 4(2p_{7,0}+p_{6,16}+p_{7,48}+p_{7,8}+2p_{6,40}+2p_{7,88}+p_{7,56} \\ &+p_{7,4}+2p_{7,36}+3p_{7,100}+p_{7,20}+p_{7,116}+2p_{7,76}+2p_{7,108}+p_{6,60} \\ &+2p_{7,34}+p_{7,98}+p_{7,82}+4p_{7,114}+3p_{7,10}+2p_{7,74}+2p_{7,42} \\ &+4p_{7,106}+p_{6,26}+p_{7,58}+p_{7,6}+2p_{7,70}+2p_{7,38}+p_{6,22}+p_{7,118} \\ &+p_{7,14}+p_{7,110}+p_{7,30}+2p_{7,94}+p_{7,1}+4p_{7,65}+2p_{6,33}+2p_{7,73} \\ &+2p_{7,41}+3p_{7,105}+p_{6,25}+5p_{7,57}+2p_{7,121}+p_{7,37}+2p_{7,101} \\ &+2p_{7,117}+p_{7,45}+2p_{7,109}+3p_{7,29}+p_{6,61}+p_{7,3}+2p_{7,67}+p_{6,35} \\ &+2p_{7,83}+p_{6,51}+2p_{7,59}+p_{7,123}+p_{7,7}+2p_{7,103}+2p_{7,87}+p_{7,119} \\ &+p_{7,15}+2p_{7,79}+p_{6,47}+p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,128} = \frac{1}{2}p_{7,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,0}^2 - 4(2p_{7,0}+p_{6,16}+p_{7,48}+p_{7,8}+2p_{6,40}+2p_{7,88}+p_{7,56} \\ &+p_{7,4}+2p_{7,36}+3p_{7,100}+p_{7,20}+p_{7,116}+2p_{7,76}+2p_{7,108}+p_{6,60} \\ &+2p_{7,34}+p_{7,98}+p_{7,82}+4p_{7,114}+3p_{7,10}+2p_{7,74}+2p_{7,42} \\ &+4p_{7,106}+p_{6,26}+p_{7,58}+p_{7,6}+2p_{7,70}+2p_{7,38}+p_{6,22}+p_{7,118} \\ &+p_{7,14}+p_{7,110}+p_{7,30}+2p_{7,94}+p_{7,1}+4p_{7,65}+2p_{6,33}+2p_{7,73} \\ &+2p_{7,41}+3p_{7,105}+p_{6,25}+5p_{7,57}+2p_{7,121}+p_{7,37}+2p_{7,101} \\ &+2p_{7,117}+p_{7,45}+2p_{7,109}+3p_{7,29}+p_{6,61}+p_{7,3}+2p_{7,67}+p_{6,35} \\ &+2p_{7,83}+p_{6,51}+2p_{7,59}+p_{7,123}+p_{7,7}+2p_{7,103}+2p_{7,87}+p_{7,119} \\ &+p_{7,15}+2p_{7,79}+p_{6,47}+p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,64} = \frac{1}{2}p_{7,64} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,64}^2 - 4(2p_{7,64}+p_{6,16}+p_{7,112}+p_{7,72}+2p_{6,40}+2p_{7,24} \\ &+p_{7,120}+p_{7,68}+3p_{7,36}+2p_{7,100}+p_{7,84}+p_{7,52}+2p_{7,12}+2p_{7,44} \\ &+p_{6,60}+p_{7,34}+2p_{7,98}+p_{7,18}+4p_{7,50}+2p_{7,10}+3p_{7,74}+4p_{7,42} \\ &+2p_{7,106}+p_{6,26}+p_{7,122}+2p_{7,6}+p_{7,70}+2p_{7,102}+p_{6,22}+p_{7,54} \\ &+p_{7,78}+p_{7,46}+2p_{7,30}+p_{7,94}+4p_{7,1}+p_{7,65}+2p_{6,33}+2p_{7,9} \\ &+3p_{7,41}+2p_{7,105}+p_{6,25}+2p_{7,57}+5p_{7,121}+2p_{7,37}+p_{7,101} \\ &+2p_{7,53}+2p_{7,45}+p_{7,109}+3p_{7,93}+p_{6,61}+2p_{7,3}+p_{7,67}+p_{6,35} \\ &+2p_{7,19}+p_{6,51}+p_{7,59}+2p_{7,123}+p_{7,71}+2p_{7,39}+2p_{7,23}+p_{7,55} \\ &+2p_{7,15}+p_{7,79}+p_{6,47}+p_{7,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,192} = \frac{1}{2}p_{7,64} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,64}^2 - 4(2p_{7,64}+p_{6,16}+p_{7,112}+p_{7,72}+2p_{6,40}+2p_{7,24} \\ &+p_{7,120}+p_{7,68}+3p_{7,36}+2p_{7,100}+p_{7,84}+p_{7,52}+2p_{7,12}+2p_{7,44} \\ &+p_{6,60}+p_{7,34}+2p_{7,98}+p_{7,18}+4p_{7,50}+2p_{7,10}+3p_{7,74}+4p_{7,42} \\ &+2p_{7,106}+p_{6,26}+p_{7,122}+2p_{7,6}+p_{7,70}+2p_{7,102}+p_{6,22}+p_{7,54} \\ &+p_{7,78}+p_{7,46}+2p_{7,30}+p_{7,94}+4p_{7,1}+p_{7,65}+2p_{6,33}+2p_{7,9} \\ &+3p_{7,41}+2p_{7,105}+p_{6,25}+2p_{7,57}+5p_{7,121}+2p_{7,37}+p_{7,101} \\ &+2p_{7,53}+2p_{7,45}+p_{7,109}+3p_{7,93}+p_{6,61}+2p_{7,3}+p_{7,67}+p_{6,35} \\ &+2p_{7,19}+p_{6,51}+p_{7,59}+2p_{7,123}+p_{7,71}+2p_{7,39}+2p_{7,23}+p_{7,55} \\ &+2p_{7,15}+p_{7,79}+p_{6,47}+p_{7,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,32} = \frac{1}{2}p_{7,32} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,32}^2 - 4(2p_{7,32}+p_{7,80}+p_{6,48}+2p_{6,8}+p_{7,40}+p_{7,88} \\ &+2p_{7,120}+3p_{7,4}+2p_{7,68}+p_{7,36}+p_{7,20}+p_{7,52}+2p_{7,12}+2p_{7,108} \\ &+p_{6,28}+p_{7,2}+2p_{7,66}+4p_{7,18}+p_{7,114}+4p_{7,10}+2p_{7,74}+3p_{7,42} \\ &+2p_{7,106}+p_{7,90}+p_{6,58}+2p_{7,70}+p_{7,38}+2p_{7,102}+p_{7,22}+p_{6,54} \\ &+p_{7,14}+p_{7,46}+p_{7,62}+2p_{7,126}+2p_{6,1}+p_{7,33}+4p_{7,97}+3p_{7,9} \\ &+2p_{7,73}+2p_{7,105}+2p_{7,25}+5p_{7,89}+p_{6,57}+2p_{7,5}+p_{7,69}+2p_{7,21} \\ &+2p_{7,13}+p_{7,77}+p_{6,29}+3p_{7,61}+p_{6,3}+p_{7,35}+2p_{7,99}+p_{6,19} \\ &+2p_{7,115}+p_{7,27}+2p_{7,91}+2p_{7,7}+p_{7,39}+p_{7,23}+2p_{7,119}+p_{6,15} \\ &+p_{7,47}+2p_{7,111}+2p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,160} = \frac{1}{2}p_{7,32} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,32}^2 - 4(2p_{7,32}+p_{7,80}+p_{6,48}+2p_{6,8}+p_{7,40}+p_{7,88} \\ &+2p_{7,120}+3p_{7,4}+2p_{7,68}+p_{7,36}+p_{7,20}+p_{7,52}+2p_{7,12}+2p_{7,108} \\ &+p_{6,28}+p_{7,2}+2p_{7,66}+4p_{7,18}+p_{7,114}+4p_{7,10}+2p_{7,74}+3p_{7,42} \\ &+2p_{7,106}+p_{7,90}+p_{6,58}+2p_{7,70}+p_{7,38}+2p_{7,102}+p_{7,22}+p_{6,54} \\ &+p_{7,14}+p_{7,46}+p_{7,62}+2p_{7,126}+2p_{6,1}+p_{7,33}+4p_{7,97}+3p_{7,9} \\ &+2p_{7,73}+2p_{7,105}+2p_{7,25}+5p_{7,89}+p_{6,57}+2p_{7,5}+p_{7,69}+2p_{7,21} \\ &+2p_{7,13}+p_{7,77}+p_{6,29}+3p_{7,61}+p_{6,3}+p_{7,35}+2p_{7,99}+p_{6,19} \\ &+2p_{7,115}+p_{7,27}+2p_{7,91}+2p_{7,7}+p_{7,39}+p_{7,23}+2p_{7,119}+p_{6,15} \\ &+p_{7,47}+2p_{7,111}+2p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,96} = \frac{1}{2}p_{7,96} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,96}^2 - 4(2p_{7,96}+p_{7,16}+p_{6,48}+2p_{6,8}+p_{7,104}+p_{7,24} \\ &+2p_{7,56}+2p_{7,4}+3p_{7,68}+p_{7,100}+p_{7,84}+p_{7,116}+2p_{7,76}+2p_{7,44} \\ &+p_{6,28}+2p_{7,2}+p_{7,66}+4p_{7,82}+p_{7,50}+2p_{7,10}+4p_{7,74}+2p_{7,42} \\ &+3p_{7,106}+p_{7,26}+p_{6,58}+2p_{7,6}+2p_{7,38}+p_{7,102}+p_{7,86}+p_{6,54} \\ &+p_{7,78}+p_{7,110}+2p_{7,62}+p_{7,126}+2p_{6,1}+4p_{7,33}+p_{7,97}+2p_{7,9} \\ &+3p_{7,73}+2p_{7,41}+5p_{7,25}+2p_{7,89}+p_{6,57}+p_{7,5}+2p_{7,69}+2p_{7,85} \\ &+p_{7,13}+2p_{7,77}+p_{6,29}+3p_{7,125}+p_{6,3}+2p_{7,35}+p_{7,99}+p_{6,19} \\ &+2p_{7,51}+2p_{7,27}+p_{7,91}+2p_{7,71}+p_{7,103}+p_{7,87}+2p_{7,55}+p_{6,15} \\ &+2p_{7,47}+p_{7,111}+2p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,224} = \frac{1}{2}p_{7,96} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,96}^2 - 4(2p_{7,96}+p_{7,16}+p_{6,48}+2p_{6,8}+p_{7,104}+p_{7,24} \\ &+2p_{7,56}+2p_{7,4}+3p_{7,68}+p_{7,100}+p_{7,84}+p_{7,116}+2p_{7,76}+2p_{7,44} \\ &+p_{6,28}+2p_{7,2}+p_{7,66}+4p_{7,82}+p_{7,50}+2p_{7,10}+4p_{7,74}+2p_{7,42} \\ &+3p_{7,106}+p_{7,26}+p_{6,58}+2p_{7,6}+2p_{7,38}+p_{7,102}+p_{7,86}+p_{6,54} \\ &+p_{7,78}+p_{7,110}+2p_{7,62}+p_{7,126}+2p_{6,1}+4p_{7,33}+p_{7,97}+2p_{7,9} \\ &+3p_{7,73}+2p_{7,41}+5p_{7,25}+2p_{7,89}+p_{6,57}+p_{7,5}+2p_{7,69}+2p_{7,85} \\ &+p_{7,13}+2p_{7,77}+p_{6,29}+3p_{7,125}+p_{6,3}+2p_{7,35}+p_{7,99}+p_{6,19} \\ &+2p_{7,51}+2p_{7,27}+p_{7,91}+2p_{7,71}+p_{7,103}+p_{7,87}+2p_{7,55}+p_{6,15} \\ &+2p_{7,47}+p_{7,111}+2p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,16} = \frac{1}{2}p_{7,16} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,16}^2 - 4(p_{7,64}+p_{6,32}+2p_{7,16}+p_{7,72}+2p_{7,104}+p_{7,24} \\ &+2p_{6,56}+p_{7,4}+p_{7,36}+p_{7,20}+2p_{7,52}+3p_{7,116}+p_{6,12}+2p_{7,92} \\ &+2p_{7,124}+4p_{7,2}+p_{7,98}+2p_{7,50}+p_{7,114}+p_{7,74}+p_{6,42}+3p_{7,26} \\ &+2p_{7,90}+2p_{7,58}+4p_{7,122}+p_{7,6}+p_{6,38}+p_{7,22}+2p_{7,86}+2p_{7,54} \\ &+p_{7,46}+2p_{7,110}+p_{7,30}+p_{7,126}+p_{7,17}+4p_{7,81}+2p_{6,49}+2p_{7,9} \\ &+5p_{7,73}+p_{6,41}+2p_{7,89}+2p_{7,57}+3p_{7,121}+2p_{7,5}+p_{7,53}+2p_{7,117} \\ &+p_{6,13}+3p_{7,45}+p_{7,61}+2p_{7,125}+p_{6,3}+2p_{7,99}+p_{7,19}+2p_{7,83} \\ &+p_{6,51}+p_{7,11}+2p_{7,75}+p_{7,7}+2p_{7,103}+p_{7,23}+2p_{7,119}+2p_{6,15} \\ &+p_{7,111}+p_{7,31}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,144} = \frac{1}{2}p_{7,16} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,16}^2 - 4(p_{7,64}+p_{6,32}+2p_{7,16}+p_{7,72}+2p_{7,104}+p_{7,24} \\ &+2p_{6,56}+p_{7,4}+p_{7,36}+p_{7,20}+2p_{7,52}+3p_{7,116}+p_{6,12}+2p_{7,92} \\ &+2p_{7,124}+4p_{7,2}+p_{7,98}+2p_{7,50}+p_{7,114}+p_{7,74}+p_{6,42}+3p_{7,26} \\ &+2p_{7,90}+2p_{7,58}+4p_{7,122}+p_{7,6}+p_{6,38}+p_{7,22}+2p_{7,86}+2p_{7,54} \\ &+p_{7,46}+2p_{7,110}+p_{7,30}+p_{7,126}+p_{7,17}+4p_{7,81}+2p_{6,49}+2p_{7,9} \\ &+5p_{7,73}+p_{6,41}+2p_{7,89}+2p_{7,57}+3p_{7,121}+2p_{7,5}+p_{7,53}+2p_{7,117} \\ &+p_{6,13}+3p_{7,45}+p_{7,61}+2p_{7,125}+p_{6,3}+2p_{7,99}+p_{7,19}+2p_{7,83} \\ &+p_{6,51}+p_{7,11}+2p_{7,75}+p_{7,7}+2p_{7,103}+p_{7,23}+2p_{7,119}+2p_{6,15} \\ &+p_{7,111}+p_{7,31}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,80} = \frac{1}{2}p_{7,80} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,80}^2 - 4(p_{7,0}+p_{6,32}+2p_{7,80}+p_{7,8}+2p_{7,40}+p_{7,88} \\ &+2p_{6,56}+p_{7,68}+p_{7,100}+p_{7,84}+3p_{7,52}+2p_{7,116}+p_{6,12}+2p_{7,28} \\ &+2p_{7,60}+4p_{7,66}+p_{7,34}+p_{7,50}+2p_{7,114}+p_{7,10}+p_{6,42}+2p_{7,26} \\ &+3p_{7,90}+4p_{7,58}+2p_{7,122}+p_{7,70}+p_{6,38}+2p_{7,22}+p_{7,86}+2p_{7,118} \\ &+2p_{7,46}+p_{7,110}+p_{7,94}+p_{7,62}+4p_{7,17}+p_{7,81}+2p_{6,49}+5p_{7,9} \\ &+2p_{7,73}+p_{6,41}+2p_{7,25}+3p_{7,57}+2p_{7,121}+2p_{7,69}+2p_{7,53} \\ &+p_{7,117}+p_{6,13}+3p_{7,109}+2p_{7,61}+p_{7,125}+p_{6,3}+2p_{7,35}+2p_{7,19} \\ &+p_{7,83}+p_{6,51}+2p_{7,11}+p_{7,75}+p_{7,71}+2p_{7,39}+p_{7,87}+2p_{7,55} \\ &+2p_{6,15}+p_{7,47}+2p_{7,31}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,208} = \frac{1}{2}p_{7,80} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,80}^2 - 4(p_{7,0}+p_{6,32}+2p_{7,80}+p_{7,8}+2p_{7,40}+p_{7,88} \\ &+2p_{6,56}+p_{7,68}+p_{7,100}+p_{7,84}+3p_{7,52}+2p_{7,116}+p_{6,12}+2p_{7,28} \\ &+2p_{7,60}+4p_{7,66}+p_{7,34}+p_{7,50}+2p_{7,114}+p_{7,10}+p_{6,42}+2p_{7,26} \\ &+3p_{7,90}+4p_{7,58}+2p_{7,122}+p_{7,70}+p_{6,38}+2p_{7,22}+p_{7,86}+2p_{7,118} \\ &+2p_{7,46}+p_{7,110}+p_{7,94}+p_{7,62}+4p_{7,17}+p_{7,81}+2p_{6,49}+5p_{7,9} \\ &+2p_{7,73}+p_{6,41}+2p_{7,25}+3p_{7,57}+2p_{7,121}+2p_{7,69}+2p_{7,53} \\ &+p_{7,117}+p_{6,13}+3p_{7,109}+2p_{7,61}+p_{7,125}+p_{6,3}+2p_{7,35}+2p_{7,19} \\ &+p_{7,83}+p_{6,51}+2p_{7,11}+p_{7,75}+p_{7,71}+2p_{7,39}+p_{7,87}+2p_{7,55} \\ &+2p_{6,15}+p_{7,47}+2p_{7,31}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,48} = \frac{1}{2}p_{7,48} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,48}^2 - 4(p_{6,0}+p_{7,96}+2p_{7,48}+2p_{7,8}+p_{7,104}+2p_{6,24} \\ &+p_{7,56}+p_{7,68}+p_{7,36}+3p_{7,20}+2p_{7,84}+p_{7,52}+p_{6,44}+2p_{7,28} \\ &+2p_{7,124}+p_{7,2}+4p_{7,34}+p_{7,18}+2p_{7,82}+p_{6,10}+p_{7,106}+4p_{7,26} \\ &+2p_{7,90}+3p_{7,58}+2p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,86}+p_{7,54}+2p_{7,118} \\ &+2p_{7,14}+p_{7,78}+p_{7,30}+p_{7,62}+2p_{6,17}+p_{7,49}+4p_{7,113}+p_{6,9} \\ &+2p_{7,41}+5p_{7,105}+3p_{7,25}+2p_{7,89}+2p_{7,121}+2p_{7,37}+2p_{7,21} \\ &+p_{7,85}+3p_{7,77}+p_{6,45}+2p_{7,29}+p_{7,93}+2p_{7,3}+p_{6,35}+p_{6,19} \\ &+p_{7,51}+2p_{7,115}+p_{7,43}+2p_{7,107}+2p_{7,7}+p_{7,39}+2p_{7,23}+p_{7,55} \\ &+p_{7,15}+2p_{6,47}+p_{6,31}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,176} = \frac{1}{2}p_{7,48} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,48}^2 - 4(p_{6,0}+p_{7,96}+2p_{7,48}+2p_{7,8}+p_{7,104}+2p_{6,24} \\ &+p_{7,56}+p_{7,68}+p_{7,36}+3p_{7,20}+2p_{7,84}+p_{7,52}+p_{6,44}+2p_{7,28} \\ &+2p_{7,124}+p_{7,2}+4p_{7,34}+p_{7,18}+2p_{7,82}+p_{6,10}+p_{7,106}+4p_{7,26} \\ &+2p_{7,90}+3p_{7,58}+2p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,86}+p_{7,54}+2p_{7,118} \\ &+2p_{7,14}+p_{7,78}+p_{7,30}+p_{7,62}+2p_{6,17}+p_{7,49}+4p_{7,113}+p_{6,9} \\ &+2p_{7,41}+5p_{7,105}+3p_{7,25}+2p_{7,89}+2p_{7,121}+2p_{7,37}+2p_{7,21} \\ &+p_{7,85}+3p_{7,77}+p_{6,45}+2p_{7,29}+p_{7,93}+2p_{7,3}+p_{6,35}+p_{6,19} \\ &+p_{7,51}+2p_{7,115}+p_{7,43}+2p_{7,107}+2p_{7,7}+p_{7,39}+2p_{7,23}+p_{7,55} \\ &+p_{7,15}+2p_{6,47}+p_{6,31}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,112} = \frac{1}{2}p_{7,112} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,112}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,112}+2p_{7,72}+p_{7,40}+2p_{6,24} \\ &+p_{7,120}+p_{7,4}+p_{7,100}+2p_{7,20}+3p_{7,84}+p_{7,116}+p_{6,44}+2p_{7,92} \\ &+2p_{7,60}+p_{7,66}+4p_{7,98}+2p_{7,18}+p_{7,82}+p_{6,10}+p_{7,42}+2p_{7,26} \\ &+4p_{7,90}+2p_{7,58}+3p_{7,122}+p_{6,6}+p_{7,102}+2p_{7,22}+2p_{7,54}+p_{7,118} \\ &+p_{7,14}+2p_{7,78}+p_{7,94}+p_{7,126}+2p_{6,17}+4p_{7,49}+p_{7,113}+p_{6,9} \\ &+5p_{7,41}+2p_{7,105}+2p_{7,25}+3p_{7,89}+2p_{7,57}+2p_{7,101}+p_{7,21} \\ &+2p_{7,85}+3p_{7,13}+p_{6,45}+p_{7,29}+2p_{7,93}+2p_{7,67}+p_{6,35}+p_{6,19} \\ &+2p_{7,51}+p_{7,115}+2p_{7,43}+p_{7,107}+2p_{7,71}+p_{7,103}+2p_{7,87} \\ &+p_{7,119}+p_{7,79}+2p_{6,47}+p_{6,31}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,240} = \frac{1}{2}p_{7,112} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,112}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,112}+2p_{7,72}+p_{7,40}+2p_{6,24} \\ &+p_{7,120}+p_{7,4}+p_{7,100}+2p_{7,20}+3p_{7,84}+p_{7,116}+p_{6,44}+2p_{7,92} \\ &+2p_{7,60}+p_{7,66}+4p_{7,98}+2p_{7,18}+p_{7,82}+p_{6,10}+p_{7,42}+2p_{7,26} \\ &+4p_{7,90}+2p_{7,58}+3p_{7,122}+p_{6,6}+p_{7,102}+2p_{7,22}+2p_{7,54}+p_{7,118} \\ &+p_{7,14}+2p_{7,78}+p_{7,94}+p_{7,126}+2p_{6,17}+4p_{7,49}+p_{7,113}+p_{6,9} \\ &+5p_{7,41}+2p_{7,105}+2p_{7,25}+3p_{7,89}+2p_{7,57}+2p_{7,101}+p_{7,21} \\ &+2p_{7,85}+3p_{7,13}+p_{6,45}+p_{7,29}+2p_{7,93}+2p_{7,67}+p_{6,35}+p_{6,19} \\ &+2p_{7,51}+p_{7,115}+2p_{7,43}+p_{7,107}+2p_{7,71}+p_{7,103}+2p_{7,87} \\ &+p_{7,119}+p_{7,79}+2p_{6,47}+p_{6,31}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,8} = \frac{1}{2}p_{7,8} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,8}^2 - 4(p_{7,64}+2p_{7,96}+p_{7,16}+2p_{6,48}+2p_{7,8}+p_{6,24} \\ &+p_{7,56}+p_{6,4}+2p_{7,84}+2p_{7,116}+p_{7,12}+2p_{7,44}+3p_{7,108}+p_{7,28} \\ &+p_{7,124}+p_{7,66}+p_{6,34}+3p_{7,18}+2p_{7,82}+2p_{7,50}+4p_{7,114}+2p_{7,42} \\ &+p_{7,106}+p_{7,90}+4p_{7,122}+p_{7,38}+2p_{7,102}+p_{7,22}+p_{7,118}+p_{7,14} \\ &+2p_{7,78}+2p_{7,46}+p_{6,30}+p_{7,126}+2p_{7,1}+5p_{7,65}+p_{6,33}+2p_{7,81} \\ &+2p_{7,49}+3p_{7,113}+p_{7,9}+4p_{7,73}+2p_{6,41}+p_{6,5}+3p_{7,37}+p_{7,53} \\ &+2p_{7,117}+p_{7,45}+2p_{7,109}+2p_{7,125}+p_{7,3}+2p_{7,67}+p_{7,11}+2p_{7,75} \\ &+p_{6,43}+2p_{7,91}+p_{6,59}+2p_{6,7}+p_{7,103}+p_{7,23}+2p_{7,87}+p_{6,55} \\ &+p_{7,15}+2p_{7,111}+2p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,136} = \frac{1}{2}p_{7,8} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,8}^2 - 4(p_{7,64}+2p_{7,96}+p_{7,16}+2p_{6,48}+2p_{7,8}+p_{6,24} \\ &+p_{7,56}+p_{6,4}+2p_{7,84}+2p_{7,116}+p_{7,12}+2p_{7,44}+3p_{7,108}+p_{7,28} \\ &+p_{7,124}+p_{7,66}+p_{6,34}+3p_{7,18}+2p_{7,82}+2p_{7,50}+4p_{7,114}+2p_{7,42} \\ &+p_{7,106}+p_{7,90}+4p_{7,122}+p_{7,38}+2p_{7,102}+p_{7,22}+p_{7,118}+p_{7,14} \\ &+2p_{7,78}+2p_{7,46}+p_{6,30}+p_{7,126}+2p_{7,1}+5p_{7,65}+p_{6,33}+2p_{7,81} \\ &+2p_{7,49}+3p_{7,113}+p_{7,9}+4p_{7,73}+2p_{6,41}+p_{6,5}+3p_{7,37}+p_{7,53} \\ &+2p_{7,117}+p_{7,45}+2p_{7,109}+2p_{7,125}+p_{7,3}+2p_{7,67}+p_{7,11}+2p_{7,75} \\ &+p_{6,43}+2p_{7,91}+p_{6,59}+2p_{6,7}+p_{7,103}+p_{7,23}+2p_{7,87}+p_{6,55} \\ &+p_{7,15}+2p_{7,111}+2p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,72} = \frac{1}{2}p_{7,72} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,72}^2 - 4(p_{7,0}+2p_{7,32}+p_{7,80}+2p_{6,48}+2p_{7,72}+p_{6,24} \\ &+p_{7,120}+p_{6,4}+2p_{7,20}+2p_{7,52}+p_{7,76}+3p_{7,44}+2p_{7,108}+p_{7,92} \\ &+p_{7,60}+p_{7,2}+p_{6,34}+2p_{7,18}+3p_{7,82}+4p_{7,50}+2p_{7,114}+p_{7,42} \\ &+2p_{7,106}+p_{7,26}+4p_{7,58}+2p_{7,38}+p_{7,102}+p_{7,86}+p_{7,54}+2p_{7,14} \\ &+p_{7,78}+2p_{7,110}+p_{6,30}+p_{7,62}+5p_{7,1}+2p_{7,65}+p_{6,33}+2p_{7,17} \\ &+3p_{7,49}+2p_{7,113}+4p_{7,9}+p_{7,73}+2p_{6,41}+p_{6,5}+3p_{7,101}+2p_{7,53} \\ &+p_{7,117}+2p_{7,45}+p_{7,109}+2p_{7,61}+2p_{7,3}+p_{7,67}+2p_{7,11}+p_{7,75} \\ &+p_{6,43}+2p_{7,27}+p_{6,59}+2p_{6,7}+p_{7,39}+2p_{7,23}+p_{7,87}+p_{6,55} \\ &+p_{7,79}+2p_{7,47}+2p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,200} = \frac{1}{2}p_{7,72} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,72}^2 - 4(p_{7,0}+2p_{7,32}+p_{7,80}+2p_{6,48}+2p_{7,72}+p_{6,24} \\ &+p_{7,120}+p_{6,4}+2p_{7,20}+2p_{7,52}+p_{7,76}+3p_{7,44}+2p_{7,108}+p_{7,92} \\ &+p_{7,60}+p_{7,2}+p_{6,34}+2p_{7,18}+3p_{7,82}+4p_{7,50}+2p_{7,114}+p_{7,42} \\ &+2p_{7,106}+p_{7,26}+4p_{7,58}+2p_{7,38}+p_{7,102}+p_{7,86}+p_{7,54}+2p_{7,14} \\ &+p_{7,78}+2p_{7,110}+p_{6,30}+p_{7,62}+5p_{7,1}+2p_{7,65}+p_{6,33}+2p_{7,17} \\ &+3p_{7,49}+2p_{7,113}+4p_{7,9}+p_{7,73}+2p_{6,41}+p_{6,5}+3p_{7,101}+2p_{7,53} \\ &+p_{7,117}+2p_{7,45}+p_{7,109}+2p_{7,61}+2p_{7,3}+p_{7,67}+2p_{7,11}+p_{7,75} \\ &+p_{6,43}+2p_{7,27}+p_{6,59}+2p_{6,7}+p_{7,39}+2p_{7,23}+p_{7,87}+p_{6,55} \\ &+p_{7,79}+2p_{7,47}+2p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,40} = \frac{1}{2}p_{7,40} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,40}^2 - 4(2p_{7,0}+p_{7,96}+2p_{6,16}+p_{7,48}+2p_{7,40}+p_{7,88} \\ &+p_{6,56}+p_{6,36}+2p_{7,20}+2p_{7,116}+3p_{7,12}+2p_{7,76}+p_{7,44}+p_{7,28} \\ &+p_{7,60}+p_{6,2}+p_{7,98}+4p_{7,18}+2p_{7,82}+3p_{7,50}+2p_{7,114}+p_{7,10} \\ &+2p_{7,74}+4p_{7,26}+p_{7,122}+2p_{7,6}+p_{7,70}+p_{7,22}+p_{7,54}+2p_{7,78} \\ &+p_{7,46}+2p_{7,110}+p_{7,30}+p_{6,62}+p_{6,1}+2p_{7,33}+5p_{7,97}+3p_{7,17} \\ &+2p_{7,81}+2p_{7,113}+2p_{6,9}+p_{7,41}+4p_{7,105}+3p_{7,69}+p_{6,37} \\ &+2p_{7,21}+p_{7,85}+2p_{7,13}+p_{7,77}+2p_{7,29}+p_{7,35}+2p_{7,99}+p_{6,11} \\ &+p_{7,43}+2p_{7,107}+p_{6,27}+2p_{7,123}+p_{7,7}+2p_{6,39}+p_{6,23}+p_{7,55} \\ &+2p_{7,119}+2p_{7,15}+p_{7,47}+p_{7,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,168} = \frac{1}{2}p_{7,40} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,40}^2 - 4(2p_{7,0}+p_{7,96}+2p_{6,16}+p_{7,48}+2p_{7,40}+p_{7,88} \\ &+p_{6,56}+p_{6,36}+2p_{7,20}+2p_{7,116}+3p_{7,12}+2p_{7,76}+p_{7,44}+p_{7,28} \\ &+p_{7,60}+p_{6,2}+p_{7,98}+4p_{7,18}+2p_{7,82}+3p_{7,50}+2p_{7,114}+p_{7,10} \\ &+2p_{7,74}+4p_{7,26}+p_{7,122}+2p_{7,6}+p_{7,70}+p_{7,22}+p_{7,54}+2p_{7,78} \\ &+p_{7,46}+2p_{7,110}+p_{7,30}+p_{6,62}+p_{6,1}+2p_{7,33}+5p_{7,97}+3p_{7,17} \\ &+2p_{7,81}+2p_{7,113}+2p_{6,9}+p_{7,41}+4p_{7,105}+3p_{7,69}+p_{6,37} \\ &+2p_{7,21}+p_{7,85}+2p_{7,13}+p_{7,77}+2p_{7,29}+p_{7,35}+2p_{7,99}+p_{6,11} \\ &+p_{7,43}+2p_{7,107}+p_{6,27}+2p_{7,123}+p_{7,7}+2p_{6,39}+p_{6,23}+p_{7,55} \\ &+2p_{7,119}+2p_{7,15}+p_{7,47}+p_{7,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,104} = \frac{1}{2}p_{7,104} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,104}^2 - 4(2p_{7,64}+p_{7,32}+2p_{6,16}+p_{7,112}+2p_{7,104}+p_{7,24} \\ &+p_{6,56}+p_{6,36}+2p_{7,84}+2p_{7,52}+2p_{7,12}+3p_{7,76}+p_{7,108}+p_{7,92} \\ &+p_{7,124}+p_{6,2}+p_{7,34}+2p_{7,18}+4p_{7,82}+2p_{7,50}+3p_{7,114}+2p_{7,10} \\ &+p_{7,74}+4p_{7,90}+p_{7,58}+p_{7,6}+2p_{7,70}+p_{7,86}+p_{7,118}+2p_{7,14} \\ &+2p_{7,46}+p_{7,110}+p_{7,94}+p_{6,62}+p_{6,1}+5p_{7,33}+2p_{7,97}+2p_{7,17} \\ &+3p_{7,81}+2p_{7,49}+2p_{6,9}+4p_{7,41}+p_{7,105}+3p_{7,5}+p_{6,37}+p_{7,21} \\ &+2p_{7,85}+p_{7,13}+2p_{7,77}+2p_{7,93}+2p_{7,35}+p_{7,99}+p_{6,11}+2p_{7,43} \\ &+p_{7,107}+p_{6,27}+2p_{7,59}+p_{7,71}+2p_{6,39}+p_{6,23}+2p_{7,55}+p_{7,119} \\ &+2p_{7,79}+p_{7,111}+p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,232} = \frac{1}{2}p_{7,104} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,104}^2 - 4(2p_{7,64}+p_{7,32}+2p_{6,16}+p_{7,112}+2p_{7,104}+p_{7,24} \\ &+p_{6,56}+p_{6,36}+2p_{7,84}+2p_{7,52}+2p_{7,12}+3p_{7,76}+p_{7,108}+p_{7,92} \\ &+p_{7,124}+p_{6,2}+p_{7,34}+2p_{7,18}+4p_{7,82}+2p_{7,50}+3p_{7,114}+2p_{7,10} \\ &+p_{7,74}+4p_{7,90}+p_{7,58}+p_{7,6}+2p_{7,70}+p_{7,86}+p_{7,118}+2p_{7,14} \\ &+2p_{7,46}+p_{7,110}+p_{7,94}+p_{6,62}+p_{6,1}+5p_{7,33}+2p_{7,97}+2p_{7,17} \\ &+3p_{7,81}+2p_{7,49}+2p_{6,9}+4p_{7,41}+p_{7,105}+3p_{7,5}+p_{6,37}+p_{7,21} \\ &+2p_{7,85}+p_{7,13}+2p_{7,77}+2p_{7,93}+2p_{7,35}+p_{7,99}+p_{6,11}+2p_{7,43} \\ &+p_{7,107}+p_{6,27}+2p_{7,59}+p_{7,71}+2p_{6,39}+p_{6,23}+2p_{7,55}+p_{7,119} \\ &+2p_{7,79}+p_{7,111}+p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,24} = \frac{1}{2}p_{7,24} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,24}^2 - 4(2p_{6,0}+p_{7,32}+p_{7,80}+2p_{7,112}+p_{7,72}+p_{6,40} \\ &+2p_{7,24}+2p_{7,4}+2p_{7,100}+p_{6,20}+p_{7,12}+p_{7,44}+p_{7,28}+2p_{7,60} \\ &+3p_{7,124}+4p_{7,2}+2p_{7,66}+3p_{7,34}+2p_{7,98}+p_{7,82}+p_{6,50}+4p_{7,10} \\ &+p_{7,106}+2p_{7,58}+p_{7,122}+p_{7,6}+p_{7,38}+p_{7,54}+2p_{7,118}+p_{7,14} \\ &+p_{6,46}+p_{7,30}+2p_{7,94}+2p_{7,62}+3p_{7,1}+2p_{7,65}+2p_{7,97}+2p_{7,17} \\ &+5p_{7,81}+p_{6,49}+p_{7,25}+4p_{7,89}+2p_{6,57}+2p_{7,5}+p_{7,69}+p_{6,21} \\ &+3p_{7,53}+2p_{7,13}+p_{7,61}+2p_{7,125}+p_{7,19}+2p_{7,83}+p_{6,11}+2p_{7,107} \\ &+p_{7,27}+2p_{7,91}+p_{6,59}+p_{6,7}+p_{7,39}+2p_{7,103}+2p_{6,23}+p_{7,119} \\ &+p_{7,15}+2p_{7,111}+p_{7,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,152} = \frac{1}{2}p_{7,24} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,24}^2 - 4(2p_{6,0}+p_{7,32}+p_{7,80}+2p_{7,112}+p_{7,72}+p_{6,40} \\ &+2p_{7,24}+2p_{7,4}+2p_{7,100}+p_{6,20}+p_{7,12}+p_{7,44}+p_{7,28}+2p_{7,60} \\ &+3p_{7,124}+4p_{7,2}+2p_{7,66}+3p_{7,34}+2p_{7,98}+p_{7,82}+p_{6,50}+4p_{7,10} \\ &+p_{7,106}+2p_{7,58}+p_{7,122}+p_{7,6}+p_{7,38}+p_{7,54}+2p_{7,118}+p_{7,14} \\ &+p_{6,46}+p_{7,30}+2p_{7,94}+2p_{7,62}+3p_{7,1}+2p_{7,65}+2p_{7,97}+2p_{7,17} \\ &+5p_{7,81}+p_{6,49}+p_{7,25}+4p_{7,89}+2p_{6,57}+2p_{7,5}+p_{7,69}+p_{6,21} \\ &+3p_{7,53}+2p_{7,13}+p_{7,61}+2p_{7,125}+p_{7,19}+2p_{7,83}+p_{6,11}+2p_{7,107} \\ &+p_{7,27}+2p_{7,91}+p_{6,59}+p_{6,7}+p_{7,39}+2p_{7,103}+2p_{6,23}+p_{7,119} \\ &+p_{7,15}+2p_{7,111}+p_{7,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,88} = \frac{1}{2}p_{7,88} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,88}^2 - 4(2p_{6,0}+p_{7,96}+p_{7,16}+2p_{7,48}+p_{7,8}+p_{6,40} \\ &+2p_{7,88}+2p_{7,68}+2p_{7,36}+p_{6,20}+p_{7,76}+p_{7,108}+p_{7,92}+3p_{7,60} \\ &+2p_{7,124}+2p_{7,2}+4p_{7,66}+2p_{7,34}+3p_{7,98}+p_{7,18}+p_{6,50}+4p_{7,74} \\ &+p_{7,42}+p_{7,58}+2p_{7,122}+p_{7,70}+p_{7,102}+2p_{7,54}+p_{7,118}+p_{7,78} \\ &+p_{6,46}+2p_{7,30}+p_{7,94}+2p_{7,126}+2p_{7,1}+3p_{7,65}+2p_{7,33}+5p_{7,17} \\ &+2p_{7,81}+p_{6,49}+4p_{7,25}+p_{7,89}+2p_{6,57}+p_{7,5}+2p_{7,69}+p_{6,21} \\ &+3p_{7,117}+2p_{7,77}+2p_{7,61}+p_{7,125}+2p_{7,19}+p_{7,83}+p_{6,11} \\ &+2p_{7,43}+2p_{7,27}+p_{7,91}+p_{6,59}+p_{6,7}+2p_{7,39}+p_{7,103}+2p_{6,23} \\ &+p_{7,55}+p_{7,79}+2p_{7,47}+p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,216} = \frac{1}{2}p_{7,88} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,88}^2 - 4(2p_{6,0}+p_{7,96}+p_{7,16}+2p_{7,48}+p_{7,8}+p_{6,40} \\ &+2p_{7,88}+2p_{7,68}+2p_{7,36}+p_{6,20}+p_{7,76}+p_{7,108}+p_{7,92}+3p_{7,60} \\ &+2p_{7,124}+2p_{7,2}+4p_{7,66}+2p_{7,34}+3p_{7,98}+p_{7,18}+p_{6,50}+4p_{7,74} \\ &+p_{7,42}+p_{7,58}+2p_{7,122}+p_{7,70}+p_{7,102}+2p_{7,54}+p_{7,118}+p_{7,78} \\ &+p_{6,46}+2p_{7,30}+p_{7,94}+2p_{7,126}+2p_{7,1}+3p_{7,65}+2p_{7,33}+5p_{7,17} \\ &+2p_{7,81}+p_{6,49}+4p_{7,25}+p_{7,89}+2p_{6,57}+p_{7,5}+2p_{7,69}+p_{6,21} \\ &+3p_{7,117}+2p_{7,77}+2p_{7,61}+p_{7,125}+2p_{7,19}+p_{7,83}+p_{6,11} \\ &+2p_{7,43}+2p_{7,27}+p_{7,91}+p_{6,59}+p_{6,7}+2p_{7,39}+p_{7,103}+2p_{6,23} \\ &+p_{7,55}+p_{7,79}+2p_{7,47}+p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,56} = \frac{1}{2}p_{7,56} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,56}^2 - 4(p_{7,64}+2p_{6,32}+2p_{7,16}+p_{7,112}+p_{6,8}+p_{7,104} \\ &+2p_{7,56}+2p_{7,4}+2p_{7,36}+p_{6,52}+p_{7,76}+p_{7,44}+3p_{7,28}+2p_{7,92} \\ &+p_{7,60}+2p_{7,2}+3p_{7,66}+4p_{7,34}+2p_{7,98}+p_{6,18}+p_{7,114}+p_{7,10} \\ &+4p_{7,42}+p_{7,26}+2p_{7,90}+p_{7,70}+p_{7,38}+2p_{7,22}+p_{7,86}+p_{6,14} \\ &+p_{7,46}+2p_{7,94}+p_{7,62}+2p_{7,126}+2p_{7,1}+3p_{7,33}+2p_{7,97}+p_{6,17} \\ &+2p_{7,49}+5p_{7,113}+2p_{6,25}+p_{7,57}+4p_{7,121}+2p_{7,37}+p_{7,101} \\ &+3p_{7,85}+p_{6,53}+2p_{7,45}+2p_{7,29}+p_{7,93}+p_{7,51}+2p_{7,115}+2p_{7,11} \\ &+p_{6,43}+p_{6,27}+p_{7,59}+2p_{7,123}+2p_{7,7}+p_{7,71}+p_{6,39}+p_{7,23} \\ &+2p_{6,55}+2p_{7,15}+p_{7,47}+2p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,184} = \frac{1}{2}p_{7,56} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,56}^2 - 4(p_{7,64}+2p_{6,32}+2p_{7,16}+p_{7,112}+p_{6,8}+p_{7,104} \\ &+2p_{7,56}+2p_{7,4}+2p_{7,36}+p_{6,52}+p_{7,76}+p_{7,44}+3p_{7,28}+2p_{7,92} \\ &+p_{7,60}+2p_{7,2}+3p_{7,66}+4p_{7,34}+2p_{7,98}+p_{6,18}+p_{7,114}+p_{7,10} \\ &+4p_{7,42}+p_{7,26}+2p_{7,90}+p_{7,70}+p_{7,38}+2p_{7,22}+p_{7,86}+p_{6,14} \\ &+p_{7,46}+2p_{7,94}+p_{7,62}+2p_{7,126}+2p_{7,1}+3p_{7,33}+2p_{7,97}+p_{6,17} \\ &+2p_{7,49}+5p_{7,113}+2p_{6,25}+p_{7,57}+4p_{7,121}+2p_{7,37}+p_{7,101} \\ &+3p_{7,85}+p_{6,53}+2p_{7,45}+2p_{7,29}+p_{7,93}+p_{7,51}+2p_{7,115}+2p_{7,11} \\ &+p_{6,43}+p_{6,27}+p_{7,59}+2p_{7,123}+2p_{7,7}+p_{7,71}+p_{6,39}+p_{7,23} \\ &+2p_{6,55}+2p_{7,15}+p_{7,47}+2p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,120} = \frac{1}{2}p_{7,120} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,120}^2 - 4(p_{7,0}+2p_{6,32}+2p_{7,80}+p_{7,48}+p_{6,8}+p_{7,40} \\ &+2p_{7,120}+2p_{7,68}+2p_{7,100}+p_{6,52}+p_{7,12}+p_{7,108}+2p_{7,28} \\ &+3p_{7,92}+p_{7,124}+3p_{7,2}+2p_{7,66}+2p_{7,34}+4p_{7,98}+p_{6,18}+p_{7,50} \\ &+p_{7,74}+4p_{7,106}+2p_{7,26}+p_{7,90}+p_{7,6}+p_{7,102}+p_{7,22}+2p_{7,86} \\ &+p_{6,14}+p_{7,110}+2p_{7,30}+2p_{7,62}+p_{7,126}+2p_{7,65}+2p_{7,33}+3p_{7,97} \\ &+p_{6,17}+5p_{7,49}+2p_{7,113}+2p_{6,25}+4p_{7,57}+p_{7,121}+p_{7,37} \\ &+2p_{7,101}+3p_{7,21}+p_{6,53}+2p_{7,109}+p_{7,29}+2p_{7,93}+2p_{7,51} \\ &+p_{7,115}+2p_{7,75}+p_{6,43}+p_{6,27}+2p_{7,59}+p_{7,123}+p_{7,7}+2p_{7,71} \\ &+p_{6,39}+p_{7,87}+2p_{6,55}+2p_{7,79}+p_{7,111}+2p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,248} = \frac{1}{2}p_{7,120} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,120}^2 - 4(p_{7,0}+2p_{6,32}+2p_{7,80}+p_{7,48}+p_{6,8}+p_{7,40} \\ &+2p_{7,120}+2p_{7,68}+2p_{7,100}+p_{6,52}+p_{7,12}+p_{7,108}+2p_{7,28} \\ &+3p_{7,92}+p_{7,124}+3p_{7,2}+2p_{7,66}+2p_{7,34}+4p_{7,98}+p_{6,18}+p_{7,50} \\ &+p_{7,74}+4p_{7,106}+2p_{7,26}+p_{7,90}+p_{7,6}+p_{7,102}+p_{7,22}+2p_{7,86} \\ &+p_{6,14}+p_{7,110}+2p_{7,30}+2p_{7,62}+p_{7,126}+2p_{7,65}+2p_{7,33}+3p_{7,97} \\ &+p_{6,17}+5p_{7,49}+2p_{7,113}+2p_{6,25}+4p_{7,57}+p_{7,121}+p_{7,37} \\ &+2p_{7,101}+3p_{7,21}+p_{6,53}+2p_{7,109}+p_{7,29}+2p_{7,93}+2p_{7,51} \\ &+p_{7,115}+2p_{7,75}+p_{6,43}+p_{6,27}+2p_{7,59}+p_{7,123}+p_{7,7}+2p_{7,71} \\ &+p_{6,39}+p_{7,87}+2p_{6,55}+2p_{7,79}+p_{7,111}+2p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,4} = \frac{1}{2}p_{7,4} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,4}^2 - 4(p_{6,0}+2p_{7,80}+2p_{7,112}+p_{7,8}+2p_{7,40}+3p_{7,104} \\ &+p_{7,24}+p_{7,120}+2p_{7,4}+p_{6,20}+p_{7,52}+p_{7,12}+2p_{6,44}+2p_{7,92} \\ &+p_{7,60}+p_{7,34}+2p_{7,98}+p_{7,18}+p_{7,114}+p_{7,10}+2p_{7,74}+2p_{7,42} \\ &+p_{6,26}+p_{7,122}+2p_{7,38}+p_{7,102}+p_{7,86}+4p_{7,118}+3p_{7,14}+2p_{7,78} \\ &+2p_{7,46}+4p_{7,110}+p_{6,30}+p_{7,62}+p_{6,1}+3p_{7,33}+p_{7,49}+2p_{7,113} \\ &+p_{7,41}+2p_{7,105}+2p_{7,121}+p_{7,5}+4p_{7,69}+2p_{6,37}+2p_{7,77}+2p_{7,45} \\ &+3p_{7,109}+p_{6,29}+5p_{7,61}+2p_{7,125}+2p_{6,3}+p_{7,99}+p_{7,19}+2p_{7,83} \\ &+p_{6,51}+p_{7,11}+2p_{7,107}+2p_{7,91}+p_{7,123}+p_{7,7}+2p_{7,71}+p_{6,39} \\ &+2p_{7,87}+p_{6,55}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,132} = \frac{1}{2}p_{7,4} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,4}^2 - 4(p_{6,0}+2p_{7,80}+2p_{7,112}+p_{7,8}+2p_{7,40}+3p_{7,104} \\ &+p_{7,24}+p_{7,120}+2p_{7,4}+p_{6,20}+p_{7,52}+p_{7,12}+2p_{6,44}+2p_{7,92} \\ &+p_{7,60}+p_{7,34}+2p_{7,98}+p_{7,18}+p_{7,114}+p_{7,10}+2p_{7,74}+2p_{7,42} \\ &+p_{6,26}+p_{7,122}+2p_{7,38}+p_{7,102}+p_{7,86}+4p_{7,118}+3p_{7,14}+2p_{7,78} \\ &+2p_{7,46}+4p_{7,110}+p_{6,30}+p_{7,62}+p_{6,1}+3p_{7,33}+p_{7,49}+2p_{7,113} \\ &+p_{7,41}+2p_{7,105}+2p_{7,121}+p_{7,5}+4p_{7,69}+2p_{6,37}+2p_{7,77}+2p_{7,45} \\ &+3p_{7,109}+p_{6,29}+5p_{7,61}+2p_{7,125}+2p_{6,3}+p_{7,99}+p_{7,19}+2p_{7,83} \\ &+p_{6,51}+p_{7,11}+2p_{7,107}+2p_{7,91}+p_{7,123}+p_{7,7}+2p_{7,71}+p_{6,39} \\ &+2p_{7,87}+p_{6,55}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,68} = \frac{1}{2}p_{7,68} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,68}^2 - 4(p_{6,0}+2p_{7,16}+2p_{7,48}+p_{7,72}+3p_{7,40}+2p_{7,104} \\ &+p_{7,88}+p_{7,56}+2p_{7,68}+p_{6,20}+p_{7,116}+p_{7,76}+2p_{6,44}+2p_{7,28} \\ &+p_{7,124}+2p_{7,34}+p_{7,98}+p_{7,82}+p_{7,50}+2p_{7,10}+p_{7,74}+2p_{7,106} \\ &+p_{6,26}+p_{7,58}+p_{7,38}+2p_{7,102}+p_{7,22}+4p_{7,54}+2p_{7,14}+3p_{7,78} \\ &+4p_{7,46}+2p_{7,110}+p_{6,30}+p_{7,126}+p_{6,1}+3p_{7,97}+2p_{7,49}+p_{7,113} \\ &+2p_{7,41}+p_{7,105}+2p_{7,57}+4p_{7,5}+p_{7,69}+2p_{6,37}+2p_{7,13}+3p_{7,45} \\ &+2p_{7,109}+p_{6,29}+2p_{7,61}+5p_{7,125}+2p_{6,3}+p_{7,35}+2p_{7,19}+p_{7,83} \\ &+p_{6,51}+p_{7,75}+2p_{7,43}+2p_{7,27}+p_{7,59}+2p_{7,7}+p_{7,71}+p_{6,39} \\ &+2p_{7,23}+p_{6,55}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,196} = \frac{1}{2}p_{7,68} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,68}^2 - 4(p_{6,0}+2p_{7,16}+2p_{7,48}+p_{7,72}+3p_{7,40}+2p_{7,104} \\ &+p_{7,88}+p_{7,56}+2p_{7,68}+p_{6,20}+p_{7,116}+p_{7,76}+2p_{6,44}+2p_{7,28} \\ &+p_{7,124}+2p_{7,34}+p_{7,98}+p_{7,82}+p_{7,50}+2p_{7,10}+p_{7,74}+2p_{7,106} \\ &+p_{6,26}+p_{7,58}+p_{7,38}+2p_{7,102}+p_{7,22}+4p_{7,54}+2p_{7,14}+3p_{7,78} \\ &+4p_{7,46}+2p_{7,110}+p_{6,30}+p_{7,126}+p_{6,1}+3p_{7,97}+2p_{7,49}+p_{7,113} \\ &+2p_{7,41}+p_{7,105}+2p_{7,57}+4p_{7,5}+p_{7,69}+2p_{6,37}+2p_{7,13}+3p_{7,45} \\ &+2p_{7,109}+p_{6,29}+2p_{7,61}+5p_{7,125}+2p_{6,3}+p_{7,35}+2p_{7,19}+p_{7,83} \\ &+p_{6,51}+p_{7,75}+2p_{7,43}+2p_{7,27}+p_{7,59}+2p_{7,7}+p_{7,71}+p_{6,39} \\ &+2p_{7,23}+p_{6,55}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,36} = \frac{1}{2}p_{7,36} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,36}^2 - 4(p_{6,32}+2p_{7,16}+2p_{7,112}+3p_{7,8}+2p_{7,72}+p_{7,40} \\ &+p_{7,24}+p_{7,56}+2p_{7,36}+p_{7,84}+p_{6,52}+2p_{6,12}+p_{7,44}+p_{7,92} \\ &+2p_{7,124}+2p_{7,2}+p_{7,66}+p_{7,18}+p_{7,50}+2p_{7,74}+p_{7,42}+2p_{7,106} \\ &+p_{7,26}+p_{6,58}+p_{7,6}+2p_{7,70}+4p_{7,22}+p_{7,118}+4p_{7,14}+2p_{7,78} \\ &+3p_{7,46}+2p_{7,110}+p_{7,94}+p_{6,62}+3p_{7,65}+p_{6,33}+2p_{7,17}+p_{7,81} \\ &+2p_{7,9}+p_{7,73}+2p_{7,25}+2p_{6,5}+p_{7,37}+4p_{7,101}+3p_{7,13}+2p_{7,77} \\ &+2p_{7,109}+2p_{7,29}+5p_{7,93}+p_{6,61}+p_{7,3}+2p_{6,35}+p_{6,19}+p_{7,51} \\ &+2p_{7,115}+2p_{7,11}+p_{7,43}+p_{7,27}+2p_{7,123}+p_{6,7}+p_{7,39}+2p_{7,103} \\ &+p_{6,23}+2p_{7,119}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,164} = \frac{1}{2}p_{7,36} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,36}^2 - 4(p_{6,32}+2p_{7,16}+2p_{7,112}+3p_{7,8}+2p_{7,72}+p_{7,40} \\ &+p_{7,24}+p_{7,56}+2p_{7,36}+p_{7,84}+p_{6,52}+2p_{6,12}+p_{7,44}+p_{7,92} \\ &+2p_{7,124}+2p_{7,2}+p_{7,66}+p_{7,18}+p_{7,50}+2p_{7,74}+p_{7,42}+2p_{7,106} \\ &+p_{7,26}+p_{6,58}+p_{7,6}+2p_{7,70}+4p_{7,22}+p_{7,118}+4p_{7,14}+2p_{7,78} \\ &+3p_{7,46}+2p_{7,110}+p_{7,94}+p_{6,62}+3p_{7,65}+p_{6,33}+2p_{7,17}+p_{7,81} \\ &+2p_{7,9}+p_{7,73}+2p_{7,25}+2p_{6,5}+p_{7,37}+4p_{7,101}+3p_{7,13}+2p_{7,77} \\ &+2p_{7,109}+2p_{7,29}+5p_{7,93}+p_{6,61}+p_{7,3}+2p_{6,35}+p_{6,19}+p_{7,51} \\ &+2p_{7,115}+2p_{7,11}+p_{7,43}+p_{7,27}+2p_{7,123}+p_{6,7}+p_{7,39}+2p_{7,103} \\ &+p_{6,23}+2p_{7,119}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,100} = \frac{1}{2}p_{7,100} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,100}^2 - 4(p_{6,32}+2p_{7,80}+2p_{7,48}+2p_{7,8}+3p_{7,72}+p_{7,104} \\ &+p_{7,88}+p_{7,120}+2p_{7,100}+p_{7,20}+p_{6,52}+2p_{6,12}+p_{7,108}+p_{7,28} \\ &+2p_{7,60}+p_{7,2}+2p_{7,66}+p_{7,82}+p_{7,114}+2p_{7,10}+2p_{7,42}+p_{7,106} \\ &+p_{7,90}+p_{6,58}+2p_{7,6}+p_{7,70}+4p_{7,86}+p_{7,54}+2p_{7,14}+4p_{7,78} \\ &+2p_{7,46}+3p_{7,110}+p_{7,30}+p_{6,62}+3p_{7,1}+p_{6,33}+p_{7,17}+2p_{7,81} \\ &+p_{7,9}+2p_{7,73}+2p_{7,89}+2p_{6,5}+4p_{7,37}+p_{7,101}+2p_{7,13}+3p_{7,77} \\ &+2p_{7,45}+5p_{7,29}+2p_{7,93}+p_{6,61}+p_{7,67}+2p_{6,35}+p_{6,19}+2p_{7,51} \\ &+p_{7,115}+2p_{7,75}+p_{7,107}+p_{7,91}+2p_{7,59}+p_{6,7}+2p_{7,39}+p_{7,103} \\ &+p_{6,23}+2p_{7,55}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,228} = \frac{1}{2}p_{7,100} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,100}^2 - 4(p_{6,32}+2p_{7,80}+2p_{7,48}+2p_{7,8}+3p_{7,72}+p_{7,104} \\ &+p_{7,88}+p_{7,120}+2p_{7,100}+p_{7,20}+p_{6,52}+2p_{6,12}+p_{7,108}+p_{7,28} \\ &+2p_{7,60}+p_{7,2}+2p_{7,66}+p_{7,82}+p_{7,114}+2p_{7,10}+2p_{7,42}+p_{7,106} \\ &+p_{7,90}+p_{6,58}+2p_{7,6}+p_{7,70}+4p_{7,86}+p_{7,54}+2p_{7,14}+4p_{7,78} \\ &+2p_{7,46}+3p_{7,110}+p_{7,30}+p_{6,62}+3p_{7,1}+p_{6,33}+p_{7,17}+2p_{7,81} \\ &+p_{7,9}+2p_{7,73}+2p_{7,89}+2p_{6,5}+4p_{7,37}+p_{7,101}+2p_{7,13}+3p_{7,77} \\ &+2p_{7,45}+5p_{7,29}+2p_{7,93}+p_{6,61}+p_{7,67}+2p_{6,35}+p_{6,19}+2p_{7,51} \\ &+p_{7,115}+2p_{7,75}+p_{7,107}+p_{7,91}+2p_{7,59}+p_{6,7}+2p_{7,39}+p_{7,103} \\ &+p_{6,23}+2p_{7,55}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,20} = \frac{1}{2}p_{7,20} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,20}^2 - 4(2p_{7,0}+2p_{7,96}+p_{6,16}+p_{7,8}+p_{7,40}+p_{7,24} \\ &+2p_{7,56}+3p_{7,120}+p_{7,68}+p_{6,36}+2p_{7,20}+p_{7,76}+2p_{7,108}+p_{7,28} \\ &+2p_{6,60}+p_{7,2}+p_{7,34}+p_{7,50}+2p_{7,114}+p_{7,10}+p_{6,42}+p_{7,26} \\ &+2p_{7,90}+2p_{7,58}+4p_{7,6}+p_{7,102}+2p_{7,54}+p_{7,118}+p_{7,78}+p_{6,46} \\ &+3p_{7,30}+2p_{7,94}+2p_{7,62}+4p_{7,126}+2p_{7,1}+p_{7,65}+p_{6,17}+3p_{7,49} \\ &+2p_{7,9}+p_{7,57}+2p_{7,121}+p_{7,21}+4p_{7,85}+2p_{6,53}+2p_{7,13}+5p_{7,77} \\ &+p_{6,45}+2p_{7,93}+2p_{7,61}+3p_{7,125}+p_{6,3}+p_{7,35}+2p_{7,99}+2p_{6,19} \\ &+p_{7,115}+p_{7,11}+2p_{7,107}+p_{7,27}+2p_{7,123}+p_{6,7}+2p_{7,103}+p_{7,23} \\ &+2p_{7,87}+p_{6,55}+p_{7,15}+2p_{7,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,148} = \frac{1}{2}p_{7,20} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,20}^2 - 4(2p_{7,0}+2p_{7,96}+p_{6,16}+p_{7,8}+p_{7,40}+p_{7,24} \\ &+2p_{7,56}+3p_{7,120}+p_{7,68}+p_{6,36}+2p_{7,20}+p_{7,76}+2p_{7,108}+p_{7,28} \\ &+2p_{6,60}+p_{7,2}+p_{7,34}+p_{7,50}+2p_{7,114}+p_{7,10}+p_{6,42}+p_{7,26} \\ &+2p_{7,90}+2p_{7,58}+4p_{7,6}+p_{7,102}+2p_{7,54}+p_{7,118}+p_{7,78}+p_{6,46} \\ &+3p_{7,30}+2p_{7,94}+2p_{7,62}+4p_{7,126}+2p_{7,1}+p_{7,65}+p_{6,17}+3p_{7,49} \\ &+2p_{7,9}+p_{7,57}+2p_{7,121}+p_{7,21}+4p_{7,85}+2p_{6,53}+2p_{7,13}+5p_{7,77} \\ &+p_{6,45}+2p_{7,93}+2p_{7,61}+3p_{7,125}+p_{6,3}+p_{7,35}+2p_{7,99}+2p_{6,19} \\ &+p_{7,115}+p_{7,11}+2p_{7,107}+p_{7,27}+2p_{7,123}+p_{6,7}+2p_{7,103}+p_{7,23} \\ &+2p_{7,87}+p_{6,55}+p_{7,15}+2p_{7,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,84} = \frac{1}{2}p_{7,84} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,84}^2 - 4(2p_{7,64}+2p_{7,32}+p_{6,16}+p_{7,72}+p_{7,104}+p_{7,88} \\ &+3p_{7,56}+2p_{7,120}+p_{7,4}+p_{6,36}+2p_{7,84}+p_{7,12}+2p_{7,44}+p_{7,92} \\ &+2p_{6,60}+p_{7,66}+p_{7,98}+2p_{7,50}+p_{7,114}+p_{7,74}+p_{6,42}+2p_{7,26} \\ &+p_{7,90}+2p_{7,122}+4p_{7,70}+p_{7,38}+p_{7,54}+2p_{7,118}+p_{7,14}+p_{6,46} \\ &+2p_{7,30}+3p_{7,94}+4p_{7,62}+2p_{7,126}+p_{7,1}+2p_{7,65}+p_{6,17}+3p_{7,113} \\ &+2p_{7,73}+2p_{7,57}+p_{7,121}+4p_{7,21}+p_{7,85}+2p_{6,53}+5p_{7,13}+2p_{7,77} \\ &+p_{6,45}+2p_{7,29}+3p_{7,61}+2p_{7,125}+p_{6,3}+2p_{7,35}+p_{7,99}+2p_{6,19} \\ &+p_{7,51}+p_{7,75}+2p_{7,43}+p_{7,91}+2p_{7,59}+p_{6,7}+2p_{7,39}+2p_{7,23} \\ &+p_{7,87}+p_{6,55}+2p_{7,15}+p_{7,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,212} = \frac{1}{2}p_{7,84} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,84}^2 - 4(2p_{7,64}+2p_{7,32}+p_{6,16}+p_{7,72}+p_{7,104}+p_{7,88} \\ &+3p_{7,56}+2p_{7,120}+p_{7,4}+p_{6,36}+2p_{7,84}+p_{7,12}+2p_{7,44}+p_{7,92} \\ &+2p_{6,60}+p_{7,66}+p_{7,98}+2p_{7,50}+p_{7,114}+p_{7,74}+p_{6,42}+2p_{7,26} \\ &+p_{7,90}+2p_{7,122}+4p_{7,70}+p_{7,38}+p_{7,54}+2p_{7,118}+p_{7,14}+p_{6,46} \\ &+2p_{7,30}+3p_{7,94}+4p_{7,62}+2p_{7,126}+p_{7,1}+2p_{7,65}+p_{6,17}+3p_{7,113} \\ &+2p_{7,73}+2p_{7,57}+p_{7,121}+4p_{7,21}+p_{7,85}+2p_{6,53}+5p_{7,13}+2p_{7,77} \\ &+p_{6,45}+2p_{7,29}+3p_{7,61}+2p_{7,125}+p_{6,3}+2p_{7,35}+p_{7,99}+2p_{6,19} \\ &+p_{7,51}+p_{7,75}+2p_{7,43}+p_{7,91}+2p_{7,59}+p_{6,7}+2p_{7,39}+2p_{7,23} \\ &+p_{7,87}+p_{6,55}+2p_{7,15}+p_{7,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,52} = \frac{1}{2}p_{7,52} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,52}^2 - 4(2p_{7,0}+2p_{7,32}+p_{6,48}+p_{7,72}+p_{7,40}+3p_{7,24} \\ &+2p_{7,88}+p_{7,56}+p_{6,4}+p_{7,100}+2p_{7,52}+2p_{7,12}+p_{7,108}+2p_{6,28} \\ &+p_{7,60}+p_{7,66}+p_{7,34}+2p_{7,18}+p_{7,82}+p_{6,10}+p_{7,42}+2p_{7,90} \\ &+p_{7,58}+2p_{7,122}+p_{7,6}+4p_{7,38}+p_{7,22}+2p_{7,86}+p_{6,14}+p_{7,110} \\ &+4p_{7,30}+2p_{7,94}+3p_{7,62}+2p_{7,126}+2p_{7,33}+p_{7,97}+3p_{7,81}+p_{6,49} \\ &+2p_{7,41}+2p_{7,25}+p_{7,89}+2p_{6,21}+p_{7,53}+4p_{7,117}+p_{6,13}+2p_{7,45} \\ &+5p_{7,109}+3p_{7,29}+2p_{7,93}+2p_{7,125}+2p_{7,3}+p_{7,67}+p_{6,35}+p_{7,19} \\ &+2p_{6,51}+2p_{7,11}+p_{7,43}+2p_{7,27}+p_{7,59}+2p_{7,7}+p_{6,39}+p_{6,23} \\ &+p_{7,55}+2p_{7,119}+p_{7,47}+2p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,180} = \frac{1}{2}p_{7,52} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,52}^2 - 4(2p_{7,0}+2p_{7,32}+p_{6,48}+p_{7,72}+p_{7,40}+3p_{7,24} \\ &+2p_{7,88}+p_{7,56}+p_{6,4}+p_{7,100}+2p_{7,52}+2p_{7,12}+p_{7,108}+2p_{6,28} \\ &+p_{7,60}+p_{7,66}+p_{7,34}+2p_{7,18}+p_{7,82}+p_{6,10}+p_{7,42}+2p_{7,90} \\ &+p_{7,58}+2p_{7,122}+p_{7,6}+4p_{7,38}+p_{7,22}+2p_{7,86}+p_{6,14}+p_{7,110} \\ &+4p_{7,30}+2p_{7,94}+3p_{7,62}+2p_{7,126}+2p_{7,33}+p_{7,97}+3p_{7,81}+p_{6,49} \\ &+2p_{7,41}+2p_{7,25}+p_{7,89}+2p_{6,21}+p_{7,53}+4p_{7,117}+p_{6,13}+2p_{7,45} \\ &+5p_{7,109}+3p_{7,29}+2p_{7,93}+2p_{7,125}+2p_{7,3}+p_{7,67}+p_{6,35}+p_{7,19} \\ &+2p_{6,51}+2p_{7,11}+p_{7,43}+2p_{7,27}+p_{7,59}+2p_{7,7}+p_{6,39}+p_{6,23} \\ &+p_{7,55}+2p_{7,119}+p_{7,47}+2p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,116} = \frac{1}{2}p_{7,116} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,116}^2 - 4(2p_{7,64}+2p_{7,96}+p_{6,48}+p_{7,8}+p_{7,104}+2p_{7,24} \\ &+3p_{7,88}+p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,116}+2p_{7,76}+p_{7,44}+2p_{6,28} \\ &+p_{7,124}+p_{7,2}+p_{7,98}+p_{7,18}+2p_{7,82}+p_{6,10}+p_{7,106}+2p_{7,26} \\ &+2p_{7,58}+p_{7,122}+p_{7,70}+4p_{7,102}+2p_{7,22}+p_{7,86}+p_{6,14}+p_{7,46} \\ &+2p_{7,30}+4p_{7,94}+2p_{7,62}+3p_{7,126}+p_{7,33}+2p_{7,97}+3p_{7,17}+p_{6,49} \\ &+2p_{7,105}+p_{7,25}+2p_{7,89}+2p_{6,21}+4p_{7,53}+p_{7,117}+p_{6,13}+5p_{7,45} \\ &+2p_{7,109}+2p_{7,29}+3p_{7,93}+2p_{7,61}+p_{7,3}+2p_{7,67}+p_{6,35}+p_{7,83} \\ &+2p_{6,51}+2p_{7,75}+p_{7,107}+2p_{7,91}+p_{7,123}+2p_{7,71}+p_{6,39}+p_{6,23} \\ &+2p_{7,55}+p_{7,119}+2p_{7,47}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,244} = \frac{1}{2}p_{7,116} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,116}^2 - 4(2p_{7,64}+2p_{7,96}+p_{6,48}+p_{7,8}+p_{7,104}+2p_{7,24} \\ &+3p_{7,88}+p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,116}+2p_{7,76}+p_{7,44}+2p_{6,28} \\ &+p_{7,124}+p_{7,2}+p_{7,98}+p_{7,18}+2p_{7,82}+p_{6,10}+p_{7,106}+2p_{7,26} \\ &+2p_{7,58}+p_{7,122}+p_{7,70}+4p_{7,102}+2p_{7,22}+p_{7,86}+p_{6,14}+p_{7,46} \\ &+2p_{7,30}+4p_{7,94}+2p_{7,62}+3p_{7,126}+p_{7,33}+2p_{7,97}+3p_{7,17}+p_{6,49} \\ &+2p_{7,105}+p_{7,25}+2p_{7,89}+2p_{6,21}+4p_{7,53}+p_{7,117}+p_{6,13}+5p_{7,45} \\ &+2p_{7,109}+2p_{7,29}+3p_{7,93}+2p_{7,61}+p_{7,3}+2p_{7,67}+p_{6,35}+p_{7,83} \\ &+2p_{6,51}+2p_{7,75}+p_{7,107}+2p_{7,91}+p_{7,123}+2p_{7,71}+p_{6,39}+p_{6,23} \\ &+2p_{7,55}+p_{7,119}+2p_{7,47}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,12} = \frac{1}{2}p_{7,12} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,12}^2 - 4(p_{7,0}+p_{7,32}+p_{7,16}+2p_{7,48}+3p_{7,112}+p_{6,8} \\ &+2p_{7,88}+2p_{7,120}+p_{7,68}+2p_{7,100}+p_{7,20}+2p_{6,52}+2p_{7,12}+p_{6,28} \\ &+p_{7,60}+p_{7,2}+p_{6,34}+p_{7,18}+2p_{7,82}+2p_{7,50}+p_{7,42}+2p_{7,106} \\ &+p_{7,26}+p_{7,122}+p_{7,70}+p_{6,38}+3p_{7,22}+2p_{7,86}+2p_{7,54}+4p_{7,118} \\ &+2p_{7,46}+p_{7,110}+p_{7,94}+4p_{7,126}+2p_{7,1}+p_{7,49}+2p_{7,113}+p_{6,9} \\ &+3p_{7,41}+p_{7,57}+2p_{7,121}+2p_{7,5}+5p_{7,69}+p_{6,37}+2p_{7,85}+2p_{7,53} \\ &+3p_{7,117}+p_{7,13}+4p_{7,77}+2p_{6,45}+p_{7,3}+2p_{7,99}+p_{7,19}+2p_{7,115} \\ &+2p_{6,11}+p_{7,107}+p_{7,27}+2p_{7,91}+p_{6,59}+p_{7,7}+2p_{7,71}+p_{7,15} \\ &+2p_{7,79}+p_{6,47}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,140} = \frac{1}{2}p_{7,12} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,12}^2 - 4(p_{7,0}+p_{7,32}+p_{7,16}+2p_{7,48}+3p_{7,112}+p_{6,8} \\ &+2p_{7,88}+2p_{7,120}+p_{7,68}+2p_{7,100}+p_{7,20}+2p_{6,52}+2p_{7,12}+p_{6,28} \\ &+p_{7,60}+p_{7,2}+p_{6,34}+p_{7,18}+2p_{7,82}+2p_{7,50}+p_{7,42}+2p_{7,106} \\ &+p_{7,26}+p_{7,122}+p_{7,70}+p_{6,38}+3p_{7,22}+2p_{7,86}+2p_{7,54}+4p_{7,118} \\ &+2p_{7,46}+p_{7,110}+p_{7,94}+4p_{7,126}+2p_{7,1}+p_{7,49}+2p_{7,113}+p_{6,9} \\ &+3p_{7,41}+p_{7,57}+2p_{7,121}+2p_{7,5}+5p_{7,69}+p_{6,37}+2p_{7,85}+2p_{7,53} \\ &+3p_{7,117}+p_{7,13}+4p_{7,77}+2p_{6,45}+p_{7,3}+2p_{7,99}+p_{7,19}+2p_{7,115} \\ &+2p_{6,11}+p_{7,107}+p_{7,27}+2p_{7,91}+p_{6,59}+p_{7,7}+2p_{7,71}+p_{7,15} \\ &+2p_{7,79}+p_{6,47}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,76} = \frac{1}{2}p_{7,76} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,76}^2 - 4(p_{7,64}+p_{7,96}+p_{7,80}+3p_{7,48}+2p_{7,112}+p_{6,8} \\ &+2p_{7,24}+2p_{7,56}+p_{7,4}+2p_{7,36}+p_{7,84}+2p_{6,52}+2p_{7,76}+p_{6,28} \\ &+p_{7,124}+p_{7,66}+p_{6,34}+2p_{7,18}+p_{7,82}+2p_{7,114}+2p_{7,42}+p_{7,106} \\ &+p_{7,90}+p_{7,58}+p_{7,6}+p_{6,38}+2p_{7,22}+3p_{7,86}+4p_{7,54}+2p_{7,118} \\ &+p_{7,46}+2p_{7,110}+p_{7,30}+4p_{7,62}+2p_{7,65}+2p_{7,49}+p_{7,113}+p_{6,9} \\ &+3p_{7,105}+2p_{7,57}+p_{7,121}+5p_{7,5}+2p_{7,69}+p_{6,37}+2p_{7,21} \\ &+3p_{7,53}+2p_{7,117}+4p_{7,13}+p_{7,77}+2p_{6,45}+p_{7,67}+2p_{7,35}+p_{7,83} \\ &+2p_{7,51}+2p_{6,11}+p_{7,43}+2p_{7,27}+p_{7,91}+p_{6,59}+2p_{7,7}+p_{7,71} \\ &+2p_{7,15}+p_{7,79}+p_{6,47}+2p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,204} = \frac{1}{2}p_{7,76} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,76}^2 - 4(p_{7,64}+p_{7,96}+p_{7,80}+3p_{7,48}+2p_{7,112}+p_{6,8} \\ &+2p_{7,24}+2p_{7,56}+p_{7,4}+2p_{7,36}+p_{7,84}+2p_{6,52}+2p_{7,76}+p_{6,28} \\ &+p_{7,124}+p_{7,66}+p_{6,34}+2p_{7,18}+p_{7,82}+2p_{7,114}+2p_{7,42}+p_{7,106} \\ &+p_{7,90}+p_{7,58}+p_{7,6}+p_{6,38}+2p_{7,22}+3p_{7,86}+4p_{7,54}+2p_{7,118} \\ &+p_{7,46}+2p_{7,110}+p_{7,30}+4p_{7,62}+2p_{7,65}+2p_{7,49}+p_{7,113}+p_{6,9} \\ &+3p_{7,105}+2p_{7,57}+p_{7,121}+5p_{7,5}+2p_{7,69}+p_{6,37}+2p_{7,21} \\ &+3p_{7,53}+2p_{7,117}+4p_{7,13}+p_{7,77}+2p_{6,45}+p_{7,67}+2p_{7,35}+p_{7,83} \\ &+2p_{7,51}+2p_{6,11}+p_{7,43}+2p_{7,27}+p_{7,91}+p_{6,59}+2p_{7,7}+p_{7,71} \\ &+2p_{7,15}+p_{7,79}+p_{6,47}+2p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,44} = \frac{1}{2}p_{7,44} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,44}^2 - 4(p_{7,64}+p_{7,32}+3p_{7,16}+2p_{7,80}+p_{7,48}+p_{6,40} \\ &+2p_{7,24}+2p_{7,120}+2p_{7,4}+p_{7,100}+2p_{6,20}+p_{7,52}+2p_{7,44}+p_{7,92} \\ &+p_{6,60}+p_{6,2}+p_{7,34}+2p_{7,82}+p_{7,50}+2p_{7,114}+2p_{7,10}+p_{7,74} \\ &+p_{7,26}+p_{7,58}+p_{6,6}+p_{7,102}+4p_{7,22}+2p_{7,86}+3p_{7,54}+2p_{7,118} \\ &+p_{7,14}+2p_{7,78}+4p_{7,30}+p_{7,126}+2p_{7,33}+2p_{7,17}+p_{7,81}+3p_{7,73} \\ &+p_{6,41}+2p_{7,25}+p_{7,89}+p_{6,5}+2p_{7,37}+5p_{7,101}+3p_{7,21}+2p_{7,85} \\ &+2p_{7,117}+2p_{6,13}+p_{7,45}+4p_{7,109}+2p_{7,3}+p_{7,35}+2p_{7,19}+p_{7,51} \\ &+p_{7,11}+2p_{6,43}+p_{6,27}+p_{7,59}+2p_{7,123}+p_{7,39}+2p_{7,103}+p_{6,15} \\ &+p_{7,47}+2p_{7,111}+p_{6,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,172} = \frac{1}{2}p_{7,44} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,44}^2 - 4(p_{7,64}+p_{7,32}+3p_{7,16}+2p_{7,80}+p_{7,48}+p_{6,40} \\ &+2p_{7,24}+2p_{7,120}+2p_{7,4}+p_{7,100}+2p_{6,20}+p_{7,52}+2p_{7,44}+p_{7,92} \\ &+p_{6,60}+p_{6,2}+p_{7,34}+2p_{7,82}+p_{7,50}+2p_{7,114}+2p_{7,10}+p_{7,74} \\ &+p_{7,26}+p_{7,58}+p_{6,6}+p_{7,102}+4p_{7,22}+2p_{7,86}+3p_{7,54}+2p_{7,118} \\ &+p_{7,14}+2p_{7,78}+4p_{7,30}+p_{7,126}+2p_{7,33}+2p_{7,17}+p_{7,81}+3p_{7,73} \\ &+p_{6,41}+2p_{7,25}+p_{7,89}+p_{6,5}+2p_{7,37}+5p_{7,101}+3p_{7,21}+2p_{7,85} \\ &+2p_{7,117}+2p_{6,13}+p_{7,45}+4p_{7,109}+2p_{7,3}+p_{7,35}+2p_{7,19}+p_{7,51} \\ &+p_{7,11}+2p_{6,43}+p_{6,27}+p_{7,59}+2p_{7,123}+p_{7,39}+2p_{7,103}+p_{6,15} \\ &+p_{7,47}+2p_{7,111}+p_{6,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,108} = \frac{1}{2}p_{7,108} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,108}^2 - 4(p_{7,0}+p_{7,96}+2p_{7,16}+3p_{7,80}+p_{7,112}+p_{6,40} \\ &+2p_{7,88}+2p_{7,56}+2p_{7,68}+p_{7,36}+2p_{6,20}+p_{7,116}+2p_{7,108}+p_{7,28} \\ &+p_{6,60}+p_{6,2}+p_{7,98}+2p_{7,18}+2p_{7,50}+p_{7,114}+p_{7,10}+2p_{7,74} \\ &+p_{7,90}+p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,22}+4p_{7,86}+2p_{7,54}+3p_{7,118} \\ &+2p_{7,14}+p_{7,78}+4p_{7,94}+p_{7,62}+2p_{7,97}+p_{7,17}+2p_{7,81}+3p_{7,9} \\ &+p_{6,41}+p_{7,25}+2p_{7,89}+p_{6,5}+5p_{7,37}+2p_{7,101}+2p_{7,21}+3p_{7,85} \\ &+2p_{7,53}+2p_{6,13}+4p_{7,45}+p_{7,109}+2p_{7,67}+p_{7,99}+2p_{7,83}+p_{7,115} \\ &+p_{7,75}+2p_{6,43}+p_{6,27}+2p_{7,59}+p_{7,123}+2p_{7,39}+p_{7,103}+p_{6,15} \\ &+2p_{7,47}+p_{7,111}+p_{6,31}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,236} = \frac{1}{2}p_{7,108} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,108}^2 - 4(p_{7,0}+p_{7,96}+2p_{7,16}+3p_{7,80}+p_{7,112}+p_{6,40} \\ &+2p_{7,88}+2p_{7,56}+2p_{7,68}+p_{7,36}+2p_{6,20}+p_{7,116}+2p_{7,108}+p_{7,28} \\ &+p_{6,60}+p_{6,2}+p_{7,98}+2p_{7,18}+2p_{7,50}+p_{7,114}+p_{7,10}+2p_{7,74} \\ &+p_{7,90}+p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,22}+4p_{7,86}+2p_{7,54}+3p_{7,118} \\ &+2p_{7,14}+p_{7,78}+4p_{7,94}+p_{7,62}+2p_{7,97}+p_{7,17}+2p_{7,81}+3p_{7,9} \\ &+p_{6,41}+p_{7,25}+2p_{7,89}+p_{6,5}+5p_{7,37}+2p_{7,101}+2p_{7,21}+3p_{7,85} \\ &+2p_{7,53}+2p_{6,13}+4p_{7,45}+p_{7,109}+2p_{7,67}+p_{7,99}+2p_{7,83}+p_{7,115} \\ &+p_{7,75}+2p_{6,43}+p_{6,27}+2p_{7,59}+p_{7,123}+2p_{7,39}+p_{7,103}+p_{6,15} \\ &+2p_{7,47}+p_{7,111}+p_{6,31}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,28} = \frac{1}{2}p_{7,28} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,28}^2 - 4(3p_{7,0}+2p_{7,64}+p_{7,32}+p_{7,16}+p_{7,48}+2p_{7,8} \\ &+2p_{7,104}+p_{6,24}+2p_{6,4}+p_{7,36}+p_{7,84}+2p_{7,116}+p_{7,76}+p_{6,44} \\ &+2p_{7,28}+2p_{7,66}+p_{7,34}+2p_{7,98}+p_{7,18}+p_{6,50}+p_{7,10}+p_{7,42} \\ &+p_{7,58}+2p_{7,122}+4p_{7,6}+2p_{7,70}+3p_{7,38}+2p_{7,102}+p_{7,86}+p_{6,54} \\ &+4p_{7,14}+p_{7,110}+2p_{7,62}+p_{7,126}+2p_{7,1}+p_{7,65}+2p_{7,17}+2p_{7,9} \\ &+p_{7,73}+p_{6,25}+3p_{7,57}+3p_{7,5}+2p_{7,69}+2p_{7,101}+2p_{7,21}+5p_{7,85} \\ &+p_{6,53}+p_{7,29}+4p_{7,93}+2p_{6,61}+2p_{7,3}+p_{7,35}+p_{7,19}+2p_{7,115} \\ &+p_{6,11}+p_{7,43}+2p_{7,107}+2p_{6,27}+p_{7,123}+p_{7,23}+2p_{7,87}+p_{6,15} \\ &+2p_{7,111}+p_{7,31}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,156} = \frac{1}{2}p_{7,28} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,28}^2 - 4(3p_{7,0}+2p_{7,64}+p_{7,32}+p_{7,16}+p_{7,48}+2p_{7,8} \\ &+2p_{7,104}+p_{6,24}+2p_{6,4}+p_{7,36}+p_{7,84}+2p_{7,116}+p_{7,76}+p_{6,44} \\ &+2p_{7,28}+2p_{7,66}+p_{7,34}+2p_{7,98}+p_{7,18}+p_{6,50}+p_{7,10}+p_{7,42} \\ &+p_{7,58}+2p_{7,122}+4p_{7,6}+2p_{7,70}+3p_{7,38}+2p_{7,102}+p_{7,86}+p_{6,54} \\ &+4p_{7,14}+p_{7,110}+2p_{7,62}+p_{7,126}+2p_{7,1}+p_{7,65}+2p_{7,17}+2p_{7,9} \\ &+p_{7,73}+p_{6,25}+3p_{7,57}+3p_{7,5}+2p_{7,69}+2p_{7,101}+2p_{7,21}+5p_{7,85} \\ &+p_{6,53}+p_{7,29}+4p_{7,93}+2p_{6,61}+2p_{7,3}+p_{7,35}+p_{7,19}+2p_{7,115} \\ &+p_{6,11}+p_{7,43}+2p_{7,107}+2p_{6,27}+p_{7,123}+p_{7,23}+2p_{7,87}+p_{6,15} \\ &+2p_{7,111}+p_{7,31}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,92} = \frac{1}{2}p_{7,92} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,92}^2 - 4(2p_{7,0}+3p_{7,64}+p_{7,96}+p_{7,80}+p_{7,112}+2p_{7,72} \\ &+2p_{7,40}+p_{6,24}+2p_{6,4}+p_{7,100}+p_{7,20}+2p_{7,52}+p_{7,12}+p_{6,44} \\ &+2p_{7,92}+2p_{7,2}+2p_{7,34}+p_{7,98}+p_{7,82}+p_{6,50}+p_{7,74}+p_{7,106} \\ &+2p_{7,58}+p_{7,122}+2p_{7,6}+4p_{7,70}+2p_{7,38}+3p_{7,102}+p_{7,22}+p_{6,54} \\ &+4p_{7,78}+p_{7,46}+p_{7,62}+2p_{7,126}+p_{7,1}+2p_{7,65}+2p_{7,81}+p_{7,9} \\ &+2p_{7,73}+p_{6,25}+3p_{7,121}+2p_{7,5}+3p_{7,69}+2p_{7,37}+5p_{7,21} \\ &+2p_{7,85}+p_{6,53}+4p_{7,29}+p_{7,93}+2p_{6,61}+2p_{7,67}+p_{7,99}+p_{7,83} \\ &+2p_{7,51}+p_{6,11}+2p_{7,43}+p_{7,107}+2p_{6,27}+p_{7,59}+2p_{7,23}+p_{7,87} \\ &+p_{6,15}+2p_{7,47}+2p_{7,31}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,220} = \frac{1}{2}p_{7,92} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,92}^2 - 4(2p_{7,0}+3p_{7,64}+p_{7,96}+p_{7,80}+p_{7,112}+2p_{7,72} \\ &+2p_{7,40}+p_{6,24}+2p_{6,4}+p_{7,100}+p_{7,20}+2p_{7,52}+p_{7,12}+p_{6,44} \\ &+2p_{7,92}+2p_{7,2}+2p_{7,34}+p_{7,98}+p_{7,82}+p_{6,50}+p_{7,74}+p_{7,106} \\ &+2p_{7,58}+p_{7,122}+2p_{7,6}+4p_{7,70}+2p_{7,38}+3p_{7,102}+p_{7,22}+p_{6,54} \\ &+4p_{7,78}+p_{7,46}+p_{7,62}+2p_{7,126}+p_{7,1}+2p_{7,65}+2p_{7,81}+p_{7,9} \\ &+2p_{7,73}+p_{6,25}+3p_{7,121}+2p_{7,5}+3p_{7,69}+2p_{7,37}+5p_{7,21} \\ &+2p_{7,85}+p_{6,53}+4p_{7,29}+p_{7,93}+2p_{6,61}+2p_{7,67}+p_{7,99}+p_{7,83} \\ &+2p_{7,51}+p_{6,11}+2p_{7,43}+p_{7,107}+2p_{6,27}+p_{7,59}+2p_{7,23}+p_{7,87} \\ &+p_{6,15}+2p_{7,47}+2p_{7,31}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,60} = \frac{1}{2}p_{7,60} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,60}^2 - 4(p_{7,64}+3p_{7,32}+2p_{7,96}+p_{7,80}+p_{7,48}+2p_{7,8} \\ &+2p_{7,40}+p_{6,56}+p_{7,68}+2p_{6,36}+2p_{7,20}+p_{7,116}+p_{6,12}+p_{7,108} \\ &+2p_{7,60}+2p_{7,2}+p_{7,66}+2p_{7,98}+p_{6,18}+p_{7,50}+p_{7,74}+p_{7,42} \\ &+2p_{7,26}+p_{7,90}+2p_{7,6}+3p_{7,70}+4p_{7,38}+2p_{7,102}+p_{6,22}+p_{7,118} \\ &+p_{7,14}+4p_{7,46}+p_{7,30}+2p_{7,94}+2p_{7,33}+p_{7,97}+2p_{7,49}+2p_{7,41} \\ &+p_{7,105}+3p_{7,89}+p_{6,57}+2p_{7,5}+3p_{7,37}+2p_{7,101}+p_{6,21}+2p_{7,53} \\ &+5p_{7,117}+2p_{6,29}+p_{7,61}+4p_{7,125}+p_{7,67}+2p_{7,35}+2p_{7,19}+p_{7,51} \\ &+2p_{7,11}+p_{7,75}+p_{6,43}+p_{7,27}+2p_{6,59}+p_{7,55}+2p_{7,119}+2p_{7,15} \\ &+p_{6,47}+p_{6,31}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,188} = \frac{1}{2}p_{7,60} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,60}^2 - 4(p_{7,64}+3p_{7,32}+2p_{7,96}+p_{7,80}+p_{7,48}+2p_{7,8} \\ &+2p_{7,40}+p_{6,56}+p_{7,68}+2p_{6,36}+2p_{7,20}+p_{7,116}+p_{6,12}+p_{7,108} \\ &+2p_{7,60}+2p_{7,2}+p_{7,66}+2p_{7,98}+p_{6,18}+p_{7,50}+p_{7,74}+p_{7,42} \\ &+2p_{7,26}+p_{7,90}+2p_{7,6}+3p_{7,70}+4p_{7,38}+2p_{7,102}+p_{6,22}+p_{7,118} \\ &+p_{7,14}+4p_{7,46}+p_{7,30}+2p_{7,94}+2p_{7,33}+p_{7,97}+2p_{7,49}+2p_{7,41} \\ &+p_{7,105}+3p_{7,89}+p_{6,57}+2p_{7,5}+3p_{7,37}+2p_{7,101}+p_{6,21}+2p_{7,53} \\ &+5p_{7,117}+2p_{6,29}+p_{7,61}+4p_{7,125}+p_{7,67}+2p_{7,35}+2p_{7,19}+p_{7,51} \\ &+2p_{7,11}+p_{7,75}+p_{6,43}+p_{7,27}+2p_{6,59}+p_{7,55}+2p_{7,119}+2p_{7,15} \\ &+p_{6,47}+p_{6,31}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,124} = \frac{1}{2}p_{7,124} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,124}^2 - 4(p_{7,0}+2p_{7,32}+3p_{7,96}+p_{7,16}+p_{7,112}+2p_{7,72} \\ &+2p_{7,104}+p_{6,56}+p_{7,4}+2p_{6,36}+2p_{7,84}+p_{7,52}+p_{6,12}+p_{7,44} \\ &+2p_{7,124}+p_{7,2}+2p_{7,66}+2p_{7,34}+p_{6,18}+p_{7,114}+p_{7,10}+p_{7,106} \\ &+p_{7,26}+2p_{7,90}+3p_{7,6}+2p_{7,70}+2p_{7,38}+4p_{7,102}+p_{6,22}+p_{7,54} \\ &+p_{7,78}+4p_{7,110}+2p_{7,30}+p_{7,94}+p_{7,33}+2p_{7,97}+2p_{7,113}+p_{7,41} \\ &+2p_{7,105}+3p_{7,25}+p_{6,57}+2p_{7,69}+2p_{7,37}+3p_{7,101}+p_{6,21} \\ &+5p_{7,53}+2p_{7,117}+2p_{6,29}+4p_{7,61}+p_{7,125}+p_{7,3}+2p_{7,99}+2p_{7,83} \\ &+p_{7,115}+p_{7,11}+2p_{7,75}+p_{6,43}+p_{7,91}+2p_{6,59}+2p_{7,55}+p_{7,119} \\ &+2p_{7,79}+p_{6,47}+p_{6,31}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,252} = \frac{1}{2}p_{7,124} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,124}^2 - 4(p_{7,0}+2p_{7,32}+3p_{7,96}+p_{7,16}+p_{7,112}+2p_{7,72} \\ &+2p_{7,104}+p_{6,56}+p_{7,4}+2p_{6,36}+2p_{7,84}+p_{7,52}+p_{6,12}+p_{7,44} \\ &+2p_{7,124}+p_{7,2}+2p_{7,66}+2p_{7,34}+p_{6,18}+p_{7,114}+p_{7,10}+p_{7,106} \\ &+p_{7,26}+2p_{7,90}+3p_{7,6}+2p_{7,70}+2p_{7,38}+4p_{7,102}+p_{6,22}+p_{7,54} \\ &+p_{7,78}+4p_{7,110}+2p_{7,30}+p_{7,94}+p_{7,33}+2p_{7,97}+2p_{7,113}+p_{7,41} \\ &+2p_{7,105}+3p_{7,25}+p_{6,57}+2p_{7,69}+2p_{7,37}+3p_{7,101}+p_{6,21} \\ &+5p_{7,53}+2p_{7,117}+2p_{6,29}+4p_{7,61}+p_{7,125}+p_{7,3}+2p_{7,99}+2p_{7,83} \\ &+p_{7,115}+p_{7,11}+2p_{7,75}+p_{6,43}+p_{7,91}+2p_{6,59}+2p_{7,55}+p_{7,119} \\ &+2p_{7,79}+p_{6,47}+p_{6,31}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,2} = \frac{1}{2}p_{7,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,2}^2 - 4(p_{7,32}+2p_{7,96}+p_{7,16}+p_{7,112}+p_{7,8}+2p_{7,72} \\ &+2p_{7,40}+p_{6,24}+p_{7,120}+2p_{7,36}+p_{7,100}+p_{7,84}+4p_{7,116}+3p_{7,12} \\ &+2p_{7,76}+2p_{7,44}+4p_{7,108}+p_{6,28}+p_{7,60}+2p_{7,2}+p_{6,18}+p_{7,50} \\ &+p_{7,10}+2p_{6,42}+2p_{7,90}+p_{7,58}+p_{7,6}+2p_{7,38}+3p_{7,102}+p_{7,22} \\ &+p_{7,118}+2p_{7,78}+2p_{7,110}+p_{6,62}+2p_{6,1}+p_{7,97}+p_{7,17}+2p_{7,81} \\ &+p_{6,49}+p_{7,9}+2p_{7,105}+2p_{7,89}+p_{7,121}+p_{7,5}+2p_{7,69}+p_{6,37} \\ &+2p_{7,85}+p_{6,53}+2p_{7,61}+p_{7,125}+p_{7,3}+4p_{7,67}+2p_{6,35}+2p_{7,75} \\ &+2p_{7,43}+3p_{7,107}+p_{6,27}+5p_{7,59}+2p_{7,123}+p_{7,39}+2p_{7,103} \\ &+2p_{7,119}+p_{7,47}+2p_{7,111}+3p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,130} = \frac{1}{2}p_{7,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,2}^2 - 4(p_{7,32}+2p_{7,96}+p_{7,16}+p_{7,112}+p_{7,8}+2p_{7,72} \\ &+2p_{7,40}+p_{6,24}+p_{7,120}+2p_{7,36}+p_{7,100}+p_{7,84}+4p_{7,116}+3p_{7,12} \\ &+2p_{7,76}+2p_{7,44}+4p_{7,108}+p_{6,28}+p_{7,60}+2p_{7,2}+p_{6,18}+p_{7,50} \\ &+p_{7,10}+2p_{6,42}+2p_{7,90}+p_{7,58}+p_{7,6}+2p_{7,38}+3p_{7,102}+p_{7,22} \\ &+p_{7,118}+2p_{7,78}+2p_{7,110}+p_{6,62}+2p_{6,1}+p_{7,97}+p_{7,17}+2p_{7,81} \\ &+p_{6,49}+p_{7,9}+2p_{7,105}+2p_{7,89}+p_{7,121}+p_{7,5}+2p_{7,69}+p_{6,37} \\ &+2p_{7,85}+p_{6,53}+2p_{7,61}+p_{7,125}+p_{7,3}+4p_{7,67}+2p_{6,35}+2p_{7,75} \\ &+2p_{7,43}+3p_{7,107}+p_{6,27}+5p_{7,59}+2p_{7,123}+p_{7,39}+2p_{7,103} \\ &+2p_{7,119}+p_{7,47}+2p_{7,111}+3p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,66} = \frac{1}{2}p_{7,66} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,66}^2 - 4(2p_{7,32}+p_{7,96}+p_{7,80}+p_{7,48}+2p_{7,8}+p_{7,72} \\ &+2p_{7,104}+p_{6,24}+p_{7,56}+p_{7,36}+2p_{7,100}+p_{7,20}+4p_{7,52}+2p_{7,12} \\ &+3p_{7,76}+4p_{7,44}+2p_{7,108}+p_{6,28}+p_{7,124}+2p_{7,66}+p_{6,18}+p_{7,114} \\ &+p_{7,74}+2p_{6,42}+2p_{7,26}+p_{7,122}+p_{7,70}+3p_{7,38}+2p_{7,102}+p_{7,86} \\ &+p_{7,54}+2p_{7,14}+2p_{7,46}+p_{6,62}+2p_{6,1}+p_{7,33}+2p_{7,17}+p_{7,81} \\ &+p_{6,49}+p_{7,73}+2p_{7,41}+2p_{7,25}+p_{7,57}+2p_{7,5}+p_{7,69}+p_{6,37} \\ &+2p_{7,21}+p_{6,53}+p_{7,61}+2p_{7,125}+4p_{7,3}+p_{7,67}+2p_{6,35}+2p_{7,11} \\ &+3p_{7,43}+2p_{7,107}+p_{6,27}+2p_{7,59}+5p_{7,123}+2p_{7,39}+p_{7,103} \\ &+2p_{7,55}+2p_{7,47}+p_{7,111}+3p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,194} = \frac{1}{2}p_{7,66} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,66}^2 - 4(2p_{7,32}+p_{7,96}+p_{7,80}+p_{7,48}+2p_{7,8}+p_{7,72} \\ &+2p_{7,104}+p_{6,24}+p_{7,56}+p_{7,36}+2p_{7,100}+p_{7,20}+4p_{7,52}+2p_{7,12} \\ &+3p_{7,76}+4p_{7,44}+2p_{7,108}+p_{6,28}+p_{7,124}+2p_{7,66}+p_{6,18}+p_{7,114} \\ &+p_{7,74}+2p_{6,42}+2p_{7,26}+p_{7,122}+p_{7,70}+3p_{7,38}+2p_{7,102}+p_{7,86} \\ &+p_{7,54}+2p_{7,14}+2p_{7,46}+p_{6,62}+2p_{6,1}+p_{7,33}+2p_{7,17}+p_{7,81} \\ &+p_{6,49}+p_{7,73}+2p_{7,41}+2p_{7,25}+p_{7,57}+2p_{7,5}+p_{7,69}+p_{6,37} \\ &+2p_{7,21}+p_{6,53}+p_{7,61}+2p_{7,125}+4p_{7,3}+p_{7,67}+2p_{6,35}+2p_{7,11} \\ &+3p_{7,43}+2p_{7,107}+p_{6,27}+2p_{7,59}+5p_{7,123}+2p_{7,39}+p_{7,103} \\ &+2p_{7,55}+2p_{7,47}+p_{7,111}+3p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,34} = \frac{1}{2}p_{7,34} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,34}^2 - 4(2p_{7,0}+p_{7,64}+p_{7,16}+p_{7,48}+2p_{7,72}+p_{7,40} \\ &+2p_{7,104}+p_{7,24}+p_{6,56}+p_{7,4}+2p_{7,68}+4p_{7,20}+p_{7,116}+4p_{7,12} \\ &+2p_{7,76}+3p_{7,44}+2p_{7,108}+p_{7,92}+p_{6,60}+2p_{7,34}+p_{7,82}+p_{6,50} \\ &+2p_{6,10}+p_{7,42}+p_{7,90}+2p_{7,122}+3p_{7,6}+2p_{7,70}+p_{7,38}+p_{7,22} \\ &+p_{7,54}+2p_{7,14}+2p_{7,110}+p_{6,30}+p_{7,1}+2p_{6,33}+p_{6,17}+p_{7,49} \\ &+2p_{7,113}+2p_{7,9}+p_{7,41}+p_{7,25}+2p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,101} \\ &+p_{6,21}+2p_{7,117}+p_{7,29}+2p_{7,93}+2p_{6,3}+p_{7,35}+4p_{7,99}+3p_{7,11} \\ &+2p_{7,75}+2p_{7,107}+2p_{7,27}+5p_{7,91}+p_{6,59}+2p_{7,7}+p_{7,71}+2p_{7,23} \\ &+2p_{7,15}+p_{7,79}+p_{6,31}+3p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,162} = \frac{1}{2}p_{7,34} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,34}^2 - 4(2p_{7,0}+p_{7,64}+p_{7,16}+p_{7,48}+2p_{7,72}+p_{7,40} \\ &+2p_{7,104}+p_{7,24}+p_{6,56}+p_{7,4}+2p_{7,68}+4p_{7,20}+p_{7,116}+4p_{7,12} \\ &+2p_{7,76}+3p_{7,44}+2p_{7,108}+p_{7,92}+p_{6,60}+2p_{7,34}+p_{7,82}+p_{6,50} \\ &+2p_{6,10}+p_{7,42}+p_{7,90}+2p_{7,122}+3p_{7,6}+2p_{7,70}+p_{7,38}+p_{7,22} \\ &+p_{7,54}+2p_{7,14}+2p_{7,110}+p_{6,30}+p_{7,1}+2p_{6,33}+p_{6,17}+p_{7,49} \\ &+2p_{7,113}+2p_{7,9}+p_{7,41}+p_{7,25}+2p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,101} \\ &+p_{6,21}+2p_{7,117}+p_{7,29}+2p_{7,93}+2p_{6,3}+p_{7,35}+4p_{7,99}+3p_{7,11} \\ &+2p_{7,75}+2p_{7,107}+2p_{7,27}+5p_{7,91}+p_{6,59}+2p_{7,7}+p_{7,71}+2p_{7,23} \\ &+2p_{7,15}+p_{7,79}+p_{6,31}+3p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,98} = \frac{1}{2}p_{7,98} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,98}^2 - 4(p_{7,0}+2p_{7,64}+p_{7,80}+p_{7,112}+2p_{7,8}+2p_{7,40} \\ &+p_{7,104}+p_{7,88}+p_{6,56}+2p_{7,4}+p_{7,68}+4p_{7,84}+p_{7,52}+2p_{7,12} \\ &+4p_{7,76}+2p_{7,44}+3p_{7,108}+p_{7,28}+p_{6,60}+2p_{7,98}+p_{7,18}+p_{6,50} \\ &+2p_{6,10}+p_{7,106}+p_{7,26}+2p_{7,58}+2p_{7,6}+3p_{7,70}+p_{7,102}+p_{7,86} \\ &+p_{7,118}+2p_{7,78}+2p_{7,46}+p_{6,30}+p_{7,65}+2p_{6,33}+p_{6,17}+2p_{7,49} \\ &+p_{7,113}+2p_{7,73}+p_{7,105}+p_{7,89}+2p_{7,57}+p_{6,5}+2p_{7,37}+p_{7,101} \\ &+p_{6,21}+2p_{7,53}+2p_{7,29}+p_{7,93}+2p_{6,3}+4p_{7,35}+p_{7,99}+2p_{7,11} \\ &+3p_{7,75}+2p_{7,43}+5p_{7,27}+2p_{7,91}+p_{6,59}+p_{7,7}+2p_{7,71}+2p_{7,87} \\ &+p_{7,15}+2p_{7,79}+p_{6,31}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,226} = \frac{1}{2}p_{7,98} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,98}^2 - 4(p_{7,0}+2p_{7,64}+p_{7,80}+p_{7,112}+2p_{7,8}+2p_{7,40} \\ &+p_{7,104}+p_{7,88}+p_{6,56}+2p_{7,4}+p_{7,68}+4p_{7,84}+p_{7,52}+2p_{7,12} \\ &+4p_{7,76}+2p_{7,44}+3p_{7,108}+p_{7,28}+p_{6,60}+2p_{7,98}+p_{7,18}+p_{6,50} \\ &+2p_{6,10}+p_{7,106}+p_{7,26}+2p_{7,58}+2p_{7,6}+3p_{7,70}+p_{7,102}+p_{7,86} \\ &+p_{7,118}+2p_{7,78}+2p_{7,46}+p_{6,30}+p_{7,65}+2p_{6,33}+p_{6,17}+2p_{7,49} \\ &+p_{7,113}+2p_{7,73}+p_{7,105}+p_{7,89}+2p_{7,57}+p_{6,5}+2p_{7,37}+p_{7,101} \\ &+p_{6,21}+2p_{7,53}+2p_{7,29}+p_{7,93}+2p_{6,3}+4p_{7,35}+p_{7,99}+2p_{7,11} \\ &+3p_{7,75}+2p_{7,43}+5p_{7,27}+2p_{7,91}+p_{6,59}+p_{7,7}+2p_{7,71}+2p_{7,87} \\ &+p_{7,15}+2p_{7,79}+p_{6,31}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,18} = \frac{1}{2}p_{7,18} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,18}^2 - 4(p_{7,0}+p_{7,32}+p_{7,48}+2p_{7,112}+p_{7,8}+p_{6,40}+p_{7,24} \\ &+2p_{7,88}+2p_{7,56}+4p_{7,4}+p_{7,100}+2p_{7,52}+p_{7,116}+p_{7,76}+p_{6,44} \\ &+3p_{7,28}+2p_{7,92}+2p_{7,60}+4p_{7,124}+p_{7,66}+p_{6,34}+2p_{7,18}+p_{7,74} \\ &+2p_{7,106}+p_{7,26}+2p_{6,58}+p_{7,6}+p_{7,38}+p_{7,22}+2p_{7,54}+3p_{7,118} \\ &+p_{6,14}+2p_{7,94}+2p_{7,126}+p_{6,1}+p_{7,33}+2p_{7,97}+2p_{6,17}+p_{7,113} \\ &+p_{7,9}+2p_{7,105}+p_{7,25}+2p_{7,121}+p_{6,5}+2p_{7,101}+p_{7,21}+2p_{7,85} \\ &+p_{6,53}+p_{7,13}+2p_{7,77}+p_{7,19}+4p_{7,83}+2p_{6,51}+2p_{7,11}+5p_{7,75} \\ &+p_{6,43}+2p_{7,91}+2p_{7,59}+3p_{7,123}+2p_{7,7}+p_{7,55}+2p_{7,119}+p_{6,15} \\ &+3p_{7,47}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,146} = \frac{1}{2}p_{7,18} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,18}^2 - 4(p_{7,0}+p_{7,32}+p_{7,48}+2p_{7,112}+p_{7,8}+p_{6,40}+p_{7,24} \\ &+2p_{7,88}+2p_{7,56}+4p_{7,4}+p_{7,100}+2p_{7,52}+p_{7,116}+p_{7,76}+p_{6,44} \\ &+3p_{7,28}+2p_{7,92}+2p_{7,60}+4p_{7,124}+p_{7,66}+p_{6,34}+2p_{7,18}+p_{7,74} \\ &+2p_{7,106}+p_{7,26}+2p_{6,58}+p_{7,6}+p_{7,38}+p_{7,22}+2p_{7,54}+3p_{7,118} \\ &+p_{6,14}+2p_{7,94}+2p_{7,126}+p_{6,1}+p_{7,33}+2p_{7,97}+2p_{6,17}+p_{7,113} \\ &+p_{7,9}+2p_{7,105}+p_{7,25}+2p_{7,121}+p_{6,5}+2p_{7,101}+p_{7,21}+2p_{7,85} \\ &+p_{6,53}+p_{7,13}+2p_{7,77}+p_{7,19}+4p_{7,83}+2p_{6,51}+2p_{7,11}+5p_{7,75} \\ &+p_{6,43}+2p_{7,91}+2p_{7,59}+3p_{7,123}+2p_{7,7}+p_{7,55}+2p_{7,119}+p_{6,15} \\ &+3p_{7,47}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,82} = \frac{1}{2}p_{7,82} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,82}^2 - 4(p_{7,64}+p_{7,96}+2p_{7,48}+p_{7,112}+p_{7,72}+p_{6,40} \\ &+2p_{7,24}+p_{7,88}+2p_{7,120}+4p_{7,68}+p_{7,36}+p_{7,52}+2p_{7,116}+p_{7,12} \\ &+p_{6,44}+2p_{7,28}+3p_{7,92}+4p_{7,60}+2p_{7,124}+p_{7,2}+p_{6,34}+2p_{7,82} \\ &+p_{7,10}+2p_{7,42}+p_{7,90}+2p_{6,58}+p_{7,70}+p_{7,102}+p_{7,86}+3p_{7,54} \\ &+2p_{7,118}+p_{6,14}+2p_{7,30}+2p_{7,62}+p_{6,1}+2p_{7,33}+p_{7,97}+2p_{6,17} \\ &+p_{7,49}+p_{7,73}+2p_{7,41}+p_{7,89}+2p_{7,57}+p_{6,5}+2p_{7,37}+2p_{7,21} \\ &+p_{7,85}+p_{6,53}+2p_{7,13}+p_{7,77}+4p_{7,19}+p_{7,83}+2p_{6,51}+5p_{7,11} \\ &+2p_{7,75}+p_{6,43}+2p_{7,27}+3p_{7,59}+2p_{7,123}+2p_{7,71}+2p_{7,55} \\ &+p_{7,119}+p_{6,15}+3p_{7,111}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,210} = \frac{1}{2}p_{7,82} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,82}^2 - 4(p_{7,64}+p_{7,96}+2p_{7,48}+p_{7,112}+p_{7,72}+p_{6,40} \\ &+2p_{7,24}+p_{7,88}+2p_{7,120}+4p_{7,68}+p_{7,36}+p_{7,52}+2p_{7,116}+p_{7,12} \\ &+p_{6,44}+2p_{7,28}+3p_{7,92}+4p_{7,60}+2p_{7,124}+p_{7,2}+p_{6,34}+2p_{7,82} \\ &+p_{7,10}+2p_{7,42}+p_{7,90}+2p_{6,58}+p_{7,70}+p_{7,102}+p_{7,86}+3p_{7,54} \\ &+2p_{7,118}+p_{6,14}+2p_{7,30}+2p_{7,62}+p_{6,1}+2p_{7,33}+p_{7,97}+2p_{6,17} \\ &+p_{7,49}+p_{7,73}+2p_{7,41}+p_{7,89}+2p_{7,57}+p_{6,5}+2p_{7,37}+2p_{7,21} \\ &+p_{7,85}+p_{6,53}+2p_{7,13}+p_{7,77}+4p_{7,19}+p_{7,83}+2p_{6,51}+5p_{7,11} \\ &+2p_{7,75}+p_{6,43}+2p_{7,27}+3p_{7,59}+2p_{7,123}+2p_{7,71}+2p_{7,55} \\ &+p_{7,119}+p_{6,15}+3p_{7,111}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,50} = \frac{1}{2}p_{7,50} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,50}^2 - 4(p_{7,64}+p_{7,32}+2p_{7,16}+p_{7,80}+p_{6,8}+p_{7,40} \\ &+2p_{7,88}+p_{7,56}+2p_{7,120}+p_{7,4}+4p_{7,36}+p_{7,20}+2p_{7,84}+p_{6,12} \\ &+p_{7,108}+4p_{7,28}+2p_{7,92}+3p_{7,60}+2p_{7,124}+p_{6,2}+p_{7,98}+2p_{7,50} \\ &+2p_{7,10}+p_{7,106}+2p_{6,26}+p_{7,58}+p_{7,70}+p_{7,38}+3p_{7,22}+2p_{7,86} \\ &+p_{7,54}+p_{6,46}+2p_{7,30}+2p_{7,126}+2p_{7,1}+p_{7,65}+p_{6,33}+p_{7,17} \\ &+2p_{6,49}+2p_{7,9}+p_{7,41}+2p_{7,25}+p_{7,57}+2p_{7,5}+p_{6,37}+p_{6,21} \\ &+p_{7,53}+2p_{7,117}+p_{7,45}+2p_{7,109}+2p_{6,19}+p_{7,51}+4p_{7,115} \\ &+p_{6,11}+2p_{7,43}+5p_{7,107}+3p_{7,27}+2p_{7,91}+2p_{7,123}+2p_{7,39} \\ &+2p_{7,23}+p_{7,87}+3p_{7,79}+p_{6,47}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,178} = \frac{1}{2}p_{7,50} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,50}^2 - 4(p_{7,64}+p_{7,32}+2p_{7,16}+p_{7,80}+p_{6,8}+p_{7,40} \\ &+2p_{7,88}+p_{7,56}+2p_{7,120}+p_{7,4}+4p_{7,36}+p_{7,20}+2p_{7,84}+p_{6,12} \\ &+p_{7,108}+4p_{7,28}+2p_{7,92}+3p_{7,60}+2p_{7,124}+p_{6,2}+p_{7,98}+2p_{7,50} \\ &+2p_{7,10}+p_{7,106}+2p_{6,26}+p_{7,58}+p_{7,70}+p_{7,38}+3p_{7,22}+2p_{7,86} \\ &+p_{7,54}+p_{6,46}+2p_{7,30}+2p_{7,126}+2p_{7,1}+p_{7,65}+p_{6,33}+p_{7,17} \\ &+2p_{6,49}+2p_{7,9}+p_{7,41}+2p_{7,25}+p_{7,57}+2p_{7,5}+p_{6,37}+p_{6,21} \\ &+p_{7,53}+2p_{7,117}+p_{7,45}+2p_{7,109}+2p_{6,19}+p_{7,51}+4p_{7,115} \\ &+p_{6,11}+2p_{7,43}+5p_{7,107}+3p_{7,27}+2p_{7,91}+2p_{7,123}+2p_{7,39} \\ &+2p_{7,23}+p_{7,87}+3p_{7,79}+p_{6,47}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,114} = \frac{1}{2}p_{7,114} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,114}^2 - 4(p_{7,0}+p_{7,96}+p_{7,16}+2p_{7,80}+p_{6,8}+p_{7,104} \\ &+2p_{7,24}+2p_{7,56}+p_{7,120}+p_{7,68}+4p_{7,100}+2p_{7,20}+p_{7,84}+p_{6,12} \\ &+p_{7,44}+2p_{7,28}+4p_{7,92}+2p_{7,60}+3p_{7,124}+p_{6,2}+p_{7,34}+2p_{7,114} \\ &+2p_{7,74}+p_{7,42}+2p_{6,26}+p_{7,122}+p_{7,6}+p_{7,102}+2p_{7,22}+3p_{7,86} \\ &+p_{7,118}+p_{6,46}+2p_{7,94}+2p_{7,62}+p_{7,1}+2p_{7,65}+p_{6,33}+p_{7,81} \\ &+2p_{6,49}+2p_{7,73}+p_{7,105}+2p_{7,89}+p_{7,121}+2p_{7,69}+p_{6,37}+p_{6,21} \\ &+2p_{7,53}+p_{7,117}+2p_{7,45}+p_{7,109}+2p_{6,19}+4p_{7,51}+p_{7,115}+p_{6,11} \\ &+5p_{7,43}+2p_{7,107}+2p_{7,27}+3p_{7,91}+2p_{7,59}+2p_{7,103}+p_{7,23} \\ &+2p_{7,87}+3p_{7,15}+p_{6,47}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,242} = \frac{1}{2}p_{7,114} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,114}^2 - 4(p_{7,0}+p_{7,96}+p_{7,16}+2p_{7,80}+p_{6,8}+p_{7,104} \\ &+2p_{7,24}+2p_{7,56}+p_{7,120}+p_{7,68}+4p_{7,100}+2p_{7,20}+p_{7,84}+p_{6,12} \\ &+p_{7,44}+2p_{7,28}+4p_{7,92}+2p_{7,60}+3p_{7,124}+p_{6,2}+p_{7,34}+2p_{7,114} \\ &+2p_{7,74}+p_{7,42}+2p_{6,26}+p_{7,122}+p_{7,6}+p_{7,102}+2p_{7,22}+3p_{7,86} \\ &+p_{7,118}+p_{6,46}+2p_{7,94}+2p_{7,62}+p_{7,1}+2p_{7,65}+p_{6,33}+p_{7,81} \\ &+2p_{6,49}+2p_{7,73}+p_{7,105}+2p_{7,89}+p_{7,121}+2p_{7,69}+p_{6,37}+p_{6,21} \\ &+2p_{7,53}+p_{7,117}+2p_{7,45}+p_{7,109}+2p_{6,19}+4p_{7,51}+p_{7,115}+p_{6,11} \\ &+5p_{7,43}+2p_{7,107}+2p_{7,27}+3p_{7,91}+2p_{7,59}+2p_{7,103}+p_{7,23} \\ &+2p_{7,87}+3p_{7,15}+p_{6,47}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,10} = \frac{1}{2}p_{7,10} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,10}^2 - 4(p_{7,0}+p_{6,32}+p_{7,16}+2p_{7,80}+2p_{7,48}+p_{7,40} \\ &+2p_{7,104}+p_{7,24}+p_{7,120}+p_{7,68}+p_{6,36}+3p_{7,20}+2p_{7,84}+2p_{7,52} \\ &+4p_{7,116}+2p_{7,44}+p_{7,108}+p_{7,92}+4p_{7,124}+p_{7,66}+2p_{7,98}+p_{7,18} \\ &+2p_{6,50}+2p_{7,10}+p_{6,26}+p_{7,58}+p_{6,6}+2p_{7,86}+2p_{7,118}+p_{7,14} \\ &+2p_{7,46}+3p_{7,110}+p_{7,30}+p_{7,126}+p_{7,1}+2p_{7,97}+p_{7,17}+2p_{7,113} \\ &+2p_{6,9}+p_{7,105}+p_{7,25}+2p_{7,89}+p_{6,57}+p_{7,5}+2p_{7,69}+p_{7,13} \\ &+2p_{7,77}+p_{6,45}+2p_{7,93}+p_{6,61}+2p_{7,3}+5p_{7,67}+p_{6,35}+2p_{7,83} \\ &+2p_{7,51}+3p_{7,115}+p_{7,11}+4p_{7,75}+2p_{6,43}+p_{6,7}+3p_{7,39}+p_{7,55} \\ &+2p_{7,119}+p_{7,47}+2p_{7,111}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,138} = \frac{1}{2}p_{7,10} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,10}^2 - 4(p_{7,0}+p_{6,32}+p_{7,16}+2p_{7,80}+2p_{7,48}+p_{7,40} \\ &+2p_{7,104}+p_{7,24}+p_{7,120}+p_{7,68}+p_{6,36}+3p_{7,20}+2p_{7,84}+2p_{7,52} \\ &+4p_{7,116}+2p_{7,44}+p_{7,108}+p_{7,92}+4p_{7,124}+p_{7,66}+2p_{7,98}+p_{7,18} \\ &+2p_{6,50}+2p_{7,10}+p_{6,26}+p_{7,58}+p_{6,6}+2p_{7,86}+2p_{7,118}+p_{7,14} \\ &+2p_{7,46}+3p_{7,110}+p_{7,30}+p_{7,126}+p_{7,1}+2p_{7,97}+p_{7,17}+2p_{7,113} \\ &+2p_{6,9}+p_{7,105}+p_{7,25}+2p_{7,89}+p_{6,57}+p_{7,5}+2p_{7,69}+p_{7,13} \\ &+2p_{7,77}+p_{6,45}+2p_{7,93}+p_{6,61}+2p_{7,3}+5p_{7,67}+p_{6,35}+2p_{7,83} \\ &+2p_{7,51}+3p_{7,115}+p_{7,11}+4p_{7,75}+2p_{6,43}+p_{6,7}+3p_{7,39}+p_{7,55} \\ &+2p_{7,119}+p_{7,47}+2p_{7,111}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,74} = \frac{1}{2}p_{7,74} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,74}^2 - 4(p_{7,64}+p_{6,32}+2p_{7,16}+p_{7,80}+2p_{7,112}+2p_{7,40} \\ &+p_{7,104}+p_{7,88}+p_{7,56}+p_{7,4}+p_{6,36}+2p_{7,20}+3p_{7,84}+4p_{7,52} \\ &+2p_{7,116}+p_{7,44}+2p_{7,108}+p_{7,28}+4p_{7,60}+p_{7,2}+2p_{7,34}+p_{7,82} \\ &+2p_{6,50}+2p_{7,74}+p_{6,26}+p_{7,122}+p_{6,6}+2p_{7,22}+2p_{7,54}+p_{7,78} \\ &+3p_{7,46}+2p_{7,110}+p_{7,94}+p_{7,62}+p_{7,65}+2p_{7,33}+p_{7,81}+2p_{7,49} \\ &+2p_{6,9}+p_{7,41}+2p_{7,25}+p_{7,89}+p_{6,57}+2p_{7,5}+p_{7,69}+2p_{7,13} \\ &+p_{7,77}+p_{6,45}+2p_{7,29}+p_{6,61}+5p_{7,3}+2p_{7,67}+p_{6,35}+2p_{7,19} \\ &+3p_{7,51}+2p_{7,115}+4p_{7,11}+p_{7,75}+2p_{6,43}+p_{6,7}+3p_{7,103} \\ &+2p_{7,55}+p_{7,119}+2p_{7,47}+p_{7,111}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,202} = \frac{1}{2}p_{7,74} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,74}^2 - 4(p_{7,64}+p_{6,32}+2p_{7,16}+p_{7,80}+2p_{7,112}+2p_{7,40} \\ &+p_{7,104}+p_{7,88}+p_{7,56}+p_{7,4}+p_{6,36}+2p_{7,20}+3p_{7,84}+4p_{7,52} \\ &+2p_{7,116}+p_{7,44}+2p_{7,108}+p_{7,28}+4p_{7,60}+p_{7,2}+2p_{7,34}+p_{7,82} \\ &+2p_{6,50}+2p_{7,74}+p_{6,26}+p_{7,122}+p_{6,6}+2p_{7,22}+2p_{7,54}+p_{7,78} \\ &+3p_{7,46}+2p_{7,110}+p_{7,94}+p_{7,62}+p_{7,65}+2p_{7,33}+p_{7,81}+2p_{7,49} \\ &+2p_{6,9}+p_{7,41}+2p_{7,25}+p_{7,89}+p_{6,57}+2p_{7,5}+p_{7,69}+2p_{7,13} \\ &+p_{7,77}+p_{6,45}+2p_{7,29}+p_{6,61}+5p_{7,3}+2p_{7,67}+p_{6,35}+2p_{7,19} \\ &+3p_{7,51}+2p_{7,115}+4p_{7,11}+p_{7,75}+2p_{6,43}+p_{6,7}+3p_{7,103} \\ &+2p_{7,55}+p_{7,119}+2p_{7,47}+p_{7,111}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,42} = \frac{1}{2}p_{7,42} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,42}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,80}+p_{7,48}+2p_{7,112}+2p_{7,8} \\ &+p_{7,72}+p_{7,24}+p_{7,56}+p_{6,4}+p_{7,100}+4p_{7,20}+2p_{7,84}+3p_{7,52} \\ &+2p_{7,116}+p_{7,12}+2p_{7,76}+4p_{7,28}+p_{7,124}+2p_{7,2}+p_{7,98}+2p_{6,18} \\ &+p_{7,50}+2p_{7,42}+p_{7,90}+p_{6,58}+p_{6,38}+2p_{7,22}+2p_{7,118}+3p_{7,14} \\ &+2p_{7,78}+p_{7,46}+p_{7,30}+p_{7,62}+2p_{7,1}+p_{7,33}+2p_{7,17}+p_{7,49} \\ &+p_{7,9}+2p_{6,41}+p_{6,25}+p_{7,57}+2p_{7,121}+p_{7,37}+2p_{7,101}+p_{6,13} \\ &+p_{7,45}+2p_{7,109}+p_{6,29}+2p_{7,125}+p_{6,3}+2p_{7,35}+5p_{7,99}+3p_{7,19} \\ &+2p_{7,83}+2p_{7,115}+2p_{6,11}+p_{7,43}+4p_{7,107}+3p_{7,71}+p_{6,39} \\ &+2p_{7,23}+p_{7,87}+2p_{7,15}+p_{7,79}+2p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,170} = \frac{1}{2}p_{7,42} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,42}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,80}+p_{7,48}+2p_{7,112}+2p_{7,8} \\ &+p_{7,72}+p_{7,24}+p_{7,56}+p_{6,4}+p_{7,100}+4p_{7,20}+2p_{7,84}+3p_{7,52} \\ &+2p_{7,116}+p_{7,12}+2p_{7,76}+4p_{7,28}+p_{7,124}+2p_{7,2}+p_{7,98}+2p_{6,18} \\ &+p_{7,50}+2p_{7,42}+p_{7,90}+p_{6,58}+p_{6,38}+2p_{7,22}+2p_{7,118}+3p_{7,14} \\ &+2p_{7,78}+p_{7,46}+p_{7,30}+p_{7,62}+2p_{7,1}+p_{7,33}+2p_{7,17}+p_{7,49} \\ &+p_{7,9}+2p_{6,41}+p_{6,25}+p_{7,57}+2p_{7,121}+p_{7,37}+2p_{7,101}+p_{6,13} \\ &+p_{7,45}+2p_{7,109}+p_{6,29}+2p_{7,125}+p_{6,3}+2p_{7,35}+5p_{7,99}+3p_{7,19} \\ &+2p_{7,83}+2p_{7,115}+2p_{6,11}+p_{7,43}+4p_{7,107}+3p_{7,71}+p_{6,39} \\ &+2p_{7,23}+p_{7,87}+2p_{7,15}+p_{7,79}+2p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,106} = \frac{1}{2}p_{7,106} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,106}^2 - 4(p_{6,0}+p_{7,96}+2p_{7,16}+2p_{7,48}+p_{7,112}+p_{7,8} \\ &+2p_{7,72}+p_{7,88}+p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,20}+4p_{7,84}+2p_{7,52} \\ &+3p_{7,116}+2p_{7,12}+p_{7,76}+4p_{7,92}+p_{7,60}+2p_{7,66}+p_{7,34}+2p_{6,18} \\ &+p_{7,114}+2p_{7,106}+p_{7,26}+p_{6,58}+p_{6,38}+2p_{7,86}+2p_{7,54}+2p_{7,14} \\ &+3p_{7,78}+p_{7,110}+p_{7,94}+p_{7,126}+2p_{7,65}+p_{7,97}+2p_{7,81}+p_{7,113} \\ &+p_{7,73}+2p_{6,41}+p_{6,25}+2p_{7,57}+p_{7,121}+2p_{7,37}+p_{7,101}+p_{6,13} \\ &+2p_{7,45}+p_{7,109}+p_{6,29}+2p_{7,61}+p_{6,3}+5p_{7,35}+2p_{7,99}+2p_{7,19} \\ &+3p_{7,83}+2p_{7,51}+2p_{6,11}+4p_{7,43}+p_{7,107}+3p_{7,7}+p_{6,39}+p_{7,23} \\ &+2p_{7,87}+p_{7,15}+2p_{7,79}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,234} = \frac{1}{2}p_{7,106} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,106}^2 - 4(p_{6,0}+p_{7,96}+2p_{7,16}+2p_{7,48}+p_{7,112}+p_{7,8} \\ &+2p_{7,72}+p_{7,88}+p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,20}+4p_{7,84}+2p_{7,52} \\ &+3p_{7,116}+2p_{7,12}+p_{7,76}+4p_{7,92}+p_{7,60}+2p_{7,66}+p_{7,34}+2p_{6,18} \\ &+p_{7,114}+2p_{7,106}+p_{7,26}+p_{6,58}+p_{6,38}+2p_{7,86}+2p_{7,54}+2p_{7,14} \\ &+3p_{7,78}+p_{7,110}+p_{7,94}+p_{7,126}+2p_{7,65}+p_{7,97}+2p_{7,81}+p_{7,113} \\ &+p_{7,73}+2p_{6,41}+p_{6,25}+2p_{7,57}+p_{7,121}+2p_{7,37}+p_{7,101}+p_{6,13} \\ &+2p_{7,45}+p_{7,109}+p_{6,29}+2p_{7,61}+p_{6,3}+5p_{7,35}+2p_{7,99}+2p_{7,19} \\ &+3p_{7,83}+2p_{7,51}+2p_{6,11}+4p_{7,43}+p_{7,107}+3p_{7,7}+p_{6,39}+p_{7,23} \\ &+2p_{7,87}+p_{7,15}+2p_{7,79}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,26} = \frac{1}{2}p_{7,26} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,26}^2 - 4(2p_{7,64}+p_{7,32}+2p_{7,96}+p_{7,16}+p_{6,48}+p_{7,8} \\ &+p_{7,40}+p_{7,56}+2p_{7,120}+4p_{7,4}+2p_{7,68}+3p_{7,36}+2p_{7,100}+p_{7,84} \\ &+p_{6,52}+4p_{7,12}+p_{7,108}+2p_{7,60}+p_{7,124}+2p_{6,2}+p_{7,34}+p_{7,82} \\ &+2p_{7,114}+p_{7,74}+p_{6,42}+2p_{7,26}+2p_{7,6}+2p_{7,102}+p_{6,22}+p_{7,14} \\ &+p_{7,46}+p_{7,30}+2p_{7,62}+3p_{7,126}+2p_{7,1}+p_{7,33}+p_{7,17}+2p_{7,113} \\ &+p_{6,9}+p_{7,41}+2p_{7,105}+2p_{6,25}+p_{7,121}+p_{7,21}+2p_{7,85}+p_{6,13} \\ &+2p_{7,109}+p_{7,29}+2p_{7,93}+p_{6,61}+3p_{7,3}+2p_{7,67}+2p_{7,99}+2p_{7,19} \\ &+5p_{7,83}+p_{6,51}+p_{7,27}+4p_{7,91}+2p_{6,59}+2p_{7,7}+p_{7,71}+p_{6,23} \\ &+3p_{7,55}+2p_{7,15}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,154} = \frac{1}{2}p_{7,26} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,26}^2 - 4(2p_{7,64}+p_{7,32}+2p_{7,96}+p_{7,16}+p_{6,48}+p_{7,8} \\ &+p_{7,40}+p_{7,56}+2p_{7,120}+4p_{7,4}+2p_{7,68}+3p_{7,36}+2p_{7,100}+p_{7,84} \\ &+p_{6,52}+4p_{7,12}+p_{7,108}+2p_{7,60}+p_{7,124}+2p_{6,2}+p_{7,34}+p_{7,82} \\ &+2p_{7,114}+p_{7,74}+p_{6,42}+2p_{7,26}+2p_{7,6}+2p_{7,102}+p_{6,22}+p_{7,14} \\ &+p_{7,46}+p_{7,30}+2p_{7,62}+3p_{7,126}+2p_{7,1}+p_{7,33}+p_{7,17}+2p_{7,113} \\ &+p_{6,9}+p_{7,41}+2p_{7,105}+2p_{6,25}+p_{7,121}+p_{7,21}+2p_{7,85}+p_{6,13} \\ &+2p_{7,109}+p_{7,29}+2p_{7,93}+p_{6,61}+3p_{7,3}+2p_{7,67}+2p_{7,99}+2p_{7,19} \\ &+5p_{7,83}+p_{6,51}+p_{7,27}+4p_{7,91}+2p_{6,59}+2p_{7,7}+p_{7,71}+p_{6,23} \\ &+3p_{7,55}+2p_{7,15}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,90} = \frac{1}{2}p_{7,90} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,90}^2 - 4(2p_{7,0}+2p_{7,32}+p_{7,96}+p_{7,80}+p_{6,48}+p_{7,72} \\ &+p_{7,104}+2p_{7,56}+p_{7,120}+2p_{7,4}+4p_{7,68}+2p_{7,36}+3p_{7,100} \\ &+p_{7,20}+p_{6,52}+4p_{7,76}+p_{7,44}+p_{7,60}+2p_{7,124}+2p_{6,2}+p_{7,98} \\ &+p_{7,18}+2p_{7,50}+p_{7,10}+p_{6,42}+2p_{7,90}+2p_{7,70}+2p_{7,38}+p_{6,22} \\ &+p_{7,78}+p_{7,110}+p_{7,94}+3p_{7,62}+2p_{7,126}+2p_{7,65}+p_{7,97}+p_{7,81} \\ &+2p_{7,49}+p_{6,9}+2p_{7,41}+p_{7,105}+2p_{6,25}+p_{7,57}+2p_{7,21}+p_{7,85} \\ &+p_{6,13}+2p_{7,45}+2p_{7,29}+p_{7,93}+p_{6,61}+2p_{7,3}+3p_{7,67}+2p_{7,35} \\ &+5p_{7,19}+2p_{7,83}+p_{6,51}+4p_{7,27}+p_{7,91}+2p_{6,59}+p_{7,7}+2p_{7,71} \\ &+p_{6,23}+3p_{7,119}+2p_{7,79}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,218} = \frac{1}{2}p_{7,90} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,90}^2 - 4(2p_{7,0}+2p_{7,32}+p_{7,96}+p_{7,80}+p_{6,48}+p_{7,72} \\ &+p_{7,104}+2p_{7,56}+p_{7,120}+2p_{7,4}+4p_{7,68}+2p_{7,36}+3p_{7,100} \\ &+p_{7,20}+p_{6,52}+4p_{7,76}+p_{7,44}+p_{7,60}+2p_{7,124}+2p_{6,2}+p_{7,98} \\ &+p_{7,18}+2p_{7,50}+p_{7,10}+p_{6,42}+2p_{7,90}+2p_{7,70}+2p_{7,38}+p_{6,22} \\ &+p_{7,78}+p_{7,110}+p_{7,94}+3p_{7,62}+2p_{7,126}+2p_{7,65}+p_{7,97}+p_{7,81} \\ &+2p_{7,49}+p_{6,9}+2p_{7,41}+p_{7,105}+2p_{6,25}+p_{7,57}+2p_{7,21}+p_{7,85} \\ &+p_{6,13}+2p_{7,45}+2p_{7,29}+p_{7,93}+p_{6,61}+2p_{7,3}+3p_{7,67}+2p_{7,35} \\ &+5p_{7,19}+2p_{7,83}+p_{6,51}+4p_{7,27}+p_{7,91}+2p_{6,59}+p_{7,7}+2p_{7,71} \\ &+p_{6,23}+3p_{7,119}+2p_{7,79}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,58} = \frac{1}{2}p_{7,58} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,58}^2 - 4(2p_{7,0}+p_{7,64}+2p_{7,96}+p_{6,16}+p_{7,48}+p_{7,72} \\ &+p_{7,40}+2p_{7,24}+p_{7,88}+2p_{7,4}+3p_{7,68}+4p_{7,36}+2p_{7,100}+p_{6,20} \\ &+p_{7,116}+p_{7,12}+4p_{7,44}+p_{7,28}+2p_{7,92}+p_{7,66}+2p_{6,34}+2p_{7,18} \\ &+p_{7,114}+p_{6,10}+p_{7,106}+2p_{7,58}+2p_{7,6}+2p_{7,38}+p_{6,54}+p_{7,78} \\ &+p_{7,46}+3p_{7,30}+2p_{7,94}+p_{7,62}+p_{7,65}+2p_{7,33}+2p_{7,17}+p_{7,49} \\ &+2p_{7,9}+p_{7,73}+p_{6,41}+p_{7,25}+2p_{6,57}+p_{7,53}+2p_{7,117}+2p_{7,13} \\ &+p_{6,45}+p_{6,29}+p_{7,61}+2p_{7,125}+2p_{7,3}+3p_{7,35}+2p_{7,99}+p_{6,19} \\ &+2p_{7,51}+5p_{7,115}+2p_{6,27}+p_{7,59}+4p_{7,123}+2p_{7,39}+p_{7,103} \\ &+3p_{7,87}+p_{6,55}+2p_{7,47}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,186} = \frac{1}{2}p_{7,58} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,58}^2 - 4(2p_{7,0}+p_{7,64}+2p_{7,96}+p_{6,16}+p_{7,48}+p_{7,72} \\ &+p_{7,40}+2p_{7,24}+p_{7,88}+2p_{7,4}+3p_{7,68}+4p_{7,36}+2p_{7,100}+p_{6,20} \\ &+p_{7,116}+p_{7,12}+4p_{7,44}+p_{7,28}+2p_{7,92}+p_{7,66}+2p_{6,34}+2p_{7,18} \\ &+p_{7,114}+p_{6,10}+p_{7,106}+2p_{7,58}+2p_{7,6}+2p_{7,38}+p_{6,54}+p_{7,78} \\ &+p_{7,46}+3p_{7,30}+2p_{7,94}+p_{7,62}+p_{7,65}+2p_{7,33}+2p_{7,17}+p_{7,49} \\ &+2p_{7,9}+p_{7,73}+p_{6,41}+p_{7,25}+2p_{6,57}+p_{7,53}+2p_{7,117}+2p_{7,13} \\ &+p_{6,45}+p_{6,29}+p_{7,61}+2p_{7,125}+2p_{7,3}+3p_{7,35}+2p_{7,99}+p_{6,19} \\ &+2p_{7,51}+5p_{7,115}+2p_{6,27}+p_{7,59}+4p_{7,123}+2p_{7,39}+p_{7,103} \\ &+3p_{7,87}+p_{6,55}+2p_{7,47}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,122} = \frac{1}{2}p_{7,122} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,122}^2 - 4(p_{7,0}+2p_{7,64}+2p_{7,32}+p_{6,16}+p_{7,112}+p_{7,8} \\ &+p_{7,104}+p_{7,24}+2p_{7,88}+3p_{7,4}+2p_{7,68}+2p_{7,36}+4p_{7,100}+p_{6,20} \\ &+p_{7,52}+p_{7,76}+4p_{7,108}+2p_{7,28}+p_{7,92}+p_{7,2}+2p_{6,34}+2p_{7,82} \\ &+p_{7,50}+p_{6,10}+p_{7,42}+2p_{7,122}+2p_{7,70}+2p_{7,102}+p_{6,54}+p_{7,14} \\ &+p_{7,110}+2p_{7,30}+3p_{7,94}+p_{7,126}+p_{7,1}+2p_{7,97}+2p_{7,81}+p_{7,113} \\ &+p_{7,9}+2p_{7,73}+p_{6,41}+p_{7,89}+2p_{6,57}+2p_{7,53}+p_{7,117}+2p_{7,77} \\ &+p_{6,45}+p_{6,29}+2p_{7,61}+p_{7,125}+2p_{7,67}+2p_{7,35}+3p_{7,99}+p_{6,19} \\ &+5p_{7,51}+2p_{7,115}+2p_{6,27}+4p_{7,59}+p_{7,123}+p_{7,39}+2p_{7,103} \\ &+3p_{7,23}+p_{6,55}+2p_{7,111}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,250} = \frac{1}{2}p_{7,122} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,122}^2 - 4(p_{7,0}+2p_{7,64}+2p_{7,32}+p_{6,16}+p_{7,112}+p_{7,8} \\ &+p_{7,104}+p_{7,24}+2p_{7,88}+3p_{7,4}+2p_{7,68}+2p_{7,36}+4p_{7,100}+p_{6,20} \\ &+p_{7,52}+p_{7,76}+4p_{7,108}+2p_{7,28}+p_{7,92}+p_{7,2}+2p_{6,34}+2p_{7,82} \\ &+p_{7,50}+p_{6,10}+p_{7,42}+2p_{7,122}+2p_{7,70}+2p_{7,102}+p_{6,54}+p_{7,14} \\ &+p_{7,110}+2p_{7,30}+3p_{7,94}+p_{7,126}+p_{7,1}+2p_{7,97}+2p_{7,81}+p_{7,113} \\ &+p_{7,9}+2p_{7,73}+p_{6,41}+p_{7,89}+2p_{6,57}+2p_{7,53}+p_{7,117}+2p_{7,77} \\ &+p_{6,45}+p_{6,29}+2p_{7,61}+p_{7,125}+2p_{7,67}+2p_{7,35}+3p_{7,99}+p_{6,19} \\ &+5p_{7,51}+2p_{7,115}+2p_{6,27}+4p_{7,59}+p_{7,123}+p_{7,39}+2p_{7,103} \\ &+3p_{7,23}+p_{6,55}+2p_{7,111}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,6} = \frac{1}{2}p_{7,6} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,6}^2 - 4(p_{7,64}+p_{6,32}+3p_{7,16}+2p_{7,80}+2p_{7,48}+4p_{7,112} \\ &+2p_{7,40}+p_{7,104}+p_{7,88}+4p_{7,120}+p_{7,36}+2p_{7,100}+p_{7,20}+p_{7,116} \\ &+p_{7,12}+2p_{7,76}+2p_{7,44}+p_{6,28}+p_{7,124}+p_{6,2}+2p_{7,82}+2p_{7,114} \\ &+p_{7,10}+2p_{7,42}+3p_{7,106}+p_{7,26}+p_{7,122}+2p_{7,6}+p_{6,22}+p_{7,54} \\ &+p_{7,14}+2p_{6,46}+2p_{7,94}+p_{7,62}+p_{7,1}+2p_{7,65}+p_{7,9}+2p_{7,73} \\ &+p_{6,41}+2p_{7,89}+p_{6,57}+2p_{6,5}+p_{7,101}+p_{7,21}+2p_{7,85}+p_{6,53} \\ &+p_{7,13}+2p_{7,109}+2p_{7,93}+p_{7,125}+p_{6,3}+3p_{7,35}+p_{7,51}+2p_{7,115} \\ &+p_{7,43}+2p_{7,107}+2p_{7,123}+p_{7,7}+4p_{7,71}+2p_{6,39}+2p_{7,79}+2p_{7,47} \\ &+3p_{7,111}+p_{6,31}+5p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,134} = \frac{1}{2}p_{7,6} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,6}^2 - 4(p_{7,64}+p_{6,32}+3p_{7,16}+2p_{7,80}+2p_{7,48}+4p_{7,112} \\ &+2p_{7,40}+p_{7,104}+p_{7,88}+4p_{7,120}+p_{7,36}+2p_{7,100}+p_{7,20}+p_{7,116} \\ &+p_{7,12}+2p_{7,76}+2p_{7,44}+p_{6,28}+p_{7,124}+p_{6,2}+2p_{7,82}+2p_{7,114} \\ &+p_{7,10}+2p_{7,42}+3p_{7,106}+p_{7,26}+p_{7,122}+2p_{7,6}+p_{6,22}+p_{7,54} \\ &+p_{7,14}+2p_{6,46}+2p_{7,94}+p_{7,62}+p_{7,1}+2p_{7,65}+p_{7,9}+2p_{7,73} \\ &+p_{6,41}+2p_{7,89}+p_{6,57}+2p_{6,5}+p_{7,101}+p_{7,21}+2p_{7,85}+p_{6,53} \\ &+p_{7,13}+2p_{7,109}+2p_{7,93}+p_{7,125}+p_{6,3}+3p_{7,35}+p_{7,51}+2p_{7,115} \\ &+p_{7,43}+2p_{7,107}+2p_{7,123}+p_{7,7}+4p_{7,71}+2p_{6,39}+2p_{7,79}+2p_{7,47} \\ &+3p_{7,111}+p_{6,31}+5p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,70} = \frac{1}{2}p_{7,70} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,70}^2 - 4(p_{7,0}+p_{6,32}+2p_{7,16}+3p_{7,80}+4p_{7,48}+2p_{7,112} \\ &+p_{7,40}+2p_{7,104}+p_{7,24}+4p_{7,56}+2p_{7,36}+p_{7,100}+p_{7,84}+p_{7,52} \\ &+2p_{7,12}+p_{7,76}+2p_{7,108}+p_{6,28}+p_{7,60}+p_{6,2}+2p_{7,18}+2p_{7,50} \\ &+p_{7,74}+3p_{7,42}+2p_{7,106}+p_{7,90}+p_{7,58}+2p_{7,70}+p_{6,22}+p_{7,118} \\ &+p_{7,78}+2p_{6,46}+2p_{7,30}+p_{7,126}+2p_{7,1}+p_{7,65}+2p_{7,9}+p_{7,73} \\ &+p_{6,41}+2p_{7,25}+p_{6,57}+2p_{6,5}+p_{7,37}+2p_{7,21}+p_{7,85}+p_{6,53} \\ &+p_{7,77}+2p_{7,45}+2p_{7,29}+p_{7,61}+p_{6,3}+3p_{7,99}+2p_{7,51}+p_{7,115} \\ &+2p_{7,43}+p_{7,107}+2p_{7,59}+4p_{7,7}+p_{7,71}+2p_{6,39}+2p_{7,15}+3p_{7,47} \\ &+2p_{7,111}+p_{6,31}+2p_{7,63}+5p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,198} = \frac{1}{2}p_{7,70} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,70}^2 - 4(p_{7,0}+p_{6,32}+2p_{7,16}+3p_{7,80}+4p_{7,48}+2p_{7,112} \\ &+p_{7,40}+2p_{7,104}+p_{7,24}+4p_{7,56}+2p_{7,36}+p_{7,100}+p_{7,84}+p_{7,52} \\ &+2p_{7,12}+p_{7,76}+2p_{7,108}+p_{6,28}+p_{7,60}+p_{6,2}+2p_{7,18}+2p_{7,50} \\ &+p_{7,74}+3p_{7,42}+2p_{7,106}+p_{7,90}+p_{7,58}+2p_{7,70}+p_{6,22}+p_{7,118} \\ &+p_{7,78}+2p_{6,46}+2p_{7,30}+p_{7,126}+2p_{7,1}+p_{7,65}+2p_{7,9}+p_{7,73} \\ &+p_{6,41}+2p_{7,25}+p_{6,57}+2p_{6,5}+p_{7,37}+2p_{7,21}+p_{7,85}+p_{6,53} \\ &+p_{7,77}+2p_{7,45}+2p_{7,29}+p_{7,61}+p_{6,3}+3p_{7,99}+2p_{7,51}+p_{7,115} \\ &+2p_{7,43}+p_{7,107}+2p_{7,59}+4p_{7,7}+p_{7,71}+2p_{6,39}+2p_{7,15}+3p_{7,47} \\ &+2p_{7,111}+p_{6,31}+2p_{7,63}+5p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,38} = \frac{1}{2}p_{7,38} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,38}^2 - 4(p_{6,0}+p_{7,96}+4p_{7,16}+2p_{7,80}+3p_{7,48}+2p_{7,112} \\ &+p_{7,8}+2p_{7,72}+4p_{7,24}+p_{7,120}+2p_{7,4}+p_{7,68}+p_{7,20}+p_{7,52} \\ &+2p_{7,76}+p_{7,44}+2p_{7,108}+p_{7,28}+p_{6,60}+p_{6,34}+2p_{7,18}+2p_{7,114} \\ &+3p_{7,10}+2p_{7,74}+p_{7,42}+p_{7,26}+p_{7,58}+2p_{7,38}+p_{7,86}+p_{6,54} \\ &+2p_{6,14}+p_{7,46}+p_{7,94}+2p_{7,126}+p_{7,33}+2p_{7,97}+p_{6,9}+p_{7,41} \\ &+2p_{7,105}+p_{6,25}+2p_{7,121}+p_{7,5}+2p_{6,37}+p_{6,21}+p_{7,53}+2p_{7,117} \\ &+2p_{7,13}+p_{7,45}+p_{7,29}+2p_{7,125}+3p_{7,67}+p_{6,35}+2p_{7,19}+p_{7,83} \\ &+2p_{7,11}+p_{7,75}+2p_{7,27}+2p_{6,7}+p_{7,39}+4p_{7,103}+3p_{7,15}+2p_{7,79} \\ &+2p_{7,111}+2p_{7,31}+5p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,166} = \frac{1}{2}p_{7,38} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,38}^2 - 4(p_{6,0}+p_{7,96}+4p_{7,16}+2p_{7,80}+3p_{7,48}+2p_{7,112} \\ &+p_{7,8}+2p_{7,72}+4p_{7,24}+p_{7,120}+2p_{7,4}+p_{7,68}+p_{7,20}+p_{7,52} \\ &+2p_{7,76}+p_{7,44}+2p_{7,108}+p_{7,28}+p_{6,60}+p_{6,34}+2p_{7,18}+2p_{7,114} \\ &+3p_{7,10}+2p_{7,74}+p_{7,42}+p_{7,26}+p_{7,58}+2p_{7,38}+p_{7,86}+p_{6,54} \\ &+2p_{6,14}+p_{7,46}+p_{7,94}+2p_{7,126}+p_{7,33}+2p_{7,97}+p_{6,9}+p_{7,41} \\ &+2p_{7,105}+p_{6,25}+2p_{7,121}+p_{7,5}+2p_{6,37}+p_{6,21}+p_{7,53}+2p_{7,117} \\ &+2p_{7,13}+p_{7,45}+p_{7,29}+2p_{7,125}+3p_{7,67}+p_{6,35}+2p_{7,19}+p_{7,83} \\ &+2p_{7,11}+p_{7,75}+2p_{7,27}+2p_{6,7}+p_{7,39}+4p_{7,103}+3p_{7,15}+2p_{7,79} \\ &+2p_{7,111}+2p_{7,31}+5p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,102} = \frac{1}{2}p_{7,102} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,102}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,16}+4p_{7,80}+2p_{7,48}+3p_{7,112} \\ &+2p_{7,8}+p_{7,72}+4p_{7,88}+p_{7,56}+p_{7,4}+2p_{7,68}+p_{7,84}+p_{7,116} \\ &+2p_{7,12}+2p_{7,44}+p_{7,108}+p_{7,92}+p_{6,60}+p_{6,34}+2p_{7,82}+2p_{7,50} \\ &+2p_{7,10}+3p_{7,74}+p_{7,106}+p_{7,90}+p_{7,122}+2p_{7,102}+p_{7,22}+p_{6,54} \\ &+2p_{6,14}+p_{7,110}+p_{7,30}+2p_{7,62}+2p_{7,33}+p_{7,97}+p_{6,9}+2p_{7,41} \\ &+p_{7,105}+p_{6,25}+2p_{7,57}+p_{7,69}+2p_{6,37}+p_{6,21}+2p_{7,53}+p_{7,117} \\ &+2p_{7,77}+p_{7,109}+p_{7,93}+2p_{7,61}+3p_{7,3}+p_{6,35}+p_{7,19}+2p_{7,83} \\ &+p_{7,11}+2p_{7,75}+2p_{7,91}+2p_{6,7}+4p_{7,39}+p_{7,103}+2p_{7,15}+3p_{7,79} \\ &+2p_{7,47}+5p_{7,31}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,230} = \frac{1}{2}p_{7,102} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,102}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,16}+4p_{7,80}+2p_{7,48}+3p_{7,112} \\ &+2p_{7,8}+p_{7,72}+4p_{7,88}+p_{7,56}+p_{7,4}+2p_{7,68}+p_{7,84}+p_{7,116} \\ &+2p_{7,12}+2p_{7,44}+p_{7,108}+p_{7,92}+p_{6,60}+p_{6,34}+2p_{7,82}+2p_{7,50} \\ &+2p_{7,10}+3p_{7,74}+p_{7,106}+p_{7,90}+p_{7,122}+2p_{7,102}+p_{7,22}+p_{6,54} \\ &+2p_{6,14}+p_{7,110}+p_{7,30}+2p_{7,62}+2p_{7,33}+p_{7,97}+p_{6,9}+2p_{7,41} \\ &+p_{7,105}+p_{6,25}+2p_{7,57}+p_{7,69}+2p_{6,37}+p_{6,21}+2p_{7,53}+p_{7,117} \\ &+2p_{7,77}+p_{7,109}+p_{7,93}+2p_{7,61}+3p_{7,3}+p_{6,35}+p_{7,19}+2p_{7,83} \\ &+p_{7,11}+2p_{7,75}+2p_{7,91}+2p_{6,7}+4p_{7,39}+p_{7,103}+2p_{7,15}+3p_{7,79} \\ &+2p_{7,47}+5p_{7,31}+2p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,22} = \frac{1}{2}p_{7,22} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,22}^2 - 4(4p_{7,0}+2p_{7,64}+3p_{7,32}+2p_{7,96}+p_{7,80}+p_{6,48} \\ &+4p_{7,8}+p_{7,104}+2p_{7,56}+p_{7,120}+p_{7,4}+p_{7,36}+p_{7,52}+2p_{7,116} \\ &+p_{7,12}+p_{6,44}+p_{7,28}+2p_{7,92}+2p_{7,60}+2p_{7,2}+2p_{7,98}+p_{6,18} \\ &+p_{7,10}+p_{7,42}+p_{7,26}+2p_{7,58}+3p_{7,122}+p_{7,70}+p_{6,38}+2p_{7,22} \\ &+p_{7,78}+2p_{7,110}+p_{7,30}+2p_{6,62}+p_{7,17}+2p_{7,81}+p_{6,9}+2p_{7,105} \\ &+p_{7,25}+2p_{7,89}+p_{6,57}+p_{6,5}+p_{7,37}+2p_{7,101}+2p_{6,21}+p_{7,117} \\ &+p_{7,13}+2p_{7,109}+p_{7,29}+2p_{7,125}+2p_{7,3}+p_{7,67}+p_{6,19}+3p_{7,51} \\ &+2p_{7,11}+p_{7,59}+2p_{7,123}+p_{7,23}+4p_{7,87}+2p_{6,55}+2p_{7,15}+5p_{7,79} \\ &+p_{6,47}+2p_{7,95}+2p_{7,63}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,150} = \frac{1}{2}p_{7,22} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,22}^2 - 4(4p_{7,0}+2p_{7,64}+3p_{7,32}+2p_{7,96}+p_{7,80}+p_{6,48} \\ &+4p_{7,8}+p_{7,104}+2p_{7,56}+p_{7,120}+p_{7,4}+p_{7,36}+p_{7,52}+2p_{7,116} \\ &+p_{7,12}+p_{6,44}+p_{7,28}+2p_{7,92}+2p_{7,60}+2p_{7,2}+2p_{7,98}+p_{6,18} \\ &+p_{7,10}+p_{7,42}+p_{7,26}+2p_{7,58}+3p_{7,122}+p_{7,70}+p_{6,38}+2p_{7,22} \\ &+p_{7,78}+2p_{7,110}+p_{7,30}+2p_{6,62}+p_{7,17}+2p_{7,81}+p_{6,9}+2p_{7,105} \\ &+p_{7,25}+2p_{7,89}+p_{6,57}+p_{6,5}+p_{7,37}+2p_{7,101}+2p_{6,21}+p_{7,117} \\ &+p_{7,13}+2p_{7,109}+p_{7,29}+2p_{7,125}+2p_{7,3}+p_{7,67}+p_{6,19}+3p_{7,51} \\ &+2p_{7,11}+p_{7,59}+2p_{7,123}+p_{7,23}+4p_{7,87}+2p_{6,55}+2p_{7,15}+5p_{7,79} \\ &+p_{6,47}+2p_{7,95}+2p_{7,63}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,86} = \frac{1}{2}p_{7,86} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,86}^2 - 4(2p_{7,0}+4p_{7,64}+2p_{7,32}+3p_{7,96}+p_{7,16}+p_{6,48} \\ &+4p_{7,72}+p_{7,40}+p_{7,56}+2p_{7,120}+p_{7,68}+p_{7,100}+2p_{7,52}+p_{7,116} \\ &+p_{7,76}+p_{6,44}+2p_{7,28}+p_{7,92}+2p_{7,124}+2p_{7,66}+2p_{7,34}+p_{6,18} \\ &+p_{7,74}+p_{7,106}+p_{7,90}+3p_{7,58}+2p_{7,122}+p_{7,6}+p_{6,38}+2p_{7,86} \\ &+p_{7,14}+2p_{7,46}+p_{7,94}+2p_{6,62}+2p_{7,17}+p_{7,81}+p_{6,9}+2p_{7,41} \\ &+2p_{7,25}+p_{7,89}+p_{6,57}+p_{6,5}+2p_{7,37}+p_{7,101}+2p_{6,21}+p_{7,53} \\ &+p_{7,77}+2p_{7,45}+p_{7,93}+2p_{7,61}+p_{7,3}+2p_{7,67}+p_{6,19}+3p_{7,115} \\ &+2p_{7,75}+2p_{7,59}+p_{7,123}+4p_{7,23}+p_{7,87}+2p_{6,55}+5p_{7,15}+2p_{7,79} \\ &+p_{6,47}+2p_{7,31}+3p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,214} = \frac{1}{2}p_{7,86} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,86}^2 - 4(2p_{7,0}+4p_{7,64}+2p_{7,32}+3p_{7,96}+p_{7,16}+p_{6,48} \\ &+4p_{7,72}+p_{7,40}+p_{7,56}+2p_{7,120}+p_{7,68}+p_{7,100}+2p_{7,52}+p_{7,116} \\ &+p_{7,76}+p_{6,44}+2p_{7,28}+p_{7,92}+2p_{7,124}+2p_{7,66}+2p_{7,34}+p_{6,18} \\ &+p_{7,74}+p_{7,106}+p_{7,90}+3p_{7,58}+2p_{7,122}+p_{7,6}+p_{6,38}+2p_{7,86} \\ &+p_{7,14}+2p_{7,46}+p_{7,94}+2p_{6,62}+2p_{7,17}+p_{7,81}+p_{6,9}+2p_{7,41} \\ &+2p_{7,25}+p_{7,89}+p_{6,57}+p_{6,5}+2p_{7,37}+p_{7,101}+2p_{6,21}+p_{7,53} \\ &+p_{7,77}+2p_{7,45}+p_{7,93}+2p_{7,61}+p_{7,3}+2p_{7,67}+p_{6,19}+3p_{7,115} \\ &+2p_{7,75}+2p_{7,59}+p_{7,123}+4p_{7,23}+p_{7,87}+2p_{6,55}+5p_{7,15}+2p_{7,79} \\ &+p_{6,47}+2p_{7,31}+3p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,54} = \frac{1}{2}p_{7,54} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,54}^2 - 4(2p_{7,0}+3p_{7,64}+4p_{7,32}+2p_{7,96}+p_{6,16}+p_{7,112} \\ &+p_{7,8}+4p_{7,40}+p_{7,24}+2p_{7,88}+p_{7,68}+p_{7,36}+2p_{7,20}+p_{7,84} \\ &+p_{6,12}+p_{7,44}+2p_{7,92}+p_{7,60}+2p_{7,124}+2p_{7,2}+2p_{7,34}+p_{6,50} \\ &+p_{7,74}+p_{7,42}+3p_{7,26}+2p_{7,90}+p_{7,58}+p_{6,6}+p_{7,102}+2p_{7,54} \\ &+2p_{7,14}+p_{7,110}+2p_{6,30}+p_{7,62}+p_{7,49}+2p_{7,113}+2p_{7,9}+p_{6,41} \\ &+p_{6,25}+p_{7,57}+2p_{7,121}+2p_{7,5}+p_{7,69}+p_{6,37}+p_{7,21}+2p_{6,53} \\ &+2p_{7,13}+p_{7,45}+2p_{7,29}+p_{7,61}+2p_{7,35}+p_{7,99}+3p_{7,83}+p_{6,51} \\ &+2p_{7,43}+2p_{7,27}+p_{7,91}+2p_{6,23}+p_{7,55}+4p_{7,119}+p_{6,15}+2p_{7,47} \\ &+5p_{7,111}+3p_{7,31}+2p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,182} = \frac{1}{2}p_{7,54} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,54}^2 - 4(2p_{7,0}+3p_{7,64}+4p_{7,32}+2p_{7,96}+p_{6,16}+p_{7,112} \\ &+p_{7,8}+4p_{7,40}+p_{7,24}+2p_{7,88}+p_{7,68}+p_{7,36}+2p_{7,20}+p_{7,84} \\ &+p_{6,12}+p_{7,44}+2p_{7,92}+p_{7,60}+2p_{7,124}+2p_{7,2}+2p_{7,34}+p_{6,50} \\ &+p_{7,74}+p_{7,42}+3p_{7,26}+2p_{7,90}+p_{7,58}+p_{6,6}+p_{7,102}+2p_{7,54} \\ &+2p_{7,14}+p_{7,110}+2p_{6,30}+p_{7,62}+p_{7,49}+2p_{7,113}+2p_{7,9}+p_{6,41} \\ &+p_{6,25}+p_{7,57}+2p_{7,121}+2p_{7,5}+p_{7,69}+p_{6,37}+p_{7,21}+2p_{6,53} \\ &+2p_{7,13}+p_{7,45}+2p_{7,29}+p_{7,61}+2p_{7,35}+p_{7,99}+3p_{7,83}+p_{6,51} \\ &+2p_{7,43}+2p_{7,27}+p_{7,91}+2p_{6,23}+p_{7,55}+4p_{7,119}+p_{6,15}+2p_{7,47} \\ &+5p_{7,111}+3p_{7,31}+2p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,118} = \frac{1}{2}p_{7,118} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,118}^2 - 4(3p_{7,0}+2p_{7,64}+2p_{7,32}+4p_{7,96}+p_{6,16}+p_{7,48} \\ &+p_{7,72}+4p_{7,104}+2p_{7,24}+p_{7,88}+p_{7,4}+p_{7,100}+p_{7,20}+2p_{7,84} \\ &+p_{6,12}+p_{7,108}+2p_{7,28}+2p_{7,60}+p_{7,124}+2p_{7,66}+2p_{7,98}+p_{6,50} \\ &+p_{7,10}+p_{7,106}+2p_{7,26}+3p_{7,90}+p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,118} \\ &+2p_{7,78}+p_{7,46}+2p_{6,30}+p_{7,126}+2p_{7,49}+p_{7,113}+2p_{7,73}+p_{6,41} \\ &+p_{6,25}+2p_{7,57}+p_{7,121}+p_{7,5}+2p_{7,69}+p_{6,37}+p_{7,85}+2p_{6,53} \\ &+2p_{7,77}+p_{7,109}+2p_{7,93}+p_{7,125}+p_{7,35}+2p_{7,99}+3p_{7,19}+p_{6,51} \\ &+2p_{7,107}+p_{7,27}+2p_{7,91}+2p_{6,23}+4p_{7,55}+p_{7,119}+p_{6,15}+5p_{7,47} \\ &+2p_{7,111}+2p_{7,31}+3p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,246} = \frac{1}{2}p_{7,118} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,118}^2 - 4(3p_{7,0}+2p_{7,64}+2p_{7,32}+4p_{7,96}+p_{6,16}+p_{7,48} \\ &+p_{7,72}+4p_{7,104}+2p_{7,24}+p_{7,88}+p_{7,4}+p_{7,100}+p_{7,20}+2p_{7,84} \\ &+p_{6,12}+p_{7,108}+2p_{7,28}+2p_{7,60}+p_{7,124}+2p_{7,66}+2p_{7,98}+p_{6,50} \\ &+p_{7,10}+p_{7,106}+2p_{7,26}+3p_{7,90}+p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,118} \\ &+2p_{7,78}+p_{7,46}+2p_{6,30}+p_{7,126}+2p_{7,49}+p_{7,113}+2p_{7,73}+p_{6,41} \\ &+p_{6,25}+2p_{7,57}+p_{7,121}+p_{7,5}+2p_{7,69}+p_{6,37}+p_{7,85}+2p_{6,53} \\ &+2p_{7,77}+p_{7,109}+2p_{7,93}+p_{7,125}+p_{7,35}+2p_{7,99}+3p_{7,19}+p_{6,51} \\ &+2p_{7,107}+p_{7,27}+2p_{7,91}+2p_{6,23}+4p_{7,55}+p_{7,119}+p_{6,15}+5p_{7,47} \\ &+2p_{7,111}+2p_{7,31}+3p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,14} = \frac{1}{2}p_{7,14} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,14}^2 - 4(4p_{7,0}+p_{7,96}+2p_{7,48}+p_{7,112}+p_{7,72}+p_{6,40} \\ &+3p_{7,24}+2p_{7,88}+2p_{7,56}+4p_{7,120}+p_{7,4}+p_{6,36}+p_{7,20}+2p_{7,84} \\ &+2p_{7,52}+p_{7,44}+2p_{7,108}+p_{7,28}+p_{7,124}+p_{7,2}+p_{7,34}+p_{7,18} \\ &+2p_{7,50}+3p_{7,114}+p_{6,10}+2p_{7,90}+2p_{7,122}+p_{7,70}+2p_{7,102} \\ &+p_{7,22}+2p_{6,54}+2p_{7,14}+p_{6,30}+p_{7,62}+p_{6,1}+2p_{7,97}+p_{7,17} \\ &+2p_{7,81}+p_{6,49}+p_{7,9}+2p_{7,73}+p_{7,5}+2p_{7,101}+p_{7,21}+2p_{7,117} \\ &+2p_{6,13}+p_{7,109}+p_{7,29}+2p_{7,93}+p_{6,61}+2p_{7,3}+p_{7,51}+2p_{7,115} \\ &+p_{6,11}+3p_{7,43}+p_{7,59}+2p_{7,123}+2p_{7,7}+5p_{7,71}+p_{6,39}+2p_{7,87} \\ &+2p_{7,55}+3p_{7,119}+p_{7,15}+4p_{7,79}+2p_{6,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,142} = \frac{1}{2}p_{7,14} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,14}^2 - 4(4p_{7,0}+p_{7,96}+2p_{7,48}+p_{7,112}+p_{7,72}+p_{6,40} \\ &+3p_{7,24}+2p_{7,88}+2p_{7,56}+4p_{7,120}+p_{7,4}+p_{6,36}+p_{7,20}+2p_{7,84} \\ &+2p_{7,52}+p_{7,44}+2p_{7,108}+p_{7,28}+p_{7,124}+p_{7,2}+p_{7,34}+p_{7,18} \\ &+2p_{7,50}+3p_{7,114}+p_{6,10}+2p_{7,90}+2p_{7,122}+p_{7,70}+2p_{7,102} \\ &+p_{7,22}+2p_{6,54}+2p_{7,14}+p_{6,30}+p_{7,62}+p_{6,1}+2p_{7,97}+p_{7,17} \\ &+2p_{7,81}+p_{6,49}+p_{7,9}+2p_{7,73}+p_{7,5}+2p_{7,101}+p_{7,21}+2p_{7,117} \\ &+2p_{6,13}+p_{7,109}+p_{7,29}+2p_{7,93}+p_{6,61}+2p_{7,3}+p_{7,51}+2p_{7,115} \\ &+p_{6,11}+3p_{7,43}+p_{7,59}+2p_{7,123}+2p_{7,7}+5p_{7,71}+p_{6,39}+2p_{7,87} \\ &+2p_{7,55}+3p_{7,119}+p_{7,15}+4p_{7,79}+2p_{6,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,78} = \frac{1}{2}p_{7,78} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,78}^2 - 4(4p_{7,64}+p_{7,32}+p_{7,48}+2p_{7,112}+p_{7,8}+p_{6,40} \\ &+2p_{7,24}+3p_{7,88}+4p_{7,56}+2p_{7,120}+p_{7,68}+p_{6,36}+2p_{7,20}+p_{7,84} \\ &+2p_{7,116}+2p_{7,44}+p_{7,108}+p_{7,92}+p_{7,60}+p_{7,66}+p_{7,98}+p_{7,82} \\ &+3p_{7,50}+2p_{7,114}+p_{6,10}+2p_{7,26}+2p_{7,58}+p_{7,6}+2p_{7,38}+p_{7,86} \\ &+2p_{6,54}+2p_{7,78}+p_{6,30}+p_{7,126}+p_{6,1}+2p_{7,33}+2p_{7,17}+p_{7,81} \\ &+p_{6,49}+2p_{7,9}+p_{7,73}+p_{7,69}+2p_{7,37}+p_{7,85}+2p_{7,53}+2p_{6,13} \\ &+p_{7,45}+2p_{7,29}+p_{7,93}+p_{6,61}+2p_{7,67}+2p_{7,51}+p_{7,115}+p_{6,11} \\ &+3p_{7,107}+2p_{7,59}+p_{7,123}+5p_{7,7}+2p_{7,71}+p_{6,39}+2p_{7,23}+3p_{7,55} \\ &+2p_{7,119}+4p_{7,15}+p_{7,79}+2p_{6,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,206} = \frac{1}{2}p_{7,78} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,78}^2 - 4(4p_{7,64}+p_{7,32}+p_{7,48}+2p_{7,112}+p_{7,8}+p_{6,40} \\ &+2p_{7,24}+3p_{7,88}+4p_{7,56}+2p_{7,120}+p_{7,68}+p_{6,36}+2p_{7,20}+p_{7,84} \\ &+2p_{7,116}+2p_{7,44}+p_{7,108}+p_{7,92}+p_{7,60}+p_{7,66}+p_{7,98}+p_{7,82} \\ &+3p_{7,50}+2p_{7,114}+p_{6,10}+2p_{7,26}+2p_{7,58}+p_{7,6}+2p_{7,38}+p_{7,86} \\ &+2p_{6,54}+2p_{7,78}+p_{6,30}+p_{7,126}+p_{6,1}+2p_{7,33}+2p_{7,17}+p_{7,81} \\ &+p_{6,49}+2p_{7,9}+p_{7,73}+p_{7,69}+2p_{7,37}+p_{7,85}+2p_{7,53}+2p_{6,13} \\ &+p_{7,45}+2p_{7,29}+p_{7,93}+p_{6,61}+2p_{7,67}+2p_{7,51}+p_{7,115}+p_{6,11} \\ &+3p_{7,107}+2p_{7,59}+p_{7,123}+5p_{7,7}+2p_{7,71}+p_{6,39}+2p_{7,23}+3p_{7,55} \\ &+2p_{7,119}+4p_{7,15}+p_{7,79}+2p_{6,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,46} = \frac{1}{2}p_{7,46} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,46}^2 - 4(p_{7,0}+4p_{7,32}+p_{7,16}+2p_{7,80}+p_{6,8}+p_{7,104} \\ &+4p_{7,24}+2p_{7,88}+3p_{7,56}+2p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,84}+p_{7,52} \\ &+2p_{7,116}+2p_{7,12}+p_{7,76}+p_{7,28}+p_{7,60}+p_{7,66}+p_{7,34}+3p_{7,18} \\ &+2p_{7,82}+p_{7,50}+p_{6,42}+2p_{7,26}+2p_{7,122}+2p_{7,6}+p_{7,102}+2p_{6,22} \\ &+p_{7,54}+2p_{7,46}+p_{7,94}+p_{6,62}+2p_{7,1}+p_{6,33}+p_{6,17}+p_{7,49} \\ &+2p_{7,113}+p_{7,41}+2p_{7,105}+2p_{7,5}+p_{7,37}+2p_{7,21}+p_{7,53}+p_{7,13} \\ &+2p_{6,45}+p_{6,29}+p_{7,61}+2p_{7,125}+2p_{7,35}+2p_{7,19}+p_{7,83}+3p_{7,75} \\ &+p_{6,43}+2p_{7,27}+p_{7,91}+p_{6,7}+2p_{7,39}+5p_{7,103}+3p_{7,23}+2p_{7,87} \\ &+2p_{7,119}+2p_{6,15}+p_{7,47}+4p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,174} = \frac{1}{2}p_{7,46} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,46}^2 - 4(p_{7,0}+4p_{7,32}+p_{7,16}+2p_{7,80}+p_{6,8}+p_{7,104} \\ &+4p_{7,24}+2p_{7,88}+3p_{7,56}+2p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,84}+p_{7,52} \\ &+2p_{7,116}+2p_{7,12}+p_{7,76}+p_{7,28}+p_{7,60}+p_{7,66}+p_{7,34}+3p_{7,18} \\ &+2p_{7,82}+p_{7,50}+p_{6,42}+2p_{7,26}+2p_{7,122}+2p_{7,6}+p_{7,102}+2p_{6,22} \\ &+p_{7,54}+2p_{7,46}+p_{7,94}+p_{6,62}+2p_{7,1}+p_{6,33}+p_{6,17}+p_{7,49} \\ &+2p_{7,113}+p_{7,41}+2p_{7,105}+2p_{7,5}+p_{7,37}+2p_{7,21}+p_{7,53}+p_{7,13} \\ &+2p_{6,45}+p_{6,29}+p_{7,61}+2p_{7,125}+2p_{7,35}+2p_{7,19}+p_{7,83}+3p_{7,75} \\ &+p_{6,43}+2p_{7,27}+p_{7,91}+p_{6,7}+2p_{7,39}+5p_{7,103}+3p_{7,23}+2p_{7,87} \\ &+2p_{7,119}+2p_{6,15}+p_{7,47}+4p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,110} = \frac{1}{2}p_{7,110} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,110}^2 - 4(p_{7,64}+4p_{7,96}+2p_{7,16}+p_{7,80}+p_{6,8}+p_{7,40} \\ &+2p_{7,24}+4p_{7,88}+2p_{7,56}+3p_{7,120}+p_{6,4}+p_{7,100}+2p_{7,20}+2p_{7,52} \\ &+p_{7,116}+p_{7,12}+2p_{7,76}+p_{7,92}+p_{7,124}+p_{7,2}+p_{7,98}+2p_{7,18} \\ &+3p_{7,82}+p_{7,114}+p_{6,42}+2p_{7,90}+2p_{7,58}+2p_{7,70}+p_{7,38}+2p_{6,22} \\ &+p_{7,118}+2p_{7,110}+p_{7,30}+p_{6,62}+2p_{7,65}+p_{6,33}+p_{6,17}+2p_{7,49} \\ &+p_{7,113}+2p_{7,41}+p_{7,105}+2p_{7,69}+p_{7,101}+2p_{7,85}+p_{7,117}+p_{7,77} \\ &+2p_{6,45}+p_{6,29}+2p_{7,61}+p_{7,125}+2p_{7,99}+p_{7,19}+2p_{7,83}+3p_{7,11} \\ &+p_{6,43}+p_{7,27}+2p_{7,91}+p_{6,7}+5p_{7,39}+2p_{7,103}+2p_{7,23}+3p_{7,87} \\ &+2p_{7,55}+2p_{6,15}+4p_{7,47}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,238} = \frac{1}{2}p_{7,110} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,110}^2 - 4(p_{7,64}+4p_{7,96}+2p_{7,16}+p_{7,80}+p_{6,8}+p_{7,40} \\ &+2p_{7,24}+4p_{7,88}+2p_{7,56}+3p_{7,120}+p_{6,4}+p_{7,100}+2p_{7,20}+2p_{7,52} \\ &+p_{7,116}+p_{7,12}+2p_{7,76}+p_{7,92}+p_{7,124}+p_{7,2}+p_{7,98}+2p_{7,18} \\ &+3p_{7,82}+p_{7,114}+p_{6,42}+2p_{7,90}+2p_{7,58}+2p_{7,70}+p_{7,38}+2p_{6,22} \\ &+p_{7,118}+2p_{7,110}+p_{7,30}+p_{6,62}+2p_{7,65}+p_{6,33}+p_{6,17}+2p_{7,49} \\ &+p_{7,113}+2p_{7,41}+p_{7,105}+2p_{7,69}+p_{7,101}+2p_{7,85}+p_{7,117}+p_{7,77} \\ &+2p_{6,45}+p_{6,29}+2p_{7,61}+p_{7,125}+2p_{7,99}+p_{7,19}+2p_{7,83}+3p_{7,11} \\ &+p_{6,43}+p_{7,27}+2p_{7,91}+p_{6,7}+5p_{7,39}+2p_{7,103}+2p_{7,23}+3p_{7,87} \\ &+2p_{7,55}+2p_{6,15}+4p_{7,47}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,30} = \frac{1}{2}p_{7,30} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,30}^2 - 4(p_{7,0}+2p_{7,64}+4p_{7,16}+p_{7,112}+4p_{7,8}+2p_{7,72} \\ &+3p_{7,40}+2p_{7,104}+p_{7,88}+p_{6,56}+2p_{7,68}+p_{7,36}+2p_{7,100}+p_{7,20} \\ &+p_{6,52}+p_{7,12}+p_{7,44}+p_{7,60}+2p_{7,124}+3p_{7,2}+2p_{7,66}+p_{7,34} \\ &+p_{7,18}+p_{7,50}+2p_{7,10}+2p_{7,106}+p_{6,26}+2p_{6,6}+p_{7,38}+p_{7,86} \\ &+2p_{7,118}+p_{7,78}+p_{6,46}+2p_{7,30}+p_{6,1}+p_{7,33}+2p_{7,97}+p_{6,17} \\ &+2p_{7,113}+p_{7,25}+2p_{7,89}+2p_{7,5}+p_{7,37}+p_{7,21}+2p_{7,117}+p_{6,13} \\ &+p_{7,45}+2p_{7,109}+2p_{6,29}+p_{7,125}+2p_{7,3}+p_{7,67}+2p_{7,19}+2p_{7,11} \\ &+p_{7,75}+p_{6,27}+3p_{7,59}+3p_{7,7}+2p_{7,71}+2p_{7,103}+2p_{7,23}+5p_{7,87} \\ &+p_{6,55}+p_{7,31}+4p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,158} = \frac{1}{2}p_{7,30} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,30}^2 - 4(p_{7,0}+2p_{7,64}+4p_{7,16}+p_{7,112}+4p_{7,8}+2p_{7,72} \\ &+3p_{7,40}+2p_{7,104}+p_{7,88}+p_{6,56}+2p_{7,68}+p_{7,36}+2p_{7,100}+p_{7,20} \\ &+p_{6,52}+p_{7,12}+p_{7,44}+p_{7,60}+2p_{7,124}+3p_{7,2}+2p_{7,66}+p_{7,34} \\ &+p_{7,18}+p_{7,50}+2p_{7,10}+2p_{7,106}+p_{6,26}+2p_{6,6}+p_{7,38}+p_{7,86} \\ &+2p_{7,118}+p_{7,78}+p_{6,46}+2p_{7,30}+p_{6,1}+p_{7,33}+2p_{7,97}+p_{6,17} \\ &+2p_{7,113}+p_{7,25}+2p_{7,89}+2p_{7,5}+p_{7,37}+p_{7,21}+2p_{7,117}+p_{6,13} \\ &+p_{7,45}+2p_{7,109}+2p_{6,29}+p_{7,125}+2p_{7,3}+p_{7,67}+2p_{7,19}+2p_{7,11} \\ &+p_{7,75}+p_{6,27}+3p_{7,59}+3p_{7,7}+2p_{7,71}+2p_{7,103}+2p_{7,23}+5p_{7,87} \\ &+p_{6,55}+p_{7,31}+4p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,94} = \frac{1}{2}p_{7,94} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,94}^2 - 4(2p_{7,0}+p_{7,64}+4p_{7,80}+p_{7,48}+2p_{7,8}+4p_{7,72} \\ &+2p_{7,40}+3p_{7,104}+p_{7,24}+p_{6,56}+2p_{7,4}+2p_{7,36}+p_{7,100}+p_{7,84} \\ &+p_{6,52}+p_{7,76}+p_{7,108}+2p_{7,60}+p_{7,124}+2p_{7,2}+3p_{7,66}+p_{7,98} \\ &+p_{7,82}+p_{7,114}+2p_{7,74}+2p_{7,42}+p_{6,26}+2p_{6,6}+p_{7,102}+p_{7,22} \\ &+2p_{7,54}+p_{7,14}+p_{6,46}+2p_{7,94}+p_{6,1}+2p_{7,33}+p_{7,97}+p_{6,17} \\ &+2p_{7,49}+2p_{7,25}+p_{7,89}+2p_{7,69}+p_{7,101}+p_{7,85}+2p_{7,53}+p_{6,13} \\ &+2p_{7,45}+p_{7,109}+2p_{6,29}+p_{7,61}+p_{7,3}+2p_{7,67}+2p_{7,83}+p_{7,11} \\ &+2p_{7,75}+p_{6,27}+3p_{7,123}+2p_{7,7}+3p_{7,71}+2p_{7,39}+5p_{7,23} \\ &+2p_{7,87}+p_{6,55}+4p_{7,31}+p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,222} = \frac{1}{2}p_{7,94} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,94}^2 - 4(2p_{7,0}+p_{7,64}+4p_{7,80}+p_{7,48}+2p_{7,8}+4p_{7,72} \\ &+2p_{7,40}+3p_{7,104}+p_{7,24}+p_{6,56}+2p_{7,4}+2p_{7,36}+p_{7,100}+p_{7,84} \\ &+p_{6,52}+p_{7,76}+p_{7,108}+2p_{7,60}+p_{7,124}+2p_{7,2}+3p_{7,66}+p_{7,98} \\ &+p_{7,82}+p_{7,114}+2p_{7,74}+2p_{7,42}+p_{6,26}+2p_{6,6}+p_{7,102}+p_{7,22} \\ &+2p_{7,54}+p_{7,14}+p_{6,46}+2p_{7,94}+p_{6,1}+2p_{7,33}+p_{7,97}+p_{6,17} \\ &+2p_{7,49}+2p_{7,25}+p_{7,89}+2p_{7,69}+p_{7,101}+p_{7,85}+2p_{7,53}+p_{6,13} \\ &+2p_{7,45}+p_{7,109}+2p_{6,29}+p_{7,61}+p_{7,3}+2p_{7,67}+2p_{7,83}+p_{7,11} \\ &+2p_{7,75}+p_{6,27}+3p_{7,123}+2p_{7,7}+3p_{7,71}+2p_{7,39}+5p_{7,23} \\ &+2p_{7,87}+p_{6,55}+4p_{7,31}+p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,62} = \frac{1}{2}p_{7,62} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,62}^2 - 4(p_{7,32}+2p_{7,96}+p_{7,16}+4p_{7,48}+2p_{7,8}+3p_{7,72} \\ &+4p_{7,40}+2p_{7,104}+p_{6,24}+p_{7,120}+2p_{7,4}+p_{7,68}+2p_{7,100}+p_{6,20} \\ &+p_{7,52}+p_{7,76}+p_{7,44}+2p_{7,28}+p_{7,92}+p_{7,66}+3p_{7,34}+2p_{7,98} \\ &+p_{7,82}+p_{7,50}+2p_{7,10}+2p_{7,42}+p_{6,58}+p_{7,70}+2p_{6,38}+2p_{7,22} \\ &+p_{7,118}+p_{6,14}+p_{7,110}+2p_{7,62}+2p_{7,1}+p_{7,65}+p_{6,33}+2p_{7,17} \\ &+p_{6,49}+p_{7,57}+2p_{7,121}+p_{7,69}+2p_{7,37}+2p_{7,21}+p_{7,53}+2p_{7,13} \\ &+p_{7,77}+p_{6,45}+p_{7,29}+2p_{6,61}+2p_{7,35}+p_{7,99}+2p_{7,51}+2p_{7,43} \\ &+p_{7,107}+3p_{7,91}+p_{6,59}+2p_{7,7}+3p_{7,39}+2p_{7,103}+p_{6,23}+2p_{7,55} \\ &+5p_{7,119}+2p_{6,31}+p_{7,63}+4p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,190} = \frac{1}{2}p_{7,62} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,62}^2 - 4(p_{7,32}+2p_{7,96}+p_{7,16}+4p_{7,48}+2p_{7,8}+3p_{7,72} \\ &+4p_{7,40}+2p_{7,104}+p_{6,24}+p_{7,120}+2p_{7,4}+p_{7,68}+2p_{7,100}+p_{6,20} \\ &+p_{7,52}+p_{7,76}+p_{7,44}+2p_{7,28}+p_{7,92}+p_{7,66}+3p_{7,34}+2p_{7,98} \\ &+p_{7,82}+p_{7,50}+2p_{7,10}+2p_{7,42}+p_{6,58}+p_{7,70}+2p_{6,38}+2p_{7,22} \\ &+p_{7,118}+p_{6,14}+p_{7,110}+2p_{7,62}+2p_{7,1}+p_{7,65}+p_{6,33}+2p_{7,17} \\ &+p_{6,49}+p_{7,57}+2p_{7,121}+p_{7,69}+2p_{7,37}+2p_{7,21}+p_{7,53}+2p_{7,13} \\ &+p_{7,77}+p_{6,45}+p_{7,29}+2p_{6,61}+2p_{7,35}+p_{7,99}+2p_{7,51}+2p_{7,43} \\ &+p_{7,107}+3p_{7,91}+p_{6,59}+2p_{7,7}+3p_{7,39}+2p_{7,103}+p_{6,23}+2p_{7,55} \\ &+5p_{7,119}+2p_{6,31}+p_{7,63}+4p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,126} = \frac{1}{2}p_{7,126} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,126}^2 - 4(2p_{7,32}+p_{7,96}+p_{7,80}+4p_{7,112}+3p_{7,8}+2p_{7,72} \\ &+2p_{7,40}+4p_{7,104}+p_{6,24}+p_{7,56}+p_{7,4}+2p_{7,68}+2p_{7,36}+p_{6,20} \\ &+p_{7,116}+p_{7,12}+p_{7,108}+p_{7,28}+2p_{7,92}+p_{7,2}+2p_{7,34}+3p_{7,98} \\ &+p_{7,18}+p_{7,114}+2p_{7,74}+2p_{7,106}+p_{6,58}+p_{7,6}+2p_{6,38}+2p_{7,86} \\ &+p_{7,54}+p_{6,14}+p_{7,46}+2p_{7,126}+p_{7,1}+2p_{7,65}+p_{6,33}+2p_{7,81} \\ &+p_{6,49}+2p_{7,57}+p_{7,121}+p_{7,5}+2p_{7,101}+2p_{7,85}+p_{7,117}+p_{7,13} \\ &+2p_{7,77}+p_{6,45}+p_{7,93}+2p_{6,61}+p_{7,35}+2p_{7,99}+2p_{7,115}+p_{7,43} \\ &+2p_{7,107}+3p_{7,27}+p_{6,59}+2p_{7,71}+2p_{7,39}+3p_{7,103}+p_{6,23} \\ &+5p_{7,55}+2p_{7,119}+2p_{6,31}+4p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,254} = \frac{1}{2}p_{7,126} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,126}^2 - 4(2p_{7,32}+p_{7,96}+p_{7,80}+4p_{7,112}+3p_{7,8}+2p_{7,72} \\ &+2p_{7,40}+4p_{7,104}+p_{6,24}+p_{7,56}+p_{7,4}+2p_{7,68}+2p_{7,36}+p_{6,20} \\ &+p_{7,116}+p_{7,12}+p_{7,108}+p_{7,28}+2p_{7,92}+p_{7,2}+2p_{7,34}+3p_{7,98} \\ &+p_{7,18}+p_{7,114}+2p_{7,74}+2p_{7,106}+p_{6,58}+p_{7,6}+2p_{6,38}+2p_{7,86} \\ &+p_{7,54}+p_{6,14}+p_{7,46}+2p_{7,126}+p_{7,1}+2p_{7,65}+p_{6,33}+2p_{7,81} \\ &+p_{6,49}+2p_{7,57}+p_{7,121}+p_{7,5}+2p_{7,101}+2p_{7,85}+p_{7,117}+p_{7,13} \\ &+2p_{7,77}+p_{6,45}+p_{7,93}+2p_{6,61}+p_{7,35}+2p_{7,99}+2p_{7,115}+p_{7,43} \\ &+2p_{7,107}+3p_{7,27}+p_{6,59}+2p_{7,71}+2p_{7,39}+3p_{7,103}+p_{6,23} \\ &+5p_{7,55}+2p_{7,119}+2p_{6,31}+4p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,1} = \frac{1}{2}p_{7,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,1}^2 - 4(2p_{6,0}+p_{7,96}+p_{7,16}+2p_{7,80}+p_{6,48}+p_{7,8} \\ &+2p_{7,104}+2p_{7,88}+p_{7,120}+p_{7,4}+2p_{7,68}+p_{6,36}+2p_{7,84}+p_{6,52} \\ &+2p_{7,60}+p_{7,124}+p_{7,2}+4p_{7,66}+2p_{6,34}+2p_{7,74}+2p_{7,42}+3p_{7,106} \\ &+p_{6,26}+5p_{7,58}+2p_{7,122}+p_{7,38}+2p_{7,102}+2p_{7,118}+p_{7,46} \\ &+2p_{7,110}+3p_{7,30}+p_{6,62}+2p_{7,1}+p_{6,17}+p_{7,49}+p_{7,9}+2p_{6,41} \\ &+2p_{7,89}+p_{7,57}+p_{7,5}+2p_{7,37}+3p_{7,101}+p_{7,21}+p_{7,117}+2p_{7,77} \\ &+2p_{7,109}+p_{6,61}+2p_{7,35}+p_{7,99}+p_{7,83}+4p_{7,115}+3p_{7,11}+2p_{7,75} \\ &+2p_{7,43}+4p_{7,107}+p_{6,27}+p_{7,59}+p_{7,7}+2p_{7,71}+2p_{7,39}+p_{6,23} \\ &+p_{7,119}+p_{7,15}+p_{7,111}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,129} = \frac{1}{2}p_{7,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,1}^2 - 4(2p_{6,0}+p_{7,96}+p_{7,16}+2p_{7,80}+p_{6,48}+p_{7,8} \\ &+2p_{7,104}+2p_{7,88}+p_{7,120}+p_{7,4}+2p_{7,68}+p_{6,36}+2p_{7,84}+p_{6,52} \\ &+2p_{7,60}+p_{7,124}+p_{7,2}+4p_{7,66}+2p_{6,34}+2p_{7,74}+2p_{7,42}+3p_{7,106} \\ &+p_{6,26}+5p_{7,58}+2p_{7,122}+p_{7,38}+2p_{7,102}+2p_{7,118}+p_{7,46} \\ &+2p_{7,110}+3p_{7,30}+p_{6,62}+2p_{7,1}+p_{6,17}+p_{7,49}+p_{7,9}+2p_{6,41} \\ &+2p_{7,89}+p_{7,57}+p_{7,5}+2p_{7,37}+3p_{7,101}+p_{7,21}+p_{7,117}+2p_{7,77} \\ &+2p_{7,109}+p_{6,61}+2p_{7,35}+p_{7,99}+p_{7,83}+4p_{7,115}+3p_{7,11}+2p_{7,75} \\ &+2p_{7,43}+4p_{7,107}+p_{6,27}+p_{7,59}+p_{7,7}+2p_{7,71}+2p_{7,39}+p_{6,23} \\ &+p_{7,119}+p_{7,15}+p_{7,111}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,65} = \frac{1}{2}p_{7,65} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,65}^2 - 4(2p_{6,0}+p_{7,32}+2p_{7,16}+p_{7,80}+p_{6,48}+p_{7,72} \\ &+2p_{7,40}+2p_{7,24}+p_{7,56}+2p_{7,4}+p_{7,68}+p_{6,36}+2p_{7,20}+p_{6,52} \\ &+p_{7,60}+2p_{7,124}+4p_{7,2}+p_{7,66}+2p_{6,34}+2p_{7,10}+3p_{7,42}+2p_{7,106} \\ &+p_{6,26}+2p_{7,58}+5p_{7,122}+2p_{7,38}+p_{7,102}+2p_{7,54}+2p_{7,46} \\ &+p_{7,110}+3p_{7,94}+p_{6,62}+2p_{7,65}+p_{6,17}+p_{7,113}+p_{7,73}+2p_{6,41} \\ &+2p_{7,25}+p_{7,121}+p_{7,69}+3p_{7,37}+2p_{7,101}+p_{7,85}+p_{7,53}+2p_{7,13} \\ &+2p_{7,45}+p_{6,61}+p_{7,35}+2p_{7,99}+p_{7,19}+4p_{7,51}+2p_{7,11}+3p_{7,75} \\ &+4p_{7,43}+2p_{7,107}+p_{6,27}+p_{7,123}+2p_{7,7}+p_{7,71}+2p_{7,103}+p_{6,23} \\ &+p_{7,55}+p_{7,79}+p_{7,47}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,193} = \frac{1}{2}p_{7,65} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,65}^2 - 4(2p_{6,0}+p_{7,32}+2p_{7,16}+p_{7,80}+p_{6,48}+p_{7,72} \\ &+2p_{7,40}+2p_{7,24}+p_{7,56}+2p_{7,4}+p_{7,68}+p_{6,36}+2p_{7,20}+p_{6,52} \\ &+p_{7,60}+2p_{7,124}+4p_{7,2}+p_{7,66}+2p_{6,34}+2p_{7,10}+3p_{7,42}+2p_{7,106} \\ &+p_{6,26}+2p_{7,58}+5p_{7,122}+2p_{7,38}+p_{7,102}+2p_{7,54}+2p_{7,46} \\ &+p_{7,110}+3p_{7,94}+p_{6,62}+2p_{7,65}+p_{6,17}+p_{7,113}+p_{7,73}+2p_{6,41} \\ &+2p_{7,25}+p_{7,121}+p_{7,69}+3p_{7,37}+2p_{7,101}+p_{7,85}+p_{7,53}+2p_{7,13} \\ &+2p_{7,45}+p_{6,61}+p_{7,35}+2p_{7,99}+p_{7,19}+4p_{7,51}+2p_{7,11}+3p_{7,75} \\ &+4p_{7,43}+2p_{7,107}+p_{6,27}+p_{7,123}+2p_{7,7}+p_{7,71}+2p_{7,103}+p_{6,23} \\ &+p_{7,55}+p_{7,79}+p_{7,47}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,33} = \frac{1}{2}p_{7,33} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,33}^2 - 4(p_{7,0}+2p_{6,32}+p_{6,16}+p_{7,48}+2p_{7,112}+2p_{7,8} \\ &+p_{7,40}+p_{7,24}+2p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,100}+p_{6,20}+2p_{7,116} \\ &+p_{7,28}+2p_{7,92}+2p_{6,2}+p_{7,34}+4p_{7,98}+3p_{7,10}+2p_{7,74}+2p_{7,106} \\ &+2p_{7,26}+5p_{7,90}+p_{6,58}+2p_{7,6}+p_{7,70}+2p_{7,22}+2p_{7,14}+p_{7,78} \\ &+p_{6,30}+3p_{7,62}+2p_{7,33}+p_{7,81}+p_{6,49}+2p_{6,9}+p_{7,41}+p_{7,89} \\ &+2p_{7,121}+3p_{7,5}+2p_{7,69}+p_{7,37}+p_{7,21}+p_{7,53}+2p_{7,13}+2p_{7,109} \\ &+p_{6,29}+p_{7,3}+2p_{7,67}+4p_{7,19}+p_{7,115}+4p_{7,11}+2p_{7,75}+3p_{7,43} \\ &+2p_{7,107}+p_{7,91}+p_{6,59}+2p_{7,71}+p_{7,39}+2p_{7,103}+p_{7,23}+p_{6,55} \\ &+p_{7,15}+p_{7,47}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,161} = \frac{1}{2}p_{7,33} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,33}^2 - 4(p_{7,0}+2p_{6,32}+p_{6,16}+p_{7,48}+2p_{7,112}+2p_{7,8} \\ &+p_{7,40}+p_{7,24}+2p_{7,120}+p_{6,4}+p_{7,36}+2p_{7,100}+p_{6,20}+2p_{7,116} \\ &+p_{7,28}+2p_{7,92}+2p_{6,2}+p_{7,34}+4p_{7,98}+3p_{7,10}+2p_{7,74}+2p_{7,106} \\ &+2p_{7,26}+5p_{7,90}+p_{6,58}+2p_{7,6}+p_{7,70}+2p_{7,22}+2p_{7,14}+p_{7,78} \\ &+p_{6,30}+3p_{7,62}+2p_{7,33}+p_{7,81}+p_{6,49}+2p_{6,9}+p_{7,41}+p_{7,89} \\ &+2p_{7,121}+3p_{7,5}+2p_{7,69}+p_{7,37}+p_{7,21}+p_{7,53}+2p_{7,13}+2p_{7,109} \\ &+p_{6,29}+p_{7,3}+2p_{7,67}+4p_{7,19}+p_{7,115}+4p_{7,11}+2p_{7,75}+3p_{7,43} \\ &+2p_{7,107}+p_{7,91}+p_{6,59}+2p_{7,71}+p_{7,39}+2p_{7,103}+p_{7,23}+p_{6,55} \\ &+p_{7,15}+p_{7,47}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,97} = \frac{1}{2}p_{7,97} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,97}^2 - 4(p_{7,64}+2p_{6,32}+p_{6,16}+2p_{7,48}+p_{7,112}+2p_{7,72} \\ &+p_{7,104}+p_{7,88}+2p_{7,56}+p_{6,4}+2p_{7,36}+p_{7,100}+p_{6,20}+2p_{7,52} \\ &+2p_{7,28}+p_{7,92}+2p_{6,2}+4p_{7,34}+p_{7,98}+2p_{7,10}+3p_{7,74}+2p_{7,42} \\ &+5p_{7,26}+2p_{7,90}+p_{6,58}+p_{7,6}+2p_{7,70}+2p_{7,86}+p_{7,14}+2p_{7,78} \\ &+p_{6,30}+3p_{7,126}+2p_{7,97}+p_{7,17}+p_{6,49}+2p_{6,9}+p_{7,105}+p_{7,25} \\ &+2p_{7,57}+2p_{7,5}+3p_{7,69}+p_{7,101}+p_{7,85}+p_{7,117}+2p_{7,77}+2p_{7,45} \\ &+p_{6,29}+2p_{7,3}+p_{7,67}+4p_{7,83}+p_{7,51}+2p_{7,11}+4p_{7,75}+2p_{7,43} \\ &+3p_{7,107}+p_{7,27}+p_{6,59}+2p_{7,7}+2p_{7,39}+p_{7,103}+p_{7,87}+p_{6,55} \\ &+p_{7,79}+p_{7,111}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,225} = \frac{1}{2}p_{7,97} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,97}^2 - 4(p_{7,64}+2p_{6,32}+p_{6,16}+2p_{7,48}+p_{7,112}+2p_{7,72} \\ &+p_{7,104}+p_{7,88}+2p_{7,56}+p_{6,4}+2p_{7,36}+p_{7,100}+p_{6,20}+2p_{7,52} \\ &+2p_{7,28}+p_{7,92}+2p_{6,2}+4p_{7,34}+p_{7,98}+2p_{7,10}+3p_{7,74}+2p_{7,42} \\ &+5p_{7,26}+2p_{7,90}+p_{6,58}+p_{7,6}+2p_{7,70}+2p_{7,86}+p_{7,14}+2p_{7,78} \\ &+p_{6,30}+3p_{7,126}+2p_{7,97}+p_{7,17}+p_{6,49}+2p_{6,9}+p_{7,105}+p_{7,25} \\ &+2p_{7,57}+2p_{7,5}+3p_{7,69}+p_{7,101}+p_{7,85}+p_{7,117}+2p_{7,77}+2p_{7,45} \\ &+p_{6,29}+2p_{7,3}+p_{7,67}+4p_{7,83}+p_{7,51}+2p_{7,11}+4p_{7,75}+2p_{7,43} \\ &+3p_{7,107}+p_{7,27}+p_{6,59}+2p_{7,7}+2p_{7,39}+p_{7,103}+p_{7,87}+p_{6,55} \\ &+p_{7,79}+p_{7,111}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,17} = \frac{1}{2}p_{7,17} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,17}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,96}+2p_{6,16}+p_{7,112}+p_{7,8} \\ &+2p_{7,104}+p_{7,24}+2p_{7,120}+p_{6,4}+2p_{7,100}+p_{7,20}+2p_{7,84}+p_{6,52} \\ &+p_{7,12}+2p_{7,76}+p_{7,18}+4p_{7,82}+2p_{6,50}+2p_{7,10}+5p_{7,74}+p_{6,42} \\ &+2p_{7,90}+2p_{7,58}+3p_{7,122}+2p_{7,6}+p_{7,54}+2p_{7,118}+p_{6,14}+3p_{7,46} \\ &+p_{7,62}+2p_{7,126}+p_{7,65}+p_{6,33}+2p_{7,17}+p_{7,73}+2p_{7,105}+p_{7,25} \\ &+2p_{6,57}+p_{7,5}+p_{7,37}+p_{7,21}+2p_{7,53}+3p_{7,117}+p_{6,13}+2p_{7,93} \\ &+2p_{7,125}+4p_{7,3}+p_{7,99}+2p_{7,51}+p_{7,115}+p_{7,75}+p_{6,43}+3p_{7,27} \\ &+2p_{7,91}+2p_{7,59}+4p_{7,123}+p_{7,7}+p_{6,39}+p_{7,23}+2p_{7,87}+2p_{7,55} \\ &+p_{7,47}+2p_{7,111}+p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,145} = \frac{1}{2}p_{7,17} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,17}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,96}+2p_{6,16}+p_{7,112}+p_{7,8} \\ &+2p_{7,104}+p_{7,24}+2p_{7,120}+p_{6,4}+2p_{7,100}+p_{7,20}+2p_{7,84}+p_{6,52} \\ &+p_{7,12}+2p_{7,76}+p_{7,18}+4p_{7,82}+2p_{6,50}+2p_{7,10}+5p_{7,74}+p_{6,42} \\ &+2p_{7,90}+2p_{7,58}+3p_{7,122}+2p_{7,6}+p_{7,54}+2p_{7,118}+p_{6,14}+3p_{7,46} \\ &+p_{7,62}+2p_{7,126}+p_{7,65}+p_{6,33}+2p_{7,17}+p_{7,73}+2p_{7,105}+p_{7,25} \\ &+2p_{6,57}+p_{7,5}+p_{7,37}+p_{7,21}+2p_{7,53}+3p_{7,117}+p_{6,13}+2p_{7,93} \\ &+2p_{7,125}+4p_{7,3}+p_{7,99}+2p_{7,51}+p_{7,115}+p_{7,75}+p_{6,43}+3p_{7,27} \\ &+2p_{7,91}+2p_{7,59}+4p_{7,123}+p_{7,7}+p_{6,39}+p_{7,23}+2p_{7,87}+2p_{7,55} \\ &+p_{7,47}+2p_{7,111}+p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,81} = \frac{1}{2}p_{7,81} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,81}^2 - 4(p_{6,0}+2p_{7,32}+p_{7,96}+2p_{6,16}+p_{7,48}+p_{7,72} \\ &+2p_{7,40}+p_{7,88}+2p_{7,56}+p_{6,4}+2p_{7,36}+2p_{7,20}+p_{7,84}+p_{6,52} \\ &+2p_{7,12}+p_{7,76}+4p_{7,18}+p_{7,82}+2p_{6,50}+5p_{7,10}+2p_{7,74}+p_{6,42} \\ &+2p_{7,26}+3p_{7,58}+2p_{7,122}+2p_{7,70}+2p_{7,54}+p_{7,118}+p_{6,14} \\ &+3p_{7,110}+2p_{7,62}+p_{7,126}+p_{7,1}+p_{6,33}+2p_{7,81}+p_{7,9}+2p_{7,41} \\ &+p_{7,89}+2p_{6,57}+p_{7,69}+p_{7,101}+p_{7,85}+3p_{7,53}+2p_{7,117}+p_{6,13} \\ &+2p_{7,29}+2p_{7,61}+4p_{7,67}+p_{7,35}+p_{7,51}+2p_{7,115}+p_{7,11}+p_{6,43} \\ &+2p_{7,27}+3p_{7,91}+4p_{7,59}+2p_{7,123}+p_{7,71}+p_{6,39}+2p_{7,23}+p_{7,87} \\ &+2p_{7,119}+2p_{7,47}+p_{7,111}+p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,209} = \frac{1}{2}p_{7,81} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,81}^2 - 4(p_{6,0}+2p_{7,32}+p_{7,96}+2p_{6,16}+p_{7,48}+p_{7,72} \\ &+2p_{7,40}+p_{7,88}+2p_{7,56}+p_{6,4}+2p_{7,36}+2p_{7,20}+p_{7,84}+p_{6,52} \\ &+2p_{7,12}+p_{7,76}+4p_{7,18}+p_{7,82}+2p_{6,50}+5p_{7,10}+2p_{7,74}+p_{6,42} \\ &+2p_{7,26}+3p_{7,58}+2p_{7,122}+2p_{7,70}+2p_{7,54}+p_{7,118}+p_{6,14} \\ &+3p_{7,110}+2p_{7,62}+p_{7,126}+p_{7,1}+p_{6,33}+2p_{7,81}+p_{7,9}+2p_{7,41} \\ &+p_{7,89}+2p_{6,57}+p_{7,69}+p_{7,101}+p_{7,85}+3p_{7,53}+2p_{7,117}+p_{6,13} \\ &+2p_{7,29}+2p_{7,61}+4p_{7,67}+p_{7,35}+p_{7,51}+2p_{7,115}+p_{7,11}+p_{6,43} \\ &+2p_{7,27}+3p_{7,91}+4p_{7,59}+2p_{7,123}+p_{7,71}+p_{6,39}+2p_{7,23}+p_{7,87} \\ &+2p_{7,119}+2p_{7,47}+p_{7,111}+p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,49} = \frac{1}{2}p_{7,49} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,49}^2 - 4(2p_{7,0}+p_{7,64}+p_{6,32}+p_{7,16}+2p_{6,48}+2p_{7,8} \\ &+p_{7,40}+2p_{7,24}+p_{7,56}+2p_{7,4}+p_{6,36}+p_{6,20}+p_{7,52}+2p_{7,116} \\ &+p_{7,44}+2p_{7,108}+2p_{6,18}+p_{7,50}+4p_{7,114}+p_{6,10}+2p_{7,42} \\ &+5p_{7,106}+3p_{7,26}+2p_{7,90}+2p_{7,122}+2p_{7,38}+2p_{7,22}+p_{7,86} \\ &+3p_{7,78}+p_{6,46}+2p_{7,30}+p_{7,94}+p_{6,1}+p_{7,97}+2p_{7,49}+2p_{7,9} \\ &+p_{7,105}+2p_{6,25}+p_{7,57}+p_{7,69}+p_{7,37}+3p_{7,21}+2p_{7,85}+p_{7,53} \\ &+p_{6,45}+2p_{7,29}+2p_{7,125}+p_{7,3}+4p_{7,35}+p_{7,19}+2p_{7,83}+p_{6,11} \\ &+p_{7,107}+4p_{7,27}+2p_{7,91}+3p_{7,59}+2p_{7,123}+p_{6,7}+p_{7,39}+2p_{7,87} \\ &+p_{7,55}+2p_{7,119}+2p_{7,15}+p_{7,79}+p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,177} = \frac{1}{2}p_{7,49} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,49}^2 - 4(2p_{7,0}+p_{7,64}+p_{6,32}+p_{7,16}+2p_{6,48}+2p_{7,8} \\ &+p_{7,40}+2p_{7,24}+p_{7,56}+2p_{7,4}+p_{6,36}+p_{6,20}+p_{7,52}+2p_{7,116} \\ &+p_{7,44}+2p_{7,108}+2p_{6,18}+p_{7,50}+4p_{7,114}+p_{6,10}+2p_{7,42} \\ &+5p_{7,106}+3p_{7,26}+2p_{7,90}+2p_{7,122}+2p_{7,38}+2p_{7,22}+p_{7,86} \\ &+3p_{7,78}+p_{6,46}+2p_{7,30}+p_{7,94}+p_{6,1}+p_{7,97}+2p_{7,49}+2p_{7,9} \\ &+p_{7,105}+2p_{6,25}+p_{7,57}+p_{7,69}+p_{7,37}+3p_{7,21}+2p_{7,85}+p_{7,53} \\ &+p_{6,45}+2p_{7,29}+2p_{7,125}+p_{7,3}+4p_{7,35}+p_{7,19}+2p_{7,83}+p_{6,11} \\ &+p_{7,107}+4p_{7,27}+2p_{7,91}+3p_{7,59}+2p_{7,123}+p_{6,7}+p_{7,39}+2p_{7,87} \\ &+p_{7,55}+2p_{7,119}+2p_{7,15}+p_{7,79}+p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,113} = \frac{1}{2}p_{7,113} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,113}^2 - 4(p_{7,0}+2p_{7,64}+p_{6,32}+p_{7,80}+2p_{6,48}+2p_{7,72} \\ &+p_{7,104}+2p_{7,88}+p_{7,120}+2p_{7,68}+p_{6,36}+p_{6,20}+2p_{7,52}+p_{7,116} \\ &+2p_{7,44}+p_{7,108}+2p_{6,18}+4p_{7,50}+p_{7,114}+p_{6,10}+5p_{7,42} \\ &+2p_{7,106}+2p_{7,26}+3p_{7,90}+2p_{7,58}+2p_{7,102}+p_{7,22}+2p_{7,86} \\ &+3p_{7,14}+p_{6,46}+p_{7,30}+2p_{7,94}+p_{6,1}+p_{7,33}+2p_{7,113}+2p_{7,73} \\ &+p_{7,41}+2p_{6,25}+p_{7,121}+p_{7,5}+p_{7,101}+2p_{7,21}+3p_{7,85}+p_{7,117} \\ &+p_{6,45}+2p_{7,93}+2p_{7,61}+p_{7,67}+4p_{7,99}+2p_{7,19}+p_{7,83}+p_{6,11} \\ &+p_{7,43}+2p_{7,27}+4p_{7,91}+2p_{7,59}+3p_{7,123}+p_{6,7}+p_{7,103}+2p_{7,23} \\ &+2p_{7,55}+p_{7,119}+p_{7,15}+2p_{7,79}+p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,241} = \frac{1}{2}p_{7,113} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,113}^2 - 4(p_{7,0}+2p_{7,64}+p_{6,32}+p_{7,80}+2p_{6,48}+2p_{7,72} \\ &+p_{7,104}+2p_{7,88}+p_{7,120}+2p_{7,68}+p_{6,36}+p_{6,20}+2p_{7,52}+p_{7,116} \\ &+2p_{7,44}+p_{7,108}+2p_{6,18}+4p_{7,50}+p_{7,114}+p_{6,10}+5p_{7,42} \\ &+2p_{7,106}+2p_{7,26}+3p_{7,90}+2p_{7,58}+2p_{7,102}+p_{7,22}+2p_{7,86} \\ &+3p_{7,14}+p_{6,46}+p_{7,30}+2p_{7,94}+p_{6,1}+p_{7,33}+2p_{7,113}+2p_{7,73} \\ &+p_{7,41}+2p_{6,25}+p_{7,121}+p_{7,5}+p_{7,101}+2p_{7,21}+3p_{7,85}+p_{7,117} \\ &+p_{6,45}+2p_{7,93}+2p_{7,61}+p_{7,67}+4p_{7,99}+2p_{7,19}+p_{7,83}+p_{6,11} \\ &+p_{7,43}+2p_{7,27}+4p_{7,91}+2p_{7,59}+3p_{7,123}+p_{6,7}+p_{7,103}+2p_{7,23} \\ &+2p_{7,55}+p_{7,119}+p_{7,15}+2p_{7,79}+p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,9} = \frac{1}{2}p_{7,9} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,9}^2 - 4(p_{7,0}+2p_{7,96}+p_{7,16}+2p_{7,112}+2p_{6,8}+p_{7,104} \\ &+p_{7,24}+2p_{7,88}+p_{6,56}+p_{7,4}+2p_{7,68}+p_{7,12}+2p_{7,76}+p_{6,44} \\ &+2p_{7,92}+p_{6,60}+2p_{7,2}+5p_{7,66}+p_{6,34}+2p_{7,82}+2p_{7,50}+3p_{7,114} \\ &+p_{7,10}+4p_{7,74}+2p_{6,42}+p_{6,6}+3p_{7,38}+p_{7,54}+2p_{7,118}+p_{7,46} \\ &+2p_{7,110}+2p_{7,126}+p_{7,65}+2p_{7,97}+p_{7,17}+2p_{6,49}+2p_{7,9}+p_{6,25} \\ &+p_{7,57}+p_{6,5}+2p_{7,85}+2p_{7,117}+p_{7,13}+2p_{7,45}+3p_{7,109}+p_{7,29} \\ &+p_{7,125}+p_{7,67}+p_{6,35}+3p_{7,19}+2p_{7,83}+2p_{7,51}+4p_{7,115}+2p_{7,43} \\ &+p_{7,107}+p_{7,91}+4p_{7,123}+p_{7,39}+2p_{7,103}+p_{7,23}+p_{7,119}+p_{7,15} \\ &+2p_{7,79}+2p_{7,47}+p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,137} = \frac{1}{2}p_{7,9} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,9}^2 - 4(p_{7,0}+2p_{7,96}+p_{7,16}+2p_{7,112}+2p_{6,8}+p_{7,104} \\ &+p_{7,24}+2p_{7,88}+p_{6,56}+p_{7,4}+2p_{7,68}+p_{7,12}+2p_{7,76}+p_{6,44} \\ &+2p_{7,92}+p_{6,60}+2p_{7,2}+5p_{7,66}+p_{6,34}+2p_{7,82}+2p_{7,50}+3p_{7,114} \\ &+p_{7,10}+4p_{7,74}+2p_{6,42}+p_{6,6}+3p_{7,38}+p_{7,54}+2p_{7,118}+p_{7,46} \\ &+2p_{7,110}+2p_{7,126}+p_{7,65}+2p_{7,97}+p_{7,17}+2p_{6,49}+2p_{7,9}+p_{6,25} \\ &+p_{7,57}+p_{6,5}+2p_{7,85}+2p_{7,117}+p_{7,13}+2p_{7,45}+3p_{7,109}+p_{7,29} \\ &+p_{7,125}+p_{7,67}+p_{6,35}+3p_{7,19}+2p_{7,83}+2p_{7,51}+4p_{7,115}+2p_{7,43} \\ &+p_{7,107}+p_{7,91}+4p_{7,123}+p_{7,39}+2p_{7,103}+p_{7,23}+p_{7,119}+p_{7,15} \\ &+2p_{7,79}+2p_{7,47}+p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,73} = \frac{1}{2}p_{7,73} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,73}^2 - 4(p_{7,64}+2p_{7,32}+p_{7,80}+2p_{7,48}+2p_{6,8}+p_{7,40} \\ &+2p_{7,24}+p_{7,88}+p_{6,56}+2p_{7,4}+p_{7,68}+2p_{7,12}+p_{7,76}+p_{6,44} \\ &+2p_{7,28}+p_{6,60}+5p_{7,2}+2p_{7,66}+p_{6,34}+2p_{7,18}+3p_{7,50}+2p_{7,114} \\ &+4p_{7,10}+p_{7,74}+2p_{6,42}+p_{6,6}+3p_{7,102}+2p_{7,54}+p_{7,118}+2p_{7,46} \\ &+p_{7,110}+2p_{7,62}+p_{7,1}+2p_{7,33}+p_{7,81}+2p_{6,49}+2p_{7,73}+p_{6,25} \\ &+p_{7,121}+p_{6,5}+2p_{7,21}+2p_{7,53}+p_{7,77}+3p_{7,45}+2p_{7,109}+p_{7,93} \\ &+p_{7,61}+p_{7,3}+p_{6,35}+2p_{7,19}+3p_{7,83}+4p_{7,51}+2p_{7,115}+p_{7,43} \\ &+2p_{7,107}+p_{7,27}+4p_{7,59}+2p_{7,39}+p_{7,103}+p_{7,87}+p_{7,55}+2p_{7,15} \\ &+p_{7,79}+2p_{7,111}+p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,201} = \frac{1}{2}p_{7,73} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,73}^2 - 4(p_{7,64}+2p_{7,32}+p_{7,80}+2p_{7,48}+2p_{6,8}+p_{7,40} \\ &+2p_{7,24}+p_{7,88}+p_{6,56}+2p_{7,4}+p_{7,68}+2p_{7,12}+p_{7,76}+p_{6,44} \\ &+2p_{7,28}+p_{6,60}+5p_{7,2}+2p_{7,66}+p_{6,34}+2p_{7,18}+3p_{7,50}+2p_{7,114} \\ &+4p_{7,10}+p_{7,74}+2p_{6,42}+p_{6,6}+3p_{7,102}+2p_{7,54}+p_{7,118}+2p_{7,46} \\ &+p_{7,110}+2p_{7,62}+p_{7,1}+2p_{7,33}+p_{7,81}+2p_{6,49}+2p_{7,73}+p_{6,25} \\ &+p_{7,121}+p_{6,5}+2p_{7,21}+2p_{7,53}+p_{7,77}+3p_{7,45}+2p_{7,109}+p_{7,93} \\ &+p_{7,61}+p_{7,3}+p_{6,35}+2p_{7,19}+3p_{7,83}+4p_{7,51}+2p_{7,115}+p_{7,43} \\ &+2p_{7,107}+p_{7,27}+4p_{7,59}+2p_{7,39}+p_{7,103}+p_{7,87}+p_{7,55}+2p_{7,15} \\ &+p_{7,79}+2p_{7,111}+p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,41} = \frac{1}{2}p_{7,41} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,41}^2 - 4(2p_{7,0}+p_{7,32}+2p_{7,16}+p_{7,48}+p_{7,8}+2p_{6,40} \\ &+p_{6,24}+p_{7,56}+2p_{7,120}+p_{7,36}+2p_{7,100}+p_{6,12}+p_{7,44}+2p_{7,108} \\ &+p_{6,28}+2p_{7,124}+p_{6,2}+2p_{7,34}+5p_{7,98}+3p_{7,18}+2p_{7,82} \\ &+2p_{7,114}+2p_{6,10}+p_{7,42}+4p_{7,106}+3p_{7,70}+p_{6,38}+2p_{7,22} \\ &+p_{7,86}+2p_{7,14}+p_{7,78}+2p_{7,30}+2p_{7,1}+p_{7,97}+2p_{6,17}+p_{7,49} \\ &+2p_{7,41}+p_{7,89}+p_{6,57}+p_{6,37}+2p_{7,21}+2p_{7,117}+3p_{7,13}+2p_{7,77} \\ &+p_{7,45}+p_{7,29}+p_{7,61}+p_{6,3}+p_{7,99}+4p_{7,19}+2p_{7,83}+3p_{7,51} \\ &+2p_{7,115}+p_{7,11}+2p_{7,75}+4p_{7,27}+p_{7,123}+2p_{7,7}+p_{7,71}+p_{7,23} \\ &+p_{7,55}+2p_{7,79}+p_{7,47}+2p_{7,111}+p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,169} = \frac{1}{2}p_{7,41} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,41}^2 - 4(2p_{7,0}+p_{7,32}+2p_{7,16}+p_{7,48}+p_{7,8}+2p_{6,40} \\ &+p_{6,24}+p_{7,56}+2p_{7,120}+p_{7,36}+2p_{7,100}+p_{6,12}+p_{7,44}+2p_{7,108} \\ &+p_{6,28}+2p_{7,124}+p_{6,2}+2p_{7,34}+5p_{7,98}+3p_{7,18}+2p_{7,82} \\ &+2p_{7,114}+2p_{6,10}+p_{7,42}+4p_{7,106}+3p_{7,70}+p_{6,38}+2p_{7,22} \\ &+p_{7,86}+2p_{7,14}+p_{7,78}+2p_{7,30}+2p_{7,1}+p_{7,97}+2p_{6,17}+p_{7,49} \\ &+2p_{7,41}+p_{7,89}+p_{6,57}+p_{6,37}+2p_{7,21}+2p_{7,117}+3p_{7,13}+2p_{7,77} \\ &+p_{7,45}+p_{7,29}+p_{7,61}+p_{6,3}+p_{7,99}+4p_{7,19}+2p_{7,83}+3p_{7,51} \\ &+2p_{7,115}+p_{7,11}+2p_{7,75}+4p_{7,27}+p_{7,123}+2p_{7,7}+p_{7,71}+p_{7,23} \\ &+p_{7,55}+2p_{7,79}+p_{7,47}+2p_{7,111}+p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,105} = \frac{1}{2}p_{7,105} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,105}^2 - 4(2p_{7,64}+p_{7,96}+2p_{7,80}+p_{7,112}+p_{7,72}+2p_{6,40} \\ &+p_{6,24}+2p_{7,56}+p_{7,120}+2p_{7,36}+p_{7,100}+p_{6,12}+2p_{7,44}+p_{7,108} \\ &+p_{6,28}+2p_{7,60}+p_{6,2}+5p_{7,34}+2p_{7,98}+2p_{7,18}+3p_{7,82}+2p_{7,50} \\ &+2p_{6,10}+4p_{7,42}+p_{7,106}+3p_{7,6}+p_{6,38}+p_{7,22}+2p_{7,86}+p_{7,14} \\ &+2p_{7,78}+2p_{7,94}+2p_{7,65}+p_{7,33}+2p_{6,17}+p_{7,113}+2p_{7,105}+p_{7,25} \\ &+p_{6,57}+p_{6,37}+2p_{7,85}+2p_{7,53}+2p_{7,13}+3p_{7,77}+p_{7,109}+p_{7,93} \\ &+p_{7,125}+p_{6,3}+p_{7,35}+2p_{7,19}+4p_{7,83}+2p_{7,51}+3p_{7,115}+2p_{7,11} \\ &+p_{7,75}+4p_{7,91}+p_{7,59}+p_{7,7}+2p_{7,71}+p_{7,87}+p_{7,119}+2p_{7,15} \\ &+2p_{7,47}+p_{7,111}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,233} = \frac{1}{2}p_{7,105} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,105}^2 - 4(2p_{7,64}+p_{7,96}+2p_{7,80}+p_{7,112}+p_{7,72}+2p_{6,40} \\ &+p_{6,24}+2p_{7,56}+p_{7,120}+2p_{7,36}+p_{7,100}+p_{6,12}+2p_{7,44}+p_{7,108} \\ &+p_{6,28}+2p_{7,60}+p_{6,2}+5p_{7,34}+2p_{7,98}+2p_{7,18}+3p_{7,82}+2p_{7,50} \\ &+2p_{6,10}+4p_{7,42}+p_{7,106}+3p_{7,6}+p_{6,38}+p_{7,22}+2p_{7,86}+p_{7,14} \\ &+2p_{7,78}+2p_{7,94}+2p_{7,65}+p_{7,33}+2p_{6,17}+p_{7,113}+2p_{7,105}+p_{7,25} \\ &+p_{6,57}+p_{6,37}+2p_{7,85}+2p_{7,53}+2p_{7,13}+3p_{7,77}+p_{7,109}+p_{7,93} \\ &+p_{7,125}+p_{6,3}+p_{7,35}+2p_{7,19}+4p_{7,83}+2p_{7,51}+3p_{7,115}+2p_{7,11} \\ &+p_{7,75}+4p_{7,91}+p_{7,59}+p_{7,7}+2p_{7,71}+p_{7,87}+p_{7,119}+2p_{7,15} \\ &+2p_{7,47}+p_{7,111}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,25} = \frac{1}{2}p_{7,25} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,25}^2 - 4(2p_{7,0}+p_{7,32}+p_{7,16}+2p_{7,112}+p_{6,8}+p_{7,40} \\ &+2p_{7,104}+2p_{6,24}+p_{7,120}+p_{7,20}+2p_{7,84}+p_{6,12}+2p_{7,108} \\ &+p_{7,28}+2p_{7,92}+p_{6,60}+3p_{7,2}+2p_{7,66}+2p_{7,98}+2p_{7,18}+5p_{7,82} \\ &+p_{6,50}+p_{7,26}+4p_{7,90}+2p_{6,58}+2p_{7,6}+p_{7,70}+p_{6,22}+3p_{7,54} \\ &+2p_{7,14}+p_{7,62}+2p_{7,126}+2p_{6,1}+p_{7,33}+p_{7,81}+2p_{7,113}+p_{7,73} \\ &+p_{6,41}+2p_{7,25}+2p_{7,5}+2p_{7,101}+p_{6,21}+p_{7,13}+p_{7,45}+p_{7,29} \\ &+2p_{7,61}+3p_{7,125}+4p_{7,3}+2p_{7,67}+3p_{7,35}+2p_{7,99}+p_{7,83}+p_{6,51} \\ &+4p_{7,11}+p_{7,107}+2p_{7,59}+p_{7,123}+p_{7,7}+p_{7,39}+p_{7,55}+2p_{7,119} \\ &+p_{7,15}+p_{6,47}+p_{7,31}+2p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,153} = \frac{1}{2}p_{7,25} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,25}^2 - 4(2p_{7,0}+p_{7,32}+p_{7,16}+2p_{7,112}+p_{6,8}+p_{7,40} \\ &+2p_{7,104}+2p_{6,24}+p_{7,120}+p_{7,20}+2p_{7,84}+p_{6,12}+2p_{7,108} \\ &+p_{7,28}+2p_{7,92}+p_{6,60}+3p_{7,2}+2p_{7,66}+2p_{7,98}+2p_{7,18}+5p_{7,82} \\ &+p_{6,50}+p_{7,26}+4p_{7,90}+2p_{6,58}+2p_{7,6}+p_{7,70}+p_{6,22}+3p_{7,54} \\ &+2p_{7,14}+p_{7,62}+2p_{7,126}+2p_{6,1}+p_{7,33}+p_{7,81}+2p_{7,113}+p_{7,73} \\ &+p_{6,41}+2p_{7,25}+2p_{7,5}+2p_{7,101}+p_{6,21}+p_{7,13}+p_{7,45}+p_{7,29} \\ &+2p_{7,61}+3p_{7,125}+4p_{7,3}+2p_{7,67}+3p_{7,35}+2p_{7,99}+p_{7,83}+p_{6,51} \\ &+4p_{7,11}+p_{7,107}+2p_{7,59}+p_{7,123}+p_{7,7}+p_{7,39}+p_{7,55}+2p_{7,119} \\ &+p_{7,15}+p_{6,47}+p_{7,31}+2p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,89} = \frac{1}{2}p_{7,89} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,89}^2 - 4(2p_{7,64}+p_{7,96}+p_{7,80}+2p_{7,48}+p_{6,8}+2p_{7,40} \\ &+p_{7,104}+2p_{6,24}+p_{7,56}+2p_{7,20}+p_{7,84}+p_{6,12}+2p_{7,44}+2p_{7,28} \\ &+p_{7,92}+p_{6,60}+2p_{7,2}+3p_{7,66}+2p_{7,34}+5p_{7,18}+2p_{7,82}+p_{6,50} \\ &+4p_{7,26}+p_{7,90}+2p_{6,58}+p_{7,6}+2p_{7,70}+p_{6,22}+3p_{7,118}+2p_{7,78} \\ &+2p_{7,62}+p_{7,126}+2p_{6,1}+p_{7,97}+p_{7,17}+2p_{7,49}+p_{7,9}+p_{6,41} \\ &+2p_{7,89}+2p_{7,69}+2p_{7,37}+p_{6,21}+p_{7,77}+p_{7,109}+p_{7,93}+3p_{7,61} \\ &+2p_{7,125}+2p_{7,3}+4p_{7,67}+2p_{7,35}+3p_{7,99}+p_{7,19}+p_{6,51}+4p_{7,75} \\ &+p_{7,43}+p_{7,59}+2p_{7,123}+p_{7,71}+p_{7,103}+2p_{7,55}+p_{7,119}+p_{7,79} \\ &+p_{6,47}+2p_{7,31}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,217} = \frac{1}{2}p_{7,89} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,89}^2 - 4(2p_{7,64}+p_{7,96}+p_{7,80}+2p_{7,48}+p_{6,8}+2p_{7,40} \\ &+p_{7,104}+2p_{6,24}+p_{7,56}+2p_{7,20}+p_{7,84}+p_{6,12}+2p_{7,44}+2p_{7,28} \\ &+p_{7,92}+p_{6,60}+2p_{7,2}+3p_{7,66}+2p_{7,34}+5p_{7,18}+2p_{7,82}+p_{6,50} \\ &+4p_{7,26}+p_{7,90}+2p_{6,58}+p_{7,6}+2p_{7,70}+p_{6,22}+3p_{7,118}+2p_{7,78} \\ &+2p_{7,62}+p_{7,126}+2p_{6,1}+p_{7,97}+p_{7,17}+2p_{7,49}+p_{7,9}+p_{6,41} \\ &+2p_{7,89}+2p_{7,69}+2p_{7,37}+p_{6,21}+p_{7,77}+p_{7,109}+p_{7,93}+3p_{7,61} \\ &+2p_{7,125}+2p_{7,3}+4p_{7,67}+2p_{7,35}+3p_{7,99}+p_{7,19}+p_{6,51}+4p_{7,75} \\ &+p_{7,43}+p_{7,59}+2p_{7,123}+p_{7,71}+p_{7,103}+2p_{7,55}+p_{7,119}+p_{7,79} \\ &+p_{6,47}+2p_{7,31}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,57} = \frac{1}{2}p_{7,57} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,57}^2 - 4(p_{7,64}+2p_{7,32}+2p_{7,16}+p_{7,48}+2p_{7,8}+p_{7,72} \\ &+p_{6,40}+p_{7,24}+2p_{6,56}+p_{7,52}+2p_{7,116}+2p_{7,12}+p_{6,44}+p_{6,28} \\ &+p_{7,60}+2p_{7,124}+2p_{7,2}+3p_{7,34}+2p_{7,98}+p_{6,18}+2p_{7,50} \\ &+5p_{7,114}+2p_{6,26}+p_{7,58}+4p_{7,122}+2p_{7,38}+p_{7,102}+3p_{7,86} \\ &+p_{6,54}+2p_{7,46}+2p_{7,30}+p_{7,94}+p_{7,65}+2p_{6,33}+2p_{7,17}+p_{7,113} \\ &+p_{6,9}+p_{7,105}+2p_{7,57}+2p_{7,5}+2p_{7,37}+p_{6,53}+p_{7,77}+p_{7,45} \\ &+3p_{7,29}+2p_{7,93}+p_{7,61}+2p_{7,3}+3p_{7,67}+4p_{7,35}+2p_{7,99}+p_{6,19} \\ &+p_{7,115}+p_{7,11}+4p_{7,43}+p_{7,27}+2p_{7,91}+p_{7,71}+p_{7,39}+2p_{7,23} \\ &+p_{7,87}+p_{6,15}+p_{7,47}+2p_{7,95}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,185} = \frac{1}{2}p_{7,57} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,57}^2 - 4(p_{7,64}+2p_{7,32}+2p_{7,16}+p_{7,48}+2p_{7,8}+p_{7,72} \\ &+p_{6,40}+p_{7,24}+2p_{6,56}+p_{7,52}+2p_{7,116}+2p_{7,12}+p_{6,44}+p_{6,28} \\ &+p_{7,60}+2p_{7,124}+2p_{7,2}+3p_{7,34}+2p_{7,98}+p_{6,18}+2p_{7,50} \\ &+5p_{7,114}+2p_{6,26}+p_{7,58}+4p_{7,122}+2p_{7,38}+p_{7,102}+3p_{7,86} \\ &+p_{6,54}+2p_{7,46}+2p_{7,30}+p_{7,94}+p_{7,65}+2p_{6,33}+2p_{7,17}+p_{7,113} \\ &+p_{6,9}+p_{7,105}+2p_{7,57}+2p_{7,5}+2p_{7,37}+p_{6,53}+p_{7,77}+p_{7,45} \\ &+3p_{7,29}+2p_{7,93}+p_{7,61}+2p_{7,3}+3p_{7,67}+4p_{7,35}+2p_{7,99}+p_{6,19} \\ &+p_{7,115}+p_{7,11}+4p_{7,43}+p_{7,27}+2p_{7,91}+p_{7,71}+p_{7,39}+2p_{7,23} \\ &+p_{7,87}+p_{6,15}+p_{7,47}+2p_{7,95}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,121} = \frac{1}{2}p_{7,121} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,121}^2 - 4(p_{7,0}+2p_{7,96}+2p_{7,80}+p_{7,112}+p_{7,8}+2p_{7,72} \\ &+p_{6,40}+p_{7,88}+2p_{6,56}+2p_{7,52}+p_{7,116}+2p_{7,76}+p_{6,44}+p_{6,28} \\ &+2p_{7,60}+p_{7,124}+2p_{7,66}+2p_{7,34}+3p_{7,98}+p_{6,18}+5p_{7,50} \\ &+2p_{7,114}+2p_{6,26}+4p_{7,58}+p_{7,122}+p_{7,38}+2p_{7,102}+3p_{7,22} \\ &+p_{6,54}+2p_{7,110}+p_{7,30}+2p_{7,94}+p_{7,1}+2p_{6,33}+2p_{7,81}+p_{7,49} \\ &+p_{6,9}+p_{7,41}+2p_{7,121}+2p_{7,69}+2p_{7,101}+p_{6,53}+p_{7,13}+p_{7,109} \\ &+2p_{7,29}+3p_{7,93}+p_{7,125}+3p_{7,3}+2p_{7,67}+2p_{7,35}+4p_{7,99}+p_{6,19} \\ &+p_{7,51}+p_{7,75}+4p_{7,107}+2p_{7,27}+p_{7,91}+p_{7,7}+p_{7,103}+p_{7,23} \\ &+2p_{7,87}+p_{6,15}+p_{7,111}+2p_{7,31}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,249} = \frac{1}{2}p_{7,121} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,121}^2 - 4(p_{7,0}+2p_{7,96}+2p_{7,80}+p_{7,112}+p_{7,8}+2p_{7,72} \\ &+p_{6,40}+p_{7,88}+2p_{6,56}+2p_{7,52}+p_{7,116}+2p_{7,76}+p_{6,44}+p_{6,28} \\ &+2p_{7,60}+p_{7,124}+2p_{7,66}+2p_{7,34}+3p_{7,98}+p_{6,18}+5p_{7,50} \\ &+2p_{7,114}+2p_{6,26}+4p_{7,58}+p_{7,122}+p_{7,38}+2p_{7,102}+3p_{7,22} \\ &+p_{6,54}+2p_{7,110}+p_{7,30}+2p_{7,94}+p_{7,1}+2p_{6,33}+2p_{7,81}+p_{7,49} \\ &+p_{6,9}+p_{7,41}+2p_{7,121}+2p_{7,69}+2p_{7,101}+p_{6,53}+p_{7,13}+p_{7,109} \\ &+2p_{7,29}+3p_{7,93}+p_{7,125}+3p_{7,3}+2p_{7,67}+2p_{7,35}+4p_{7,99}+p_{6,19} \\ &+p_{7,51}+p_{7,75}+4p_{7,107}+2p_{7,27}+p_{7,91}+p_{7,7}+p_{7,103}+p_{7,23} \\ &+2p_{7,87}+p_{6,15}+p_{7,111}+2p_{7,31}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,5} = \frac{1}{2}p_{7,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,5}^2 - 4(p_{7,0}+2p_{7,64}+p_{7,8}+2p_{7,72}+p_{6,40}+2p_{7,88}+p_{6,56} \\ &+2p_{6,4}+p_{7,100}+p_{7,20}+2p_{7,84}+p_{6,52}+p_{7,12}+2p_{7,108}+2p_{7,92} \\ &+p_{7,124}+p_{6,2}+3p_{7,34}+p_{7,50}+2p_{7,114}+p_{7,42}+2p_{7,106}+2p_{7,122} \\ &+p_{7,6}+4p_{7,70}+2p_{6,38}+2p_{7,78}+2p_{7,46}+3p_{7,110}+p_{6,30}+5p_{7,62} \\ &+2p_{7,126}+p_{6,1}+2p_{7,81}+2p_{7,113}+p_{7,9}+2p_{7,41}+3p_{7,105}+p_{7,25} \\ &+p_{7,121}+2p_{7,5}+p_{6,21}+p_{7,53}+p_{7,13}+2p_{6,45}+2p_{7,93}+p_{7,61} \\ &+p_{7,35}+2p_{7,99}+p_{7,19}+p_{7,115}+p_{7,11}+2p_{7,75}+2p_{7,43}+p_{6,27} \\ &+p_{7,123}+2p_{7,39}+p_{7,103}+p_{7,87}+4p_{7,119}+3p_{7,15}+2p_{7,79} \\ &+2p_{7,47}+4p_{7,111}+p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,133} = \frac{1}{2}p_{7,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,5}^2 - 4(p_{7,0}+2p_{7,64}+p_{7,8}+2p_{7,72}+p_{6,40}+2p_{7,88}+p_{6,56} \\ &+2p_{6,4}+p_{7,100}+p_{7,20}+2p_{7,84}+p_{6,52}+p_{7,12}+2p_{7,108}+2p_{7,92} \\ &+p_{7,124}+p_{6,2}+3p_{7,34}+p_{7,50}+2p_{7,114}+p_{7,42}+2p_{7,106}+2p_{7,122} \\ &+p_{7,6}+4p_{7,70}+2p_{6,38}+2p_{7,78}+2p_{7,46}+3p_{7,110}+p_{6,30}+5p_{7,62} \\ &+2p_{7,126}+p_{6,1}+2p_{7,81}+2p_{7,113}+p_{7,9}+2p_{7,41}+3p_{7,105}+p_{7,25} \\ &+p_{7,121}+2p_{7,5}+p_{6,21}+p_{7,53}+p_{7,13}+2p_{6,45}+2p_{7,93}+p_{7,61} \\ &+p_{7,35}+2p_{7,99}+p_{7,19}+p_{7,115}+p_{7,11}+2p_{7,75}+2p_{7,43}+p_{6,27} \\ &+p_{7,123}+2p_{7,39}+p_{7,103}+p_{7,87}+4p_{7,119}+3p_{7,15}+2p_{7,79} \\ &+2p_{7,47}+4p_{7,111}+p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,69} = \frac{1}{2}p_{7,69} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,69}^2 - 4(2p_{7,0}+p_{7,64}+2p_{7,8}+p_{7,72}+p_{6,40}+2p_{7,24} \\ &+p_{6,56}+2p_{6,4}+p_{7,36}+2p_{7,20}+p_{7,84}+p_{6,52}+p_{7,76}+2p_{7,44} \\ &+2p_{7,28}+p_{7,60}+p_{6,2}+3p_{7,98}+2p_{7,50}+p_{7,114}+2p_{7,42}+p_{7,106} \\ &+2p_{7,58}+4p_{7,6}+p_{7,70}+2p_{6,38}+2p_{7,14}+3p_{7,46}+2p_{7,110}+p_{6,30} \\ &+2p_{7,62}+5p_{7,126}+p_{6,1}+2p_{7,17}+2p_{7,49}+p_{7,73}+3p_{7,41}+2p_{7,105} \\ &+p_{7,89}+p_{7,57}+2p_{7,69}+p_{6,21}+p_{7,117}+p_{7,77}+2p_{6,45}+2p_{7,29} \\ &+p_{7,125}+2p_{7,35}+p_{7,99}+p_{7,83}+p_{7,51}+2p_{7,11}+p_{7,75}+2p_{7,107} \\ &+p_{6,27}+p_{7,59}+p_{7,39}+2p_{7,103}+p_{7,23}+4p_{7,55}+2p_{7,15}+3p_{7,79} \\ &+4p_{7,47}+2p_{7,111}+p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,197} = \frac{1}{2}p_{7,69} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,69}^2 - 4(2p_{7,0}+p_{7,64}+2p_{7,8}+p_{7,72}+p_{6,40}+2p_{7,24} \\ &+p_{6,56}+2p_{6,4}+p_{7,36}+2p_{7,20}+p_{7,84}+p_{6,52}+p_{7,76}+2p_{7,44} \\ &+2p_{7,28}+p_{7,60}+p_{6,2}+3p_{7,98}+2p_{7,50}+p_{7,114}+2p_{7,42}+p_{7,106} \\ &+2p_{7,58}+4p_{7,6}+p_{7,70}+2p_{6,38}+2p_{7,14}+3p_{7,46}+2p_{7,110}+p_{6,30} \\ &+2p_{7,62}+5p_{7,126}+p_{6,1}+2p_{7,17}+2p_{7,49}+p_{7,73}+3p_{7,41}+2p_{7,105} \\ &+p_{7,89}+p_{7,57}+2p_{7,69}+p_{6,21}+p_{7,117}+p_{7,77}+2p_{6,45}+2p_{7,29} \\ &+p_{7,125}+2p_{7,35}+p_{7,99}+p_{7,83}+p_{7,51}+2p_{7,11}+p_{7,75}+2p_{7,107} \\ &+p_{6,27}+p_{7,59}+p_{7,39}+2p_{7,103}+p_{7,23}+4p_{7,55}+2p_{7,15}+3p_{7,79} \\ &+4p_{7,47}+2p_{7,111}+p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,37} = \frac{1}{2}p_{7,37} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,37}^2 - 4(p_{7,32}+2p_{7,96}+p_{6,8}+p_{7,40}+2p_{7,104}+p_{6,24} \\ &+2p_{7,120}+p_{7,4}+2p_{6,36}+p_{6,20}+p_{7,52}+2p_{7,116}+2p_{7,12}+p_{7,44} \\ &+p_{7,28}+2p_{7,124}+3p_{7,66}+p_{6,34}+2p_{7,18}+p_{7,82}+2p_{7,10}+p_{7,74} \\ &+2p_{7,26}+2p_{6,6}+p_{7,38}+4p_{7,102}+3p_{7,14}+2p_{7,78}+2p_{7,110} \\ &+2p_{7,30}+5p_{7,94}+p_{6,62}+p_{6,33}+2p_{7,17}+2p_{7,113}+3p_{7,9}+2p_{7,73} \\ &+p_{7,41}+p_{7,25}+p_{7,57}+2p_{7,37}+p_{7,85}+p_{6,53}+2p_{6,13}+p_{7,45} \\ &+p_{7,93}+2p_{7,125}+2p_{7,3}+p_{7,67}+p_{7,19}+p_{7,51}+2p_{7,75}+p_{7,43} \\ &+2p_{7,107}+p_{7,27}+p_{6,59}+p_{7,7}+2p_{7,71}+4p_{7,23}+p_{7,119}+4p_{7,15} \\ &+2p_{7,79}+3p_{7,47}+2p_{7,111}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,165} = \frac{1}{2}p_{7,37} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,37}^2 - 4(p_{7,32}+2p_{7,96}+p_{6,8}+p_{7,40}+2p_{7,104}+p_{6,24} \\ &+2p_{7,120}+p_{7,4}+2p_{6,36}+p_{6,20}+p_{7,52}+2p_{7,116}+2p_{7,12}+p_{7,44} \\ &+p_{7,28}+2p_{7,124}+3p_{7,66}+p_{6,34}+2p_{7,18}+p_{7,82}+2p_{7,10}+p_{7,74} \\ &+2p_{7,26}+2p_{6,6}+p_{7,38}+4p_{7,102}+3p_{7,14}+2p_{7,78}+2p_{7,110} \\ &+2p_{7,30}+5p_{7,94}+p_{6,62}+p_{6,33}+2p_{7,17}+2p_{7,113}+3p_{7,9}+2p_{7,73} \\ &+p_{7,41}+p_{7,25}+p_{7,57}+2p_{7,37}+p_{7,85}+p_{6,53}+2p_{6,13}+p_{7,45} \\ &+p_{7,93}+2p_{7,125}+2p_{7,3}+p_{7,67}+p_{7,19}+p_{7,51}+2p_{7,75}+p_{7,43} \\ &+2p_{7,107}+p_{7,27}+p_{6,59}+p_{7,7}+2p_{7,71}+4p_{7,23}+p_{7,119}+4p_{7,15} \\ &+2p_{7,79}+3p_{7,47}+2p_{7,111}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,101} = \frac{1}{2}p_{7,101} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,101}^2 - 4(2p_{7,32}+p_{7,96}+p_{6,8}+2p_{7,40}+p_{7,104}+p_{6,24} \\ &+2p_{7,56}+p_{7,68}+2p_{6,36}+p_{6,20}+2p_{7,52}+p_{7,116}+2p_{7,76}+p_{7,108} \\ &+p_{7,92}+2p_{7,60}+3p_{7,2}+p_{6,34}+p_{7,18}+2p_{7,82}+p_{7,10}+2p_{7,74} \\ &+2p_{7,90}+2p_{6,6}+4p_{7,38}+p_{7,102}+2p_{7,14}+3p_{7,78}+2p_{7,46}+5p_{7,30} \\ &+2p_{7,94}+p_{6,62}+p_{6,33}+2p_{7,81}+2p_{7,49}+2p_{7,9}+3p_{7,73}+p_{7,105} \\ &+p_{7,89}+p_{7,121}+2p_{7,101}+p_{7,21}+p_{6,53}+2p_{6,13}+p_{7,109}+p_{7,29} \\ &+2p_{7,61}+p_{7,3}+2p_{7,67}+p_{7,83}+p_{7,115}+2p_{7,11}+2p_{7,43}+p_{7,107} \\ &+p_{7,91}+p_{6,59}+2p_{7,7}+p_{7,71}+4p_{7,87}+p_{7,55}+2p_{7,15}+4p_{7,79} \\ &+2p_{7,47}+3p_{7,111}+p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,229} = \frac{1}{2}p_{7,101} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,101}^2 - 4(2p_{7,32}+p_{7,96}+p_{6,8}+2p_{7,40}+p_{7,104}+p_{6,24} \\ &+2p_{7,56}+p_{7,68}+2p_{6,36}+p_{6,20}+2p_{7,52}+p_{7,116}+2p_{7,76}+p_{7,108} \\ &+p_{7,92}+2p_{7,60}+3p_{7,2}+p_{6,34}+p_{7,18}+2p_{7,82}+p_{7,10}+2p_{7,74} \\ &+2p_{7,90}+2p_{6,6}+4p_{7,38}+p_{7,102}+2p_{7,14}+3p_{7,78}+2p_{7,46}+5p_{7,30} \\ &+2p_{7,94}+p_{6,62}+p_{6,33}+2p_{7,81}+2p_{7,49}+2p_{7,9}+3p_{7,73}+p_{7,105} \\ &+p_{7,89}+p_{7,121}+2p_{7,101}+p_{7,21}+p_{6,53}+2p_{6,13}+p_{7,109}+p_{7,29} \\ &+2p_{7,61}+p_{7,3}+2p_{7,67}+p_{7,83}+p_{7,115}+2p_{7,11}+2p_{7,43}+p_{7,107} \\ &+p_{7,91}+p_{6,59}+2p_{7,7}+p_{7,71}+4p_{7,87}+p_{7,55}+2p_{7,15}+4p_{7,79} \\ &+2p_{7,47}+3p_{7,111}+p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,21} = \frac{1}{2}p_{7,21} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,21}^2 - 4(p_{7,16}+2p_{7,80}+p_{6,8}+2p_{7,104}+p_{7,24}+2p_{7,88} \\ &+p_{6,56}+p_{6,4}+p_{7,36}+2p_{7,100}+2p_{6,20}+p_{7,116}+p_{7,12}+2p_{7,108} \\ &+p_{7,28}+2p_{7,124}+2p_{7,2}+p_{7,66}+p_{6,18}+3p_{7,50}+2p_{7,10}+p_{7,58} \\ &+2p_{7,122}+p_{7,22}+4p_{7,86}+2p_{6,54}+2p_{7,14}+5p_{7,78}+p_{6,46}+2p_{7,94} \\ &+2p_{7,62}+3p_{7,126}+2p_{7,1}+2p_{7,97}+p_{6,17}+p_{7,9}+p_{7,41}+p_{7,25} \\ &+2p_{7,57}+3p_{7,121}+p_{7,69}+p_{6,37}+2p_{7,21}+p_{7,77}+2p_{7,109}+p_{7,29} \\ &+2p_{6,61}+p_{7,3}+p_{7,35}+p_{7,51}+2p_{7,115}+p_{7,11}+p_{6,43}+p_{7,27} \\ &+2p_{7,91}+2p_{7,59}+4p_{7,7}+p_{7,103}+2p_{7,55}+p_{7,119}+p_{7,79}+p_{6,47} \\ &+3p_{7,31}+2p_{7,95}+2p_{7,63}+4p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,149} = \frac{1}{2}p_{7,21} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,21}^2 - 4(p_{7,16}+2p_{7,80}+p_{6,8}+2p_{7,104}+p_{7,24}+2p_{7,88} \\ &+p_{6,56}+p_{6,4}+p_{7,36}+2p_{7,100}+2p_{6,20}+p_{7,116}+p_{7,12}+2p_{7,108} \\ &+p_{7,28}+2p_{7,124}+2p_{7,2}+p_{7,66}+p_{6,18}+3p_{7,50}+2p_{7,10}+p_{7,58} \\ &+2p_{7,122}+p_{7,22}+4p_{7,86}+2p_{6,54}+2p_{7,14}+5p_{7,78}+p_{6,46}+2p_{7,94} \\ &+2p_{7,62}+3p_{7,126}+2p_{7,1}+2p_{7,97}+p_{6,17}+p_{7,9}+p_{7,41}+p_{7,25} \\ &+2p_{7,57}+3p_{7,121}+p_{7,69}+p_{6,37}+2p_{7,21}+p_{7,77}+2p_{7,109}+p_{7,29} \\ &+2p_{6,61}+p_{7,3}+p_{7,35}+p_{7,51}+2p_{7,115}+p_{7,11}+p_{6,43}+p_{7,27} \\ &+2p_{7,91}+2p_{7,59}+4p_{7,7}+p_{7,103}+2p_{7,55}+p_{7,119}+p_{7,79}+p_{6,47} \\ &+3p_{7,31}+2p_{7,95}+2p_{7,63}+4p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,85} = \frac{1}{2}p_{7,85} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,85}^2 - 4(2p_{7,16}+p_{7,80}+p_{6,8}+2p_{7,40}+2p_{7,24}+p_{7,88} \\ &+p_{6,56}+p_{6,4}+2p_{7,36}+p_{7,100}+2p_{6,20}+p_{7,52}+p_{7,76}+2p_{7,44} \\ &+p_{7,92}+2p_{7,60}+p_{7,2}+2p_{7,66}+p_{6,18}+3p_{7,114}+2p_{7,74}+2p_{7,58} \\ &+p_{7,122}+4p_{7,22}+p_{7,86}+2p_{6,54}+5p_{7,14}+2p_{7,78}+p_{6,46}+2p_{7,30} \\ &+3p_{7,62}+2p_{7,126}+2p_{7,65}+2p_{7,33}+p_{6,17}+p_{7,73}+p_{7,105}+p_{7,89} \\ &+3p_{7,57}+2p_{7,121}+p_{7,5}+p_{6,37}+2p_{7,85}+p_{7,13}+2p_{7,45}+p_{7,93} \\ &+2p_{6,61}+p_{7,67}+p_{7,99}+2p_{7,51}+p_{7,115}+p_{7,75}+p_{6,43}+2p_{7,27} \\ &+p_{7,91}+2p_{7,123}+4p_{7,71}+p_{7,39}+p_{7,55}+2p_{7,119}+p_{7,15}+p_{6,47} \\ &+2p_{7,31}+3p_{7,95}+4p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,213} = \frac{1}{2}p_{7,85} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,85}^2 - 4(2p_{7,16}+p_{7,80}+p_{6,8}+2p_{7,40}+2p_{7,24}+p_{7,88} \\ &+p_{6,56}+p_{6,4}+2p_{7,36}+p_{7,100}+2p_{6,20}+p_{7,52}+p_{7,76}+2p_{7,44} \\ &+p_{7,92}+2p_{7,60}+p_{7,2}+2p_{7,66}+p_{6,18}+3p_{7,114}+2p_{7,74}+2p_{7,58} \\ &+p_{7,122}+4p_{7,22}+p_{7,86}+2p_{6,54}+5p_{7,14}+2p_{7,78}+p_{6,46}+2p_{7,30} \\ &+3p_{7,62}+2p_{7,126}+2p_{7,65}+2p_{7,33}+p_{6,17}+p_{7,73}+p_{7,105}+p_{7,89} \\ &+3p_{7,57}+2p_{7,121}+p_{7,5}+p_{6,37}+2p_{7,85}+p_{7,13}+2p_{7,45}+p_{7,93} \\ &+2p_{6,61}+p_{7,67}+p_{7,99}+2p_{7,51}+p_{7,115}+p_{7,75}+p_{6,43}+2p_{7,27} \\ &+p_{7,91}+2p_{7,123}+4p_{7,71}+p_{7,39}+p_{7,55}+2p_{7,119}+p_{7,15}+p_{6,47} \\ &+2p_{7,31}+3p_{7,95}+4p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,53} = \frac{1}{2}p_{7,53} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,53}^2 - 4(p_{7,48}+2p_{7,112}+2p_{7,8}+p_{6,40}+p_{6,24}+p_{7,56} \\ &+2p_{7,120}+2p_{7,4}+p_{7,68}+p_{6,36}+p_{7,20}+2p_{6,52}+2p_{7,12}+p_{7,44} \\ &+2p_{7,28}+p_{7,60}+2p_{7,34}+p_{7,98}+3p_{7,82}+p_{6,50}+2p_{7,42}+2p_{7,26} \\ &+p_{7,90}+2p_{6,22}+p_{7,54}+4p_{7,118}+p_{6,14}+2p_{7,46}+5p_{7,110}+3p_{7,30} \\ &+2p_{7,94}+2p_{7,126}+2p_{7,1}+2p_{7,33}+p_{6,49}+p_{7,73}+p_{7,41}+3p_{7,25} \\ &+2p_{7,89}+p_{7,57}+p_{6,5}+p_{7,101}+2p_{7,53}+2p_{7,13}+p_{7,109}+2p_{6,29} \\ &+p_{7,61}+p_{7,67}+p_{7,35}+2p_{7,19}+p_{7,83}+p_{6,11}+p_{7,43}+2p_{7,91} \\ &+p_{7,59}+2p_{7,123}+p_{7,7}+4p_{7,39}+p_{7,23}+2p_{7,87}+p_{6,15}+p_{7,111} \\ &+4p_{7,31}+2p_{7,95}+3p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,181} = \frac{1}{2}p_{7,53} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,53}^2 - 4(p_{7,48}+2p_{7,112}+2p_{7,8}+p_{6,40}+p_{6,24}+p_{7,56} \\ &+2p_{7,120}+2p_{7,4}+p_{7,68}+p_{6,36}+p_{7,20}+2p_{6,52}+2p_{7,12}+p_{7,44} \\ &+2p_{7,28}+p_{7,60}+2p_{7,34}+p_{7,98}+3p_{7,82}+p_{6,50}+2p_{7,42}+2p_{7,26} \\ &+p_{7,90}+2p_{6,22}+p_{7,54}+4p_{7,118}+p_{6,14}+2p_{7,46}+5p_{7,110}+3p_{7,30} \\ &+2p_{7,94}+2p_{7,126}+2p_{7,1}+2p_{7,33}+p_{6,49}+p_{7,73}+p_{7,41}+3p_{7,25} \\ &+2p_{7,89}+p_{7,57}+p_{6,5}+p_{7,101}+2p_{7,53}+2p_{7,13}+p_{7,109}+2p_{6,29} \\ &+p_{7,61}+p_{7,67}+p_{7,35}+2p_{7,19}+p_{7,83}+p_{6,11}+p_{7,43}+2p_{7,91} \\ &+p_{7,59}+2p_{7,123}+p_{7,7}+4p_{7,39}+p_{7,23}+2p_{7,87}+p_{6,15}+p_{7,111} \\ &+4p_{7,31}+2p_{7,95}+3p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,117} = \frac{1}{2}p_{7,117} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,117}^2 - 4(2p_{7,48}+p_{7,112}+2p_{7,72}+p_{6,40}+p_{6,24}+2p_{7,56} \\ &+p_{7,120}+p_{7,4}+2p_{7,68}+p_{6,36}+p_{7,84}+2p_{6,52}+2p_{7,76}+p_{7,108} \\ &+2p_{7,92}+p_{7,124}+p_{7,34}+2p_{7,98}+3p_{7,18}+p_{6,50}+2p_{7,106}+p_{7,26} \\ &+2p_{7,90}+2p_{6,22}+4p_{7,54}+p_{7,118}+p_{6,14}+5p_{7,46}+2p_{7,110} \\ &+2p_{7,30}+3p_{7,94}+2p_{7,62}+2p_{7,65}+2p_{7,97}+p_{6,49}+p_{7,9}+p_{7,105} \\ &+2p_{7,25}+3p_{7,89}+p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,117}+2p_{7,77}+p_{7,45} \\ &+2p_{6,29}+p_{7,125}+p_{7,3}+p_{7,99}+p_{7,19}+2p_{7,83}+p_{6,11}+p_{7,107} \\ &+2p_{7,27}+2p_{7,59}+p_{7,123}+p_{7,71}+4p_{7,103}+2p_{7,23}+p_{7,87}+p_{6,15} \\ &+p_{7,47}+2p_{7,31}+4p_{7,95}+2p_{7,63}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,245} = \frac{1}{2}p_{7,117} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,117}^2 - 4(2p_{7,48}+p_{7,112}+2p_{7,72}+p_{6,40}+p_{6,24}+2p_{7,56} \\ &+p_{7,120}+p_{7,4}+2p_{7,68}+p_{6,36}+p_{7,84}+2p_{6,52}+2p_{7,76}+p_{7,108} \\ &+2p_{7,92}+p_{7,124}+p_{7,34}+2p_{7,98}+3p_{7,18}+p_{6,50}+2p_{7,106}+p_{7,26} \\ &+2p_{7,90}+2p_{6,22}+4p_{7,54}+p_{7,118}+p_{6,14}+5p_{7,46}+2p_{7,110} \\ &+2p_{7,30}+3p_{7,94}+2p_{7,62}+2p_{7,65}+2p_{7,97}+p_{6,49}+p_{7,9}+p_{7,105} \\ &+2p_{7,25}+3p_{7,89}+p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,117}+2p_{7,77}+p_{7,45} \\ &+2p_{6,29}+p_{7,125}+p_{7,3}+p_{7,99}+p_{7,19}+2p_{7,83}+p_{6,11}+p_{7,107} \\ &+2p_{7,27}+2p_{7,59}+p_{7,123}+p_{7,71}+4p_{7,103}+2p_{7,23}+p_{7,87}+p_{6,15} \\ &+p_{7,47}+2p_{7,31}+4p_{7,95}+2p_{7,63}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,13} = \frac{1}{2}p_{7,13} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,13}^2 - 4(p_{6,0}+2p_{7,96}+p_{7,16}+2p_{7,80}+p_{6,48}+p_{7,8} \\ &+2p_{7,72}+p_{7,4}+2p_{7,100}+p_{7,20}+2p_{7,116}+2p_{6,12}+p_{7,108}+p_{7,28} \\ &+2p_{7,92}+p_{6,60}+2p_{7,2}+p_{7,50}+2p_{7,114}+p_{6,10}+3p_{7,42}+p_{7,58} \\ &+2p_{7,122}+2p_{7,6}+5p_{7,70}+p_{6,38}+2p_{7,86}+2p_{7,54}+3p_{7,118}+p_{7,14} \\ &+4p_{7,78}+2p_{6,46}+p_{7,1}+p_{7,33}+p_{7,17}+2p_{7,49}+3p_{7,113}+p_{6,9} \\ &+2p_{7,89}+2p_{7,121}+p_{7,69}+2p_{7,101}+p_{7,21}+2p_{6,53}+2p_{7,13}+p_{6,29} \\ &+p_{7,61}+p_{7,3}+p_{6,35}+p_{7,19}+2p_{7,83}+2p_{7,51}+p_{7,43}+2p_{7,107} \\ &+p_{7,27}+p_{7,123}+p_{7,71}+p_{6,39}+3p_{7,23}+2p_{7,87}+2p_{7,55}+4p_{7,119} \\ &+2p_{7,47}+p_{7,111}+p_{7,95}+4p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,141} = \frac{1}{2}p_{7,13} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,13}^2 - 4(p_{6,0}+2p_{7,96}+p_{7,16}+2p_{7,80}+p_{6,48}+p_{7,8} \\ &+2p_{7,72}+p_{7,4}+2p_{7,100}+p_{7,20}+2p_{7,116}+2p_{6,12}+p_{7,108}+p_{7,28} \\ &+2p_{7,92}+p_{6,60}+2p_{7,2}+p_{7,50}+2p_{7,114}+p_{6,10}+3p_{7,42}+p_{7,58} \\ &+2p_{7,122}+2p_{7,6}+5p_{7,70}+p_{6,38}+2p_{7,86}+2p_{7,54}+3p_{7,118}+p_{7,14} \\ &+4p_{7,78}+2p_{6,46}+p_{7,1}+p_{7,33}+p_{7,17}+2p_{7,49}+3p_{7,113}+p_{6,9} \\ &+2p_{7,89}+2p_{7,121}+p_{7,69}+2p_{7,101}+p_{7,21}+2p_{6,53}+2p_{7,13}+p_{6,29} \\ &+p_{7,61}+p_{7,3}+p_{6,35}+p_{7,19}+2p_{7,83}+2p_{7,51}+p_{7,43}+2p_{7,107} \\ &+p_{7,27}+p_{7,123}+p_{7,71}+p_{6,39}+3p_{7,23}+2p_{7,87}+2p_{7,55}+4p_{7,119} \\ &+2p_{7,47}+p_{7,111}+p_{7,95}+4p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,77} = \frac{1}{2}p_{7,77} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,77}^2 - 4(p_{6,0}+2p_{7,32}+2p_{7,16}+p_{7,80}+p_{6,48}+2p_{7,8} \\ &+p_{7,72}+p_{7,68}+2p_{7,36}+p_{7,84}+2p_{7,52}+2p_{6,12}+p_{7,44}+2p_{7,28} \\ &+p_{7,92}+p_{6,60}+2p_{7,66}+2p_{7,50}+p_{7,114}+p_{6,10}+3p_{7,106}+2p_{7,58} \\ &+p_{7,122}+5p_{7,6}+2p_{7,70}+p_{6,38}+2p_{7,22}+3p_{7,54}+2p_{7,118} \\ &+4p_{7,14}+p_{7,78}+2p_{6,46}+p_{7,65}+p_{7,97}+p_{7,81}+3p_{7,49}+2p_{7,113} \\ &+p_{6,9}+2p_{7,25}+2p_{7,57}+p_{7,5}+2p_{7,37}+p_{7,85}+2p_{6,53}+2p_{7,77} \\ &+p_{6,29}+p_{7,125}+p_{7,67}+p_{6,35}+2p_{7,19}+p_{7,83}+2p_{7,115}+2p_{7,43} \\ &+p_{7,107}+p_{7,91}+p_{7,59}+p_{7,7}+p_{6,39}+2p_{7,23}+3p_{7,87}+4p_{7,55} \\ &+2p_{7,119}+p_{7,47}+2p_{7,111}+p_{7,31}+4p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,205} = \frac{1}{2}p_{7,77} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,77}^2 - 4(p_{6,0}+2p_{7,32}+2p_{7,16}+p_{7,80}+p_{6,48}+2p_{7,8} \\ &+p_{7,72}+p_{7,68}+2p_{7,36}+p_{7,84}+2p_{7,52}+2p_{6,12}+p_{7,44}+2p_{7,28} \\ &+p_{7,92}+p_{6,60}+2p_{7,66}+2p_{7,50}+p_{7,114}+p_{6,10}+3p_{7,106}+2p_{7,58} \\ &+p_{7,122}+5p_{7,6}+2p_{7,70}+p_{6,38}+2p_{7,22}+3p_{7,54}+2p_{7,118} \\ &+4p_{7,14}+p_{7,78}+2p_{6,46}+p_{7,65}+p_{7,97}+p_{7,81}+3p_{7,49}+2p_{7,113} \\ &+p_{6,9}+2p_{7,25}+2p_{7,57}+p_{7,5}+2p_{7,37}+p_{7,85}+2p_{6,53}+2p_{7,77} \\ &+p_{6,29}+p_{7,125}+p_{7,67}+p_{6,35}+2p_{7,19}+p_{7,83}+2p_{7,115}+2p_{7,43} \\ &+p_{7,107}+p_{7,91}+p_{7,59}+p_{7,7}+p_{6,39}+2p_{7,23}+3p_{7,87}+4p_{7,55} \\ &+2p_{7,119}+p_{7,47}+2p_{7,111}+p_{7,31}+4p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,45} = \frac{1}{2}p_{7,45} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,45}^2 - 4(2p_{7,0}+p_{6,32}+p_{6,16}+p_{7,48}+2p_{7,112}+p_{7,40} \\ &+2p_{7,104}+2p_{7,4}+p_{7,36}+2p_{7,20}+p_{7,52}+p_{7,12}+2p_{6,44}+p_{6,28} \\ &+p_{7,60}+2p_{7,124}+2p_{7,34}+2p_{7,18}+p_{7,82}+3p_{7,74}+p_{6,42}+2p_{7,26} \\ &+p_{7,90}+p_{6,6}+2p_{7,38}+5p_{7,102}+3p_{7,22}+2p_{7,86}+2p_{7,118}+2p_{6,14} \\ &+p_{7,46}+4p_{7,110}+p_{7,65}+p_{7,33}+3p_{7,17}+2p_{7,81}+p_{7,49}+p_{6,41} \\ &+2p_{7,25}+2p_{7,121}+2p_{7,5}+p_{7,101}+2p_{6,21}+p_{7,53}+2p_{7,45}+p_{7,93} \\ &+p_{6,61}+p_{6,3}+p_{7,35}+2p_{7,83}+p_{7,51}+2p_{7,115}+2p_{7,11}+p_{7,75} \\ &+p_{7,27}+p_{7,59}+p_{6,7}+p_{7,103}+4p_{7,23}+2p_{7,87}+3p_{7,55}+2p_{7,119} \\ &+p_{7,15}+2p_{7,79}+4p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,173} = \frac{1}{2}p_{7,45} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,45}^2 - 4(2p_{7,0}+p_{6,32}+p_{6,16}+p_{7,48}+2p_{7,112}+p_{7,40} \\ &+2p_{7,104}+2p_{7,4}+p_{7,36}+2p_{7,20}+p_{7,52}+p_{7,12}+2p_{6,44}+p_{6,28} \\ &+p_{7,60}+2p_{7,124}+2p_{7,34}+2p_{7,18}+p_{7,82}+3p_{7,74}+p_{6,42}+2p_{7,26} \\ &+p_{7,90}+p_{6,6}+2p_{7,38}+5p_{7,102}+3p_{7,22}+2p_{7,86}+2p_{7,118}+2p_{6,14} \\ &+p_{7,46}+4p_{7,110}+p_{7,65}+p_{7,33}+3p_{7,17}+2p_{7,81}+p_{7,49}+p_{6,41} \\ &+2p_{7,25}+2p_{7,121}+2p_{7,5}+p_{7,101}+2p_{6,21}+p_{7,53}+2p_{7,45}+p_{7,93} \\ &+p_{6,61}+p_{6,3}+p_{7,35}+2p_{7,83}+p_{7,51}+2p_{7,115}+2p_{7,11}+p_{7,75} \\ &+p_{7,27}+p_{7,59}+p_{6,7}+p_{7,103}+4p_{7,23}+2p_{7,87}+3p_{7,55}+2p_{7,119} \\ &+p_{7,15}+2p_{7,79}+4p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,109} = \frac{1}{2}p_{7,109} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,109}^2 - 4(2p_{7,64}+p_{6,32}+p_{6,16}+2p_{7,48}+p_{7,112}+2p_{7,40} \\ &+p_{7,104}+2p_{7,68}+p_{7,100}+2p_{7,84}+p_{7,116}+p_{7,76}+2p_{6,44}+p_{6,28} \\ &+2p_{7,60}+p_{7,124}+2p_{7,98}+p_{7,18}+2p_{7,82}+3p_{7,10}+p_{6,42}+p_{7,26} \\ &+2p_{7,90}+p_{6,6}+5p_{7,38}+2p_{7,102}+2p_{7,22}+3p_{7,86}+2p_{7,54}+2p_{6,14} \\ &+4p_{7,46}+p_{7,110}+p_{7,1}+p_{7,97}+2p_{7,17}+3p_{7,81}+p_{7,113}+p_{6,41} \\ &+2p_{7,89}+2p_{7,57}+2p_{7,69}+p_{7,37}+2p_{6,21}+p_{7,117}+2p_{7,109}+p_{7,29} \\ &+p_{6,61}+p_{6,3}+p_{7,99}+2p_{7,19}+2p_{7,51}+p_{7,115}+p_{7,11}+2p_{7,75} \\ &+p_{7,91}+p_{7,123}+p_{6,7}+p_{7,39}+2p_{7,23}+4p_{7,87}+2p_{7,55}+3p_{7,119} \\ &+2p_{7,15}+p_{7,79}+4p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,237} = \frac{1}{2}p_{7,109} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,109}^2 - 4(2p_{7,64}+p_{6,32}+p_{6,16}+2p_{7,48}+p_{7,112}+2p_{7,40} \\ &+p_{7,104}+2p_{7,68}+p_{7,100}+2p_{7,84}+p_{7,116}+p_{7,76}+2p_{6,44}+p_{6,28} \\ &+2p_{7,60}+p_{7,124}+2p_{7,98}+p_{7,18}+2p_{7,82}+3p_{7,10}+p_{6,42}+p_{7,26} \\ &+2p_{7,90}+p_{6,6}+5p_{7,38}+2p_{7,102}+2p_{7,22}+3p_{7,86}+2p_{7,54}+2p_{6,14} \\ &+4p_{7,46}+p_{7,110}+p_{7,1}+p_{7,97}+2p_{7,17}+3p_{7,81}+p_{7,113}+p_{6,41} \\ &+2p_{7,89}+2p_{7,57}+2p_{7,69}+p_{7,37}+2p_{6,21}+p_{7,117}+2p_{7,109}+p_{7,29} \\ &+p_{6,61}+p_{6,3}+p_{7,99}+2p_{7,19}+2p_{7,51}+p_{7,115}+p_{7,11}+2p_{7,75} \\ &+p_{7,91}+p_{7,123}+p_{6,7}+p_{7,39}+2p_{7,23}+4p_{7,87}+2p_{7,55}+3p_{7,119} \\ &+2p_{7,15}+p_{7,79}+4p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,29} = \frac{1}{2}p_{7,29} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,29}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,96}+p_{6,16}+2p_{7,112}+p_{7,24} \\ &+2p_{7,88}+2p_{7,4}+p_{7,36}+p_{7,20}+2p_{7,116}+p_{6,12}+p_{7,44}+2p_{7,108} \\ &+2p_{6,28}+p_{7,124}+2p_{7,2}+p_{7,66}+2p_{7,18}+2p_{7,10}+p_{7,74}+p_{6,26} \\ &+3p_{7,58}+3p_{7,6}+2p_{7,70}+2p_{7,102}+2p_{7,22}+5p_{7,86}+p_{6,54}+p_{7,30} \\ &+4p_{7,94}+2p_{6,62}+3p_{7,1}+2p_{7,65}+p_{7,33}+p_{7,17}+p_{7,49}+2p_{7,9} \\ &+2p_{7,105}+p_{6,25}+2p_{6,5}+p_{7,37}+p_{7,85}+2p_{7,117}+p_{7,77}+p_{6,45} \\ &+2p_{7,29}+2p_{7,67}+p_{7,35}+2p_{7,99}+p_{7,19}+p_{6,51}+p_{7,11}+p_{7,43} \\ &+p_{7,59}+2p_{7,123}+4p_{7,7}+2p_{7,71}+3p_{7,39}+2p_{7,103}+p_{7,87}+p_{6,55} \\ &+4p_{7,15}+p_{7,111}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,157} = \frac{1}{2}p_{7,29} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,29}^2 - 4(p_{6,0}+p_{7,32}+2p_{7,96}+p_{6,16}+2p_{7,112}+p_{7,24} \\ &+2p_{7,88}+2p_{7,4}+p_{7,36}+p_{7,20}+2p_{7,116}+p_{6,12}+p_{7,44}+2p_{7,108} \\ &+2p_{6,28}+p_{7,124}+2p_{7,2}+p_{7,66}+2p_{7,18}+2p_{7,10}+p_{7,74}+p_{6,26} \\ &+3p_{7,58}+3p_{7,6}+2p_{7,70}+2p_{7,102}+2p_{7,22}+5p_{7,86}+p_{6,54}+p_{7,30} \\ &+4p_{7,94}+2p_{6,62}+3p_{7,1}+2p_{7,65}+p_{7,33}+p_{7,17}+p_{7,49}+2p_{7,9} \\ &+2p_{7,105}+p_{6,25}+2p_{6,5}+p_{7,37}+p_{7,85}+2p_{7,117}+p_{7,77}+p_{6,45} \\ &+2p_{7,29}+2p_{7,67}+p_{7,35}+2p_{7,99}+p_{7,19}+p_{6,51}+p_{7,11}+p_{7,43} \\ &+p_{7,59}+2p_{7,123}+4p_{7,7}+2p_{7,71}+3p_{7,39}+2p_{7,103}+p_{7,87}+p_{6,55} \\ &+4p_{7,15}+p_{7,111}+2p_{7,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,93} = \frac{1}{2}p_{7,93} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,93}^2 - 4(p_{6,0}+2p_{7,32}+p_{7,96}+p_{6,16}+2p_{7,48}+2p_{7,24} \\ &+p_{7,88}+2p_{7,68}+p_{7,100}+p_{7,84}+2p_{7,52}+p_{6,12}+2p_{7,44}+p_{7,108} \\ &+2p_{6,28}+p_{7,60}+p_{7,2}+2p_{7,66}+2p_{7,82}+p_{7,10}+2p_{7,74}+p_{6,26} \\ &+3p_{7,122}+2p_{7,6}+3p_{7,70}+2p_{7,38}+5p_{7,22}+2p_{7,86}+p_{6,54} \\ &+4p_{7,30}+p_{7,94}+2p_{6,62}+2p_{7,1}+3p_{7,65}+p_{7,97}+p_{7,81}+p_{7,113} \\ &+2p_{7,73}+2p_{7,41}+p_{6,25}+2p_{6,5}+p_{7,101}+p_{7,21}+2p_{7,53}+p_{7,13} \\ &+p_{6,45}+2p_{7,93}+2p_{7,3}+2p_{7,35}+p_{7,99}+p_{7,83}+p_{6,51}+p_{7,75} \\ &+p_{7,107}+2p_{7,59}+p_{7,123}+2p_{7,7}+4p_{7,71}+2p_{7,39}+3p_{7,103} \\ &+p_{7,23}+p_{6,55}+4p_{7,79}+p_{7,47}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,221} = \frac{1}{2}p_{7,93} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,93}^2 - 4(p_{6,0}+2p_{7,32}+p_{7,96}+p_{6,16}+2p_{7,48}+2p_{7,24} \\ &+p_{7,88}+2p_{7,68}+p_{7,100}+p_{7,84}+2p_{7,52}+p_{6,12}+2p_{7,44}+p_{7,108} \\ &+2p_{6,28}+p_{7,60}+p_{7,2}+2p_{7,66}+2p_{7,82}+p_{7,10}+2p_{7,74}+p_{6,26} \\ &+3p_{7,122}+2p_{7,6}+3p_{7,70}+2p_{7,38}+5p_{7,22}+2p_{7,86}+p_{6,54} \\ &+4p_{7,30}+p_{7,94}+2p_{6,62}+2p_{7,1}+3p_{7,65}+p_{7,97}+p_{7,81}+p_{7,113} \\ &+2p_{7,73}+2p_{7,41}+p_{6,25}+2p_{6,5}+p_{7,101}+p_{7,21}+2p_{7,53}+p_{7,13} \\ &+p_{6,45}+2p_{7,93}+2p_{7,3}+2p_{7,35}+p_{7,99}+p_{7,83}+p_{6,51}+p_{7,75} \\ &+p_{7,107}+2p_{7,59}+p_{7,123}+2p_{7,7}+4p_{7,71}+2p_{7,39}+3p_{7,103} \\ &+p_{7,23}+p_{6,55}+4p_{7,79}+p_{7,47}+p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,61} = \frac{1}{2}p_{7,61} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,61}^2 - 4(2p_{7,0}+p_{7,64}+p_{6,32}+2p_{7,16}+p_{6,48}+p_{7,56} \\ &+2p_{7,120}+p_{7,68}+2p_{7,36}+2p_{7,20}+p_{7,52}+2p_{7,12}+p_{7,76}+p_{6,44} \\ &+p_{7,28}+2p_{6,60}+2p_{7,34}+p_{7,98}+2p_{7,50}+2p_{7,42}+p_{7,106}+3p_{7,90} \\ &+p_{6,58}+2p_{7,6}+3p_{7,38}+2p_{7,102}+p_{6,22}+2p_{7,54}+5p_{7,118} \\ &+2p_{6,30}+p_{7,62}+4p_{7,126}+p_{7,65}+3p_{7,33}+2p_{7,97}+p_{7,81}+p_{7,49} \\ &+2p_{7,9}+2p_{7,41}+p_{6,57}+p_{7,69}+2p_{6,37}+2p_{7,21}+p_{7,117}+p_{6,13} \\ &+p_{7,109}+2p_{7,61}+2p_{7,3}+p_{7,67}+2p_{7,99}+p_{6,19}+p_{7,51}+p_{7,75} \\ &+p_{7,43}+2p_{7,27}+p_{7,91}+2p_{7,7}+3p_{7,71}+4p_{7,39}+2p_{7,103}+p_{6,23} \\ &+p_{7,119}+p_{7,15}+4p_{7,47}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,189} = \frac{1}{2}p_{7,61} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,61}^2 - 4(2p_{7,0}+p_{7,64}+p_{6,32}+2p_{7,16}+p_{6,48}+p_{7,56} \\ &+2p_{7,120}+p_{7,68}+2p_{7,36}+2p_{7,20}+p_{7,52}+2p_{7,12}+p_{7,76}+p_{6,44} \\ &+p_{7,28}+2p_{6,60}+2p_{7,34}+p_{7,98}+2p_{7,50}+2p_{7,42}+p_{7,106}+3p_{7,90} \\ &+p_{6,58}+2p_{7,6}+3p_{7,38}+2p_{7,102}+p_{6,22}+2p_{7,54}+5p_{7,118} \\ &+2p_{6,30}+p_{7,62}+4p_{7,126}+p_{7,65}+3p_{7,33}+2p_{7,97}+p_{7,81}+p_{7,49} \\ &+2p_{7,9}+2p_{7,41}+p_{6,57}+p_{7,69}+2p_{6,37}+2p_{7,21}+p_{7,117}+p_{6,13} \\ &+p_{7,109}+2p_{7,61}+2p_{7,3}+p_{7,67}+2p_{7,99}+p_{6,19}+p_{7,51}+p_{7,75} \\ &+p_{7,43}+2p_{7,27}+p_{7,91}+2p_{7,7}+3p_{7,71}+4p_{7,39}+2p_{7,103}+p_{6,23} \\ &+p_{7,119}+p_{7,15}+4p_{7,47}+p_{7,31}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,125} = \frac{1}{2}p_{7,125} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,125}^2 - 4(p_{7,0}+2p_{7,64}+p_{6,32}+2p_{7,80}+p_{6,48}+2p_{7,56} \\ &+p_{7,120}+p_{7,4}+2p_{7,100}+2p_{7,84}+p_{7,116}+p_{7,12}+2p_{7,76}+p_{6,44} \\ &+p_{7,92}+2p_{6,60}+p_{7,34}+2p_{7,98}+2p_{7,114}+p_{7,42}+2p_{7,106}+3p_{7,26} \\ &+p_{6,58}+2p_{7,70}+2p_{7,38}+3p_{7,102}+p_{6,22}+5p_{7,54}+2p_{7,118} \\ &+2p_{6,30}+4p_{7,62}+p_{7,126}+p_{7,1}+2p_{7,33}+3p_{7,97}+p_{7,17}+p_{7,113} \\ &+2p_{7,73}+2p_{7,105}+p_{6,57}+p_{7,5}+2p_{6,37}+2p_{7,85}+p_{7,53}+p_{6,13} \\ &+p_{7,45}+2p_{7,125}+p_{7,3}+2p_{7,67}+2p_{7,35}+p_{6,19}+p_{7,115}+p_{7,11} \\ &+p_{7,107}+p_{7,27}+2p_{7,91}+3p_{7,7}+2p_{7,71}+2p_{7,39}+4p_{7,103}+p_{6,23} \\ &+p_{7,55}+p_{7,79}+4p_{7,111}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,253} = \frac{1}{2}p_{7,125} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,125}^2 - 4(p_{7,0}+2p_{7,64}+p_{6,32}+2p_{7,80}+p_{6,48}+2p_{7,56} \\ &+p_{7,120}+p_{7,4}+2p_{7,100}+2p_{7,84}+p_{7,116}+p_{7,12}+2p_{7,76}+p_{6,44} \\ &+p_{7,92}+2p_{6,60}+p_{7,34}+2p_{7,98}+2p_{7,114}+p_{7,42}+2p_{7,106}+3p_{7,26} \\ &+p_{6,58}+2p_{7,70}+2p_{7,38}+3p_{7,102}+p_{6,22}+5p_{7,54}+2p_{7,118} \\ &+2p_{6,30}+4p_{7,62}+p_{7,126}+p_{7,1}+2p_{7,33}+3p_{7,97}+p_{7,17}+p_{7,113} \\ &+2p_{7,73}+2p_{7,105}+p_{6,57}+p_{7,5}+2p_{6,37}+2p_{7,85}+p_{7,53}+p_{6,13} \\ &+p_{7,45}+2p_{7,125}+p_{7,3}+2p_{7,67}+2p_{7,35}+p_{6,19}+p_{7,115}+p_{7,11} \\ &+p_{7,107}+p_{7,27}+2p_{7,91}+3p_{7,7}+2p_{7,71}+2p_{7,39}+4p_{7,103}+p_{6,23} \\ &+p_{7,55}+p_{7,79}+4p_{7,111}+2p_{7,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,3} = \frac{1}{2}p_{7,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,3}^2 - 4(p_{6,0}+3p_{7,32}+p_{7,48}+2p_{7,112}+p_{7,40}+2p_{7,104} \\ &+2p_{7,120}+p_{7,4}+4p_{7,68}+2p_{6,36}+2p_{7,76}+2p_{7,44}+3p_{7,108}+p_{6,28} \\ &+5p_{7,60}+2p_{7,124}+2p_{6,2}+p_{7,98}+p_{7,18}+2p_{7,82}+p_{6,50}+p_{7,10} \\ &+2p_{7,106}+2p_{7,90}+p_{7,122}+p_{7,6}+2p_{7,70}+p_{6,38}+2p_{7,86}+p_{6,54} \\ &+2p_{7,62}+p_{7,126}+p_{7,33}+2p_{7,97}+p_{7,17}+p_{7,113}+p_{7,9}+2p_{7,73} \\ &+2p_{7,41}+p_{6,25}+p_{7,121}+2p_{7,37}+p_{7,101}+p_{7,85}+4p_{7,117}+3p_{7,13} \\ &+2p_{7,77}+2p_{7,45}+4p_{7,109}+p_{6,29}+p_{7,61}+2p_{7,3}+p_{6,19}+p_{7,51} \\ &+p_{7,11}+2p_{6,43}+2p_{7,91}+p_{7,59}+p_{7,7}+2p_{7,39}+3p_{7,103}+p_{7,23} \\ &+p_{7,119}+2p_{7,79}+2p_{7,111}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,131} = \frac{1}{2}p_{7,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,3}^2 - 4(p_{6,0}+3p_{7,32}+p_{7,48}+2p_{7,112}+p_{7,40}+2p_{7,104} \\ &+2p_{7,120}+p_{7,4}+4p_{7,68}+2p_{6,36}+2p_{7,76}+2p_{7,44}+3p_{7,108}+p_{6,28} \\ &+5p_{7,60}+2p_{7,124}+2p_{6,2}+p_{7,98}+p_{7,18}+2p_{7,82}+p_{6,50}+p_{7,10} \\ &+2p_{7,106}+2p_{7,90}+p_{7,122}+p_{7,6}+2p_{7,70}+p_{6,38}+2p_{7,86}+p_{6,54} \\ &+2p_{7,62}+p_{7,126}+p_{7,33}+2p_{7,97}+p_{7,17}+p_{7,113}+p_{7,9}+2p_{7,73} \\ &+2p_{7,41}+p_{6,25}+p_{7,121}+2p_{7,37}+p_{7,101}+p_{7,85}+4p_{7,117}+3p_{7,13} \\ &+2p_{7,77}+2p_{7,45}+4p_{7,109}+p_{6,29}+p_{7,61}+2p_{7,3}+p_{6,19}+p_{7,51} \\ &+p_{7,11}+2p_{6,43}+2p_{7,91}+p_{7,59}+p_{7,7}+2p_{7,39}+3p_{7,103}+p_{7,23} \\ &+p_{7,119}+2p_{7,79}+2p_{7,111}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,67} = \frac{1}{2}p_{7,67} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,67}^2 - 4(p_{6,0}+3p_{7,96}+2p_{7,48}+p_{7,112}+2p_{7,40}+p_{7,104} \\ &+2p_{7,56}+4p_{7,4}+p_{7,68}+2p_{6,36}+2p_{7,12}+3p_{7,44}+2p_{7,108}+p_{6,28} \\ &+2p_{7,60}+5p_{7,124}+2p_{6,2}+p_{7,34}+2p_{7,18}+p_{7,82}+p_{6,50}+p_{7,74} \\ &+2p_{7,42}+2p_{7,26}+p_{7,58}+2p_{7,6}+p_{7,70}+p_{6,38}+2p_{7,22}+p_{6,54} \\ &+p_{7,62}+2p_{7,126}+2p_{7,33}+p_{7,97}+p_{7,81}+p_{7,49}+2p_{7,9}+p_{7,73} \\ &+2p_{7,105}+p_{6,25}+p_{7,57}+p_{7,37}+2p_{7,101}+p_{7,21}+4p_{7,53}+2p_{7,13} \\ &+3p_{7,77}+4p_{7,45}+2p_{7,109}+p_{6,29}+p_{7,125}+2p_{7,67}+p_{6,19}+p_{7,115} \\ &+p_{7,75}+2p_{6,43}+2p_{7,27}+p_{7,123}+p_{7,71}+3p_{7,39}+2p_{7,103}+p_{7,87} \\ &+p_{7,55}+2p_{7,15}+2p_{7,47}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,195} = \frac{1}{2}p_{7,67} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,67}^2 - 4(p_{6,0}+3p_{7,96}+2p_{7,48}+p_{7,112}+2p_{7,40}+p_{7,104} \\ &+2p_{7,56}+4p_{7,4}+p_{7,68}+2p_{6,36}+2p_{7,12}+3p_{7,44}+2p_{7,108}+p_{6,28} \\ &+2p_{7,60}+5p_{7,124}+2p_{6,2}+p_{7,34}+2p_{7,18}+p_{7,82}+p_{6,50}+p_{7,74} \\ &+2p_{7,42}+2p_{7,26}+p_{7,58}+2p_{7,6}+p_{7,70}+p_{6,38}+2p_{7,22}+p_{6,54} \\ &+p_{7,62}+2p_{7,126}+2p_{7,33}+p_{7,97}+p_{7,81}+p_{7,49}+2p_{7,9}+p_{7,73} \\ &+2p_{7,105}+p_{6,25}+p_{7,57}+p_{7,37}+2p_{7,101}+p_{7,21}+4p_{7,53}+2p_{7,13} \\ &+3p_{7,77}+4p_{7,45}+2p_{7,109}+p_{6,29}+p_{7,125}+2p_{7,67}+p_{6,19}+p_{7,115} \\ &+p_{7,75}+2p_{6,43}+2p_{7,27}+p_{7,123}+p_{7,71}+3p_{7,39}+2p_{7,103}+p_{7,87} \\ &+p_{7,55}+2p_{7,15}+2p_{7,47}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,35} = \frac{1}{2}p_{7,35} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,35}^2 - 4(3p_{7,64}+p_{6,32}+2p_{7,16}+p_{7,80}+2p_{7,8}+p_{7,72} \\ &+2p_{7,24}+2p_{6,4}+p_{7,36}+4p_{7,100}+3p_{7,12}+2p_{7,76}+2p_{7,108} \\ &+2p_{7,28}+5p_{7,92}+p_{6,60}+p_{7,2}+2p_{6,34}+p_{6,18}+p_{7,50}+2p_{7,114} \\ &+2p_{7,10}+p_{7,42}+p_{7,26}+2p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,102}+p_{6,22} \\ &+2p_{7,118}+p_{7,30}+2p_{7,94}+2p_{7,1}+p_{7,65}+p_{7,17}+p_{7,49}+2p_{7,73} \\ &+p_{7,41}+2p_{7,105}+p_{7,25}+p_{6,57}+p_{7,5}+2p_{7,69}+4p_{7,21}+p_{7,117} \\ &+4p_{7,13}+2p_{7,77}+3p_{7,45}+2p_{7,109}+p_{7,93}+p_{6,61}+2p_{7,35}+p_{7,83} \\ &+p_{6,51}+2p_{6,11}+p_{7,43}+p_{7,91}+2p_{7,123}+3p_{7,7}+2p_{7,71}+p_{7,39} \\ &+p_{7,23}+p_{7,55}+2p_{7,15}+2p_{7,111}+p_{6,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,163} = \frac{1}{2}p_{7,35} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,35}^2 - 4(3p_{7,64}+p_{6,32}+2p_{7,16}+p_{7,80}+2p_{7,8}+p_{7,72} \\ &+2p_{7,24}+2p_{6,4}+p_{7,36}+4p_{7,100}+3p_{7,12}+2p_{7,76}+2p_{7,108} \\ &+2p_{7,28}+5p_{7,92}+p_{6,60}+p_{7,2}+2p_{6,34}+p_{6,18}+p_{7,50}+2p_{7,114} \\ &+2p_{7,10}+p_{7,42}+p_{7,26}+2p_{7,122}+p_{6,6}+p_{7,38}+2p_{7,102}+p_{6,22} \\ &+2p_{7,118}+p_{7,30}+2p_{7,94}+2p_{7,1}+p_{7,65}+p_{7,17}+p_{7,49}+2p_{7,73} \\ &+p_{7,41}+2p_{7,105}+p_{7,25}+p_{6,57}+p_{7,5}+2p_{7,69}+4p_{7,21}+p_{7,117} \\ &+4p_{7,13}+2p_{7,77}+3p_{7,45}+2p_{7,109}+p_{7,93}+p_{6,61}+2p_{7,35}+p_{7,83} \\ &+p_{6,51}+2p_{6,11}+p_{7,43}+p_{7,91}+2p_{7,123}+3p_{7,7}+2p_{7,71}+p_{7,39} \\ &+p_{7,23}+p_{7,55}+2p_{7,15}+2p_{7,111}+p_{6,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,99} = \frac{1}{2}p_{7,99} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,99}^2 - 4(3p_{7,0}+p_{6,32}+p_{7,16}+2p_{7,80}+p_{7,8}+2p_{7,72} \\ &+2p_{7,88}+2p_{6,4}+4p_{7,36}+p_{7,100}+2p_{7,12}+3p_{7,76}+2p_{7,44} \\ &+5p_{7,28}+2p_{7,92}+p_{6,60}+p_{7,66}+2p_{6,34}+p_{6,18}+2p_{7,50}+p_{7,114} \\ &+2p_{7,74}+p_{7,106}+p_{7,90}+2p_{7,58}+p_{6,6}+2p_{7,38}+p_{7,102}+p_{6,22} \\ &+2p_{7,54}+2p_{7,30}+p_{7,94}+p_{7,1}+2p_{7,65}+p_{7,81}+p_{7,113}+2p_{7,9} \\ &+2p_{7,41}+p_{7,105}+p_{7,89}+p_{6,57}+2p_{7,5}+p_{7,69}+4p_{7,85}+p_{7,53} \\ &+2p_{7,13}+4p_{7,77}+2p_{7,45}+3p_{7,109}+p_{7,29}+p_{6,61}+2p_{7,99}+p_{7,19} \\ &+p_{6,51}+2p_{6,11}+p_{7,107}+p_{7,27}+2p_{7,59}+2p_{7,7}+3p_{7,71}+p_{7,103} \\ &+p_{7,87}+p_{7,119}+2p_{7,79}+2p_{7,47}+p_{6,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,227} = \frac{1}{2}p_{7,99} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,99}^2 - 4(3p_{7,0}+p_{6,32}+p_{7,16}+2p_{7,80}+p_{7,8}+2p_{7,72} \\ &+2p_{7,88}+2p_{6,4}+4p_{7,36}+p_{7,100}+2p_{7,12}+3p_{7,76}+2p_{7,44} \\ &+5p_{7,28}+2p_{7,92}+p_{6,60}+p_{7,66}+2p_{6,34}+p_{6,18}+2p_{7,50}+p_{7,114} \\ &+2p_{7,74}+p_{7,106}+p_{7,90}+2p_{7,58}+p_{6,6}+2p_{7,38}+p_{7,102}+p_{6,22} \\ &+2p_{7,54}+2p_{7,30}+p_{7,94}+p_{7,1}+2p_{7,65}+p_{7,81}+p_{7,113}+2p_{7,9} \\ &+2p_{7,41}+p_{7,105}+p_{7,89}+p_{6,57}+2p_{7,5}+p_{7,69}+4p_{7,85}+p_{7,53} \\ &+2p_{7,13}+4p_{7,77}+2p_{7,45}+3p_{7,109}+p_{7,29}+p_{6,61}+2p_{7,99}+p_{7,19} \\ &+p_{6,51}+2p_{6,11}+p_{7,107}+p_{7,27}+2p_{7,59}+2p_{7,7}+3p_{7,71}+p_{7,103} \\ &+p_{7,87}+p_{7,119}+2p_{7,79}+2p_{7,47}+p_{6,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,19} = \frac{1}{2}p_{7,19} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,19}^2 - 4(2p_{7,0}+p_{7,64}+p_{6,16}+3p_{7,48}+2p_{7,8}+p_{7,56} \\ &+2p_{7,120}+p_{7,20}+4p_{7,84}+2p_{6,52}+2p_{7,12}+5p_{7,76}+p_{6,44}+2p_{7,92} \\ &+2p_{7,60}+3p_{7,124}+p_{6,2}+p_{7,34}+2p_{7,98}+2p_{6,18}+p_{7,114}+p_{7,10} \\ &+2p_{7,106}+p_{7,26}+2p_{7,122}+p_{6,6}+2p_{7,102}+p_{7,22}+2p_{7,86}+p_{6,54} \\ &+p_{7,14}+2p_{7,78}+p_{7,1}+p_{7,33}+p_{7,49}+2p_{7,113}+p_{7,9}+p_{6,41} \\ &+p_{7,25}+2p_{7,89}+2p_{7,57}+4p_{7,5}+p_{7,101}+2p_{7,53}+p_{7,117}+p_{7,77} \\ &+p_{6,45}+3p_{7,29}+2p_{7,93}+2p_{7,61}+4p_{7,125}+p_{7,67}+p_{6,35}+2p_{7,19} \\ &+p_{7,75}+2p_{7,107}+p_{7,27}+2p_{6,59}+p_{7,7}+p_{7,39}+p_{7,23}+2p_{7,55} \\ &+3p_{7,119}+p_{6,15}+2p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,147} = \frac{1}{2}p_{7,19} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,19}^2 - 4(2p_{7,0}+p_{7,64}+p_{6,16}+3p_{7,48}+2p_{7,8}+p_{7,56} \\ &+2p_{7,120}+p_{7,20}+4p_{7,84}+2p_{6,52}+2p_{7,12}+5p_{7,76}+p_{6,44}+2p_{7,92} \\ &+2p_{7,60}+3p_{7,124}+p_{6,2}+p_{7,34}+2p_{7,98}+2p_{6,18}+p_{7,114}+p_{7,10} \\ &+2p_{7,106}+p_{7,26}+2p_{7,122}+p_{6,6}+2p_{7,102}+p_{7,22}+2p_{7,86}+p_{6,54} \\ &+p_{7,14}+2p_{7,78}+p_{7,1}+p_{7,33}+p_{7,49}+2p_{7,113}+p_{7,9}+p_{6,41} \\ &+p_{7,25}+2p_{7,89}+2p_{7,57}+4p_{7,5}+p_{7,101}+2p_{7,53}+p_{7,117}+p_{7,77} \\ &+p_{6,45}+3p_{7,29}+2p_{7,93}+2p_{7,61}+4p_{7,125}+p_{7,67}+p_{6,35}+2p_{7,19} \\ &+p_{7,75}+2p_{7,107}+p_{7,27}+2p_{6,59}+p_{7,7}+p_{7,39}+p_{7,23}+2p_{7,55} \\ &+3p_{7,119}+p_{6,15}+2p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,83} = \frac{1}{2}p_{7,83} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,83}^2 - 4(p_{7,0}+2p_{7,64}+p_{6,16}+3p_{7,112}+2p_{7,72}+2p_{7,56} \\ &+p_{7,120}+4p_{7,20}+p_{7,84}+2p_{6,52}+5p_{7,12}+2p_{7,76}+p_{6,44}+2p_{7,28} \\ &+3p_{7,60}+2p_{7,124}+p_{6,2}+2p_{7,34}+p_{7,98}+2p_{6,18}+p_{7,50}+p_{7,74} \\ &+2p_{7,42}+p_{7,90}+2p_{7,58}+p_{6,6}+2p_{7,38}+2p_{7,22}+p_{7,86}+p_{6,54} \\ &+2p_{7,14}+p_{7,78}+p_{7,65}+p_{7,97}+2p_{7,49}+p_{7,113}+p_{7,73}+p_{6,41} \\ &+2p_{7,25}+p_{7,89}+2p_{7,121}+4p_{7,69}+p_{7,37}+p_{7,53}+2p_{7,117}+p_{7,13} \\ &+p_{6,45}+2p_{7,29}+3p_{7,93}+4p_{7,61}+2p_{7,125}+p_{7,3}+p_{6,35}+2p_{7,83} \\ &+p_{7,11}+2p_{7,43}+p_{7,91}+2p_{6,59}+p_{7,71}+p_{7,103}+p_{7,87}+3p_{7,55} \\ &+2p_{7,119}+p_{6,15}+2p_{7,31}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,211} = \frac{1}{2}p_{7,83} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,83}^2 - 4(p_{7,0}+2p_{7,64}+p_{6,16}+3p_{7,112}+2p_{7,72}+2p_{7,56} \\ &+p_{7,120}+4p_{7,20}+p_{7,84}+2p_{6,52}+5p_{7,12}+2p_{7,76}+p_{6,44}+2p_{7,28} \\ &+3p_{7,60}+2p_{7,124}+p_{6,2}+2p_{7,34}+p_{7,98}+2p_{6,18}+p_{7,50}+p_{7,74} \\ &+2p_{7,42}+p_{7,90}+2p_{7,58}+p_{6,6}+2p_{7,38}+2p_{7,22}+p_{7,86}+p_{6,54} \\ &+2p_{7,14}+p_{7,78}+p_{7,65}+p_{7,97}+2p_{7,49}+p_{7,113}+p_{7,73}+p_{6,41} \\ &+2p_{7,25}+p_{7,89}+2p_{7,121}+4p_{7,69}+p_{7,37}+p_{7,53}+2p_{7,117}+p_{7,13} \\ &+p_{6,45}+2p_{7,29}+3p_{7,93}+4p_{7,61}+2p_{7,125}+p_{7,3}+p_{6,35}+2p_{7,83} \\ &+p_{7,11}+2p_{7,43}+p_{7,91}+2p_{6,59}+p_{7,71}+p_{7,103}+p_{7,87}+3p_{7,55} \\ &+2p_{7,119}+p_{6,15}+2p_{7,31}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,51} = \frac{1}{2}p_{7,51} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,51}^2 - 4(2p_{7,32}+p_{7,96}+3p_{7,80}+p_{6,48}+2p_{7,40}+2p_{7,24} \\ &+p_{7,88}+2p_{6,20}+p_{7,52}+4p_{7,116}+p_{6,12}+2p_{7,44}+5p_{7,108}+3p_{7,28} \\ &+2p_{7,92}+2p_{7,124}+2p_{7,2}+p_{7,66}+p_{6,34}+p_{7,18}+2p_{6,50}+2p_{7,10} \\ &+p_{7,42}+2p_{7,26}+p_{7,58}+2p_{7,6}+p_{6,38}+p_{6,22}+p_{7,54}+2p_{7,118} \\ &+p_{7,46}+2p_{7,110}+p_{7,65}+p_{7,33}+2p_{7,17}+p_{7,81}+p_{6,9}+p_{7,41} \\ &+2p_{7,89}+p_{7,57}+2p_{7,121}+p_{7,5}+4p_{7,37}+p_{7,21}+2p_{7,85}+p_{6,13} \\ &+p_{7,109}+4p_{7,29}+2p_{7,93}+3p_{7,61}+2p_{7,125}+p_{6,3}+p_{7,99}+2p_{7,51} \\ &+2p_{7,11}+p_{7,107}+2p_{6,27}+p_{7,59}+p_{7,71}+p_{7,39}+3p_{7,23}+2p_{7,87} \\ &+p_{7,55}+p_{6,47}+2p_{7,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,179} = \frac{1}{2}p_{7,51} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,51}^2 - 4(2p_{7,32}+p_{7,96}+3p_{7,80}+p_{6,48}+2p_{7,40}+2p_{7,24} \\ &+p_{7,88}+2p_{6,20}+p_{7,52}+4p_{7,116}+p_{6,12}+2p_{7,44}+5p_{7,108}+3p_{7,28} \\ &+2p_{7,92}+2p_{7,124}+2p_{7,2}+p_{7,66}+p_{6,34}+p_{7,18}+2p_{6,50}+2p_{7,10} \\ &+p_{7,42}+2p_{7,26}+p_{7,58}+2p_{7,6}+p_{6,38}+p_{6,22}+p_{7,54}+2p_{7,118} \\ &+p_{7,46}+2p_{7,110}+p_{7,65}+p_{7,33}+2p_{7,17}+p_{7,81}+p_{6,9}+p_{7,41} \\ &+2p_{7,89}+p_{7,57}+2p_{7,121}+p_{7,5}+4p_{7,37}+p_{7,21}+2p_{7,85}+p_{6,13} \\ &+p_{7,109}+4p_{7,29}+2p_{7,93}+3p_{7,61}+2p_{7,125}+p_{6,3}+p_{7,99}+2p_{7,51} \\ &+2p_{7,11}+p_{7,107}+2p_{6,27}+p_{7,59}+p_{7,71}+p_{7,39}+3p_{7,23}+2p_{7,87} \\ &+p_{7,55}+p_{6,47}+2p_{7,31}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,115} = \frac{1}{2}p_{7,115} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,115}^2 - 4(p_{7,32}+2p_{7,96}+3p_{7,16}+p_{6,48}+2p_{7,104}+p_{7,24} \\ &+2p_{7,88}+2p_{6,20}+4p_{7,52}+p_{7,116}+p_{6,12}+5p_{7,44}+2p_{7,108} \\ &+2p_{7,28}+3p_{7,92}+2p_{7,60}+p_{7,2}+2p_{7,66}+p_{6,34}+p_{7,82}+2p_{6,50} \\ &+2p_{7,74}+p_{7,106}+2p_{7,90}+p_{7,122}+2p_{7,70}+p_{6,38}+p_{6,22}+2p_{7,54} \\ &+p_{7,118}+2p_{7,46}+p_{7,110}+p_{7,1}+p_{7,97}+p_{7,17}+2p_{7,81}+p_{6,9} \\ &+p_{7,105}+2p_{7,25}+2p_{7,57}+p_{7,121}+p_{7,69}+4p_{7,101}+2p_{7,21}+p_{7,85} \\ &+p_{6,13}+p_{7,45}+2p_{7,29}+4p_{7,93}+2p_{7,61}+3p_{7,125}+p_{6,3}+p_{7,35} \\ &+2p_{7,115}+2p_{7,75}+p_{7,43}+2p_{6,27}+p_{7,123}+p_{7,7}+p_{7,103}+2p_{7,23} \\ &+3p_{7,87}+p_{7,119}+p_{6,47}+2p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,243} = \frac{1}{2}p_{7,115} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,115}^2 - 4(p_{7,32}+2p_{7,96}+3p_{7,16}+p_{6,48}+2p_{7,104}+p_{7,24} \\ &+2p_{7,88}+2p_{6,20}+4p_{7,52}+p_{7,116}+p_{6,12}+5p_{7,44}+2p_{7,108} \\ &+2p_{7,28}+3p_{7,92}+2p_{7,60}+p_{7,2}+2p_{7,66}+p_{6,34}+p_{7,82}+2p_{6,50} \\ &+2p_{7,74}+p_{7,106}+2p_{7,90}+p_{7,122}+2p_{7,70}+p_{6,38}+p_{6,22}+2p_{7,54} \\ &+p_{7,118}+2p_{7,46}+p_{7,110}+p_{7,1}+p_{7,97}+p_{7,17}+2p_{7,81}+p_{6,9} \\ &+p_{7,105}+2p_{7,25}+2p_{7,57}+p_{7,121}+p_{7,69}+4p_{7,101}+2p_{7,21}+p_{7,85} \\ &+p_{6,13}+p_{7,45}+2p_{7,29}+4p_{7,93}+2p_{7,61}+3p_{7,125}+p_{6,3}+p_{7,35} \\ &+2p_{7,115}+2p_{7,75}+p_{7,43}+2p_{6,27}+p_{7,123}+p_{7,7}+p_{7,103}+2p_{7,23} \\ &+3p_{7,87}+p_{7,119}+p_{6,47}+2p_{7,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,11} = \frac{1}{2}p_{7,11} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,11}^2 - 4(2p_{7,0}+p_{7,48}+2p_{7,112}+p_{6,8}+3p_{7,40}+p_{7,56} \\ &+2p_{7,120}+2p_{7,4}+5p_{7,68}+p_{6,36}+2p_{7,84}+2p_{7,52}+3p_{7,116}+p_{7,12} \\ &+4p_{7,76}+2p_{6,44}+p_{7,2}+2p_{7,98}+p_{7,18}+2p_{7,114}+2p_{6,10}+p_{7,106} \\ &+p_{7,26}+2p_{7,90}+p_{6,58}+p_{7,6}+2p_{7,70}+p_{7,14}+2p_{7,78}+p_{6,46} \\ &+2p_{7,94}+p_{6,62}+p_{7,1}+p_{6,33}+p_{7,17}+2p_{7,81}+2p_{7,49}+p_{7,41} \\ &+2p_{7,105}+p_{7,25}+p_{7,121}+p_{7,69}+p_{6,37}+3p_{7,21}+2p_{7,85}+2p_{7,53} \\ &+4p_{7,117}+2p_{7,45}+p_{7,109}+p_{7,93}+4p_{7,125}+p_{7,67}+2p_{7,99}+p_{7,19} \\ &+2p_{6,51}+2p_{7,11}+p_{6,27}+p_{7,59}+p_{6,7}+2p_{7,87}+2p_{7,119}+p_{7,15} \\ &+2p_{7,47}+3p_{7,111}+p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,139} = \frac{1}{2}p_{7,11} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,11}^2 - 4(2p_{7,0}+p_{7,48}+2p_{7,112}+p_{6,8}+3p_{7,40}+p_{7,56} \\ &+2p_{7,120}+2p_{7,4}+5p_{7,68}+p_{6,36}+2p_{7,84}+2p_{7,52}+3p_{7,116}+p_{7,12} \\ &+4p_{7,76}+2p_{6,44}+p_{7,2}+2p_{7,98}+p_{7,18}+2p_{7,114}+2p_{6,10}+p_{7,106} \\ &+p_{7,26}+2p_{7,90}+p_{6,58}+p_{7,6}+2p_{7,70}+p_{7,14}+2p_{7,78}+p_{6,46} \\ &+2p_{7,94}+p_{6,62}+p_{7,1}+p_{6,33}+p_{7,17}+2p_{7,81}+2p_{7,49}+p_{7,41} \\ &+2p_{7,105}+p_{7,25}+p_{7,121}+p_{7,69}+p_{6,37}+3p_{7,21}+2p_{7,85}+2p_{7,53} \\ &+4p_{7,117}+2p_{7,45}+p_{7,109}+p_{7,93}+4p_{7,125}+p_{7,67}+2p_{7,99}+p_{7,19} \\ &+2p_{6,51}+2p_{7,11}+p_{6,27}+p_{7,59}+p_{6,7}+2p_{7,87}+2p_{7,119}+p_{7,15} \\ &+2p_{7,47}+3p_{7,111}+p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,75} = \frac{1}{2}p_{7,75} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,75}^2 - 4(2p_{7,64}+2p_{7,48}+p_{7,112}+p_{6,8}+3p_{7,104}+2p_{7,56} \\ &+p_{7,120}+5p_{7,4}+2p_{7,68}+p_{6,36}+2p_{7,20}+3p_{7,52}+2p_{7,116} \\ &+4p_{7,12}+p_{7,76}+2p_{6,44}+p_{7,66}+2p_{7,34}+p_{7,82}+2p_{7,50}+2p_{6,10} \\ &+p_{7,42}+2p_{7,26}+p_{7,90}+p_{6,58}+2p_{7,6}+p_{7,70}+2p_{7,14}+p_{7,78} \\ &+p_{6,46}+2p_{7,30}+p_{6,62}+p_{7,65}+p_{6,33}+2p_{7,17}+p_{7,81}+2p_{7,113} \\ &+2p_{7,41}+p_{7,105}+p_{7,89}+p_{7,57}+p_{7,5}+p_{6,37}+2p_{7,21}+3p_{7,85} \\ &+4p_{7,53}+2p_{7,117}+p_{7,45}+2p_{7,109}+p_{7,29}+4p_{7,61}+p_{7,3}+2p_{7,35} \\ &+p_{7,83}+2p_{6,51}+2p_{7,75}+p_{6,27}+p_{7,123}+p_{6,7}+2p_{7,23}+2p_{7,55} \\ &+p_{7,79}+3p_{7,47}+2p_{7,111}+p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,203} = \frac{1}{2}p_{7,75} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,75}^2 - 4(2p_{7,64}+2p_{7,48}+p_{7,112}+p_{6,8}+3p_{7,104}+2p_{7,56} \\ &+p_{7,120}+5p_{7,4}+2p_{7,68}+p_{6,36}+2p_{7,20}+3p_{7,52}+2p_{7,116} \\ &+4p_{7,12}+p_{7,76}+2p_{6,44}+p_{7,66}+2p_{7,34}+p_{7,82}+2p_{7,50}+2p_{6,10} \\ &+p_{7,42}+2p_{7,26}+p_{7,90}+p_{6,58}+2p_{7,6}+p_{7,70}+2p_{7,14}+p_{7,78} \\ &+p_{6,46}+2p_{7,30}+p_{6,62}+p_{7,65}+p_{6,33}+2p_{7,17}+p_{7,81}+2p_{7,113} \\ &+2p_{7,41}+p_{7,105}+p_{7,89}+p_{7,57}+p_{7,5}+p_{6,37}+2p_{7,21}+3p_{7,85} \\ &+4p_{7,53}+2p_{7,117}+p_{7,45}+2p_{7,109}+p_{7,29}+4p_{7,61}+p_{7,3}+2p_{7,35} \\ &+p_{7,83}+2p_{6,51}+2p_{7,75}+p_{6,27}+p_{7,123}+p_{6,7}+2p_{7,23}+2p_{7,55} \\ &+p_{7,79}+3p_{7,47}+2p_{7,111}+p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,43} = \frac{1}{2}p_{7,43} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,43}^2 - 4(2p_{7,32}+2p_{7,16}+p_{7,80}+3p_{7,72}+p_{6,40}+2p_{7,24} \\ &+p_{7,88}+p_{6,4}+2p_{7,36}+5p_{7,100}+3p_{7,20}+2p_{7,84}+2p_{7,116}+2p_{6,12} \\ &+p_{7,44}+4p_{7,108}+2p_{7,2}+p_{7,34}+2p_{7,18}+p_{7,50}+p_{7,10}+2p_{6,42} \\ &+p_{6,26}+p_{7,58}+2p_{7,122}+p_{7,38}+2p_{7,102}+p_{6,14}+p_{7,46}+2p_{7,110} \\ &+p_{6,30}+2p_{7,126}+p_{6,1}+p_{7,33}+2p_{7,81}+p_{7,49}+2p_{7,113}+2p_{7,9} \\ &+p_{7,73}+p_{7,25}+p_{7,57}+p_{6,5}+p_{7,101}+4p_{7,21}+2p_{7,85}+3p_{7,53} \\ &+2p_{7,117}+p_{7,13}+2p_{7,77}+4p_{7,29}+p_{7,125}+2p_{7,3}+p_{7,99}+2p_{6,19} \\ &+p_{7,51}+2p_{7,43}+p_{7,91}+p_{6,59}+p_{6,39}+2p_{7,23}+2p_{7,119}+3p_{7,15} \\ &+2p_{7,79}+p_{7,47}+p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,171} = \frac{1}{2}p_{7,43} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,43}^2 - 4(2p_{7,32}+2p_{7,16}+p_{7,80}+3p_{7,72}+p_{6,40}+2p_{7,24} \\ &+p_{7,88}+p_{6,4}+2p_{7,36}+5p_{7,100}+3p_{7,20}+2p_{7,84}+2p_{7,116}+2p_{6,12} \\ &+p_{7,44}+4p_{7,108}+2p_{7,2}+p_{7,34}+2p_{7,18}+p_{7,50}+p_{7,10}+2p_{6,42} \\ &+p_{6,26}+p_{7,58}+2p_{7,122}+p_{7,38}+2p_{7,102}+p_{6,14}+p_{7,46}+2p_{7,110} \\ &+p_{6,30}+2p_{7,126}+p_{6,1}+p_{7,33}+2p_{7,81}+p_{7,49}+2p_{7,113}+2p_{7,9} \\ &+p_{7,73}+p_{7,25}+p_{7,57}+p_{6,5}+p_{7,101}+4p_{7,21}+2p_{7,85}+3p_{7,53} \\ &+2p_{7,117}+p_{7,13}+2p_{7,77}+4p_{7,29}+p_{7,125}+2p_{7,3}+p_{7,99}+2p_{6,19} \\ &+p_{7,51}+2p_{7,43}+p_{7,91}+p_{6,59}+p_{6,39}+2p_{7,23}+2p_{7,119}+3p_{7,15} \\ &+2p_{7,79}+p_{7,47}+p_{7,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,107} = \frac{1}{2}p_{7,107} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,107}^2 - 4(2p_{7,96}+p_{7,16}+2p_{7,80}+3p_{7,8}+p_{6,40}+p_{7,24} \\ &+2p_{7,88}+p_{6,4}+5p_{7,36}+2p_{7,100}+2p_{7,20}+3p_{7,84}+2p_{7,52}+2p_{6,12} \\ &+4p_{7,44}+p_{7,108}+2p_{7,66}+p_{7,98}+2p_{7,82}+p_{7,114}+p_{7,74}+2p_{6,42} \\ &+p_{6,26}+2p_{7,58}+p_{7,122}+2p_{7,38}+p_{7,102}+p_{6,14}+2p_{7,46}+p_{7,110} \\ &+p_{6,30}+2p_{7,62}+p_{6,1}+p_{7,97}+2p_{7,17}+2p_{7,49}+p_{7,113}+p_{7,9} \\ &+2p_{7,73}+p_{7,89}+p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,21}+4p_{7,85}+2p_{7,53} \\ &+3p_{7,117}+2p_{7,13}+p_{7,77}+4p_{7,93}+p_{7,61}+2p_{7,67}+p_{7,35}+2p_{6,19} \\ &+p_{7,115}+2p_{7,107}+p_{7,27}+p_{6,59}+p_{6,39}+2p_{7,87}+2p_{7,55}+2p_{7,15} \\ &+3p_{7,79}+p_{7,111}+p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,235} = \frac{1}{2}p_{7,107} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,107}^2 - 4(2p_{7,96}+p_{7,16}+2p_{7,80}+3p_{7,8}+p_{6,40}+p_{7,24} \\ &+2p_{7,88}+p_{6,4}+5p_{7,36}+2p_{7,100}+2p_{7,20}+3p_{7,84}+2p_{7,52}+2p_{6,12} \\ &+4p_{7,44}+p_{7,108}+2p_{7,66}+p_{7,98}+2p_{7,82}+p_{7,114}+p_{7,74}+2p_{6,42} \\ &+p_{6,26}+2p_{7,58}+p_{7,122}+2p_{7,38}+p_{7,102}+p_{6,14}+2p_{7,46}+p_{7,110} \\ &+p_{6,30}+2p_{7,62}+p_{6,1}+p_{7,97}+2p_{7,17}+2p_{7,49}+p_{7,113}+p_{7,9} \\ &+2p_{7,73}+p_{7,89}+p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,21}+4p_{7,85}+2p_{7,53} \\ &+3p_{7,117}+2p_{7,13}+p_{7,77}+4p_{7,93}+p_{7,61}+2p_{7,67}+p_{7,35}+2p_{6,19} \\ &+p_{7,115}+2p_{7,107}+p_{7,27}+p_{6,59}+p_{6,39}+2p_{7,87}+2p_{7,55}+2p_{7,15} \\ &+3p_{7,79}+p_{7,111}+p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,27} = \frac{1}{2}p_{7,27} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,27}^2 - 4(2p_{7,0}+p_{7,64}+2p_{7,16}+2p_{7,8}+p_{7,72}+p_{6,24} \\ &+3p_{7,56}+3p_{7,4}+2p_{7,68}+2p_{7,100}+2p_{7,20}+5p_{7,84}+p_{6,52}+p_{7,28} \\ &+4p_{7,92}+2p_{6,60}+2p_{7,2}+p_{7,34}+p_{7,18}+2p_{7,114}+p_{6,10}+p_{7,42} \\ &+2p_{7,106}+2p_{6,26}+p_{7,122}+p_{7,22}+2p_{7,86}+p_{6,14}+2p_{7,110} \\ &+p_{7,30}+2p_{7,94}+p_{6,62}+2p_{7,65}+p_{7,33}+2p_{7,97}+p_{7,17}+p_{6,49} \\ &+p_{7,9}+p_{7,41}+p_{7,57}+2p_{7,121}+4p_{7,5}+2p_{7,69}+3p_{7,37}+2p_{7,101} \\ &+p_{7,85}+p_{6,53}+4p_{7,13}+p_{7,109}+2p_{7,61}+p_{7,125}+2p_{6,3}+p_{7,35} \\ &+p_{7,83}+2p_{7,115}+p_{7,75}+p_{6,43}+2p_{7,27}+2p_{7,7}+2p_{7,103}+p_{6,23} \\ &+p_{7,15}+p_{7,47}+p_{7,31}+2p_{7,63}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,155} = \frac{1}{2}p_{7,27} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,27}^2 - 4(2p_{7,0}+p_{7,64}+2p_{7,16}+2p_{7,8}+p_{7,72}+p_{6,24} \\ &+3p_{7,56}+3p_{7,4}+2p_{7,68}+2p_{7,100}+2p_{7,20}+5p_{7,84}+p_{6,52}+p_{7,28} \\ &+4p_{7,92}+2p_{6,60}+2p_{7,2}+p_{7,34}+p_{7,18}+2p_{7,114}+p_{6,10}+p_{7,42} \\ &+2p_{7,106}+2p_{6,26}+p_{7,122}+p_{7,22}+2p_{7,86}+p_{6,14}+2p_{7,110} \\ &+p_{7,30}+2p_{7,94}+p_{6,62}+2p_{7,65}+p_{7,33}+2p_{7,97}+p_{7,17}+p_{6,49} \\ &+p_{7,9}+p_{7,41}+p_{7,57}+2p_{7,121}+4p_{7,5}+2p_{7,69}+3p_{7,37}+2p_{7,101} \\ &+p_{7,85}+p_{6,53}+4p_{7,13}+p_{7,109}+2p_{7,61}+p_{7,125}+2p_{6,3}+p_{7,35} \\ &+p_{7,83}+2p_{7,115}+p_{7,75}+p_{6,43}+2p_{7,27}+2p_{7,7}+2p_{7,103}+p_{6,23} \\ &+p_{7,15}+p_{7,47}+p_{7,31}+2p_{7,63}+3p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,91} = \frac{1}{2}p_{7,91} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,91}^2 - 4(p_{7,0}+2p_{7,64}+2p_{7,80}+p_{7,8}+2p_{7,72}+p_{6,24} \\ &+3p_{7,120}+2p_{7,4}+3p_{7,68}+2p_{7,36}+5p_{7,20}+2p_{7,84}+p_{6,52} \\ &+4p_{7,28}+p_{7,92}+2p_{6,60}+2p_{7,66}+p_{7,98}+p_{7,82}+2p_{7,50}+p_{6,10} \\ &+2p_{7,42}+p_{7,106}+2p_{6,26}+p_{7,58}+2p_{7,22}+p_{7,86}+p_{6,14}+2p_{7,46} \\ &+2p_{7,30}+p_{7,94}+p_{6,62}+2p_{7,1}+2p_{7,33}+p_{7,97}+p_{7,81}+p_{6,49} \\ &+p_{7,73}+p_{7,105}+2p_{7,57}+p_{7,121}+2p_{7,5}+4p_{7,69}+2p_{7,37} \\ &+3p_{7,101}+p_{7,21}+p_{6,53}+4p_{7,77}+p_{7,45}+p_{7,61}+2p_{7,125}+2p_{6,3} \\ &+p_{7,99}+p_{7,19}+2p_{7,51}+p_{7,11}+p_{6,43}+2p_{7,91}+2p_{7,71}+2p_{7,39} \\ &+p_{6,23}+p_{7,79}+p_{7,111}+p_{7,95}+3p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,219} = \frac{1}{2}p_{7,91} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,91}^2 - 4(p_{7,0}+2p_{7,64}+2p_{7,80}+p_{7,8}+2p_{7,72}+p_{6,24} \\ &+3p_{7,120}+2p_{7,4}+3p_{7,68}+2p_{7,36}+5p_{7,20}+2p_{7,84}+p_{6,52} \\ &+4p_{7,28}+p_{7,92}+2p_{6,60}+2p_{7,66}+p_{7,98}+p_{7,82}+2p_{7,50}+p_{6,10} \\ &+2p_{7,42}+p_{7,106}+2p_{6,26}+p_{7,58}+2p_{7,22}+p_{7,86}+p_{6,14}+2p_{7,46} \\ &+2p_{7,30}+p_{7,94}+p_{6,62}+2p_{7,1}+2p_{7,33}+p_{7,97}+p_{7,81}+p_{6,49} \\ &+p_{7,73}+p_{7,105}+2p_{7,57}+p_{7,121}+2p_{7,5}+4p_{7,69}+2p_{7,37} \\ &+3p_{7,101}+p_{7,21}+p_{6,53}+4p_{7,77}+p_{7,45}+p_{7,61}+2p_{7,125}+2p_{6,3} \\ &+p_{7,99}+p_{7,19}+2p_{7,51}+p_{7,11}+p_{6,43}+2p_{7,91}+2p_{7,71}+2p_{7,39} \\ &+p_{6,23}+p_{7,79}+p_{7,111}+p_{7,95}+3p_{7,63}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,59} = \frac{1}{2}p_{7,59} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,59}^2 - 4(2p_{7,32}+p_{7,96}+2p_{7,48}+2p_{7,40}+p_{7,104}+3p_{7,88} \\ &+p_{6,56}+2p_{7,4}+3p_{7,36}+2p_{7,100}+p_{6,20}+2p_{7,52}+5p_{7,116}+2p_{6,28} \\ &+p_{7,60}+4p_{7,124}+p_{7,66}+2p_{7,34}+2p_{7,18}+p_{7,50}+2p_{7,10}+p_{7,74} \\ &+p_{6,42}+p_{7,26}+2p_{6,58}+p_{7,54}+2p_{7,118}+2p_{7,14}+p_{6,46}+p_{6,30} \\ &+p_{7,62}+2p_{7,126}+2p_{7,1}+p_{7,65}+2p_{7,97}+p_{6,17}+p_{7,49}+p_{7,73} \\ &+p_{7,41}+2p_{7,25}+p_{7,89}+2p_{7,5}+3p_{7,69}+4p_{7,37}+2p_{7,101}+p_{6,21} \\ &+p_{7,117}+p_{7,13}+4p_{7,45}+p_{7,29}+2p_{7,93}+p_{7,67}+2p_{6,35}+2p_{7,19} \\ &+p_{7,115}+p_{6,11}+p_{7,107}+2p_{7,59}+2p_{7,7}+2p_{7,39}+p_{6,55}+p_{7,79} \\ &+p_{7,47}+3p_{7,31}+2p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,187} = \frac{1}{2}p_{7,59} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,59}^2 - 4(2p_{7,32}+p_{7,96}+2p_{7,48}+2p_{7,40}+p_{7,104}+3p_{7,88} \\ &+p_{6,56}+2p_{7,4}+3p_{7,36}+2p_{7,100}+p_{6,20}+2p_{7,52}+5p_{7,116}+2p_{6,28} \\ &+p_{7,60}+4p_{7,124}+p_{7,66}+2p_{7,34}+2p_{7,18}+p_{7,50}+2p_{7,10}+p_{7,74} \\ &+p_{6,42}+p_{7,26}+2p_{6,58}+p_{7,54}+2p_{7,118}+2p_{7,14}+p_{6,46}+p_{6,30} \\ &+p_{7,62}+2p_{7,126}+2p_{7,1}+p_{7,65}+2p_{7,97}+p_{6,17}+p_{7,49}+p_{7,73} \\ &+p_{7,41}+2p_{7,25}+p_{7,89}+2p_{7,5}+3p_{7,69}+4p_{7,37}+2p_{7,101}+p_{6,21} \\ &+p_{7,117}+p_{7,13}+4p_{7,45}+p_{7,29}+2p_{7,93}+p_{7,67}+2p_{6,35}+2p_{7,19} \\ &+p_{7,115}+p_{6,11}+p_{7,107}+2p_{7,59}+2p_{7,7}+2p_{7,39}+p_{6,55}+p_{7,79} \\ &+p_{7,47}+3p_{7,31}+2p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,123} = \frac{1}{2}p_{7,123} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,123}^2 - 4(p_{7,32}+2p_{7,96}+2p_{7,112}+p_{7,40}+2p_{7,104}+3p_{7,24} \\ &+p_{6,56}+2p_{7,68}+2p_{7,36}+3p_{7,100}+p_{6,20}+5p_{7,52}+2p_{7,116} \\ &+2p_{6,28}+4p_{7,60}+p_{7,124}+p_{7,2}+2p_{7,98}+2p_{7,82}+p_{7,114}+p_{7,10} \\ &+2p_{7,74}+p_{6,42}+p_{7,90}+2p_{6,58}+2p_{7,54}+p_{7,118}+2p_{7,78}+p_{6,46} \\ &+p_{6,30}+2p_{7,62}+p_{7,126}+p_{7,1}+2p_{7,65}+2p_{7,33}+p_{6,17}+p_{7,113} \\ &+p_{7,9}+p_{7,105}+p_{7,25}+2p_{7,89}+3p_{7,5}+2p_{7,69}+2p_{7,37}+4p_{7,101} \\ &+p_{6,21}+p_{7,53}+p_{7,77}+4p_{7,109}+2p_{7,29}+p_{7,93}+p_{7,3}+2p_{6,35} \\ &+2p_{7,83}+p_{7,51}+p_{6,11}+p_{7,43}+2p_{7,123}+2p_{7,71}+2p_{7,103}+p_{6,55} \\ &+p_{7,15}+p_{7,111}+2p_{7,31}+3p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,251} = \frac{1}{2}p_{7,123} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,123}^2 - 4(p_{7,32}+2p_{7,96}+2p_{7,112}+p_{7,40}+2p_{7,104}+3p_{7,24} \\ &+p_{6,56}+2p_{7,68}+2p_{7,36}+3p_{7,100}+p_{6,20}+5p_{7,52}+2p_{7,116} \\ &+2p_{6,28}+4p_{7,60}+p_{7,124}+p_{7,2}+2p_{7,98}+2p_{7,82}+p_{7,114}+p_{7,10} \\ &+2p_{7,74}+p_{6,42}+p_{7,90}+2p_{6,58}+2p_{7,54}+p_{7,118}+2p_{7,78}+p_{6,46} \\ &+p_{6,30}+2p_{7,62}+p_{7,126}+p_{7,1}+2p_{7,65}+2p_{7,33}+p_{6,17}+p_{7,113} \\ &+p_{7,9}+p_{7,105}+p_{7,25}+2p_{7,89}+3p_{7,5}+2p_{7,69}+2p_{7,37}+4p_{7,101} \\ &+p_{6,21}+p_{7,53}+p_{7,77}+4p_{7,109}+2p_{7,29}+p_{7,93}+p_{7,3}+2p_{6,35} \\ &+2p_{7,83}+p_{7,51}+p_{6,11}+p_{7,43}+2p_{7,123}+2p_{7,71}+2p_{7,103}+p_{6,55} \\ &+p_{7,15}+p_{7,111}+2p_{7,31}+3p_{7,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,7} = \frac{1}{2}p_{7,7} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,7}^2 - 4(2p_{7,0}+5p_{7,64}+p_{6,32}+2p_{7,80}+2p_{7,48}+3p_{7,112} \\ &+p_{7,8}+4p_{7,72}+2p_{6,40}+p_{6,4}+3p_{7,36}+p_{7,52}+2p_{7,116}+p_{7,44} \\ &+2p_{7,108}+2p_{7,124}+p_{7,2}+2p_{7,66}+p_{7,10}+2p_{7,74}+p_{6,42}+2p_{7,90} \\ &+p_{6,58}+2p_{6,6}+p_{7,102}+p_{7,22}+2p_{7,86}+p_{6,54}+p_{7,14}+2p_{7,110} \\ &+2p_{7,94}+p_{7,126}+p_{7,65}+p_{6,33}+3p_{7,17}+2p_{7,81}+2p_{7,49}+4p_{7,113} \\ &+2p_{7,41}+p_{7,105}+p_{7,89}+4p_{7,121}+p_{7,37}+2p_{7,101}+p_{7,21}+p_{7,117} \\ &+p_{7,13}+2p_{7,77}+2p_{7,45}+p_{6,29}+p_{7,125}+p_{6,3}+2p_{7,83}+2p_{7,115} \\ &+p_{7,11}+2p_{7,43}+3p_{7,107}+p_{7,27}+p_{7,123}+2p_{7,7}+p_{6,23}+p_{7,55} \\ &+p_{7,15}+2p_{6,47}+2p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,135} = \frac{1}{2}p_{7,7} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,7}^2 - 4(2p_{7,0}+5p_{7,64}+p_{6,32}+2p_{7,80}+2p_{7,48}+3p_{7,112} \\ &+p_{7,8}+4p_{7,72}+2p_{6,40}+p_{6,4}+3p_{7,36}+p_{7,52}+2p_{7,116}+p_{7,44} \\ &+2p_{7,108}+2p_{7,124}+p_{7,2}+2p_{7,66}+p_{7,10}+2p_{7,74}+p_{6,42}+2p_{7,90} \\ &+p_{6,58}+2p_{6,6}+p_{7,102}+p_{7,22}+2p_{7,86}+p_{6,54}+p_{7,14}+2p_{7,110} \\ &+2p_{7,94}+p_{7,126}+p_{7,65}+p_{6,33}+3p_{7,17}+2p_{7,81}+2p_{7,49}+4p_{7,113} \\ &+2p_{7,41}+p_{7,105}+p_{7,89}+4p_{7,121}+p_{7,37}+2p_{7,101}+p_{7,21}+p_{7,117} \\ &+p_{7,13}+2p_{7,77}+2p_{7,45}+p_{6,29}+p_{7,125}+p_{6,3}+2p_{7,83}+2p_{7,115} \\ &+p_{7,11}+2p_{7,43}+3p_{7,107}+p_{7,27}+p_{7,123}+2p_{7,7}+p_{6,23}+p_{7,55} \\ &+p_{7,15}+2p_{6,47}+2p_{7,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,71} = \frac{1}{2}p_{7,71} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,71}^2 - 4(5p_{7,0}+2p_{7,64}+p_{6,32}+2p_{7,16}+3p_{7,48}+2p_{7,112} \\ &+4p_{7,8}+p_{7,72}+2p_{6,40}+p_{6,4}+3p_{7,100}+2p_{7,52}+p_{7,116}+2p_{7,44} \\ &+p_{7,108}+2p_{7,60}+2p_{7,2}+p_{7,66}+2p_{7,10}+p_{7,74}+p_{6,42}+2p_{7,26} \\ &+p_{6,58}+2p_{6,6}+p_{7,38}+2p_{7,22}+p_{7,86}+p_{6,54}+p_{7,78}+2p_{7,46} \\ &+2p_{7,30}+p_{7,62}+p_{7,1}+p_{6,33}+2p_{7,17}+3p_{7,81}+4p_{7,49}+2p_{7,113} \\ &+p_{7,41}+2p_{7,105}+p_{7,25}+4p_{7,57}+2p_{7,37}+p_{7,101}+p_{7,85}+p_{7,53} \\ &+2p_{7,13}+p_{7,77}+2p_{7,109}+p_{6,29}+p_{7,61}+p_{6,3}+2p_{7,19}+2p_{7,51} \\ &+p_{7,75}+3p_{7,43}+2p_{7,107}+p_{7,91}+p_{7,59}+2p_{7,71}+p_{6,23}+p_{7,119} \\ &+p_{7,79}+2p_{6,47}+2p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,199} = \frac{1}{2}p_{7,71} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,71}^2 - 4(5p_{7,0}+2p_{7,64}+p_{6,32}+2p_{7,16}+3p_{7,48}+2p_{7,112} \\ &+4p_{7,8}+p_{7,72}+2p_{6,40}+p_{6,4}+3p_{7,100}+2p_{7,52}+p_{7,116}+2p_{7,44} \\ &+p_{7,108}+2p_{7,60}+2p_{7,2}+p_{7,66}+2p_{7,10}+p_{7,74}+p_{6,42}+2p_{7,26} \\ &+p_{6,58}+2p_{6,6}+p_{7,38}+2p_{7,22}+p_{7,86}+p_{6,54}+p_{7,78}+2p_{7,46} \\ &+2p_{7,30}+p_{7,62}+p_{7,1}+p_{6,33}+2p_{7,17}+3p_{7,81}+4p_{7,49}+2p_{7,113} \\ &+p_{7,41}+2p_{7,105}+p_{7,25}+4p_{7,57}+2p_{7,37}+p_{7,101}+p_{7,85}+p_{7,53} \\ &+2p_{7,13}+p_{7,77}+2p_{7,109}+p_{6,29}+p_{7,61}+p_{6,3}+2p_{7,19}+2p_{7,51} \\ &+p_{7,75}+3p_{7,43}+2p_{7,107}+p_{7,91}+p_{7,59}+2p_{7,71}+p_{6,23}+p_{7,119} \\ &+p_{7,79}+2p_{6,47}+2p_{7,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,39} = \frac{1}{2}p_{7,39} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,39}^2 - 4(p_{6,0}+2p_{7,32}+5p_{7,96}+3p_{7,16}+2p_{7,80}+2p_{7,112} \\ &+2p_{6,8}+p_{7,40}+4p_{7,104}+3p_{7,68}+p_{6,36}+2p_{7,20}+p_{7,84}+2p_{7,12} \\ &+p_{7,76}+2p_{7,28}+p_{7,34}+2p_{7,98}+p_{6,10}+p_{7,42}+2p_{7,106}+p_{6,26} \\ &+2p_{7,122}+p_{7,6}+2p_{6,38}+p_{6,22}+p_{7,54}+2p_{7,118}+2p_{7,14}+p_{7,46} \\ &+p_{7,30}+2p_{7,126}+p_{6,1}+p_{7,97}+4p_{7,17}+2p_{7,81}+3p_{7,49}+2p_{7,113} \\ &+p_{7,9}+2p_{7,73}+4p_{7,25}+p_{7,121}+2p_{7,5}+p_{7,69}+p_{7,21}+p_{7,53} \\ &+2p_{7,77}+p_{7,45}+2p_{7,109}+p_{7,29}+p_{6,61}+p_{6,35}+2p_{7,19}+2p_{7,115} \\ &+3p_{7,11}+2p_{7,75}+p_{7,43}+p_{7,27}+p_{7,59}+2p_{7,39}+p_{7,87}+p_{6,55} \\ &+2p_{6,15}+p_{7,47}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,167} = \frac{1}{2}p_{7,39} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,39}^2 - 4(p_{6,0}+2p_{7,32}+5p_{7,96}+3p_{7,16}+2p_{7,80}+2p_{7,112} \\ &+2p_{6,8}+p_{7,40}+4p_{7,104}+3p_{7,68}+p_{6,36}+2p_{7,20}+p_{7,84}+2p_{7,12} \\ &+p_{7,76}+2p_{7,28}+p_{7,34}+2p_{7,98}+p_{6,10}+p_{7,42}+2p_{7,106}+p_{6,26} \\ &+2p_{7,122}+p_{7,6}+2p_{6,38}+p_{6,22}+p_{7,54}+2p_{7,118}+2p_{7,14}+p_{7,46} \\ &+p_{7,30}+2p_{7,126}+p_{6,1}+p_{7,97}+4p_{7,17}+2p_{7,81}+3p_{7,49}+2p_{7,113} \\ &+p_{7,9}+2p_{7,73}+4p_{7,25}+p_{7,121}+2p_{7,5}+p_{7,69}+p_{7,21}+p_{7,53} \\ &+2p_{7,77}+p_{7,45}+2p_{7,109}+p_{7,29}+p_{6,61}+p_{6,35}+2p_{7,19}+2p_{7,115} \\ &+3p_{7,11}+2p_{7,75}+p_{7,43}+p_{7,27}+p_{7,59}+2p_{7,39}+p_{7,87}+p_{6,55} \\ &+2p_{6,15}+p_{7,47}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,103} = \frac{1}{2}p_{7,103} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,103}^2 - 4(p_{6,0}+5p_{7,32}+2p_{7,96}+2p_{7,16}+3p_{7,80}+2p_{7,48} \\ &+2p_{6,8}+4p_{7,40}+p_{7,104}+3p_{7,4}+p_{6,36}+p_{7,20}+2p_{7,84}+p_{7,12} \\ &+2p_{7,76}+2p_{7,92}+2p_{7,34}+p_{7,98}+p_{6,10}+2p_{7,42}+p_{7,106}+p_{6,26} \\ &+2p_{7,58}+p_{7,70}+2p_{6,38}+p_{6,22}+2p_{7,54}+p_{7,118}+2p_{7,78}+p_{7,110} \\ &+p_{7,94}+2p_{7,62}+p_{6,1}+p_{7,33}+2p_{7,17}+4p_{7,81}+2p_{7,49}+3p_{7,113} \\ &+2p_{7,9}+p_{7,73}+4p_{7,89}+p_{7,57}+p_{7,5}+2p_{7,69}+p_{7,85}+p_{7,117} \\ &+2p_{7,13}+2p_{7,45}+p_{7,109}+p_{7,93}+p_{6,61}+p_{6,35}+2p_{7,83}+2p_{7,51} \\ &+2p_{7,11}+3p_{7,75}+p_{7,107}+p_{7,91}+p_{7,123}+2p_{7,103}+p_{7,23}+p_{6,55} \\ &+2p_{6,15}+p_{7,111}+p_{7,31}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,231} = \frac{1}{2}p_{7,103} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,103}^2 - 4(p_{6,0}+5p_{7,32}+2p_{7,96}+2p_{7,16}+3p_{7,80}+2p_{7,48} \\ &+2p_{6,8}+4p_{7,40}+p_{7,104}+3p_{7,4}+p_{6,36}+p_{7,20}+2p_{7,84}+p_{7,12} \\ &+2p_{7,76}+2p_{7,92}+2p_{7,34}+p_{7,98}+p_{6,10}+2p_{7,42}+p_{7,106}+p_{6,26} \\ &+2p_{7,58}+p_{7,70}+2p_{6,38}+p_{6,22}+2p_{7,54}+p_{7,118}+2p_{7,78}+p_{7,110} \\ &+p_{7,94}+2p_{7,62}+p_{6,1}+p_{7,33}+2p_{7,17}+4p_{7,81}+2p_{7,49}+3p_{7,113} \\ &+2p_{7,9}+p_{7,73}+4p_{7,89}+p_{7,57}+p_{7,5}+2p_{7,69}+p_{7,85}+p_{7,117} \\ &+2p_{7,13}+2p_{7,45}+p_{7,109}+p_{7,93}+p_{6,61}+p_{6,35}+2p_{7,83}+2p_{7,51} \\ &+2p_{7,11}+3p_{7,75}+p_{7,107}+p_{7,91}+p_{7,123}+2p_{7,103}+p_{7,23}+p_{6,55} \\ &+2p_{6,15}+p_{7,111}+p_{7,31}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,23} = \frac{1}{2}p_{7,23} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,23}^2 - 4(3p_{7,0}+2p_{7,64}+2p_{7,96}+2p_{7,16}+5p_{7,80}+p_{6,48} \\ &+p_{7,24}+4p_{7,88}+2p_{6,56}+2p_{7,4}+p_{7,68}+p_{6,20}+3p_{7,52}+2p_{7,12} \\ &+p_{7,60}+2p_{7,124}+p_{7,18}+2p_{7,82}+p_{6,10}+2p_{7,106}+p_{7,26}+2p_{7,90} \\ &+p_{6,58}+p_{6,6}+p_{7,38}+2p_{7,102}+2p_{6,22}+p_{7,118}+p_{7,14}+2p_{7,110} \\ &+p_{7,30}+2p_{7,126}+4p_{7,1}+2p_{7,65}+3p_{7,33}+2p_{7,97}+p_{7,81}+p_{6,49} \\ &+4p_{7,9}+p_{7,105}+2p_{7,57}+p_{7,121}+p_{7,5}+p_{7,37}+p_{7,53}+2p_{7,117} \\ &+p_{7,13}+p_{6,45}+p_{7,29}+2p_{7,93}+2p_{7,61}+2p_{7,3}+2p_{7,99}+p_{6,19} \\ &+p_{7,11}+p_{7,43}+p_{7,27}+2p_{7,59}+3p_{7,123}+p_{7,71}+p_{6,39}+2p_{7,23} \\ &+p_{7,79}+2p_{7,111}+p_{7,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,151} = \frac{1}{2}p_{7,23} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,23}^2 - 4(3p_{7,0}+2p_{7,64}+2p_{7,96}+2p_{7,16}+5p_{7,80}+p_{6,48} \\ &+p_{7,24}+4p_{7,88}+2p_{6,56}+2p_{7,4}+p_{7,68}+p_{6,20}+3p_{7,52}+2p_{7,12} \\ &+p_{7,60}+2p_{7,124}+p_{7,18}+2p_{7,82}+p_{6,10}+2p_{7,106}+p_{7,26}+2p_{7,90} \\ &+p_{6,58}+p_{6,6}+p_{7,38}+2p_{7,102}+2p_{6,22}+p_{7,118}+p_{7,14}+2p_{7,110} \\ &+p_{7,30}+2p_{7,126}+4p_{7,1}+2p_{7,65}+3p_{7,33}+2p_{7,97}+p_{7,81}+p_{6,49} \\ &+4p_{7,9}+p_{7,105}+2p_{7,57}+p_{7,121}+p_{7,5}+p_{7,37}+p_{7,53}+2p_{7,117} \\ &+p_{7,13}+p_{6,45}+p_{7,29}+2p_{7,93}+2p_{7,61}+2p_{7,3}+2p_{7,99}+p_{6,19} \\ &+p_{7,11}+p_{7,43}+p_{7,27}+2p_{7,59}+3p_{7,123}+p_{7,71}+p_{6,39}+2p_{7,23} \\ &+p_{7,79}+2p_{7,111}+p_{7,31}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,87} = \frac{1}{2}p_{7,87} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,87}^2 - 4(2p_{7,0}+3p_{7,64}+2p_{7,32}+5p_{7,16}+2p_{7,80}+p_{6,48} \\ &+4p_{7,24}+p_{7,88}+2p_{6,56}+p_{7,4}+2p_{7,68}+p_{6,20}+3p_{7,116}+2p_{7,76} \\ &+2p_{7,60}+p_{7,124}+2p_{7,18}+p_{7,82}+p_{6,10}+2p_{7,42}+2p_{7,26}+p_{7,90} \\ &+p_{6,58}+p_{6,6}+2p_{7,38}+p_{7,102}+2p_{6,22}+p_{7,54}+p_{7,78}+2p_{7,46} \\ &+p_{7,94}+2p_{7,62}+2p_{7,1}+4p_{7,65}+2p_{7,33}+3p_{7,97}+p_{7,17}+p_{6,49} \\ &+4p_{7,73}+p_{7,41}+p_{7,57}+2p_{7,121}+p_{7,69}+p_{7,101}+2p_{7,53}+p_{7,117} \\ &+p_{7,77}+p_{6,45}+2p_{7,29}+p_{7,93}+2p_{7,125}+2p_{7,67}+2p_{7,35}+p_{6,19} \\ &+p_{7,75}+p_{7,107}+p_{7,91}+3p_{7,59}+2p_{7,123}+p_{7,7}+p_{6,39}+2p_{7,87} \\ &+p_{7,15}+2p_{7,47}+p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,215} = \frac{1}{2}p_{7,87} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,87}^2 - 4(2p_{7,0}+3p_{7,64}+2p_{7,32}+5p_{7,16}+2p_{7,80}+p_{6,48} \\ &+4p_{7,24}+p_{7,88}+2p_{6,56}+p_{7,4}+2p_{7,68}+p_{6,20}+3p_{7,116}+2p_{7,76} \\ &+2p_{7,60}+p_{7,124}+2p_{7,18}+p_{7,82}+p_{6,10}+2p_{7,42}+2p_{7,26}+p_{7,90} \\ &+p_{6,58}+p_{6,6}+2p_{7,38}+p_{7,102}+2p_{6,22}+p_{7,54}+p_{7,78}+2p_{7,46} \\ &+p_{7,94}+2p_{7,62}+2p_{7,1}+4p_{7,65}+2p_{7,33}+3p_{7,97}+p_{7,17}+p_{6,49} \\ &+4p_{7,73}+p_{7,41}+p_{7,57}+2p_{7,121}+p_{7,69}+p_{7,101}+2p_{7,53}+p_{7,117} \\ &+p_{7,77}+p_{6,45}+2p_{7,29}+p_{7,93}+2p_{7,125}+2p_{7,67}+2p_{7,35}+p_{6,19} \\ &+p_{7,75}+p_{7,107}+p_{7,91}+3p_{7,59}+2p_{7,123}+p_{7,7}+p_{6,39}+2p_{7,87} \\ &+p_{7,15}+2p_{7,47}+p_{7,95}+2p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,55} = \frac{1}{2}p_{7,55} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,55}^2 - 4(2p_{7,0}+3p_{7,32}+2p_{7,96}+p_{6,16}+2p_{7,48}+5p_{7,112} \\ &+2p_{6,24}+p_{7,56}+4p_{7,120}+2p_{7,36}+p_{7,100}+3p_{7,84}+p_{6,52} \\ &+2p_{7,44}+2p_{7,28}+p_{7,92}+p_{7,50}+2p_{7,114}+2p_{7,10}+p_{6,42}+p_{6,26} \\ &+p_{7,58}+2p_{7,122}+2p_{7,6}+p_{7,70}+p_{6,38}+p_{7,22}+2p_{6,54}+2p_{7,14} \\ &+p_{7,46}+2p_{7,30}+p_{7,62}+2p_{7,1}+3p_{7,65}+4p_{7,33}+2p_{7,97}+p_{6,17} \\ &+p_{7,113}+p_{7,9}+4p_{7,41}+p_{7,25}+2p_{7,89}+p_{7,69}+p_{7,37}+2p_{7,21} \\ &+p_{7,85}+p_{6,13}+p_{7,45}+2p_{7,93}+p_{7,61}+2p_{7,125}+2p_{7,3}+2p_{7,35} \\ &+p_{6,51}+p_{7,75}+p_{7,43}+3p_{7,27}+2p_{7,91}+p_{7,59}+p_{6,7}+p_{7,103} \\ &+2p_{7,55}+2p_{7,15}+p_{7,111}+2p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,183} = \frac{1}{2}p_{7,55} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,55}^2 - 4(2p_{7,0}+3p_{7,32}+2p_{7,96}+p_{6,16}+2p_{7,48}+5p_{7,112} \\ &+2p_{6,24}+p_{7,56}+4p_{7,120}+2p_{7,36}+p_{7,100}+3p_{7,84}+p_{6,52} \\ &+2p_{7,44}+2p_{7,28}+p_{7,92}+p_{7,50}+2p_{7,114}+2p_{7,10}+p_{6,42}+p_{6,26} \\ &+p_{7,58}+2p_{7,122}+2p_{7,6}+p_{7,70}+p_{6,38}+p_{7,22}+2p_{6,54}+2p_{7,14} \\ &+p_{7,46}+2p_{7,30}+p_{7,62}+2p_{7,1}+3p_{7,65}+4p_{7,33}+2p_{7,97}+p_{6,17} \\ &+p_{7,113}+p_{7,9}+4p_{7,41}+p_{7,25}+2p_{7,89}+p_{7,69}+p_{7,37}+2p_{7,21} \\ &+p_{7,85}+p_{6,13}+p_{7,45}+2p_{7,93}+p_{7,61}+2p_{7,125}+2p_{7,3}+2p_{7,35} \\ &+p_{6,51}+p_{7,75}+p_{7,43}+3p_{7,27}+2p_{7,91}+p_{7,59}+p_{6,7}+p_{7,103} \\ &+2p_{7,55}+2p_{7,15}+p_{7,111}+2p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,119} = \frac{1}{2}p_{7,119} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,119}^2 - 4(2p_{7,64}+2p_{7,32}+3p_{7,96}+p_{6,16}+5p_{7,48}+2p_{7,112} \\ &+2p_{6,24}+4p_{7,56}+p_{7,120}+p_{7,36}+2p_{7,100}+3p_{7,20}+p_{6,52} \\ &+2p_{7,108}+p_{7,28}+2p_{7,92}+2p_{7,50}+p_{7,114}+2p_{7,74}+p_{6,42}+p_{6,26} \\ &+2p_{7,58}+p_{7,122}+p_{7,6}+2p_{7,70}+p_{6,38}+p_{7,86}+2p_{6,54}+2p_{7,78} \\ &+p_{7,110}+2p_{7,94}+p_{7,126}+3p_{7,1}+2p_{7,65}+2p_{7,33}+4p_{7,97}+p_{6,17} \\ &+p_{7,49}+p_{7,73}+4p_{7,105}+2p_{7,25}+p_{7,89}+p_{7,5}+p_{7,101}+p_{7,21} \\ &+2p_{7,85}+p_{6,13}+p_{7,109}+2p_{7,29}+2p_{7,61}+p_{7,125}+2p_{7,67}+2p_{7,99} \\ &+p_{6,51}+p_{7,11}+p_{7,107}+2p_{7,27}+3p_{7,91}+p_{7,123}+p_{6,7}+p_{7,39} \\ &+2p_{7,119}+2p_{7,79}+p_{7,47}+2p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,247} = \frac{1}{2}p_{7,119} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,119}^2 - 4(2p_{7,64}+2p_{7,32}+3p_{7,96}+p_{6,16}+5p_{7,48}+2p_{7,112} \\ &+2p_{6,24}+4p_{7,56}+p_{7,120}+p_{7,36}+2p_{7,100}+3p_{7,20}+p_{6,52} \\ &+2p_{7,108}+p_{7,28}+2p_{7,92}+2p_{7,50}+p_{7,114}+2p_{7,74}+p_{6,42}+p_{6,26} \\ &+2p_{7,58}+p_{7,122}+p_{7,6}+2p_{7,70}+p_{6,38}+p_{7,86}+2p_{6,54}+2p_{7,78} \\ &+p_{7,110}+2p_{7,94}+p_{7,126}+3p_{7,1}+2p_{7,65}+2p_{7,33}+4p_{7,97}+p_{6,17} \\ &+p_{7,49}+p_{7,73}+4p_{7,105}+2p_{7,25}+p_{7,89}+p_{7,5}+p_{7,101}+p_{7,21} \\ &+2p_{7,85}+p_{6,13}+p_{7,109}+2p_{7,29}+2p_{7,61}+p_{7,125}+2p_{7,67}+2p_{7,99} \\ &+p_{6,51}+p_{7,11}+p_{7,107}+2p_{7,27}+3p_{7,91}+p_{7,123}+p_{6,7}+p_{7,39} \\ &+2p_{7,119}+2p_{7,79}+p_{7,47}+2p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,15} = \frac{1}{2}p_{7,15} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,15}^2 - 4(p_{7,16}+4p_{7,80}+2p_{6,48}+2p_{7,8}+5p_{7,72}+p_{6,40} \\ &+2p_{7,88}+2p_{7,56}+3p_{7,120}+2p_{7,4}+p_{7,52}+2p_{7,116}+p_{6,12}+3p_{7,44} \\ &+p_{7,60}+2p_{7,124}+p_{6,2}+2p_{7,98}+p_{7,18}+2p_{7,82}+p_{6,50}+p_{7,10} \\ &+2p_{7,74}+p_{7,6}+2p_{7,102}+p_{7,22}+2p_{7,118}+2p_{6,14}+p_{7,110}+p_{7,30} \\ &+2p_{7,94}+p_{6,62}+4p_{7,1}+p_{7,97}+2p_{7,49}+p_{7,113}+p_{7,73}+p_{6,41} \\ &+3p_{7,25}+2p_{7,89}+2p_{7,57}+4p_{7,121}+p_{7,5}+p_{6,37}+p_{7,21}+2p_{7,85} \\ &+2p_{7,53}+p_{7,45}+2p_{7,109}+p_{7,29}+p_{7,125}+p_{7,3}+p_{7,35}+p_{7,19} \\ &+2p_{7,51}+3p_{7,115}+p_{6,11}+2p_{7,91}+2p_{7,123}+p_{7,71}+2p_{7,103} \\ &+p_{7,23}+2p_{6,55}+2p_{7,15}+p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,143} = \frac{1}{2}p_{7,15} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,15}^2 - 4(p_{7,16}+4p_{7,80}+2p_{6,48}+2p_{7,8}+5p_{7,72}+p_{6,40} \\ &+2p_{7,88}+2p_{7,56}+3p_{7,120}+2p_{7,4}+p_{7,52}+2p_{7,116}+p_{6,12}+3p_{7,44} \\ &+p_{7,60}+2p_{7,124}+p_{6,2}+2p_{7,98}+p_{7,18}+2p_{7,82}+p_{6,50}+p_{7,10} \\ &+2p_{7,74}+p_{7,6}+2p_{7,102}+p_{7,22}+2p_{7,118}+2p_{6,14}+p_{7,110}+p_{7,30} \\ &+2p_{7,94}+p_{6,62}+4p_{7,1}+p_{7,97}+2p_{7,49}+p_{7,113}+p_{7,73}+p_{6,41} \\ &+3p_{7,25}+2p_{7,89}+2p_{7,57}+4p_{7,121}+p_{7,5}+p_{6,37}+p_{7,21}+2p_{7,85} \\ &+2p_{7,53}+p_{7,45}+2p_{7,109}+p_{7,29}+p_{7,125}+p_{7,3}+p_{7,35}+p_{7,19} \\ &+2p_{7,51}+3p_{7,115}+p_{6,11}+2p_{7,91}+2p_{7,123}+p_{7,71}+2p_{7,103} \\ &+p_{7,23}+2p_{6,55}+2p_{7,15}+p_{6,31}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,79} = \frac{1}{2}p_{7,79} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,79}^2 - 4(4p_{7,16}+p_{7,80}+2p_{6,48}+5p_{7,8}+2p_{7,72}+p_{6,40} \\ &+2p_{7,24}+3p_{7,56}+2p_{7,120}+2p_{7,68}+2p_{7,52}+p_{7,116}+p_{6,12} \\ &+3p_{7,108}+2p_{7,60}+p_{7,124}+p_{6,2}+2p_{7,34}+2p_{7,18}+p_{7,82}+p_{6,50} \\ &+2p_{7,10}+p_{7,74}+p_{7,70}+2p_{7,38}+p_{7,86}+2p_{7,54}+2p_{6,14}+p_{7,46} \\ &+2p_{7,30}+p_{7,94}+p_{6,62}+4p_{7,65}+p_{7,33}+p_{7,49}+2p_{7,113}+p_{7,9} \\ &+p_{6,41}+2p_{7,25}+3p_{7,89}+4p_{7,57}+2p_{7,121}+p_{7,69}+p_{6,37}+2p_{7,21} \\ &+p_{7,85}+2p_{7,117}+2p_{7,45}+p_{7,109}+p_{7,93}+p_{7,61}+p_{7,67}+p_{7,99} \\ &+p_{7,83}+3p_{7,51}+2p_{7,115}+p_{6,11}+2p_{7,27}+2p_{7,59}+p_{7,7}+2p_{7,39} \\ &+p_{7,87}+2p_{6,55}+2p_{7,79}+p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,207} = \frac{1}{2}p_{7,79} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,79}^2 - 4(4p_{7,16}+p_{7,80}+2p_{6,48}+5p_{7,8}+2p_{7,72}+p_{6,40} \\ &+2p_{7,24}+3p_{7,56}+2p_{7,120}+2p_{7,68}+2p_{7,52}+p_{7,116}+p_{6,12} \\ &+3p_{7,108}+2p_{7,60}+p_{7,124}+p_{6,2}+2p_{7,34}+2p_{7,18}+p_{7,82}+p_{6,50} \\ &+2p_{7,10}+p_{7,74}+p_{7,70}+2p_{7,38}+p_{7,86}+2p_{7,54}+2p_{6,14}+p_{7,46} \\ &+2p_{7,30}+p_{7,94}+p_{6,62}+4p_{7,65}+p_{7,33}+p_{7,49}+2p_{7,113}+p_{7,9} \\ &+p_{6,41}+2p_{7,25}+3p_{7,89}+4p_{7,57}+2p_{7,121}+p_{7,69}+p_{6,37}+2p_{7,21} \\ &+p_{7,85}+2p_{7,117}+2p_{7,45}+p_{7,109}+p_{7,93}+p_{7,61}+p_{7,67}+p_{7,99} \\ &+p_{7,83}+3p_{7,51}+2p_{7,115}+p_{6,11}+2p_{7,27}+2p_{7,59}+p_{7,7}+2p_{7,39} \\ &+p_{7,87}+2p_{6,55}+2p_{7,79}+p_{6,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,47} = \frac{1}{2}p_{7,47} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,47}^2 - 4(2p_{6,16}+p_{7,48}+4p_{7,112}+p_{6,8}+2p_{7,40}+5p_{7,104} \\ &+3p_{7,24}+2p_{7,88}+2p_{7,120}+2p_{7,36}+2p_{7,20}+p_{7,84}+3p_{7,76} \\ &+p_{6,44}+2p_{7,28}+p_{7,92}+2p_{7,2}+p_{6,34}+p_{6,18}+p_{7,50}+2p_{7,114} \\ &+p_{7,42}+2p_{7,106}+2p_{7,6}+p_{7,38}+2p_{7,22}+p_{7,54}+p_{7,14}+2p_{6,46} \\ &+p_{6,30}+p_{7,62}+2p_{7,126}+p_{7,1}+4p_{7,33}+p_{7,17}+2p_{7,81}+p_{6,9} \\ &+p_{7,105}+4p_{7,25}+2p_{7,89}+3p_{7,57}+2p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,85} \\ &+p_{7,53}+2p_{7,117}+2p_{7,13}+p_{7,77}+p_{7,29}+p_{7,61}+p_{7,67}+p_{7,35} \\ &+3p_{7,19}+2p_{7,83}+p_{7,51}+p_{6,43}+2p_{7,27}+2p_{7,123}+2p_{7,7}+p_{7,103} \\ &+2p_{6,23}+p_{7,55}+2p_{7,47}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,175} = \frac{1}{2}p_{7,47} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,47}^2 - 4(2p_{6,16}+p_{7,48}+4p_{7,112}+p_{6,8}+2p_{7,40}+5p_{7,104} \\ &+3p_{7,24}+2p_{7,88}+2p_{7,120}+2p_{7,36}+2p_{7,20}+p_{7,84}+3p_{7,76} \\ &+p_{6,44}+2p_{7,28}+p_{7,92}+2p_{7,2}+p_{6,34}+p_{6,18}+p_{7,50}+2p_{7,114} \\ &+p_{7,42}+2p_{7,106}+2p_{7,6}+p_{7,38}+2p_{7,22}+p_{7,54}+p_{7,14}+2p_{6,46} \\ &+p_{6,30}+p_{7,62}+2p_{7,126}+p_{7,1}+4p_{7,33}+p_{7,17}+2p_{7,81}+p_{6,9} \\ &+p_{7,105}+4p_{7,25}+2p_{7,89}+3p_{7,57}+2p_{7,121}+p_{6,5}+p_{7,37}+2p_{7,85} \\ &+p_{7,53}+2p_{7,117}+2p_{7,13}+p_{7,77}+p_{7,29}+p_{7,61}+p_{7,67}+p_{7,35} \\ &+3p_{7,19}+2p_{7,83}+p_{7,51}+p_{6,43}+2p_{7,27}+2p_{7,123}+2p_{7,7}+p_{7,103} \\ &+2p_{6,23}+p_{7,55}+2p_{7,47}+p_{7,95}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,111} = \frac{1}{2}p_{7,111} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,111}^2 - 4(2p_{6,16}+4p_{7,48}+p_{7,112}+p_{6,8}+5p_{7,40}+2p_{7,104} \\ &+2p_{7,24}+3p_{7,88}+2p_{7,56}+2p_{7,100}+p_{7,20}+2p_{7,84}+3p_{7,12}+p_{6,44} \\ &+p_{7,28}+2p_{7,92}+2p_{7,66}+p_{6,34}+p_{6,18}+2p_{7,50}+p_{7,114}+2p_{7,42} \\ &+p_{7,106}+2p_{7,70}+p_{7,102}+2p_{7,86}+p_{7,118}+p_{7,78}+2p_{6,46}+p_{6,30} \\ &+2p_{7,62}+p_{7,126}+p_{7,65}+4p_{7,97}+2p_{7,17}+p_{7,81}+p_{6,9}+p_{7,41} \\ &+2p_{7,25}+4p_{7,89}+2p_{7,57}+3p_{7,121}+p_{6,5}+p_{7,101}+2p_{7,21}+2p_{7,53} \\ &+p_{7,117}+p_{7,13}+2p_{7,77}+p_{7,93}+p_{7,125}+p_{7,3}+p_{7,99}+2p_{7,19} \\ &+3p_{7,83}+p_{7,115}+p_{6,43}+2p_{7,91}+2p_{7,59}+2p_{7,71}+p_{7,39}+2p_{6,23} \\ &+p_{7,119}+2p_{7,111}+p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,239} = \frac{1}{2}p_{7,111} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,111}^2 - 4(2p_{6,16}+4p_{7,48}+p_{7,112}+p_{6,8}+5p_{7,40}+2p_{7,104} \\ &+2p_{7,24}+3p_{7,88}+2p_{7,56}+2p_{7,100}+p_{7,20}+2p_{7,84}+3p_{7,12}+p_{6,44} \\ &+p_{7,28}+2p_{7,92}+2p_{7,66}+p_{6,34}+p_{6,18}+2p_{7,50}+p_{7,114}+2p_{7,42} \\ &+p_{7,106}+2p_{7,70}+p_{7,102}+2p_{7,86}+p_{7,118}+p_{7,78}+2p_{6,46}+p_{6,30} \\ &+2p_{7,62}+p_{7,126}+p_{7,65}+4p_{7,97}+2p_{7,17}+p_{7,81}+p_{6,9}+p_{7,41} \\ &+2p_{7,25}+4p_{7,89}+2p_{7,57}+3p_{7,121}+p_{6,5}+p_{7,101}+2p_{7,21}+2p_{7,53} \\ &+p_{7,117}+p_{7,13}+2p_{7,77}+p_{7,93}+p_{7,125}+p_{7,3}+p_{7,99}+2p_{7,19} \\ &+3p_{7,83}+p_{7,115}+p_{6,43}+2p_{7,91}+2p_{7,59}+2p_{7,71}+p_{7,39}+2p_{6,23} \\ &+p_{7,119}+2p_{7,111}+p_{7,31}+p_{6,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,31} = \frac{1}{2}p_{7,31} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,31}^2 - 4(2p_{6,0}+p_{7,32}+4p_{7,96}+3p_{7,8}+2p_{7,72}+2p_{7,104} \\ &+2p_{7,24}+5p_{7,88}+p_{6,56}+2p_{7,4}+p_{7,68}+2p_{7,20}+2p_{7,12}+p_{7,76} \\ &+p_{6,28}+3p_{7,60}+p_{6,2}+p_{7,34}+2p_{7,98}+p_{6,18}+2p_{7,114}+p_{7,26} \\ &+2p_{7,90}+2p_{7,6}+p_{7,38}+p_{7,22}+2p_{7,118}+p_{6,14}+p_{7,46}+2p_{7,110} \\ &+2p_{6,30}+p_{7,126}+p_{7,1}+2p_{7,65}+4p_{7,17}+p_{7,113}+4p_{7,9}+2p_{7,73} \\ &+3p_{7,41}+2p_{7,105}+p_{7,89}+p_{6,57}+2p_{7,69}+p_{7,37}+2p_{7,101}+p_{7,21} \\ &+p_{6,53}+p_{7,13}+p_{7,45}+p_{7,61}+2p_{7,125}+3p_{7,3}+2p_{7,67}+p_{7,35} \\ &+p_{7,19}+p_{7,51}+2p_{7,11}+2p_{7,107}+p_{6,27}+2p_{6,7}+p_{7,39}+p_{7,87} \\ &+2p_{7,119}+p_{7,79}+p_{6,47}+2p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,159} = \frac{1}{2}p_{7,31} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,31}^2 - 4(2p_{6,0}+p_{7,32}+4p_{7,96}+3p_{7,8}+2p_{7,72}+2p_{7,104} \\ &+2p_{7,24}+5p_{7,88}+p_{6,56}+2p_{7,4}+p_{7,68}+2p_{7,20}+2p_{7,12}+p_{7,76} \\ &+p_{6,28}+3p_{7,60}+p_{6,2}+p_{7,34}+2p_{7,98}+p_{6,18}+2p_{7,114}+p_{7,26} \\ &+2p_{7,90}+2p_{7,6}+p_{7,38}+p_{7,22}+2p_{7,118}+p_{6,14}+p_{7,46}+2p_{7,110} \\ &+2p_{6,30}+p_{7,126}+p_{7,1}+2p_{7,65}+4p_{7,17}+p_{7,113}+4p_{7,9}+2p_{7,73} \\ &+3p_{7,41}+2p_{7,105}+p_{7,89}+p_{6,57}+2p_{7,69}+p_{7,37}+2p_{7,101}+p_{7,21} \\ &+p_{6,53}+p_{7,13}+p_{7,45}+p_{7,61}+2p_{7,125}+3p_{7,3}+2p_{7,67}+p_{7,35} \\ &+p_{7,19}+p_{7,51}+2p_{7,11}+2p_{7,107}+p_{6,27}+2p_{6,7}+p_{7,39}+p_{7,87} \\ &+2p_{7,119}+p_{7,79}+p_{6,47}+2p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,95} = \frac{1}{2}p_{7,95} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,95}^2 - 4(2p_{6,0}+4p_{7,32}+p_{7,96}+2p_{7,8}+3p_{7,72}+2p_{7,40} \\ &+5p_{7,24}+2p_{7,88}+p_{6,56}+p_{7,4}+2p_{7,68}+2p_{7,84}+p_{7,12}+2p_{7,76} \\ &+p_{6,28}+3p_{7,124}+p_{6,2}+2p_{7,34}+p_{7,98}+p_{6,18}+2p_{7,50}+2p_{7,26} \\ &+p_{7,90}+2p_{7,70}+p_{7,102}+p_{7,86}+2p_{7,54}+p_{6,14}+2p_{7,46}+p_{7,110} \\ &+2p_{6,30}+p_{7,62}+2p_{7,1}+p_{7,65}+4p_{7,81}+p_{7,49}+2p_{7,9}+4p_{7,73} \\ &+2p_{7,41}+3p_{7,105}+p_{7,25}+p_{6,57}+2p_{7,5}+2p_{7,37}+p_{7,101}+p_{7,85} \\ &+p_{6,53}+p_{7,77}+p_{7,109}+2p_{7,61}+p_{7,125}+2p_{7,3}+3p_{7,67}+p_{7,99} \\ &+p_{7,83}+p_{7,115}+2p_{7,75}+2p_{7,43}+p_{6,27}+2p_{6,7}+p_{7,103}+p_{7,23} \\ &+2p_{7,55}+p_{7,15}+p_{6,47}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,223} = \frac{1}{2}p_{7,95} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,95}^2 - 4(2p_{6,0}+4p_{7,32}+p_{7,96}+2p_{7,8}+3p_{7,72}+2p_{7,40} \\ &+5p_{7,24}+2p_{7,88}+p_{6,56}+p_{7,4}+2p_{7,68}+2p_{7,84}+p_{7,12}+2p_{7,76} \\ &+p_{6,28}+3p_{7,124}+p_{6,2}+2p_{7,34}+p_{7,98}+p_{6,18}+2p_{7,50}+2p_{7,26} \\ &+p_{7,90}+2p_{7,70}+p_{7,102}+p_{7,86}+2p_{7,54}+p_{6,14}+2p_{7,46}+p_{7,110} \\ &+2p_{6,30}+p_{7,62}+2p_{7,1}+p_{7,65}+4p_{7,81}+p_{7,49}+2p_{7,9}+4p_{7,73} \\ &+2p_{7,41}+3p_{7,105}+p_{7,25}+p_{6,57}+2p_{7,5}+2p_{7,37}+p_{7,101}+p_{7,85} \\ &+p_{6,53}+p_{7,77}+p_{7,109}+2p_{7,61}+p_{7,125}+2p_{7,3}+3p_{7,67}+p_{7,99} \\ &+p_{7,83}+p_{7,115}+2p_{7,75}+2p_{7,43}+p_{6,27}+2p_{6,7}+p_{7,103}+p_{7,23} \\ &+2p_{7,55}+p_{7,15}+p_{6,47}+2p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,63} = \frac{1}{2}p_{7,63} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,63}^2 - 4(4p_{7,0}+p_{7,64}+2p_{6,32}+2p_{7,8}+3p_{7,40}+2p_{7,104} \\ &+p_{6,24}+2p_{7,56}+5p_{7,120}+2p_{7,36}+p_{7,100}+2p_{7,52}+2p_{7,44} \\ &+p_{7,108}+3p_{7,92}+p_{6,60}+2p_{7,2}+p_{7,66}+p_{6,34}+2p_{7,18}+p_{6,50} \\ &+p_{7,58}+2p_{7,122}+p_{7,70}+2p_{7,38}+2p_{7,22}+p_{7,54}+2p_{7,14}+p_{7,78} \\ &+p_{6,46}+p_{7,30}+2p_{6,62}+p_{7,33}+2p_{7,97}+p_{7,17}+4p_{7,49}+2p_{7,9} \\ &+3p_{7,73}+4p_{7,41}+2p_{7,105}+p_{6,25}+p_{7,121}+2p_{7,5}+p_{7,69}+2p_{7,101} \\ &+p_{6,21}+p_{7,53}+p_{7,77}+p_{7,45}+2p_{7,29}+p_{7,93}+p_{7,67}+3p_{7,35} \\ &+2p_{7,99}+p_{7,83}+p_{7,51}+2p_{7,11}+2p_{7,43}+p_{6,59}+p_{7,71}+2p_{6,39} \\ &+2p_{7,23}+p_{7,119}+p_{6,15}+p_{7,111}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,191} = \frac{1}{2}p_{7,63} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,63}^2 - 4(4p_{7,0}+p_{7,64}+2p_{6,32}+2p_{7,8}+3p_{7,40}+2p_{7,104} \\ &+p_{6,24}+2p_{7,56}+5p_{7,120}+2p_{7,36}+p_{7,100}+2p_{7,52}+2p_{7,44} \\ &+p_{7,108}+3p_{7,92}+p_{6,60}+2p_{7,2}+p_{7,66}+p_{6,34}+2p_{7,18}+p_{6,50} \\ &+p_{7,58}+2p_{7,122}+p_{7,70}+2p_{7,38}+2p_{7,22}+p_{7,54}+2p_{7,14}+p_{7,78} \\ &+p_{6,46}+p_{7,30}+2p_{6,62}+p_{7,33}+2p_{7,97}+p_{7,17}+4p_{7,49}+2p_{7,9} \\ &+3p_{7,73}+4p_{7,41}+2p_{7,105}+p_{6,25}+p_{7,121}+2p_{7,5}+p_{7,69}+2p_{7,101} \\ &+p_{6,21}+p_{7,53}+p_{7,77}+p_{7,45}+2p_{7,29}+p_{7,93}+p_{7,67}+3p_{7,35} \\ &+2p_{7,99}+p_{7,83}+p_{7,51}+2p_{7,11}+2p_{7,43}+p_{6,59}+p_{7,71}+2p_{6,39} \\ &+2p_{7,23}+p_{7,119}+p_{6,15}+p_{7,111}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,127} = \frac{1}{2}p_{7,127} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,127}^2 - 4(p_{7,0}+4p_{7,64}+2p_{6,32}+2p_{7,72}+2p_{7,40}+3p_{7,104} \\ &+p_{6,24}+5p_{7,56}+2p_{7,120}+p_{7,36}+2p_{7,100}+2p_{7,116}+p_{7,44} \\ &+2p_{7,108}+3p_{7,28}+p_{6,60}+p_{7,2}+2p_{7,66}+p_{6,34}+2p_{7,82}+p_{6,50} \\ &+2p_{7,58}+p_{7,122}+p_{7,6}+2p_{7,102}+2p_{7,86}+p_{7,118}+p_{7,14}+2p_{7,78} \\ &+p_{6,46}+p_{7,94}+2p_{6,62}+2p_{7,33}+p_{7,97}+p_{7,81}+4p_{7,113}+3p_{7,9} \\ &+2p_{7,73}+2p_{7,41}+4p_{7,105}+p_{6,25}+p_{7,57}+p_{7,5}+2p_{7,69}+2p_{7,37} \\ &+p_{6,21}+p_{7,117}+p_{7,13}+p_{7,109}+p_{7,29}+2p_{7,93}+p_{7,3}+2p_{7,35} \\ &+3p_{7,99}+p_{7,19}+p_{7,115}+2p_{7,75}+2p_{7,107}+p_{6,59}+p_{7,7}+2p_{6,39} \\ &+2p_{7,87}+p_{7,55}+p_{6,15}+p_{7,47}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{8,255} = \frac{1}{2}p_{7,127} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{7,127}^2 - 4(p_{7,0}+4p_{7,64}+2p_{6,32}+2p_{7,72}+2p_{7,40}+3p_{7,104} \\ &+p_{6,24}+5p_{7,56}+2p_{7,120}+p_{7,36}+2p_{7,100}+2p_{7,116}+p_{7,44} \\ &+2p_{7,108}+3p_{7,28}+p_{6,60}+p_{7,2}+2p_{7,66}+p_{6,34}+2p_{7,82}+p_{6,50} \\ &+2p_{7,58}+p_{7,122}+p_{7,6}+2p_{7,102}+2p_{7,86}+p_{7,118}+p_{7,14}+2p_{7,78} \\ &+p_{6,46}+p_{7,94}+2p_{6,62}+2p_{7,33}+p_{7,97}+p_{7,81}+4p_{7,113}+3p_{7,9} \\ &+2p_{7,73}+2p_{7,41}+4p_{7,105}+p_{6,25}+p_{7,57}+p_{7,5}+2p_{7,69}+2p_{7,37} \\ &+p_{6,21}+p_{7,117}+p_{7,13}+p_{7,109}+p_{7,29}+2p_{7,93}+p_{7,3}+2p_{7,35} \\ &+3p_{7,99}+p_{7,19}+p_{7,115}+2p_{7,75}+2p_{7,107}+p_{6,59}+p_{7,7}+2p_{6,39} \\ &+2p_{7,87}+p_{7,55}+p_{6,15}+p_{7,47}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,0} = \frac{1}{2}p_{8,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,0}^2 - 4(p_{8,128}+p_{8,112}+p_{8,200}+p_{8,88}+p_{8,56}+p_{8,4} \\ &+p_{8,68}+p_{7,84}+p_{8,44}+2p_{7,28}+p_{8,188}+p_{7,124}+p_{8,146}+3p_{8,82} \\ &+p_{8,50}+p_{8,106}+p_{8,186}+p_{8,250}+p_{8,70}+p_{7,14}+p_{8,78}+p_{8,30} \\ &+p_{8,65}+p_{8,33}+p_{8,81}+p_{8,41}+p_{8,233}+p_{8,89}+2p_{8,185}+p_{8,37} \\ &+p_{8,53}+p_{8,117}+2p_{8,245}+p_{8,173}+p_{8,109}+p_{8,29}+p_{8,61} \\ &+p_{8,253}+2p_{8,3}+p_{8,195}+p_{8,19}+p_{8,51}+p_{8,243}+p_{8,43}+p_{8,219} \\ &+p_{7,59}+p_{7,7}+p_{8,39}+p_{8,231}+p_{8,79}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,256} = \frac{1}{2}p_{8,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,0}^2 - 4(p_{8,128}+p_{8,112}+p_{8,200}+p_{8,88}+p_{8,56}+p_{8,4} \\ &+p_{8,68}+p_{7,84}+p_{8,44}+2p_{7,28}+p_{8,188}+p_{7,124}+p_{8,146}+3p_{8,82} \\ &+p_{8,50}+p_{8,106}+p_{8,186}+p_{8,250}+p_{8,70}+p_{7,14}+p_{8,78}+p_{8,30} \\ &+p_{8,65}+p_{8,33}+p_{8,81}+p_{8,41}+p_{8,233}+p_{8,89}+2p_{8,185}+p_{8,37} \\ &+p_{8,53}+p_{8,117}+2p_{8,245}+p_{8,173}+p_{8,109}+p_{8,29}+p_{8,61} \\ &+p_{8,253}+2p_{8,3}+p_{8,195}+p_{8,19}+p_{8,51}+p_{8,243}+p_{8,43}+p_{8,219} \\ &+p_{7,59}+p_{7,7}+p_{8,39}+p_{8,231}+p_{8,79}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,128} = \frac{1}{2}p_{8,128} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,128}^2 - 4(p_{8,0}+p_{8,240}+p_{8,72}+p_{8,216}+p_{8,184}+p_{8,132} \\ &+p_{8,196}+p_{7,84}+p_{8,172}+2p_{7,28}+p_{8,60}+p_{7,124}+p_{8,18}+3p_{8,210} \\ &+p_{8,178}+p_{8,234}+p_{8,58}+p_{8,122}+p_{8,198}+p_{7,14}+p_{8,206}+p_{8,158} \\ &+p_{8,193}+p_{8,161}+p_{8,209}+p_{8,169}+p_{8,105}+p_{8,217}+2p_{8,57}+p_{8,165} \\ &+p_{8,181}+2p_{8,117}+p_{8,245}+p_{8,45}+p_{8,237}+p_{8,157}+p_{8,189}+p_{8,125} \\ &+2p_{8,131}+p_{8,67}+p_{8,147}+p_{8,179}+p_{8,115}+p_{8,171}+p_{8,91}+p_{7,59} \\ &+p_{7,7}+p_{8,167}+p_{8,103}+p_{8,207}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,384} = \frac{1}{2}p_{8,128} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,128}^2 - 4(p_{8,0}+p_{8,240}+p_{8,72}+p_{8,216}+p_{8,184}+p_{8,132} \\ &+p_{8,196}+p_{7,84}+p_{8,172}+2p_{7,28}+p_{8,60}+p_{7,124}+p_{8,18}+3p_{8,210} \\ &+p_{8,178}+p_{8,234}+p_{8,58}+p_{8,122}+p_{8,198}+p_{7,14}+p_{8,206}+p_{8,158} \\ &+p_{8,193}+p_{8,161}+p_{8,209}+p_{8,169}+p_{8,105}+p_{8,217}+2p_{8,57}+p_{8,165} \\ &+p_{8,181}+2p_{8,117}+p_{8,245}+p_{8,45}+p_{8,237}+p_{8,157}+p_{8,189}+p_{8,125} \\ &+2p_{8,131}+p_{8,67}+p_{8,147}+p_{8,179}+p_{8,115}+p_{8,171}+p_{8,91}+p_{7,59} \\ &+p_{7,7}+p_{8,167}+p_{8,103}+p_{8,207}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,64} = \frac{1}{2}p_{8,64} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,64}^2 - 4(p_{8,192}+p_{8,176}+p_{8,8}+p_{8,152}+p_{8,120}+p_{8,132} \\ &+p_{8,68}+p_{7,20}+p_{8,108}+2p_{7,92}+p_{7,60}+p_{8,252}+3p_{8,146}+p_{8,210} \\ &+p_{8,114}+p_{8,170}+p_{8,58}+p_{8,250}+p_{8,134}+p_{8,142}+p_{7,78}+p_{8,94} \\ &+p_{8,129}+p_{8,97}+p_{8,145}+p_{8,41}+p_{8,105}+p_{8,153}+2p_{8,249}+p_{8,101} \\ &+2p_{8,53}+p_{8,181}+p_{8,117}+p_{8,173}+p_{8,237}+p_{8,93}+p_{8,61}+p_{8,125} \\ &+p_{8,3}+2p_{8,67}+p_{8,83}+p_{8,51}+p_{8,115}+p_{8,107}+p_{8,27}+p_{7,123} \\ &+p_{7,71}+p_{8,39}+p_{8,103}+p_{8,143}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,320} = \frac{1}{2}p_{8,64} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,64}^2 - 4(p_{8,192}+p_{8,176}+p_{8,8}+p_{8,152}+p_{8,120}+p_{8,132} \\ &+p_{8,68}+p_{7,20}+p_{8,108}+2p_{7,92}+p_{7,60}+p_{8,252}+3p_{8,146}+p_{8,210} \\ &+p_{8,114}+p_{8,170}+p_{8,58}+p_{8,250}+p_{8,134}+p_{8,142}+p_{7,78}+p_{8,94} \\ &+p_{8,129}+p_{8,97}+p_{8,145}+p_{8,41}+p_{8,105}+p_{8,153}+2p_{8,249}+p_{8,101} \\ &+2p_{8,53}+p_{8,181}+p_{8,117}+p_{8,173}+p_{8,237}+p_{8,93}+p_{8,61}+p_{8,125} \\ &+p_{8,3}+2p_{8,67}+p_{8,83}+p_{8,51}+p_{8,115}+p_{8,107}+p_{8,27}+p_{7,123} \\ &+p_{7,71}+p_{8,39}+p_{8,103}+p_{8,143}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,192} = \frac{1}{2}p_{8,192} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,192}^2 - 4(p_{8,64}+p_{8,48}+p_{8,136}+p_{8,24}+p_{8,248}+p_{8,4} \\ &+p_{8,196}+p_{7,20}+p_{8,236}+2p_{7,92}+p_{7,60}+p_{8,124}+3p_{8,18}+p_{8,82} \\ &+p_{8,242}+p_{8,42}+p_{8,186}+p_{8,122}+p_{8,6}+p_{8,14}+p_{7,78}+p_{8,222} \\ &+p_{8,1}+p_{8,225}+p_{8,17}+p_{8,169}+p_{8,233}+p_{8,25}+2p_{8,121}+p_{8,229} \\ &+p_{8,53}+2p_{8,181}+p_{8,245}+p_{8,45}+p_{8,109}+p_{8,221}+p_{8,189}+p_{8,253} \\ &+p_{8,131}+2p_{8,195}+p_{8,211}+p_{8,179}+p_{8,243}+p_{8,235}+p_{8,155} \\ &+p_{7,123}+p_{7,71}+p_{8,167}+p_{8,231}+p_{8,15}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,448} = \frac{1}{2}p_{8,192} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,192}^2 - 4(p_{8,64}+p_{8,48}+p_{8,136}+p_{8,24}+p_{8,248}+p_{8,4} \\ &+p_{8,196}+p_{7,20}+p_{8,236}+2p_{7,92}+p_{7,60}+p_{8,124}+3p_{8,18}+p_{8,82} \\ &+p_{8,242}+p_{8,42}+p_{8,186}+p_{8,122}+p_{8,6}+p_{8,14}+p_{7,78}+p_{8,222} \\ &+p_{8,1}+p_{8,225}+p_{8,17}+p_{8,169}+p_{8,233}+p_{8,25}+2p_{8,121}+p_{8,229} \\ &+p_{8,53}+2p_{8,181}+p_{8,245}+p_{8,45}+p_{8,109}+p_{8,221}+p_{8,189}+p_{8,253} \\ &+p_{8,131}+2p_{8,195}+p_{8,211}+p_{8,179}+p_{8,243}+p_{8,235}+p_{8,155} \\ &+p_{7,123}+p_{7,71}+p_{8,167}+p_{8,231}+p_{8,15}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,32} = \frac{1}{2}p_{8,32} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,32}^2 - 4(p_{8,160}+p_{8,144}+p_{8,232}+p_{8,88}+p_{8,120}+p_{8,36} \\ &+p_{8,100}+p_{7,116}+p_{8,76}+p_{7,28}+p_{8,220}+2p_{7,60}+p_{8,82}+p_{8,178} \\ &+3p_{8,114}+p_{8,138}+p_{8,26}+p_{8,218}+p_{8,102}+p_{7,46}+p_{8,110}+p_{8,62} \\ &+p_{8,65}+p_{8,97}+p_{8,113}+p_{8,9}+p_{8,73}+2p_{8,217}+p_{8,121}+p_{8,69} \\ &+2p_{8,21}+p_{8,149}+p_{8,85}+p_{8,141}+p_{8,205}+p_{8,29}+p_{8,93}+p_{8,61} \\ &+2p_{8,35}+p_{8,227}+p_{8,19}+p_{8,83}+p_{8,51}+p_{8,75}+p_{7,91}+p_{8,251} \\ &+p_{8,7}+p_{8,71}+p_{7,39}+p_{8,207}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,288} = \frac{1}{2}p_{8,32} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,32}^2 - 4(p_{8,160}+p_{8,144}+p_{8,232}+p_{8,88}+p_{8,120}+p_{8,36} \\ &+p_{8,100}+p_{7,116}+p_{8,76}+p_{7,28}+p_{8,220}+2p_{7,60}+p_{8,82}+p_{8,178} \\ &+3p_{8,114}+p_{8,138}+p_{8,26}+p_{8,218}+p_{8,102}+p_{7,46}+p_{8,110}+p_{8,62} \\ &+p_{8,65}+p_{8,97}+p_{8,113}+p_{8,9}+p_{8,73}+2p_{8,217}+p_{8,121}+p_{8,69} \\ &+2p_{8,21}+p_{8,149}+p_{8,85}+p_{8,141}+p_{8,205}+p_{8,29}+p_{8,93}+p_{8,61} \\ &+2p_{8,35}+p_{8,227}+p_{8,19}+p_{8,83}+p_{8,51}+p_{8,75}+p_{7,91}+p_{8,251} \\ &+p_{8,7}+p_{8,71}+p_{7,39}+p_{8,207}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,160} = \frac{1}{2}p_{8,160} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,160}^2 - 4(p_{8,32}+p_{8,16}+p_{8,104}+p_{8,216}+p_{8,248}+p_{8,164} \\ &+p_{8,228}+p_{7,116}+p_{8,204}+p_{7,28}+p_{8,92}+2p_{7,60}+p_{8,210}+p_{8,50} \\ &+3p_{8,242}+p_{8,10}+p_{8,154}+p_{8,90}+p_{8,230}+p_{7,46}+p_{8,238}+p_{8,190} \\ &+p_{8,193}+p_{8,225}+p_{8,241}+p_{8,137}+p_{8,201}+2p_{8,89}+p_{8,249}+p_{8,197} \\ &+p_{8,21}+2p_{8,149}+p_{8,213}+p_{8,13}+p_{8,77}+p_{8,157}+p_{8,221}+p_{8,189} \\ &+2p_{8,163}+p_{8,99}+p_{8,147}+p_{8,211}+p_{8,179}+p_{8,203}+p_{7,91}+p_{8,123} \\ &+p_{8,135}+p_{8,199}+p_{7,39}+p_{8,79}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,416} = \frac{1}{2}p_{8,160} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,160}^2 - 4(p_{8,32}+p_{8,16}+p_{8,104}+p_{8,216}+p_{8,248}+p_{8,164} \\ &+p_{8,228}+p_{7,116}+p_{8,204}+p_{7,28}+p_{8,92}+2p_{7,60}+p_{8,210}+p_{8,50} \\ &+3p_{8,242}+p_{8,10}+p_{8,154}+p_{8,90}+p_{8,230}+p_{7,46}+p_{8,238}+p_{8,190} \\ &+p_{8,193}+p_{8,225}+p_{8,241}+p_{8,137}+p_{8,201}+2p_{8,89}+p_{8,249}+p_{8,197} \\ &+p_{8,21}+2p_{8,149}+p_{8,213}+p_{8,13}+p_{8,77}+p_{8,157}+p_{8,221}+p_{8,189} \\ &+2p_{8,163}+p_{8,99}+p_{8,147}+p_{8,211}+p_{8,179}+p_{8,203}+p_{7,91}+p_{8,123} \\ &+p_{8,135}+p_{8,199}+p_{7,39}+p_{8,79}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,96} = \frac{1}{2}p_{8,96} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,96}^2 - 4(p_{8,224}+p_{8,208}+p_{8,40}+p_{8,152}+p_{8,184}+p_{8,164} \\ &+p_{8,100}+p_{7,52}+p_{8,140}+p_{8,28}+p_{7,92}+2p_{7,124}+p_{8,146}+3p_{8,178} \\ &+p_{8,242}+p_{8,202}+p_{8,26}+p_{8,90}+p_{8,166}+p_{8,174}+p_{7,110}+p_{8,126} \\ &+p_{8,129}+p_{8,161}+p_{8,177}+p_{8,137}+p_{8,73}+2p_{8,25}+p_{8,185}+p_{8,133} \\ &+p_{8,149}+2p_{8,85}+p_{8,213}+p_{8,13}+p_{8,205}+p_{8,157}+p_{8,93}+p_{8,125} \\ &+p_{8,35}+2p_{8,99}+p_{8,147}+p_{8,83}+p_{8,115}+p_{8,139}+p_{7,27}+p_{8,59} \\ &+p_{8,135}+p_{8,71}+p_{7,103}+p_{8,15}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,352} = \frac{1}{2}p_{8,96} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,96}^2 - 4(p_{8,224}+p_{8,208}+p_{8,40}+p_{8,152}+p_{8,184}+p_{8,164} \\ &+p_{8,100}+p_{7,52}+p_{8,140}+p_{8,28}+p_{7,92}+2p_{7,124}+p_{8,146}+3p_{8,178} \\ &+p_{8,242}+p_{8,202}+p_{8,26}+p_{8,90}+p_{8,166}+p_{8,174}+p_{7,110}+p_{8,126} \\ &+p_{8,129}+p_{8,161}+p_{8,177}+p_{8,137}+p_{8,73}+2p_{8,25}+p_{8,185}+p_{8,133} \\ &+p_{8,149}+2p_{8,85}+p_{8,213}+p_{8,13}+p_{8,205}+p_{8,157}+p_{8,93}+p_{8,125} \\ &+p_{8,35}+2p_{8,99}+p_{8,147}+p_{8,83}+p_{8,115}+p_{8,139}+p_{7,27}+p_{8,59} \\ &+p_{8,135}+p_{8,71}+p_{7,103}+p_{8,15}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,224} = \frac{1}{2}p_{8,224} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,224}^2 - 4(p_{8,96}+p_{8,80}+p_{8,168}+p_{8,24}+p_{8,56}+p_{8,36} \\ &+p_{8,228}+p_{7,52}+p_{8,12}+p_{8,156}+p_{7,92}+2p_{7,124}+p_{8,18}+3p_{8,50} \\ &+p_{8,114}+p_{8,74}+p_{8,154}+p_{8,218}+p_{8,38}+p_{8,46}+p_{7,110}+p_{8,254} \\ &+p_{8,1}+p_{8,33}+p_{8,49}+p_{8,9}+p_{8,201}+2p_{8,153}+p_{8,57}+p_{8,5} \\ &+p_{8,21}+p_{8,85}+2p_{8,213}+p_{8,141}+p_{8,77}+p_{8,29}+p_{8,221}+p_{8,253} \\ &+p_{8,163}+2p_{8,227}+p_{8,19}+p_{8,211}+p_{8,243}+p_{8,11}+p_{7,27}+p_{8,187} \\ &+p_{8,7}+p_{8,199}+p_{7,103}+p_{8,143}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,480} = \frac{1}{2}p_{8,224} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,224}^2 - 4(p_{8,96}+p_{8,80}+p_{8,168}+p_{8,24}+p_{8,56}+p_{8,36} \\ &+p_{8,228}+p_{7,52}+p_{8,12}+p_{8,156}+p_{7,92}+2p_{7,124}+p_{8,18}+3p_{8,50} \\ &+p_{8,114}+p_{8,74}+p_{8,154}+p_{8,218}+p_{8,38}+p_{8,46}+p_{7,110}+p_{8,254} \\ &+p_{8,1}+p_{8,33}+p_{8,49}+p_{8,9}+p_{8,201}+2p_{8,153}+p_{8,57}+p_{8,5} \\ &+p_{8,21}+p_{8,85}+2p_{8,213}+p_{8,141}+p_{8,77}+p_{8,29}+p_{8,221}+p_{8,253} \\ &+p_{8,163}+2p_{8,227}+p_{8,19}+p_{8,211}+p_{8,243}+p_{8,11}+p_{7,27}+p_{8,187} \\ &+p_{8,7}+p_{8,199}+p_{7,103}+p_{8,143}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,16} = \frac{1}{2}p_{8,16} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,16}^2 - 4(p_{8,128}+p_{8,144}+p_{8,72}+p_{8,104}+p_{8,216}+p_{7,100} \\ &+p_{8,20}+p_{8,84}+p_{7,12}+p_{8,204}+2p_{7,44}+p_{8,60}+p_{8,66}+p_{8,162} \\ &+3p_{8,98}+p_{8,10}+p_{8,202}+p_{8,122}+p_{8,86}+p_{8,46}+p_{7,30}+p_{8,94} \\ &+p_{8,97}+p_{8,81}+p_{8,49}+2p_{8,201}+p_{8,105}+p_{8,57}+p_{8,249}+2p_{8,5} \\ &+p_{8,133}+p_{8,69}+p_{8,53}+p_{8,13}+p_{8,77}+p_{8,45}+p_{8,189}+p_{8,125} \\ &+p_{8,3}+p_{8,67}+p_{8,35}+2p_{8,19}+p_{8,211}+p_{7,75}+p_{8,235}+p_{8,59} \\ &+p_{7,23}+p_{8,55}+p_{8,247}+p_{8,95}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,272} = \frac{1}{2}p_{8,16} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,16}^2 - 4(p_{8,128}+p_{8,144}+p_{8,72}+p_{8,104}+p_{8,216}+p_{7,100} \\ &+p_{8,20}+p_{8,84}+p_{7,12}+p_{8,204}+2p_{7,44}+p_{8,60}+p_{8,66}+p_{8,162} \\ &+3p_{8,98}+p_{8,10}+p_{8,202}+p_{8,122}+p_{8,86}+p_{8,46}+p_{7,30}+p_{8,94} \\ &+p_{8,97}+p_{8,81}+p_{8,49}+2p_{8,201}+p_{8,105}+p_{8,57}+p_{8,249}+2p_{8,5} \\ &+p_{8,133}+p_{8,69}+p_{8,53}+p_{8,13}+p_{8,77}+p_{8,45}+p_{8,189}+p_{8,125} \\ &+p_{8,3}+p_{8,67}+p_{8,35}+2p_{8,19}+p_{8,211}+p_{7,75}+p_{8,235}+p_{8,59} \\ &+p_{7,23}+p_{8,55}+p_{8,247}+p_{8,95}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,144} = \frac{1}{2}p_{8,144} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,144}^2 - 4(p_{8,0}+p_{8,16}+p_{8,200}+p_{8,232}+p_{8,88}+p_{7,100} \\ &+p_{8,148}+p_{8,212}+p_{7,12}+p_{8,76}+2p_{7,44}+p_{8,188}+p_{8,194}+p_{8,34} \\ &+3p_{8,226}+p_{8,138}+p_{8,74}+p_{8,250}+p_{8,214}+p_{8,174}+p_{7,30}+p_{8,222} \\ &+p_{8,225}+p_{8,209}+p_{8,177}+2p_{8,73}+p_{8,233}+p_{8,185}+p_{8,121}+p_{8,5} \\ &+2p_{8,133}+p_{8,197}+p_{8,181}+p_{8,141}+p_{8,205}+p_{8,173}+p_{8,61}+p_{8,253} \\ &+p_{8,131}+p_{8,195}+p_{8,163}+2p_{8,147}+p_{8,83}+p_{7,75}+p_{8,107}+p_{8,187} \\ &+p_{7,23}+p_{8,183}+p_{8,119}+p_{8,223}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,400} = \frac{1}{2}p_{8,144} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,144}^2 - 4(p_{8,0}+p_{8,16}+p_{8,200}+p_{8,232}+p_{8,88}+p_{7,100} \\ &+p_{8,148}+p_{8,212}+p_{7,12}+p_{8,76}+2p_{7,44}+p_{8,188}+p_{8,194}+p_{8,34} \\ &+3p_{8,226}+p_{8,138}+p_{8,74}+p_{8,250}+p_{8,214}+p_{8,174}+p_{7,30}+p_{8,222} \\ &+p_{8,225}+p_{8,209}+p_{8,177}+2p_{8,73}+p_{8,233}+p_{8,185}+p_{8,121}+p_{8,5} \\ &+2p_{8,133}+p_{8,197}+p_{8,181}+p_{8,141}+p_{8,205}+p_{8,173}+p_{8,61}+p_{8,253} \\ &+p_{8,131}+p_{8,195}+p_{8,163}+2p_{8,147}+p_{8,83}+p_{7,75}+p_{8,107}+p_{8,187} \\ &+p_{7,23}+p_{8,183}+p_{8,119}+p_{8,223}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,80} = \frac{1}{2}p_{8,80} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,80}^2 - 4(p_{8,192}+p_{8,208}+p_{8,136}+p_{8,168}+p_{8,24}+p_{7,36} \\ &+p_{8,148}+p_{8,84}+p_{8,12}+p_{7,76}+2p_{7,108}+p_{8,124}+p_{8,130}+3p_{8,162} \\ &+p_{8,226}+p_{8,10}+p_{8,74}+p_{8,186}+p_{8,150}+p_{8,110}+p_{8,158}+p_{7,94} \\ &+p_{8,161}+p_{8,145}+p_{8,113}+2p_{8,9}+p_{8,169}+p_{8,57}+p_{8,121}+p_{8,133} \\ &+2p_{8,69}+p_{8,197}+p_{8,117}+p_{8,141}+p_{8,77}+p_{8,109}+p_{8,189}+p_{8,253} \\ &+p_{8,131}+p_{8,67}+p_{8,99}+p_{8,19}+2p_{8,83}+p_{7,11}+p_{8,43}+p_{8,123} \\ &+p_{7,87}+p_{8,55}+p_{8,119}+p_{8,159}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,336} = \frac{1}{2}p_{8,80} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,80}^2 - 4(p_{8,192}+p_{8,208}+p_{8,136}+p_{8,168}+p_{8,24}+p_{7,36} \\ &+p_{8,148}+p_{8,84}+p_{8,12}+p_{7,76}+2p_{7,108}+p_{8,124}+p_{8,130}+3p_{8,162} \\ &+p_{8,226}+p_{8,10}+p_{8,74}+p_{8,186}+p_{8,150}+p_{8,110}+p_{8,158}+p_{7,94} \\ &+p_{8,161}+p_{8,145}+p_{8,113}+2p_{8,9}+p_{8,169}+p_{8,57}+p_{8,121}+p_{8,133} \\ &+2p_{8,69}+p_{8,197}+p_{8,117}+p_{8,141}+p_{8,77}+p_{8,109}+p_{8,189}+p_{8,253} \\ &+p_{8,131}+p_{8,67}+p_{8,99}+p_{8,19}+2p_{8,83}+p_{7,11}+p_{8,43}+p_{8,123} \\ &+p_{7,87}+p_{8,55}+p_{8,119}+p_{8,159}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,208} = \frac{1}{2}p_{8,208} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,208}^2 - 4(p_{8,64}+p_{8,80}+p_{8,8}+p_{8,40}+p_{8,152}+p_{7,36} \\ &+p_{8,20}+p_{8,212}+p_{8,140}+p_{7,76}+2p_{7,108}+p_{8,252}+p_{8,2}+3p_{8,34} \\ &+p_{8,98}+p_{8,138}+p_{8,202}+p_{8,58}+p_{8,22}+p_{8,238}+p_{8,30}+p_{7,94} \\ &+p_{8,33}+p_{8,17}+p_{8,241}+2p_{8,137}+p_{8,41}+p_{8,185}+p_{8,249}+p_{8,5} \\ &+p_{8,69}+2p_{8,197}+p_{8,245}+p_{8,13}+p_{8,205}+p_{8,237}+p_{8,61}+p_{8,125} \\ &+p_{8,3}+p_{8,195}+p_{8,227}+p_{8,147}+2p_{8,211}+p_{7,11}+p_{8,171}+p_{8,251} \\ &+p_{7,87}+p_{8,183}+p_{8,247}+p_{8,31}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,464} = \frac{1}{2}p_{8,208} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,208}^2 - 4(p_{8,64}+p_{8,80}+p_{8,8}+p_{8,40}+p_{8,152}+p_{7,36} \\ &+p_{8,20}+p_{8,212}+p_{8,140}+p_{7,76}+2p_{7,108}+p_{8,252}+p_{8,2}+3p_{8,34} \\ &+p_{8,98}+p_{8,138}+p_{8,202}+p_{8,58}+p_{8,22}+p_{8,238}+p_{8,30}+p_{7,94} \\ &+p_{8,33}+p_{8,17}+p_{8,241}+2p_{8,137}+p_{8,41}+p_{8,185}+p_{8,249}+p_{8,5} \\ &+p_{8,69}+2p_{8,197}+p_{8,245}+p_{8,13}+p_{8,205}+p_{8,237}+p_{8,61}+p_{8,125} \\ &+p_{8,3}+p_{8,195}+p_{8,227}+p_{8,147}+2p_{8,211}+p_{7,11}+p_{8,171}+p_{8,251} \\ &+p_{7,87}+p_{8,183}+p_{8,247}+p_{8,31}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,48} = \frac{1}{2}p_{8,48} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,48}^2 - 4(p_{8,160}+p_{8,176}+p_{8,136}+p_{8,104}+p_{8,248}+p_{7,4} \\ &+p_{8,52}+p_{8,116}+2p_{7,76}+p_{7,44}+p_{8,236}+p_{8,92}+3p_{8,130}+p_{8,194} \\ &+p_{8,98}+p_{8,42}+p_{8,234}+p_{8,154}+p_{8,118}+p_{8,78}+p_{7,62}+p_{8,126} \\ &+p_{8,129}+p_{8,81}+p_{8,113}+p_{8,137}+2p_{8,233}+p_{8,25}+p_{8,89}+2p_{8,37} \\ &+p_{8,165}+p_{8,101}+p_{8,85}+p_{8,77}+p_{8,45}+p_{8,109}+p_{8,157}+p_{8,221} \\ &+p_{8,67}+p_{8,35}+p_{8,99}+2p_{8,51}+p_{8,243}+p_{8,11}+p_{7,107}+p_{8,91} \\ &+p_{8,23}+p_{8,87}+p_{7,55}+p_{8,223}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,304} = \frac{1}{2}p_{8,48} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,48}^2 - 4(p_{8,160}+p_{8,176}+p_{8,136}+p_{8,104}+p_{8,248}+p_{7,4} \\ &+p_{8,52}+p_{8,116}+2p_{7,76}+p_{7,44}+p_{8,236}+p_{8,92}+3p_{8,130}+p_{8,194} \\ &+p_{8,98}+p_{8,42}+p_{8,234}+p_{8,154}+p_{8,118}+p_{8,78}+p_{7,62}+p_{8,126} \\ &+p_{8,129}+p_{8,81}+p_{8,113}+p_{8,137}+2p_{8,233}+p_{8,25}+p_{8,89}+2p_{8,37} \\ &+p_{8,165}+p_{8,101}+p_{8,85}+p_{8,77}+p_{8,45}+p_{8,109}+p_{8,157}+p_{8,221} \\ &+p_{8,67}+p_{8,35}+p_{8,99}+2p_{8,51}+p_{8,243}+p_{8,11}+p_{7,107}+p_{8,91} \\ &+p_{8,23}+p_{8,87}+p_{7,55}+p_{8,223}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,176} = \frac{1}{2}p_{8,176} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,176}^2 - 4(p_{8,32}+p_{8,48}+p_{8,8}+p_{8,232}+p_{8,120}+p_{7,4} \\ &+p_{8,180}+p_{8,244}+2p_{7,76}+p_{7,44}+p_{8,108}+p_{8,220}+3p_{8,2}+p_{8,66} \\ &+p_{8,226}+p_{8,170}+p_{8,106}+p_{8,26}+p_{8,246}+p_{8,206}+p_{7,62}+p_{8,254} \\ &+p_{8,1}+p_{8,209}+p_{8,241}+p_{8,9}+2p_{8,105}+p_{8,153}+p_{8,217}+p_{8,37} \\ &+2p_{8,165}+p_{8,229}+p_{8,213}+p_{8,205}+p_{8,173}+p_{8,237}+p_{8,29}+p_{8,93} \\ &+p_{8,195}+p_{8,163}+p_{8,227}+2p_{8,179}+p_{8,115}+p_{8,139}+p_{7,107} \\ &+p_{8,219}+p_{8,151}+p_{8,215}+p_{7,55}+p_{8,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,432} = \frac{1}{2}p_{8,176} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,176}^2 - 4(p_{8,32}+p_{8,48}+p_{8,8}+p_{8,232}+p_{8,120}+p_{7,4} \\ &+p_{8,180}+p_{8,244}+2p_{7,76}+p_{7,44}+p_{8,108}+p_{8,220}+3p_{8,2}+p_{8,66} \\ &+p_{8,226}+p_{8,170}+p_{8,106}+p_{8,26}+p_{8,246}+p_{8,206}+p_{7,62}+p_{8,254} \\ &+p_{8,1}+p_{8,209}+p_{8,241}+p_{8,9}+2p_{8,105}+p_{8,153}+p_{8,217}+p_{8,37} \\ &+2p_{8,165}+p_{8,229}+p_{8,213}+p_{8,205}+p_{8,173}+p_{8,237}+p_{8,29}+p_{8,93} \\ &+p_{8,195}+p_{8,163}+p_{8,227}+2p_{8,179}+p_{8,115}+p_{8,139}+p_{7,107} \\ &+p_{8,219}+p_{8,151}+p_{8,215}+p_{7,55}+p_{8,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,112} = \frac{1}{2}p_{8,112} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,112}^2 - 4(p_{8,224}+p_{8,240}+p_{8,200}+p_{8,168}+p_{8,56}+p_{7,68} \\ &+p_{8,180}+p_{8,116}+2p_{7,12}+p_{8,44}+p_{7,108}+p_{8,156}+p_{8,2}+3p_{8,194} \\ &+p_{8,162}+p_{8,42}+p_{8,106}+p_{8,218}+p_{8,182}+p_{8,142}+p_{8,190}+p_{7,126} \\ &+p_{8,193}+p_{8,145}+p_{8,177}+p_{8,201}+2p_{8,41}+p_{8,153}+p_{8,89}+p_{8,165} \\ &+2p_{8,101}+p_{8,229}+p_{8,149}+p_{8,141}+p_{8,173}+p_{8,109}+p_{8,29}+p_{8,221} \\ &+p_{8,131}+p_{8,163}+p_{8,99}+p_{8,51}+2p_{8,115}+p_{8,75}+p_{7,43}+p_{8,155} \\ &+p_{8,151}+p_{8,87}+p_{7,119}+p_{8,31}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,368} = \frac{1}{2}p_{8,112} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,112}^2 - 4(p_{8,224}+p_{8,240}+p_{8,200}+p_{8,168}+p_{8,56}+p_{7,68} \\ &+p_{8,180}+p_{8,116}+2p_{7,12}+p_{8,44}+p_{7,108}+p_{8,156}+p_{8,2}+3p_{8,194} \\ &+p_{8,162}+p_{8,42}+p_{8,106}+p_{8,218}+p_{8,182}+p_{8,142}+p_{8,190}+p_{7,126} \\ &+p_{8,193}+p_{8,145}+p_{8,177}+p_{8,201}+2p_{8,41}+p_{8,153}+p_{8,89}+p_{8,165} \\ &+2p_{8,101}+p_{8,229}+p_{8,149}+p_{8,141}+p_{8,173}+p_{8,109}+p_{8,29}+p_{8,221} \\ &+p_{8,131}+p_{8,163}+p_{8,99}+p_{8,51}+2p_{8,115}+p_{8,75}+p_{7,43}+p_{8,155} \\ &+p_{8,151}+p_{8,87}+p_{7,119}+p_{8,31}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,240} = \frac{1}{2}p_{8,240} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,240}^2 - 4(p_{8,96}+p_{8,112}+p_{8,72}+p_{8,40}+p_{8,184}+p_{7,68} \\ &+p_{8,52}+p_{8,244}+2p_{7,12}+p_{8,172}+p_{7,108}+p_{8,28}+p_{8,130}+3p_{8,66} \\ &+p_{8,34}+p_{8,170}+p_{8,234}+p_{8,90}+p_{8,54}+p_{8,14}+p_{8,62}+p_{7,126} \\ &+p_{8,65}+p_{8,17}+p_{8,49}+p_{8,73}+2p_{8,169}+p_{8,25}+p_{8,217}+p_{8,37} \\ &+p_{8,101}+2p_{8,229}+p_{8,21}+p_{8,13}+p_{8,45}+p_{8,237}+p_{8,157}+p_{8,93} \\ &+p_{8,3}+p_{8,35}+p_{8,227}+p_{8,179}+2p_{8,243}+p_{8,203}+p_{7,43}+p_{8,27} \\ &+p_{8,23}+p_{8,215}+p_{7,119}+p_{8,159}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,496} = \frac{1}{2}p_{8,240} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,240}^2 - 4(p_{8,96}+p_{8,112}+p_{8,72}+p_{8,40}+p_{8,184}+p_{7,68} \\ &+p_{8,52}+p_{8,244}+2p_{7,12}+p_{8,172}+p_{7,108}+p_{8,28}+p_{8,130}+3p_{8,66} \\ &+p_{8,34}+p_{8,170}+p_{8,234}+p_{8,90}+p_{8,54}+p_{8,14}+p_{8,62}+p_{7,126} \\ &+p_{8,65}+p_{8,17}+p_{8,49}+p_{8,73}+2p_{8,169}+p_{8,25}+p_{8,217}+p_{8,37} \\ &+p_{8,101}+2p_{8,229}+p_{8,21}+p_{8,13}+p_{8,45}+p_{8,237}+p_{8,157}+p_{8,93} \\ &+p_{8,3}+p_{8,35}+p_{8,227}+p_{8,179}+2p_{8,243}+p_{8,203}+p_{7,43}+p_{8,27} \\ &+p_{8,23}+p_{8,215}+p_{7,119}+p_{8,159}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,8} = \frac{1}{2}p_{8,8} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,8}^2 - 4(p_{8,64}+p_{8,96}+p_{8,208}+p_{8,136}+p_{8,120}+p_{7,4} \\ &+p_{8,196}+2p_{7,36}+p_{8,52}+p_{8,12}+p_{8,76}+p_{7,92}+p_{8,2}+p_{8,194} \\ &+p_{8,114}+p_{8,154}+3p_{8,90}+p_{8,58}+p_{8,38}+p_{7,22}+p_{8,86}+p_{8,78} \\ &+2p_{8,193}+p_{8,97}+p_{8,49}+p_{8,241}+p_{8,73}+p_{8,41}+p_{8,89}+p_{8,5} \\ &+p_{8,69}+p_{8,37}+p_{8,181}+p_{8,117}+p_{8,45}+p_{8,61}+p_{8,125}+2p_{8,253} \\ &+p_{7,67}+p_{8,227}+p_{8,51}+2p_{8,11}+p_{8,203}+p_{8,27}+p_{8,59}+p_{8,251} \\ &+p_{8,87}+p_{8,183}+p_{7,15}+p_{8,47}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,264} = \frac{1}{2}p_{8,8} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,8}^2 - 4(p_{8,64}+p_{8,96}+p_{8,208}+p_{8,136}+p_{8,120}+p_{7,4} \\ &+p_{8,196}+2p_{7,36}+p_{8,52}+p_{8,12}+p_{8,76}+p_{7,92}+p_{8,2}+p_{8,194} \\ &+p_{8,114}+p_{8,154}+3p_{8,90}+p_{8,58}+p_{8,38}+p_{7,22}+p_{8,86}+p_{8,78} \\ &+2p_{8,193}+p_{8,97}+p_{8,49}+p_{8,241}+p_{8,73}+p_{8,41}+p_{8,89}+p_{8,5} \\ &+p_{8,69}+p_{8,37}+p_{8,181}+p_{8,117}+p_{8,45}+p_{8,61}+p_{8,125}+2p_{8,253} \\ &+p_{7,67}+p_{8,227}+p_{8,51}+2p_{8,11}+p_{8,203}+p_{8,27}+p_{8,59}+p_{8,251} \\ &+p_{8,87}+p_{8,183}+p_{7,15}+p_{8,47}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,136} = \frac{1}{2}p_{8,136} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,136}^2 - 4(p_{8,192}+p_{8,224}+p_{8,80}+p_{8,8}+p_{8,248}+p_{7,4} \\ &+p_{8,68}+2p_{7,36}+p_{8,180}+p_{8,140}+p_{8,204}+p_{7,92}+p_{8,130}+p_{8,66} \\ &+p_{8,242}+p_{8,26}+3p_{8,218}+p_{8,186}+p_{8,166}+p_{7,22}+p_{8,214}+p_{8,206} \\ &+2p_{8,65}+p_{8,225}+p_{8,177}+p_{8,113}+p_{8,201}+p_{8,169}+p_{8,217}+p_{8,133} \\ &+p_{8,197}+p_{8,165}+p_{8,53}+p_{8,245}+p_{8,173}+p_{8,189}+2p_{8,125}+p_{8,253} \\ &+p_{7,67}+p_{8,99}+p_{8,179}+2p_{8,139}+p_{8,75}+p_{8,155}+p_{8,187}+p_{8,123} \\ &+p_{8,215}+p_{8,55}+p_{7,15}+p_{8,175}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,392} = \frac{1}{2}p_{8,136} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,136}^2 - 4(p_{8,192}+p_{8,224}+p_{8,80}+p_{8,8}+p_{8,248}+p_{7,4} \\ &+p_{8,68}+2p_{7,36}+p_{8,180}+p_{8,140}+p_{8,204}+p_{7,92}+p_{8,130}+p_{8,66} \\ &+p_{8,242}+p_{8,26}+3p_{8,218}+p_{8,186}+p_{8,166}+p_{7,22}+p_{8,214}+p_{8,206} \\ &+2p_{8,65}+p_{8,225}+p_{8,177}+p_{8,113}+p_{8,201}+p_{8,169}+p_{8,217}+p_{8,133} \\ &+p_{8,197}+p_{8,165}+p_{8,53}+p_{8,245}+p_{8,173}+p_{8,189}+2p_{8,125}+p_{8,253} \\ &+p_{7,67}+p_{8,99}+p_{8,179}+2p_{8,139}+p_{8,75}+p_{8,155}+p_{8,187}+p_{8,123} \\ &+p_{8,215}+p_{8,55}+p_{7,15}+p_{8,175}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,72} = \frac{1}{2}p_{8,72} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,72}^2 - 4(p_{8,128}+p_{8,160}+p_{8,16}+p_{8,200}+p_{8,184}+p_{8,4} \\ &+p_{7,68}+2p_{7,100}+p_{8,116}+p_{8,140}+p_{8,76}+p_{7,28}+p_{8,2}+p_{8,66} \\ &+p_{8,178}+3p_{8,154}+p_{8,218}+p_{8,122}+p_{8,102}+p_{8,150}+p_{7,86} \\ &+p_{8,142}+2p_{8,1}+p_{8,161}+p_{8,49}+p_{8,113}+p_{8,137}+p_{8,105}+p_{8,153} \\ &+p_{8,133}+p_{8,69}+p_{8,101}+p_{8,181}+p_{8,245}+p_{8,109}+2p_{8,61}+p_{8,189} \\ &+p_{8,125}+p_{7,3}+p_{8,35}+p_{8,115}+p_{8,11}+2p_{8,75}+p_{8,91}+p_{8,59} \\ &+p_{8,123}+p_{8,151}+p_{8,247}+p_{7,79}+p_{8,47}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,328} = \frac{1}{2}p_{8,72} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,72}^2 - 4(p_{8,128}+p_{8,160}+p_{8,16}+p_{8,200}+p_{8,184}+p_{8,4} \\ &+p_{7,68}+2p_{7,100}+p_{8,116}+p_{8,140}+p_{8,76}+p_{7,28}+p_{8,2}+p_{8,66} \\ &+p_{8,178}+3p_{8,154}+p_{8,218}+p_{8,122}+p_{8,102}+p_{8,150}+p_{7,86} \\ &+p_{8,142}+2p_{8,1}+p_{8,161}+p_{8,49}+p_{8,113}+p_{8,137}+p_{8,105}+p_{8,153} \\ &+p_{8,133}+p_{8,69}+p_{8,101}+p_{8,181}+p_{8,245}+p_{8,109}+2p_{8,61}+p_{8,189} \\ &+p_{8,125}+p_{7,3}+p_{8,35}+p_{8,115}+p_{8,11}+2p_{8,75}+p_{8,91}+p_{8,59} \\ &+p_{8,123}+p_{8,151}+p_{8,247}+p_{7,79}+p_{8,47}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,200} = \frac{1}{2}p_{8,200} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,200}^2 - 4(p_{8,0}+p_{8,32}+p_{8,144}+p_{8,72}+p_{8,56}+p_{8,132} \\ &+p_{7,68}+2p_{7,100}+p_{8,244}+p_{8,12}+p_{8,204}+p_{7,28}+p_{8,130}+p_{8,194} \\ &+p_{8,50}+3p_{8,26}+p_{8,90}+p_{8,250}+p_{8,230}+p_{8,22}+p_{7,86}+p_{8,14} \\ &+2p_{8,129}+p_{8,33}+p_{8,177}+p_{8,241}+p_{8,9}+p_{8,233}+p_{8,25}+p_{8,5} \\ &+p_{8,197}+p_{8,229}+p_{8,53}+p_{8,117}+p_{8,237}+p_{8,61}+2p_{8,189}+p_{8,253} \\ &+p_{7,3}+p_{8,163}+p_{8,243}+p_{8,139}+2p_{8,203}+p_{8,219}+p_{8,187}+p_{8,251} \\ &+p_{8,23}+p_{8,119}+p_{7,79}+p_{8,175}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,456} = \frac{1}{2}p_{8,200} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,200}^2 - 4(p_{8,0}+p_{8,32}+p_{8,144}+p_{8,72}+p_{8,56}+p_{8,132} \\ &+p_{7,68}+2p_{7,100}+p_{8,244}+p_{8,12}+p_{8,204}+p_{7,28}+p_{8,130}+p_{8,194} \\ &+p_{8,50}+3p_{8,26}+p_{8,90}+p_{8,250}+p_{8,230}+p_{8,22}+p_{7,86}+p_{8,14} \\ &+2p_{8,129}+p_{8,33}+p_{8,177}+p_{8,241}+p_{8,9}+p_{8,233}+p_{8,25}+p_{8,5} \\ &+p_{8,197}+p_{8,229}+p_{8,53}+p_{8,117}+p_{8,237}+p_{8,61}+2p_{8,189}+p_{8,253} \\ &+p_{7,3}+p_{8,163}+p_{8,243}+p_{8,139}+2p_{8,203}+p_{8,219}+p_{8,187}+p_{8,251} \\ &+p_{8,23}+p_{8,119}+p_{7,79}+p_{8,175}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,40} = \frac{1}{2}p_{8,40} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,40}^2 - 4(p_{8,128}+p_{8,96}+p_{8,240}+p_{8,168}+p_{8,152}+2p_{7,68} \\ &+p_{7,36}+p_{8,228}+p_{8,84}+p_{8,44}+p_{8,108}+p_{7,124}+p_{8,34}+p_{8,226} \\ &+p_{8,146}+p_{8,90}+p_{8,186}+3p_{8,122}+p_{8,70}+p_{7,54}+p_{8,118}+p_{8,110} \\ &+p_{8,129}+2p_{8,225}+p_{8,17}+p_{8,81}+p_{8,73}+p_{8,105}+p_{8,121}+p_{8,69} \\ &+p_{8,37}+p_{8,101}+p_{8,149}+p_{8,213}+p_{8,77}+2p_{8,29}+p_{8,157}+p_{8,93} \\ &+p_{8,3}+p_{7,99}+p_{8,83}+2p_{8,43}+p_{8,235}+p_{8,27}+p_{8,91}+p_{8,59} \\ &+p_{8,215}+p_{8,119}+p_{8,15}+p_{8,79}+p_{7,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,296} = \frac{1}{2}p_{8,40} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,40}^2 - 4(p_{8,128}+p_{8,96}+p_{8,240}+p_{8,168}+p_{8,152}+2p_{7,68} \\ &+p_{7,36}+p_{8,228}+p_{8,84}+p_{8,44}+p_{8,108}+p_{7,124}+p_{8,34}+p_{8,226} \\ &+p_{8,146}+p_{8,90}+p_{8,186}+3p_{8,122}+p_{8,70}+p_{7,54}+p_{8,118}+p_{8,110} \\ &+p_{8,129}+2p_{8,225}+p_{8,17}+p_{8,81}+p_{8,73}+p_{8,105}+p_{8,121}+p_{8,69} \\ &+p_{8,37}+p_{8,101}+p_{8,149}+p_{8,213}+p_{8,77}+2p_{8,29}+p_{8,157}+p_{8,93} \\ &+p_{8,3}+p_{7,99}+p_{8,83}+2p_{8,43}+p_{8,235}+p_{8,27}+p_{8,91}+p_{8,59} \\ &+p_{8,215}+p_{8,119}+p_{8,15}+p_{8,79}+p_{7,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,168} = \frac{1}{2}p_{8,168} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,168}^2 - 4(p_{8,0}+p_{8,224}+p_{8,112}+p_{8,40}+p_{8,24}+2p_{7,68} \\ &+p_{7,36}+p_{8,100}+p_{8,212}+p_{8,172}+p_{8,236}+p_{7,124}+p_{8,162}+p_{8,98} \\ &+p_{8,18}+p_{8,218}+p_{8,58}+3p_{8,250}+p_{8,198}+p_{7,54}+p_{8,246}+p_{8,238} \\ &+p_{8,1}+2p_{8,97}+p_{8,145}+p_{8,209}+p_{8,201}+p_{8,233}+p_{8,249}+p_{8,197} \\ &+p_{8,165}+p_{8,229}+p_{8,21}+p_{8,85}+p_{8,205}+p_{8,29}+2p_{8,157}+p_{8,221} \\ &+p_{8,131}+p_{7,99}+p_{8,211}+2p_{8,171}+p_{8,107}+p_{8,155}+p_{8,219}+p_{8,187} \\ &+p_{8,87}+p_{8,247}+p_{8,143}+p_{8,207}+p_{7,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,424} = \frac{1}{2}p_{8,168} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,168}^2 - 4(p_{8,0}+p_{8,224}+p_{8,112}+p_{8,40}+p_{8,24}+2p_{7,68} \\ &+p_{7,36}+p_{8,100}+p_{8,212}+p_{8,172}+p_{8,236}+p_{7,124}+p_{8,162}+p_{8,98} \\ &+p_{8,18}+p_{8,218}+p_{8,58}+3p_{8,250}+p_{8,198}+p_{7,54}+p_{8,246}+p_{8,238} \\ &+p_{8,1}+2p_{8,97}+p_{8,145}+p_{8,209}+p_{8,201}+p_{8,233}+p_{8,249}+p_{8,197} \\ &+p_{8,165}+p_{8,229}+p_{8,21}+p_{8,85}+p_{8,205}+p_{8,29}+2p_{8,157}+p_{8,221} \\ &+p_{8,131}+p_{7,99}+p_{8,211}+2p_{8,171}+p_{8,107}+p_{8,155}+p_{8,219}+p_{8,187} \\ &+p_{8,87}+p_{8,247}+p_{8,143}+p_{8,207}+p_{7,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,104} = \frac{1}{2}p_{8,104} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,104}^2 - 4(p_{8,192}+p_{8,160}+p_{8,48}+p_{8,232}+p_{8,216}+2p_{7,4} \\ &+p_{8,36}+p_{7,100}+p_{8,148}+p_{8,172}+p_{8,108}+p_{7,60}+p_{8,34}+p_{8,98} \\ &+p_{8,210}+p_{8,154}+3p_{8,186}+p_{8,250}+p_{8,134}+p_{8,182}+p_{7,118} \\ &+p_{8,174}+p_{8,193}+2p_{8,33}+p_{8,145}+p_{8,81}+p_{8,137}+p_{8,169}+p_{8,185} \\ &+p_{8,133}+p_{8,165}+p_{8,101}+p_{8,21}+p_{8,213}+p_{8,141}+p_{8,157}+2p_{8,93} \\ &+p_{8,221}+p_{8,67}+p_{7,35}+p_{8,147}+p_{8,43}+2p_{8,107}+p_{8,155}+p_{8,91} \\ &+p_{8,123}+p_{8,23}+p_{8,183}+p_{8,143}+p_{8,79}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,360} = \frac{1}{2}p_{8,104} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,104}^2 - 4(p_{8,192}+p_{8,160}+p_{8,48}+p_{8,232}+p_{8,216}+2p_{7,4} \\ &+p_{8,36}+p_{7,100}+p_{8,148}+p_{8,172}+p_{8,108}+p_{7,60}+p_{8,34}+p_{8,98} \\ &+p_{8,210}+p_{8,154}+3p_{8,186}+p_{8,250}+p_{8,134}+p_{8,182}+p_{7,118} \\ &+p_{8,174}+p_{8,193}+2p_{8,33}+p_{8,145}+p_{8,81}+p_{8,137}+p_{8,169}+p_{8,185} \\ &+p_{8,133}+p_{8,165}+p_{8,101}+p_{8,21}+p_{8,213}+p_{8,141}+p_{8,157}+2p_{8,93} \\ &+p_{8,221}+p_{8,67}+p_{7,35}+p_{8,147}+p_{8,43}+2p_{8,107}+p_{8,155}+p_{8,91} \\ &+p_{8,123}+p_{8,23}+p_{8,183}+p_{8,143}+p_{8,79}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,232} = \frac{1}{2}p_{8,232} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,232}^2 - 4(p_{8,64}+p_{8,32}+p_{8,176}+p_{8,104}+p_{8,88}+2p_{7,4} \\ &+p_{8,164}+p_{7,100}+p_{8,20}+p_{8,44}+p_{8,236}+p_{7,60}+p_{8,162}+p_{8,226} \\ &+p_{8,82}+p_{8,26}+3p_{8,58}+p_{8,122}+p_{8,6}+p_{8,54}+p_{7,118}+p_{8,46} \\ &+p_{8,65}+2p_{8,161}+p_{8,17}+p_{8,209}+p_{8,9}+p_{8,41}+p_{8,57}+p_{8,5} \\ &+p_{8,37}+p_{8,229}+p_{8,149}+p_{8,85}+p_{8,13}+p_{8,29}+p_{8,93}+2p_{8,221} \\ &+p_{8,195}+p_{7,35}+p_{8,19}+p_{8,171}+2p_{8,235}+p_{8,27}+p_{8,219}+p_{8,251} \\ &+p_{8,151}+p_{8,55}+p_{8,15}+p_{8,207}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,488} = \frac{1}{2}p_{8,232} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,232}^2 - 4(p_{8,64}+p_{8,32}+p_{8,176}+p_{8,104}+p_{8,88}+2p_{7,4} \\ &+p_{8,164}+p_{7,100}+p_{8,20}+p_{8,44}+p_{8,236}+p_{7,60}+p_{8,162}+p_{8,226} \\ &+p_{8,82}+p_{8,26}+3p_{8,58}+p_{8,122}+p_{8,6}+p_{8,54}+p_{7,118}+p_{8,46} \\ &+p_{8,65}+2p_{8,161}+p_{8,17}+p_{8,209}+p_{8,9}+p_{8,41}+p_{8,57}+p_{8,5} \\ &+p_{8,37}+p_{8,229}+p_{8,149}+p_{8,85}+p_{8,13}+p_{8,29}+p_{8,93}+2p_{8,221} \\ &+p_{8,195}+p_{7,35}+p_{8,19}+p_{8,171}+2p_{8,235}+p_{8,27}+p_{8,219}+p_{8,251} \\ &+p_{8,151}+p_{8,55}+p_{8,15}+p_{8,207}+p_{7,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,24} = \frac{1}{2}p_{8,24} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,24}^2 - 4(p_{8,224}+p_{8,80}+p_{8,112}+p_{8,136}+p_{8,152}+p_{8,68} \\ &+p_{7,20}+p_{8,212}+2p_{7,52}+p_{7,108}+p_{8,28}+p_{8,92}+p_{8,130}+p_{8,18} \\ &+p_{8,210}+p_{8,74}+p_{8,170}+3p_{8,106}+p_{7,38}+p_{8,102}+p_{8,54}+p_{8,94} \\ &+p_{8,1}+p_{8,65}+2p_{8,209}+p_{8,113}+p_{8,105}+p_{8,89}+p_{8,57}+p_{8,133} \\ &+p_{8,197}+p_{8,21}+p_{8,85}+p_{8,53}+2p_{8,13}+p_{8,141}+p_{8,77}+p_{8,61} \\ &+p_{8,67}+p_{7,83}+p_{8,243}+p_{8,11}+p_{8,75}+p_{8,43}+2p_{8,27}+p_{8,219} \\ &+p_{8,199}+p_{8,103}+p_{7,31}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,280} = \frac{1}{2}p_{8,24} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,24}^2 - 4(p_{8,224}+p_{8,80}+p_{8,112}+p_{8,136}+p_{8,152}+p_{8,68} \\ &+p_{7,20}+p_{8,212}+2p_{7,52}+p_{7,108}+p_{8,28}+p_{8,92}+p_{8,130}+p_{8,18} \\ &+p_{8,210}+p_{8,74}+p_{8,170}+3p_{8,106}+p_{7,38}+p_{8,102}+p_{8,54}+p_{8,94} \\ &+p_{8,1}+p_{8,65}+2p_{8,209}+p_{8,113}+p_{8,105}+p_{8,89}+p_{8,57}+p_{8,133} \\ &+p_{8,197}+p_{8,21}+p_{8,85}+p_{8,53}+2p_{8,13}+p_{8,141}+p_{8,77}+p_{8,61} \\ &+p_{8,67}+p_{7,83}+p_{8,243}+p_{8,11}+p_{8,75}+p_{8,43}+2p_{8,27}+p_{8,219} \\ &+p_{8,199}+p_{8,103}+p_{7,31}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,152} = \frac{1}{2}p_{8,152} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,152}^2 - 4(p_{8,96}+p_{8,208}+p_{8,240}+p_{8,8}+p_{8,24}+p_{8,196} \\ &+p_{7,20}+p_{8,84}+2p_{7,52}+p_{7,108}+p_{8,156}+p_{8,220}+p_{8,2}+p_{8,146} \\ &+p_{8,82}+p_{8,202}+p_{8,42}+3p_{8,234}+p_{7,38}+p_{8,230}+p_{8,182}+p_{8,222} \\ &+p_{8,129}+p_{8,193}+2p_{8,81}+p_{8,241}+p_{8,233}+p_{8,217}+p_{8,185}+p_{8,5} \\ &+p_{8,69}+p_{8,149}+p_{8,213}+p_{8,181}+p_{8,13}+2p_{8,141}+p_{8,205}+p_{8,189} \\ &+p_{8,195}+p_{7,83}+p_{8,115}+p_{8,139}+p_{8,203}+p_{8,171}+2p_{8,155}+p_{8,91} \\ &+p_{8,71}+p_{8,231}+p_{7,31}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,408} = \frac{1}{2}p_{8,152} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,152}^2 - 4(p_{8,96}+p_{8,208}+p_{8,240}+p_{8,8}+p_{8,24}+p_{8,196} \\ &+p_{7,20}+p_{8,84}+2p_{7,52}+p_{7,108}+p_{8,156}+p_{8,220}+p_{8,2}+p_{8,146} \\ &+p_{8,82}+p_{8,202}+p_{8,42}+3p_{8,234}+p_{7,38}+p_{8,230}+p_{8,182}+p_{8,222} \\ &+p_{8,129}+p_{8,193}+2p_{8,81}+p_{8,241}+p_{8,233}+p_{8,217}+p_{8,185}+p_{8,5} \\ &+p_{8,69}+p_{8,149}+p_{8,213}+p_{8,181}+p_{8,13}+2p_{8,141}+p_{8,205}+p_{8,189} \\ &+p_{8,195}+p_{7,83}+p_{8,115}+p_{8,139}+p_{8,203}+p_{8,171}+2p_{8,155}+p_{8,91} \\ &+p_{8,71}+p_{8,231}+p_{7,31}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,88} = \frac{1}{2}p_{8,88} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,88}^2 - 4(p_{8,32}+p_{8,144}+p_{8,176}+p_{8,200}+p_{8,216}+p_{8,132} \\ &+p_{8,20}+p_{7,84}+2p_{7,116}+p_{7,44}+p_{8,156}+p_{8,92}+p_{8,194}+p_{8,18} \\ &+p_{8,82}+p_{8,138}+3p_{8,170}+p_{8,234}+p_{8,166}+p_{7,102}+p_{8,118} \\ &+p_{8,158}+p_{8,129}+p_{8,65}+2p_{8,17}+p_{8,177}+p_{8,169}+p_{8,153}+p_{8,121} \\ &+p_{8,5}+p_{8,197}+p_{8,149}+p_{8,85}+p_{8,117}+p_{8,141}+2p_{8,77}+p_{8,205} \\ &+p_{8,125}+p_{8,131}+p_{7,19}+p_{8,51}+p_{8,139}+p_{8,75}+p_{8,107}+p_{8,27} \\ &+2p_{8,91}+p_{8,7}+p_{8,167}+p_{7,95}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,344} = \frac{1}{2}p_{8,88} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,88}^2 - 4(p_{8,32}+p_{8,144}+p_{8,176}+p_{8,200}+p_{8,216}+p_{8,132} \\ &+p_{8,20}+p_{7,84}+2p_{7,116}+p_{7,44}+p_{8,156}+p_{8,92}+p_{8,194}+p_{8,18} \\ &+p_{8,82}+p_{8,138}+3p_{8,170}+p_{8,234}+p_{8,166}+p_{7,102}+p_{8,118} \\ &+p_{8,158}+p_{8,129}+p_{8,65}+2p_{8,17}+p_{8,177}+p_{8,169}+p_{8,153}+p_{8,121} \\ &+p_{8,5}+p_{8,197}+p_{8,149}+p_{8,85}+p_{8,117}+p_{8,141}+2p_{8,77}+p_{8,205} \\ &+p_{8,125}+p_{8,131}+p_{7,19}+p_{8,51}+p_{8,139}+p_{8,75}+p_{8,107}+p_{8,27} \\ &+2p_{8,91}+p_{8,7}+p_{8,167}+p_{7,95}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,216} = \frac{1}{2}p_{8,216} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,216}^2 - 4(p_{8,160}+p_{8,16}+p_{8,48}+p_{8,72}+p_{8,88}+p_{8,4} \\ &+p_{8,148}+p_{7,84}+2p_{7,116}+p_{7,44}+p_{8,28}+p_{8,220}+p_{8,66}+p_{8,146} \\ &+p_{8,210}+p_{8,10}+3p_{8,42}+p_{8,106}+p_{8,38}+p_{7,102}+p_{8,246}+p_{8,30} \\ &+p_{8,1}+p_{8,193}+2p_{8,145}+p_{8,49}+p_{8,41}+p_{8,25}+p_{8,249}+p_{8,133} \\ &+p_{8,69}+p_{8,21}+p_{8,213}+p_{8,245}+p_{8,13}+p_{8,77}+2p_{8,205}+p_{8,253} \\ &+p_{8,3}+p_{7,19}+p_{8,179}+p_{8,11}+p_{8,203}+p_{8,235}+p_{8,155}+2p_{8,219} \\ &+p_{8,135}+p_{8,39}+p_{7,95}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,472} = \frac{1}{2}p_{8,216} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,216}^2 - 4(p_{8,160}+p_{8,16}+p_{8,48}+p_{8,72}+p_{8,88}+p_{8,4} \\ &+p_{8,148}+p_{7,84}+2p_{7,116}+p_{7,44}+p_{8,28}+p_{8,220}+p_{8,66}+p_{8,146} \\ &+p_{8,210}+p_{8,10}+3p_{8,42}+p_{8,106}+p_{8,38}+p_{7,102}+p_{8,246}+p_{8,30} \\ &+p_{8,1}+p_{8,193}+2p_{8,145}+p_{8,49}+p_{8,41}+p_{8,25}+p_{8,249}+p_{8,133} \\ &+p_{8,69}+p_{8,21}+p_{8,213}+p_{8,245}+p_{8,13}+p_{8,77}+2p_{8,205}+p_{8,253} \\ &+p_{8,3}+p_{7,19}+p_{8,179}+p_{8,11}+p_{8,203}+p_{8,235}+p_{8,155}+2p_{8,219} \\ &+p_{8,135}+p_{8,39}+p_{7,95}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,56} = \frac{1}{2}p_{8,56} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,56}^2 - 4(p_{8,0}+p_{8,144}+p_{8,112}+p_{8,168}+p_{8,184}+p_{8,100} \\ &+2p_{7,84}+p_{7,52}+p_{8,244}+p_{7,12}+p_{8,60}+p_{8,124}+p_{8,162}+p_{8,50} \\ &+p_{8,242}+3p_{8,138}+p_{8,202}+p_{8,106}+p_{8,134}+p_{7,70}+p_{8,86}+p_{8,126} \\ &+p_{8,33}+p_{8,97}+p_{8,145}+2p_{8,241}+p_{8,137}+p_{8,89}+p_{8,121}+p_{8,165} \\ &+p_{8,229}+p_{8,85}+p_{8,53}+p_{8,117}+2p_{8,45}+p_{8,173}+p_{8,109}+p_{8,93} \\ &+p_{8,99}+p_{8,19}+p_{7,115}+p_{8,75}+p_{8,43}+p_{8,107}+2p_{8,59}+p_{8,251} \\ &+p_{8,135}+p_{8,231}+p_{8,31}+p_{8,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,312} = \frac{1}{2}p_{8,56} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,56}^2 - 4(p_{8,0}+p_{8,144}+p_{8,112}+p_{8,168}+p_{8,184}+p_{8,100} \\ &+2p_{7,84}+p_{7,52}+p_{8,244}+p_{7,12}+p_{8,60}+p_{8,124}+p_{8,162}+p_{8,50} \\ &+p_{8,242}+3p_{8,138}+p_{8,202}+p_{8,106}+p_{8,134}+p_{7,70}+p_{8,86}+p_{8,126} \\ &+p_{8,33}+p_{8,97}+p_{8,145}+2p_{8,241}+p_{8,137}+p_{8,89}+p_{8,121}+p_{8,165} \\ &+p_{8,229}+p_{8,85}+p_{8,53}+p_{8,117}+2p_{8,45}+p_{8,173}+p_{8,109}+p_{8,93} \\ &+p_{8,99}+p_{8,19}+p_{7,115}+p_{8,75}+p_{8,43}+p_{8,107}+2p_{8,59}+p_{8,251} \\ &+p_{8,135}+p_{8,231}+p_{8,31}+p_{8,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,184} = \frac{1}{2}p_{8,184} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,184}^2 - 4(p_{8,128}+p_{8,16}+p_{8,240}+p_{8,40}+p_{8,56}+p_{8,228} \\ &+2p_{7,84}+p_{7,52}+p_{8,116}+p_{7,12}+p_{8,188}+p_{8,252}+p_{8,34}+p_{8,178} \\ &+p_{8,114}+3p_{8,10}+p_{8,74}+p_{8,234}+p_{8,6}+p_{7,70}+p_{8,214}+p_{8,254} \\ &+p_{8,161}+p_{8,225}+p_{8,17}+2p_{8,113}+p_{8,9}+p_{8,217}+p_{8,249}+p_{8,37} \\ &+p_{8,101}+p_{8,213}+p_{8,181}+p_{8,245}+p_{8,45}+2p_{8,173}+p_{8,237}+p_{8,221} \\ &+p_{8,227}+p_{8,147}+p_{7,115}+p_{8,203}+p_{8,171}+p_{8,235}+2p_{8,187} \\ &+p_{8,123}+p_{8,7}+p_{8,103}+p_{8,159}+p_{8,223}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,440} = \frac{1}{2}p_{8,184} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,184}^2 - 4(p_{8,128}+p_{8,16}+p_{8,240}+p_{8,40}+p_{8,56}+p_{8,228} \\ &+2p_{7,84}+p_{7,52}+p_{8,116}+p_{7,12}+p_{8,188}+p_{8,252}+p_{8,34}+p_{8,178} \\ &+p_{8,114}+3p_{8,10}+p_{8,74}+p_{8,234}+p_{8,6}+p_{7,70}+p_{8,214}+p_{8,254} \\ &+p_{8,161}+p_{8,225}+p_{8,17}+2p_{8,113}+p_{8,9}+p_{8,217}+p_{8,249}+p_{8,37} \\ &+p_{8,101}+p_{8,213}+p_{8,181}+p_{8,245}+p_{8,45}+2p_{8,173}+p_{8,237}+p_{8,221} \\ &+p_{8,227}+p_{8,147}+p_{7,115}+p_{8,203}+p_{8,171}+p_{8,235}+2p_{8,187} \\ &+p_{8,123}+p_{8,7}+p_{8,103}+p_{8,159}+p_{8,223}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,120} = \frac{1}{2}p_{8,120} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,120}^2 - 4(p_{8,64}+p_{8,208}+p_{8,176}+p_{8,232}+p_{8,248}+p_{8,164} \\ &+2p_{7,20}+p_{8,52}+p_{7,116}+p_{7,76}+p_{8,188}+p_{8,124}+p_{8,226}+p_{8,50} \\ &+p_{8,114}+p_{8,10}+3p_{8,202}+p_{8,170}+p_{7,6}+p_{8,198}+p_{8,150}+p_{8,190} \\ &+p_{8,161}+p_{8,97}+p_{8,209}+2p_{8,49}+p_{8,201}+p_{8,153}+p_{8,185}+p_{8,37} \\ &+p_{8,229}+p_{8,149}+p_{8,181}+p_{8,117}+p_{8,173}+2p_{8,109}+p_{8,237} \\ &+p_{8,157}+p_{8,163}+p_{8,83}+p_{7,51}+p_{8,139}+p_{8,171}+p_{8,107}+p_{8,59} \\ &+2p_{8,123}+p_{8,199}+p_{8,39}+p_{8,159}+p_{8,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,376} = \frac{1}{2}p_{8,120} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,120}^2 - 4(p_{8,64}+p_{8,208}+p_{8,176}+p_{8,232}+p_{8,248}+p_{8,164} \\ &+2p_{7,20}+p_{8,52}+p_{7,116}+p_{7,76}+p_{8,188}+p_{8,124}+p_{8,226}+p_{8,50} \\ &+p_{8,114}+p_{8,10}+3p_{8,202}+p_{8,170}+p_{7,6}+p_{8,198}+p_{8,150}+p_{8,190} \\ &+p_{8,161}+p_{8,97}+p_{8,209}+2p_{8,49}+p_{8,201}+p_{8,153}+p_{8,185}+p_{8,37} \\ &+p_{8,229}+p_{8,149}+p_{8,181}+p_{8,117}+p_{8,173}+2p_{8,109}+p_{8,237} \\ &+p_{8,157}+p_{8,163}+p_{8,83}+p_{7,51}+p_{8,139}+p_{8,171}+p_{8,107}+p_{8,59} \\ &+2p_{8,123}+p_{8,199}+p_{8,39}+p_{8,159}+p_{8,95}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,248} = \frac{1}{2}p_{8,248} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,248}^2 - 4(p_{8,192}+p_{8,80}+p_{8,48}+p_{8,104}+p_{8,120}+p_{8,36} \\ &+2p_{7,20}+p_{8,180}+p_{7,116}+p_{7,76}+p_{8,60}+p_{8,252}+p_{8,98}+p_{8,178} \\ &+p_{8,242}+p_{8,138}+3p_{8,74}+p_{8,42}+p_{7,6}+p_{8,70}+p_{8,22}+p_{8,62} \\ &+p_{8,33}+p_{8,225}+p_{8,81}+2p_{8,177}+p_{8,73}+p_{8,25}+p_{8,57}+p_{8,165} \\ &+p_{8,101}+p_{8,21}+p_{8,53}+p_{8,245}+p_{8,45}+p_{8,109}+2p_{8,237}+p_{8,29} \\ &+p_{8,35}+p_{8,211}+p_{7,51}+p_{8,11}+p_{8,43}+p_{8,235}+p_{8,187}+2p_{8,251} \\ &+p_{8,71}+p_{8,167}+p_{8,31}+p_{8,223}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,504} = \frac{1}{2}p_{8,248} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,248}^2 - 4(p_{8,192}+p_{8,80}+p_{8,48}+p_{8,104}+p_{8,120}+p_{8,36} \\ &+2p_{7,20}+p_{8,180}+p_{7,116}+p_{7,76}+p_{8,60}+p_{8,252}+p_{8,98}+p_{8,178} \\ &+p_{8,242}+p_{8,138}+3p_{8,74}+p_{8,42}+p_{7,6}+p_{8,70}+p_{8,22}+p_{8,62} \\ &+p_{8,33}+p_{8,225}+p_{8,81}+2p_{8,177}+p_{8,73}+p_{8,25}+p_{8,57}+p_{8,165} \\ &+p_{8,101}+p_{8,21}+p_{8,53}+p_{8,245}+p_{8,45}+p_{8,109}+2p_{8,237}+p_{8,29} \\ &+p_{8,35}+p_{8,211}+p_{7,51}+p_{8,11}+p_{8,43}+p_{8,235}+p_{8,187}+2p_{8,251} \\ &+p_{8,71}+p_{8,167}+p_{8,31}+p_{8,223}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,4} = \frac{1}{2}p_{8,4} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,4}^2 - 4(p_{7,0}+p_{8,192}+2p_{7,32}+p_{8,48}+p_{8,8}+p_{8,72} \\ &+p_{7,88}+p_{8,132}+p_{8,116}+p_{8,204}+p_{8,92}+p_{8,60}+p_{8,34}+p_{7,18} \\ &+p_{8,82}+p_{8,74}+p_{8,150}+3p_{8,86}+p_{8,54}+p_{8,110}+p_{8,190}+p_{8,254} \\ &+p_{8,1}+p_{8,65}+p_{8,33}+p_{8,177}+p_{8,113}+p_{8,41}+p_{8,57}+p_{8,121} \\ &+2p_{8,249}+p_{8,69}+p_{8,37}+p_{8,85}+p_{8,45}+p_{8,237}+p_{8,93}+2p_{8,189} \\ &+p_{8,83}+p_{8,179}+p_{7,11}+p_{8,43}+p_{8,235}+2p_{8,7}+p_{8,199}+p_{8,23} \\ &+p_{8,55}+p_{8,247}+p_{8,47}+p_{8,223}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,260} = \frac{1}{2}p_{8,4} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,4}^2 - 4(p_{7,0}+p_{8,192}+2p_{7,32}+p_{8,48}+p_{8,8}+p_{8,72} \\ &+p_{7,88}+p_{8,132}+p_{8,116}+p_{8,204}+p_{8,92}+p_{8,60}+p_{8,34}+p_{7,18} \\ &+p_{8,82}+p_{8,74}+p_{8,150}+3p_{8,86}+p_{8,54}+p_{8,110}+p_{8,190}+p_{8,254} \\ &+p_{8,1}+p_{8,65}+p_{8,33}+p_{8,177}+p_{8,113}+p_{8,41}+p_{8,57}+p_{8,121} \\ &+2p_{8,249}+p_{8,69}+p_{8,37}+p_{8,85}+p_{8,45}+p_{8,237}+p_{8,93}+2p_{8,189} \\ &+p_{8,83}+p_{8,179}+p_{7,11}+p_{8,43}+p_{8,235}+2p_{8,7}+p_{8,199}+p_{8,23} \\ &+p_{8,55}+p_{8,247}+p_{8,47}+p_{8,223}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,132} = \frac{1}{2}p_{8,132} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,132}^2 - 4(p_{7,0}+p_{8,64}+2p_{7,32}+p_{8,176}+p_{8,136}+p_{8,200} \\ &+p_{7,88}+p_{8,4}+p_{8,244}+p_{8,76}+p_{8,220}+p_{8,188}+p_{8,162}+p_{7,18} \\ &+p_{8,210}+p_{8,202}+p_{8,22}+3p_{8,214}+p_{8,182}+p_{8,238}+p_{8,62}+p_{8,126} \\ &+p_{8,129}+p_{8,193}+p_{8,161}+p_{8,49}+p_{8,241}+p_{8,169}+p_{8,185}+2p_{8,121} \\ &+p_{8,249}+p_{8,197}+p_{8,165}+p_{8,213}+p_{8,173}+p_{8,109}+p_{8,221}+2p_{8,61} \\ &+p_{8,211}+p_{8,51}+p_{7,11}+p_{8,171}+p_{8,107}+2p_{8,135}+p_{8,71}+p_{8,151} \\ &+p_{8,183}+p_{8,119}+p_{8,175}+p_{8,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,388} = \frac{1}{2}p_{8,132} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,132}^2 - 4(p_{7,0}+p_{8,64}+2p_{7,32}+p_{8,176}+p_{8,136}+p_{8,200} \\ &+p_{7,88}+p_{8,4}+p_{8,244}+p_{8,76}+p_{8,220}+p_{8,188}+p_{8,162}+p_{7,18} \\ &+p_{8,210}+p_{8,202}+p_{8,22}+3p_{8,214}+p_{8,182}+p_{8,238}+p_{8,62}+p_{8,126} \\ &+p_{8,129}+p_{8,193}+p_{8,161}+p_{8,49}+p_{8,241}+p_{8,169}+p_{8,185}+2p_{8,121} \\ &+p_{8,249}+p_{8,197}+p_{8,165}+p_{8,213}+p_{8,173}+p_{8,109}+p_{8,221}+2p_{8,61} \\ &+p_{8,211}+p_{8,51}+p_{7,11}+p_{8,171}+p_{8,107}+2p_{8,135}+p_{8,71}+p_{8,151} \\ &+p_{8,183}+p_{8,119}+p_{8,175}+p_{8,95}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,68} = \frac{1}{2}p_{8,68} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,68}^2 - 4(p_{8,0}+p_{7,64}+2p_{7,96}+p_{8,112}+p_{8,136}+p_{8,72} \\ &+p_{7,24}+p_{8,196}+p_{8,180}+p_{8,12}+p_{8,156}+p_{8,124}+p_{8,98}+p_{8,146} \\ &+p_{7,82}+p_{8,138}+3p_{8,150}+p_{8,214}+p_{8,118}+p_{8,174}+p_{8,62}+p_{8,254} \\ &+p_{8,129}+p_{8,65}+p_{8,97}+p_{8,177}+p_{8,241}+p_{8,105}+2p_{8,57}+p_{8,185} \\ &+p_{8,121}+p_{8,133}+p_{8,101}+p_{8,149}+p_{8,45}+p_{8,109}+p_{8,157} \\ &+2p_{8,253}+p_{8,147}+p_{8,243}+p_{7,75}+p_{8,43}+p_{8,107}+p_{8,7}+2p_{8,71} \\ &+p_{8,87}+p_{8,55}+p_{8,119}+p_{8,111}+p_{8,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,324} = \frac{1}{2}p_{8,68} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,68}^2 - 4(p_{8,0}+p_{7,64}+2p_{7,96}+p_{8,112}+p_{8,136}+p_{8,72} \\ &+p_{7,24}+p_{8,196}+p_{8,180}+p_{8,12}+p_{8,156}+p_{8,124}+p_{8,98}+p_{8,146} \\ &+p_{7,82}+p_{8,138}+3p_{8,150}+p_{8,214}+p_{8,118}+p_{8,174}+p_{8,62}+p_{8,254} \\ &+p_{8,129}+p_{8,65}+p_{8,97}+p_{8,177}+p_{8,241}+p_{8,105}+2p_{8,57}+p_{8,185} \\ &+p_{8,121}+p_{8,133}+p_{8,101}+p_{8,149}+p_{8,45}+p_{8,109}+p_{8,157} \\ &+2p_{8,253}+p_{8,147}+p_{8,243}+p_{7,75}+p_{8,43}+p_{8,107}+p_{8,7}+2p_{8,71} \\ &+p_{8,87}+p_{8,55}+p_{8,119}+p_{8,111}+p_{8,31}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,196} = \frac{1}{2}p_{8,196} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,196}^2 - 4(p_{8,128}+p_{7,64}+2p_{7,96}+p_{8,240}+p_{8,8}+p_{8,200} \\ &+p_{7,24}+p_{8,68}+p_{8,52}+p_{8,140}+p_{8,28}+p_{8,252}+p_{8,226}+p_{8,18} \\ &+p_{7,82}+p_{8,10}+3p_{8,22}+p_{8,86}+p_{8,246}+p_{8,46}+p_{8,190}+p_{8,126} \\ &+p_{8,1}+p_{8,193}+p_{8,225}+p_{8,49}+p_{8,113}+p_{8,233}+p_{8,57}+2p_{8,185} \\ &+p_{8,249}+p_{8,5}+p_{8,229}+p_{8,21}+p_{8,173}+p_{8,237}+p_{8,29}+2p_{8,125} \\ &+p_{8,19}+p_{8,115}+p_{7,75}+p_{8,171}+p_{8,235}+p_{8,135}+2p_{8,199}+p_{8,215} \\ &+p_{8,183}+p_{8,247}+p_{8,239}+p_{8,159}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,452} = \frac{1}{2}p_{8,196} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,196}^2 - 4(p_{8,128}+p_{7,64}+2p_{7,96}+p_{8,240}+p_{8,8}+p_{8,200} \\ &+p_{7,24}+p_{8,68}+p_{8,52}+p_{8,140}+p_{8,28}+p_{8,252}+p_{8,226}+p_{8,18} \\ &+p_{7,82}+p_{8,10}+3p_{8,22}+p_{8,86}+p_{8,246}+p_{8,46}+p_{8,190}+p_{8,126} \\ &+p_{8,1}+p_{8,193}+p_{8,225}+p_{8,49}+p_{8,113}+p_{8,233}+p_{8,57}+2p_{8,185} \\ &+p_{8,249}+p_{8,5}+p_{8,229}+p_{8,21}+p_{8,173}+p_{8,237}+p_{8,29}+2p_{8,125} \\ &+p_{8,19}+p_{8,115}+p_{7,75}+p_{8,171}+p_{8,235}+p_{8,135}+2p_{8,199}+p_{8,215} \\ &+p_{8,183}+p_{8,247}+p_{8,239}+p_{8,159}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,36} = \frac{1}{2}p_{8,36} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,36}^2 - 4(2p_{7,64}+p_{7,32}+p_{8,224}+p_{8,80}+p_{8,40}+p_{8,104} \\ &+p_{7,120}+p_{8,164}+p_{8,148}+p_{8,236}+p_{8,92}+p_{8,124}+p_{8,66}+p_{7,50} \\ &+p_{8,114}+p_{8,106}+p_{8,86}+p_{8,182}+3p_{8,118}+p_{8,142}+p_{8,30} \\ &+p_{8,222}+p_{8,65}+p_{8,33}+p_{8,97}+p_{8,145}+p_{8,209}+p_{8,73}+2p_{8,25} \\ &+p_{8,153}+p_{8,89}+p_{8,69}+p_{8,101}+p_{8,117}+p_{8,13}+p_{8,77}+2p_{8,221} \\ &+p_{8,125}+p_{8,211}+p_{8,115}+p_{8,11}+p_{8,75}+p_{7,43}+2p_{8,39}+p_{8,231} \\ &+p_{8,23}+p_{8,87}+p_{8,55}+p_{8,79}+p_{7,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,292} = \frac{1}{2}p_{8,36} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,36}^2 - 4(2p_{7,64}+p_{7,32}+p_{8,224}+p_{8,80}+p_{8,40}+p_{8,104} \\ &+p_{7,120}+p_{8,164}+p_{8,148}+p_{8,236}+p_{8,92}+p_{8,124}+p_{8,66}+p_{7,50} \\ &+p_{8,114}+p_{8,106}+p_{8,86}+p_{8,182}+3p_{8,118}+p_{8,142}+p_{8,30} \\ &+p_{8,222}+p_{8,65}+p_{8,33}+p_{8,97}+p_{8,145}+p_{8,209}+p_{8,73}+2p_{8,25} \\ &+p_{8,153}+p_{8,89}+p_{8,69}+p_{8,101}+p_{8,117}+p_{8,13}+p_{8,77}+2p_{8,221} \\ &+p_{8,125}+p_{8,211}+p_{8,115}+p_{8,11}+p_{8,75}+p_{7,43}+2p_{8,39}+p_{8,231} \\ &+p_{8,23}+p_{8,87}+p_{8,55}+p_{8,79}+p_{7,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,164} = \frac{1}{2}p_{8,164} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,164}^2 - 4(2p_{7,64}+p_{7,32}+p_{8,96}+p_{8,208}+p_{8,168}+p_{8,232} \\ &+p_{7,120}+p_{8,36}+p_{8,20}+p_{8,108}+p_{8,220}+p_{8,252}+p_{8,194}+p_{7,50} \\ &+p_{8,242}+p_{8,234}+p_{8,214}+p_{8,54}+3p_{8,246}+p_{8,14}+p_{8,158}+p_{8,94} \\ &+p_{8,193}+p_{8,161}+p_{8,225}+p_{8,17}+p_{8,81}+p_{8,201}+p_{8,25}+2p_{8,153} \\ &+p_{8,217}+p_{8,197}+p_{8,229}+p_{8,245}+p_{8,141}+p_{8,205}+2p_{8,93}+p_{8,253} \\ &+p_{8,83}+p_{8,243}+p_{8,139}+p_{8,203}+p_{7,43}+2p_{8,167}+p_{8,103}+p_{8,151} \\ &+p_{8,215}+p_{8,183}+p_{8,207}+p_{7,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,420} = \frac{1}{2}p_{8,164} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,164}^2 - 4(2p_{7,64}+p_{7,32}+p_{8,96}+p_{8,208}+p_{8,168}+p_{8,232} \\ &+p_{7,120}+p_{8,36}+p_{8,20}+p_{8,108}+p_{8,220}+p_{8,252}+p_{8,194}+p_{7,50} \\ &+p_{8,242}+p_{8,234}+p_{8,214}+p_{8,54}+3p_{8,246}+p_{8,14}+p_{8,158}+p_{8,94} \\ &+p_{8,193}+p_{8,161}+p_{8,225}+p_{8,17}+p_{8,81}+p_{8,201}+p_{8,25}+2p_{8,153} \\ &+p_{8,217}+p_{8,197}+p_{8,229}+p_{8,245}+p_{8,141}+p_{8,205}+2p_{8,93}+p_{8,253} \\ &+p_{8,83}+p_{8,243}+p_{8,139}+p_{8,203}+p_{7,43}+2p_{8,167}+p_{8,103}+p_{8,151} \\ &+p_{8,215}+p_{8,183}+p_{8,207}+p_{7,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,100} = \frac{1}{2}p_{8,100} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,100}^2 - 4(2p_{7,0}+p_{8,32}+p_{7,96}+p_{8,144}+p_{8,168}+p_{8,104} \\ &+p_{7,56}+p_{8,228}+p_{8,212}+p_{8,44}+p_{8,156}+p_{8,188}+p_{8,130}+p_{8,178} \\ &+p_{7,114}+p_{8,170}+p_{8,150}+3p_{8,182}+p_{8,246}+p_{8,206}+p_{8,30}+p_{8,94} \\ &+p_{8,129}+p_{8,161}+p_{8,97}+p_{8,17}+p_{8,209}+p_{8,137}+p_{8,153}+2p_{8,89} \\ &+p_{8,217}+p_{8,133}+p_{8,165}+p_{8,181}+p_{8,141}+p_{8,77}+2p_{8,29}+p_{8,189} \\ &+p_{8,19}+p_{8,179}+p_{8,139}+p_{8,75}+p_{7,107}+p_{8,39}+2p_{8,103}+p_{8,151} \\ &+p_{8,87}+p_{8,119}+p_{8,143}+p_{7,31}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,356} = \frac{1}{2}p_{8,100} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,100}^2 - 4(2p_{7,0}+p_{8,32}+p_{7,96}+p_{8,144}+p_{8,168}+p_{8,104} \\ &+p_{7,56}+p_{8,228}+p_{8,212}+p_{8,44}+p_{8,156}+p_{8,188}+p_{8,130}+p_{8,178} \\ &+p_{7,114}+p_{8,170}+p_{8,150}+3p_{8,182}+p_{8,246}+p_{8,206}+p_{8,30}+p_{8,94} \\ &+p_{8,129}+p_{8,161}+p_{8,97}+p_{8,17}+p_{8,209}+p_{8,137}+p_{8,153}+2p_{8,89} \\ &+p_{8,217}+p_{8,133}+p_{8,165}+p_{8,181}+p_{8,141}+p_{8,77}+2p_{8,29}+p_{8,189} \\ &+p_{8,19}+p_{8,179}+p_{8,139}+p_{8,75}+p_{7,107}+p_{8,39}+2p_{8,103}+p_{8,151} \\ &+p_{8,87}+p_{8,119}+p_{8,143}+p_{7,31}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,228} = \frac{1}{2}p_{8,228} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,228}^2 - 4(2p_{7,0}+p_{8,160}+p_{7,96}+p_{8,16}+p_{8,40}+p_{8,232} \\ &+p_{7,56}+p_{8,100}+p_{8,84}+p_{8,172}+p_{8,28}+p_{8,60}+p_{8,2}+p_{8,50} \\ &+p_{7,114}+p_{8,42}+p_{8,22}+3p_{8,54}+p_{8,118}+p_{8,78}+p_{8,158}+p_{8,222} \\ &+p_{8,1}+p_{8,33}+p_{8,225}+p_{8,145}+p_{8,81}+p_{8,9}+p_{8,25}+p_{8,89} \\ &+2p_{8,217}+p_{8,5}+p_{8,37}+p_{8,53}+p_{8,13}+p_{8,205}+2p_{8,157}+p_{8,61} \\ &+p_{8,147}+p_{8,51}+p_{8,11}+p_{8,203}+p_{7,107}+p_{8,167}+2p_{8,231} \\ &+p_{8,23}+p_{8,215}+p_{8,247}+p_{8,15}+p_{7,31}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,484} = \frac{1}{2}p_{8,228} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,228}^2 - 4(2p_{7,0}+p_{8,160}+p_{7,96}+p_{8,16}+p_{8,40}+p_{8,232} \\ &+p_{7,56}+p_{8,100}+p_{8,84}+p_{8,172}+p_{8,28}+p_{8,60}+p_{8,2}+p_{8,50} \\ &+p_{7,114}+p_{8,42}+p_{8,22}+3p_{8,54}+p_{8,118}+p_{8,78}+p_{8,158}+p_{8,222} \\ &+p_{8,1}+p_{8,33}+p_{8,225}+p_{8,145}+p_{8,81}+p_{8,9}+p_{8,25}+p_{8,89} \\ &+2p_{8,217}+p_{8,5}+p_{8,37}+p_{8,53}+p_{8,13}+p_{8,205}+2p_{8,157}+p_{8,61} \\ &+p_{8,147}+p_{8,51}+p_{8,11}+p_{8,203}+p_{7,107}+p_{8,167}+2p_{8,231} \\ &+p_{8,23}+p_{8,215}+p_{8,247}+p_{8,15}+p_{7,31}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,20} = \frac{1}{2}p_{8,20} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,20}^2 - 4(p_{8,64}+p_{7,16}+p_{8,208}+2p_{7,48}+p_{7,104}+p_{8,24} \\ &+p_{8,88}+p_{8,132}+p_{8,148}+p_{8,76}+p_{8,108}+p_{8,220}+p_{7,34}+p_{8,98} \\ &+p_{8,50}+p_{8,90}+p_{8,70}+p_{8,166}+3p_{8,102}+p_{8,14}+p_{8,206}+p_{8,126} \\ &+p_{8,129}+p_{8,193}+p_{8,17}+p_{8,81}+p_{8,49}+2p_{8,9}+p_{8,137}+p_{8,73} \\ &+p_{8,57}+p_{8,101}+p_{8,85}+p_{8,53}+2p_{8,205}+p_{8,109}+p_{8,61}+p_{8,253} \\ &+p_{8,195}+p_{8,99}+p_{7,27}+p_{8,59}+p_{8,251}+p_{8,7}+p_{8,71}+p_{8,39} \\ &+2p_{8,23}+p_{8,215}+p_{7,79}+p_{8,239}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,276} = \frac{1}{2}p_{8,20} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,20}^2 - 4(p_{8,64}+p_{7,16}+p_{8,208}+2p_{7,48}+p_{7,104}+p_{8,24} \\ &+p_{8,88}+p_{8,132}+p_{8,148}+p_{8,76}+p_{8,108}+p_{8,220}+p_{7,34}+p_{8,98} \\ &+p_{8,50}+p_{8,90}+p_{8,70}+p_{8,166}+3p_{8,102}+p_{8,14}+p_{8,206}+p_{8,126} \\ &+p_{8,129}+p_{8,193}+p_{8,17}+p_{8,81}+p_{8,49}+2p_{8,9}+p_{8,137}+p_{8,73} \\ &+p_{8,57}+p_{8,101}+p_{8,85}+p_{8,53}+2p_{8,205}+p_{8,109}+p_{8,61}+p_{8,253} \\ &+p_{8,195}+p_{8,99}+p_{7,27}+p_{8,59}+p_{8,251}+p_{8,7}+p_{8,71}+p_{8,39} \\ &+2p_{8,23}+p_{8,215}+p_{7,79}+p_{8,239}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,148} = \frac{1}{2}p_{8,148} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,148}^2 - 4(p_{8,192}+p_{7,16}+p_{8,80}+2p_{7,48}+p_{7,104}+p_{8,152} \\ &+p_{8,216}+p_{8,4}+p_{8,20}+p_{8,204}+p_{8,236}+p_{8,92}+p_{7,34}+p_{8,226} \\ &+p_{8,178}+p_{8,218}+p_{8,198}+p_{8,38}+3p_{8,230}+p_{8,142}+p_{8,78}+p_{8,254} \\ &+p_{8,1}+p_{8,65}+p_{8,145}+p_{8,209}+p_{8,177}+p_{8,9}+2p_{8,137}+p_{8,201} \\ &+p_{8,185}+p_{8,229}+p_{8,213}+p_{8,181}+2p_{8,77}+p_{8,237}+p_{8,189}+p_{8,125} \\ &+p_{8,67}+p_{8,227}+p_{7,27}+p_{8,187}+p_{8,123}+p_{8,135}+p_{8,199}+p_{8,167} \\ &+2p_{8,151}+p_{8,87}+p_{7,79}+p_{8,111}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,404} = \frac{1}{2}p_{8,148} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,148}^2 - 4(p_{8,192}+p_{7,16}+p_{8,80}+2p_{7,48}+p_{7,104}+p_{8,152} \\ &+p_{8,216}+p_{8,4}+p_{8,20}+p_{8,204}+p_{8,236}+p_{8,92}+p_{7,34}+p_{8,226} \\ &+p_{8,178}+p_{8,218}+p_{8,198}+p_{8,38}+3p_{8,230}+p_{8,142}+p_{8,78}+p_{8,254} \\ &+p_{8,1}+p_{8,65}+p_{8,145}+p_{8,209}+p_{8,177}+p_{8,9}+2p_{8,137}+p_{8,201} \\ &+p_{8,185}+p_{8,229}+p_{8,213}+p_{8,181}+2p_{8,77}+p_{8,237}+p_{8,189}+p_{8,125} \\ &+p_{8,67}+p_{8,227}+p_{7,27}+p_{8,187}+p_{8,123}+p_{8,135}+p_{8,199}+p_{8,167} \\ &+2p_{8,151}+p_{8,87}+p_{7,79}+p_{8,111}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,84} = \frac{1}{2}p_{8,84} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,84}^2 - 4(p_{8,128}+p_{8,16}+p_{7,80}+2p_{7,112}+p_{7,40}+p_{8,152} \\ &+p_{8,88}+p_{8,196}+p_{8,212}+p_{8,140}+p_{8,172}+p_{8,28}+p_{8,162}+p_{7,98} \\ &+p_{8,114}+p_{8,154}+p_{8,134}+3p_{8,166}+p_{8,230}+p_{8,14}+p_{8,78}+p_{8,190} \\ &+p_{8,1}+p_{8,193}+p_{8,145}+p_{8,81}+p_{8,113}+p_{8,137}+2p_{8,73}+p_{8,201} \\ &+p_{8,121}+p_{8,165}+p_{8,149}+p_{8,117}+2p_{8,13}+p_{8,173}+p_{8,61}+p_{8,125} \\ &+p_{8,3}+p_{8,163}+p_{7,91}+p_{8,59}+p_{8,123}+p_{8,135}+p_{8,71}+p_{8,103} \\ &+p_{8,23}+2p_{8,87}+p_{7,15}+p_{8,47}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,340} = \frac{1}{2}p_{8,84} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,84}^2 - 4(p_{8,128}+p_{8,16}+p_{7,80}+2p_{7,112}+p_{7,40}+p_{8,152} \\ &+p_{8,88}+p_{8,196}+p_{8,212}+p_{8,140}+p_{8,172}+p_{8,28}+p_{8,162}+p_{7,98} \\ &+p_{8,114}+p_{8,154}+p_{8,134}+3p_{8,166}+p_{8,230}+p_{8,14}+p_{8,78}+p_{8,190} \\ &+p_{8,1}+p_{8,193}+p_{8,145}+p_{8,81}+p_{8,113}+p_{8,137}+2p_{8,73}+p_{8,201} \\ &+p_{8,121}+p_{8,165}+p_{8,149}+p_{8,117}+2p_{8,13}+p_{8,173}+p_{8,61}+p_{8,125} \\ &+p_{8,3}+p_{8,163}+p_{7,91}+p_{8,59}+p_{8,123}+p_{8,135}+p_{8,71}+p_{8,103} \\ &+p_{8,23}+2p_{8,87}+p_{7,15}+p_{8,47}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,212} = \frac{1}{2}p_{8,212} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,212}^2 - 4(p_{8,0}+p_{8,144}+p_{7,80}+2p_{7,112}+p_{7,40}+p_{8,24} \\ &+p_{8,216}+p_{8,68}+p_{8,84}+p_{8,12}+p_{8,44}+p_{8,156}+p_{8,34}+p_{7,98} \\ &+p_{8,242}+p_{8,26}+p_{8,6}+3p_{8,38}+p_{8,102}+p_{8,142}+p_{8,206}+p_{8,62} \\ &+p_{8,129}+p_{8,65}+p_{8,17}+p_{8,209}+p_{8,241}+p_{8,9}+p_{8,73}+2p_{8,201} \\ &+p_{8,249}+p_{8,37}+p_{8,21}+p_{8,245}+2p_{8,141}+p_{8,45}+p_{8,189}+p_{8,253} \\ &+p_{8,131}+p_{8,35}+p_{7,91}+p_{8,187}+p_{8,251}+p_{8,7}+p_{8,199}+p_{8,231} \\ &+p_{8,151}+2p_{8,215}+p_{7,15}+p_{8,175}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,468} = \frac{1}{2}p_{8,212} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,212}^2 - 4(p_{8,0}+p_{8,144}+p_{7,80}+2p_{7,112}+p_{7,40}+p_{8,24} \\ &+p_{8,216}+p_{8,68}+p_{8,84}+p_{8,12}+p_{8,44}+p_{8,156}+p_{8,34}+p_{7,98} \\ &+p_{8,242}+p_{8,26}+p_{8,6}+3p_{8,38}+p_{8,102}+p_{8,142}+p_{8,206}+p_{8,62} \\ &+p_{8,129}+p_{8,65}+p_{8,17}+p_{8,209}+p_{8,241}+p_{8,9}+p_{8,73}+2p_{8,201} \\ &+p_{8,249}+p_{8,37}+p_{8,21}+p_{8,245}+2p_{8,141}+p_{8,45}+p_{8,189}+p_{8,253} \\ &+p_{8,131}+p_{8,35}+p_{7,91}+p_{8,187}+p_{8,251}+p_{8,7}+p_{8,199}+p_{8,231} \\ &+p_{8,151}+2p_{8,215}+p_{7,15}+p_{8,175}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,52} = \frac{1}{2}p_{8,52} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,52}^2 - 4(p_{8,96}+2p_{7,80}+p_{7,48}+p_{8,240}+p_{7,8}+p_{8,56} \\ &+p_{8,120}+p_{8,164}+p_{8,180}+p_{8,140}+p_{8,108}+p_{8,252}+p_{8,130}+p_{7,66} \\ &+p_{8,82}+p_{8,122}+3p_{8,134}+p_{8,198}+p_{8,102}+p_{8,46}+p_{8,238}+p_{8,158} \\ &+p_{8,161}+p_{8,225}+p_{8,81}+p_{8,49}+p_{8,113}+2p_{8,41}+p_{8,169}+p_{8,105} \\ &+p_{8,89}+p_{8,133}+p_{8,85}+p_{8,117}+p_{8,141}+2p_{8,237}+p_{8,29}+p_{8,93} \\ &+p_{8,131}+p_{8,227}+p_{8,27}+p_{8,91}+p_{7,59}+p_{8,71}+p_{8,39}+p_{8,103} \\ &+2p_{8,55}+p_{8,247}+p_{8,15}+p_{7,111}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,308} = \frac{1}{2}p_{8,52} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,52}^2 - 4(p_{8,96}+2p_{7,80}+p_{7,48}+p_{8,240}+p_{7,8}+p_{8,56} \\ &+p_{8,120}+p_{8,164}+p_{8,180}+p_{8,140}+p_{8,108}+p_{8,252}+p_{8,130}+p_{7,66} \\ &+p_{8,82}+p_{8,122}+3p_{8,134}+p_{8,198}+p_{8,102}+p_{8,46}+p_{8,238}+p_{8,158} \\ &+p_{8,161}+p_{8,225}+p_{8,81}+p_{8,49}+p_{8,113}+2p_{8,41}+p_{8,169}+p_{8,105} \\ &+p_{8,89}+p_{8,133}+p_{8,85}+p_{8,117}+p_{8,141}+2p_{8,237}+p_{8,29}+p_{8,93} \\ &+p_{8,131}+p_{8,227}+p_{8,27}+p_{8,91}+p_{7,59}+p_{8,71}+p_{8,39}+p_{8,103} \\ &+2p_{8,55}+p_{8,247}+p_{8,15}+p_{7,111}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,180} = \frac{1}{2}p_{8,180} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,180}^2 - 4(p_{8,224}+2p_{7,80}+p_{7,48}+p_{8,112}+p_{7,8}+p_{8,184} \\ &+p_{8,248}+p_{8,36}+p_{8,52}+p_{8,12}+p_{8,236}+p_{8,124}+p_{8,2}+p_{7,66} \\ &+p_{8,210}+p_{8,250}+3p_{8,6}+p_{8,70}+p_{8,230}+p_{8,174}+p_{8,110}+p_{8,30} \\ &+p_{8,33}+p_{8,97}+p_{8,209}+p_{8,177}+p_{8,241}+p_{8,41}+2p_{8,169}+p_{8,233} \\ &+p_{8,217}+p_{8,5}+p_{8,213}+p_{8,245}+p_{8,13}+2p_{8,109}+p_{8,157}+p_{8,221} \\ &+p_{8,3}+p_{8,99}+p_{8,155}+p_{8,219}+p_{7,59}+p_{8,199}+p_{8,167}+p_{8,231} \\ &+2p_{8,183}+p_{8,119}+p_{8,143}+p_{7,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,436} = \frac{1}{2}p_{8,180} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,180}^2 - 4(p_{8,224}+2p_{7,80}+p_{7,48}+p_{8,112}+p_{7,8}+p_{8,184} \\ &+p_{8,248}+p_{8,36}+p_{8,52}+p_{8,12}+p_{8,236}+p_{8,124}+p_{8,2}+p_{7,66} \\ &+p_{8,210}+p_{8,250}+3p_{8,6}+p_{8,70}+p_{8,230}+p_{8,174}+p_{8,110}+p_{8,30} \\ &+p_{8,33}+p_{8,97}+p_{8,209}+p_{8,177}+p_{8,241}+p_{8,41}+2p_{8,169}+p_{8,233} \\ &+p_{8,217}+p_{8,5}+p_{8,213}+p_{8,245}+p_{8,13}+2p_{8,109}+p_{8,157}+p_{8,221} \\ &+p_{8,3}+p_{8,99}+p_{8,155}+p_{8,219}+p_{7,59}+p_{8,199}+p_{8,167}+p_{8,231} \\ &+2p_{8,183}+p_{8,119}+p_{8,143}+p_{7,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,116} = \frac{1}{2}p_{8,116} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,116}^2 - 4(p_{8,160}+2p_{7,16}+p_{8,48}+p_{7,112}+p_{7,72}+p_{8,184} \\ &+p_{8,120}+p_{8,228}+p_{8,244}+p_{8,204}+p_{8,172}+p_{8,60}+p_{7,2}+p_{8,194} \\ &+p_{8,146}+p_{8,186}+p_{8,6}+3p_{8,198}+p_{8,166}+p_{8,46}+p_{8,110}+p_{8,222} \\ &+p_{8,33}+p_{8,225}+p_{8,145}+p_{8,177}+p_{8,113}+p_{8,169}+2p_{8,105}+p_{8,233} \\ &+p_{8,153}+p_{8,197}+p_{8,149}+p_{8,181}+p_{8,205}+2p_{8,45}+p_{8,157}+p_{8,93} \\ &+p_{8,195}+p_{8,35}+p_{8,155}+p_{8,91}+p_{7,123}+p_{8,135}+p_{8,167}+p_{8,103} \\ &+p_{8,55}+2p_{8,119}+p_{8,79}+p_{7,47}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,372} = \frac{1}{2}p_{8,116} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,116}^2 - 4(p_{8,160}+2p_{7,16}+p_{8,48}+p_{7,112}+p_{7,72}+p_{8,184} \\ &+p_{8,120}+p_{8,228}+p_{8,244}+p_{8,204}+p_{8,172}+p_{8,60}+p_{7,2}+p_{8,194} \\ &+p_{8,146}+p_{8,186}+p_{8,6}+3p_{8,198}+p_{8,166}+p_{8,46}+p_{8,110}+p_{8,222} \\ &+p_{8,33}+p_{8,225}+p_{8,145}+p_{8,177}+p_{8,113}+p_{8,169}+2p_{8,105}+p_{8,233} \\ &+p_{8,153}+p_{8,197}+p_{8,149}+p_{8,181}+p_{8,205}+2p_{8,45}+p_{8,157}+p_{8,93} \\ &+p_{8,195}+p_{8,35}+p_{8,155}+p_{8,91}+p_{7,123}+p_{8,135}+p_{8,167}+p_{8,103} \\ &+p_{8,55}+2p_{8,119}+p_{8,79}+p_{7,47}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,244} = \frac{1}{2}p_{8,244} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,244}^2 - 4(p_{8,32}+2p_{7,16}+p_{8,176}+p_{7,112}+p_{7,72}+p_{8,56} \\ &+p_{8,248}+p_{8,100}+p_{8,116}+p_{8,76}+p_{8,44}+p_{8,188}+p_{7,2}+p_{8,66} \\ &+p_{8,18}+p_{8,58}+p_{8,134}+3p_{8,70}+p_{8,38}+p_{8,174}+p_{8,238}+p_{8,94} \\ &+p_{8,161}+p_{8,97}+p_{8,17}+p_{8,49}+p_{8,241}+p_{8,41}+p_{8,105}+2p_{8,233} \\ &+p_{8,25}+p_{8,69}+p_{8,21}+p_{8,53}+p_{8,77}+2p_{8,173}+p_{8,29}+p_{8,221} \\ &+p_{8,67}+p_{8,163}+p_{8,27}+p_{8,219}+p_{7,123}+p_{8,7}+p_{8,39}+p_{8,231} \\ &+p_{8,183}+2p_{8,247}+p_{8,207}+p_{7,47}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,500} = \frac{1}{2}p_{8,244} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,244}^2 - 4(p_{8,32}+2p_{7,16}+p_{8,176}+p_{7,112}+p_{7,72}+p_{8,56} \\ &+p_{8,248}+p_{8,100}+p_{8,116}+p_{8,76}+p_{8,44}+p_{8,188}+p_{7,2}+p_{8,66} \\ &+p_{8,18}+p_{8,58}+p_{8,134}+3p_{8,70}+p_{8,38}+p_{8,174}+p_{8,238}+p_{8,94} \\ &+p_{8,161}+p_{8,97}+p_{8,17}+p_{8,49}+p_{8,241}+p_{8,41}+p_{8,105}+2p_{8,233} \\ &+p_{8,25}+p_{8,69}+p_{8,21}+p_{8,53}+p_{8,77}+2p_{8,173}+p_{8,29}+p_{8,221} \\ &+p_{8,67}+p_{8,163}+p_{8,27}+p_{8,219}+p_{7,123}+p_{8,7}+p_{8,39}+p_{8,231} \\ &+p_{8,183}+2p_{8,247}+p_{8,207}+p_{7,47}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,12} = \frac{1}{2}p_{8,12} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,12}^2 - 4(p_{7,96}+p_{8,16}+p_{8,80}+p_{7,8}+p_{8,200}+2p_{7,40} \\ &+p_{8,56}+p_{8,68}+p_{8,100}+p_{8,212}+p_{8,140}+p_{8,124}+p_{8,82}+p_{8,42} \\ &+p_{7,26}+p_{8,90}+p_{8,6}+p_{8,198}+p_{8,118}+p_{8,158}+3p_{8,94}+p_{8,62} \\ &+2p_{8,1}+p_{8,129}+p_{8,65}+p_{8,49}+p_{8,9}+p_{8,73}+p_{8,41}+p_{8,185} \\ &+p_{8,121}+2p_{8,197}+p_{8,101}+p_{8,53}+p_{8,245}+p_{8,77}+p_{8,45}+p_{8,93} \\ &+p_{7,19}+p_{8,51}+p_{8,243}+p_{8,91}+p_{8,187}+p_{7,71}+p_{8,231}+p_{8,55} \\ &+2p_{8,15}+p_{8,207}+p_{8,31}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,268} = \frac{1}{2}p_{8,12} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,12}^2 - 4(p_{7,96}+p_{8,16}+p_{8,80}+p_{7,8}+p_{8,200}+2p_{7,40} \\ &+p_{8,56}+p_{8,68}+p_{8,100}+p_{8,212}+p_{8,140}+p_{8,124}+p_{8,82}+p_{8,42} \\ &+p_{7,26}+p_{8,90}+p_{8,6}+p_{8,198}+p_{8,118}+p_{8,158}+3p_{8,94}+p_{8,62} \\ &+2p_{8,1}+p_{8,129}+p_{8,65}+p_{8,49}+p_{8,9}+p_{8,73}+p_{8,41}+p_{8,185} \\ &+p_{8,121}+2p_{8,197}+p_{8,101}+p_{8,53}+p_{8,245}+p_{8,77}+p_{8,45}+p_{8,93} \\ &+p_{7,19}+p_{8,51}+p_{8,243}+p_{8,91}+p_{8,187}+p_{7,71}+p_{8,231}+p_{8,55} \\ &+2p_{8,15}+p_{8,207}+p_{8,31}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,140} = \frac{1}{2}p_{8,140} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,140}^2 - 4(p_{7,96}+p_{8,144}+p_{8,208}+p_{7,8}+p_{8,72}+2p_{7,40} \\ &+p_{8,184}+p_{8,196}+p_{8,228}+p_{8,84}+p_{8,12}+p_{8,252}+p_{8,210}+p_{8,170} \\ &+p_{7,26}+p_{8,218}+p_{8,134}+p_{8,70}+p_{8,246}+p_{8,30}+3p_{8,222}+p_{8,190} \\ &+p_{8,1}+2p_{8,129}+p_{8,193}+p_{8,177}+p_{8,137}+p_{8,201}+p_{8,169}+p_{8,57} \\ &+p_{8,249}+2p_{8,69}+p_{8,229}+p_{8,181}+p_{8,117}+p_{8,205}+p_{8,173}+p_{8,221} \\ &+p_{7,19}+p_{8,179}+p_{8,115}+p_{8,219}+p_{8,59}+p_{7,71}+p_{8,103}+p_{8,183} \\ &+2p_{8,143}+p_{8,79}+p_{8,159}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,396} = \frac{1}{2}p_{8,140} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,140}^2 - 4(p_{7,96}+p_{8,144}+p_{8,208}+p_{7,8}+p_{8,72}+2p_{7,40} \\ &+p_{8,184}+p_{8,196}+p_{8,228}+p_{8,84}+p_{8,12}+p_{8,252}+p_{8,210}+p_{8,170} \\ &+p_{7,26}+p_{8,218}+p_{8,134}+p_{8,70}+p_{8,246}+p_{8,30}+3p_{8,222}+p_{8,190} \\ &+p_{8,1}+2p_{8,129}+p_{8,193}+p_{8,177}+p_{8,137}+p_{8,201}+p_{8,169}+p_{8,57} \\ &+p_{8,249}+2p_{8,69}+p_{8,229}+p_{8,181}+p_{8,117}+p_{8,205}+p_{8,173}+p_{8,221} \\ &+p_{7,19}+p_{8,179}+p_{8,115}+p_{8,219}+p_{8,59}+p_{7,71}+p_{8,103}+p_{8,183} \\ &+2p_{8,143}+p_{8,79}+p_{8,159}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,76} = \frac{1}{2}p_{8,76} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,76}^2 - 4(p_{7,32}+p_{8,144}+p_{8,80}+p_{8,8}+p_{7,72}+2p_{7,104} \\ &+p_{8,120}+p_{8,132}+p_{8,164}+p_{8,20}+p_{8,204}+p_{8,188}+p_{8,146}+p_{8,106} \\ &+p_{8,154}+p_{7,90}+p_{8,6}+p_{8,70}+p_{8,182}+3p_{8,158}+p_{8,222}+p_{8,126} \\ &+p_{8,129}+2p_{8,65}+p_{8,193}+p_{8,113}+p_{8,137}+p_{8,73}+p_{8,105}+p_{8,185} \\ &+p_{8,249}+2p_{8,5}+p_{8,165}+p_{8,53}+p_{8,117}+p_{8,141}+p_{8,109}+p_{8,157} \\ &+p_{7,83}+p_{8,51}+p_{8,115}+p_{8,155}+p_{8,251}+p_{7,7}+p_{8,39}+p_{8,119} \\ &+p_{8,15}+2p_{8,79}+p_{8,95}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,332} = \frac{1}{2}p_{8,76} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,76}^2 - 4(p_{7,32}+p_{8,144}+p_{8,80}+p_{8,8}+p_{7,72}+2p_{7,104} \\ &+p_{8,120}+p_{8,132}+p_{8,164}+p_{8,20}+p_{8,204}+p_{8,188}+p_{8,146}+p_{8,106} \\ &+p_{8,154}+p_{7,90}+p_{8,6}+p_{8,70}+p_{8,182}+3p_{8,158}+p_{8,222}+p_{8,126} \\ &+p_{8,129}+2p_{8,65}+p_{8,193}+p_{8,113}+p_{8,137}+p_{8,73}+p_{8,105}+p_{8,185} \\ &+p_{8,249}+2p_{8,5}+p_{8,165}+p_{8,53}+p_{8,117}+p_{8,141}+p_{8,109}+p_{8,157} \\ &+p_{7,83}+p_{8,51}+p_{8,115}+p_{8,155}+p_{8,251}+p_{7,7}+p_{8,39}+p_{8,119} \\ &+p_{8,15}+2p_{8,79}+p_{8,95}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,204} = \frac{1}{2}p_{8,204} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,204}^2 - 4(p_{7,32}+p_{8,16}+p_{8,208}+p_{8,136}+p_{7,72}+2p_{7,104} \\ &+p_{8,248}+p_{8,4}+p_{8,36}+p_{8,148}+p_{8,76}+p_{8,60}+p_{8,18}+p_{8,234} \\ &+p_{8,26}+p_{7,90}+p_{8,134}+p_{8,198}+p_{8,54}+3p_{8,30}+p_{8,94}+p_{8,254} \\ &+p_{8,1}+p_{8,65}+2p_{8,193}+p_{8,241}+p_{8,9}+p_{8,201}+p_{8,233}+p_{8,57} \\ &+p_{8,121}+2p_{8,133}+p_{8,37}+p_{8,181}+p_{8,245}+p_{8,13}+p_{8,237}+p_{8,29} \\ &+p_{7,83}+p_{8,179}+p_{8,243}+p_{8,27}+p_{8,123}+p_{7,7}+p_{8,167}+p_{8,247} \\ &+p_{8,143}+2p_{8,207}+p_{8,223}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,460} = \frac{1}{2}p_{8,204} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,204}^2 - 4(p_{7,32}+p_{8,16}+p_{8,208}+p_{8,136}+p_{7,72}+2p_{7,104} \\ &+p_{8,248}+p_{8,4}+p_{8,36}+p_{8,148}+p_{8,76}+p_{8,60}+p_{8,18}+p_{8,234} \\ &+p_{8,26}+p_{7,90}+p_{8,134}+p_{8,198}+p_{8,54}+3p_{8,30}+p_{8,94}+p_{8,254} \\ &+p_{8,1}+p_{8,65}+2p_{8,193}+p_{8,241}+p_{8,9}+p_{8,201}+p_{8,233}+p_{8,57} \\ &+p_{8,121}+2p_{8,133}+p_{8,37}+p_{8,181}+p_{8,245}+p_{8,13}+p_{8,237}+p_{8,29} \\ &+p_{7,83}+p_{8,179}+p_{8,243}+p_{8,27}+p_{8,123}+p_{7,7}+p_{8,167}+p_{8,247} \\ &+p_{8,143}+2p_{8,207}+p_{8,223}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,44} = \frac{1}{2}p_{8,44} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,44}^2 - 4(p_{7,0}+p_{8,48}+p_{8,112}+2p_{7,72}+p_{7,40}+p_{8,232} \\ &+p_{8,88}+p_{8,132}+p_{8,100}+p_{8,244}+p_{8,172}+p_{8,156}+p_{8,114}+p_{8,74} \\ &+p_{7,58}+p_{8,122}+p_{8,38}+p_{8,230}+p_{8,150}+p_{8,94}+p_{8,190}+3p_{8,126} \\ &+2p_{8,33}+p_{8,161}+p_{8,97}+p_{8,81}+p_{8,73}+p_{8,41}+p_{8,105}+p_{8,153} \\ &+p_{8,217}+p_{8,133}+2p_{8,229}+p_{8,21}+p_{8,85}+p_{8,77}+p_{8,109}+p_{8,125} \\ &+p_{8,19}+p_{8,83}+p_{7,51}+p_{8,219}+p_{8,123}+p_{8,7}+p_{7,103}+p_{8,87} \\ &+2p_{8,47}+p_{8,239}+p_{8,31}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,300} = \frac{1}{2}p_{8,44} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,44}^2 - 4(p_{7,0}+p_{8,48}+p_{8,112}+2p_{7,72}+p_{7,40}+p_{8,232} \\ &+p_{8,88}+p_{8,132}+p_{8,100}+p_{8,244}+p_{8,172}+p_{8,156}+p_{8,114}+p_{8,74} \\ &+p_{7,58}+p_{8,122}+p_{8,38}+p_{8,230}+p_{8,150}+p_{8,94}+p_{8,190}+3p_{8,126} \\ &+2p_{8,33}+p_{8,161}+p_{8,97}+p_{8,81}+p_{8,73}+p_{8,41}+p_{8,105}+p_{8,153} \\ &+p_{8,217}+p_{8,133}+2p_{8,229}+p_{8,21}+p_{8,85}+p_{8,77}+p_{8,109}+p_{8,125} \\ &+p_{8,19}+p_{8,83}+p_{7,51}+p_{8,219}+p_{8,123}+p_{8,7}+p_{7,103}+p_{8,87} \\ &+2p_{8,47}+p_{8,239}+p_{8,31}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,172} = \frac{1}{2}p_{8,172} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,172}^2 - 4(p_{7,0}+p_{8,176}+p_{8,240}+2p_{7,72}+p_{7,40}+p_{8,104} \\ &+p_{8,216}+p_{8,4}+p_{8,228}+p_{8,116}+p_{8,44}+p_{8,28}+p_{8,242}+p_{8,202} \\ &+p_{7,58}+p_{8,250}+p_{8,166}+p_{8,102}+p_{8,22}+p_{8,222}+p_{8,62}+3p_{8,254} \\ &+p_{8,33}+2p_{8,161}+p_{8,225}+p_{8,209}+p_{8,201}+p_{8,169}+p_{8,233}+p_{8,25} \\ &+p_{8,89}+p_{8,5}+2p_{8,101}+p_{8,149}+p_{8,213}+p_{8,205}+p_{8,237}+p_{8,253} \\ &+p_{8,147}+p_{8,211}+p_{7,51}+p_{8,91}+p_{8,251}+p_{8,135}+p_{7,103}+p_{8,215} \\ &+2p_{8,175}+p_{8,111}+p_{8,159}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,428} = \frac{1}{2}p_{8,172} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,172}^2 - 4(p_{7,0}+p_{8,176}+p_{8,240}+2p_{7,72}+p_{7,40}+p_{8,104} \\ &+p_{8,216}+p_{8,4}+p_{8,228}+p_{8,116}+p_{8,44}+p_{8,28}+p_{8,242}+p_{8,202} \\ &+p_{7,58}+p_{8,250}+p_{8,166}+p_{8,102}+p_{8,22}+p_{8,222}+p_{8,62}+3p_{8,254} \\ &+p_{8,33}+2p_{8,161}+p_{8,225}+p_{8,209}+p_{8,201}+p_{8,169}+p_{8,233}+p_{8,25} \\ &+p_{8,89}+p_{8,5}+2p_{8,101}+p_{8,149}+p_{8,213}+p_{8,205}+p_{8,237}+p_{8,253} \\ &+p_{8,147}+p_{8,211}+p_{7,51}+p_{8,91}+p_{8,251}+p_{8,135}+p_{7,103}+p_{8,215} \\ &+2p_{8,175}+p_{8,111}+p_{8,159}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,108} = \frac{1}{2}p_{8,108} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,108}^2 - 4(p_{7,64}+p_{8,176}+p_{8,112}+2p_{7,8}+p_{8,40}+p_{7,104} \\ &+p_{8,152}+p_{8,196}+p_{8,164}+p_{8,52}+p_{8,236}+p_{8,220}+p_{8,178}+p_{8,138} \\ &+p_{8,186}+p_{7,122}+p_{8,38}+p_{8,102}+p_{8,214}+p_{8,158}+3p_{8,190}+p_{8,254} \\ &+p_{8,161}+2p_{8,97}+p_{8,225}+p_{8,145}+p_{8,137}+p_{8,169}+p_{8,105}+p_{8,25} \\ &+p_{8,217}+p_{8,197}+2p_{8,37}+p_{8,149}+p_{8,85}+p_{8,141}+p_{8,173}+p_{8,189} \\ &+p_{8,147}+p_{8,83}+p_{7,115}+p_{8,27}+p_{8,187}+p_{8,71}+p_{7,39}+p_{8,151} \\ &+p_{8,47}+2p_{8,111}+p_{8,159}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,364} = \frac{1}{2}p_{8,108} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,108}^2 - 4(p_{7,64}+p_{8,176}+p_{8,112}+2p_{7,8}+p_{8,40}+p_{7,104} \\ &+p_{8,152}+p_{8,196}+p_{8,164}+p_{8,52}+p_{8,236}+p_{8,220}+p_{8,178}+p_{8,138} \\ &+p_{8,186}+p_{7,122}+p_{8,38}+p_{8,102}+p_{8,214}+p_{8,158}+3p_{8,190}+p_{8,254} \\ &+p_{8,161}+2p_{8,97}+p_{8,225}+p_{8,145}+p_{8,137}+p_{8,169}+p_{8,105}+p_{8,25} \\ &+p_{8,217}+p_{8,197}+2p_{8,37}+p_{8,149}+p_{8,85}+p_{8,141}+p_{8,173}+p_{8,189} \\ &+p_{8,147}+p_{8,83}+p_{7,115}+p_{8,27}+p_{8,187}+p_{8,71}+p_{7,39}+p_{8,151} \\ &+p_{8,47}+2p_{8,111}+p_{8,159}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,236} = \frac{1}{2}p_{8,236} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,236}^2 - 4(p_{7,64}+p_{8,48}+p_{8,240}+2p_{7,8}+p_{8,168}+p_{7,104} \\ &+p_{8,24}+p_{8,68}+p_{8,36}+p_{8,180}+p_{8,108}+p_{8,92}+p_{8,50}+p_{8,10} \\ &+p_{8,58}+p_{7,122}+p_{8,166}+p_{8,230}+p_{8,86}+p_{8,30}+3p_{8,62}+p_{8,126} \\ &+p_{8,33}+p_{8,97}+2p_{8,225}+p_{8,17}+p_{8,9}+p_{8,41}+p_{8,233}+p_{8,153} \\ &+p_{8,89}+p_{8,69}+2p_{8,165}+p_{8,21}+p_{8,213}+p_{8,13}+p_{8,45}+p_{8,61} \\ &+p_{8,19}+p_{8,211}+p_{7,115}+p_{8,155}+p_{8,59}+p_{8,199}+p_{7,39}+p_{8,23} \\ &+p_{8,175}+2p_{8,239}+p_{8,31}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,492} = \frac{1}{2}p_{8,236} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,236}^2 - 4(p_{7,64}+p_{8,48}+p_{8,240}+2p_{7,8}+p_{8,168}+p_{7,104} \\ &+p_{8,24}+p_{8,68}+p_{8,36}+p_{8,180}+p_{8,108}+p_{8,92}+p_{8,50}+p_{8,10} \\ &+p_{8,58}+p_{7,122}+p_{8,166}+p_{8,230}+p_{8,86}+p_{8,30}+3p_{8,62}+p_{8,126} \\ &+p_{8,33}+p_{8,97}+2p_{8,225}+p_{8,17}+p_{8,9}+p_{8,41}+p_{8,233}+p_{8,153} \\ &+p_{8,89}+p_{8,69}+2p_{8,165}+p_{8,21}+p_{8,213}+p_{8,13}+p_{8,45}+p_{8,61} \\ &+p_{8,19}+p_{8,211}+p_{7,115}+p_{8,155}+p_{8,59}+p_{8,199}+p_{7,39}+p_{8,23} \\ &+p_{8,175}+2p_{8,239}+p_{8,31}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,28} = \frac{1}{2}p_{8,28} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,28}^2 - 4(p_{8,32}+p_{8,96}+p_{7,112}+p_{8,72}+p_{7,24}+p_{8,216} \\ &+2p_{7,56}+p_{8,228}+p_{8,84}+p_{8,116}+p_{8,140}+p_{8,156}+p_{8,98}+p_{7,42} \\ &+p_{8,106}+p_{8,58}+p_{8,134}+p_{8,22}+p_{8,214}+p_{8,78}+p_{8,174}+3p_{8,110} \\ &+p_{8,65}+2p_{8,17}+p_{8,145}+p_{8,81}+p_{8,137}+p_{8,201}+p_{8,25}+p_{8,89} \\ &+p_{8,57}+p_{8,5}+p_{8,69}+2p_{8,213}+p_{8,117}+p_{8,109}+p_{8,93}+p_{8,61} \\ &+p_{8,3}+p_{8,67}+p_{7,35}+p_{8,203}+p_{8,107}+p_{8,71}+p_{7,87}+p_{8,247} \\ &+p_{8,15}+p_{8,79}+p_{8,47}+2p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,284} = \frac{1}{2}p_{8,28} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,28}^2 - 4(p_{8,32}+p_{8,96}+p_{7,112}+p_{8,72}+p_{7,24}+p_{8,216} \\ &+2p_{7,56}+p_{8,228}+p_{8,84}+p_{8,116}+p_{8,140}+p_{8,156}+p_{8,98}+p_{7,42} \\ &+p_{8,106}+p_{8,58}+p_{8,134}+p_{8,22}+p_{8,214}+p_{8,78}+p_{8,174}+3p_{8,110} \\ &+p_{8,65}+2p_{8,17}+p_{8,145}+p_{8,81}+p_{8,137}+p_{8,201}+p_{8,25}+p_{8,89} \\ &+p_{8,57}+p_{8,5}+p_{8,69}+2p_{8,213}+p_{8,117}+p_{8,109}+p_{8,93}+p_{8,61} \\ &+p_{8,3}+p_{8,67}+p_{7,35}+p_{8,203}+p_{8,107}+p_{8,71}+p_{7,87}+p_{8,247} \\ &+p_{8,15}+p_{8,79}+p_{8,47}+2p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,156} = \frac{1}{2}p_{8,156} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,156}^2 - 4(p_{8,160}+p_{8,224}+p_{7,112}+p_{8,200}+p_{7,24}+p_{8,88} \\ &+2p_{7,56}+p_{8,100}+p_{8,212}+p_{8,244}+p_{8,12}+p_{8,28}+p_{8,226}+p_{7,42} \\ &+p_{8,234}+p_{8,186}+p_{8,6}+p_{8,150}+p_{8,86}+p_{8,206}+p_{8,46}+3p_{8,238} \\ &+p_{8,193}+p_{8,17}+2p_{8,145}+p_{8,209}+p_{8,9}+p_{8,73}+p_{8,153}+p_{8,217} \\ &+p_{8,185}+p_{8,133}+p_{8,197}+2p_{8,85}+p_{8,245}+p_{8,237}+p_{8,221}+p_{8,189} \\ &+p_{8,131}+p_{8,195}+p_{7,35}+p_{8,75}+p_{8,235}+p_{8,199}+p_{7,87}+p_{8,119} \\ &+p_{8,143}+p_{8,207}+p_{8,175}+2p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,412} = \frac{1}{2}p_{8,156} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,156}^2 - 4(p_{8,160}+p_{8,224}+p_{7,112}+p_{8,200}+p_{7,24}+p_{8,88} \\ &+2p_{7,56}+p_{8,100}+p_{8,212}+p_{8,244}+p_{8,12}+p_{8,28}+p_{8,226}+p_{7,42} \\ &+p_{8,234}+p_{8,186}+p_{8,6}+p_{8,150}+p_{8,86}+p_{8,206}+p_{8,46}+3p_{8,238} \\ &+p_{8,193}+p_{8,17}+2p_{8,145}+p_{8,209}+p_{8,9}+p_{8,73}+p_{8,153}+p_{8,217} \\ &+p_{8,185}+p_{8,133}+p_{8,197}+2p_{8,85}+p_{8,245}+p_{8,237}+p_{8,221}+p_{8,189} \\ &+p_{8,131}+p_{8,195}+p_{7,35}+p_{8,75}+p_{8,235}+p_{8,199}+p_{7,87}+p_{8,119} \\ &+p_{8,143}+p_{8,207}+p_{8,175}+2p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,92} = \frac{1}{2}p_{8,92} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,92}^2 - 4(p_{8,160}+p_{8,96}+p_{7,48}+p_{8,136}+p_{8,24}+p_{7,88} \\ &+2p_{7,120}+p_{8,36}+p_{8,148}+p_{8,180}+p_{8,204}+p_{8,220}+p_{8,162} \\ &+p_{8,170}+p_{7,106}+p_{8,122}+p_{8,198}+p_{8,22}+p_{8,86}+p_{8,142}+3p_{8,174} \\ &+p_{8,238}+p_{8,129}+p_{8,145}+2p_{8,81}+p_{8,209}+p_{8,9}+p_{8,201}+p_{8,153} \\ &+p_{8,89}+p_{8,121}+p_{8,133}+p_{8,69}+2p_{8,21}+p_{8,181}+p_{8,173}+p_{8,157} \\ &+p_{8,125}+p_{8,131}+p_{8,67}+p_{7,99}+p_{8,11}+p_{8,171}+p_{8,135}+p_{7,23} \\ &+p_{8,55}+p_{8,143}+p_{8,79}+p_{8,111}+p_{8,31}+2p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,348} = \frac{1}{2}p_{8,92} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,92}^2 - 4(p_{8,160}+p_{8,96}+p_{7,48}+p_{8,136}+p_{8,24}+p_{7,88} \\ &+2p_{7,120}+p_{8,36}+p_{8,148}+p_{8,180}+p_{8,204}+p_{8,220}+p_{8,162} \\ &+p_{8,170}+p_{7,106}+p_{8,122}+p_{8,198}+p_{8,22}+p_{8,86}+p_{8,142}+3p_{8,174} \\ &+p_{8,238}+p_{8,129}+p_{8,145}+2p_{8,81}+p_{8,209}+p_{8,9}+p_{8,201}+p_{8,153} \\ &+p_{8,89}+p_{8,121}+p_{8,133}+p_{8,69}+2p_{8,21}+p_{8,181}+p_{8,173}+p_{8,157} \\ &+p_{8,125}+p_{8,131}+p_{8,67}+p_{7,99}+p_{8,11}+p_{8,171}+p_{8,135}+p_{7,23} \\ &+p_{8,55}+p_{8,143}+p_{8,79}+p_{8,111}+p_{8,31}+2p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,220} = \frac{1}{2}p_{8,220} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,220}^2 - 4(p_{8,32}+p_{8,224}+p_{7,48}+p_{8,8}+p_{8,152}+p_{7,88} \\ &+2p_{7,120}+p_{8,164}+p_{8,20}+p_{8,52}+p_{8,76}+p_{8,92}+p_{8,34}+p_{8,42} \\ &+p_{7,106}+p_{8,250}+p_{8,70}+p_{8,150}+p_{8,214}+p_{8,14}+3p_{8,46}+p_{8,110} \\ &+p_{8,1}+p_{8,17}+p_{8,81}+2p_{8,209}+p_{8,137}+p_{8,73}+p_{8,25}+p_{8,217} \\ &+p_{8,249}+p_{8,5}+p_{8,197}+2p_{8,149}+p_{8,53}+p_{8,45}+p_{8,29}+p_{8,253} \\ &+p_{8,3}+p_{8,195}+p_{7,99}+p_{8,139}+p_{8,43}+p_{8,7}+p_{7,23}+p_{8,183} \\ &+p_{8,15}+p_{8,207}+p_{8,239}+p_{8,159}+2p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,476} = \frac{1}{2}p_{8,220} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,220}^2 - 4(p_{8,32}+p_{8,224}+p_{7,48}+p_{8,8}+p_{8,152}+p_{7,88} \\ &+2p_{7,120}+p_{8,164}+p_{8,20}+p_{8,52}+p_{8,76}+p_{8,92}+p_{8,34}+p_{8,42} \\ &+p_{7,106}+p_{8,250}+p_{8,70}+p_{8,150}+p_{8,214}+p_{8,14}+3p_{8,46}+p_{8,110} \\ &+p_{8,1}+p_{8,17}+p_{8,81}+2p_{8,209}+p_{8,137}+p_{8,73}+p_{8,25}+p_{8,217} \\ &+p_{8,249}+p_{8,5}+p_{8,197}+2p_{8,149}+p_{8,53}+p_{8,45}+p_{8,29}+p_{8,253} \\ &+p_{8,3}+p_{8,195}+p_{7,99}+p_{8,139}+p_{8,43}+p_{8,7}+p_{7,23}+p_{8,183} \\ &+p_{8,15}+p_{8,207}+p_{8,239}+p_{8,159}+2p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,60} = \frac{1}{2}p_{8,60} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,60}^2 - 4(p_{8,128}+p_{8,64}+p_{7,16}+p_{8,104}+2p_{7,88}+p_{7,56} \\ &+p_{8,248}+p_{8,4}+p_{8,148}+p_{8,116}+p_{8,172}+p_{8,188}+p_{8,130}+p_{8,138} \\ &+p_{7,74}+p_{8,90}+p_{8,166}+p_{8,54}+p_{8,246}+3p_{8,142}+p_{8,206}+p_{8,110} \\ &+p_{8,97}+2p_{8,49}+p_{8,177}+p_{8,113}+p_{8,169}+p_{8,233}+p_{8,89}+p_{8,57} \\ &+p_{8,121}+p_{8,37}+p_{8,101}+p_{8,149}+2p_{8,245}+p_{8,141}+p_{8,93}+p_{8,125} \\ &+p_{7,67}+p_{8,35}+p_{8,99}+p_{8,139}+p_{8,235}+p_{8,103}+p_{8,23}+p_{7,119} \\ &+p_{8,79}+p_{8,47}+p_{8,111}+2p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,316} = \frac{1}{2}p_{8,60} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,60}^2 - 4(p_{8,128}+p_{8,64}+p_{7,16}+p_{8,104}+2p_{7,88}+p_{7,56} \\ &+p_{8,248}+p_{8,4}+p_{8,148}+p_{8,116}+p_{8,172}+p_{8,188}+p_{8,130}+p_{8,138} \\ &+p_{7,74}+p_{8,90}+p_{8,166}+p_{8,54}+p_{8,246}+3p_{8,142}+p_{8,206}+p_{8,110} \\ &+p_{8,97}+2p_{8,49}+p_{8,177}+p_{8,113}+p_{8,169}+p_{8,233}+p_{8,89}+p_{8,57} \\ &+p_{8,121}+p_{8,37}+p_{8,101}+p_{8,149}+2p_{8,245}+p_{8,141}+p_{8,93}+p_{8,125} \\ &+p_{7,67}+p_{8,35}+p_{8,99}+p_{8,139}+p_{8,235}+p_{8,103}+p_{8,23}+p_{7,119} \\ &+p_{8,79}+p_{8,47}+p_{8,111}+2p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,188} = \frac{1}{2}p_{8,188} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,188}^2 - 4(p_{8,0}+p_{8,192}+p_{7,16}+p_{8,232}+2p_{7,88}+p_{7,56} \\ &+p_{8,120}+p_{8,132}+p_{8,20}+p_{8,244}+p_{8,44}+p_{8,60}+p_{8,2}+p_{8,10} \\ &+p_{7,74}+p_{8,218}+p_{8,38}+p_{8,182}+p_{8,118}+3p_{8,14}+p_{8,78}+p_{8,238} \\ &+p_{8,225}+p_{8,49}+2p_{8,177}+p_{8,241}+p_{8,41}+p_{8,105}+p_{8,217}+p_{8,185} \\ &+p_{8,249}+p_{8,165}+p_{8,229}+p_{8,21}+2p_{8,117}+p_{8,13}+p_{8,221}+p_{8,253} \\ &+p_{7,67}+p_{8,163}+p_{8,227}+p_{8,11}+p_{8,107}+p_{8,231}+p_{8,151}+p_{7,119} \\ &+p_{8,207}+p_{8,175}+p_{8,239}+2p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,444} = \frac{1}{2}p_{8,188} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,188}^2 - 4(p_{8,0}+p_{8,192}+p_{7,16}+p_{8,232}+2p_{7,88}+p_{7,56} \\ &+p_{8,120}+p_{8,132}+p_{8,20}+p_{8,244}+p_{8,44}+p_{8,60}+p_{8,2}+p_{8,10} \\ &+p_{7,74}+p_{8,218}+p_{8,38}+p_{8,182}+p_{8,118}+3p_{8,14}+p_{8,78}+p_{8,238} \\ &+p_{8,225}+p_{8,49}+2p_{8,177}+p_{8,241}+p_{8,41}+p_{8,105}+p_{8,217}+p_{8,185} \\ &+p_{8,249}+p_{8,165}+p_{8,229}+p_{8,21}+2p_{8,117}+p_{8,13}+p_{8,221}+p_{8,253} \\ &+p_{7,67}+p_{8,163}+p_{8,227}+p_{8,11}+p_{8,107}+p_{8,231}+p_{8,151}+p_{7,119} \\ &+p_{8,207}+p_{8,175}+p_{8,239}+2p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,124} = \frac{1}{2}p_{8,124} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,124}^2 - 4(p_{8,128}+p_{8,192}+p_{7,80}+p_{8,168}+2p_{7,24}+p_{8,56} \\ &+p_{7,120}+p_{8,68}+p_{8,212}+p_{8,180}+p_{8,236}+p_{8,252}+p_{8,194}+p_{7,10} \\ &+p_{8,202}+p_{8,154}+p_{8,230}+p_{8,54}+p_{8,118}+p_{8,14}+3p_{8,206}+p_{8,174} \\ &+p_{8,161}+p_{8,177}+2p_{8,113}+p_{8,241}+p_{8,41}+p_{8,233}+p_{8,153}+p_{8,185} \\ &+p_{8,121}+p_{8,165}+p_{8,101}+p_{8,213}+2p_{8,53}+p_{8,205}+p_{8,157}+p_{8,189} \\ &+p_{7,3}+p_{8,163}+p_{8,99}+p_{8,203}+p_{8,43}+p_{8,167}+p_{8,87}+p_{7,55} \\ &+p_{8,143}+p_{8,175}+p_{8,111}+p_{8,63}+2p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,380} = \frac{1}{2}p_{8,124} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,124}^2 - 4(p_{8,128}+p_{8,192}+p_{7,80}+p_{8,168}+2p_{7,24}+p_{8,56} \\ &+p_{7,120}+p_{8,68}+p_{8,212}+p_{8,180}+p_{8,236}+p_{8,252}+p_{8,194}+p_{7,10} \\ &+p_{8,202}+p_{8,154}+p_{8,230}+p_{8,54}+p_{8,118}+p_{8,14}+3p_{8,206}+p_{8,174} \\ &+p_{8,161}+p_{8,177}+2p_{8,113}+p_{8,241}+p_{8,41}+p_{8,233}+p_{8,153}+p_{8,185} \\ &+p_{8,121}+p_{8,165}+p_{8,101}+p_{8,213}+2p_{8,53}+p_{8,205}+p_{8,157}+p_{8,189} \\ &+p_{7,3}+p_{8,163}+p_{8,99}+p_{8,203}+p_{8,43}+p_{8,167}+p_{8,87}+p_{7,55} \\ &+p_{8,143}+p_{8,175}+p_{8,111}+p_{8,63}+2p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,252} = \frac{1}{2}p_{8,252} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,252}^2 - 4(p_{8,0}+p_{8,64}+p_{7,80}+p_{8,40}+2p_{7,24}+p_{8,184} \\ &+p_{7,120}+p_{8,196}+p_{8,84}+p_{8,52}+p_{8,108}+p_{8,124}+p_{8,66}+p_{7,10} \\ &+p_{8,74}+p_{8,26}+p_{8,102}+p_{8,182}+p_{8,246}+p_{8,142}+3p_{8,78}+p_{8,46} \\ &+p_{8,33}+p_{8,49}+p_{8,113}+2p_{8,241}+p_{8,169}+p_{8,105}+p_{8,25}+p_{8,57} \\ &+p_{8,249}+p_{8,37}+p_{8,229}+p_{8,85}+2p_{8,181}+p_{8,77}+p_{8,29}+p_{8,61} \\ &+p_{7,3}+p_{8,35}+p_{8,227}+p_{8,75}+p_{8,171}+p_{8,39}+p_{8,215}+p_{7,55} \\ &+p_{8,15}+p_{8,47}+p_{8,239}+p_{8,191}+2p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,508} = \frac{1}{2}p_{8,252} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,252}^2 - 4(p_{8,0}+p_{8,64}+p_{7,80}+p_{8,40}+2p_{7,24}+p_{8,184} \\ &+p_{7,120}+p_{8,196}+p_{8,84}+p_{8,52}+p_{8,108}+p_{8,124}+p_{8,66}+p_{7,10} \\ &+p_{8,74}+p_{8,26}+p_{8,102}+p_{8,182}+p_{8,246}+p_{8,142}+3p_{8,78}+p_{8,46} \\ &+p_{8,33}+p_{8,49}+p_{8,113}+2p_{8,241}+p_{8,169}+p_{8,105}+p_{8,25}+p_{8,57} \\ &+p_{8,249}+p_{8,37}+p_{8,229}+p_{8,85}+2p_{8,181}+p_{8,77}+p_{8,29}+p_{8,61} \\ &+p_{7,3}+p_{8,35}+p_{8,227}+p_{8,75}+p_{8,171}+p_{8,39}+p_{8,215}+p_{7,55} \\ &+p_{8,15}+p_{8,47}+p_{8,239}+p_{8,191}+2p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,2} = \frac{1}{2}p_{8,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,2}^2 - 4(p_{8,32}+p_{7,16}+p_{8,80}+p_{8,72}+p_{8,148}+3p_{8,84} \\ &+p_{8,52}+p_{8,108}+p_{8,188}+p_{8,252}+p_{8,130}+p_{8,114}+p_{8,202} \\ &+p_{8,90}+p_{8,58}+p_{8,6}+p_{8,70}+p_{7,86}+p_{8,46}+2p_{7,30}+p_{8,190} \\ &+p_{7,126}+p_{8,81}+p_{8,177}+p_{7,9}+p_{8,41}+p_{8,233}+2p_{8,5}+p_{8,197} \\ &+p_{8,21}+p_{8,53}+p_{8,245}+p_{8,45}+p_{8,221}+p_{7,61}+p_{8,67}+p_{8,35} \\ &+p_{8,83}+p_{8,43}+p_{8,235}+p_{8,91}+2p_{8,187}+p_{8,39}+p_{8,55}+p_{8,119} \\ &+2p_{8,247}+p_{8,175}+p_{8,111}+p_{8,31}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,258} = \frac{1}{2}p_{8,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,2}^2 - 4(p_{8,32}+p_{7,16}+p_{8,80}+p_{8,72}+p_{8,148}+3p_{8,84} \\ &+p_{8,52}+p_{8,108}+p_{8,188}+p_{8,252}+p_{8,130}+p_{8,114}+p_{8,202} \\ &+p_{8,90}+p_{8,58}+p_{8,6}+p_{8,70}+p_{7,86}+p_{8,46}+2p_{7,30}+p_{8,190} \\ &+p_{7,126}+p_{8,81}+p_{8,177}+p_{7,9}+p_{8,41}+p_{8,233}+2p_{8,5}+p_{8,197} \\ &+p_{8,21}+p_{8,53}+p_{8,245}+p_{8,45}+p_{8,221}+p_{7,61}+p_{8,67}+p_{8,35} \\ &+p_{8,83}+p_{8,43}+p_{8,235}+p_{8,91}+2p_{8,187}+p_{8,39}+p_{8,55}+p_{8,119} \\ &+2p_{8,247}+p_{8,175}+p_{8,111}+p_{8,31}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,130} = \frac{1}{2}p_{8,130} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,130}^2 - 4(p_{8,160}+p_{7,16}+p_{8,208}+p_{8,200}+p_{8,20}+3p_{8,212} \\ &+p_{8,180}+p_{8,236}+p_{8,60}+p_{8,124}+p_{8,2}+p_{8,242}+p_{8,74}+p_{8,218} \\ &+p_{8,186}+p_{8,134}+p_{8,198}+p_{7,86}+p_{8,174}+2p_{7,30}+p_{8,62}+p_{7,126} \\ &+p_{8,209}+p_{8,49}+p_{7,9}+p_{8,169}+p_{8,105}+2p_{8,133}+p_{8,69}+p_{8,149} \\ &+p_{8,181}+p_{8,117}+p_{8,173}+p_{8,93}+p_{7,61}+p_{8,195}+p_{8,163}+p_{8,211} \\ &+p_{8,171}+p_{8,107}+p_{8,219}+2p_{8,59}+p_{8,167}+p_{8,183}+2p_{8,119} \\ &+p_{8,247}+p_{8,47}+p_{8,239}+p_{8,159}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,386} = \frac{1}{2}p_{8,130} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,130}^2 - 4(p_{8,160}+p_{7,16}+p_{8,208}+p_{8,200}+p_{8,20}+3p_{8,212} \\ &+p_{8,180}+p_{8,236}+p_{8,60}+p_{8,124}+p_{8,2}+p_{8,242}+p_{8,74}+p_{8,218} \\ &+p_{8,186}+p_{8,134}+p_{8,198}+p_{7,86}+p_{8,174}+2p_{7,30}+p_{8,62}+p_{7,126} \\ &+p_{8,209}+p_{8,49}+p_{7,9}+p_{8,169}+p_{8,105}+2p_{8,133}+p_{8,69}+p_{8,149} \\ &+p_{8,181}+p_{8,117}+p_{8,173}+p_{8,93}+p_{7,61}+p_{8,195}+p_{8,163}+p_{8,211} \\ &+p_{8,171}+p_{8,107}+p_{8,219}+2p_{8,59}+p_{8,167}+p_{8,183}+2p_{8,119} \\ &+p_{8,247}+p_{8,47}+p_{8,239}+p_{8,159}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,66} = \frac{1}{2}p_{8,66} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,66}^2 - 4(p_{8,96}+p_{8,144}+p_{7,80}+p_{8,136}+3p_{8,148}+p_{8,212} \\ &+p_{8,116}+p_{8,172}+p_{8,60}+p_{8,252}+p_{8,194}+p_{8,178}+p_{8,10}+p_{8,154} \\ &+p_{8,122}+p_{8,134}+p_{8,70}+p_{7,22}+p_{8,110}+2p_{7,94}+p_{7,62}+p_{8,254} \\ &+p_{8,145}+p_{8,241}+p_{7,73}+p_{8,41}+p_{8,105}+p_{8,5}+2p_{8,69}+p_{8,85} \\ &+p_{8,53}+p_{8,117}+p_{8,109}+p_{8,29}+p_{7,125}+p_{8,131}+p_{8,99}+p_{8,147} \\ &+p_{8,43}+p_{8,107}+p_{8,155}+2p_{8,251}+p_{8,103}+2p_{8,55}+p_{8,183} \\ &+p_{8,119}+p_{8,175}+p_{8,239}+p_{8,95}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,322} = \frac{1}{2}p_{8,66} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,66}^2 - 4(p_{8,96}+p_{8,144}+p_{7,80}+p_{8,136}+3p_{8,148}+p_{8,212} \\ &+p_{8,116}+p_{8,172}+p_{8,60}+p_{8,252}+p_{8,194}+p_{8,178}+p_{8,10}+p_{8,154} \\ &+p_{8,122}+p_{8,134}+p_{8,70}+p_{7,22}+p_{8,110}+2p_{7,94}+p_{7,62}+p_{8,254} \\ &+p_{8,145}+p_{8,241}+p_{7,73}+p_{8,41}+p_{8,105}+p_{8,5}+2p_{8,69}+p_{8,85} \\ &+p_{8,53}+p_{8,117}+p_{8,109}+p_{8,29}+p_{7,125}+p_{8,131}+p_{8,99}+p_{8,147} \\ &+p_{8,43}+p_{8,107}+p_{8,155}+2p_{8,251}+p_{8,103}+2p_{8,55}+p_{8,183} \\ &+p_{8,119}+p_{8,175}+p_{8,239}+p_{8,95}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,194} = \frac{1}{2}p_{8,194} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,194}^2 - 4(p_{8,224}+p_{8,16}+p_{7,80}+p_{8,8}+3p_{8,20}+p_{8,84} \\ &+p_{8,244}+p_{8,44}+p_{8,188}+p_{8,124}+p_{8,66}+p_{8,50}+p_{8,138}+p_{8,26} \\ &+p_{8,250}+p_{8,6}+p_{8,198}+p_{7,22}+p_{8,238}+2p_{7,94}+p_{7,62}+p_{8,126} \\ &+p_{8,17}+p_{8,113}+p_{7,73}+p_{8,169}+p_{8,233}+p_{8,133}+2p_{8,197}+p_{8,213} \\ &+p_{8,181}+p_{8,245}+p_{8,237}+p_{8,157}+p_{7,125}+p_{8,3}+p_{8,227}+p_{8,19} \\ &+p_{8,171}+p_{8,235}+p_{8,27}+2p_{8,123}+p_{8,231}+p_{8,55}+2p_{8,183} \\ &+p_{8,247}+p_{8,47}+p_{8,111}+p_{8,223}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,450} = \frac{1}{2}p_{8,194} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,194}^2 - 4(p_{8,224}+p_{8,16}+p_{7,80}+p_{8,8}+3p_{8,20}+p_{8,84} \\ &+p_{8,244}+p_{8,44}+p_{8,188}+p_{8,124}+p_{8,66}+p_{8,50}+p_{8,138}+p_{8,26} \\ &+p_{8,250}+p_{8,6}+p_{8,198}+p_{7,22}+p_{8,238}+2p_{7,94}+p_{7,62}+p_{8,126} \\ &+p_{8,17}+p_{8,113}+p_{7,73}+p_{8,169}+p_{8,233}+p_{8,133}+2p_{8,197}+p_{8,213} \\ &+p_{8,181}+p_{8,245}+p_{8,237}+p_{8,157}+p_{7,125}+p_{8,3}+p_{8,227}+p_{8,19} \\ &+p_{8,171}+p_{8,235}+p_{8,27}+2p_{8,123}+p_{8,231}+p_{8,55}+2p_{8,183} \\ &+p_{8,247}+p_{8,47}+p_{8,111}+p_{8,223}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,34} = \frac{1}{2}p_{8,34} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,34}^2 - 4(p_{8,64}+p_{7,48}+p_{8,112}+p_{8,104}+p_{8,84}+p_{8,180} \\ &+3p_{8,116}+p_{8,140}+p_{8,28}+p_{8,220}+p_{8,162}+p_{8,146}+p_{8,234} \\ &+p_{8,90}+p_{8,122}+p_{8,38}+p_{8,102}+p_{7,118}+p_{8,78}+p_{7,30}+p_{8,222} \\ &+2p_{7,62}+p_{8,209}+p_{8,113}+p_{8,9}+p_{8,73}+p_{7,41}+2p_{8,37}+p_{8,229} \\ &+p_{8,21}+p_{8,85}+p_{8,53}+p_{8,77}+p_{7,93}+p_{8,253}+p_{8,67}+p_{8,99} \\ &+p_{8,115}+p_{8,11}+p_{8,75}+2p_{8,219}+p_{8,123}+p_{8,71}+2p_{8,23}+p_{8,151} \\ &+p_{8,87}+p_{8,143}+p_{8,207}+p_{8,31}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,290} = \frac{1}{2}p_{8,34} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,34}^2 - 4(p_{8,64}+p_{7,48}+p_{8,112}+p_{8,104}+p_{8,84}+p_{8,180} \\ &+3p_{8,116}+p_{8,140}+p_{8,28}+p_{8,220}+p_{8,162}+p_{8,146}+p_{8,234} \\ &+p_{8,90}+p_{8,122}+p_{8,38}+p_{8,102}+p_{7,118}+p_{8,78}+p_{7,30}+p_{8,222} \\ &+2p_{7,62}+p_{8,209}+p_{8,113}+p_{8,9}+p_{8,73}+p_{7,41}+2p_{8,37}+p_{8,229} \\ &+p_{8,21}+p_{8,85}+p_{8,53}+p_{8,77}+p_{7,93}+p_{8,253}+p_{8,67}+p_{8,99} \\ &+p_{8,115}+p_{8,11}+p_{8,75}+2p_{8,219}+p_{8,123}+p_{8,71}+2p_{8,23}+p_{8,151} \\ &+p_{8,87}+p_{8,143}+p_{8,207}+p_{8,31}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,162} = \frac{1}{2}p_{8,162} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,162}^2 - 4(p_{8,192}+p_{7,48}+p_{8,240}+p_{8,232}+p_{8,212}+p_{8,52} \\ &+3p_{8,244}+p_{8,12}+p_{8,156}+p_{8,92}+p_{8,34}+p_{8,18}+p_{8,106}+p_{8,218} \\ &+p_{8,250}+p_{8,166}+p_{8,230}+p_{7,118}+p_{8,206}+p_{7,30}+p_{8,94}+2p_{7,62} \\ &+p_{8,81}+p_{8,241}+p_{8,137}+p_{8,201}+p_{7,41}+2p_{8,165}+p_{8,101}+p_{8,149} \\ &+p_{8,213}+p_{8,181}+p_{8,205}+p_{7,93}+p_{8,125}+p_{8,195}+p_{8,227}+p_{8,243} \\ &+p_{8,139}+p_{8,203}+2p_{8,91}+p_{8,251}+p_{8,199}+p_{8,23}+2p_{8,151}+p_{8,215} \\ &+p_{8,15}+p_{8,79}+p_{8,159}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,418} = \frac{1}{2}p_{8,162} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,162}^2 - 4(p_{8,192}+p_{7,48}+p_{8,240}+p_{8,232}+p_{8,212}+p_{8,52} \\ &+3p_{8,244}+p_{8,12}+p_{8,156}+p_{8,92}+p_{8,34}+p_{8,18}+p_{8,106}+p_{8,218} \\ &+p_{8,250}+p_{8,166}+p_{8,230}+p_{7,118}+p_{8,206}+p_{7,30}+p_{8,94}+2p_{7,62} \\ &+p_{8,81}+p_{8,241}+p_{8,137}+p_{8,201}+p_{7,41}+2p_{8,165}+p_{8,101}+p_{8,149} \\ &+p_{8,213}+p_{8,181}+p_{8,205}+p_{7,93}+p_{8,125}+p_{8,195}+p_{8,227}+p_{8,243} \\ &+p_{8,139}+p_{8,203}+2p_{8,91}+p_{8,251}+p_{8,199}+p_{8,23}+2p_{8,151}+p_{8,215} \\ &+p_{8,15}+p_{8,79}+p_{8,159}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,98} = \frac{1}{2}p_{8,98} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,98}^2 - 4(p_{8,128}+p_{8,176}+p_{7,112}+p_{8,168}+p_{8,148}+3p_{8,180} \\ &+p_{8,244}+p_{8,204}+p_{8,28}+p_{8,92}+p_{8,226}+p_{8,210}+p_{8,42}+p_{8,154} \\ &+p_{8,186}+p_{8,166}+p_{8,102}+p_{7,54}+p_{8,142}+p_{8,30}+p_{7,94}+2p_{7,126} \\ &+p_{8,17}+p_{8,177}+p_{8,137}+p_{8,73}+p_{7,105}+p_{8,37}+2p_{8,101}+p_{8,149} \\ &+p_{8,85}+p_{8,117}+p_{8,141}+p_{7,29}+p_{8,61}+p_{8,131}+p_{8,163}+p_{8,179} \\ &+p_{8,139}+p_{8,75}+2p_{8,27}+p_{8,187}+p_{8,135}+p_{8,151}+2p_{8,87}+p_{8,215} \\ &+p_{8,15}+p_{8,207}+p_{8,159}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,354} = \frac{1}{2}p_{8,98} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,98}^2 - 4(p_{8,128}+p_{8,176}+p_{7,112}+p_{8,168}+p_{8,148}+3p_{8,180} \\ &+p_{8,244}+p_{8,204}+p_{8,28}+p_{8,92}+p_{8,226}+p_{8,210}+p_{8,42}+p_{8,154} \\ &+p_{8,186}+p_{8,166}+p_{8,102}+p_{7,54}+p_{8,142}+p_{8,30}+p_{7,94}+2p_{7,126} \\ &+p_{8,17}+p_{8,177}+p_{8,137}+p_{8,73}+p_{7,105}+p_{8,37}+2p_{8,101}+p_{8,149} \\ &+p_{8,85}+p_{8,117}+p_{8,141}+p_{7,29}+p_{8,61}+p_{8,131}+p_{8,163}+p_{8,179} \\ &+p_{8,139}+p_{8,75}+2p_{8,27}+p_{8,187}+p_{8,135}+p_{8,151}+2p_{8,87}+p_{8,215} \\ &+p_{8,15}+p_{8,207}+p_{8,159}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,226} = \frac{1}{2}p_{8,226} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,226}^2 - 4(p_{8,0}+p_{8,48}+p_{7,112}+p_{8,40}+p_{8,20}+3p_{8,52} \\ &+p_{8,116}+p_{8,76}+p_{8,156}+p_{8,220}+p_{8,98}+p_{8,82}+p_{8,170}+p_{8,26} \\ &+p_{8,58}+p_{8,38}+p_{8,230}+p_{7,54}+p_{8,14}+p_{8,158}+p_{7,94}+2p_{7,126} \\ &+p_{8,145}+p_{8,49}+p_{8,9}+p_{8,201}+p_{7,105}+p_{8,165}+2p_{8,229}+p_{8,21} \\ &+p_{8,213}+p_{8,245}+p_{8,13}+p_{7,29}+p_{8,189}+p_{8,3}+p_{8,35}+p_{8,51} \\ &+p_{8,11}+p_{8,203}+2p_{8,155}+p_{8,59}+p_{8,7}+p_{8,23}+p_{8,87}+2p_{8,215} \\ &+p_{8,143}+p_{8,79}+p_{8,31}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,482} = \frac{1}{2}p_{8,226} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,226}^2 - 4(p_{8,0}+p_{8,48}+p_{7,112}+p_{8,40}+p_{8,20}+3p_{8,52} \\ &+p_{8,116}+p_{8,76}+p_{8,156}+p_{8,220}+p_{8,98}+p_{8,82}+p_{8,170}+p_{8,26} \\ &+p_{8,58}+p_{8,38}+p_{8,230}+p_{7,54}+p_{8,14}+p_{8,158}+p_{7,94}+2p_{7,126} \\ &+p_{8,145}+p_{8,49}+p_{8,9}+p_{8,201}+p_{7,105}+p_{8,165}+2p_{8,229}+p_{8,21} \\ &+p_{8,213}+p_{8,245}+p_{8,13}+p_{7,29}+p_{8,189}+p_{8,3}+p_{8,35}+p_{8,51} \\ &+p_{8,11}+p_{8,203}+2p_{8,155}+p_{8,59}+p_{8,7}+p_{8,23}+p_{8,87}+2p_{8,215} \\ &+p_{8,143}+p_{8,79}+p_{8,31}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,18} = \frac{1}{2}p_{8,18} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,18}^2 - 4(p_{7,32}+p_{8,96}+p_{8,48}+p_{8,88}+p_{8,68}+p_{8,164} \\ &+3p_{8,100}+p_{8,12}+p_{8,204}+p_{8,124}+p_{8,130}+p_{8,146}+p_{8,74} \\ &+p_{8,106}+p_{8,218}+p_{7,102}+p_{8,22}+p_{8,86}+p_{7,14}+p_{8,206}+2p_{7,46} \\ &+p_{8,62}+p_{8,193}+p_{8,97}+p_{7,25}+p_{8,57}+p_{8,249}+p_{8,5}+p_{8,69} \\ &+p_{8,37}+2p_{8,21}+p_{8,213}+p_{7,77}+p_{8,237}+p_{8,61}+p_{8,99}+p_{8,83} \\ &+p_{8,51}+2p_{8,203}+p_{8,107}+p_{8,59}+p_{8,251}+2p_{8,7}+p_{8,135}+p_{8,71} \\ &+p_{8,55}+p_{8,15}+p_{8,79}+p_{8,47}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,274} = \frac{1}{2}p_{8,18} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,18}^2 - 4(p_{7,32}+p_{8,96}+p_{8,48}+p_{8,88}+p_{8,68}+p_{8,164} \\ &+3p_{8,100}+p_{8,12}+p_{8,204}+p_{8,124}+p_{8,130}+p_{8,146}+p_{8,74} \\ &+p_{8,106}+p_{8,218}+p_{7,102}+p_{8,22}+p_{8,86}+p_{7,14}+p_{8,206}+2p_{7,46} \\ &+p_{8,62}+p_{8,193}+p_{8,97}+p_{7,25}+p_{8,57}+p_{8,249}+p_{8,5}+p_{8,69} \\ &+p_{8,37}+2p_{8,21}+p_{8,213}+p_{7,77}+p_{8,237}+p_{8,61}+p_{8,99}+p_{8,83} \\ &+p_{8,51}+2p_{8,203}+p_{8,107}+p_{8,59}+p_{8,251}+2p_{8,7}+p_{8,135}+p_{8,71} \\ &+p_{8,55}+p_{8,15}+p_{8,79}+p_{8,47}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,146} = \frac{1}{2}p_{8,146} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,146}^2 - 4(p_{7,32}+p_{8,224}+p_{8,176}+p_{8,216}+p_{8,196}+p_{8,36} \\ &+3p_{8,228}+p_{8,140}+p_{8,76}+p_{8,252}+p_{8,2}+p_{8,18}+p_{8,202}+p_{8,234} \\ &+p_{8,90}+p_{7,102}+p_{8,150}+p_{8,214}+p_{7,14}+p_{8,78}+2p_{7,46}+p_{8,190} \\ &+p_{8,65}+p_{8,225}+p_{7,25}+p_{8,185}+p_{8,121}+p_{8,133}+p_{8,197}+p_{8,165} \\ &+2p_{8,149}+p_{8,85}+p_{7,77}+p_{8,109}+p_{8,189}+p_{8,227}+p_{8,211}+p_{8,179} \\ &+2p_{8,75}+p_{8,235}+p_{8,187}+p_{8,123}+p_{8,7}+2p_{8,135}+p_{8,199}+p_{8,183} \\ &+p_{8,143}+p_{8,207}+p_{8,175}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,402} = \frac{1}{2}p_{8,146} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,146}^2 - 4(p_{7,32}+p_{8,224}+p_{8,176}+p_{8,216}+p_{8,196}+p_{8,36} \\ &+3p_{8,228}+p_{8,140}+p_{8,76}+p_{8,252}+p_{8,2}+p_{8,18}+p_{8,202}+p_{8,234} \\ &+p_{8,90}+p_{7,102}+p_{8,150}+p_{8,214}+p_{7,14}+p_{8,78}+2p_{7,46}+p_{8,190} \\ &+p_{8,65}+p_{8,225}+p_{7,25}+p_{8,185}+p_{8,121}+p_{8,133}+p_{8,197}+p_{8,165} \\ &+2p_{8,149}+p_{8,85}+p_{7,77}+p_{8,109}+p_{8,189}+p_{8,227}+p_{8,211}+p_{8,179} \\ &+2p_{8,75}+p_{8,235}+p_{8,187}+p_{8,123}+p_{8,7}+2p_{8,135}+p_{8,199}+p_{8,183} \\ &+p_{8,143}+p_{8,207}+p_{8,175}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,82} = \frac{1}{2}p_{8,82} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,82}^2 - 4(p_{8,160}+p_{7,96}+p_{8,112}+p_{8,152}+p_{8,132}+3p_{8,164} \\ &+p_{8,228}+p_{8,12}+p_{8,76}+p_{8,188}+p_{8,194}+p_{8,210}+p_{8,138}+p_{8,170} \\ &+p_{8,26}+p_{7,38}+p_{8,150}+p_{8,86}+p_{8,14}+p_{7,78}+2p_{7,110}+p_{8,126} \\ &+p_{8,1}+p_{8,161}+p_{7,89}+p_{8,57}+p_{8,121}+p_{8,133}+p_{8,69}+p_{8,101} \\ &+p_{8,21}+2p_{8,85}+p_{7,13}+p_{8,45}+p_{8,125}+p_{8,163}+p_{8,147}+p_{8,115} \\ &+2p_{8,11}+p_{8,171}+p_{8,59}+p_{8,123}+p_{8,135}+2p_{8,71}+p_{8,199}+p_{8,119} \\ &+p_{8,143}+p_{8,79}+p_{8,111}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,338} = \frac{1}{2}p_{8,82} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,82}^2 - 4(p_{8,160}+p_{7,96}+p_{8,112}+p_{8,152}+p_{8,132}+3p_{8,164} \\ &+p_{8,228}+p_{8,12}+p_{8,76}+p_{8,188}+p_{8,194}+p_{8,210}+p_{8,138}+p_{8,170} \\ &+p_{8,26}+p_{7,38}+p_{8,150}+p_{8,86}+p_{8,14}+p_{7,78}+2p_{7,110}+p_{8,126} \\ &+p_{8,1}+p_{8,161}+p_{7,89}+p_{8,57}+p_{8,121}+p_{8,133}+p_{8,69}+p_{8,101} \\ &+p_{8,21}+2p_{8,85}+p_{7,13}+p_{8,45}+p_{8,125}+p_{8,163}+p_{8,147}+p_{8,115} \\ &+2p_{8,11}+p_{8,171}+p_{8,59}+p_{8,123}+p_{8,135}+2p_{8,71}+p_{8,199}+p_{8,119} \\ &+p_{8,143}+p_{8,79}+p_{8,111}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,210} = \frac{1}{2}p_{8,210} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,210}^2 - 4(p_{8,32}+p_{7,96}+p_{8,240}+p_{8,24}+p_{8,4}+3p_{8,36} \\ &+p_{8,100}+p_{8,140}+p_{8,204}+p_{8,60}+p_{8,66}+p_{8,82}+p_{8,10}+p_{8,42} \\ &+p_{8,154}+p_{7,38}+p_{8,22}+p_{8,214}+p_{8,142}+p_{7,78}+2p_{7,110}+p_{8,254} \\ &+p_{8,129}+p_{8,33}+p_{7,89}+p_{8,185}+p_{8,249}+p_{8,5}+p_{8,197}+p_{8,229} \\ &+p_{8,149}+2p_{8,213}+p_{7,13}+p_{8,173}+p_{8,253}+p_{8,35}+p_{8,19}+p_{8,243} \\ &+2p_{8,139}+p_{8,43}+p_{8,187}+p_{8,251}+p_{8,7}+p_{8,71}+2p_{8,199}+p_{8,247} \\ &+p_{8,15}+p_{8,207}+p_{8,239}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,466} = \frac{1}{2}p_{8,210} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,210}^2 - 4(p_{8,32}+p_{7,96}+p_{8,240}+p_{8,24}+p_{8,4}+3p_{8,36} \\ &+p_{8,100}+p_{8,140}+p_{8,204}+p_{8,60}+p_{8,66}+p_{8,82}+p_{8,10}+p_{8,42} \\ &+p_{8,154}+p_{7,38}+p_{8,22}+p_{8,214}+p_{8,142}+p_{7,78}+2p_{7,110}+p_{8,254} \\ &+p_{8,129}+p_{8,33}+p_{7,89}+p_{8,185}+p_{8,249}+p_{8,5}+p_{8,197}+p_{8,229} \\ &+p_{8,149}+2p_{8,213}+p_{7,13}+p_{8,173}+p_{8,253}+p_{8,35}+p_{8,19}+p_{8,243} \\ &+2p_{8,139}+p_{8,43}+p_{8,187}+p_{8,251}+p_{8,7}+p_{8,71}+2p_{8,199}+p_{8,247} \\ &+p_{8,15}+p_{8,207}+p_{8,239}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,50} = \frac{1}{2}p_{8,50} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,50}^2 - 4(p_{8,128}+p_{7,64}+p_{8,80}+p_{8,120}+3p_{8,132}+p_{8,196} \\ &+p_{8,100}+p_{8,44}+p_{8,236}+p_{8,156}+p_{8,162}+p_{8,178}+p_{8,138}+p_{8,106} \\ &+p_{8,250}+p_{7,6}+p_{8,54}+p_{8,118}+2p_{7,78}+p_{7,46}+p_{8,238}+p_{8,94} \\ &+p_{8,129}+p_{8,225}+p_{8,25}+p_{8,89}+p_{7,57}+p_{8,69}+p_{8,37}+p_{8,101} \\ &+2p_{8,53}+p_{8,245}+p_{8,13}+p_{7,109}+p_{8,93}+p_{8,131}+p_{8,83}+p_{8,115} \\ &+p_{8,139}+2p_{8,235}+p_{8,27}+p_{8,91}+2p_{8,39}+p_{8,167}+p_{8,103}+p_{8,87} \\ &+p_{8,79}+p_{8,47}+p_{8,111}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,306} = \frac{1}{2}p_{8,50} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,50}^2 - 4(p_{8,128}+p_{7,64}+p_{8,80}+p_{8,120}+3p_{8,132}+p_{8,196} \\ &+p_{8,100}+p_{8,44}+p_{8,236}+p_{8,156}+p_{8,162}+p_{8,178}+p_{8,138}+p_{8,106} \\ &+p_{8,250}+p_{7,6}+p_{8,54}+p_{8,118}+2p_{7,78}+p_{7,46}+p_{8,238}+p_{8,94} \\ &+p_{8,129}+p_{8,225}+p_{8,25}+p_{8,89}+p_{7,57}+p_{8,69}+p_{8,37}+p_{8,101} \\ &+2p_{8,53}+p_{8,245}+p_{8,13}+p_{7,109}+p_{8,93}+p_{8,131}+p_{8,83}+p_{8,115} \\ &+p_{8,139}+2p_{8,235}+p_{8,27}+p_{8,91}+2p_{8,39}+p_{8,167}+p_{8,103}+p_{8,87} \\ &+p_{8,79}+p_{8,47}+p_{8,111}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,178} = \frac{1}{2}p_{8,178} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,178}^2 - 4(p_{8,0}+p_{7,64}+p_{8,208}+p_{8,248}+3p_{8,4}+p_{8,68} \\ &+p_{8,228}+p_{8,172}+p_{8,108}+p_{8,28}+p_{8,34}+p_{8,50}+p_{8,10}+p_{8,234} \\ &+p_{8,122}+p_{7,6}+p_{8,182}+p_{8,246}+2p_{7,78}+p_{7,46}+p_{8,110}+p_{8,222} \\ &+p_{8,1}+p_{8,97}+p_{8,153}+p_{8,217}+p_{7,57}+p_{8,197}+p_{8,165}+p_{8,229} \\ &+2p_{8,181}+p_{8,117}+p_{8,141}+p_{7,109}+p_{8,221}+p_{8,3}+p_{8,211}+p_{8,243} \\ &+p_{8,11}+2p_{8,107}+p_{8,155}+p_{8,219}+p_{8,39}+2p_{8,167}+p_{8,231} \\ &+p_{8,215}+p_{8,207}+p_{8,175}+p_{8,239}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,434} = \frac{1}{2}p_{8,178} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,178}^2 - 4(p_{8,0}+p_{7,64}+p_{8,208}+p_{8,248}+3p_{8,4}+p_{8,68} \\ &+p_{8,228}+p_{8,172}+p_{8,108}+p_{8,28}+p_{8,34}+p_{8,50}+p_{8,10}+p_{8,234} \\ &+p_{8,122}+p_{7,6}+p_{8,182}+p_{8,246}+2p_{7,78}+p_{7,46}+p_{8,110}+p_{8,222} \\ &+p_{8,1}+p_{8,97}+p_{8,153}+p_{8,217}+p_{7,57}+p_{8,197}+p_{8,165}+p_{8,229} \\ &+2p_{8,181}+p_{8,117}+p_{8,141}+p_{7,109}+p_{8,221}+p_{8,3}+p_{8,211}+p_{8,243} \\ &+p_{8,11}+2p_{8,107}+p_{8,155}+p_{8,219}+p_{8,39}+2p_{8,167}+p_{8,231} \\ &+p_{8,215}+p_{8,207}+p_{8,175}+p_{8,239}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,114} = \frac{1}{2}p_{8,114} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,114}^2 - 4(p_{7,0}+p_{8,192}+p_{8,144}+p_{8,184}+p_{8,4}+3p_{8,196} \\ &+p_{8,164}+p_{8,44}+p_{8,108}+p_{8,220}+p_{8,226}+p_{8,242}+p_{8,202}+p_{8,170} \\ &+p_{8,58}+p_{7,70}+p_{8,182}+p_{8,118}+2p_{7,14}+p_{8,46}+p_{7,110}+p_{8,158} \\ &+p_{8,193}+p_{8,33}+p_{8,153}+p_{8,89}+p_{7,121}+p_{8,133}+p_{8,165}+p_{8,101} \\ &+p_{8,53}+2p_{8,117}+p_{8,77}+p_{7,45}+p_{8,157}+p_{8,195}+p_{8,147}+p_{8,179} \\ &+p_{8,203}+2p_{8,43}+p_{8,155}+p_{8,91}+p_{8,167}+2p_{8,103}+p_{8,231}+p_{8,151} \\ &+p_{8,143}+p_{8,175}+p_{8,111}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,370} = \frac{1}{2}p_{8,114} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,114}^2 - 4(p_{7,0}+p_{8,192}+p_{8,144}+p_{8,184}+p_{8,4}+3p_{8,196} \\ &+p_{8,164}+p_{8,44}+p_{8,108}+p_{8,220}+p_{8,226}+p_{8,242}+p_{8,202}+p_{8,170} \\ &+p_{8,58}+p_{7,70}+p_{8,182}+p_{8,118}+2p_{7,14}+p_{8,46}+p_{7,110}+p_{8,158} \\ &+p_{8,193}+p_{8,33}+p_{8,153}+p_{8,89}+p_{7,121}+p_{8,133}+p_{8,165}+p_{8,101} \\ &+p_{8,53}+2p_{8,117}+p_{8,77}+p_{7,45}+p_{8,157}+p_{8,195}+p_{8,147}+p_{8,179} \\ &+p_{8,203}+2p_{8,43}+p_{8,155}+p_{8,91}+p_{8,167}+2p_{8,103}+p_{8,231}+p_{8,151} \\ &+p_{8,143}+p_{8,175}+p_{8,111}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,242} = \frac{1}{2}p_{8,242} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,242}^2 - 4(p_{7,0}+p_{8,64}+p_{8,16}+p_{8,56}+p_{8,132}+3p_{8,68} \\ &+p_{8,36}+p_{8,172}+p_{8,236}+p_{8,92}+p_{8,98}+p_{8,114}+p_{8,74}+p_{8,42} \\ &+p_{8,186}+p_{7,70}+p_{8,54}+p_{8,246}+2p_{7,14}+p_{8,174}+p_{7,110}+p_{8,30} \\ &+p_{8,65}+p_{8,161}+p_{8,25}+p_{8,217}+p_{7,121}+p_{8,5}+p_{8,37}+p_{8,229} \\ &+p_{8,181}+2p_{8,245}+p_{8,205}+p_{7,45}+p_{8,29}+p_{8,67}+p_{8,19}+p_{8,51} \\ &+p_{8,75}+2p_{8,171}+p_{8,27}+p_{8,219}+p_{8,39}+p_{8,103}+2p_{8,231}+p_{8,23} \\ &+p_{8,15}+p_{8,47}+p_{8,239}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,498} = \frac{1}{2}p_{8,242} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,242}^2 - 4(p_{7,0}+p_{8,64}+p_{8,16}+p_{8,56}+p_{8,132}+3p_{8,68} \\ &+p_{8,36}+p_{8,172}+p_{8,236}+p_{8,92}+p_{8,98}+p_{8,114}+p_{8,74}+p_{8,42} \\ &+p_{8,186}+p_{7,70}+p_{8,54}+p_{8,246}+2p_{7,14}+p_{8,174}+p_{7,110}+p_{8,30} \\ &+p_{8,65}+p_{8,161}+p_{8,25}+p_{8,217}+p_{7,121}+p_{8,5}+p_{8,37}+p_{8,229} \\ &+p_{8,181}+2p_{8,245}+p_{8,205}+p_{7,45}+p_{8,29}+p_{8,67}+p_{8,19}+p_{8,51} \\ &+p_{8,75}+2p_{8,171}+p_{8,27}+p_{8,219}+p_{8,39}+p_{8,103}+2p_{8,231}+p_{8,23} \\ &+p_{8,15}+p_{8,47}+p_{8,239}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,10} = \frac{1}{2}p_{8,10} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,10}^2 - 4(p_{8,80}+p_{8,40}+p_{7,24}+p_{8,88}+p_{8,4}+p_{8,196} \\ &+p_{8,116}+p_{8,156}+3p_{8,92}+p_{8,60}+p_{8,66}+p_{8,98}+p_{8,210}+p_{8,138} \\ &+p_{8,122}+p_{7,6}+p_{8,198}+2p_{7,38}+p_{8,54}+p_{8,14}+p_{8,78}+p_{7,94} \\ &+p_{7,17}+p_{8,49}+p_{8,241}+p_{8,89}+p_{8,185}+p_{7,69}+p_{8,229}+p_{8,53} \\ &+2p_{8,13}+p_{8,205}+p_{8,29}+p_{8,61}+p_{8,253}+2p_{8,195}+p_{8,99}+p_{8,51} \\ &+p_{8,243}+p_{8,75}+p_{8,43}+p_{8,91}+p_{8,7}+p_{8,71}+p_{8,39}+p_{8,183} \\ &+p_{8,119}+p_{8,47}+p_{8,63}+p_{8,127}+2p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,266} = \frac{1}{2}p_{8,10} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,10}^2 - 4(p_{8,80}+p_{8,40}+p_{7,24}+p_{8,88}+p_{8,4}+p_{8,196} \\ &+p_{8,116}+p_{8,156}+3p_{8,92}+p_{8,60}+p_{8,66}+p_{8,98}+p_{8,210}+p_{8,138} \\ &+p_{8,122}+p_{7,6}+p_{8,198}+2p_{7,38}+p_{8,54}+p_{8,14}+p_{8,78}+p_{7,94} \\ &+p_{7,17}+p_{8,49}+p_{8,241}+p_{8,89}+p_{8,185}+p_{7,69}+p_{8,229}+p_{8,53} \\ &+2p_{8,13}+p_{8,205}+p_{8,29}+p_{8,61}+p_{8,253}+2p_{8,195}+p_{8,99}+p_{8,51} \\ &+p_{8,243}+p_{8,75}+p_{8,43}+p_{8,91}+p_{8,7}+p_{8,71}+p_{8,39}+p_{8,183} \\ &+p_{8,119}+p_{8,47}+p_{8,63}+p_{8,127}+2p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,138} = \frac{1}{2}p_{8,138} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,138}^2 - 4(p_{8,208}+p_{8,168}+p_{7,24}+p_{8,216}+p_{8,132}+p_{8,68} \\ &+p_{8,244}+p_{8,28}+3p_{8,220}+p_{8,188}+p_{8,194}+p_{8,226}+p_{8,82}+p_{8,10} \\ &+p_{8,250}+p_{7,6}+p_{8,70}+2p_{7,38}+p_{8,182}+p_{8,142}+p_{8,206}+p_{7,94} \\ &+p_{7,17}+p_{8,177}+p_{8,113}+p_{8,217}+p_{8,57}+p_{7,69}+p_{8,101}+p_{8,181} \\ &+2p_{8,141}+p_{8,77}+p_{8,157}+p_{8,189}+p_{8,125}+2p_{8,67}+p_{8,227}+p_{8,179} \\ &+p_{8,115}+p_{8,203}+p_{8,171}+p_{8,219}+p_{8,135}+p_{8,199}+p_{8,167}+p_{8,55} \\ &+p_{8,247}+p_{8,175}+p_{8,191}+2p_{8,127}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,394} = \frac{1}{2}p_{8,138} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,138}^2 - 4(p_{8,208}+p_{8,168}+p_{7,24}+p_{8,216}+p_{8,132}+p_{8,68} \\ &+p_{8,244}+p_{8,28}+3p_{8,220}+p_{8,188}+p_{8,194}+p_{8,226}+p_{8,82}+p_{8,10} \\ &+p_{8,250}+p_{7,6}+p_{8,70}+2p_{7,38}+p_{8,182}+p_{8,142}+p_{8,206}+p_{7,94} \\ &+p_{7,17}+p_{8,177}+p_{8,113}+p_{8,217}+p_{8,57}+p_{7,69}+p_{8,101}+p_{8,181} \\ &+2p_{8,141}+p_{8,77}+p_{8,157}+p_{8,189}+p_{8,125}+2p_{8,67}+p_{8,227}+p_{8,179} \\ &+p_{8,115}+p_{8,203}+p_{8,171}+p_{8,219}+p_{8,135}+p_{8,199}+p_{8,167}+p_{8,55} \\ &+p_{8,247}+p_{8,175}+p_{8,191}+2p_{8,127}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,74} = \frac{1}{2}p_{8,74} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,74}^2 - 4(p_{8,144}+p_{8,104}+p_{8,152}+p_{7,88}+p_{8,4}+p_{8,68} \\ &+p_{8,180}+3p_{8,156}+p_{8,220}+p_{8,124}+p_{8,130}+p_{8,162}+p_{8,18} \\ &+p_{8,202}+p_{8,186}+p_{8,6}+p_{7,70}+2p_{7,102}+p_{8,118}+p_{8,142}+p_{8,78} \\ &+p_{7,30}+p_{7,81}+p_{8,49}+p_{8,113}+p_{8,153}+p_{8,249}+p_{7,5}+p_{8,37} \\ &+p_{8,117}+p_{8,13}+2p_{8,77}+p_{8,93}+p_{8,61}+p_{8,125}+2p_{8,3}+p_{8,163} \\ &+p_{8,51}+p_{8,115}+p_{8,139}+p_{8,107}+p_{8,155}+p_{8,135}+p_{8,71}+p_{8,103} \\ &+p_{8,183}+p_{8,247}+p_{8,111}+2p_{8,63}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,330} = \frac{1}{2}p_{8,74} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,74}^2 - 4(p_{8,144}+p_{8,104}+p_{8,152}+p_{7,88}+p_{8,4}+p_{8,68} \\ &+p_{8,180}+3p_{8,156}+p_{8,220}+p_{8,124}+p_{8,130}+p_{8,162}+p_{8,18} \\ &+p_{8,202}+p_{8,186}+p_{8,6}+p_{7,70}+2p_{7,102}+p_{8,118}+p_{8,142}+p_{8,78} \\ &+p_{7,30}+p_{7,81}+p_{8,49}+p_{8,113}+p_{8,153}+p_{8,249}+p_{7,5}+p_{8,37} \\ &+p_{8,117}+p_{8,13}+2p_{8,77}+p_{8,93}+p_{8,61}+p_{8,125}+2p_{8,3}+p_{8,163} \\ &+p_{8,51}+p_{8,115}+p_{8,139}+p_{8,107}+p_{8,155}+p_{8,135}+p_{8,71}+p_{8,103} \\ &+p_{8,183}+p_{8,247}+p_{8,111}+2p_{8,63}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,202} = \frac{1}{2}p_{8,202} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,202}^2 - 4(p_{8,16}+p_{8,232}+p_{8,24}+p_{7,88}+p_{8,132}+p_{8,196} \\ &+p_{8,52}+3p_{8,28}+p_{8,92}+p_{8,252}+p_{8,2}+p_{8,34}+p_{8,146}+p_{8,74} \\ &+p_{8,58}+p_{8,134}+p_{7,70}+2p_{7,102}+p_{8,246}+p_{8,14}+p_{8,206}+p_{7,30} \\ &+p_{7,81}+p_{8,177}+p_{8,241}+p_{8,25}+p_{8,121}+p_{7,5}+p_{8,165}+p_{8,245} \\ &+p_{8,141}+2p_{8,205}+p_{8,221}+p_{8,189}+p_{8,253}+2p_{8,131}+p_{8,35} \\ &+p_{8,179}+p_{8,243}+p_{8,11}+p_{8,235}+p_{8,27}+p_{8,7}+p_{8,199}+p_{8,231} \\ &+p_{8,55}+p_{8,119}+p_{8,239}+p_{8,63}+2p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,458} = \frac{1}{2}p_{8,202} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,202}^2 - 4(p_{8,16}+p_{8,232}+p_{8,24}+p_{7,88}+p_{8,132}+p_{8,196} \\ &+p_{8,52}+3p_{8,28}+p_{8,92}+p_{8,252}+p_{8,2}+p_{8,34}+p_{8,146}+p_{8,74} \\ &+p_{8,58}+p_{8,134}+p_{7,70}+2p_{7,102}+p_{8,246}+p_{8,14}+p_{8,206}+p_{7,30} \\ &+p_{7,81}+p_{8,177}+p_{8,241}+p_{8,25}+p_{8,121}+p_{7,5}+p_{8,165}+p_{8,245} \\ &+p_{8,141}+2p_{8,205}+p_{8,221}+p_{8,189}+p_{8,253}+2p_{8,131}+p_{8,35} \\ &+p_{8,179}+p_{8,243}+p_{8,11}+p_{8,235}+p_{8,27}+p_{8,7}+p_{8,199}+p_{8,231} \\ &+p_{8,55}+p_{8,119}+p_{8,239}+p_{8,63}+2p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,42} = \frac{1}{2}p_{8,42} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,42}^2 - 4(p_{8,112}+p_{8,72}+p_{7,56}+p_{8,120}+p_{8,36}+p_{8,228} \\ &+p_{8,148}+p_{8,92}+p_{8,188}+3p_{8,124}+p_{8,130}+p_{8,98}+p_{8,242} \\ &+p_{8,170}+p_{8,154}+2p_{7,70}+p_{7,38}+p_{8,230}+p_{8,86}+p_{8,46}+p_{8,110} \\ &+p_{7,126}+p_{8,17}+p_{8,81}+p_{7,49}+p_{8,217}+p_{8,121}+p_{8,5}+p_{7,101} \\ &+p_{8,85}+2p_{8,45}+p_{8,237}+p_{8,29}+p_{8,93}+p_{8,61}+p_{8,131}+2p_{8,227} \\ &+p_{8,19}+p_{8,83}+p_{8,75}+p_{8,107}+p_{8,123}+p_{8,71}+p_{8,39}+p_{8,103} \\ &+p_{8,151}+p_{8,215}+p_{8,79}+2p_{8,31}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,298} = \frac{1}{2}p_{8,42} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,42}^2 - 4(p_{8,112}+p_{8,72}+p_{7,56}+p_{8,120}+p_{8,36}+p_{8,228} \\ &+p_{8,148}+p_{8,92}+p_{8,188}+3p_{8,124}+p_{8,130}+p_{8,98}+p_{8,242} \\ &+p_{8,170}+p_{8,154}+2p_{7,70}+p_{7,38}+p_{8,230}+p_{8,86}+p_{8,46}+p_{8,110} \\ &+p_{7,126}+p_{8,17}+p_{8,81}+p_{7,49}+p_{8,217}+p_{8,121}+p_{8,5}+p_{7,101} \\ &+p_{8,85}+2p_{8,45}+p_{8,237}+p_{8,29}+p_{8,93}+p_{8,61}+p_{8,131}+2p_{8,227} \\ &+p_{8,19}+p_{8,83}+p_{8,75}+p_{8,107}+p_{8,123}+p_{8,71}+p_{8,39}+p_{8,103} \\ &+p_{8,151}+p_{8,215}+p_{8,79}+2p_{8,31}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,170} = \frac{1}{2}p_{8,170} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,170}^2 - 4(p_{8,240}+p_{8,200}+p_{7,56}+p_{8,248}+p_{8,164}+p_{8,100} \\ &+p_{8,20}+p_{8,220}+p_{8,60}+3p_{8,252}+p_{8,2}+p_{8,226}+p_{8,114}+p_{8,42} \\ &+p_{8,26}+2p_{7,70}+p_{7,38}+p_{8,102}+p_{8,214}+p_{8,174}+p_{8,238}+p_{7,126} \\ &+p_{8,145}+p_{8,209}+p_{7,49}+p_{8,89}+p_{8,249}+p_{8,133}+p_{7,101}+p_{8,213} \\ &+2p_{8,173}+p_{8,109}+p_{8,157}+p_{8,221}+p_{8,189}+p_{8,3}+2p_{8,99}+p_{8,147} \\ &+p_{8,211}+p_{8,203}+p_{8,235}+p_{8,251}+p_{8,199}+p_{8,167}+p_{8,231}+p_{8,23} \\ &+p_{8,87}+p_{8,207}+p_{8,31}+2p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,426} = \frac{1}{2}p_{8,170} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,170}^2 - 4(p_{8,240}+p_{8,200}+p_{7,56}+p_{8,248}+p_{8,164}+p_{8,100} \\ &+p_{8,20}+p_{8,220}+p_{8,60}+3p_{8,252}+p_{8,2}+p_{8,226}+p_{8,114}+p_{8,42} \\ &+p_{8,26}+2p_{7,70}+p_{7,38}+p_{8,102}+p_{8,214}+p_{8,174}+p_{8,238}+p_{7,126} \\ &+p_{8,145}+p_{8,209}+p_{7,49}+p_{8,89}+p_{8,249}+p_{8,133}+p_{7,101}+p_{8,213} \\ &+2p_{8,173}+p_{8,109}+p_{8,157}+p_{8,221}+p_{8,189}+p_{8,3}+2p_{8,99}+p_{8,147} \\ &+p_{8,211}+p_{8,203}+p_{8,235}+p_{8,251}+p_{8,199}+p_{8,167}+p_{8,231}+p_{8,23} \\ &+p_{8,87}+p_{8,207}+p_{8,31}+2p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,106} = \frac{1}{2}p_{8,106} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,106}^2 - 4(p_{8,176}+p_{8,136}+p_{8,184}+p_{7,120}+p_{8,36}+p_{8,100} \\ &+p_{8,212}+p_{8,156}+3p_{8,188}+p_{8,252}+p_{8,194}+p_{8,162}+p_{8,50}+p_{8,234} \\ &+p_{8,218}+2p_{7,6}+p_{8,38}+p_{7,102}+p_{8,150}+p_{8,174}+p_{8,110}+p_{7,62} \\ &+p_{8,145}+p_{8,81}+p_{7,113}+p_{8,25}+p_{8,185}+p_{8,69}+p_{7,37}+p_{8,149} \\ &+p_{8,45}+2p_{8,109}+p_{8,157}+p_{8,93}+p_{8,125}+p_{8,195}+2p_{8,35}+p_{8,147} \\ &+p_{8,83}+p_{8,139}+p_{8,171}+p_{8,187}+p_{8,135}+p_{8,167}+p_{8,103}+p_{8,23} \\ &+p_{8,215}+p_{8,143}+p_{8,159}+2p_{8,95}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,362} = \frac{1}{2}p_{8,106} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,106}^2 - 4(p_{8,176}+p_{8,136}+p_{8,184}+p_{7,120}+p_{8,36}+p_{8,100} \\ &+p_{8,212}+p_{8,156}+3p_{8,188}+p_{8,252}+p_{8,194}+p_{8,162}+p_{8,50}+p_{8,234} \\ &+p_{8,218}+2p_{7,6}+p_{8,38}+p_{7,102}+p_{8,150}+p_{8,174}+p_{8,110}+p_{7,62} \\ &+p_{8,145}+p_{8,81}+p_{7,113}+p_{8,25}+p_{8,185}+p_{8,69}+p_{7,37}+p_{8,149} \\ &+p_{8,45}+2p_{8,109}+p_{8,157}+p_{8,93}+p_{8,125}+p_{8,195}+2p_{8,35}+p_{8,147} \\ &+p_{8,83}+p_{8,139}+p_{8,171}+p_{8,187}+p_{8,135}+p_{8,167}+p_{8,103}+p_{8,23} \\ &+p_{8,215}+p_{8,143}+p_{8,159}+2p_{8,95}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,234} = \frac{1}{2}p_{8,234} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,234}^2 - 4(p_{8,48}+p_{8,8}+p_{8,56}+p_{7,120}+p_{8,164}+p_{8,228} \\ &+p_{8,84}+p_{8,28}+3p_{8,60}+p_{8,124}+p_{8,66}+p_{8,34}+p_{8,178}+p_{8,106} \\ &+p_{8,90}+2p_{7,6}+p_{8,166}+p_{7,102}+p_{8,22}+p_{8,46}+p_{8,238}+p_{7,62} \\ &+p_{8,17}+p_{8,209}+p_{7,113}+p_{8,153}+p_{8,57}+p_{8,197}+p_{7,37}+p_{8,21} \\ &+p_{8,173}+2p_{8,237}+p_{8,29}+p_{8,221}+p_{8,253}+p_{8,67}+2p_{8,163} \\ &+p_{8,19}+p_{8,211}+p_{8,11}+p_{8,43}+p_{8,59}+p_{8,7}+p_{8,39}+p_{8,231} \\ &+p_{8,151}+p_{8,87}+p_{8,15}+p_{8,31}+p_{8,95}+2p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,490} = \frac{1}{2}p_{8,234} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,234}^2 - 4(p_{8,48}+p_{8,8}+p_{8,56}+p_{7,120}+p_{8,164}+p_{8,228} \\ &+p_{8,84}+p_{8,28}+3p_{8,60}+p_{8,124}+p_{8,66}+p_{8,34}+p_{8,178}+p_{8,106} \\ &+p_{8,90}+2p_{7,6}+p_{8,166}+p_{7,102}+p_{8,22}+p_{8,46}+p_{8,238}+p_{7,62} \\ &+p_{8,17}+p_{8,209}+p_{7,113}+p_{8,153}+p_{8,57}+p_{8,197}+p_{7,37}+p_{8,21} \\ &+p_{8,173}+2p_{8,237}+p_{8,29}+p_{8,221}+p_{8,253}+p_{8,67}+2p_{8,163} \\ &+p_{8,19}+p_{8,211}+p_{8,11}+p_{8,43}+p_{8,59}+p_{8,7}+p_{8,39}+p_{8,231} \\ &+p_{8,151}+p_{8,87}+p_{8,15}+p_{8,31}+p_{8,95}+2p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,26} = \frac{1}{2}p_{8,26} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,26}^2 - 4(p_{8,96}+p_{7,40}+p_{8,104}+p_{8,56}+p_{8,132}+p_{8,20} \\ &+p_{8,212}+p_{8,76}+p_{8,172}+3p_{8,108}+p_{8,226}+p_{8,82}+p_{8,114} \\ &+p_{8,138}+p_{8,154}+p_{8,70}+p_{7,22}+p_{8,214}+2p_{7,54}+p_{7,110}+p_{8,30} \\ &+p_{8,94}+p_{8,1}+p_{8,65}+p_{7,33}+p_{8,201}+p_{8,105}+p_{8,69}+p_{7,85} \\ &+p_{8,245}+p_{8,13}+p_{8,77}+p_{8,45}+2p_{8,29}+p_{8,221}+p_{8,3}+p_{8,67} \\ &+2p_{8,211}+p_{8,115}+p_{8,107}+p_{8,91}+p_{8,59}+p_{8,135}+p_{8,199}+p_{8,23} \\ &+p_{8,87}+p_{8,55}+2p_{8,15}+p_{8,143}+p_{8,79}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,282} = \frac{1}{2}p_{8,26} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,26}^2 - 4(p_{8,96}+p_{7,40}+p_{8,104}+p_{8,56}+p_{8,132}+p_{8,20} \\ &+p_{8,212}+p_{8,76}+p_{8,172}+3p_{8,108}+p_{8,226}+p_{8,82}+p_{8,114} \\ &+p_{8,138}+p_{8,154}+p_{8,70}+p_{7,22}+p_{8,214}+2p_{7,54}+p_{7,110}+p_{8,30} \\ &+p_{8,94}+p_{8,1}+p_{8,65}+p_{7,33}+p_{8,201}+p_{8,105}+p_{8,69}+p_{7,85} \\ &+p_{8,245}+p_{8,13}+p_{8,77}+p_{8,45}+2p_{8,29}+p_{8,221}+p_{8,3}+p_{8,67} \\ &+2p_{8,211}+p_{8,115}+p_{8,107}+p_{8,91}+p_{8,59}+p_{8,135}+p_{8,199}+p_{8,23} \\ &+p_{8,87}+p_{8,55}+2p_{8,15}+p_{8,143}+p_{8,79}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,154} = \frac{1}{2}p_{8,154} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,154}^2 - 4(p_{8,224}+p_{7,40}+p_{8,232}+p_{8,184}+p_{8,4}+p_{8,148} \\ &+p_{8,84}+p_{8,204}+p_{8,44}+3p_{8,236}+p_{8,98}+p_{8,210}+p_{8,242}+p_{8,10} \\ &+p_{8,26}+p_{8,198}+p_{7,22}+p_{8,86}+2p_{7,54}+p_{7,110}+p_{8,158}+p_{8,222} \\ &+p_{8,129}+p_{8,193}+p_{7,33}+p_{8,73}+p_{8,233}+p_{8,197}+p_{7,85}+p_{8,117} \\ &+p_{8,141}+p_{8,205}+p_{8,173}+2p_{8,157}+p_{8,93}+p_{8,131}+p_{8,195}+2p_{8,83} \\ &+p_{8,243}+p_{8,235}+p_{8,219}+p_{8,187}+p_{8,7}+p_{8,71}+p_{8,151}+p_{8,215} \\ &+p_{8,183}+p_{8,15}+2p_{8,143}+p_{8,207}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,410} = \frac{1}{2}p_{8,154} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,154}^2 - 4(p_{8,224}+p_{7,40}+p_{8,232}+p_{8,184}+p_{8,4}+p_{8,148} \\ &+p_{8,84}+p_{8,204}+p_{8,44}+3p_{8,236}+p_{8,98}+p_{8,210}+p_{8,242}+p_{8,10} \\ &+p_{8,26}+p_{8,198}+p_{7,22}+p_{8,86}+2p_{7,54}+p_{7,110}+p_{8,158}+p_{8,222} \\ &+p_{8,129}+p_{8,193}+p_{7,33}+p_{8,73}+p_{8,233}+p_{8,197}+p_{7,85}+p_{8,117} \\ &+p_{8,141}+p_{8,205}+p_{8,173}+2p_{8,157}+p_{8,93}+p_{8,131}+p_{8,195}+2p_{8,83} \\ &+p_{8,243}+p_{8,235}+p_{8,219}+p_{8,187}+p_{8,7}+p_{8,71}+p_{8,151}+p_{8,215} \\ &+p_{8,183}+p_{8,15}+2p_{8,143}+p_{8,207}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,90} = \frac{1}{2}p_{8,90} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,90}^2 - 4(p_{8,160}+p_{8,168}+p_{7,104}+p_{8,120}+p_{8,196}+p_{8,20} \\ &+p_{8,84}+p_{8,140}+3p_{8,172}+p_{8,236}+p_{8,34}+p_{8,146}+p_{8,178}+p_{8,202} \\ &+p_{8,218}+p_{8,134}+p_{8,22}+p_{7,86}+2p_{7,118}+p_{7,46}+p_{8,158}+p_{8,94} \\ &+p_{8,129}+p_{8,65}+p_{7,97}+p_{8,9}+p_{8,169}+p_{8,133}+p_{7,21}+p_{8,53} \\ &+p_{8,141}+p_{8,77}+p_{8,109}+p_{8,29}+2p_{8,93}+p_{8,131}+p_{8,67}+2p_{8,19} \\ &+p_{8,179}+p_{8,171}+p_{8,155}+p_{8,123}+p_{8,7}+p_{8,199}+p_{8,151}+p_{8,87} \\ &+p_{8,119}+p_{8,143}+2p_{8,79}+p_{8,207}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,346} = \frac{1}{2}p_{8,90} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,90}^2 - 4(p_{8,160}+p_{8,168}+p_{7,104}+p_{8,120}+p_{8,196}+p_{8,20} \\ &+p_{8,84}+p_{8,140}+3p_{8,172}+p_{8,236}+p_{8,34}+p_{8,146}+p_{8,178}+p_{8,202} \\ &+p_{8,218}+p_{8,134}+p_{8,22}+p_{7,86}+2p_{7,118}+p_{7,46}+p_{8,158}+p_{8,94} \\ &+p_{8,129}+p_{8,65}+p_{7,97}+p_{8,9}+p_{8,169}+p_{8,133}+p_{7,21}+p_{8,53} \\ &+p_{8,141}+p_{8,77}+p_{8,109}+p_{8,29}+2p_{8,93}+p_{8,131}+p_{8,67}+2p_{8,19} \\ &+p_{8,179}+p_{8,171}+p_{8,155}+p_{8,123}+p_{8,7}+p_{8,199}+p_{8,151}+p_{8,87} \\ &+p_{8,119}+p_{8,143}+2p_{8,79}+p_{8,207}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,218} = \frac{1}{2}p_{8,218} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,218}^2 - 4(p_{8,32}+p_{8,40}+p_{7,104}+p_{8,248}+p_{8,68}+p_{8,148} \\ &+p_{8,212}+p_{8,12}+3p_{8,44}+p_{8,108}+p_{8,162}+p_{8,18}+p_{8,50}+p_{8,74} \\ &+p_{8,90}+p_{8,6}+p_{8,150}+p_{7,86}+2p_{7,118}+p_{7,46}+p_{8,30}+p_{8,222} \\ &+p_{8,1}+p_{8,193}+p_{7,97}+p_{8,137}+p_{8,41}+p_{8,5}+p_{7,21}+p_{8,181} \\ &+p_{8,13}+p_{8,205}+p_{8,237}+p_{8,157}+2p_{8,221}+p_{8,3}+p_{8,195} \\ &+2p_{8,147}+p_{8,51}+p_{8,43}+p_{8,27}+p_{8,251}+p_{8,135}+p_{8,71}+p_{8,23} \\ &+p_{8,215}+p_{8,247}+p_{8,15}+p_{8,79}+2p_{8,207}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,474} = \frac{1}{2}p_{8,218} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,218}^2 - 4(p_{8,32}+p_{8,40}+p_{7,104}+p_{8,248}+p_{8,68}+p_{8,148} \\ &+p_{8,212}+p_{8,12}+3p_{8,44}+p_{8,108}+p_{8,162}+p_{8,18}+p_{8,50}+p_{8,74} \\ &+p_{8,90}+p_{8,6}+p_{8,150}+p_{7,86}+2p_{7,118}+p_{7,46}+p_{8,30}+p_{8,222} \\ &+p_{8,1}+p_{8,193}+p_{7,97}+p_{8,137}+p_{8,41}+p_{8,5}+p_{7,21}+p_{8,181} \\ &+p_{8,13}+p_{8,205}+p_{8,237}+p_{8,157}+2p_{8,221}+p_{8,3}+p_{8,195} \\ &+2p_{8,147}+p_{8,51}+p_{8,43}+p_{8,27}+p_{8,251}+p_{8,135}+p_{8,71}+p_{8,23} \\ &+p_{8,215}+p_{8,247}+p_{8,15}+p_{8,79}+2p_{8,207}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,58} = \frac{1}{2}p_{8,58} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,58}^2 - 4(p_{8,128}+p_{8,136}+p_{7,72}+p_{8,88}+p_{8,164}+p_{8,52} \\ &+p_{8,244}+3p_{8,140}+p_{8,204}+p_{8,108}+p_{8,2}+p_{8,146}+p_{8,114}+p_{8,170} \\ &+p_{8,186}+p_{8,102}+2p_{7,86}+p_{7,54}+p_{8,246}+p_{7,14}+p_{8,62}+p_{8,126} \\ &+p_{7,65}+p_{8,33}+p_{8,97}+p_{8,137}+p_{8,233}+p_{8,101}+p_{8,21}+p_{7,117} \\ &+p_{8,77}+p_{8,45}+p_{8,109}+2p_{8,61}+p_{8,253}+p_{8,35}+p_{8,99}+p_{8,147} \\ &+2p_{8,243}+p_{8,139}+p_{8,91}+p_{8,123}+p_{8,167}+p_{8,231}+p_{8,87}+p_{8,55} \\ &+p_{8,119}+2p_{8,47}+p_{8,175}+p_{8,111}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,314} = \frac{1}{2}p_{8,58} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,58}^2 - 4(p_{8,128}+p_{8,136}+p_{7,72}+p_{8,88}+p_{8,164}+p_{8,52} \\ &+p_{8,244}+3p_{8,140}+p_{8,204}+p_{8,108}+p_{8,2}+p_{8,146}+p_{8,114}+p_{8,170} \\ &+p_{8,186}+p_{8,102}+2p_{7,86}+p_{7,54}+p_{8,246}+p_{7,14}+p_{8,62}+p_{8,126} \\ &+p_{7,65}+p_{8,33}+p_{8,97}+p_{8,137}+p_{8,233}+p_{8,101}+p_{8,21}+p_{7,117} \\ &+p_{8,77}+p_{8,45}+p_{8,109}+2p_{8,61}+p_{8,253}+p_{8,35}+p_{8,99}+p_{8,147} \\ &+2p_{8,243}+p_{8,139}+p_{8,91}+p_{8,123}+p_{8,167}+p_{8,231}+p_{8,87}+p_{8,55} \\ &+p_{8,119}+2p_{8,47}+p_{8,175}+p_{8,111}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,186} = \frac{1}{2}p_{8,186} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,186}^2 - 4(p_{8,0}+p_{8,8}+p_{7,72}+p_{8,216}+p_{8,36}+p_{8,180} \\ &+p_{8,116}+3p_{8,12}+p_{8,76}+p_{8,236}+p_{8,130}+p_{8,18}+p_{8,242}+p_{8,42} \\ &+p_{8,58}+p_{8,230}+2p_{7,86}+p_{7,54}+p_{8,118}+p_{7,14}+p_{8,190}+p_{8,254} \\ &+p_{7,65}+p_{8,161}+p_{8,225}+p_{8,9}+p_{8,105}+p_{8,229}+p_{8,149}+p_{7,117} \\ &+p_{8,205}+p_{8,173}+p_{8,237}+2p_{8,189}+p_{8,125}+p_{8,163}+p_{8,227} \\ &+p_{8,19}+2p_{8,115}+p_{8,11}+p_{8,219}+p_{8,251}+p_{8,39}+p_{8,103}+p_{8,215} \\ &+p_{8,183}+p_{8,247}+p_{8,47}+2p_{8,175}+p_{8,239}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,442} = \frac{1}{2}p_{8,186} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,186}^2 - 4(p_{8,0}+p_{8,8}+p_{7,72}+p_{8,216}+p_{8,36}+p_{8,180} \\ &+p_{8,116}+3p_{8,12}+p_{8,76}+p_{8,236}+p_{8,130}+p_{8,18}+p_{8,242}+p_{8,42} \\ &+p_{8,58}+p_{8,230}+2p_{7,86}+p_{7,54}+p_{8,118}+p_{7,14}+p_{8,190}+p_{8,254} \\ &+p_{7,65}+p_{8,161}+p_{8,225}+p_{8,9}+p_{8,105}+p_{8,229}+p_{8,149}+p_{7,117} \\ &+p_{8,205}+p_{8,173}+p_{8,237}+2p_{8,189}+p_{8,125}+p_{8,163}+p_{8,227} \\ &+p_{8,19}+2p_{8,115}+p_{8,11}+p_{8,219}+p_{8,251}+p_{8,39}+p_{8,103}+p_{8,215} \\ &+p_{8,183}+p_{8,247}+p_{8,47}+2p_{8,175}+p_{8,239}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,122} = \frac{1}{2}p_{8,122} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,122}^2 - 4(p_{8,192}+p_{7,8}+p_{8,200}+p_{8,152}+p_{8,228}+p_{8,52} \\ &+p_{8,116}+p_{8,12}+3p_{8,204}+p_{8,172}+p_{8,66}+p_{8,210}+p_{8,178}+p_{8,234} \\ &+p_{8,250}+p_{8,166}+2p_{7,22}+p_{8,54}+p_{7,118}+p_{7,78}+p_{8,190}+p_{8,126} \\ &+p_{7,1}+p_{8,161}+p_{8,97}+p_{8,201}+p_{8,41}+p_{8,165}+p_{8,85}+p_{7,53} \\ &+p_{8,141}+p_{8,173}+p_{8,109}+p_{8,61}+2p_{8,125}+p_{8,163}+p_{8,99}+p_{8,211} \\ &+2p_{8,51}+p_{8,203}+p_{8,155}+p_{8,187}+p_{8,39}+p_{8,231}+p_{8,151}+p_{8,183} \\ &+p_{8,119}+p_{8,175}+2p_{8,111}+p_{8,239}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,378} = \frac{1}{2}p_{8,122} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,122}^2 - 4(p_{8,192}+p_{7,8}+p_{8,200}+p_{8,152}+p_{8,228}+p_{8,52} \\ &+p_{8,116}+p_{8,12}+3p_{8,204}+p_{8,172}+p_{8,66}+p_{8,210}+p_{8,178}+p_{8,234} \\ &+p_{8,250}+p_{8,166}+2p_{7,22}+p_{8,54}+p_{7,118}+p_{7,78}+p_{8,190}+p_{8,126} \\ &+p_{7,1}+p_{8,161}+p_{8,97}+p_{8,201}+p_{8,41}+p_{8,165}+p_{8,85}+p_{7,53} \\ &+p_{8,141}+p_{8,173}+p_{8,109}+p_{8,61}+2p_{8,125}+p_{8,163}+p_{8,99}+p_{8,211} \\ &+2p_{8,51}+p_{8,203}+p_{8,155}+p_{8,187}+p_{8,39}+p_{8,231}+p_{8,151}+p_{8,183} \\ &+p_{8,119}+p_{8,175}+2p_{8,111}+p_{8,239}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,250} = \frac{1}{2}p_{8,250} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,250}^2 - 4(p_{8,64}+p_{7,8}+p_{8,72}+p_{8,24}+p_{8,100}+p_{8,180} \\ &+p_{8,244}+p_{8,140}+3p_{8,76}+p_{8,44}+p_{8,194}+p_{8,82}+p_{8,50}+p_{8,106} \\ &+p_{8,122}+p_{8,38}+2p_{7,22}+p_{8,182}+p_{7,118}+p_{7,78}+p_{8,62}+p_{8,254} \\ &+p_{7,1}+p_{8,33}+p_{8,225}+p_{8,73}+p_{8,169}+p_{8,37}+p_{8,213}+p_{7,53} \\ &+p_{8,13}+p_{8,45}+p_{8,237}+p_{8,189}+2p_{8,253}+p_{8,35}+p_{8,227}+p_{8,83} \\ &+2p_{8,179}+p_{8,75}+p_{8,27}+p_{8,59}+p_{8,167}+p_{8,103}+p_{8,23}+p_{8,55} \\ &+p_{8,247}+p_{8,47}+p_{8,111}+2p_{8,239}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,506} = \frac{1}{2}p_{8,250} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,250}^2 - 4(p_{8,64}+p_{7,8}+p_{8,72}+p_{8,24}+p_{8,100}+p_{8,180} \\ &+p_{8,244}+p_{8,140}+3p_{8,76}+p_{8,44}+p_{8,194}+p_{8,82}+p_{8,50}+p_{8,106} \\ &+p_{8,122}+p_{8,38}+2p_{7,22}+p_{8,182}+p_{7,118}+p_{7,78}+p_{8,62}+p_{8,254} \\ &+p_{7,1}+p_{8,33}+p_{8,225}+p_{8,73}+p_{8,169}+p_{8,37}+p_{8,213}+p_{7,53} \\ &+p_{8,13}+p_{8,45}+p_{8,237}+p_{8,189}+2p_{8,253}+p_{8,35}+p_{8,227}+p_{8,83} \\ &+2p_{8,179}+p_{8,75}+p_{8,27}+p_{8,59}+p_{8,167}+p_{8,103}+p_{8,23}+p_{8,55} \\ &+p_{8,247}+p_{8,47}+p_{8,111}+2p_{8,239}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,6} = \frac{1}{2}p_{8,6} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,6}^2 - 4(p_{8,0}+p_{8,192}+p_{8,112}+p_{8,152}+3p_{8,88}+p_{8,56} \\ &+p_{8,36}+p_{7,20}+p_{8,84}+p_{8,76}+p_{7,2}+p_{8,194}+2p_{7,34}+p_{8,50} \\ &+p_{8,10}+p_{8,74}+p_{7,90}+p_{8,134}+p_{8,118}+p_{8,206}+p_{8,94}+p_{8,62} \\ &+p_{7,65}+p_{8,225}+p_{8,49}+2p_{8,9}+p_{8,201}+p_{8,25}+p_{8,57}+p_{8,249} \\ &+p_{8,85}+p_{8,181}+p_{7,13}+p_{8,45}+p_{8,237}+p_{8,3}+p_{8,67}+p_{8,35} \\ &+p_{8,179}+p_{8,115}+p_{8,43}+p_{8,59}+p_{8,123}+2p_{8,251}+p_{8,71}+p_{8,39} \\ &+p_{8,87}+p_{8,47}+p_{8,239}+p_{8,95}+2p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,262} = \frac{1}{2}p_{8,6} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,6}^2 - 4(p_{8,0}+p_{8,192}+p_{8,112}+p_{8,152}+3p_{8,88}+p_{8,56} \\ &+p_{8,36}+p_{7,20}+p_{8,84}+p_{8,76}+p_{7,2}+p_{8,194}+2p_{7,34}+p_{8,50} \\ &+p_{8,10}+p_{8,74}+p_{7,90}+p_{8,134}+p_{8,118}+p_{8,206}+p_{8,94}+p_{8,62} \\ &+p_{7,65}+p_{8,225}+p_{8,49}+2p_{8,9}+p_{8,201}+p_{8,25}+p_{8,57}+p_{8,249} \\ &+p_{8,85}+p_{8,181}+p_{7,13}+p_{8,45}+p_{8,237}+p_{8,3}+p_{8,67}+p_{8,35} \\ &+p_{8,179}+p_{8,115}+p_{8,43}+p_{8,59}+p_{8,123}+2p_{8,251}+p_{8,71}+p_{8,39} \\ &+p_{8,87}+p_{8,47}+p_{8,239}+p_{8,95}+2p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,134} = \frac{1}{2}p_{8,134} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,134}^2 - 4(p_{8,128}+p_{8,64}+p_{8,240}+p_{8,24}+3p_{8,216}+p_{8,184} \\ &+p_{8,164}+p_{7,20}+p_{8,212}+p_{8,204}+p_{7,2}+p_{8,66}+2p_{7,34}+p_{8,178} \\ &+p_{8,138}+p_{8,202}+p_{7,90}+p_{8,6}+p_{8,246}+p_{8,78}+p_{8,222}+p_{8,190} \\ &+p_{7,65}+p_{8,97}+p_{8,177}+2p_{8,137}+p_{8,73}+p_{8,153}+p_{8,185}+p_{8,121} \\ &+p_{8,213}+p_{8,53}+p_{7,13}+p_{8,173}+p_{8,109}+p_{8,131}+p_{8,195}+p_{8,163} \\ &+p_{8,51}+p_{8,243}+p_{8,171}+p_{8,187}+2p_{8,123}+p_{8,251}+p_{8,199}+p_{8,167} \\ &+p_{8,215}+p_{8,175}+p_{8,111}+p_{8,223}+2p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,390} = \frac{1}{2}p_{8,134} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,134}^2 - 4(p_{8,128}+p_{8,64}+p_{8,240}+p_{8,24}+3p_{8,216}+p_{8,184} \\ &+p_{8,164}+p_{7,20}+p_{8,212}+p_{8,204}+p_{7,2}+p_{8,66}+2p_{7,34}+p_{8,178} \\ &+p_{8,138}+p_{8,202}+p_{7,90}+p_{8,6}+p_{8,246}+p_{8,78}+p_{8,222}+p_{8,190} \\ &+p_{7,65}+p_{8,97}+p_{8,177}+2p_{8,137}+p_{8,73}+p_{8,153}+p_{8,185}+p_{8,121} \\ &+p_{8,213}+p_{8,53}+p_{7,13}+p_{8,173}+p_{8,109}+p_{8,131}+p_{8,195}+p_{8,163} \\ &+p_{8,51}+p_{8,243}+p_{8,171}+p_{8,187}+2p_{8,123}+p_{8,251}+p_{8,199}+p_{8,167} \\ &+p_{8,215}+p_{8,175}+p_{8,111}+p_{8,223}+2p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,70} = \frac{1}{2}p_{8,70} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,70}^2 - 4(p_{8,0}+p_{8,64}+p_{8,176}+3p_{8,152}+p_{8,216}+p_{8,120} \\ &+p_{8,100}+p_{8,148}+p_{7,84}+p_{8,140}+p_{8,2}+p_{7,66}+2p_{7,98}+p_{8,114} \\ &+p_{8,138}+p_{8,74}+p_{7,26}+p_{8,198}+p_{8,182}+p_{8,14}+p_{8,158}+p_{8,126} \\ &+p_{7,1}+p_{8,33}+p_{8,113}+p_{8,9}+2p_{8,73}+p_{8,89}+p_{8,57}+p_{8,121} \\ &+p_{8,149}+p_{8,245}+p_{7,77}+p_{8,45}+p_{8,109}+p_{8,131}+p_{8,67}+p_{8,99} \\ &+p_{8,179}+p_{8,243}+p_{8,107}+2p_{8,59}+p_{8,187}+p_{8,123}+p_{8,135} \\ &+p_{8,103}+p_{8,151}+p_{8,47}+p_{8,111}+p_{8,159}+2p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,326} = \frac{1}{2}p_{8,70} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,70}^2 - 4(p_{8,0}+p_{8,64}+p_{8,176}+3p_{8,152}+p_{8,216}+p_{8,120} \\ &+p_{8,100}+p_{8,148}+p_{7,84}+p_{8,140}+p_{8,2}+p_{7,66}+2p_{7,98}+p_{8,114} \\ &+p_{8,138}+p_{8,74}+p_{7,26}+p_{8,198}+p_{8,182}+p_{8,14}+p_{8,158}+p_{8,126} \\ &+p_{7,1}+p_{8,33}+p_{8,113}+p_{8,9}+2p_{8,73}+p_{8,89}+p_{8,57}+p_{8,121} \\ &+p_{8,149}+p_{8,245}+p_{7,77}+p_{8,45}+p_{8,109}+p_{8,131}+p_{8,67}+p_{8,99} \\ &+p_{8,179}+p_{8,243}+p_{8,107}+2p_{8,59}+p_{8,187}+p_{8,123}+p_{8,135} \\ &+p_{8,103}+p_{8,151}+p_{8,47}+p_{8,111}+p_{8,159}+2p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,198} = \frac{1}{2}p_{8,198} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,198}^2 - 4(p_{8,128}+p_{8,192}+p_{8,48}+3p_{8,24}+p_{8,88}+p_{8,248} \\ &+p_{8,228}+p_{8,20}+p_{7,84}+p_{8,12}+p_{8,130}+p_{7,66}+2p_{7,98}+p_{8,242} \\ &+p_{8,10}+p_{8,202}+p_{7,26}+p_{8,70}+p_{8,54}+p_{8,142}+p_{8,30}+p_{8,254} \\ &+p_{7,1}+p_{8,161}+p_{8,241}+p_{8,137}+2p_{8,201}+p_{8,217}+p_{8,185}+p_{8,249} \\ &+p_{8,21}+p_{8,117}+p_{7,77}+p_{8,173}+p_{8,237}+p_{8,3}+p_{8,195}+p_{8,227} \\ &+p_{8,51}+p_{8,115}+p_{8,235}+p_{8,59}+2p_{8,187}+p_{8,251}+p_{8,7}+p_{8,231} \\ &+p_{8,23}+p_{8,175}+p_{8,239}+p_{8,31}+2p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,454} = \frac{1}{2}p_{8,198} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,198}^2 - 4(p_{8,128}+p_{8,192}+p_{8,48}+3p_{8,24}+p_{8,88}+p_{8,248} \\ &+p_{8,228}+p_{8,20}+p_{7,84}+p_{8,12}+p_{8,130}+p_{7,66}+2p_{7,98}+p_{8,242} \\ &+p_{8,10}+p_{8,202}+p_{7,26}+p_{8,70}+p_{8,54}+p_{8,142}+p_{8,30}+p_{8,254} \\ &+p_{7,1}+p_{8,161}+p_{8,241}+p_{8,137}+2p_{8,201}+p_{8,217}+p_{8,185}+p_{8,249} \\ &+p_{8,21}+p_{8,117}+p_{7,77}+p_{8,173}+p_{8,237}+p_{8,3}+p_{8,195}+p_{8,227} \\ &+p_{8,51}+p_{8,115}+p_{8,235}+p_{8,59}+2p_{8,187}+p_{8,251}+p_{8,7}+p_{8,231} \\ &+p_{8,23}+p_{8,175}+p_{8,239}+p_{8,31}+2p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,38} = \frac{1}{2}p_{8,38} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,38}^2 - 4(p_{8,32}+p_{8,224}+p_{8,144}+p_{8,88}+p_{8,184}+3p_{8,120} \\ &+p_{8,68}+p_{7,52}+p_{8,116}+p_{8,108}+2p_{7,66}+p_{7,34}+p_{8,226}+p_{8,82} \\ &+p_{8,42}+p_{8,106}+p_{7,122}+p_{8,166}+p_{8,150}+p_{8,238}+p_{8,94}+p_{8,126} \\ &+p_{8,1}+p_{7,97}+p_{8,81}+2p_{8,41}+p_{8,233}+p_{8,25}+p_{8,89}+p_{8,57} \\ &+p_{8,213}+p_{8,117}+p_{8,13}+p_{8,77}+p_{7,45}+p_{8,67}+p_{8,35}+p_{8,99} \\ &+p_{8,147}+p_{8,211}+p_{8,75}+2p_{8,27}+p_{8,155}+p_{8,91}+p_{8,71}+p_{8,103} \\ &+p_{8,119}+p_{8,15}+p_{8,79}+2p_{8,223}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,294} = \frac{1}{2}p_{8,38} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,38}^2 - 4(p_{8,32}+p_{8,224}+p_{8,144}+p_{8,88}+p_{8,184}+3p_{8,120} \\ &+p_{8,68}+p_{7,52}+p_{8,116}+p_{8,108}+2p_{7,66}+p_{7,34}+p_{8,226}+p_{8,82} \\ &+p_{8,42}+p_{8,106}+p_{7,122}+p_{8,166}+p_{8,150}+p_{8,238}+p_{8,94}+p_{8,126} \\ &+p_{8,1}+p_{7,97}+p_{8,81}+2p_{8,41}+p_{8,233}+p_{8,25}+p_{8,89}+p_{8,57} \\ &+p_{8,213}+p_{8,117}+p_{8,13}+p_{8,77}+p_{7,45}+p_{8,67}+p_{8,35}+p_{8,99} \\ &+p_{8,147}+p_{8,211}+p_{8,75}+2p_{8,27}+p_{8,155}+p_{8,91}+p_{8,71}+p_{8,103} \\ &+p_{8,119}+p_{8,15}+p_{8,79}+2p_{8,223}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,166} = \frac{1}{2}p_{8,166} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,166}^2 - 4(p_{8,160}+p_{8,96}+p_{8,16}+p_{8,216}+p_{8,56}+3p_{8,248} \\ &+p_{8,196}+p_{7,52}+p_{8,244}+p_{8,236}+2p_{7,66}+p_{7,34}+p_{8,98}+p_{8,210} \\ &+p_{8,170}+p_{8,234}+p_{7,122}+p_{8,38}+p_{8,22}+p_{8,110}+p_{8,222}+p_{8,254} \\ &+p_{8,129}+p_{7,97}+p_{8,209}+2p_{8,169}+p_{8,105}+p_{8,153}+p_{8,217}+p_{8,185} \\ &+p_{8,85}+p_{8,245}+p_{8,141}+p_{8,205}+p_{7,45}+p_{8,195}+p_{8,163}+p_{8,227} \\ &+p_{8,19}+p_{8,83}+p_{8,203}+p_{8,27}+2p_{8,155}+p_{8,219}+p_{8,199}+p_{8,231} \\ &+p_{8,247}+p_{8,143}+p_{8,207}+2p_{8,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,422} = \frac{1}{2}p_{8,166} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,166}^2 - 4(p_{8,160}+p_{8,96}+p_{8,16}+p_{8,216}+p_{8,56}+3p_{8,248} \\ &+p_{8,196}+p_{7,52}+p_{8,244}+p_{8,236}+2p_{7,66}+p_{7,34}+p_{8,98}+p_{8,210} \\ &+p_{8,170}+p_{8,234}+p_{7,122}+p_{8,38}+p_{8,22}+p_{8,110}+p_{8,222}+p_{8,254} \\ &+p_{8,129}+p_{7,97}+p_{8,209}+2p_{8,169}+p_{8,105}+p_{8,153}+p_{8,217}+p_{8,185} \\ &+p_{8,85}+p_{8,245}+p_{8,141}+p_{8,205}+p_{7,45}+p_{8,195}+p_{8,163}+p_{8,227} \\ &+p_{8,19}+p_{8,83}+p_{8,203}+p_{8,27}+2p_{8,155}+p_{8,219}+p_{8,199}+p_{8,231} \\ &+p_{8,247}+p_{8,143}+p_{8,207}+2p_{8,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,102} = \frac{1}{2}p_{8,102} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,102}^2 - 4(p_{8,32}+p_{8,96}+p_{8,208}+p_{8,152}+3p_{8,184}+p_{8,248} \\ &+p_{8,132}+p_{8,180}+p_{7,116}+p_{8,172}+2p_{7,2}+p_{8,34}+p_{7,98}+p_{8,146} \\ &+p_{8,170}+p_{8,106}+p_{7,58}+p_{8,230}+p_{8,214}+p_{8,46}+p_{8,158}+p_{8,190} \\ &+p_{8,65}+p_{7,33}+p_{8,145}+p_{8,41}+2p_{8,105}+p_{8,153}+p_{8,89}+p_{8,121} \\ &+p_{8,21}+p_{8,181}+p_{8,141}+p_{8,77}+p_{7,109}+p_{8,131}+p_{8,163}+p_{8,99} \\ &+p_{8,19}+p_{8,211}+p_{8,139}+p_{8,155}+2p_{8,91}+p_{8,219}+p_{8,135}+p_{8,167} \\ &+p_{8,183}+p_{8,143}+p_{8,79}+2p_{8,31}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,358} = \frac{1}{2}p_{8,102} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,102}^2 - 4(p_{8,32}+p_{8,96}+p_{8,208}+p_{8,152}+3p_{8,184}+p_{8,248} \\ &+p_{8,132}+p_{8,180}+p_{7,116}+p_{8,172}+2p_{7,2}+p_{8,34}+p_{7,98}+p_{8,146} \\ &+p_{8,170}+p_{8,106}+p_{7,58}+p_{8,230}+p_{8,214}+p_{8,46}+p_{8,158}+p_{8,190} \\ &+p_{8,65}+p_{7,33}+p_{8,145}+p_{8,41}+2p_{8,105}+p_{8,153}+p_{8,89}+p_{8,121} \\ &+p_{8,21}+p_{8,181}+p_{8,141}+p_{8,77}+p_{7,109}+p_{8,131}+p_{8,163}+p_{8,99} \\ &+p_{8,19}+p_{8,211}+p_{8,139}+p_{8,155}+2p_{8,91}+p_{8,219}+p_{8,135}+p_{8,167} \\ &+p_{8,183}+p_{8,143}+p_{8,79}+2p_{8,31}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,230} = \frac{1}{2}p_{8,230} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,230}^2 - 4(p_{8,160}+p_{8,224}+p_{8,80}+p_{8,24}+3p_{8,56}+p_{8,120} \\ &+p_{8,4}+p_{8,52}+p_{7,116}+p_{8,44}+2p_{7,2}+p_{8,162}+p_{7,98}+p_{8,18} \\ &+p_{8,42}+p_{8,234}+p_{7,58}+p_{8,102}+p_{8,86}+p_{8,174}+p_{8,30}+p_{8,62} \\ &+p_{8,193}+p_{7,33}+p_{8,17}+p_{8,169}+2p_{8,233}+p_{8,25}+p_{8,217}+p_{8,249} \\ &+p_{8,149}+p_{8,53}+p_{8,13}+p_{8,205}+p_{7,109}+p_{8,3}+p_{8,35}+p_{8,227} \\ &+p_{8,147}+p_{8,83}+p_{8,11}+p_{8,27}+p_{8,91}+2p_{8,219}+p_{8,7}+p_{8,39} \\ &+p_{8,55}+p_{8,15}+p_{8,207}+2p_{8,159}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,486} = \frac{1}{2}p_{8,230} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,230}^2 - 4(p_{8,160}+p_{8,224}+p_{8,80}+p_{8,24}+3p_{8,56}+p_{8,120} \\ &+p_{8,4}+p_{8,52}+p_{7,116}+p_{8,44}+2p_{7,2}+p_{8,162}+p_{7,98}+p_{8,18} \\ &+p_{8,42}+p_{8,234}+p_{7,58}+p_{8,102}+p_{8,86}+p_{8,174}+p_{8,30}+p_{8,62} \\ &+p_{8,193}+p_{7,33}+p_{8,17}+p_{8,169}+2p_{8,233}+p_{8,25}+p_{8,217}+p_{8,249} \\ &+p_{8,149}+p_{8,53}+p_{8,13}+p_{8,205}+p_{7,109}+p_{8,3}+p_{8,35}+p_{8,227} \\ &+p_{8,147}+p_{8,83}+p_{8,11}+p_{8,27}+p_{8,91}+2p_{8,219}+p_{8,7}+p_{8,39} \\ &+p_{8,55}+p_{8,15}+p_{8,207}+2p_{8,159}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,22} = \frac{1}{2}p_{8,22} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,22}^2 - 4(p_{8,128}+p_{8,16}+p_{8,208}+p_{8,72}+p_{8,168}+3p_{8,104} \\ &+p_{7,36}+p_{8,100}+p_{8,52}+p_{8,92}+p_{8,66}+p_{7,18}+p_{8,210}+2p_{7,50} \\ &+p_{7,106}+p_{8,26}+p_{8,90}+p_{8,134}+p_{8,150}+p_{8,78}+p_{8,110}+p_{8,222} \\ &+p_{8,65}+p_{7,81}+p_{8,241}+p_{8,9}+p_{8,73}+p_{8,41}+2p_{8,25}+p_{8,217} \\ &+p_{8,197}+p_{8,101}+p_{7,29}+p_{8,61}+p_{8,253}+p_{8,131}+p_{8,195}+p_{8,19} \\ &+p_{8,83}+p_{8,51}+2p_{8,11}+p_{8,139}+p_{8,75}+p_{8,59}+p_{8,103}+p_{8,87} \\ &+p_{8,55}+2p_{8,207}+p_{8,111}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,278} = \frac{1}{2}p_{8,22} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,22}^2 - 4(p_{8,128}+p_{8,16}+p_{8,208}+p_{8,72}+p_{8,168}+3p_{8,104} \\ &+p_{7,36}+p_{8,100}+p_{8,52}+p_{8,92}+p_{8,66}+p_{7,18}+p_{8,210}+2p_{7,50} \\ &+p_{7,106}+p_{8,26}+p_{8,90}+p_{8,134}+p_{8,150}+p_{8,78}+p_{8,110}+p_{8,222} \\ &+p_{8,65}+p_{7,81}+p_{8,241}+p_{8,9}+p_{8,73}+p_{8,41}+2p_{8,25}+p_{8,217} \\ &+p_{8,197}+p_{8,101}+p_{7,29}+p_{8,61}+p_{8,253}+p_{8,131}+p_{8,195}+p_{8,19} \\ &+p_{8,83}+p_{8,51}+2p_{8,11}+p_{8,139}+p_{8,75}+p_{8,59}+p_{8,103}+p_{8,87} \\ &+p_{8,55}+2p_{8,207}+p_{8,111}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,150} = \frac{1}{2}p_{8,150} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,150}^2 - 4(p_{8,0}+p_{8,144}+p_{8,80}+p_{8,200}+p_{8,40}+3p_{8,232} \\ &+p_{7,36}+p_{8,228}+p_{8,180}+p_{8,220}+p_{8,194}+p_{7,18}+p_{8,82}+2p_{7,50} \\ &+p_{7,106}+p_{8,154}+p_{8,218}+p_{8,6}+p_{8,22}+p_{8,206}+p_{8,238}+p_{8,94} \\ &+p_{8,193}+p_{7,81}+p_{8,113}+p_{8,137}+p_{8,201}+p_{8,169}+2p_{8,153}+p_{8,89} \\ &+p_{8,69}+p_{8,229}+p_{7,29}+p_{8,189}+p_{8,125}+p_{8,3}+p_{8,67}+p_{8,147} \\ &+p_{8,211}+p_{8,179}+p_{8,11}+2p_{8,139}+p_{8,203}+p_{8,187}+p_{8,231} \\ &+p_{8,215}+p_{8,183}+2p_{8,79}+p_{8,239}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,406} = \frac{1}{2}p_{8,150} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,150}^2 - 4(p_{8,0}+p_{8,144}+p_{8,80}+p_{8,200}+p_{8,40}+3p_{8,232} \\ &+p_{7,36}+p_{8,228}+p_{8,180}+p_{8,220}+p_{8,194}+p_{7,18}+p_{8,82}+2p_{7,50} \\ &+p_{7,106}+p_{8,154}+p_{8,218}+p_{8,6}+p_{8,22}+p_{8,206}+p_{8,238}+p_{8,94} \\ &+p_{8,193}+p_{7,81}+p_{8,113}+p_{8,137}+p_{8,201}+p_{8,169}+2p_{8,153}+p_{8,89} \\ &+p_{8,69}+p_{8,229}+p_{7,29}+p_{8,189}+p_{8,125}+p_{8,3}+p_{8,67}+p_{8,147} \\ &+p_{8,211}+p_{8,179}+p_{8,11}+2p_{8,139}+p_{8,203}+p_{8,187}+p_{8,231} \\ &+p_{8,215}+p_{8,183}+2p_{8,79}+p_{8,239}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,86} = \frac{1}{2}p_{8,86} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,86}^2 - 4(p_{8,192}+p_{8,16}+p_{8,80}+p_{8,136}+3p_{8,168}+p_{8,232} \\ &+p_{8,164}+p_{7,100}+p_{8,116}+p_{8,156}+p_{8,130}+p_{8,18}+p_{7,82}+2p_{7,114} \\ &+p_{7,42}+p_{8,154}+p_{8,90}+p_{8,198}+p_{8,214}+p_{8,142}+p_{8,174}+p_{8,30} \\ &+p_{8,129}+p_{7,17}+p_{8,49}+p_{8,137}+p_{8,73}+p_{8,105}+p_{8,25}+2p_{8,89} \\ &+p_{8,5}+p_{8,165}+p_{7,93}+p_{8,61}+p_{8,125}+p_{8,3}+p_{8,195}+p_{8,147} \\ &+p_{8,83}+p_{8,115}+p_{8,139}+2p_{8,75}+p_{8,203}+p_{8,123}+p_{8,167}+p_{8,151} \\ &+p_{8,119}+2p_{8,15}+p_{8,175}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,342} = \frac{1}{2}p_{8,86} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,86}^2 - 4(p_{8,192}+p_{8,16}+p_{8,80}+p_{8,136}+3p_{8,168}+p_{8,232} \\ &+p_{8,164}+p_{7,100}+p_{8,116}+p_{8,156}+p_{8,130}+p_{8,18}+p_{7,82}+2p_{7,114} \\ &+p_{7,42}+p_{8,154}+p_{8,90}+p_{8,198}+p_{8,214}+p_{8,142}+p_{8,174}+p_{8,30} \\ &+p_{8,129}+p_{7,17}+p_{8,49}+p_{8,137}+p_{8,73}+p_{8,105}+p_{8,25}+2p_{8,89} \\ &+p_{8,5}+p_{8,165}+p_{7,93}+p_{8,61}+p_{8,125}+p_{8,3}+p_{8,195}+p_{8,147} \\ &+p_{8,83}+p_{8,115}+p_{8,139}+2p_{8,75}+p_{8,203}+p_{8,123}+p_{8,167}+p_{8,151} \\ &+p_{8,119}+2p_{8,15}+p_{8,175}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,214} = \frac{1}{2}p_{8,214} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,214}^2 - 4(p_{8,64}+p_{8,144}+p_{8,208}+p_{8,8}+3p_{8,40}+p_{8,104} \\ &+p_{8,36}+p_{7,100}+p_{8,244}+p_{8,28}+p_{8,2}+p_{8,146}+p_{7,82}+2p_{7,114} \\ &+p_{7,42}+p_{8,26}+p_{8,218}+p_{8,70}+p_{8,86}+p_{8,14}+p_{8,46}+p_{8,158} \\ &+p_{8,1}+p_{7,17}+p_{8,177}+p_{8,9}+p_{8,201}+p_{8,233}+p_{8,153}+2p_{8,217} \\ &+p_{8,133}+p_{8,37}+p_{7,93}+p_{8,189}+p_{8,253}+p_{8,131}+p_{8,67}+p_{8,19} \\ &+p_{8,211}+p_{8,243}+p_{8,11}+p_{8,75}+2p_{8,203}+p_{8,251}+p_{8,39}+p_{8,23} \\ &+p_{8,247}+2p_{8,143}+p_{8,47}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,470} = \frac{1}{2}p_{8,214} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,214}^2 - 4(p_{8,64}+p_{8,144}+p_{8,208}+p_{8,8}+3p_{8,40}+p_{8,104} \\ &+p_{8,36}+p_{7,100}+p_{8,244}+p_{8,28}+p_{8,2}+p_{8,146}+p_{7,82}+2p_{7,114} \\ &+p_{7,42}+p_{8,26}+p_{8,218}+p_{8,70}+p_{8,86}+p_{8,14}+p_{8,46}+p_{8,158} \\ &+p_{8,1}+p_{7,17}+p_{8,177}+p_{8,9}+p_{8,201}+p_{8,233}+p_{8,153}+2p_{8,217} \\ &+p_{8,133}+p_{8,37}+p_{7,93}+p_{8,189}+p_{8,253}+p_{8,131}+p_{8,67}+p_{8,19} \\ &+p_{8,211}+p_{8,243}+p_{8,11}+p_{8,75}+2p_{8,203}+p_{8,251}+p_{8,39}+p_{8,23} \\ &+p_{8,247}+2p_{8,143}+p_{8,47}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,54} = \frac{1}{2}p_{8,54} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,54}^2 - 4(p_{8,160}+p_{8,48}+p_{8,240}+3p_{8,136}+p_{8,200}+p_{8,104} \\ &+p_{8,132}+p_{7,68}+p_{8,84}+p_{8,124}+p_{8,98}+2p_{7,82}+p_{7,50}+p_{8,242} \\ &+p_{7,10}+p_{8,58}+p_{8,122}+p_{8,166}+p_{8,182}+p_{8,142}+p_{8,110}+p_{8,254} \\ &+p_{8,97}+p_{8,17}+p_{7,113}+p_{8,73}+p_{8,41}+p_{8,105}+2p_{8,57}+p_{8,249} \\ &+p_{8,133}+p_{8,229}+p_{8,29}+p_{8,93}+p_{7,61}+p_{8,163}+p_{8,227}+p_{8,83} \\ &+p_{8,51}+p_{8,115}+2p_{8,43}+p_{8,171}+p_{8,107}+p_{8,91}+p_{8,135}+p_{8,87} \\ &+p_{8,119}+p_{8,143}+2p_{8,239}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,310} = \frac{1}{2}p_{8,54} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,54}^2 - 4(p_{8,160}+p_{8,48}+p_{8,240}+3p_{8,136}+p_{8,200}+p_{8,104} \\ &+p_{8,132}+p_{7,68}+p_{8,84}+p_{8,124}+p_{8,98}+2p_{7,82}+p_{7,50}+p_{8,242} \\ &+p_{7,10}+p_{8,58}+p_{8,122}+p_{8,166}+p_{8,182}+p_{8,142}+p_{8,110}+p_{8,254} \\ &+p_{8,97}+p_{8,17}+p_{7,113}+p_{8,73}+p_{8,41}+p_{8,105}+2p_{8,57}+p_{8,249} \\ &+p_{8,133}+p_{8,229}+p_{8,29}+p_{8,93}+p_{7,61}+p_{8,163}+p_{8,227}+p_{8,83} \\ &+p_{8,51}+p_{8,115}+2p_{8,43}+p_{8,171}+p_{8,107}+p_{8,91}+p_{8,135}+p_{8,87} \\ &+p_{8,119}+p_{8,143}+2p_{8,239}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,182} = \frac{1}{2}p_{8,182} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,182}^2 - 4(p_{8,32}+p_{8,176}+p_{8,112}+3p_{8,8}+p_{8,72}+p_{8,232} \\ &+p_{8,4}+p_{7,68}+p_{8,212}+p_{8,252}+p_{8,226}+2p_{7,82}+p_{7,50}+p_{8,114} \\ &+p_{7,10}+p_{8,186}+p_{8,250}+p_{8,38}+p_{8,54}+p_{8,14}+p_{8,238}+p_{8,126} \\ &+p_{8,225}+p_{8,145}+p_{7,113}+p_{8,201}+p_{8,169}+p_{8,233}+2p_{8,185} \\ &+p_{8,121}+p_{8,5}+p_{8,101}+p_{8,157}+p_{8,221}+p_{7,61}+p_{8,35}+p_{8,99} \\ &+p_{8,211}+p_{8,179}+p_{8,243}+p_{8,43}+2p_{8,171}+p_{8,235}+p_{8,219}+p_{8,7} \\ &+p_{8,215}+p_{8,247}+p_{8,15}+2p_{8,111}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,438} = \frac{1}{2}p_{8,182} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,182}^2 - 4(p_{8,32}+p_{8,176}+p_{8,112}+3p_{8,8}+p_{8,72}+p_{8,232} \\ &+p_{8,4}+p_{7,68}+p_{8,212}+p_{8,252}+p_{8,226}+2p_{7,82}+p_{7,50}+p_{8,114} \\ &+p_{7,10}+p_{8,186}+p_{8,250}+p_{8,38}+p_{8,54}+p_{8,14}+p_{8,238}+p_{8,126} \\ &+p_{8,225}+p_{8,145}+p_{7,113}+p_{8,201}+p_{8,169}+p_{8,233}+2p_{8,185} \\ &+p_{8,121}+p_{8,5}+p_{8,101}+p_{8,157}+p_{8,221}+p_{7,61}+p_{8,35}+p_{8,99} \\ &+p_{8,211}+p_{8,179}+p_{8,243}+p_{8,43}+2p_{8,171}+p_{8,235}+p_{8,219}+p_{8,7} \\ &+p_{8,215}+p_{8,247}+p_{8,15}+2p_{8,111}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,118} = \frac{1}{2}p_{8,118} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,118}^2 - 4(p_{8,224}+p_{8,48}+p_{8,112}+p_{8,8}+3p_{8,200}+p_{8,168} \\ &+p_{7,4}+p_{8,196}+p_{8,148}+p_{8,188}+p_{8,162}+2p_{7,18}+p_{8,50}+p_{7,114} \\ &+p_{7,74}+p_{8,186}+p_{8,122}+p_{8,230}+p_{8,246}+p_{8,206}+p_{8,174}+p_{8,62} \\ &+p_{8,161}+p_{8,81}+p_{7,49}+p_{8,137}+p_{8,169}+p_{8,105}+p_{8,57}+2p_{8,121} \\ &+p_{8,197}+p_{8,37}+p_{8,157}+p_{8,93}+p_{7,125}+p_{8,35}+p_{8,227}+p_{8,147} \\ &+p_{8,179}+p_{8,115}+p_{8,171}+2p_{8,107}+p_{8,235}+p_{8,155}+p_{8,199} \\ &+p_{8,151}+p_{8,183}+p_{8,207}+2p_{8,47}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,374} = \frac{1}{2}p_{8,118} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,118}^2 - 4(p_{8,224}+p_{8,48}+p_{8,112}+p_{8,8}+3p_{8,200}+p_{8,168} \\ &+p_{7,4}+p_{8,196}+p_{8,148}+p_{8,188}+p_{8,162}+2p_{7,18}+p_{8,50}+p_{7,114} \\ &+p_{7,74}+p_{8,186}+p_{8,122}+p_{8,230}+p_{8,246}+p_{8,206}+p_{8,174}+p_{8,62} \\ &+p_{8,161}+p_{8,81}+p_{7,49}+p_{8,137}+p_{8,169}+p_{8,105}+p_{8,57}+2p_{8,121} \\ &+p_{8,197}+p_{8,37}+p_{8,157}+p_{8,93}+p_{7,125}+p_{8,35}+p_{8,227}+p_{8,147} \\ &+p_{8,179}+p_{8,115}+p_{8,171}+2p_{8,107}+p_{8,235}+p_{8,155}+p_{8,199} \\ &+p_{8,151}+p_{8,183}+p_{8,207}+2p_{8,47}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,246} = \frac{1}{2}p_{8,246} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,246}^2 - 4(p_{8,96}+p_{8,176}+p_{8,240}+p_{8,136}+3p_{8,72}+p_{8,40} \\ &+p_{7,4}+p_{8,68}+p_{8,20}+p_{8,60}+p_{8,34}+2p_{7,18}+p_{8,178}+p_{7,114} \\ &+p_{7,74}+p_{8,58}+p_{8,250}+p_{8,102}+p_{8,118}+p_{8,78}+p_{8,46}+p_{8,190} \\ &+p_{8,33}+p_{8,209}+p_{7,49}+p_{8,9}+p_{8,41}+p_{8,233}+p_{8,185}+2p_{8,249} \\ &+p_{8,69}+p_{8,165}+p_{8,29}+p_{8,221}+p_{7,125}+p_{8,163}+p_{8,99}+p_{8,19} \\ &+p_{8,51}+p_{8,243}+p_{8,43}+p_{8,107}+2p_{8,235}+p_{8,27}+p_{8,71}+p_{8,23} \\ &+p_{8,55}+p_{8,79}+2p_{8,175}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,502} = \frac{1}{2}p_{8,246} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,246}^2 - 4(p_{8,96}+p_{8,176}+p_{8,240}+p_{8,136}+3p_{8,72}+p_{8,40} \\ &+p_{7,4}+p_{8,68}+p_{8,20}+p_{8,60}+p_{8,34}+2p_{7,18}+p_{8,178}+p_{7,114} \\ &+p_{7,74}+p_{8,58}+p_{8,250}+p_{8,102}+p_{8,118}+p_{8,78}+p_{8,46}+p_{8,190} \\ &+p_{8,33}+p_{8,209}+p_{7,49}+p_{8,9}+p_{8,41}+p_{8,233}+p_{8,185}+2p_{8,249} \\ &+p_{8,69}+p_{8,165}+p_{8,29}+p_{8,221}+p_{7,125}+p_{8,163}+p_{8,99}+p_{8,19} \\ &+p_{8,51}+p_{8,243}+p_{8,43}+p_{8,107}+2p_{8,235}+p_{8,27}+p_{8,71}+p_{8,23} \\ &+p_{8,55}+p_{8,79}+2p_{8,175}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,14} = \frac{1}{2}p_{8,14} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,14}^2 - 4(p_{8,64}+p_{8,160}+3p_{8,96}+p_{8,8}+p_{8,200}+p_{8,120} \\ &+p_{8,84}+p_{8,44}+p_{7,28}+p_{8,92}+p_{7,98}+p_{8,18}+p_{8,82}+p_{7,10} \\ &+p_{8,202}+2p_{7,42}+p_{8,58}+p_{8,70}+p_{8,102}+p_{8,214}+p_{8,142} \\ &+p_{8,126}+p_{8,1}+p_{8,65}+p_{8,33}+2p_{8,17}+p_{8,209}+p_{7,73}+p_{8,233} \\ &+p_{8,57}+p_{7,21}+p_{8,53}+p_{8,245}+p_{8,93}+p_{8,189}+2p_{8,3}+p_{8,131} \\ &+p_{8,67}+p_{8,51}+p_{8,11}+p_{8,75}+p_{8,43}+p_{8,187}+p_{8,123}+2p_{8,199} \\ &+p_{8,103}+p_{8,55}+p_{8,247}+p_{8,79}+p_{8,47}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,270} = \frac{1}{2}p_{8,14} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,14}^2 - 4(p_{8,64}+p_{8,160}+3p_{8,96}+p_{8,8}+p_{8,200}+p_{8,120} \\ &+p_{8,84}+p_{8,44}+p_{7,28}+p_{8,92}+p_{7,98}+p_{8,18}+p_{8,82}+p_{7,10} \\ &+p_{8,202}+2p_{7,42}+p_{8,58}+p_{8,70}+p_{8,102}+p_{8,214}+p_{8,142} \\ &+p_{8,126}+p_{8,1}+p_{8,65}+p_{8,33}+2p_{8,17}+p_{8,209}+p_{7,73}+p_{8,233} \\ &+p_{8,57}+p_{7,21}+p_{8,53}+p_{8,245}+p_{8,93}+p_{8,189}+2p_{8,3}+p_{8,131} \\ &+p_{8,67}+p_{8,51}+p_{8,11}+p_{8,75}+p_{8,43}+p_{8,187}+p_{8,123}+2p_{8,199} \\ &+p_{8,103}+p_{8,55}+p_{8,247}+p_{8,79}+p_{8,47}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,142} = \frac{1}{2}p_{8,142} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,142}^2 - 4(p_{8,192}+p_{8,32}+3p_{8,224}+p_{8,136}+p_{8,72}+p_{8,248} \\ &+p_{8,212}+p_{8,172}+p_{7,28}+p_{8,220}+p_{7,98}+p_{8,146}+p_{8,210}+p_{7,10} \\ &+p_{8,74}+2p_{7,42}+p_{8,186}+p_{8,198}+p_{8,230}+p_{8,86}+p_{8,14}+p_{8,254} \\ &+p_{8,129}+p_{8,193}+p_{8,161}+2p_{8,145}+p_{8,81}+p_{7,73}+p_{8,105}+p_{8,185} \\ &+p_{7,21}+p_{8,181}+p_{8,117}+p_{8,221}+p_{8,61}+p_{8,3}+2p_{8,131}+p_{8,195} \\ &+p_{8,179}+p_{8,139}+p_{8,203}+p_{8,171}+p_{8,59}+p_{8,251}+2p_{8,71}+p_{8,231} \\ &+p_{8,183}+p_{8,119}+p_{8,207}+p_{8,175}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,398} = \frac{1}{2}p_{8,142} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,142}^2 - 4(p_{8,192}+p_{8,32}+3p_{8,224}+p_{8,136}+p_{8,72}+p_{8,248} \\ &+p_{8,212}+p_{8,172}+p_{7,28}+p_{8,220}+p_{7,98}+p_{8,146}+p_{8,210}+p_{7,10} \\ &+p_{8,74}+2p_{7,42}+p_{8,186}+p_{8,198}+p_{8,230}+p_{8,86}+p_{8,14}+p_{8,254} \\ &+p_{8,129}+p_{8,193}+p_{8,161}+2p_{8,145}+p_{8,81}+p_{7,73}+p_{8,105}+p_{8,185} \\ &+p_{7,21}+p_{8,181}+p_{8,117}+p_{8,221}+p_{8,61}+p_{8,3}+2p_{8,131}+p_{8,195} \\ &+p_{8,179}+p_{8,139}+p_{8,203}+p_{8,171}+p_{8,59}+p_{8,251}+2p_{8,71}+p_{8,231} \\ &+p_{8,183}+p_{8,119}+p_{8,207}+p_{8,175}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,78} = \frac{1}{2}p_{8,78} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,78}^2 - 4(p_{8,128}+3p_{8,160}+p_{8,224}+p_{8,8}+p_{8,72}+p_{8,184} \\ &+p_{8,148}+p_{8,108}+p_{8,156}+p_{7,92}+p_{7,34}+p_{8,146}+p_{8,82}+p_{8,10} \\ &+p_{7,74}+2p_{7,106}+p_{8,122}+p_{8,134}+p_{8,166}+p_{8,22}+p_{8,206}+p_{8,190} \\ &+p_{8,129}+p_{8,65}+p_{8,97}+p_{8,17}+2p_{8,81}+p_{7,9}+p_{8,41}+p_{8,121} \\ &+p_{7,85}+p_{8,53}+p_{8,117}+p_{8,157}+p_{8,253}+p_{8,131}+2p_{8,67}+p_{8,195} \\ &+p_{8,115}+p_{8,139}+p_{8,75}+p_{8,107}+p_{8,187}+p_{8,251}+2p_{8,7}+p_{8,167} \\ &+p_{8,55}+p_{8,119}+p_{8,143}+p_{8,111}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,334} = \frac{1}{2}p_{8,78} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,78}^2 - 4(p_{8,128}+3p_{8,160}+p_{8,224}+p_{8,8}+p_{8,72}+p_{8,184} \\ &+p_{8,148}+p_{8,108}+p_{8,156}+p_{7,92}+p_{7,34}+p_{8,146}+p_{8,82}+p_{8,10} \\ &+p_{7,74}+2p_{7,106}+p_{8,122}+p_{8,134}+p_{8,166}+p_{8,22}+p_{8,206}+p_{8,190} \\ &+p_{8,129}+p_{8,65}+p_{8,97}+p_{8,17}+2p_{8,81}+p_{7,9}+p_{8,41}+p_{8,121} \\ &+p_{7,85}+p_{8,53}+p_{8,117}+p_{8,157}+p_{8,253}+p_{8,131}+2p_{8,67}+p_{8,195} \\ &+p_{8,115}+p_{8,139}+p_{8,75}+p_{8,107}+p_{8,187}+p_{8,251}+2p_{8,7}+p_{8,167} \\ &+p_{8,55}+p_{8,119}+p_{8,143}+p_{8,111}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,206} = \frac{1}{2}p_{8,206} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,206}^2 - 4(p_{8,0}+3p_{8,32}+p_{8,96}+p_{8,136}+p_{8,200}+p_{8,56} \\ &+p_{8,20}+p_{8,236}+p_{8,28}+p_{7,92}+p_{7,34}+p_{8,18}+p_{8,210}+p_{8,138} \\ &+p_{7,74}+2p_{7,106}+p_{8,250}+p_{8,6}+p_{8,38}+p_{8,150}+p_{8,78}+p_{8,62} \\ &+p_{8,1}+p_{8,193}+p_{8,225}+p_{8,145}+2p_{8,209}+p_{7,9}+p_{8,169}+p_{8,249} \\ &+p_{7,85}+p_{8,181}+p_{8,245}+p_{8,29}+p_{8,125}+p_{8,3}+p_{8,67}+2p_{8,195} \\ &+p_{8,243}+p_{8,11}+p_{8,203}+p_{8,235}+p_{8,59}+p_{8,123}+2p_{8,135}+p_{8,39} \\ &+p_{8,183}+p_{8,247}+p_{8,15}+p_{8,239}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,462} = \frac{1}{2}p_{8,206} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,206}^2 - 4(p_{8,0}+3p_{8,32}+p_{8,96}+p_{8,136}+p_{8,200}+p_{8,56} \\ &+p_{8,20}+p_{8,236}+p_{8,28}+p_{7,92}+p_{7,34}+p_{8,18}+p_{8,210}+p_{8,138} \\ &+p_{7,74}+2p_{7,106}+p_{8,250}+p_{8,6}+p_{8,38}+p_{8,150}+p_{8,78}+p_{8,62} \\ &+p_{8,1}+p_{8,193}+p_{8,225}+p_{8,145}+2p_{8,209}+p_{7,9}+p_{8,169}+p_{8,249} \\ &+p_{7,85}+p_{8,181}+p_{8,245}+p_{8,29}+p_{8,125}+p_{8,3}+p_{8,67}+2p_{8,195} \\ &+p_{8,243}+p_{8,11}+p_{8,203}+p_{8,235}+p_{8,59}+p_{8,123}+2p_{8,135}+p_{8,39} \\ &+p_{8,183}+p_{8,247}+p_{8,15}+p_{8,239}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,46} = \frac{1}{2}p_{8,46} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,46}^2 - 4(3p_{8,128}+p_{8,192}+p_{8,96}+p_{8,40}+p_{8,232}+p_{8,152} \\ &+p_{8,116}+p_{8,76}+p_{7,60}+p_{8,124}+p_{7,2}+p_{8,50}+p_{8,114}+2p_{7,74} \\ &+p_{7,42}+p_{8,234}+p_{8,90}+p_{8,134}+p_{8,102}+p_{8,246}+p_{8,174}+p_{8,158} \\ &+p_{8,65}+p_{8,33}+p_{8,97}+2p_{8,49}+p_{8,241}+p_{8,9}+p_{7,105}+p_{8,89} \\ &+p_{8,21}+p_{8,85}+p_{7,53}+p_{8,221}+p_{8,125}+2p_{8,35}+p_{8,163}+p_{8,99} \\ &+p_{8,83}+p_{8,75}+p_{8,43}+p_{8,107}+p_{8,155}+p_{8,219}+p_{8,135}+2p_{8,231} \\ &+p_{8,23}+p_{8,87}+p_{8,79}+p_{8,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,302} = \frac{1}{2}p_{8,46} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,46}^2 - 4(3p_{8,128}+p_{8,192}+p_{8,96}+p_{8,40}+p_{8,232}+p_{8,152} \\ &+p_{8,116}+p_{8,76}+p_{7,60}+p_{8,124}+p_{7,2}+p_{8,50}+p_{8,114}+2p_{7,74} \\ &+p_{7,42}+p_{8,234}+p_{8,90}+p_{8,134}+p_{8,102}+p_{8,246}+p_{8,174}+p_{8,158} \\ &+p_{8,65}+p_{8,33}+p_{8,97}+2p_{8,49}+p_{8,241}+p_{8,9}+p_{7,105}+p_{8,89} \\ &+p_{8,21}+p_{8,85}+p_{7,53}+p_{8,221}+p_{8,125}+2p_{8,35}+p_{8,163}+p_{8,99} \\ &+p_{8,83}+p_{8,75}+p_{8,43}+p_{8,107}+p_{8,155}+p_{8,219}+p_{8,135}+2p_{8,231} \\ &+p_{8,23}+p_{8,87}+p_{8,79}+p_{8,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,174} = \frac{1}{2}p_{8,174} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,174}^2 - 4(3p_{8,0}+p_{8,64}+p_{8,224}+p_{8,168}+p_{8,104}+p_{8,24} \\ &+p_{8,244}+p_{8,204}+p_{7,60}+p_{8,252}+p_{7,2}+p_{8,178}+p_{8,242}+2p_{7,74} \\ &+p_{7,42}+p_{8,106}+p_{8,218}+p_{8,6}+p_{8,230}+p_{8,118}+p_{8,46}+p_{8,30} \\ &+p_{8,193}+p_{8,161}+p_{8,225}+2p_{8,177}+p_{8,113}+p_{8,137}+p_{7,105} \\ &+p_{8,217}+p_{8,149}+p_{8,213}+p_{7,53}+p_{8,93}+p_{8,253}+p_{8,35}+2p_{8,163} \\ &+p_{8,227}+p_{8,211}+p_{8,203}+p_{8,171}+p_{8,235}+p_{8,27}+p_{8,91}+p_{8,7} \\ &+2p_{8,103}+p_{8,151}+p_{8,215}+p_{8,207}+p_{8,239}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,430} = \frac{1}{2}p_{8,174} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,174}^2 - 4(3p_{8,0}+p_{8,64}+p_{8,224}+p_{8,168}+p_{8,104}+p_{8,24} \\ &+p_{8,244}+p_{8,204}+p_{7,60}+p_{8,252}+p_{7,2}+p_{8,178}+p_{8,242}+2p_{7,74} \\ &+p_{7,42}+p_{8,106}+p_{8,218}+p_{8,6}+p_{8,230}+p_{8,118}+p_{8,46}+p_{8,30} \\ &+p_{8,193}+p_{8,161}+p_{8,225}+2p_{8,177}+p_{8,113}+p_{8,137}+p_{7,105} \\ &+p_{8,217}+p_{8,149}+p_{8,213}+p_{7,53}+p_{8,93}+p_{8,253}+p_{8,35}+2p_{8,163} \\ &+p_{8,227}+p_{8,211}+p_{8,203}+p_{8,171}+p_{8,235}+p_{8,27}+p_{8,91}+p_{8,7} \\ &+2p_{8,103}+p_{8,151}+p_{8,215}+p_{8,207}+p_{8,239}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,110} = \frac{1}{2}p_{8,110} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,110}^2 - 4(p_{8,0}+3p_{8,192}+p_{8,160}+p_{8,40}+p_{8,104}+p_{8,216} \\ &+p_{8,180}+p_{8,140}+p_{8,188}+p_{7,124}+p_{7,66}+p_{8,178}+p_{8,114}+2p_{7,10} \\ &+p_{8,42}+p_{7,106}+p_{8,154}+p_{8,198}+p_{8,166}+p_{8,54}+p_{8,238}+p_{8,222} \\ &+p_{8,129}+p_{8,161}+p_{8,97}+p_{8,49}+2p_{8,113}+p_{8,73}+p_{7,41}+p_{8,153} \\ &+p_{8,149}+p_{8,85}+p_{7,117}+p_{8,29}+p_{8,189}+p_{8,163}+2p_{8,99}+p_{8,227} \\ &+p_{8,147}+p_{8,139}+p_{8,171}+p_{8,107}+p_{8,27}+p_{8,219}+p_{8,199}+2p_{8,39} \\ &+p_{8,151}+p_{8,87}+p_{8,143}+p_{8,175}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,366} = \frac{1}{2}p_{8,110} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,110}^2 - 4(p_{8,0}+3p_{8,192}+p_{8,160}+p_{8,40}+p_{8,104}+p_{8,216} \\ &+p_{8,180}+p_{8,140}+p_{8,188}+p_{7,124}+p_{7,66}+p_{8,178}+p_{8,114}+2p_{7,10} \\ &+p_{8,42}+p_{7,106}+p_{8,154}+p_{8,198}+p_{8,166}+p_{8,54}+p_{8,238}+p_{8,222} \\ &+p_{8,129}+p_{8,161}+p_{8,97}+p_{8,49}+2p_{8,113}+p_{8,73}+p_{7,41}+p_{8,153} \\ &+p_{8,149}+p_{8,85}+p_{7,117}+p_{8,29}+p_{8,189}+p_{8,163}+2p_{8,99}+p_{8,227} \\ &+p_{8,147}+p_{8,139}+p_{8,171}+p_{8,107}+p_{8,27}+p_{8,219}+p_{8,199}+2p_{8,39} \\ &+p_{8,151}+p_{8,87}+p_{8,143}+p_{8,175}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,238} = \frac{1}{2}p_{8,238} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,238}^2 - 4(p_{8,128}+3p_{8,64}+p_{8,32}+p_{8,168}+p_{8,232}+p_{8,88} \\ &+p_{8,52}+p_{8,12}+p_{8,60}+p_{7,124}+p_{7,66}+p_{8,50}+p_{8,242}+2p_{7,10} \\ &+p_{8,170}+p_{7,106}+p_{8,26}+p_{8,70}+p_{8,38}+p_{8,182}+p_{8,110}+p_{8,94} \\ &+p_{8,1}+p_{8,33}+p_{8,225}+p_{8,177}+2p_{8,241}+p_{8,201}+p_{7,41}+p_{8,25} \\ &+p_{8,21}+p_{8,213}+p_{7,117}+p_{8,157}+p_{8,61}+p_{8,35}+p_{8,99}+2p_{8,227} \\ &+p_{8,19}+p_{8,11}+p_{8,43}+p_{8,235}+p_{8,155}+p_{8,91}+p_{8,71}+2p_{8,167} \\ &+p_{8,23}+p_{8,215}+p_{8,15}+p_{8,47}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,494} = \frac{1}{2}p_{8,238} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,238}^2 - 4(p_{8,128}+3p_{8,64}+p_{8,32}+p_{8,168}+p_{8,232}+p_{8,88} \\ &+p_{8,52}+p_{8,12}+p_{8,60}+p_{7,124}+p_{7,66}+p_{8,50}+p_{8,242}+2p_{7,10} \\ &+p_{8,170}+p_{7,106}+p_{8,26}+p_{8,70}+p_{8,38}+p_{8,182}+p_{8,110}+p_{8,94} \\ &+p_{8,1}+p_{8,33}+p_{8,225}+p_{8,177}+2p_{8,241}+p_{8,201}+p_{7,41}+p_{8,25} \\ &+p_{8,21}+p_{8,213}+p_{7,117}+p_{8,157}+p_{8,61}+p_{8,35}+p_{8,99}+2p_{8,227} \\ &+p_{8,19}+p_{8,11}+p_{8,43}+p_{8,235}+p_{8,155}+p_{8,91}+p_{8,71}+2p_{8,167} \\ &+p_{8,23}+p_{8,215}+p_{8,15}+p_{8,47}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,30} = \frac{1}{2}p_{8,30} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,30}^2 - 4(p_{8,80}+p_{8,176}+3p_{8,112}+p_{8,136}+p_{8,24}+p_{8,216} \\ &+p_{8,100}+p_{7,44}+p_{8,108}+p_{8,60}+p_{8,34}+p_{8,98}+p_{7,114}+p_{8,74} \\ &+p_{7,26}+p_{8,218}+2p_{7,58}+p_{8,230}+p_{8,86}+p_{8,118}+p_{8,142}+p_{8,158} \\ &+2p_{8,33}+p_{8,225}+p_{8,17}+p_{8,81}+p_{8,49}+p_{8,73}+p_{7,89}+p_{8,249} \\ &+p_{8,5}+p_{8,69}+p_{7,37}+p_{8,205}+p_{8,109}+p_{8,67}+2p_{8,19}+p_{8,147} \\ &+p_{8,83}+p_{8,139}+p_{8,203}+p_{8,27}+p_{8,91}+p_{8,59}+p_{8,7}+p_{8,71} \\ &+2p_{8,215}+p_{8,119}+p_{8,111}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,286} = \frac{1}{2}p_{8,30} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,30}^2 - 4(p_{8,80}+p_{8,176}+3p_{8,112}+p_{8,136}+p_{8,24}+p_{8,216} \\ &+p_{8,100}+p_{7,44}+p_{8,108}+p_{8,60}+p_{8,34}+p_{8,98}+p_{7,114}+p_{8,74} \\ &+p_{7,26}+p_{8,218}+2p_{7,58}+p_{8,230}+p_{8,86}+p_{8,118}+p_{8,142}+p_{8,158} \\ &+2p_{8,33}+p_{8,225}+p_{8,17}+p_{8,81}+p_{8,49}+p_{8,73}+p_{7,89}+p_{8,249} \\ &+p_{8,5}+p_{8,69}+p_{7,37}+p_{8,205}+p_{8,109}+p_{8,67}+2p_{8,19}+p_{8,147} \\ &+p_{8,83}+p_{8,139}+p_{8,203}+p_{8,27}+p_{8,91}+p_{8,59}+p_{8,7}+p_{8,71} \\ &+2p_{8,215}+p_{8,119}+p_{8,111}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,158} = \frac{1}{2}p_{8,158} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,158}^2 - 4(p_{8,208}+p_{8,48}+3p_{8,240}+p_{8,8}+p_{8,152}+p_{8,88} \\ &+p_{8,228}+p_{7,44}+p_{8,236}+p_{8,188}+p_{8,162}+p_{8,226}+p_{7,114}+p_{8,202} \\ &+p_{7,26}+p_{8,90}+2p_{7,58}+p_{8,102}+p_{8,214}+p_{8,246}+p_{8,14}+p_{8,30} \\ &+2p_{8,161}+p_{8,97}+p_{8,145}+p_{8,209}+p_{8,177}+p_{8,201}+p_{7,89}+p_{8,121} \\ &+p_{8,133}+p_{8,197}+p_{7,37}+p_{8,77}+p_{8,237}+p_{8,195}+p_{8,19}+2p_{8,147} \\ &+p_{8,211}+p_{8,11}+p_{8,75}+p_{8,155}+p_{8,219}+p_{8,187}+p_{8,135}+p_{8,199} \\ &+2p_{8,87}+p_{8,247}+p_{8,239}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,414} = \frac{1}{2}p_{8,158} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,158}^2 - 4(p_{8,208}+p_{8,48}+3p_{8,240}+p_{8,8}+p_{8,152}+p_{8,88} \\ &+p_{8,228}+p_{7,44}+p_{8,236}+p_{8,188}+p_{8,162}+p_{8,226}+p_{7,114}+p_{8,202} \\ &+p_{7,26}+p_{8,90}+2p_{7,58}+p_{8,102}+p_{8,214}+p_{8,246}+p_{8,14}+p_{8,30} \\ &+2p_{8,161}+p_{8,97}+p_{8,145}+p_{8,209}+p_{8,177}+p_{8,201}+p_{7,89}+p_{8,121} \\ &+p_{8,133}+p_{8,197}+p_{7,37}+p_{8,77}+p_{8,237}+p_{8,195}+p_{8,19}+2p_{8,147} \\ &+p_{8,211}+p_{8,11}+p_{8,75}+p_{8,155}+p_{8,219}+p_{8,187}+p_{8,135}+p_{8,199} \\ &+2p_{8,87}+p_{8,247}+p_{8,239}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,94} = \frac{1}{2}p_{8,94} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,94}^2 - 4(p_{8,144}+3p_{8,176}+p_{8,240}+p_{8,200}+p_{8,24}+p_{8,88} \\ &+p_{8,164}+p_{8,172}+p_{7,108}+p_{8,124}+p_{8,162}+p_{8,98}+p_{7,50}+p_{8,138} \\ &+p_{8,26}+p_{7,90}+2p_{7,122}+p_{8,38}+p_{8,150}+p_{8,182}+p_{8,206}+p_{8,222} \\ &+p_{8,33}+2p_{8,97}+p_{8,145}+p_{8,81}+p_{8,113}+p_{8,137}+p_{7,25}+p_{8,57} \\ &+p_{8,133}+p_{8,69}+p_{7,101}+p_{8,13}+p_{8,173}+p_{8,131}+p_{8,147}+2p_{8,83} \\ &+p_{8,211}+p_{8,11}+p_{8,203}+p_{8,155}+p_{8,91}+p_{8,123}+p_{8,135}+p_{8,71} \\ &+2p_{8,23}+p_{8,183}+p_{8,175}+p_{8,159}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,350} = \frac{1}{2}p_{8,94} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,94}^2 - 4(p_{8,144}+3p_{8,176}+p_{8,240}+p_{8,200}+p_{8,24}+p_{8,88} \\ &+p_{8,164}+p_{8,172}+p_{7,108}+p_{8,124}+p_{8,162}+p_{8,98}+p_{7,50}+p_{8,138} \\ &+p_{8,26}+p_{7,90}+2p_{7,122}+p_{8,38}+p_{8,150}+p_{8,182}+p_{8,206}+p_{8,222} \\ &+p_{8,33}+2p_{8,97}+p_{8,145}+p_{8,81}+p_{8,113}+p_{8,137}+p_{7,25}+p_{8,57} \\ &+p_{8,133}+p_{8,69}+p_{7,101}+p_{8,13}+p_{8,173}+p_{8,131}+p_{8,147}+2p_{8,83} \\ &+p_{8,211}+p_{8,11}+p_{8,203}+p_{8,155}+p_{8,91}+p_{8,123}+p_{8,135}+p_{8,71} \\ &+2p_{8,23}+p_{8,183}+p_{8,175}+p_{8,159}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,222} = \frac{1}{2}p_{8,222} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,222}^2 - 4(p_{8,16}+3p_{8,48}+p_{8,112}+p_{8,72}+p_{8,152}+p_{8,216} \\ &+p_{8,36}+p_{8,44}+p_{7,108}+p_{8,252}+p_{8,34}+p_{8,226}+p_{7,50}+p_{8,10} \\ &+p_{8,154}+p_{7,90}+2p_{7,122}+p_{8,166}+p_{8,22}+p_{8,54}+p_{8,78}+p_{8,94} \\ &+p_{8,161}+2p_{8,225}+p_{8,17}+p_{8,209}+p_{8,241}+p_{8,9}+p_{7,25}+p_{8,185} \\ &+p_{8,5}+p_{8,197}+p_{7,101}+p_{8,141}+p_{8,45}+p_{8,3}+p_{8,19}+p_{8,83} \\ &+2p_{8,211}+p_{8,139}+p_{8,75}+p_{8,27}+p_{8,219}+p_{8,251}+p_{8,7}+p_{8,199} \\ &+2p_{8,151}+p_{8,55}+p_{8,47}+p_{8,31}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,478} = \frac{1}{2}p_{8,222} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,222}^2 - 4(p_{8,16}+3p_{8,48}+p_{8,112}+p_{8,72}+p_{8,152}+p_{8,216} \\ &+p_{8,36}+p_{8,44}+p_{7,108}+p_{8,252}+p_{8,34}+p_{8,226}+p_{7,50}+p_{8,10} \\ &+p_{8,154}+p_{7,90}+2p_{7,122}+p_{8,166}+p_{8,22}+p_{8,54}+p_{8,78}+p_{8,94} \\ &+p_{8,161}+2p_{8,225}+p_{8,17}+p_{8,209}+p_{8,241}+p_{8,9}+p_{7,25}+p_{8,185} \\ &+p_{8,5}+p_{8,197}+p_{7,101}+p_{8,141}+p_{8,45}+p_{8,3}+p_{8,19}+p_{8,83} \\ &+2p_{8,211}+p_{8,139}+p_{8,75}+p_{8,27}+p_{8,219}+p_{8,251}+p_{8,7}+p_{8,199} \\ &+2p_{8,151}+p_{8,55}+p_{8,47}+p_{8,31}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,62} = \frac{1}{2}p_{8,62} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,62}^2 - 4(3p_{8,144}+p_{8,208}+p_{8,112}+p_{8,168}+p_{8,56}+p_{8,248} \\ &+p_{8,132}+p_{8,140}+p_{7,76}+p_{8,92}+p_{8,130}+p_{8,66}+p_{7,18}+p_{8,106} \\ &+2p_{7,90}+p_{7,58}+p_{8,250}+p_{8,6}+p_{8,150}+p_{8,118}+p_{8,174}+p_{8,190} \\ &+p_{8,1}+2p_{8,65}+p_{8,81}+p_{8,49}+p_{8,113}+p_{8,105}+p_{8,25}+p_{7,121} \\ &+p_{7,69}+p_{8,37}+p_{8,101}+p_{8,141}+p_{8,237}+p_{8,99}+2p_{8,51}+p_{8,179} \\ &+p_{8,115}+p_{8,171}+p_{8,235}+p_{8,91}+p_{8,59}+p_{8,123}+p_{8,39}+p_{8,103} \\ &+p_{8,151}+2p_{8,247}+p_{8,143}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,318} = \frac{1}{2}p_{8,62} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,62}^2 - 4(3p_{8,144}+p_{8,208}+p_{8,112}+p_{8,168}+p_{8,56}+p_{8,248} \\ &+p_{8,132}+p_{8,140}+p_{7,76}+p_{8,92}+p_{8,130}+p_{8,66}+p_{7,18}+p_{8,106} \\ &+2p_{7,90}+p_{7,58}+p_{8,250}+p_{8,6}+p_{8,150}+p_{8,118}+p_{8,174}+p_{8,190} \\ &+p_{8,1}+2p_{8,65}+p_{8,81}+p_{8,49}+p_{8,113}+p_{8,105}+p_{8,25}+p_{7,121} \\ &+p_{7,69}+p_{8,37}+p_{8,101}+p_{8,141}+p_{8,237}+p_{8,99}+2p_{8,51}+p_{8,179} \\ &+p_{8,115}+p_{8,171}+p_{8,235}+p_{8,91}+p_{8,59}+p_{8,123}+p_{8,39}+p_{8,103} \\ &+p_{8,151}+2p_{8,247}+p_{8,143}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,190} = \frac{1}{2}p_{8,190} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,190}^2 - 4(3p_{8,16}+p_{8,80}+p_{8,240}+p_{8,40}+p_{8,184}+p_{8,120} \\ &+p_{8,4}+p_{8,12}+p_{7,76}+p_{8,220}+p_{8,2}+p_{8,194}+p_{7,18}+p_{8,234} \\ &+2p_{7,90}+p_{7,58}+p_{8,122}+p_{8,134}+p_{8,22}+p_{8,246}+p_{8,46}+p_{8,62} \\ &+p_{8,129}+2p_{8,193}+p_{8,209}+p_{8,177}+p_{8,241}+p_{8,233}+p_{8,153} \\ &+p_{7,121}+p_{7,69}+p_{8,165}+p_{8,229}+p_{8,13}+p_{8,109}+p_{8,227}+p_{8,51} \\ &+2p_{8,179}+p_{8,243}+p_{8,43}+p_{8,107}+p_{8,219}+p_{8,187}+p_{8,251} \\ &+p_{8,167}+p_{8,231}+p_{8,23}+2p_{8,119}+p_{8,15}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,446} = \frac{1}{2}p_{8,190} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,190}^2 - 4(3p_{8,16}+p_{8,80}+p_{8,240}+p_{8,40}+p_{8,184}+p_{8,120} \\ &+p_{8,4}+p_{8,12}+p_{7,76}+p_{8,220}+p_{8,2}+p_{8,194}+p_{7,18}+p_{8,234} \\ &+2p_{7,90}+p_{7,58}+p_{8,122}+p_{8,134}+p_{8,22}+p_{8,246}+p_{8,46}+p_{8,62} \\ &+p_{8,129}+2p_{8,193}+p_{8,209}+p_{8,177}+p_{8,241}+p_{8,233}+p_{8,153} \\ &+p_{7,121}+p_{7,69}+p_{8,165}+p_{8,229}+p_{8,13}+p_{8,109}+p_{8,227}+p_{8,51} \\ &+2p_{8,179}+p_{8,243}+p_{8,43}+p_{8,107}+p_{8,219}+p_{8,187}+p_{8,251} \\ &+p_{8,167}+p_{8,231}+p_{8,23}+2p_{8,119}+p_{8,15}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,126} = \frac{1}{2}p_{8,126} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,126}^2 - 4(p_{8,16}+3p_{8,208}+p_{8,176}+p_{8,232}+p_{8,56}+p_{8,120} \\ &+p_{8,196}+p_{7,12}+p_{8,204}+p_{8,156}+p_{8,130}+p_{8,194}+p_{7,82}+p_{8,170} \\ &+2p_{7,26}+p_{8,58}+p_{7,122}+p_{8,70}+p_{8,214}+p_{8,182}+p_{8,238}+p_{8,254} \\ &+2p_{8,129}+p_{8,65}+p_{8,145}+p_{8,177}+p_{8,113}+p_{8,169}+p_{8,89}+p_{7,57} \\ &+p_{7,5}+p_{8,165}+p_{8,101}+p_{8,205}+p_{8,45}+p_{8,163}+p_{8,179}+2p_{8,115} \\ &+p_{8,243}+p_{8,43}+p_{8,235}+p_{8,155}+p_{8,187}+p_{8,123}+p_{8,167}+p_{8,103} \\ &+p_{8,215}+2p_{8,55}+p_{8,207}+p_{8,159}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,382} = \frac{1}{2}p_{8,126} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,126}^2 - 4(p_{8,16}+3p_{8,208}+p_{8,176}+p_{8,232}+p_{8,56}+p_{8,120} \\ &+p_{8,196}+p_{7,12}+p_{8,204}+p_{8,156}+p_{8,130}+p_{8,194}+p_{7,82}+p_{8,170} \\ &+2p_{7,26}+p_{8,58}+p_{7,122}+p_{8,70}+p_{8,214}+p_{8,182}+p_{8,238}+p_{8,254} \\ &+2p_{8,129}+p_{8,65}+p_{8,145}+p_{8,177}+p_{8,113}+p_{8,169}+p_{8,89}+p_{7,57} \\ &+p_{7,5}+p_{8,165}+p_{8,101}+p_{8,205}+p_{8,45}+p_{8,163}+p_{8,179}+2p_{8,115} \\ &+p_{8,243}+p_{8,43}+p_{8,235}+p_{8,155}+p_{8,187}+p_{8,123}+p_{8,167}+p_{8,103} \\ &+p_{8,215}+2p_{8,55}+p_{8,207}+p_{8,159}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,254} = \frac{1}{2}p_{8,254} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,254}^2 - 4(p_{8,144}+3p_{8,80}+p_{8,48}+p_{8,104}+p_{8,184}+p_{8,248} \\ &+p_{8,68}+p_{7,12}+p_{8,76}+p_{8,28}+p_{8,2}+p_{8,66}+p_{7,82}+p_{8,42} \\ &+2p_{7,26}+p_{8,186}+p_{7,122}+p_{8,198}+p_{8,86}+p_{8,54}+p_{8,110}+p_{8,126} \\ &+2p_{8,1}+p_{8,193}+p_{8,17}+p_{8,49}+p_{8,241}+p_{8,41}+p_{8,217}+p_{7,57} \\ &+p_{7,5}+p_{8,37}+p_{8,229}+p_{8,77}+p_{8,173}+p_{8,35}+p_{8,51}+p_{8,115} \\ &+2p_{8,243}+p_{8,171}+p_{8,107}+p_{8,27}+p_{8,59}+p_{8,251}+p_{8,39}+p_{8,231} \\ &+p_{8,87}+2p_{8,183}+p_{8,79}+p_{8,31}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,510} = \frac{1}{2}p_{8,254} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,254}^2 - 4(p_{8,144}+3p_{8,80}+p_{8,48}+p_{8,104}+p_{8,184}+p_{8,248} \\ &+p_{8,68}+p_{7,12}+p_{8,76}+p_{8,28}+p_{8,2}+p_{8,66}+p_{7,82}+p_{8,42} \\ &+2p_{7,26}+p_{8,186}+p_{7,122}+p_{8,198}+p_{8,86}+p_{8,54}+p_{8,110}+p_{8,126} \\ &+2p_{8,1}+p_{8,193}+p_{8,17}+p_{8,49}+p_{8,241}+p_{8,41}+p_{8,217}+p_{7,57} \\ &+p_{7,5}+p_{8,37}+p_{8,229}+p_{8,77}+p_{8,173}+p_{8,35}+p_{8,51}+p_{8,115} \\ &+2p_{8,243}+p_{8,171}+p_{8,107}+p_{8,27}+p_{8,59}+p_{8,251}+p_{8,39}+p_{8,231} \\ &+p_{8,87}+2p_{8,183}+p_{8,79}+p_{8,31}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,1} = \frac{1}{2}p_{8,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,1}^2 - 4(p_{8,80}+p_{8,176}+p_{7,8}+p_{8,40}+p_{8,232}+2p_{8,4} \\ &+p_{8,196}+p_{8,20}+p_{8,52}+p_{8,244}+p_{8,44}+p_{8,220}+p_{7,60}+p_{8,66} \\ &+p_{8,34}+p_{8,82}+p_{8,42}+p_{8,234}+p_{8,90}+2p_{8,186}+p_{8,38}+p_{8,54} \\ &+p_{8,118}+2p_{8,246}+p_{8,174}+p_{8,110}+p_{8,30}+p_{8,62}+p_{8,254} \\ &+p_{8,129}+p_{8,113}+p_{8,201}+p_{8,89}+p_{8,57}+p_{8,5}+p_{8,69}+p_{7,85} \\ &+p_{8,45}+2p_{7,29}+p_{8,189}+p_{7,125}+p_{8,147}+3p_{8,83}+p_{8,51} \\ &+p_{8,107}+p_{8,187}+p_{8,251}+p_{8,71}+p_{7,15}+p_{8,79}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,257} = \frac{1}{2}p_{8,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,1}^2 - 4(p_{8,80}+p_{8,176}+p_{7,8}+p_{8,40}+p_{8,232}+2p_{8,4} \\ &+p_{8,196}+p_{8,20}+p_{8,52}+p_{8,244}+p_{8,44}+p_{8,220}+p_{7,60}+p_{8,66} \\ &+p_{8,34}+p_{8,82}+p_{8,42}+p_{8,234}+p_{8,90}+2p_{8,186}+p_{8,38}+p_{8,54} \\ &+p_{8,118}+2p_{8,246}+p_{8,174}+p_{8,110}+p_{8,30}+p_{8,62}+p_{8,254} \\ &+p_{8,129}+p_{8,113}+p_{8,201}+p_{8,89}+p_{8,57}+p_{8,5}+p_{8,69}+p_{7,85} \\ &+p_{8,45}+2p_{7,29}+p_{8,189}+p_{7,125}+p_{8,147}+3p_{8,83}+p_{8,51} \\ &+p_{8,107}+p_{8,187}+p_{8,251}+p_{8,71}+p_{7,15}+p_{8,79}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,129} = \frac{1}{2}p_{8,129} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,129}^2 - 4(p_{8,208}+p_{8,48}+p_{7,8}+p_{8,168}+p_{8,104}+2p_{8,132} \\ &+p_{8,68}+p_{8,148}+p_{8,180}+p_{8,116}+p_{8,172}+p_{8,92}+p_{7,60}+p_{8,194} \\ &+p_{8,162}+p_{8,210}+p_{8,170}+p_{8,106}+p_{8,218}+2p_{8,58}+p_{8,166}+p_{8,182} \\ &+2p_{8,118}+p_{8,246}+p_{8,46}+p_{8,238}+p_{8,158}+p_{8,190}+p_{8,126}+p_{8,1} \\ &+p_{8,241}+p_{8,73}+p_{8,217}+p_{8,185}+p_{8,133}+p_{8,197}+p_{7,85}+p_{8,173} \\ &+2p_{7,29}+p_{8,61}+p_{7,125}+p_{8,19}+3p_{8,211}+p_{8,179}+p_{8,235}+p_{8,59} \\ &+p_{8,123}+p_{8,199}+p_{7,15}+p_{8,207}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,385} = \frac{1}{2}p_{8,129} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,129}^2 - 4(p_{8,208}+p_{8,48}+p_{7,8}+p_{8,168}+p_{8,104}+2p_{8,132} \\ &+p_{8,68}+p_{8,148}+p_{8,180}+p_{8,116}+p_{8,172}+p_{8,92}+p_{7,60}+p_{8,194} \\ &+p_{8,162}+p_{8,210}+p_{8,170}+p_{8,106}+p_{8,218}+2p_{8,58}+p_{8,166}+p_{8,182} \\ &+2p_{8,118}+p_{8,246}+p_{8,46}+p_{8,238}+p_{8,158}+p_{8,190}+p_{8,126}+p_{8,1} \\ &+p_{8,241}+p_{8,73}+p_{8,217}+p_{8,185}+p_{8,133}+p_{8,197}+p_{7,85}+p_{8,173} \\ &+2p_{7,29}+p_{8,61}+p_{7,125}+p_{8,19}+3p_{8,211}+p_{8,179}+p_{8,235}+p_{8,59} \\ &+p_{8,123}+p_{8,199}+p_{7,15}+p_{8,207}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,65} = \frac{1}{2}p_{8,65} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,65}^2 - 4(p_{8,144}+p_{8,240}+p_{7,72}+p_{8,40}+p_{8,104}+p_{8,4} \\ &+2p_{8,68}+p_{8,84}+p_{8,52}+p_{8,116}+p_{8,108}+p_{8,28}+p_{7,124}+p_{8,130} \\ &+p_{8,98}+p_{8,146}+p_{8,42}+p_{8,106}+p_{8,154}+2p_{8,250}+p_{8,102}+2p_{8,54} \\ &+p_{8,182}+p_{8,118}+p_{8,174}+p_{8,238}+p_{8,94}+p_{8,62}+p_{8,126}+p_{8,193} \\ &+p_{8,177}+p_{8,9}+p_{8,153}+p_{8,121}+p_{8,133}+p_{8,69}+p_{7,21}+p_{8,109} \\ &+2p_{7,93}+p_{7,61}+p_{8,253}+3p_{8,147}+p_{8,211}+p_{8,115}+p_{8,171}+p_{8,59} \\ &+p_{8,251}+p_{8,135}+p_{8,143}+p_{7,79}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,321} = \frac{1}{2}p_{8,65} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,65}^2 - 4(p_{8,144}+p_{8,240}+p_{7,72}+p_{8,40}+p_{8,104}+p_{8,4} \\ &+2p_{8,68}+p_{8,84}+p_{8,52}+p_{8,116}+p_{8,108}+p_{8,28}+p_{7,124}+p_{8,130} \\ &+p_{8,98}+p_{8,146}+p_{8,42}+p_{8,106}+p_{8,154}+2p_{8,250}+p_{8,102}+2p_{8,54} \\ &+p_{8,182}+p_{8,118}+p_{8,174}+p_{8,238}+p_{8,94}+p_{8,62}+p_{8,126}+p_{8,193} \\ &+p_{8,177}+p_{8,9}+p_{8,153}+p_{8,121}+p_{8,133}+p_{8,69}+p_{7,21}+p_{8,109} \\ &+2p_{7,93}+p_{7,61}+p_{8,253}+3p_{8,147}+p_{8,211}+p_{8,115}+p_{8,171}+p_{8,59} \\ &+p_{8,251}+p_{8,135}+p_{8,143}+p_{7,79}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,193} = \frac{1}{2}p_{8,193} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,193}^2 - 4(p_{8,16}+p_{8,112}+p_{7,72}+p_{8,168}+p_{8,232}+p_{8,132} \\ &+2p_{8,196}+p_{8,212}+p_{8,180}+p_{8,244}+p_{8,236}+p_{8,156}+p_{7,124}+p_{8,2} \\ &+p_{8,226}+p_{8,18}+p_{8,170}+p_{8,234}+p_{8,26}+2p_{8,122}+p_{8,230}+p_{8,54} \\ &+2p_{8,182}+p_{8,246}+p_{8,46}+p_{8,110}+p_{8,222}+p_{8,190}+p_{8,254}+p_{8,65} \\ &+p_{8,49}+p_{8,137}+p_{8,25}+p_{8,249}+p_{8,5}+p_{8,197}+p_{7,21}+p_{8,237} \\ &+2p_{7,93}+p_{7,61}+p_{8,125}+3p_{8,19}+p_{8,83}+p_{8,243}+p_{8,43}+p_{8,187} \\ &+p_{8,123}+p_{8,7}+p_{8,15}+p_{7,79}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,449} = \frac{1}{2}p_{8,193} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,193}^2 - 4(p_{8,16}+p_{8,112}+p_{7,72}+p_{8,168}+p_{8,232}+p_{8,132} \\ &+2p_{8,196}+p_{8,212}+p_{8,180}+p_{8,244}+p_{8,236}+p_{8,156}+p_{7,124}+p_{8,2} \\ &+p_{8,226}+p_{8,18}+p_{8,170}+p_{8,234}+p_{8,26}+2p_{8,122}+p_{8,230}+p_{8,54} \\ &+2p_{8,182}+p_{8,246}+p_{8,46}+p_{8,110}+p_{8,222}+p_{8,190}+p_{8,254}+p_{8,65} \\ &+p_{8,49}+p_{8,137}+p_{8,25}+p_{8,249}+p_{8,5}+p_{8,197}+p_{7,21}+p_{8,237} \\ &+2p_{7,93}+p_{7,61}+p_{8,125}+3p_{8,19}+p_{8,83}+p_{8,243}+p_{8,43}+p_{8,187} \\ &+p_{8,123}+p_{8,7}+p_{8,15}+p_{7,79}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,33} = \frac{1}{2}p_{8,33} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,33}^2 - 4(p_{8,208}+p_{8,112}+p_{8,8}+p_{8,72}+p_{7,40}+2p_{8,36} \\ &+p_{8,228}+p_{8,20}+p_{8,84}+p_{8,52}+p_{8,76}+p_{7,92}+p_{8,252}+p_{8,66} \\ &+p_{8,98}+p_{8,114}+p_{8,10}+p_{8,74}+2p_{8,218}+p_{8,122}+p_{8,70}+2p_{8,22} \\ &+p_{8,150}+p_{8,86}+p_{8,142}+p_{8,206}+p_{8,30}+p_{8,94}+p_{8,62}+p_{8,161} \\ &+p_{8,145}+p_{8,233}+p_{8,89}+p_{8,121}+p_{8,37}+p_{8,101}+p_{7,117}+p_{8,77} \\ &+p_{7,29}+p_{8,221}+2p_{7,61}+p_{8,83}+p_{8,179}+3p_{8,115}+p_{8,139}+p_{8,27} \\ &+p_{8,219}+p_{8,103}+p_{7,47}+p_{8,111}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,289} = \frac{1}{2}p_{8,33} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,33}^2 - 4(p_{8,208}+p_{8,112}+p_{8,8}+p_{8,72}+p_{7,40}+2p_{8,36} \\ &+p_{8,228}+p_{8,20}+p_{8,84}+p_{8,52}+p_{8,76}+p_{7,92}+p_{8,252}+p_{8,66} \\ &+p_{8,98}+p_{8,114}+p_{8,10}+p_{8,74}+2p_{8,218}+p_{8,122}+p_{8,70}+2p_{8,22} \\ &+p_{8,150}+p_{8,86}+p_{8,142}+p_{8,206}+p_{8,30}+p_{8,94}+p_{8,62}+p_{8,161} \\ &+p_{8,145}+p_{8,233}+p_{8,89}+p_{8,121}+p_{8,37}+p_{8,101}+p_{7,117}+p_{8,77} \\ &+p_{7,29}+p_{8,221}+2p_{7,61}+p_{8,83}+p_{8,179}+3p_{8,115}+p_{8,139}+p_{8,27} \\ &+p_{8,219}+p_{8,103}+p_{7,47}+p_{8,111}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,161} = \frac{1}{2}p_{8,161} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,161}^2 - 4(p_{8,80}+p_{8,240}+p_{8,136}+p_{8,200}+p_{7,40}+2p_{8,164} \\ &+p_{8,100}+p_{8,148}+p_{8,212}+p_{8,180}+p_{8,204}+p_{7,92}+p_{8,124}+p_{8,194} \\ &+p_{8,226}+p_{8,242}+p_{8,138}+p_{8,202}+2p_{8,90}+p_{8,250}+p_{8,198}+p_{8,22} \\ &+2p_{8,150}+p_{8,214}+p_{8,14}+p_{8,78}+p_{8,158}+p_{8,222}+p_{8,190}+p_{8,33} \\ &+p_{8,17}+p_{8,105}+p_{8,217}+p_{8,249}+p_{8,165}+p_{8,229}+p_{7,117}+p_{8,205} \\ &+p_{7,29}+p_{8,93}+2p_{7,61}+p_{8,211}+p_{8,51}+3p_{8,243}+p_{8,11}+p_{8,155} \\ &+p_{8,91}+p_{8,231}+p_{7,47}+p_{8,239}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,417} = \frac{1}{2}p_{8,161} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,161}^2 - 4(p_{8,80}+p_{8,240}+p_{8,136}+p_{8,200}+p_{7,40}+2p_{8,164} \\ &+p_{8,100}+p_{8,148}+p_{8,212}+p_{8,180}+p_{8,204}+p_{7,92}+p_{8,124}+p_{8,194} \\ &+p_{8,226}+p_{8,242}+p_{8,138}+p_{8,202}+2p_{8,90}+p_{8,250}+p_{8,198}+p_{8,22} \\ &+2p_{8,150}+p_{8,214}+p_{8,14}+p_{8,78}+p_{8,158}+p_{8,222}+p_{8,190}+p_{8,33} \\ &+p_{8,17}+p_{8,105}+p_{8,217}+p_{8,249}+p_{8,165}+p_{8,229}+p_{7,117}+p_{8,205} \\ &+p_{7,29}+p_{8,93}+2p_{7,61}+p_{8,211}+p_{8,51}+3p_{8,243}+p_{8,11}+p_{8,155} \\ &+p_{8,91}+p_{8,231}+p_{7,47}+p_{8,239}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,97} = \frac{1}{2}p_{8,97} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,97}^2 - 4(p_{8,16}+p_{8,176}+p_{8,136}+p_{8,72}+p_{7,104}+p_{8,36} \\ &+2p_{8,100}+p_{8,148}+p_{8,84}+p_{8,116}+p_{8,140}+p_{7,28}+p_{8,60}+p_{8,130} \\ &+p_{8,162}+p_{8,178}+p_{8,138}+p_{8,74}+2p_{8,26}+p_{8,186}+p_{8,134}+p_{8,150} \\ &+2p_{8,86}+p_{8,214}+p_{8,14}+p_{8,206}+p_{8,158}+p_{8,94}+p_{8,126}+p_{8,225} \\ &+p_{8,209}+p_{8,41}+p_{8,153}+p_{8,185}+p_{8,165}+p_{8,101}+p_{7,53}+p_{8,141} \\ &+p_{8,29}+p_{7,93}+2p_{7,125}+p_{8,147}+3p_{8,179}+p_{8,243}+p_{8,203}+p_{8,27} \\ &+p_{8,91}+p_{8,167}+p_{8,175}+p_{7,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,353} = \frac{1}{2}p_{8,97} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,97}^2 - 4(p_{8,16}+p_{8,176}+p_{8,136}+p_{8,72}+p_{7,104}+p_{8,36} \\ &+2p_{8,100}+p_{8,148}+p_{8,84}+p_{8,116}+p_{8,140}+p_{7,28}+p_{8,60}+p_{8,130} \\ &+p_{8,162}+p_{8,178}+p_{8,138}+p_{8,74}+2p_{8,26}+p_{8,186}+p_{8,134}+p_{8,150} \\ &+2p_{8,86}+p_{8,214}+p_{8,14}+p_{8,206}+p_{8,158}+p_{8,94}+p_{8,126}+p_{8,225} \\ &+p_{8,209}+p_{8,41}+p_{8,153}+p_{8,185}+p_{8,165}+p_{8,101}+p_{7,53}+p_{8,141} \\ &+p_{8,29}+p_{7,93}+2p_{7,125}+p_{8,147}+3p_{8,179}+p_{8,243}+p_{8,203}+p_{8,27} \\ &+p_{8,91}+p_{8,167}+p_{8,175}+p_{7,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,225} = \frac{1}{2}p_{8,225} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,225}^2 - 4(p_{8,144}+p_{8,48}+p_{8,8}+p_{8,200}+p_{7,104}+p_{8,164} \\ &+2p_{8,228}+p_{8,20}+p_{8,212}+p_{8,244}+p_{8,12}+p_{7,28}+p_{8,188}+p_{8,2} \\ &+p_{8,34}+p_{8,50}+p_{8,10}+p_{8,202}+2p_{8,154}+p_{8,58}+p_{8,6}+p_{8,22} \\ &+p_{8,86}+2p_{8,214}+p_{8,142}+p_{8,78}+p_{8,30}+p_{8,222}+p_{8,254}+p_{8,97} \\ &+p_{8,81}+p_{8,169}+p_{8,25}+p_{8,57}+p_{8,37}+p_{8,229}+p_{7,53}+p_{8,13} \\ &+p_{8,157}+p_{7,93}+2p_{7,125}+p_{8,19}+3p_{8,51}+p_{8,115}+p_{8,75}+p_{8,155} \\ &+p_{8,219}+p_{8,39}+p_{8,47}+p_{7,111}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,481} = \frac{1}{2}p_{8,225} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,225}^2 - 4(p_{8,144}+p_{8,48}+p_{8,8}+p_{8,200}+p_{7,104}+p_{8,164} \\ &+2p_{8,228}+p_{8,20}+p_{8,212}+p_{8,244}+p_{8,12}+p_{7,28}+p_{8,188}+p_{8,2} \\ &+p_{8,34}+p_{8,50}+p_{8,10}+p_{8,202}+2p_{8,154}+p_{8,58}+p_{8,6}+p_{8,22} \\ &+p_{8,86}+2p_{8,214}+p_{8,142}+p_{8,78}+p_{8,30}+p_{8,222}+p_{8,254}+p_{8,97} \\ &+p_{8,81}+p_{8,169}+p_{8,25}+p_{8,57}+p_{8,37}+p_{8,229}+p_{7,53}+p_{8,13} \\ &+p_{8,157}+p_{7,93}+2p_{7,125}+p_{8,19}+3p_{8,51}+p_{8,115}+p_{8,75}+p_{8,155} \\ &+p_{8,219}+p_{8,39}+p_{8,47}+p_{7,111}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,17} = \frac{1}{2}p_{8,17} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,17}^2 - 4(p_{8,192}+p_{8,96}+p_{7,24}+p_{8,56}+p_{8,248}+p_{8,4} \\ &+p_{8,68}+p_{8,36}+2p_{8,20}+p_{8,212}+p_{7,76}+p_{8,236}+p_{8,60}+p_{8,98} \\ &+p_{8,82}+p_{8,50}+2p_{8,202}+p_{8,106}+p_{8,58}+p_{8,250}+2p_{8,6}+p_{8,134} \\ &+p_{8,70}+p_{8,54}+p_{8,14}+p_{8,78}+p_{8,46}+p_{8,190}+p_{8,126}+p_{8,129} \\ &+p_{8,145}+p_{8,73}+p_{8,105}+p_{8,217}+p_{7,101}+p_{8,21}+p_{8,85}+p_{7,13} \\ &+p_{8,205}+2p_{7,45}+p_{8,61}+p_{8,67}+p_{8,163}+3p_{8,99}+p_{8,11}+p_{8,203} \\ &+p_{8,123}+p_{8,87}+p_{8,47}+p_{7,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,273} = \frac{1}{2}p_{8,17} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,17}^2 - 4(p_{8,192}+p_{8,96}+p_{7,24}+p_{8,56}+p_{8,248}+p_{8,4} \\ &+p_{8,68}+p_{8,36}+2p_{8,20}+p_{8,212}+p_{7,76}+p_{8,236}+p_{8,60}+p_{8,98} \\ &+p_{8,82}+p_{8,50}+2p_{8,202}+p_{8,106}+p_{8,58}+p_{8,250}+2p_{8,6}+p_{8,134} \\ &+p_{8,70}+p_{8,54}+p_{8,14}+p_{8,78}+p_{8,46}+p_{8,190}+p_{8,126}+p_{8,129} \\ &+p_{8,145}+p_{8,73}+p_{8,105}+p_{8,217}+p_{7,101}+p_{8,21}+p_{8,85}+p_{7,13} \\ &+p_{8,205}+2p_{7,45}+p_{8,61}+p_{8,67}+p_{8,163}+3p_{8,99}+p_{8,11}+p_{8,203} \\ &+p_{8,123}+p_{8,87}+p_{8,47}+p_{7,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,145} = \frac{1}{2}p_{8,145} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,145}^2 - 4(p_{8,64}+p_{8,224}+p_{7,24}+p_{8,184}+p_{8,120}+p_{8,132} \\ &+p_{8,196}+p_{8,164}+2p_{8,148}+p_{8,84}+p_{7,76}+p_{8,108}+p_{8,188}+p_{8,226} \\ &+p_{8,210}+p_{8,178}+2p_{8,74}+p_{8,234}+p_{8,186}+p_{8,122}+p_{8,6}+2p_{8,134} \\ &+p_{8,198}+p_{8,182}+p_{8,142}+p_{8,206}+p_{8,174}+p_{8,62}+p_{8,254}+p_{8,1} \\ &+p_{8,17}+p_{8,201}+p_{8,233}+p_{8,89}+p_{7,101}+p_{8,149}+p_{8,213}+p_{7,13} \\ &+p_{8,77}+2p_{7,45}+p_{8,189}+p_{8,195}+p_{8,35}+3p_{8,227}+p_{8,139}+p_{8,75} \\ &+p_{8,251}+p_{8,215}+p_{8,175}+p_{7,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,401} = \frac{1}{2}p_{8,145} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,145}^2 - 4(p_{8,64}+p_{8,224}+p_{7,24}+p_{8,184}+p_{8,120}+p_{8,132} \\ &+p_{8,196}+p_{8,164}+2p_{8,148}+p_{8,84}+p_{7,76}+p_{8,108}+p_{8,188}+p_{8,226} \\ &+p_{8,210}+p_{8,178}+2p_{8,74}+p_{8,234}+p_{8,186}+p_{8,122}+p_{8,6}+2p_{8,134} \\ &+p_{8,198}+p_{8,182}+p_{8,142}+p_{8,206}+p_{8,174}+p_{8,62}+p_{8,254}+p_{8,1} \\ &+p_{8,17}+p_{8,201}+p_{8,233}+p_{8,89}+p_{7,101}+p_{8,149}+p_{8,213}+p_{7,13} \\ &+p_{8,77}+2p_{7,45}+p_{8,189}+p_{8,195}+p_{8,35}+3p_{8,227}+p_{8,139}+p_{8,75} \\ &+p_{8,251}+p_{8,215}+p_{8,175}+p_{7,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,81} = \frac{1}{2}p_{8,81} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,81}^2 - 4(p_{8,0}+p_{8,160}+p_{7,88}+p_{8,56}+p_{8,120}+p_{8,132} \\ &+p_{8,68}+p_{8,100}+p_{8,20}+2p_{8,84}+p_{7,12}+p_{8,44}+p_{8,124}+p_{8,162} \\ &+p_{8,146}+p_{8,114}+2p_{8,10}+p_{8,170}+p_{8,58}+p_{8,122}+p_{8,134}+2p_{8,70} \\ &+p_{8,198}+p_{8,118}+p_{8,142}+p_{8,78}+p_{8,110}+p_{8,190}+p_{8,254}+p_{8,193} \\ &+p_{8,209}+p_{8,137}+p_{8,169}+p_{8,25}+p_{7,37}+p_{8,149}+p_{8,85}+p_{8,13} \\ &+p_{7,77}+2p_{7,109}+p_{8,125}+p_{8,131}+3p_{8,163}+p_{8,227}+p_{8,11}+p_{8,75} \\ &+p_{8,187}+p_{8,151}+p_{8,111}+p_{8,159}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,337} = \frac{1}{2}p_{8,81} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,81}^2 - 4(p_{8,0}+p_{8,160}+p_{7,88}+p_{8,56}+p_{8,120}+p_{8,132} \\ &+p_{8,68}+p_{8,100}+p_{8,20}+2p_{8,84}+p_{7,12}+p_{8,44}+p_{8,124}+p_{8,162} \\ &+p_{8,146}+p_{8,114}+2p_{8,10}+p_{8,170}+p_{8,58}+p_{8,122}+p_{8,134}+2p_{8,70} \\ &+p_{8,198}+p_{8,118}+p_{8,142}+p_{8,78}+p_{8,110}+p_{8,190}+p_{8,254}+p_{8,193} \\ &+p_{8,209}+p_{8,137}+p_{8,169}+p_{8,25}+p_{7,37}+p_{8,149}+p_{8,85}+p_{8,13} \\ &+p_{7,77}+2p_{7,109}+p_{8,125}+p_{8,131}+3p_{8,163}+p_{8,227}+p_{8,11}+p_{8,75} \\ &+p_{8,187}+p_{8,151}+p_{8,111}+p_{8,159}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,209} = \frac{1}{2}p_{8,209} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,209}^2 - 4(p_{8,128}+p_{8,32}+p_{7,88}+p_{8,184}+p_{8,248}+p_{8,4} \\ &+p_{8,196}+p_{8,228}+p_{8,148}+2p_{8,212}+p_{7,12}+p_{8,172}+p_{8,252} \\ &+p_{8,34}+p_{8,18}+p_{8,242}+2p_{8,138}+p_{8,42}+p_{8,186}+p_{8,250}+p_{8,6} \\ &+p_{8,70}+2p_{8,198}+p_{8,246}+p_{8,14}+p_{8,206}+p_{8,238}+p_{8,62}+p_{8,126} \\ &+p_{8,65}+p_{8,81}+p_{8,9}+p_{8,41}+p_{8,153}+p_{7,37}+p_{8,21}+p_{8,213} \\ &+p_{8,141}+p_{7,77}+2p_{7,109}+p_{8,253}+p_{8,3}+3p_{8,35}+p_{8,99}+p_{8,139} \\ &+p_{8,203}+p_{8,59}+p_{8,23}+p_{8,239}+p_{8,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,465} = \frac{1}{2}p_{8,209} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,209}^2 - 4(p_{8,128}+p_{8,32}+p_{7,88}+p_{8,184}+p_{8,248}+p_{8,4} \\ &+p_{8,196}+p_{8,228}+p_{8,148}+2p_{8,212}+p_{7,12}+p_{8,172}+p_{8,252} \\ &+p_{8,34}+p_{8,18}+p_{8,242}+2p_{8,138}+p_{8,42}+p_{8,186}+p_{8,250}+p_{8,6} \\ &+p_{8,70}+2p_{8,198}+p_{8,246}+p_{8,14}+p_{8,206}+p_{8,238}+p_{8,62}+p_{8,126} \\ &+p_{8,65}+p_{8,81}+p_{8,9}+p_{8,41}+p_{8,153}+p_{7,37}+p_{8,21}+p_{8,213} \\ &+p_{8,141}+p_{7,77}+2p_{7,109}+p_{8,253}+p_{8,3}+3p_{8,35}+p_{8,99}+p_{8,139} \\ &+p_{8,203}+p_{8,59}+p_{8,23}+p_{8,239}+p_{8,31}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,49} = \frac{1}{2}p_{8,49} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,49}^2 - 4(p_{8,128}+p_{8,224}+p_{8,24}+p_{8,88}+p_{7,56}+p_{8,68} \\ &+p_{8,36}+p_{8,100}+2p_{8,52}+p_{8,244}+p_{8,12}+p_{7,108}+p_{8,92}+p_{8,130} \\ &+p_{8,82}+p_{8,114}+p_{8,138}+2p_{8,234}+p_{8,26}+p_{8,90}+2p_{8,38}+p_{8,166} \\ &+p_{8,102}+p_{8,86}+p_{8,78}+p_{8,46}+p_{8,110}+p_{8,158}+p_{8,222}+p_{8,161} \\ &+p_{8,177}+p_{8,137}+p_{8,105}+p_{8,249}+p_{7,5}+p_{8,53}+p_{8,117}+2p_{7,77} \\ &+p_{7,45}+p_{8,237}+p_{8,93}+3p_{8,131}+p_{8,195}+p_{8,99}+p_{8,43}+p_{8,235} \\ &+p_{8,155}+p_{8,119}+p_{8,79}+p_{7,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,305} = \frac{1}{2}p_{8,49} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,49}^2 - 4(p_{8,128}+p_{8,224}+p_{8,24}+p_{8,88}+p_{7,56}+p_{8,68} \\ &+p_{8,36}+p_{8,100}+2p_{8,52}+p_{8,244}+p_{8,12}+p_{7,108}+p_{8,92}+p_{8,130} \\ &+p_{8,82}+p_{8,114}+p_{8,138}+2p_{8,234}+p_{8,26}+p_{8,90}+2p_{8,38}+p_{8,166} \\ &+p_{8,102}+p_{8,86}+p_{8,78}+p_{8,46}+p_{8,110}+p_{8,158}+p_{8,222}+p_{8,161} \\ &+p_{8,177}+p_{8,137}+p_{8,105}+p_{8,249}+p_{7,5}+p_{8,53}+p_{8,117}+2p_{7,77} \\ &+p_{7,45}+p_{8,237}+p_{8,93}+3p_{8,131}+p_{8,195}+p_{8,99}+p_{8,43}+p_{8,235} \\ &+p_{8,155}+p_{8,119}+p_{8,79}+p_{7,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,177} = \frac{1}{2}p_{8,177} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,177}^2 - 4(p_{8,0}+p_{8,96}+p_{8,152}+p_{8,216}+p_{7,56}+p_{8,196} \\ &+p_{8,164}+p_{8,228}+2p_{8,180}+p_{8,116}+p_{8,140}+p_{7,108}+p_{8,220}+p_{8,2} \\ &+p_{8,210}+p_{8,242}+p_{8,10}+2p_{8,106}+p_{8,154}+p_{8,218}+p_{8,38} \\ &+2p_{8,166}+p_{8,230}+p_{8,214}+p_{8,206}+p_{8,174}+p_{8,238}+p_{8,30}+p_{8,94} \\ &+p_{8,33}+p_{8,49}+p_{8,9}+p_{8,233}+p_{8,121}+p_{7,5}+p_{8,181}+p_{8,245} \\ &+2p_{7,77}+p_{7,45}+p_{8,109}+p_{8,221}+3p_{8,3}+p_{8,67}+p_{8,227}+p_{8,171} \\ &+p_{8,107}+p_{8,27}+p_{8,247}+p_{8,207}+p_{7,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,433} = \frac{1}{2}p_{8,177} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,177}^2 - 4(p_{8,0}+p_{8,96}+p_{8,152}+p_{8,216}+p_{7,56}+p_{8,196} \\ &+p_{8,164}+p_{8,228}+2p_{8,180}+p_{8,116}+p_{8,140}+p_{7,108}+p_{8,220}+p_{8,2} \\ &+p_{8,210}+p_{8,242}+p_{8,10}+2p_{8,106}+p_{8,154}+p_{8,218}+p_{8,38} \\ &+2p_{8,166}+p_{8,230}+p_{8,214}+p_{8,206}+p_{8,174}+p_{8,238}+p_{8,30}+p_{8,94} \\ &+p_{8,33}+p_{8,49}+p_{8,9}+p_{8,233}+p_{8,121}+p_{7,5}+p_{8,181}+p_{8,245} \\ &+2p_{7,77}+p_{7,45}+p_{8,109}+p_{8,221}+3p_{8,3}+p_{8,67}+p_{8,227}+p_{8,171} \\ &+p_{8,107}+p_{8,27}+p_{8,247}+p_{8,207}+p_{7,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,113} = \frac{1}{2}p_{8,113} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,113}^2 - 4(p_{8,192}+p_{8,32}+p_{8,152}+p_{8,88}+p_{7,120}+p_{8,132} \\ &+p_{8,164}+p_{8,100}+p_{8,52}+2p_{8,116}+p_{8,76}+p_{7,44}+p_{8,156}+p_{8,194} \\ &+p_{8,146}+p_{8,178}+p_{8,202}+2p_{8,42}+p_{8,154}+p_{8,90}+p_{8,166}+2p_{8,102} \\ &+p_{8,230}+p_{8,150}+p_{8,142}+p_{8,174}+p_{8,110}+p_{8,30}+p_{8,222}+p_{8,225} \\ &+p_{8,241}+p_{8,201}+p_{8,169}+p_{8,57}+p_{7,69}+p_{8,181}+p_{8,117}+2p_{7,13} \\ &+p_{8,45}+p_{7,109}+p_{8,157}+p_{8,3}+3p_{8,195}+p_{8,163}+p_{8,43}+p_{8,107} \\ &+p_{8,219}+p_{8,183}+p_{8,143}+p_{8,191}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,369} = \frac{1}{2}p_{8,113} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,113}^2 - 4(p_{8,192}+p_{8,32}+p_{8,152}+p_{8,88}+p_{7,120}+p_{8,132} \\ &+p_{8,164}+p_{8,100}+p_{8,52}+2p_{8,116}+p_{8,76}+p_{7,44}+p_{8,156}+p_{8,194} \\ &+p_{8,146}+p_{8,178}+p_{8,202}+2p_{8,42}+p_{8,154}+p_{8,90}+p_{8,166}+2p_{8,102} \\ &+p_{8,230}+p_{8,150}+p_{8,142}+p_{8,174}+p_{8,110}+p_{8,30}+p_{8,222}+p_{8,225} \\ &+p_{8,241}+p_{8,201}+p_{8,169}+p_{8,57}+p_{7,69}+p_{8,181}+p_{8,117}+2p_{7,13} \\ &+p_{8,45}+p_{7,109}+p_{8,157}+p_{8,3}+3p_{8,195}+p_{8,163}+p_{8,43}+p_{8,107} \\ &+p_{8,219}+p_{8,183}+p_{8,143}+p_{8,191}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,241} = \frac{1}{2}p_{8,241} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,241}^2 - 4(p_{8,64}+p_{8,160}+p_{8,24}+p_{8,216}+p_{7,120}+p_{8,4} \\ &+p_{8,36}+p_{8,228}+p_{8,180}+2p_{8,244}+p_{8,204}+p_{7,44}+p_{8,28}+p_{8,66} \\ &+p_{8,18}+p_{8,50}+p_{8,74}+2p_{8,170}+p_{8,26}+p_{8,218}+p_{8,38}+p_{8,102} \\ &+2p_{8,230}+p_{8,22}+p_{8,14}+p_{8,46}+p_{8,238}+p_{8,158}+p_{8,94}+p_{8,97} \\ &+p_{8,113}+p_{8,73}+p_{8,41}+p_{8,185}+p_{7,69}+p_{8,53}+p_{8,245}+2p_{7,13} \\ &+p_{8,173}+p_{7,109}+p_{8,29}+p_{8,131}+3p_{8,67}+p_{8,35}+p_{8,171}+p_{8,235} \\ &+p_{8,91}+p_{8,55}+p_{8,15}+p_{8,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,497} = \frac{1}{2}p_{8,241} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,241}^2 - 4(p_{8,64}+p_{8,160}+p_{8,24}+p_{8,216}+p_{7,120}+p_{8,4} \\ &+p_{8,36}+p_{8,228}+p_{8,180}+2p_{8,244}+p_{8,204}+p_{7,44}+p_{8,28}+p_{8,66} \\ &+p_{8,18}+p_{8,50}+p_{8,74}+2p_{8,170}+p_{8,26}+p_{8,218}+p_{8,38}+p_{8,102} \\ &+2p_{8,230}+p_{8,22}+p_{8,14}+p_{8,46}+p_{8,238}+p_{8,158}+p_{8,94}+p_{8,97} \\ &+p_{8,113}+p_{8,73}+p_{8,41}+p_{8,185}+p_{7,69}+p_{8,53}+p_{8,245}+2p_{7,13} \\ &+p_{8,173}+p_{7,109}+p_{8,29}+p_{8,131}+3p_{8,67}+p_{8,35}+p_{8,171}+p_{8,235} \\ &+p_{8,91}+p_{8,55}+p_{8,15}+p_{8,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,9} = \frac{1}{2}p_{8,9} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,9}^2 - 4(p_{7,16}+p_{8,48}+p_{8,240}+p_{8,88}+p_{8,184}+p_{7,68} \\ &+p_{8,228}+p_{8,52}+2p_{8,12}+p_{8,204}+p_{8,28}+p_{8,60}+p_{8,252} \\ &+2p_{8,194}+p_{8,98}+p_{8,50}+p_{8,242}+p_{8,74}+p_{8,42}+p_{8,90}+p_{8,6} \\ &+p_{8,70}+p_{8,38}+p_{8,182}+p_{8,118}+p_{8,46}+p_{8,62}+p_{8,126}+2p_{8,254} \\ &+p_{8,65}+p_{8,97}+p_{8,209}+p_{8,137}+p_{8,121}+p_{7,5}+p_{8,197}+2p_{7,37} \\ &+p_{8,53}+p_{8,13}+p_{8,77}+p_{7,93}+p_{8,3}+p_{8,195}+p_{8,115}+p_{8,155} \\ &+3p_{8,91}+p_{8,59}+p_{8,39}+p_{7,23}+p_{8,87}+p_{8,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,265} = \frac{1}{2}p_{8,9} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,9}^2 - 4(p_{7,16}+p_{8,48}+p_{8,240}+p_{8,88}+p_{8,184}+p_{7,68} \\ &+p_{8,228}+p_{8,52}+2p_{8,12}+p_{8,204}+p_{8,28}+p_{8,60}+p_{8,252} \\ &+2p_{8,194}+p_{8,98}+p_{8,50}+p_{8,242}+p_{8,74}+p_{8,42}+p_{8,90}+p_{8,6} \\ &+p_{8,70}+p_{8,38}+p_{8,182}+p_{8,118}+p_{8,46}+p_{8,62}+p_{8,126}+2p_{8,254} \\ &+p_{8,65}+p_{8,97}+p_{8,209}+p_{8,137}+p_{8,121}+p_{7,5}+p_{8,197}+2p_{7,37} \\ &+p_{8,53}+p_{8,13}+p_{8,77}+p_{7,93}+p_{8,3}+p_{8,195}+p_{8,115}+p_{8,155} \\ &+3p_{8,91}+p_{8,59}+p_{8,39}+p_{7,23}+p_{8,87}+p_{8,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,137} = \frac{1}{2}p_{8,137} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,137}^2 - 4(p_{7,16}+p_{8,176}+p_{8,112}+p_{8,216}+p_{8,56}+p_{7,68} \\ &+p_{8,100}+p_{8,180}+2p_{8,140}+p_{8,76}+p_{8,156}+p_{8,188}+p_{8,124}+2p_{8,66} \\ &+p_{8,226}+p_{8,178}+p_{8,114}+p_{8,202}+p_{8,170}+p_{8,218}+p_{8,134}+p_{8,198} \\ &+p_{8,166}+p_{8,54}+p_{8,246}+p_{8,174}+p_{8,190}+2p_{8,126}+p_{8,254}+p_{8,193} \\ &+p_{8,225}+p_{8,81}+p_{8,9}+p_{8,249}+p_{7,5}+p_{8,69}+2p_{7,37}+p_{8,181} \\ &+p_{8,141}+p_{8,205}+p_{7,93}+p_{8,131}+p_{8,67}+p_{8,243}+p_{8,27}+3p_{8,219} \\ &+p_{8,187}+p_{8,167}+p_{7,23}+p_{8,215}+p_{8,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,393} = \frac{1}{2}p_{8,137} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,137}^2 - 4(p_{7,16}+p_{8,176}+p_{8,112}+p_{8,216}+p_{8,56}+p_{7,68} \\ &+p_{8,100}+p_{8,180}+2p_{8,140}+p_{8,76}+p_{8,156}+p_{8,188}+p_{8,124}+2p_{8,66} \\ &+p_{8,226}+p_{8,178}+p_{8,114}+p_{8,202}+p_{8,170}+p_{8,218}+p_{8,134}+p_{8,198} \\ &+p_{8,166}+p_{8,54}+p_{8,246}+p_{8,174}+p_{8,190}+2p_{8,126}+p_{8,254}+p_{8,193} \\ &+p_{8,225}+p_{8,81}+p_{8,9}+p_{8,249}+p_{7,5}+p_{8,69}+2p_{7,37}+p_{8,181} \\ &+p_{8,141}+p_{8,205}+p_{7,93}+p_{8,131}+p_{8,67}+p_{8,243}+p_{8,27}+3p_{8,219} \\ &+p_{8,187}+p_{8,167}+p_{7,23}+p_{8,215}+p_{8,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,73} = \frac{1}{2}p_{8,73} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,73}^2 - 4(p_{7,80}+p_{8,48}+p_{8,112}+p_{8,152}+p_{8,248}+p_{7,4} \\ &+p_{8,36}+p_{8,116}+p_{8,12}+2p_{8,76}+p_{8,92}+p_{8,60}+p_{8,124}+2p_{8,2} \\ &+p_{8,162}+p_{8,50}+p_{8,114}+p_{8,138}+p_{8,106}+p_{8,154}+p_{8,134}+p_{8,70} \\ &+p_{8,102}+p_{8,182}+p_{8,246}+p_{8,110}+2p_{8,62}+p_{8,190}+p_{8,126} \\ &+p_{8,129}+p_{8,161}+p_{8,17}+p_{8,201}+p_{8,185}+p_{8,5}+p_{7,69}+2p_{7,101} \\ &+p_{8,117}+p_{8,141}+p_{8,77}+p_{7,29}+p_{8,3}+p_{8,67}+p_{8,179}+3p_{8,155} \\ &+p_{8,219}+p_{8,123}+p_{8,103}+p_{8,151}+p_{7,87}+p_{8,143}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,329} = \frac{1}{2}p_{8,73} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,73}^2 - 4(p_{7,80}+p_{8,48}+p_{8,112}+p_{8,152}+p_{8,248}+p_{7,4} \\ &+p_{8,36}+p_{8,116}+p_{8,12}+2p_{8,76}+p_{8,92}+p_{8,60}+p_{8,124}+2p_{8,2} \\ &+p_{8,162}+p_{8,50}+p_{8,114}+p_{8,138}+p_{8,106}+p_{8,154}+p_{8,134}+p_{8,70} \\ &+p_{8,102}+p_{8,182}+p_{8,246}+p_{8,110}+2p_{8,62}+p_{8,190}+p_{8,126} \\ &+p_{8,129}+p_{8,161}+p_{8,17}+p_{8,201}+p_{8,185}+p_{8,5}+p_{7,69}+2p_{7,101} \\ &+p_{8,117}+p_{8,141}+p_{8,77}+p_{7,29}+p_{8,3}+p_{8,67}+p_{8,179}+3p_{8,155} \\ &+p_{8,219}+p_{8,123}+p_{8,103}+p_{8,151}+p_{7,87}+p_{8,143}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,201} = \frac{1}{2}p_{8,201} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,201}^2 - 4(p_{7,80}+p_{8,176}+p_{8,240}+p_{8,24}+p_{8,120}+p_{7,4} \\ &+p_{8,164}+p_{8,244}+p_{8,140}+2p_{8,204}+p_{8,220}+p_{8,188}+p_{8,252} \\ &+2p_{8,130}+p_{8,34}+p_{8,178}+p_{8,242}+p_{8,10}+p_{8,234}+p_{8,26}+p_{8,6} \\ &+p_{8,198}+p_{8,230}+p_{8,54}+p_{8,118}+p_{8,238}+p_{8,62}+2p_{8,190}+p_{8,254} \\ &+p_{8,1}+p_{8,33}+p_{8,145}+p_{8,73}+p_{8,57}+p_{8,133}+p_{7,69}+2p_{7,101} \\ &+p_{8,245}+p_{8,13}+p_{8,205}+p_{7,29}+p_{8,131}+p_{8,195}+p_{8,51}+3p_{8,27} \\ &+p_{8,91}+p_{8,251}+p_{8,231}+p_{8,23}+p_{7,87}+p_{8,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,457} = \frac{1}{2}p_{8,201} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,201}^2 - 4(p_{7,80}+p_{8,176}+p_{8,240}+p_{8,24}+p_{8,120}+p_{7,4} \\ &+p_{8,164}+p_{8,244}+p_{8,140}+2p_{8,204}+p_{8,220}+p_{8,188}+p_{8,252} \\ &+2p_{8,130}+p_{8,34}+p_{8,178}+p_{8,242}+p_{8,10}+p_{8,234}+p_{8,26}+p_{8,6} \\ &+p_{8,198}+p_{8,230}+p_{8,54}+p_{8,118}+p_{8,238}+p_{8,62}+2p_{8,190}+p_{8,254} \\ &+p_{8,1}+p_{8,33}+p_{8,145}+p_{8,73}+p_{8,57}+p_{8,133}+p_{7,69}+2p_{7,101} \\ &+p_{8,245}+p_{8,13}+p_{8,205}+p_{7,29}+p_{8,131}+p_{8,195}+p_{8,51}+3p_{8,27} \\ &+p_{8,91}+p_{8,251}+p_{8,231}+p_{8,23}+p_{7,87}+p_{8,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,41} = \frac{1}{2}p_{8,41} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,41}^2 - 4(p_{8,16}+p_{8,80}+p_{7,48}+p_{8,216}+p_{8,120}+p_{8,4} \\ &+p_{7,100}+p_{8,84}+2p_{8,44}+p_{8,236}+p_{8,28}+p_{8,92}+p_{8,60}+p_{8,130} \\ &+2p_{8,226}+p_{8,18}+p_{8,82}+p_{8,74}+p_{8,106}+p_{8,122}+p_{8,70}+p_{8,38} \\ &+p_{8,102}+p_{8,150}+p_{8,214}+p_{8,78}+2p_{8,30}+p_{8,158}+p_{8,94}+p_{8,129} \\ &+p_{8,97}+p_{8,241}+p_{8,169}+p_{8,153}+2p_{7,69}+p_{7,37}+p_{8,229}+p_{8,85} \\ &+p_{8,45}+p_{8,109}+p_{7,125}+p_{8,35}+p_{8,227}+p_{8,147}+p_{8,91}+p_{8,187} \\ &+3p_{8,123}+p_{8,71}+p_{7,55}+p_{8,119}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,297} = \frac{1}{2}p_{8,41} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,41}^2 - 4(p_{8,16}+p_{8,80}+p_{7,48}+p_{8,216}+p_{8,120}+p_{8,4} \\ &+p_{7,100}+p_{8,84}+2p_{8,44}+p_{8,236}+p_{8,28}+p_{8,92}+p_{8,60}+p_{8,130} \\ &+2p_{8,226}+p_{8,18}+p_{8,82}+p_{8,74}+p_{8,106}+p_{8,122}+p_{8,70}+p_{8,38} \\ &+p_{8,102}+p_{8,150}+p_{8,214}+p_{8,78}+2p_{8,30}+p_{8,158}+p_{8,94}+p_{8,129} \\ &+p_{8,97}+p_{8,241}+p_{8,169}+p_{8,153}+2p_{7,69}+p_{7,37}+p_{8,229}+p_{8,85} \\ &+p_{8,45}+p_{8,109}+p_{7,125}+p_{8,35}+p_{8,227}+p_{8,147}+p_{8,91}+p_{8,187} \\ &+3p_{8,123}+p_{8,71}+p_{7,55}+p_{8,119}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,169} = \frac{1}{2}p_{8,169} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,169}^2 - 4(p_{8,144}+p_{8,208}+p_{7,48}+p_{8,88}+p_{8,248}+p_{8,132} \\ &+p_{7,100}+p_{8,212}+2p_{8,172}+p_{8,108}+p_{8,156}+p_{8,220}+p_{8,188}+p_{8,2} \\ &+2p_{8,98}+p_{8,146}+p_{8,210}+p_{8,202}+p_{8,234}+p_{8,250}+p_{8,198}+p_{8,166} \\ &+p_{8,230}+p_{8,22}+p_{8,86}+p_{8,206}+p_{8,30}+2p_{8,158}+p_{8,222}+p_{8,1} \\ &+p_{8,225}+p_{8,113}+p_{8,41}+p_{8,25}+2p_{7,69}+p_{7,37}+p_{8,101}+p_{8,213} \\ &+p_{8,173}+p_{8,237}+p_{7,125}+p_{8,163}+p_{8,99}+p_{8,19}+p_{8,219}+p_{8,59} \\ &+3p_{8,251}+p_{8,199}+p_{7,55}+p_{8,247}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,425} = \frac{1}{2}p_{8,169} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,169}^2 - 4(p_{8,144}+p_{8,208}+p_{7,48}+p_{8,88}+p_{8,248}+p_{8,132} \\ &+p_{7,100}+p_{8,212}+2p_{8,172}+p_{8,108}+p_{8,156}+p_{8,220}+p_{8,188}+p_{8,2} \\ &+2p_{8,98}+p_{8,146}+p_{8,210}+p_{8,202}+p_{8,234}+p_{8,250}+p_{8,198}+p_{8,166} \\ &+p_{8,230}+p_{8,22}+p_{8,86}+p_{8,206}+p_{8,30}+2p_{8,158}+p_{8,222}+p_{8,1} \\ &+p_{8,225}+p_{8,113}+p_{8,41}+p_{8,25}+2p_{7,69}+p_{7,37}+p_{8,101}+p_{8,213} \\ &+p_{8,173}+p_{8,237}+p_{7,125}+p_{8,163}+p_{8,99}+p_{8,19}+p_{8,219}+p_{8,59} \\ &+3p_{8,251}+p_{8,199}+p_{7,55}+p_{8,247}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,105} = \frac{1}{2}p_{8,105} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,105}^2 - 4(p_{8,144}+p_{8,80}+p_{7,112}+p_{8,24}+p_{8,184}+p_{8,68} \\ &+p_{7,36}+p_{8,148}+p_{8,44}+2p_{8,108}+p_{8,156}+p_{8,92}+p_{8,124}+p_{8,194} \\ &+2p_{8,34}+p_{8,146}+p_{8,82}+p_{8,138}+p_{8,170}+p_{8,186}+p_{8,134}+p_{8,166} \\ &+p_{8,102}+p_{8,22}+p_{8,214}+p_{8,142}+p_{8,158}+2p_{8,94}+p_{8,222}+p_{8,193} \\ &+p_{8,161}+p_{8,49}+p_{8,233}+p_{8,217}+2p_{7,5}+p_{8,37}+p_{7,101}+p_{8,149} \\ &+p_{8,173}+p_{8,109}+p_{7,61}+p_{8,35}+p_{8,99}+p_{8,211}+p_{8,155}+3p_{8,187} \\ &+p_{8,251}+p_{8,135}+p_{8,183}+p_{7,119}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,361} = \frac{1}{2}p_{8,105} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,105}^2 - 4(p_{8,144}+p_{8,80}+p_{7,112}+p_{8,24}+p_{8,184}+p_{8,68} \\ &+p_{7,36}+p_{8,148}+p_{8,44}+2p_{8,108}+p_{8,156}+p_{8,92}+p_{8,124}+p_{8,194} \\ &+2p_{8,34}+p_{8,146}+p_{8,82}+p_{8,138}+p_{8,170}+p_{8,186}+p_{8,134}+p_{8,166} \\ &+p_{8,102}+p_{8,22}+p_{8,214}+p_{8,142}+p_{8,158}+2p_{8,94}+p_{8,222}+p_{8,193} \\ &+p_{8,161}+p_{8,49}+p_{8,233}+p_{8,217}+2p_{7,5}+p_{8,37}+p_{7,101}+p_{8,149} \\ &+p_{8,173}+p_{8,109}+p_{7,61}+p_{8,35}+p_{8,99}+p_{8,211}+p_{8,155}+3p_{8,187} \\ &+p_{8,251}+p_{8,135}+p_{8,183}+p_{7,119}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,233} = \frac{1}{2}p_{8,233} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,233}^2 - 4(p_{8,16}+p_{8,208}+p_{7,112}+p_{8,152}+p_{8,56}+p_{8,196} \\ &+p_{7,36}+p_{8,20}+p_{8,172}+2p_{8,236}+p_{8,28}+p_{8,220}+p_{8,252}+p_{8,66} \\ &+2p_{8,162}+p_{8,18}+p_{8,210}+p_{8,10}+p_{8,42}+p_{8,58}+p_{8,6}+p_{8,38} \\ &+p_{8,230}+p_{8,150}+p_{8,86}+p_{8,14}+p_{8,30}+p_{8,94}+2p_{8,222}+p_{8,65} \\ &+p_{8,33}+p_{8,177}+p_{8,105}+p_{8,89}+2p_{7,5}+p_{8,165}+p_{7,101}+p_{8,21} \\ &+p_{8,45}+p_{8,237}+p_{7,61}+p_{8,163}+p_{8,227}+p_{8,83}+p_{8,27}+3p_{8,59} \\ &+p_{8,123}+p_{8,7}+p_{8,55}+p_{7,119}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,489} = \frac{1}{2}p_{8,233} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,233}^2 - 4(p_{8,16}+p_{8,208}+p_{7,112}+p_{8,152}+p_{8,56}+p_{8,196} \\ &+p_{7,36}+p_{8,20}+p_{8,172}+2p_{8,236}+p_{8,28}+p_{8,220}+p_{8,252}+p_{8,66} \\ &+2p_{8,162}+p_{8,18}+p_{8,210}+p_{8,10}+p_{8,42}+p_{8,58}+p_{8,6}+p_{8,38} \\ &+p_{8,230}+p_{8,150}+p_{8,86}+p_{8,14}+p_{8,30}+p_{8,94}+2p_{8,222}+p_{8,65} \\ &+p_{8,33}+p_{8,177}+p_{8,105}+p_{8,89}+2p_{7,5}+p_{8,165}+p_{7,101}+p_{8,21} \\ &+p_{8,45}+p_{8,237}+p_{7,61}+p_{8,163}+p_{8,227}+p_{8,83}+p_{8,27}+3p_{8,59} \\ &+p_{8,123}+p_{8,7}+p_{8,55}+p_{7,119}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,25} = \frac{1}{2}p_{8,25} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,25}^2 - 4(p_{8,0}+p_{8,64}+p_{7,32}+p_{8,200}+p_{8,104}+p_{8,68} \\ &+p_{7,84}+p_{8,244}+p_{8,12}+p_{8,76}+p_{8,44}+2p_{8,28}+p_{8,220}+p_{8,2} \\ &+p_{8,66}+2p_{8,210}+p_{8,114}+p_{8,106}+p_{8,90}+p_{8,58}+p_{8,134}+p_{8,198} \\ &+p_{8,22}+p_{8,86}+p_{8,54}+2p_{8,14}+p_{8,142}+p_{8,78}+p_{8,62}+p_{8,225} \\ &+p_{8,81}+p_{8,113}+p_{8,137}+p_{8,153}+p_{8,69}+p_{7,21}+p_{8,213}+2p_{7,53} \\ &+p_{7,109}+p_{8,29}+p_{8,93}+p_{8,131}+p_{8,19}+p_{8,211}+p_{8,75}+p_{8,171} \\ &+3p_{8,107}+p_{7,39}+p_{8,103}+p_{8,55}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,281} = \frac{1}{2}p_{8,25} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,25}^2 - 4(p_{8,0}+p_{8,64}+p_{7,32}+p_{8,200}+p_{8,104}+p_{8,68} \\ &+p_{7,84}+p_{8,244}+p_{8,12}+p_{8,76}+p_{8,44}+2p_{8,28}+p_{8,220}+p_{8,2} \\ &+p_{8,66}+2p_{8,210}+p_{8,114}+p_{8,106}+p_{8,90}+p_{8,58}+p_{8,134}+p_{8,198} \\ &+p_{8,22}+p_{8,86}+p_{8,54}+2p_{8,14}+p_{8,142}+p_{8,78}+p_{8,62}+p_{8,225} \\ &+p_{8,81}+p_{8,113}+p_{8,137}+p_{8,153}+p_{8,69}+p_{7,21}+p_{8,213}+2p_{7,53} \\ &+p_{7,109}+p_{8,29}+p_{8,93}+p_{8,131}+p_{8,19}+p_{8,211}+p_{8,75}+p_{8,171} \\ &+3p_{8,107}+p_{7,39}+p_{8,103}+p_{8,55}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,153} = \frac{1}{2}p_{8,153} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,153}^2 - 4(p_{8,128}+p_{8,192}+p_{7,32}+p_{8,72}+p_{8,232}+p_{8,196} \\ &+p_{7,84}+p_{8,116}+p_{8,140}+p_{8,204}+p_{8,172}+2p_{8,156}+p_{8,92}+p_{8,130} \\ &+p_{8,194}+2p_{8,82}+p_{8,242}+p_{8,234}+p_{8,218}+p_{8,186}+p_{8,6}+p_{8,70} \\ &+p_{8,150}+p_{8,214}+p_{8,182}+p_{8,14}+2p_{8,142}+p_{8,206}+p_{8,190}+p_{8,97} \\ &+p_{8,209}+p_{8,241}+p_{8,9}+p_{8,25}+p_{8,197}+p_{7,21}+p_{8,85}+2p_{7,53} \\ &+p_{7,109}+p_{8,157}+p_{8,221}+p_{8,3}+p_{8,147}+p_{8,83}+p_{8,203}+p_{8,43} \\ &+3p_{8,235}+p_{7,39}+p_{8,231}+p_{8,183}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,409} = \frac{1}{2}p_{8,153} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,153}^2 - 4(p_{8,128}+p_{8,192}+p_{7,32}+p_{8,72}+p_{8,232}+p_{8,196} \\ &+p_{7,84}+p_{8,116}+p_{8,140}+p_{8,204}+p_{8,172}+2p_{8,156}+p_{8,92}+p_{8,130} \\ &+p_{8,194}+2p_{8,82}+p_{8,242}+p_{8,234}+p_{8,218}+p_{8,186}+p_{8,6}+p_{8,70} \\ &+p_{8,150}+p_{8,214}+p_{8,182}+p_{8,14}+2p_{8,142}+p_{8,206}+p_{8,190}+p_{8,97} \\ &+p_{8,209}+p_{8,241}+p_{8,9}+p_{8,25}+p_{8,197}+p_{7,21}+p_{8,85}+2p_{7,53} \\ &+p_{7,109}+p_{8,157}+p_{8,221}+p_{8,3}+p_{8,147}+p_{8,83}+p_{8,203}+p_{8,43} \\ &+3p_{8,235}+p_{7,39}+p_{8,231}+p_{8,183}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,89} = \frac{1}{2}p_{8,89} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,89}^2 - 4(p_{8,128}+p_{8,64}+p_{7,96}+p_{8,8}+p_{8,168}+p_{8,132} \\ &+p_{7,20}+p_{8,52}+p_{8,140}+p_{8,76}+p_{8,108}+p_{8,28}+2p_{8,92}+p_{8,130} \\ &+p_{8,66}+2p_{8,18}+p_{8,178}+p_{8,170}+p_{8,154}+p_{8,122}+p_{8,6}+p_{8,198} \\ &+p_{8,150}+p_{8,86}+p_{8,118}+p_{8,142}+2p_{8,78}+p_{8,206}+p_{8,126}+p_{8,33} \\ &+p_{8,145}+p_{8,177}+p_{8,201}+p_{8,217}+p_{8,133}+p_{8,21}+p_{7,85}+2p_{7,117} \\ &+p_{7,45}+p_{8,157}+p_{8,93}+p_{8,195}+p_{8,19}+p_{8,83}+p_{8,139}+3p_{8,171} \\ &+p_{8,235}+p_{8,167}+p_{7,103}+p_{8,119}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,345} = \frac{1}{2}p_{8,89} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,89}^2 - 4(p_{8,128}+p_{8,64}+p_{7,96}+p_{8,8}+p_{8,168}+p_{8,132} \\ &+p_{7,20}+p_{8,52}+p_{8,140}+p_{8,76}+p_{8,108}+p_{8,28}+2p_{8,92}+p_{8,130} \\ &+p_{8,66}+2p_{8,18}+p_{8,178}+p_{8,170}+p_{8,154}+p_{8,122}+p_{8,6}+p_{8,198} \\ &+p_{8,150}+p_{8,86}+p_{8,118}+p_{8,142}+2p_{8,78}+p_{8,206}+p_{8,126}+p_{8,33} \\ &+p_{8,145}+p_{8,177}+p_{8,201}+p_{8,217}+p_{8,133}+p_{8,21}+p_{7,85}+2p_{7,117} \\ &+p_{7,45}+p_{8,157}+p_{8,93}+p_{8,195}+p_{8,19}+p_{8,83}+p_{8,139}+3p_{8,171} \\ &+p_{8,235}+p_{8,167}+p_{7,103}+p_{8,119}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,217} = \frac{1}{2}p_{8,217} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,217}^2 - 4(p_{8,0}+p_{8,192}+p_{7,96}+p_{8,136}+p_{8,40}+p_{8,4} \\ &+p_{7,20}+p_{8,180}+p_{8,12}+p_{8,204}+p_{8,236}+p_{8,156}+2p_{8,220}+p_{8,2} \\ &+p_{8,194}+2p_{8,146}+p_{8,50}+p_{8,42}+p_{8,26}+p_{8,250}+p_{8,134}+p_{8,70} \\ &+p_{8,22}+p_{8,214}+p_{8,246}+p_{8,14}+p_{8,78}+2p_{8,206}+p_{8,254}+p_{8,161} \\ &+p_{8,17}+p_{8,49}+p_{8,73}+p_{8,89}+p_{8,5}+p_{8,149}+p_{7,85}+2p_{7,117} \\ &+p_{7,45}+p_{8,29}+p_{8,221}+p_{8,67}+p_{8,147}+p_{8,211}+p_{8,11}+3p_{8,43} \\ &+p_{8,107}+p_{8,39}+p_{7,103}+p_{8,247}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,473} = \frac{1}{2}p_{8,217} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,217}^2 - 4(p_{8,0}+p_{8,192}+p_{7,96}+p_{8,136}+p_{8,40}+p_{8,4} \\ &+p_{7,20}+p_{8,180}+p_{8,12}+p_{8,204}+p_{8,236}+p_{8,156}+2p_{8,220}+p_{8,2} \\ &+p_{8,194}+2p_{8,146}+p_{8,50}+p_{8,42}+p_{8,26}+p_{8,250}+p_{8,134}+p_{8,70} \\ &+p_{8,22}+p_{8,214}+p_{8,246}+p_{8,14}+p_{8,78}+2p_{8,206}+p_{8,254}+p_{8,161} \\ &+p_{8,17}+p_{8,49}+p_{8,73}+p_{8,89}+p_{8,5}+p_{8,149}+p_{7,85}+2p_{7,117} \\ &+p_{7,45}+p_{8,29}+p_{8,221}+p_{8,67}+p_{8,147}+p_{8,211}+p_{8,11}+3p_{8,43} \\ &+p_{8,107}+p_{8,39}+p_{7,103}+p_{8,247}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,57} = \frac{1}{2}p_{8,57} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,57}^2 - 4(p_{7,64}+p_{8,32}+p_{8,96}+p_{8,136}+p_{8,232}+p_{8,100} \\ &+p_{8,20}+p_{7,116}+p_{8,76}+p_{8,44}+p_{8,108}+2p_{8,60}+p_{8,252}+p_{8,34} \\ &+p_{8,98}+p_{8,146}+2p_{8,242}+p_{8,138}+p_{8,90}+p_{8,122}+p_{8,166}+p_{8,230} \\ &+p_{8,86}+p_{8,54}+p_{8,118}+2p_{8,46}+p_{8,174}+p_{8,110}+p_{8,94}+p_{8,1} \\ &+p_{8,145}+p_{8,113}+p_{8,169}+p_{8,185}+p_{8,101}+2p_{7,85}+p_{7,53}+p_{8,245} \\ &+p_{7,13}+p_{8,61}+p_{8,125}+p_{8,163}+p_{8,51}+p_{8,243}+3p_{8,139}+p_{8,203} \\ &+p_{8,107}+p_{8,135}+p_{7,71}+p_{8,87}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,313} = \frac{1}{2}p_{8,57} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,57}^2 - 4(p_{7,64}+p_{8,32}+p_{8,96}+p_{8,136}+p_{8,232}+p_{8,100} \\ &+p_{8,20}+p_{7,116}+p_{8,76}+p_{8,44}+p_{8,108}+2p_{8,60}+p_{8,252}+p_{8,34} \\ &+p_{8,98}+p_{8,146}+2p_{8,242}+p_{8,138}+p_{8,90}+p_{8,122}+p_{8,166}+p_{8,230} \\ &+p_{8,86}+p_{8,54}+p_{8,118}+2p_{8,46}+p_{8,174}+p_{8,110}+p_{8,94}+p_{8,1} \\ &+p_{8,145}+p_{8,113}+p_{8,169}+p_{8,185}+p_{8,101}+2p_{7,85}+p_{7,53}+p_{8,245} \\ &+p_{7,13}+p_{8,61}+p_{8,125}+p_{8,163}+p_{8,51}+p_{8,243}+3p_{8,139}+p_{8,203} \\ &+p_{8,107}+p_{8,135}+p_{7,71}+p_{8,87}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,185} = \frac{1}{2}p_{8,185} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,185}^2 - 4(p_{7,64}+p_{8,160}+p_{8,224}+p_{8,8}+p_{8,104}+p_{8,228} \\ &+p_{8,148}+p_{7,116}+p_{8,204}+p_{8,172}+p_{8,236}+2p_{8,188}+p_{8,124} \\ &+p_{8,162}+p_{8,226}+p_{8,18}+2p_{8,114}+p_{8,10}+p_{8,218}+p_{8,250}+p_{8,38} \\ &+p_{8,102}+p_{8,214}+p_{8,182}+p_{8,246}+p_{8,46}+2p_{8,174}+p_{8,238}+p_{8,222} \\ &+p_{8,129}+p_{8,17}+p_{8,241}+p_{8,41}+p_{8,57}+p_{8,229}+2p_{7,85}+p_{7,53} \\ &+p_{8,117}+p_{7,13}+p_{8,189}+p_{8,253}+p_{8,35}+p_{8,179}+p_{8,115}+3p_{8,11} \\ &+p_{8,75}+p_{8,235}+p_{8,7}+p_{7,71}+p_{8,215}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,441} = \frac{1}{2}p_{8,185} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,185}^2 - 4(p_{7,64}+p_{8,160}+p_{8,224}+p_{8,8}+p_{8,104}+p_{8,228} \\ &+p_{8,148}+p_{7,116}+p_{8,204}+p_{8,172}+p_{8,236}+2p_{8,188}+p_{8,124} \\ &+p_{8,162}+p_{8,226}+p_{8,18}+2p_{8,114}+p_{8,10}+p_{8,218}+p_{8,250}+p_{8,38} \\ &+p_{8,102}+p_{8,214}+p_{8,182}+p_{8,246}+p_{8,46}+2p_{8,174}+p_{8,238}+p_{8,222} \\ &+p_{8,129}+p_{8,17}+p_{8,241}+p_{8,41}+p_{8,57}+p_{8,229}+2p_{7,85}+p_{7,53} \\ &+p_{8,117}+p_{7,13}+p_{8,189}+p_{8,253}+p_{8,35}+p_{8,179}+p_{8,115}+3p_{8,11} \\ &+p_{8,75}+p_{8,235}+p_{8,7}+p_{7,71}+p_{8,215}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,121} = \frac{1}{2}p_{8,121} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,121}^2 - 4(p_{7,0}+p_{8,160}+p_{8,96}+p_{8,200}+p_{8,40}+p_{8,164} \\ &+p_{8,84}+p_{7,52}+p_{8,140}+p_{8,172}+p_{8,108}+p_{8,60}+2p_{8,124}+p_{8,162} \\ &+p_{8,98}+p_{8,210}+2p_{8,50}+p_{8,202}+p_{8,154}+p_{8,186}+p_{8,38}+p_{8,230} \\ &+p_{8,150}+p_{8,182}+p_{8,118}+p_{8,174}+2p_{8,110}+p_{8,238}+p_{8,158}+p_{8,65} \\ &+p_{8,209}+p_{8,177}+p_{8,233}+p_{8,249}+p_{8,165}+2p_{7,21}+p_{8,53}+p_{7,117} \\ &+p_{7,77}+p_{8,189}+p_{8,125}+p_{8,227}+p_{8,51}+p_{8,115}+p_{8,11}+3p_{8,203} \\ &+p_{8,171}+p_{7,7}+p_{8,199}+p_{8,151}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,377} = \frac{1}{2}p_{8,121} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,121}^2 - 4(p_{7,0}+p_{8,160}+p_{8,96}+p_{8,200}+p_{8,40}+p_{8,164} \\ &+p_{8,84}+p_{7,52}+p_{8,140}+p_{8,172}+p_{8,108}+p_{8,60}+2p_{8,124}+p_{8,162} \\ &+p_{8,98}+p_{8,210}+2p_{8,50}+p_{8,202}+p_{8,154}+p_{8,186}+p_{8,38}+p_{8,230} \\ &+p_{8,150}+p_{8,182}+p_{8,118}+p_{8,174}+2p_{8,110}+p_{8,238}+p_{8,158}+p_{8,65} \\ &+p_{8,209}+p_{8,177}+p_{8,233}+p_{8,249}+p_{8,165}+2p_{7,21}+p_{8,53}+p_{7,117} \\ &+p_{7,77}+p_{8,189}+p_{8,125}+p_{8,227}+p_{8,51}+p_{8,115}+p_{8,11}+3p_{8,203} \\ &+p_{8,171}+p_{7,7}+p_{8,199}+p_{8,151}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,249} = \frac{1}{2}p_{8,249} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,249}^2 - 4(p_{7,0}+p_{8,32}+p_{8,224}+p_{8,72}+p_{8,168}+p_{8,36} \\ &+p_{8,212}+p_{7,52}+p_{8,12}+p_{8,44}+p_{8,236}+p_{8,188}+2p_{8,252}+p_{8,34} \\ &+p_{8,226}+p_{8,82}+2p_{8,178}+p_{8,74}+p_{8,26}+p_{8,58}+p_{8,166}+p_{8,102} \\ &+p_{8,22}+p_{8,54}+p_{8,246}+p_{8,46}+p_{8,110}+2p_{8,238}+p_{8,30}+p_{8,193} \\ &+p_{8,81}+p_{8,49}+p_{8,105}+p_{8,121}+p_{8,37}+2p_{7,21}+p_{8,181}+p_{7,117} \\ &+p_{7,77}+p_{8,61}+p_{8,253}+p_{8,99}+p_{8,179}+p_{8,243}+p_{8,139}+3p_{8,75} \\ &+p_{8,43}+p_{7,7}+p_{8,71}+p_{8,23}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,505} = \frac{1}{2}p_{8,249} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,249}^2 - 4(p_{7,0}+p_{8,32}+p_{8,224}+p_{8,72}+p_{8,168}+p_{8,36} \\ &+p_{8,212}+p_{7,52}+p_{8,12}+p_{8,44}+p_{8,236}+p_{8,188}+2p_{8,252}+p_{8,34} \\ &+p_{8,226}+p_{8,82}+2p_{8,178}+p_{8,74}+p_{8,26}+p_{8,58}+p_{8,166}+p_{8,102} \\ &+p_{8,22}+p_{8,54}+p_{8,246}+p_{8,46}+p_{8,110}+2p_{8,238}+p_{8,30}+p_{8,193} \\ &+p_{8,81}+p_{8,49}+p_{8,105}+p_{8,121}+p_{8,37}+2p_{7,21}+p_{8,181}+p_{7,117} \\ &+p_{7,77}+p_{8,61}+p_{8,253}+p_{8,99}+p_{8,179}+p_{8,243}+p_{8,139}+3p_{8,75} \\ &+p_{8,43}+p_{7,7}+p_{8,71}+p_{8,23}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,5} = \frac{1}{2}p_{8,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,5}^2 - 4(p_{7,64}+p_{8,224}+p_{8,48}+2p_{8,8}+p_{8,200}+p_{8,24} \\ &+p_{8,56}+p_{8,248}+p_{8,84}+p_{8,180}+p_{7,12}+p_{8,44}+p_{8,236}+p_{8,2} \\ &+p_{8,66}+p_{8,34}+p_{8,178}+p_{8,114}+p_{8,42}+p_{8,58}+p_{8,122}+2p_{8,250} \\ &+p_{8,70}+p_{8,38}+p_{8,86}+p_{8,46}+p_{8,238}+p_{8,94}+2p_{8,190}+p_{7,1} \\ &+p_{8,193}+2p_{7,33}+p_{8,49}+p_{8,9}+p_{8,73}+p_{7,89}+p_{8,133}+p_{8,117} \\ &+p_{8,205}+p_{8,93}+p_{8,61}+p_{8,35}+p_{7,19}+p_{8,83}+p_{8,75}+p_{8,151} \\ &+3p_{8,87}+p_{8,55}+p_{8,111}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,261} = \frac{1}{2}p_{8,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,5}^2 - 4(p_{7,64}+p_{8,224}+p_{8,48}+2p_{8,8}+p_{8,200}+p_{8,24} \\ &+p_{8,56}+p_{8,248}+p_{8,84}+p_{8,180}+p_{7,12}+p_{8,44}+p_{8,236}+p_{8,2} \\ &+p_{8,66}+p_{8,34}+p_{8,178}+p_{8,114}+p_{8,42}+p_{8,58}+p_{8,122}+2p_{8,250} \\ &+p_{8,70}+p_{8,38}+p_{8,86}+p_{8,46}+p_{8,238}+p_{8,94}+2p_{8,190}+p_{7,1} \\ &+p_{8,193}+2p_{7,33}+p_{8,49}+p_{8,9}+p_{8,73}+p_{7,89}+p_{8,133}+p_{8,117} \\ &+p_{8,205}+p_{8,93}+p_{8,61}+p_{8,35}+p_{7,19}+p_{8,83}+p_{8,75}+p_{8,151} \\ &+3p_{8,87}+p_{8,55}+p_{8,111}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,133} = \frac{1}{2}p_{8,133} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,133}^2 - 4(p_{7,64}+p_{8,96}+p_{8,176}+2p_{8,136}+p_{8,72}+p_{8,152} \\ &+p_{8,184}+p_{8,120}+p_{8,212}+p_{8,52}+p_{7,12}+p_{8,172}+p_{8,108}+p_{8,130} \\ &+p_{8,194}+p_{8,162}+p_{8,50}+p_{8,242}+p_{8,170}+p_{8,186}+2p_{8,122}+p_{8,250} \\ &+p_{8,198}+p_{8,166}+p_{8,214}+p_{8,174}+p_{8,110}+p_{8,222}+2p_{8,62}+p_{7,1} \\ &+p_{8,65}+2p_{7,33}+p_{8,177}+p_{8,137}+p_{8,201}+p_{7,89}+p_{8,5}+p_{8,245} \\ &+p_{8,77}+p_{8,221}+p_{8,189}+p_{8,163}+p_{7,19}+p_{8,211}+p_{8,203}+p_{8,23} \\ &+3p_{8,215}+p_{8,183}+p_{8,239}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,389} = \frac{1}{2}p_{8,133} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,133}^2 - 4(p_{7,64}+p_{8,96}+p_{8,176}+2p_{8,136}+p_{8,72}+p_{8,152} \\ &+p_{8,184}+p_{8,120}+p_{8,212}+p_{8,52}+p_{7,12}+p_{8,172}+p_{8,108}+p_{8,130} \\ &+p_{8,194}+p_{8,162}+p_{8,50}+p_{8,242}+p_{8,170}+p_{8,186}+2p_{8,122}+p_{8,250} \\ &+p_{8,198}+p_{8,166}+p_{8,214}+p_{8,174}+p_{8,110}+p_{8,222}+2p_{8,62}+p_{7,1} \\ &+p_{8,65}+2p_{7,33}+p_{8,177}+p_{8,137}+p_{8,201}+p_{7,89}+p_{8,5}+p_{8,245} \\ &+p_{8,77}+p_{8,221}+p_{8,189}+p_{8,163}+p_{7,19}+p_{8,211}+p_{8,203}+p_{8,23} \\ &+3p_{8,215}+p_{8,183}+p_{8,239}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,69} = \frac{1}{2}p_{8,69} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,69}^2 - 4(p_{7,0}+p_{8,32}+p_{8,112}+p_{8,8}+2p_{8,72}+p_{8,88}+p_{8,56} \\ &+p_{8,120}+p_{8,148}+p_{8,244}+p_{7,76}+p_{8,44}+p_{8,108}+p_{8,130}+p_{8,66} \\ &+p_{8,98}+p_{8,178}+p_{8,242}+p_{8,106}+2p_{8,58}+p_{8,186}+p_{8,122}+p_{8,134} \\ &+p_{8,102}+p_{8,150}+p_{8,46}+p_{8,110}+p_{8,158}+2p_{8,254}+p_{8,1}+p_{7,65} \\ &+2p_{7,97}+p_{8,113}+p_{8,137}+p_{8,73}+p_{7,25}+p_{8,197}+p_{8,181}+p_{8,13} \\ &+p_{8,157}+p_{8,125}+p_{8,99}+p_{8,147}+p_{7,83}+p_{8,139}+3p_{8,151}+p_{8,215} \\ &+p_{8,119}+p_{8,175}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,325} = \frac{1}{2}p_{8,69} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,69}^2 - 4(p_{7,0}+p_{8,32}+p_{8,112}+p_{8,8}+2p_{8,72}+p_{8,88}+p_{8,56} \\ &+p_{8,120}+p_{8,148}+p_{8,244}+p_{7,76}+p_{8,44}+p_{8,108}+p_{8,130}+p_{8,66} \\ &+p_{8,98}+p_{8,178}+p_{8,242}+p_{8,106}+2p_{8,58}+p_{8,186}+p_{8,122}+p_{8,134} \\ &+p_{8,102}+p_{8,150}+p_{8,46}+p_{8,110}+p_{8,158}+2p_{8,254}+p_{8,1}+p_{7,65} \\ &+2p_{7,97}+p_{8,113}+p_{8,137}+p_{8,73}+p_{7,25}+p_{8,197}+p_{8,181}+p_{8,13} \\ &+p_{8,157}+p_{8,125}+p_{8,99}+p_{8,147}+p_{7,83}+p_{8,139}+3p_{8,151}+p_{8,215} \\ &+p_{8,119}+p_{8,175}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,197} = \frac{1}{2}p_{8,197} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,197}^2 - 4(p_{7,0}+p_{8,160}+p_{8,240}+p_{8,136}+2p_{8,200}+p_{8,216} \\ &+p_{8,184}+p_{8,248}+p_{8,20}+p_{8,116}+p_{7,76}+p_{8,172}+p_{8,236}+p_{8,2} \\ &+p_{8,194}+p_{8,226}+p_{8,50}+p_{8,114}+p_{8,234}+p_{8,58}+2p_{8,186}+p_{8,250} \\ &+p_{8,6}+p_{8,230}+p_{8,22}+p_{8,174}+p_{8,238}+p_{8,30}+2p_{8,126}+p_{8,129} \\ &+p_{7,65}+2p_{7,97}+p_{8,241}+p_{8,9}+p_{8,201}+p_{7,25}+p_{8,69}+p_{8,53} \\ &+p_{8,141}+p_{8,29}+p_{8,253}+p_{8,227}+p_{8,19}+p_{7,83}+p_{8,11}+3p_{8,23} \\ &+p_{8,87}+p_{8,247}+p_{8,47}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,453} = \frac{1}{2}p_{8,197} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,197}^2 - 4(p_{7,0}+p_{8,160}+p_{8,240}+p_{8,136}+2p_{8,200}+p_{8,216} \\ &+p_{8,184}+p_{8,248}+p_{8,20}+p_{8,116}+p_{7,76}+p_{8,172}+p_{8,236}+p_{8,2} \\ &+p_{8,194}+p_{8,226}+p_{8,50}+p_{8,114}+p_{8,234}+p_{8,58}+2p_{8,186}+p_{8,250} \\ &+p_{8,6}+p_{8,230}+p_{8,22}+p_{8,174}+p_{8,238}+p_{8,30}+2p_{8,126}+p_{8,129} \\ &+p_{7,65}+2p_{7,97}+p_{8,241}+p_{8,9}+p_{8,201}+p_{7,25}+p_{8,69}+p_{8,53} \\ &+p_{8,141}+p_{8,29}+p_{8,253}+p_{8,227}+p_{8,19}+p_{7,83}+p_{8,11}+3p_{8,23} \\ &+p_{8,87}+p_{8,247}+p_{8,47}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,37} = \frac{1}{2}p_{8,37} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,37}^2 - 4(p_{8,0}+p_{7,96}+p_{8,80}+2p_{8,40}+p_{8,232}+p_{8,24} \\ &+p_{8,88}+p_{8,56}+p_{8,212}+p_{8,116}+p_{8,12}+p_{8,76}+p_{7,44}+p_{8,66} \\ &+p_{8,34}+p_{8,98}+p_{8,146}+p_{8,210}+p_{8,74}+2p_{8,26}+p_{8,154}+p_{8,90} \\ &+p_{8,70}+p_{8,102}+p_{8,118}+p_{8,14}+p_{8,78}+2p_{8,222}+p_{8,126}+2p_{7,65} \\ &+p_{7,33}+p_{8,225}+p_{8,81}+p_{8,41}+p_{8,105}+p_{7,121}+p_{8,165}+p_{8,149} \\ &+p_{8,237}+p_{8,93}+p_{8,125}+p_{8,67}+p_{7,51}+p_{8,115}+p_{8,107}+p_{8,87} \\ &+p_{8,183}+3p_{8,119}+p_{8,143}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,293} = \frac{1}{2}p_{8,37} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,37}^2 - 4(p_{8,0}+p_{7,96}+p_{8,80}+2p_{8,40}+p_{8,232}+p_{8,24} \\ &+p_{8,88}+p_{8,56}+p_{8,212}+p_{8,116}+p_{8,12}+p_{8,76}+p_{7,44}+p_{8,66} \\ &+p_{8,34}+p_{8,98}+p_{8,146}+p_{8,210}+p_{8,74}+2p_{8,26}+p_{8,154}+p_{8,90} \\ &+p_{8,70}+p_{8,102}+p_{8,118}+p_{8,14}+p_{8,78}+2p_{8,222}+p_{8,126}+2p_{7,65} \\ &+p_{7,33}+p_{8,225}+p_{8,81}+p_{8,41}+p_{8,105}+p_{7,121}+p_{8,165}+p_{8,149} \\ &+p_{8,237}+p_{8,93}+p_{8,125}+p_{8,67}+p_{7,51}+p_{8,115}+p_{8,107}+p_{8,87} \\ &+p_{8,183}+3p_{8,119}+p_{8,143}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,165} = \frac{1}{2}p_{8,165} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,165}^2 - 4(p_{8,128}+p_{7,96}+p_{8,208}+2p_{8,168}+p_{8,104}+p_{8,152} \\ &+p_{8,216}+p_{8,184}+p_{8,84}+p_{8,244}+p_{8,140}+p_{8,204}+p_{7,44}+p_{8,194} \\ &+p_{8,162}+p_{8,226}+p_{8,18}+p_{8,82}+p_{8,202}+p_{8,26}+2p_{8,154}+p_{8,218} \\ &+p_{8,198}+p_{8,230}+p_{8,246}+p_{8,142}+p_{8,206}+2p_{8,94}+p_{8,254}+2p_{7,65} \\ &+p_{7,33}+p_{8,97}+p_{8,209}+p_{8,169}+p_{8,233}+p_{7,121}+p_{8,37}+p_{8,21} \\ &+p_{8,109}+p_{8,221}+p_{8,253}+p_{8,195}+p_{7,51}+p_{8,243}+p_{8,235}+p_{8,215} \\ &+p_{8,55}+3p_{8,247}+p_{8,15}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,421} = \frac{1}{2}p_{8,165} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,165}^2 - 4(p_{8,128}+p_{7,96}+p_{8,208}+2p_{8,168}+p_{8,104}+p_{8,152} \\ &+p_{8,216}+p_{8,184}+p_{8,84}+p_{8,244}+p_{8,140}+p_{8,204}+p_{7,44}+p_{8,194} \\ &+p_{8,162}+p_{8,226}+p_{8,18}+p_{8,82}+p_{8,202}+p_{8,26}+2p_{8,154}+p_{8,218} \\ &+p_{8,198}+p_{8,230}+p_{8,246}+p_{8,142}+p_{8,206}+2p_{8,94}+p_{8,254}+2p_{7,65} \\ &+p_{7,33}+p_{8,97}+p_{8,209}+p_{8,169}+p_{8,233}+p_{7,121}+p_{8,37}+p_{8,21} \\ &+p_{8,109}+p_{8,221}+p_{8,253}+p_{8,195}+p_{7,51}+p_{8,243}+p_{8,235}+p_{8,215} \\ &+p_{8,55}+3p_{8,247}+p_{8,15}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,101} = \frac{1}{2}p_{8,101} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,101}^2 - 4(p_{8,64}+p_{7,32}+p_{8,144}+p_{8,40}+2p_{8,104}+p_{8,152} \\ &+p_{8,88}+p_{8,120}+p_{8,20}+p_{8,180}+p_{8,140}+p_{8,76}+p_{7,108}+p_{8,130} \\ &+p_{8,162}+p_{8,98}+p_{8,18}+p_{8,210}+p_{8,138}+p_{8,154}+2p_{8,90}+p_{8,218} \\ &+p_{8,134}+p_{8,166}+p_{8,182}+p_{8,142}+p_{8,78}+2p_{8,30}+p_{8,190}+2p_{7,1} \\ &+p_{8,33}+p_{7,97}+p_{8,145}+p_{8,169}+p_{8,105}+p_{7,57}+p_{8,229}+p_{8,213} \\ &+p_{8,45}+p_{8,157}+p_{8,189}+p_{8,131}+p_{8,179}+p_{7,115}+p_{8,171}+p_{8,151} \\ &+3p_{8,183}+p_{8,247}+p_{8,207}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,357} = \frac{1}{2}p_{8,101} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,101}^2 - 4(p_{8,64}+p_{7,32}+p_{8,144}+p_{8,40}+2p_{8,104}+p_{8,152} \\ &+p_{8,88}+p_{8,120}+p_{8,20}+p_{8,180}+p_{8,140}+p_{8,76}+p_{7,108}+p_{8,130} \\ &+p_{8,162}+p_{8,98}+p_{8,18}+p_{8,210}+p_{8,138}+p_{8,154}+2p_{8,90}+p_{8,218} \\ &+p_{8,134}+p_{8,166}+p_{8,182}+p_{8,142}+p_{8,78}+2p_{8,30}+p_{8,190}+2p_{7,1} \\ &+p_{8,33}+p_{7,97}+p_{8,145}+p_{8,169}+p_{8,105}+p_{7,57}+p_{8,229}+p_{8,213} \\ &+p_{8,45}+p_{8,157}+p_{8,189}+p_{8,131}+p_{8,179}+p_{7,115}+p_{8,171}+p_{8,151} \\ &+3p_{8,183}+p_{8,247}+p_{8,207}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,229} = \frac{1}{2}p_{8,229} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,229}^2 - 4(p_{8,192}+p_{7,32}+p_{8,16}+p_{8,168}+2p_{8,232}+p_{8,24} \\ &+p_{8,216}+p_{8,248}+p_{8,148}+p_{8,52}+p_{8,12}+p_{8,204}+p_{7,108}+p_{8,2} \\ &+p_{8,34}+p_{8,226}+p_{8,146}+p_{8,82}+p_{8,10}+p_{8,26}+p_{8,90}+2p_{8,218} \\ &+p_{8,6}+p_{8,38}+p_{8,54}+p_{8,14}+p_{8,206}+2p_{8,158}+p_{8,62}+2p_{7,1} \\ &+p_{8,161}+p_{7,97}+p_{8,17}+p_{8,41}+p_{8,233}+p_{7,57}+p_{8,101}+p_{8,85} \\ &+p_{8,173}+p_{8,29}+p_{8,61}+p_{8,3}+p_{8,51}+p_{7,115}+p_{8,43}+p_{8,23} \\ &+3p_{8,55}+p_{8,119}+p_{8,79}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,485} = \frac{1}{2}p_{8,229} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,229}^2 - 4(p_{8,192}+p_{7,32}+p_{8,16}+p_{8,168}+2p_{8,232}+p_{8,24} \\ &+p_{8,216}+p_{8,248}+p_{8,148}+p_{8,52}+p_{8,12}+p_{8,204}+p_{7,108}+p_{8,2} \\ &+p_{8,34}+p_{8,226}+p_{8,146}+p_{8,82}+p_{8,10}+p_{8,26}+p_{8,90}+2p_{8,218} \\ &+p_{8,6}+p_{8,38}+p_{8,54}+p_{8,14}+p_{8,206}+2p_{8,158}+p_{8,62}+2p_{7,1} \\ &+p_{8,161}+p_{7,97}+p_{8,17}+p_{8,41}+p_{8,233}+p_{7,57}+p_{8,101}+p_{8,85} \\ &+p_{8,173}+p_{8,29}+p_{8,61}+p_{8,3}+p_{8,51}+p_{7,115}+p_{8,43}+p_{8,23} \\ &+3p_{8,55}+p_{8,119}+p_{8,79}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,21} = \frac{1}{2}p_{8,21} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,21}^2 - 4(p_{8,64}+p_{7,80}+p_{8,240}+p_{8,8}+p_{8,72}+p_{8,40} \\ &+2p_{8,24}+p_{8,216}+p_{8,196}+p_{8,100}+p_{7,28}+p_{8,60}+p_{8,252}+p_{8,130} \\ &+p_{8,194}+p_{8,18}+p_{8,82}+p_{8,50}+2p_{8,10}+p_{8,138}+p_{8,74}+p_{8,58} \\ &+p_{8,102}+p_{8,86}+p_{8,54}+2p_{8,206}+p_{8,110}+p_{8,62}+p_{8,254}+p_{8,65} \\ &+p_{7,17}+p_{8,209}+2p_{7,49}+p_{7,105}+p_{8,25}+p_{8,89}+p_{8,133}+p_{8,149} \\ &+p_{8,77}+p_{8,109}+p_{8,221}+p_{7,35}+p_{8,99}+p_{8,51}+p_{8,91}+p_{8,71} \\ &+p_{8,167}+3p_{8,103}+p_{8,15}+p_{8,207}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,277} = \frac{1}{2}p_{8,21} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,21}^2 - 4(p_{8,64}+p_{7,80}+p_{8,240}+p_{8,8}+p_{8,72}+p_{8,40} \\ &+2p_{8,24}+p_{8,216}+p_{8,196}+p_{8,100}+p_{7,28}+p_{8,60}+p_{8,252}+p_{8,130} \\ &+p_{8,194}+p_{8,18}+p_{8,82}+p_{8,50}+2p_{8,10}+p_{8,138}+p_{8,74}+p_{8,58} \\ &+p_{8,102}+p_{8,86}+p_{8,54}+2p_{8,206}+p_{8,110}+p_{8,62}+p_{8,254}+p_{8,65} \\ &+p_{7,17}+p_{8,209}+2p_{7,49}+p_{7,105}+p_{8,25}+p_{8,89}+p_{8,133}+p_{8,149} \\ &+p_{8,77}+p_{8,109}+p_{8,221}+p_{7,35}+p_{8,99}+p_{8,51}+p_{8,91}+p_{8,71} \\ &+p_{8,167}+3p_{8,103}+p_{8,15}+p_{8,207}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,149} = \frac{1}{2}p_{8,149} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,149}^2 - 4(p_{8,192}+p_{7,80}+p_{8,112}+p_{8,136}+p_{8,200}+p_{8,168} \\ &+2p_{8,152}+p_{8,88}+p_{8,68}+p_{8,228}+p_{7,28}+p_{8,188}+p_{8,124}+p_{8,2} \\ &+p_{8,66}+p_{8,146}+p_{8,210}+p_{8,178}+p_{8,10}+2p_{8,138}+p_{8,202}+p_{8,186} \\ &+p_{8,230}+p_{8,214}+p_{8,182}+2p_{8,78}+p_{8,238}+p_{8,190}+p_{8,126}+p_{8,193} \\ &+p_{7,17}+p_{8,81}+2p_{7,49}+p_{7,105}+p_{8,153}+p_{8,217}+p_{8,5}+p_{8,21} \\ &+p_{8,205}+p_{8,237}+p_{8,93}+p_{7,35}+p_{8,227}+p_{8,179}+p_{8,219}+p_{8,199} \\ &+p_{8,39}+3p_{8,231}+p_{8,143}+p_{8,79}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,405} = \frac{1}{2}p_{8,149} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,149}^2 - 4(p_{8,192}+p_{7,80}+p_{8,112}+p_{8,136}+p_{8,200}+p_{8,168} \\ &+2p_{8,152}+p_{8,88}+p_{8,68}+p_{8,228}+p_{7,28}+p_{8,188}+p_{8,124}+p_{8,2} \\ &+p_{8,66}+p_{8,146}+p_{8,210}+p_{8,178}+p_{8,10}+2p_{8,138}+p_{8,202}+p_{8,186} \\ &+p_{8,230}+p_{8,214}+p_{8,182}+2p_{8,78}+p_{8,238}+p_{8,190}+p_{8,126}+p_{8,193} \\ &+p_{7,17}+p_{8,81}+2p_{7,49}+p_{7,105}+p_{8,153}+p_{8,217}+p_{8,5}+p_{8,21} \\ &+p_{8,205}+p_{8,237}+p_{8,93}+p_{7,35}+p_{8,227}+p_{8,179}+p_{8,219}+p_{8,199} \\ &+p_{8,39}+3p_{8,231}+p_{8,143}+p_{8,79}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,85} = \frac{1}{2}p_{8,85} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,85}^2 - 4(p_{8,128}+p_{7,16}+p_{8,48}+p_{8,136}+p_{8,72}+p_{8,104} \\ &+p_{8,24}+2p_{8,88}+p_{8,4}+p_{8,164}+p_{7,92}+p_{8,60}+p_{8,124}+p_{8,2} \\ &+p_{8,194}+p_{8,146}+p_{8,82}+p_{8,114}+p_{8,138}+2p_{8,74}+p_{8,202}+p_{8,122} \\ &+p_{8,166}+p_{8,150}+p_{8,118}+2p_{8,14}+p_{8,174}+p_{8,62}+p_{8,126}+p_{8,129} \\ &+p_{8,17}+p_{7,81}+2p_{7,113}+p_{7,41}+p_{8,153}+p_{8,89}+p_{8,197}+p_{8,213} \\ &+p_{8,141}+p_{8,173}+p_{8,29}+p_{8,163}+p_{7,99}+p_{8,115}+p_{8,155}+p_{8,135} \\ &+3p_{8,167}+p_{8,231}+p_{8,15}+p_{8,79}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,341} = \frac{1}{2}p_{8,85} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,85}^2 - 4(p_{8,128}+p_{7,16}+p_{8,48}+p_{8,136}+p_{8,72}+p_{8,104} \\ &+p_{8,24}+2p_{8,88}+p_{8,4}+p_{8,164}+p_{7,92}+p_{8,60}+p_{8,124}+p_{8,2} \\ &+p_{8,194}+p_{8,146}+p_{8,82}+p_{8,114}+p_{8,138}+2p_{8,74}+p_{8,202}+p_{8,122} \\ &+p_{8,166}+p_{8,150}+p_{8,118}+2p_{8,14}+p_{8,174}+p_{8,62}+p_{8,126}+p_{8,129} \\ &+p_{8,17}+p_{7,81}+2p_{7,113}+p_{7,41}+p_{8,153}+p_{8,89}+p_{8,197}+p_{8,213} \\ &+p_{8,141}+p_{8,173}+p_{8,29}+p_{8,163}+p_{7,99}+p_{8,115}+p_{8,155}+p_{8,135} \\ &+3p_{8,167}+p_{8,231}+p_{8,15}+p_{8,79}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,213} = \frac{1}{2}p_{8,213} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,213}^2 - 4(p_{8,0}+p_{7,16}+p_{8,176}+p_{8,8}+p_{8,200}+p_{8,232} \\ &+p_{8,152}+2p_{8,216}+p_{8,132}+p_{8,36}+p_{7,92}+p_{8,188}+p_{8,252} \\ &+p_{8,130}+p_{8,66}+p_{8,18}+p_{8,210}+p_{8,242}+p_{8,10}+p_{8,74}+2p_{8,202} \\ &+p_{8,250}+p_{8,38}+p_{8,22}+p_{8,246}+2p_{8,142}+p_{8,46}+p_{8,190}+p_{8,254} \\ &+p_{8,1}+p_{8,145}+p_{7,81}+2p_{7,113}+p_{7,41}+p_{8,25}+p_{8,217}+p_{8,69} \\ &+p_{8,85}+p_{8,13}+p_{8,45}+p_{8,157}+p_{8,35}+p_{7,99}+p_{8,243}+p_{8,27} \\ &+p_{8,7}+3p_{8,39}+p_{8,103}+p_{8,143}+p_{8,207}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,469} = \frac{1}{2}p_{8,213} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,213}^2 - 4(p_{8,0}+p_{7,16}+p_{8,176}+p_{8,8}+p_{8,200}+p_{8,232} \\ &+p_{8,152}+2p_{8,216}+p_{8,132}+p_{8,36}+p_{7,92}+p_{8,188}+p_{8,252} \\ &+p_{8,130}+p_{8,66}+p_{8,18}+p_{8,210}+p_{8,242}+p_{8,10}+p_{8,74}+2p_{8,202} \\ &+p_{8,250}+p_{8,38}+p_{8,22}+p_{8,246}+2p_{8,142}+p_{8,46}+p_{8,190}+p_{8,254} \\ &+p_{8,1}+p_{8,145}+p_{7,81}+2p_{7,113}+p_{7,41}+p_{8,25}+p_{8,217}+p_{8,69} \\ &+p_{8,85}+p_{8,13}+p_{8,45}+p_{8,157}+p_{8,35}+p_{7,99}+p_{8,243}+p_{8,27} \\ &+p_{8,7}+3p_{8,39}+p_{8,103}+p_{8,143}+p_{8,207}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,53} = \frac{1}{2}p_{8,53} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,53}^2 - 4(p_{8,96}+p_{8,16}+p_{7,112}+p_{8,72}+p_{8,40}+p_{8,104} \\ &+2p_{8,56}+p_{8,248}+p_{8,132}+p_{8,228}+p_{8,28}+p_{8,92}+p_{7,60}+p_{8,162} \\ &+p_{8,226}+p_{8,82}+p_{8,50}+p_{8,114}+2p_{8,42}+p_{8,170}+p_{8,106}+p_{8,90} \\ &+p_{8,134}+p_{8,86}+p_{8,118}+p_{8,142}+2p_{8,238}+p_{8,30}+p_{8,94}+p_{8,97} \\ &+2p_{7,81}+p_{7,49}+p_{8,241}+p_{7,9}+p_{8,57}+p_{8,121}+p_{8,165}+p_{8,181} \\ &+p_{8,141}+p_{8,109}+p_{8,253}+p_{8,131}+p_{7,67}+p_{8,83}+p_{8,123}+3p_{8,135} \\ &+p_{8,199}+p_{8,103}+p_{8,47}+p_{8,239}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,309} = \frac{1}{2}p_{8,53} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,53}^2 - 4(p_{8,96}+p_{8,16}+p_{7,112}+p_{8,72}+p_{8,40}+p_{8,104} \\ &+2p_{8,56}+p_{8,248}+p_{8,132}+p_{8,228}+p_{8,28}+p_{8,92}+p_{7,60}+p_{8,162} \\ &+p_{8,226}+p_{8,82}+p_{8,50}+p_{8,114}+2p_{8,42}+p_{8,170}+p_{8,106}+p_{8,90} \\ &+p_{8,134}+p_{8,86}+p_{8,118}+p_{8,142}+2p_{8,238}+p_{8,30}+p_{8,94}+p_{8,97} \\ &+2p_{7,81}+p_{7,49}+p_{8,241}+p_{7,9}+p_{8,57}+p_{8,121}+p_{8,165}+p_{8,181} \\ &+p_{8,141}+p_{8,109}+p_{8,253}+p_{8,131}+p_{7,67}+p_{8,83}+p_{8,123}+3p_{8,135} \\ &+p_{8,199}+p_{8,103}+p_{8,47}+p_{8,239}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,181} = \frac{1}{2}p_{8,181} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,181}^2 - 4(p_{8,224}+p_{8,144}+p_{7,112}+p_{8,200}+p_{8,168}+p_{8,232} \\ &+2p_{8,184}+p_{8,120}+p_{8,4}+p_{8,100}+p_{8,156}+p_{8,220}+p_{7,60}+p_{8,34} \\ &+p_{8,98}+p_{8,210}+p_{8,178}+p_{8,242}+p_{8,42}+2p_{8,170}+p_{8,234}+p_{8,218} \\ &+p_{8,6}+p_{8,214}+p_{8,246}+p_{8,14}+2p_{8,110}+p_{8,158}+p_{8,222}+p_{8,225} \\ &+2p_{7,81}+p_{7,49}+p_{8,113}+p_{7,9}+p_{8,185}+p_{8,249}+p_{8,37}+p_{8,53} \\ &+p_{8,13}+p_{8,237}+p_{8,125}+p_{8,3}+p_{7,67}+p_{8,211}+p_{8,251}+3p_{8,7} \\ &+p_{8,71}+p_{8,231}+p_{8,175}+p_{8,111}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,437} = \frac{1}{2}p_{8,181} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,181}^2 - 4(p_{8,224}+p_{8,144}+p_{7,112}+p_{8,200}+p_{8,168}+p_{8,232} \\ &+2p_{8,184}+p_{8,120}+p_{8,4}+p_{8,100}+p_{8,156}+p_{8,220}+p_{7,60}+p_{8,34} \\ &+p_{8,98}+p_{8,210}+p_{8,178}+p_{8,242}+p_{8,42}+2p_{8,170}+p_{8,234}+p_{8,218} \\ &+p_{8,6}+p_{8,214}+p_{8,246}+p_{8,14}+2p_{8,110}+p_{8,158}+p_{8,222}+p_{8,225} \\ &+2p_{7,81}+p_{7,49}+p_{8,113}+p_{7,9}+p_{8,185}+p_{8,249}+p_{8,37}+p_{8,53} \\ &+p_{8,13}+p_{8,237}+p_{8,125}+p_{8,3}+p_{7,67}+p_{8,211}+p_{8,251}+3p_{8,7} \\ &+p_{8,71}+p_{8,231}+p_{8,175}+p_{8,111}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,117} = \frac{1}{2}p_{8,117} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,117}^2 - 4(p_{8,160}+p_{8,80}+p_{7,48}+p_{8,136}+p_{8,168}+p_{8,104} \\ &+p_{8,56}+2p_{8,120}+p_{8,196}+p_{8,36}+p_{8,156}+p_{8,92}+p_{7,124}+p_{8,34} \\ &+p_{8,226}+p_{8,146}+p_{8,178}+p_{8,114}+p_{8,170}+2p_{8,106}+p_{8,234} \\ &+p_{8,154}+p_{8,198}+p_{8,150}+p_{8,182}+p_{8,206}+2p_{8,46}+p_{8,158}+p_{8,94} \\ &+p_{8,161}+2p_{7,17}+p_{8,49}+p_{7,113}+p_{7,73}+p_{8,185}+p_{8,121}+p_{8,229} \\ &+p_{8,245}+p_{8,205}+p_{8,173}+p_{8,61}+p_{7,3}+p_{8,195}+p_{8,147}+p_{8,187} \\ &+p_{8,7}+3p_{8,199}+p_{8,167}+p_{8,47}+p_{8,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,373} = \frac{1}{2}p_{8,117} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,117}^2 - 4(p_{8,160}+p_{8,80}+p_{7,48}+p_{8,136}+p_{8,168}+p_{8,104} \\ &+p_{8,56}+2p_{8,120}+p_{8,196}+p_{8,36}+p_{8,156}+p_{8,92}+p_{7,124}+p_{8,34} \\ &+p_{8,226}+p_{8,146}+p_{8,178}+p_{8,114}+p_{8,170}+2p_{8,106}+p_{8,234} \\ &+p_{8,154}+p_{8,198}+p_{8,150}+p_{8,182}+p_{8,206}+2p_{8,46}+p_{8,158}+p_{8,94} \\ &+p_{8,161}+2p_{7,17}+p_{8,49}+p_{7,113}+p_{7,73}+p_{8,185}+p_{8,121}+p_{8,229} \\ &+p_{8,245}+p_{8,205}+p_{8,173}+p_{8,61}+p_{7,3}+p_{8,195}+p_{8,147}+p_{8,187} \\ &+p_{8,7}+3p_{8,199}+p_{8,167}+p_{8,47}+p_{8,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,245} = \frac{1}{2}p_{8,245} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,245}^2 - 4(p_{8,32}+p_{8,208}+p_{7,48}+p_{8,8}+p_{8,40}+p_{8,232} \\ &+p_{8,184}+2p_{8,248}+p_{8,68}+p_{8,164}+p_{8,28}+p_{8,220}+p_{7,124} \\ &+p_{8,162}+p_{8,98}+p_{8,18}+p_{8,50}+p_{8,242}+p_{8,42}+p_{8,106}+2p_{8,234} \\ &+p_{8,26}+p_{8,70}+p_{8,22}+p_{8,54}+p_{8,78}+2p_{8,174}+p_{8,30}+p_{8,222} \\ &+p_{8,33}+2p_{7,17}+p_{8,177}+p_{7,113}+p_{7,73}+p_{8,57}+p_{8,249}+p_{8,101} \\ &+p_{8,117}+p_{8,77}+p_{8,45}+p_{8,189}+p_{7,3}+p_{8,67}+p_{8,19}+p_{8,59} \\ &+p_{8,135}+3p_{8,71}+p_{8,39}+p_{8,175}+p_{8,239}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,501} = \frac{1}{2}p_{8,245} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,245}^2 - 4(p_{8,32}+p_{8,208}+p_{7,48}+p_{8,8}+p_{8,40}+p_{8,232} \\ &+p_{8,184}+2p_{8,248}+p_{8,68}+p_{8,164}+p_{8,28}+p_{8,220}+p_{7,124} \\ &+p_{8,162}+p_{8,98}+p_{8,18}+p_{8,50}+p_{8,242}+p_{8,42}+p_{8,106}+2p_{8,234} \\ &+p_{8,26}+p_{8,70}+p_{8,22}+p_{8,54}+p_{8,78}+2p_{8,174}+p_{8,30}+p_{8,222} \\ &+p_{8,33}+2p_{7,17}+p_{8,177}+p_{7,113}+p_{7,73}+p_{8,57}+p_{8,249}+p_{8,101} \\ &+p_{8,117}+p_{8,77}+p_{8,45}+p_{8,189}+p_{7,3}+p_{8,67}+p_{8,19}+p_{8,59} \\ &+p_{8,135}+3p_{8,71}+p_{8,39}+p_{8,175}+p_{8,239}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,13} = \frac{1}{2}p_{8,13} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,13}^2 - 4(p_{8,0}+p_{8,64}+p_{8,32}+2p_{8,16}+p_{8,208}+p_{7,72} \\ &+p_{8,232}+p_{8,56}+p_{7,20}+p_{8,52}+p_{8,244}+p_{8,92}+p_{8,188}+2p_{8,2} \\ &+p_{8,130}+p_{8,66}+p_{8,50}+p_{8,10}+p_{8,74}+p_{8,42}+p_{8,186}+p_{8,122} \\ &+2p_{8,198}+p_{8,102}+p_{8,54}+p_{8,246}+p_{8,78}+p_{8,46}+p_{8,94}+p_{7,97} \\ &+p_{8,17}+p_{8,81}+p_{7,9}+p_{8,201}+2p_{7,41}+p_{8,57}+p_{8,69}+p_{8,101} \\ &+p_{8,213}+p_{8,141}+p_{8,125}+p_{8,83}+p_{8,43}+p_{7,27}+p_{8,91}+p_{8,7} \\ &+p_{8,199}+p_{8,119}+p_{8,159}+3p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,269} = \frac{1}{2}p_{8,13} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,13}^2 - 4(p_{8,0}+p_{8,64}+p_{8,32}+2p_{8,16}+p_{8,208}+p_{7,72} \\ &+p_{8,232}+p_{8,56}+p_{7,20}+p_{8,52}+p_{8,244}+p_{8,92}+p_{8,188}+2p_{8,2} \\ &+p_{8,130}+p_{8,66}+p_{8,50}+p_{8,10}+p_{8,74}+p_{8,42}+p_{8,186}+p_{8,122} \\ &+2p_{8,198}+p_{8,102}+p_{8,54}+p_{8,246}+p_{8,78}+p_{8,46}+p_{8,94}+p_{7,97} \\ &+p_{8,17}+p_{8,81}+p_{7,9}+p_{8,201}+2p_{7,41}+p_{8,57}+p_{8,69}+p_{8,101} \\ &+p_{8,213}+p_{8,141}+p_{8,125}+p_{8,83}+p_{8,43}+p_{7,27}+p_{8,91}+p_{8,7} \\ &+p_{8,199}+p_{8,119}+p_{8,159}+3p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,141} = \frac{1}{2}p_{8,141} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,141}^2 - 4(p_{8,128}+p_{8,192}+p_{8,160}+2p_{8,144}+p_{8,80}+p_{7,72} \\ &+p_{8,104}+p_{8,184}+p_{7,20}+p_{8,180}+p_{8,116}+p_{8,220}+p_{8,60}+p_{8,2} \\ &+2p_{8,130}+p_{8,194}+p_{8,178}+p_{8,138}+p_{8,202}+p_{8,170}+p_{8,58}+p_{8,250} \\ &+2p_{8,70}+p_{8,230}+p_{8,182}+p_{8,118}+p_{8,206}+p_{8,174}+p_{8,222}+p_{7,97} \\ &+p_{8,145}+p_{8,209}+p_{7,9}+p_{8,73}+2p_{7,41}+p_{8,185}+p_{8,197}+p_{8,229} \\ &+p_{8,85}+p_{8,13}+p_{8,253}+p_{8,211}+p_{8,171}+p_{7,27}+p_{8,219}+p_{8,135} \\ &+p_{8,71}+p_{8,247}+p_{8,31}+3p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,397} = \frac{1}{2}p_{8,141} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,141}^2 - 4(p_{8,128}+p_{8,192}+p_{8,160}+2p_{8,144}+p_{8,80}+p_{7,72} \\ &+p_{8,104}+p_{8,184}+p_{7,20}+p_{8,180}+p_{8,116}+p_{8,220}+p_{8,60}+p_{8,2} \\ &+2p_{8,130}+p_{8,194}+p_{8,178}+p_{8,138}+p_{8,202}+p_{8,170}+p_{8,58}+p_{8,250} \\ &+2p_{8,70}+p_{8,230}+p_{8,182}+p_{8,118}+p_{8,206}+p_{8,174}+p_{8,222}+p_{7,97} \\ &+p_{8,145}+p_{8,209}+p_{7,9}+p_{8,73}+2p_{7,41}+p_{8,185}+p_{8,197}+p_{8,229} \\ &+p_{8,85}+p_{8,13}+p_{8,253}+p_{8,211}+p_{8,171}+p_{7,27}+p_{8,219}+p_{8,135} \\ &+p_{8,71}+p_{8,247}+p_{8,31}+3p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,77} = \frac{1}{2}p_{8,77} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,77}^2 - 4(p_{8,128}+p_{8,64}+p_{8,96}+p_{8,16}+2p_{8,80}+p_{7,8} \\ &+p_{8,40}+p_{8,120}+p_{7,84}+p_{8,52}+p_{8,116}+p_{8,156}+p_{8,252}+p_{8,130} \\ &+2p_{8,66}+p_{8,194}+p_{8,114}+p_{8,138}+p_{8,74}+p_{8,106}+p_{8,186}+p_{8,250} \\ &+2p_{8,6}+p_{8,166}+p_{8,54}+p_{8,118}+p_{8,142}+p_{8,110}+p_{8,158}+p_{7,33} \\ &+p_{8,145}+p_{8,81}+p_{8,9}+p_{7,73}+2p_{7,105}+p_{8,121}+p_{8,133}+p_{8,165} \\ &+p_{8,21}+p_{8,205}+p_{8,189}+p_{8,147}+p_{8,107}+p_{8,155}+p_{7,91}+p_{8,7} \\ &+p_{8,71}+p_{8,183}+3p_{8,159}+p_{8,223}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,333} = \frac{1}{2}p_{8,77} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,77}^2 - 4(p_{8,128}+p_{8,64}+p_{8,96}+p_{8,16}+2p_{8,80}+p_{7,8} \\ &+p_{8,40}+p_{8,120}+p_{7,84}+p_{8,52}+p_{8,116}+p_{8,156}+p_{8,252}+p_{8,130} \\ &+2p_{8,66}+p_{8,194}+p_{8,114}+p_{8,138}+p_{8,74}+p_{8,106}+p_{8,186}+p_{8,250} \\ &+2p_{8,6}+p_{8,166}+p_{8,54}+p_{8,118}+p_{8,142}+p_{8,110}+p_{8,158}+p_{7,33} \\ &+p_{8,145}+p_{8,81}+p_{8,9}+p_{7,73}+2p_{7,105}+p_{8,121}+p_{8,133}+p_{8,165} \\ &+p_{8,21}+p_{8,205}+p_{8,189}+p_{8,147}+p_{8,107}+p_{8,155}+p_{7,91}+p_{8,7} \\ &+p_{8,71}+p_{8,183}+3p_{8,159}+p_{8,223}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,205} = \frac{1}{2}p_{8,205} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,205}^2 - 4(p_{8,0}+p_{8,192}+p_{8,224}+p_{8,144}+2p_{8,208}+p_{7,8} \\ &+p_{8,168}+p_{8,248}+p_{7,84}+p_{8,180}+p_{8,244}+p_{8,28}+p_{8,124}+p_{8,2} \\ &+p_{8,66}+2p_{8,194}+p_{8,242}+p_{8,10}+p_{8,202}+p_{8,234}+p_{8,58}+p_{8,122} \\ &+2p_{8,134}+p_{8,38}+p_{8,182}+p_{8,246}+p_{8,14}+p_{8,238}+p_{8,30}+p_{7,33} \\ &+p_{8,17}+p_{8,209}+p_{8,137}+p_{7,73}+2p_{7,105}+p_{8,249}+p_{8,5}+p_{8,37} \\ &+p_{8,149}+p_{8,77}+p_{8,61}+p_{8,19}+p_{8,235}+p_{8,27}+p_{7,91}+p_{8,135} \\ &+p_{8,199}+p_{8,55}+3p_{8,31}+p_{8,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,461} = \frac{1}{2}p_{8,205} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,205}^2 - 4(p_{8,0}+p_{8,192}+p_{8,224}+p_{8,144}+2p_{8,208}+p_{7,8} \\ &+p_{8,168}+p_{8,248}+p_{7,84}+p_{8,180}+p_{8,244}+p_{8,28}+p_{8,124}+p_{8,2} \\ &+p_{8,66}+2p_{8,194}+p_{8,242}+p_{8,10}+p_{8,202}+p_{8,234}+p_{8,58}+p_{8,122} \\ &+2p_{8,134}+p_{8,38}+p_{8,182}+p_{8,246}+p_{8,14}+p_{8,238}+p_{8,30}+p_{7,33} \\ &+p_{8,17}+p_{8,209}+p_{8,137}+p_{7,73}+2p_{7,105}+p_{8,249}+p_{8,5}+p_{8,37} \\ &+p_{8,149}+p_{8,77}+p_{8,61}+p_{8,19}+p_{8,235}+p_{8,27}+p_{7,91}+p_{8,135} \\ &+p_{8,199}+p_{8,55}+3p_{8,31}+p_{8,95}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,45} = \frac{1}{2}p_{8,45} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,45}^2 - 4(p_{8,64}+p_{8,32}+p_{8,96}+2p_{8,48}+p_{8,240}+p_{8,8} \\ &+p_{7,104}+p_{8,88}+p_{8,20}+p_{8,84}+p_{7,52}+p_{8,220}+p_{8,124}+2p_{8,34} \\ &+p_{8,162}+p_{8,98}+p_{8,82}+p_{8,74}+p_{8,42}+p_{8,106}+p_{8,154}+p_{8,218} \\ &+p_{8,134}+2p_{8,230}+p_{8,22}+p_{8,86}+p_{8,78}+p_{8,110}+p_{8,126}+p_{7,1} \\ &+p_{8,49}+p_{8,113}+2p_{7,73}+p_{7,41}+p_{8,233}+p_{8,89}+p_{8,133}+p_{8,101} \\ &+p_{8,245}+p_{8,173}+p_{8,157}+p_{8,115}+p_{8,75}+p_{7,59}+p_{8,123}+p_{8,39} \\ &+p_{8,231}+p_{8,151}+p_{8,95}+p_{8,191}+3p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,301} = \frac{1}{2}p_{8,45} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,45}^2 - 4(p_{8,64}+p_{8,32}+p_{8,96}+2p_{8,48}+p_{8,240}+p_{8,8} \\ &+p_{7,104}+p_{8,88}+p_{8,20}+p_{8,84}+p_{7,52}+p_{8,220}+p_{8,124}+2p_{8,34} \\ &+p_{8,162}+p_{8,98}+p_{8,82}+p_{8,74}+p_{8,42}+p_{8,106}+p_{8,154}+p_{8,218} \\ &+p_{8,134}+2p_{8,230}+p_{8,22}+p_{8,86}+p_{8,78}+p_{8,110}+p_{8,126}+p_{7,1} \\ &+p_{8,49}+p_{8,113}+2p_{7,73}+p_{7,41}+p_{8,233}+p_{8,89}+p_{8,133}+p_{8,101} \\ &+p_{8,245}+p_{8,173}+p_{8,157}+p_{8,115}+p_{8,75}+p_{7,59}+p_{8,123}+p_{8,39} \\ &+p_{8,231}+p_{8,151}+p_{8,95}+p_{8,191}+3p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,173} = \frac{1}{2}p_{8,173} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,173}^2 - 4(p_{8,192}+p_{8,160}+p_{8,224}+2p_{8,176}+p_{8,112}+p_{8,136} \\ &+p_{7,104}+p_{8,216}+p_{8,148}+p_{8,212}+p_{7,52}+p_{8,92}+p_{8,252}+p_{8,34} \\ &+2p_{8,162}+p_{8,226}+p_{8,210}+p_{8,202}+p_{8,170}+p_{8,234}+p_{8,26}+p_{8,90} \\ &+p_{8,6}+2p_{8,102}+p_{8,150}+p_{8,214}+p_{8,206}+p_{8,238}+p_{8,254}+p_{7,1} \\ &+p_{8,177}+p_{8,241}+2p_{7,73}+p_{7,41}+p_{8,105}+p_{8,217}+p_{8,5}+p_{8,229} \\ &+p_{8,117}+p_{8,45}+p_{8,29}+p_{8,243}+p_{8,203}+p_{7,59}+p_{8,251}+p_{8,167} \\ &+p_{8,103}+p_{8,23}+p_{8,223}+p_{8,63}+3p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,429} = \frac{1}{2}p_{8,173} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,173}^2 - 4(p_{8,192}+p_{8,160}+p_{8,224}+2p_{8,176}+p_{8,112}+p_{8,136} \\ &+p_{7,104}+p_{8,216}+p_{8,148}+p_{8,212}+p_{7,52}+p_{8,92}+p_{8,252}+p_{8,34} \\ &+2p_{8,162}+p_{8,226}+p_{8,210}+p_{8,202}+p_{8,170}+p_{8,234}+p_{8,26}+p_{8,90} \\ &+p_{8,6}+2p_{8,102}+p_{8,150}+p_{8,214}+p_{8,206}+p_{8,238}+p_{8,254}+p_{7,1} \\ &+p_{8,177}+p_{8,241}+2p_{7,73}+p_{7,41}+p_{8,105}+p_{8,217}+p_{8,5}+p_{8,229} \\ &+p_{8,117}+p_{8,45}+p_{8,29}+p_{8,243}+p_{8,203}+p_{7,59}+p_{8,251}+p_{8,167} \\ &+p_{8,103}+p_{8,23}+p_{8,223}+p_{8,63}+3p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,109} = \frac{1}{2}p_{8,109} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,109}^2 - 4(p_{8,128}+p_{8,160}+p_{8,96}+p_{8,48}+2p_{8,112}+p_{8,72} \\ &+p_{7,40}+p_{8,152}+p_{8,148}+p_{8,84}+p_{7,116}+p_{8,28}+p_{8,188}+p_{8,162} \\ &+2p_{8,98}+p_{8,226}+p_{8,146}+p_{8,138}+p_{8,170}+p_{8,106}+p_{8,26}+p_{8,218} \\ &+p_{8,198}+2p_{8,38}+p_{8,150}+p_{8,86}+p_{8,142}+p_{8,174}+p_{8,190}+p_{7,65} \\ &+p_{8,177}+p_{8,113}+2p_{7,9}+p_{8,41}+p_{7,105}+p_{8,153}+p_{8,197}+p_{8,165} \\ &+p_{8,53}+p_{8,237}+p_{8,221}+p_{8,179}+p_{8,139}+p_{8,187}+p_{7,123}+p_{8,39} \\ &+p_{8,103}+p_{8,215}+p_{8,159}+3p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,365} = \frac{1}{2}p_{8,109} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,109}^2 - 4(p_{8,128}+p_{8,160}+p_{8,96}+p_{8,48}+2p_{8,112}+p_{8,72} \\ &+p_{7,40}+p_{8,152}+p_{8,148}+p_{8,84}+p_{7,116}+p_{8,28}+p_{8,188}+p_{8,162} \\ &+2p_{8,98}+p_{8,226}+p_{8,146}+p_{8,138}+p_{8,170}+p_{8,106}+p_{8,26}+p_{8,218} \\ &+p_{8,198}+2p_{8,38}+p_{8,150}+p_{8,86}+p_{8,142}+p_{8,174}+p_{8,190}+p_{7,65} \\ &+p_{8,177}+p_{8,113}+2p_{7,9}+p_{8,41}+p_{7,105}+p_{8,153}+p_{8,197}+p_{8,165} \\ &+p_{8,53}+p_{8,237}+p_{8,221}+p_{8,179}+p_{8,139}+p_{8,187}+p_{7,123}+p_{8,39} \\ &+p_{8,103}+p_{8,215}+p_{8,159}+3p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,237} = \frac{1}{2}p_{8,237} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,237}^2 - 4(p_{8,0}+p_{8,32}+p_{8,224}+p_{8,176}+2p_{8,240}+p_{8,200} \\ &+p_{7,40}+p_{8,24}+p_{8,20}+p_{8,212}+p_{7,116}+p_{8,156}+p_{8,60}+p_{8,34} \\ &+p_{8,98}+2p_{8,226}+p_{8,18}+p_{8,10}+p_{8,42}+p_{8,234}+p_{8,154}+p_{8,90} \\ &+p_{8,70}+2p_{8,166}+p_{8,22}+p_{8,214}+p_{8,14}+p_{8,46}+p_{8,62}+p_{7,65} \\ &+p_{8,49}+p_{8,241}+2p_{7,9}+p_{8,169}+p_{7,105}+p_{8,25}+p_{8,69}+p_{8,37} \\ &+p_{8,181}+p_{8,109}+p_{8,93}+p_{8,51}+p_{8,11}+p_{8,59}+p_{7,123}+p_{8,167} \\ &+p_{8,231}+p_{8,87}+p_{8,31}+3p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,493} = \frac{1}{2}p_{8,237} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,237}^2 - 4(p_{8,0}+p_{8,32}+p_{8,224}+p_{8,176}+2p_{8,240}+p_{8,200} \\ &+p_{7,40}+p_{8,24}+p_{8,20}+p_{8,212}+p_{7,116}+p_{8,156}+p_{8,60}+p_{8,34} \\ &+p_{8,98}+2p_{8,226}+p_{8,18}+p_{8,10}+p_{8,42}+p_{8,234}+p_{8,154}+p_{8,90} \\ &+p_{8,70}+2p_{8,166}+p_{8,22}+p_{8,214}+p_{8,14}+p_{8,46}+p_{8,62}+p_{7,65} \\ &+p_{8,49}+p_{8,241}+2p_{7,9}+p_{8,169}+p_{7,105}+p_{8,25}+p_{8,69}+p_{8,37} \\ &+p_{8,181}+p_{8,109}+p_{8,93}+p_{8,51}+p_{8,11}+p_{8,59}+p_{7,123}+p_{8,167} \\ &+p_{8,231}+p_{8,87}+p_{8,31}+3p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,29} = \frac{1}{2}p_{8,29} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,29}^2 - 4(2p_{8,32}+p_{8,224}+p_{8,16}+p_{8,80}+p_{8,48}+p_{8,72} \\ &+p_{7,88}+p_{8,248}+p_{8,4}+p_{8,68}+p_{7,36}+p_{8,204}+p_{8,108}+p_{8,66} \\ &+2p_{8,18}+p_{8,146}+p_{8,82}+p_{8,138}+p_{8,202}+p_{8,26}+p_{8,90}+p_{8,58} \\ &+p_{8,6}+p_{8,70}+2p_{8,214}+p_{8,118}+p_{8,110}+p_{8,94}+p_{8,62}+p_{8,33} \\ &+p_{8,97}+p_{7,113}+p_{8,73}+p_{7,25}+p_{8,217}+2p_{7,57}+p_{8,229}+p_{8,85} \\ &+p_{8,117}+p_{8,141}+p_{8,157}+p_{8,99}+p_{7,43}+p_{8,107}+p_{8,59}+p_{8,135} \\ &+p_{8,23}+p_{8,215}+p_{8,79}+p_{8,175}+3p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,285} = \frac{1}{2}p_{8,29} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,29}^2 - 4(2p_{8,32}+p_{8,224}+p_{8,16}+p_{8,80}+p_{8,48}+p_{8,72} \\ &+p_{7,88}+p_{8,248}+p_{8,4}+p_{8,68}+p_{7,36}+p_{8,204}+p_{8,108}+p_{8,66} \\ &+2p_{8,18}+p_{8,146}+p_{8,82}+p_{8,138}+p_{8,202}+p_{8,26}+p_{8,90}+p_{8,58} \\ &+p_{8,6}+p_{8,70}+2p_{8,214}+p_{8,118}+p_{8,110}+p_{8,94}+p_{8,62}+p_{8,33} \\ &+p_{8,97}+p_{7,113}+p_{8,73}+p_{7,25}+p_{8,217}+2p_{7,57}+p_{8,229}+p_{8,85} \\ &+p_{8,117}+p_{8,141}+p_{8,157}+p_{8,99}+p_{7,43}+p_{8,107}+p_{8,59}+p_{8,135} \\ &+p_{8,23}+p_{8,215}+p_{8,79}+p_{8,175}+3p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,157} = \frac{1}{2}p_{8,157} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,157}^2 - 4(2p_{8,160}+p_{8,96}+p_{8,144}+p_{8,208}+p_{8,176}+p_{8,200} \\ &+p_{7,88}+p_{8,120}+p_{8,132}+p_{8,196}+p_{7,36}+p_{8,76}+p_{8,236}+p_{8,194} \\ &+p_{8,18}+2p_{8,146}+p_{8,210}+p_{8,10}+p_{8,74}+p_{8,154}+p_{8,218}+p_{8,186} \\ &+p_{8,134}+p_{8,198}+2p_{8,86}+p_{8,246}+p_{8,238}+p_{8,222}+p_{8,190}+p_{8,161} \\ &+p_{8,225}+p_{7,113}+p_{8,201}+p_{7,25}+p_{8,89}+2p_{7,57}+p_{8,101}+p_{8,213} \\ &+p_{8,245}+p_{8,13}+p_{8,29}+p_{8,227}+p_{7,43}+p_{8,235}+p_{8,187}+p_{8,7} \\ &+p_{8,151}+p_{8,87}+p_{8,207}+p_{8,47}+3p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,413} = \frac{1}{2}p_{8,157} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,157}^2 - 4(2p_{8,160}+p_{8,96}+p_{8,144}+p_{8,208}+p_{8,176}+p_{8,200} \\ &+p_{7,88}+p_{8,120}+p_{8,132}+p_{8,196}+p_{7,36}+p_{8,76}+p_{8,236}+p_{8,194} \\ &+p_{8,18}+2p_{8,146}+p_{8,210}+p_{8,10}+p_{8,74}+p_{8,154}+p_{8,218}+p_{8,186} \\ &+p_{8,134}+p_{8,198}+2p_{8,86}+p_{8,246}+p_{8,238}+p_{8,222}+p_{8,190}+p_{8,161} \\ &+p_{8,225}+p_{7,113}+p_{8,201}+p_{7,25}+p_{8,89}+2p_{7,57}+p_{8,101}+p_{8,213} \\ &+p_{8,245}+p_{8,13}+p_{8,29}+p_{8,227}+p_{7,43}+p_{8,235}+p_{8,187}+p_{8,7} \\ &+p_{8,151}+p_{8,87}+p_{8,207}+p_{8,47}+3p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,93} = \frac{1}{2}p_{8,93} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,93}^2 - 4(p_{8,32}+2p_{8,96}+p_{8,144}+p_{8,80}+p_{8,112}+p_{8,136} \\ &+p_{7,24}+p_{8,56}+p_{8,132}+p_{8,68}+p_{7,100}+p_{8,12}+p_{8,172}+p_{8,130} \\ &+p_{8,146}+2p_{8,82}+p_{8,210}+p_{8,10}+p_{8,202}+p_{8,154}+p_{8,90}+p_{8,122} \\ &+p_{8,134}+p_{8,70}+2p_{8,22}+p_{8,182}+p_{8,174}+p_{8,158}+p_{8,126}+p_{8,161} \\ &+p_{8,97}+p_{7,49}+p_{8,137}+p_{8,25}+p_{7,89}+2p_{7,121}+p_{8,37}+p_{8,149} \\ &+p_{8,181}+p_{8,205}+p_{8,221}+p_{8,163}+p_{8,171}+p_{7,107}+p_{8,123}+p_{8,199} \\ &+p_{8,23}+p_{8,87}+p_{8,143}+3p_{8,175}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,349} = \frac{1}{2}p_{8,93} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,93}^2 - 4(p_{8,32}+2p_{8,96}+p_{8,144}+p_{8,80}+p_{8,112}+p_{8,136} \\ &+p_{7,24}+p_{8,56}+p_{8,132}+p_{8,68}+p_{7,100}+p_{8,12}+p_{8,172}+p_{8,130} \\ &+p_{8,146}+2p_{8,82}+p_{8,210}+p_{8,10}+p_{8,202}+p_{8,154}+p_{8,90}+p_{8,122} \\ &+p_{8,134}+p_{8,70}+2p_{8,22}+p_{8,182}+p_{8,174}+p_{8,158}+p_{8,126}+p_{8,161} \\ &+p_{8,97}+p_{7,49}+p_{8,137}+p_{8,25}+p_{7,89}+2p_{7,121}+p_{8,37}+p_{8,149} \\ &+p_{8,181}+p_{8,205}+p_{8,221}+p_{8,163}+p_{8,171}+p_{7,107}+p_{8,123}+p_{8,199} \\ &+p_{8,23}+p_{8,87}+p_{8,143}+3p_{8,175}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,221} = \frac{1}{2}p_{8,221} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,221}^2 - 4(p_{8,160}+2p_{8,224}+p_{8,16}+p_{8,208}+p_{8,240}+p_{8,8} \\ &+p_{7,24}+p_{8,184}+p_{8,4}+p_{8,196}+p_{7,100}+p_{8,140}+p_{8,44}+p_{8,2} \\ &+p_{8,18}+p_{8,82}+2p_{8,210}+p_{8,138}+p_{8,74}+p_{8,26}+p_{8,218}+p_{8,250} \\ &+p_{8,6}+p_{8,198}+2p_{8,150}+p_{8,54}+p_{8,46}+p_{8,30}+p_{8,254}+p_{8,33} \\ &+p_{8,225}+p_{7,49}+p_{8,9}+p_{8,153}+p_{7,89}+2p_{7,121}+p_{8,165}+p_{8,21} \\ &+p_{8,53}+p_{8,77}+p_{8,93}+p_{8,35}+p_{8,43}+p_{7,107}+p_{8,251}+p_{8,71} \\ &+p_{8,151}+p_{8,215}+p_{8,15}+3p_{8,47}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,477} = \frac{1}{2}p_{8,221} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,221}^2 - 4(p_{8,160}+2p_{8,224}+p_{8,16}+p_{8,208}+p_{8,240}+p_{8,8} \\ &+p_{7,24}+p_{8,184}+p_{8,4}+p_{8,196}+p_{7,100}+p_{8,140}+p_{8,44}+p_{8,2} \\ &+p_{8,18}+p_{8,82}+2p_{8,210}+p_{8,138}+p_{8,74}+p_{8,26}+p_{8,218}+p_{8,250} \\ &+p_{8,6}+p_{8,198}+2p_{8,150}+p_{8,54}+p_{8,46}+p_{8,30}+p_{8,254}+p_{8,33} \\ &+p_{8,225}+p_{7,49}+p_{8,9}+p_{8,153}+p_{7,89}+2p_{7,121}+p_{8,165}+p_{8,21} \\ &+p_{8,53}+p_{8,77}+p_{8,93}+p_{8,35}+p_{8,43}+p_{7,107}+p_{8,251}+p_{8,71} \\ &+p_{8,151}+p_{8,215}+p_{8,15}+3p_{8,47}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,61} = \frac{1}{2}p_{8,61} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,61}^2 - 4(p_{8,0}+2p_{8,64}+p_{8,80}+p_{8,48}+p_{8,112}+p_{8,104} \\ &+p_{8,24}+p_{7,120}+p_{7,68}+p_{8,36}+p_{8,100}+p_{8,140}+p_{8,236}+p_{8,98} \\ &+2p_{8,50}+p_{8,178}+p_{8,114}+p_{8,170}+p_{8,234}+p_{8,90}+p_{8,58}+p_{8,122} \\ &+p_{8,38}+p_{8,102}+p_{8,150}+2p_{8,246}+p_{8,142}+p_{8,94}+p_{8,126}+p_{8,129} \\ &+p_{8,65}+p_{7,17}+p_{8,105}+2p_{7,89}+p_{7,57}+p_{8,249}+p_{8,5}+p_{8,149} \\ &+p_{8,117}+p_{8,173}+p_{8,189}+p_{8,131}+p_{8,139}+p_{7,75}+p_{8,91}+p_{8,167} \\ &+p_{8,55}+p_{8,247}+3p_{8,143}+p_{8,207}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,317} = \frac{1}{2}p_{8,61} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,61}^2 - 4(p_{8,0}+2p_{8,64}+p_{8,80}+p_{8,48}+p_{8,112}+p_{8,104} \\ &+p_{8,24}+p_{7,120}+p_{7,68}+p_{8,36}+p_{8,100}+p_{8,140}+p_{8,236}+p_{8,98} \\ &+2p_{8,50}+p_{8,178}+p_{8,114}+p_{8,170}+p_{8,234}+p_{8,90}+p_{8,58}+p_{8,122} \\ &+p_{8,38}+p_{8,102}+p_{8,150}+2p_{8,246}+p_{8,142}+p_{8,94}+p_{8,126}+p_{8,129} \\ &+p_{8,65}+p_{7,17}+p_{8,105}+2p_{7,89}+p_{7,57}+p_{8,249}+p_{8,5}+p_{8,149} \\ &+p_{8,117}+p_{8,173}+p_{8,189}+p_{8,131}+p_{8,139}+p_{7,75}+p_{8,91}+p_{8,167} \\ &+p_{8,55}+p_{8,247}+3p_{8,143}+p_{8,207}+p_{8,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,189} = \frac{1}{2}p_{8,189} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,189}^2 - 4(p_{8,128}+2p_{8,192}+p_{8,208}+p_{8,176}+p_{8,240}+p_{8,232} \\ &+p_{8,152}+p_{7,120}+p_{7,68}+p_{8,164}+p_{8,228}+p_{8,12}+p_{8,108}+p_{8,226} \\ &+p_{8,50}+2p_{8,178}+p_{8,242}+p_{8,42}+p_{8,106}+p_{8,218}+p_{8,186}+p_{8,250} \\ &+p_{8,166}+p_{8,230}+p_{8,22}+2p_{8,118}+p_{8,14}+p_{8,222}+p_{8,254}+p_{8,1} \\ &+p_{8,193}+p_{7,17}+p_{8,233}+2p_{7,89}+p_{7,57}+p_{8,121}+p_{8,133}+p_{8,21} \\ &+p_{8,245}+p_{8,45}+p_{8,61}+p_{8,3}+p_{8,11}+p_{7,75}+p_{8,219}+p_{8,39} \\ &+p_{8,183}+p_{8,119}+3p_{8,15}+p_{8,79}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,445} = \frac{1}{2}p_{8,189} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,189}^2 - 4(p_{8,128}+2p_{8,192}+p_{8,208}+p_{8,176}+p_{8,240}+p_{8,232} \\ &+p_{8,152}+p_{7,120}+p_{7,68}+p_{8,164}+p_{8,228}+p_{8,12}+p_{8,108}+p_{8,226} \\ &+p_{8,50}+2p_{8,178}+p_{8,242}+p_{8,42}+p_{8,106}+p_{8,218}+p_{8,186}+p_{8,250} \\ &+p_{8,166}+p_{8,230}+p_{8,22}+2p_{8,118}+p_{8,14}+p_{8,222}+p_{8,254}+p_{8,1} \\ &+p_{8,193}+p_{7,17}+p_{8,233}+2p_{7,89}+p_{7,57}+p_{8,121}+p_{8,133}+p_{8,21} \\ &+p_{8,245}+p_{8,45}+p_{8,61}+p_{8,3}+p_{8,11}+p_{7,75}+p_{8,219}+p_{8,39} \\ &+p_{8,183}+p_{8,119}+3p_{8,15}+p_{8,79}+p_{8,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,125} = \frac{1}{2}p_{8,125} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,125}^2 - 4(2p_{8,128}+p_{8,64}+p_{8,144}+p_{8,176}+p_{8,112}+p_{8,168} \\ &+p_{8,88}+p_{7,56}+p_{7,4}+p_{8,164}+p_{8,100}+p_{8,204}+p_{8,44}+p_{8,162} \\ &+p_{8,178}+2p_{8,114}+p_{8,242}+p_{8,42}+p_{8,234}+p_{8,154}+p_{8,186}+p_{8,122} \\ &+p_{8,166}+p_{8,102}+p_{8,214}+2p_{8,54}+p_{8,206}+p_{8,158}+p_{8,190}+p_{8,129} \\ &+p_{8,193}+p_{7,81}+p_{8,169}+2p_{7,25}+p_{8,57}+p_{7,121}+p_{8,69}+p_{8,213} \\ &+p_{8,181}+p_{8,237}+p_{8,253}+p_{8,195}+p_{7,11}+p_{8,203}+p_{8,155}+p_{8,231} \\ &+p_{8,55}+p_{8,119}+p_{8,15}+3p_{8,207}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,381} = \frac{1}{2}p_{8,125} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,125}^2 - 4(2p_{8,128}+p_{8,64}+p_{8,144}+p_{8,176}+p_{8,112}+p_{8,168} \\ &+p_{8,88}+p_{7,56}+p_{7,4}+p_{8,164}+p_{8,100}+p_{8,204}+p_{8,44}+p_{8,162} \\ &+p_{8,178}+2p_{8,114}+p_{8,242}+p_{8,42}+p_{8,234}+p_{8,154}+p_{8,186}+p_{8,122} \\ &+p_{8,166}+p_{8,102}+p_{8,214}+2p_{8,54}+p_{8,206}+p_{8,158}+p_{8,190}+p_{8,129} \\ &+p_{8,193}+p_{7,81}+p_{8,169}+2p_{7,25}+p_{8,57}+p_{7,121}+p_{8,69}+p_{8,213} \\ &+p_{8,181}+p_{8,237}+p_{8,253}+p_{8,195}+p_{7,11}+p_{8,203}+p_{8,155}+p_{8,231} \\ &+p_{8,55}+p_{8,119}+p_{8,15}+3p_{8,207}+p_{8,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,253} = \frac{1}{2}p_{8,253} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,253}^2 - 4(2p_{8,0}+p_{8,192}+p_{8,16}+p_{8,48}+p_{8,240}+p_{8,40} \\ &+p_{8,216}+p_{7,56}+p_{7,4}+p_{8,36}+p_{8,228}+p_{8,76}+p_{8,172}+p_{8,34} \\ &+p_{8,50}+p_{8,114}+2p_{8,242}+p_{8,170}+p_{8,106}+p_{8,26}+p_{8,58}+p_{8,250} \\ &+p_{8,38}+p_{8,230}+p_{8,86}+2p_{8,182}+p_{8,78}+p_{8,30}+p_{8,62}+p_{8,1} \\ &+p_{8,65}+p_{7,81}+p_{8,41}+2p_{7,25}+p_{8,185}+p_{7,121}+p_{8,197}+p_{8,85} \\ &+p_{8,53}+p_{8,109}+p_{8,125}+p_{8,67}+p_{7,11}+p_{8,75}+p_{8,27}+p_{8,103} \\ &+p_{8,183}+p_{8,247}+p_{8,143}+3p_{8,79}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,509} = \frac{1}{2}p_{8,253} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,253}^2 - 4(2p_{8,0}+p_{8,192}+p_{8,16}+p_{8,48}+p_{8,240}+p_{8,40} \\ &+p_{8,216}+p_{7,56}+p_{7,4}+p_{8,36}+p_{8,228}+p_{8,76}+p_{8,172}+p_{8,34} \\ &+p_{8,50}+p_{8,114}+2p_{8,242}+p_{8,170}+p_{8,106}+p_{8,26}+p_{8,58}+p_{8,250} \\ &+p_{8,38}+p_{8,230}+p_{8,86}+2p_{8,182}+p_{8,78}+p_{8,30}+p_{8,62}+p_{8,1} \\ &+p_{8,65}+p_{7,81}+p_{8,41}+2p_{7,25}+p_{8,185}+p_{7,121}+p_{8,197}+p_{8,85} \\ &+p_{8,53}+p_{8,109}+p_{8,125}+p_{8,67}+p_{7,11}+p_{8,75}+p_{8,27}+p_{8,103} \\ &+p_{8,183}+p_{8,247}+p_{8,143}+3p_{8,79}+p_{8,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,3} = \frac{1}{2}p_{8,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,3}^2 - 4(p_{8,0}+p_{8,64}+p_{8,32}+p_{8,176}+p_{8,112}+p_{8,40} \\ &+p_{8,56}+p_{8,120}+2p_{8,248}+p_{8,68}+p_{8,36}+p_{8,84}+p_{8,44}+p_{8,236} \\ &+p_{8,92}+2p_{8,188}+p_{8,82}+p_{8,178}+p_{7,10}+p_{8,42}+p_{8,234}+2p_{8,6} \\ &+p_{8,198}+p_{8,22}+p_{8,54}+p_{8,246}+p_{8,46}+p_{8,222}+p_{7,62}+p_{8,33} \\ &+p_{7,17}+p_{8,81}+p_{8,73}+p_{8,149}+3p_{8,85}+p_{8,53}+p_{8,109}+p_{8,189} \\ &+p_{8,253}+p_{8,131}+p_{8,115}+p_{8,203}+p_{8,91}+p_{8,59}+p_{8,7}+p_{8,71} \\ &+p_{7,87}+p_{8,47}+2p_{7,31}+p_{8,191}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,259} = \frac{1}{2}p_{8,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,3}^2 - 4(p_{8,0}+p_{8,64}+p_{8,32}+p_{8,176}+p_{8,112}+p_{8,40} \\ &+p_{8,56}+p_{8,120}+2p_{8,248}+p_{8,68}+p_{8,36}+p_{8,84}+p_{8,44}+p_{8,236} \\ &+p_{8,92}+2p_{8,188}+p_{8,82}+p_{8,178}+p_{7,10}+p_{8,42}+p_{8,234}+2p_{8,6} \\ &+p_{8,198}+p_{8,22}+p_{8,54}+p_{8,246}+p_{8,46}+p_{8,222}+p_{7,62}+p_{8,33} \\ &+p_{7,17}+p_{8,81}+p_{8,73}+p_{8,149}+3p_{8,85}+p_{8,53}+p_{8,109}+p_{8,189} \\ &+p_{8,253}+p_{8,131}+p_{8,115}+p_{8,203}+p_{8,91}+p_{8,59}+p_{8,7}+p_{8,71} \\ &+p_{7,87}+p_{8,47}+2p_{7,31}+p_{8,191}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,131} = \frac{1}{2}p_{8,131} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,131}^2 - 4(p_{8,128}+p_{8,192}+p_{8,160}+p_{8,48}+p_{8,240}+p_{8,168} \\ &+p_{8,184}+2p_{8,120}+p_{8,248}+p_{8,196}+p_{8,164}+p_{8,212}+p_{8,172} \\ &+p_{8,108}+p_{8,220}+2p_{8,60}+p_{8,210}+p_{8,50}+p_{7,10}+p_{8,170}+p_{8,106} \\ &+2p_{8,134}+p_{8,70}+p_{8,150}+p_{8,182}+p_{8,118}+p_{8,174}+p_{8,94}+p_{7,62} \\ &+p_{8,161}+p_{7,17}+p_{8,209}+p_{8,201}+p_{8,21}+3p_{8,213}+p_{8,181}+p_{8,237} \\ &+p_{8,61}+p_{8,125}+p_{8,3}+p_{8,243}+p_{8,75}+p_{8,219}+p_{8,187}+p_{8,135} \\ &+p_{8,199}+p_{7,87}+p_{8,175}+2p_{7,31}+p_{8,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,387} = \frac{1}{2}p_{8,131} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,131}^2 - 4(p_{8,128}+p_{8,192}+p_{8,160}+p_{8,48}+p_{8,240}+p_{8,168} \\ &+p_{8,184}+2p_{8,120}+p_{8,248}+p_{8,196}+p_{8,164}+p_{8,212}+p_{8,172} \\ &+p_{8,108}+p_{8,220}+2p_{8,60}+p_{8,210}+p_{8,50}+p_{7,10}+p_{8,170}+p_{8,106} \\ &+2p_{8,134}+p_{8,70}+p_{8,150}+p_{8,182}+p_{8,118}+p_{8,174}+p_{8,94}+p_{7,62} \\ &+p_{8,161}+p_{7,17}+p_{8,209}+p_{8,201}+p_{8,21}+3p_{8,213}+p_{8,181}+p_{8,237} \\ &+p_{8,61}+p_{8,125}+p_{8,3}+p_{8,243}+p_{8,75}+p_{8,219}+p_{8,187}+p_{8,135} \\ &+p_{8,199}+p_{7,87}+p_{8,175}+2p_{7,31}+p_{8,63}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,67} = \frac{1}{2}p_{8,67} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,67}^2 - 4(p_{8,128}+p_{8,64}+p_{8,96}+p_{8,176}+p_{8,240}+p_{8,104} \\ &+2p_{8,56}+p_{8,184}+p_{8,120}+p_{8,132}+p_{8,100}+p_{8,148}+p_{8,44}+p_{8,108} \\ &+p_{8,156}+2p_{8,252}+p_{8,146}+p_{8,242}+p_{7,74}+p_{8,42}+p_{8,106}+p_{8,6} \\ &+2p_{8,70}+p_{8,86}+p_{8,54}+p_{8,118}+p_{8,110}+p_{8,30}+p_{7,126}+p_{8,97} \\ &+p_{8,145}+p_{7,81}+p_{8,137}+3p_{8,149}+p_{8,213}+p_{8,117}+p_{8,173}+p_{8,61} \\ &+p_{8,253}+p_{8,195}+p_{8,179}+p_{8,11}+p_{8,155}+p_{8,123}+p_{8,135}+p_{8,71} \\ &+p_{7,23}+p_{8,111}+2p_{7,95}+p_{7,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,323} = \frac{1}{2}p_{8,67} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,67}^2 - 4(p_{8,128}+p_{8,64}+p_{8,96}+p_{8,176}+p_{8,240}+p_{8,104} \\ &+2p_{8,56}+p_{8,184}+p_{8,120}+p_{8,132}+p_{8,100}+p_{8,148}+p_{8,44}+p_{8,108} \\ &+p_{8,156}+2p_{8,252}+p_{8,146}+p_{8,242}+p_{7,74}+p_{8,42}+p_{8,106}+p_{8,6} \\ &+2p_{8,70}+p_{8,86}+p_{8,54}+p_{8,118}+p_{8,110}+p_{8,30}+p_{7,126}+p_{8,97} \\ &+p_{8,145}+p_{7,81}+p_{8,137}+3p_{8,149}+p_{8,213}+p_{8,117}+p_{8,173}+p_{8,61} \\ &+p_{8,253}+p_{8,195}+p_{8,179}+p_{8,11}+p_{8,155}+p_{8,123}+p_{8,135}+p_{8,71} \\ &+p_{7,23}+p_{8,111}+2p_{7,95}+p_{7,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,195} = \frac{1}{2}p_{8,195} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,195}^2 - 4(p_{8,0}+p_{8,192}+p_{8,224}+p_{8,48}+p_{8,112}+p_{8,232} \\ &+p_{8,56}+2p_{8,184}+p_{8,248}+p_{8,4}+p_{8,228}+p_{8,20}+p_{8,172}+p_{8,236} \\ &+p_{8,28}+2p_{8,124}+p_{8,18}+p_{8,114}+p_{7,74}+p_{8,170}+p_{8,234}+p_{8,134} \\ &+2p_{8,198}+p_{8,214}+p_{8,182}+p_{8,246}+p_{8,238}+p_{8,158}+p_{7,126} \\ &+p_{8,225}+p_{8,17}+p_{7,81}+p_{8,9}+3p_{8,21}+p_{8,85}+p_{8,245}+p_{8,45} \\ &+p_{8,189}+p_{8,125}+p_{8,67}+p_{8,51}+p_{8,139}+p_{8,27}+p_{8,251}+p_{8,7} \\ &+p_{8,199}+p_{7,23}+p_{8,239}+2p_{7,95}+p_{7,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,451} = \frac{1}{2}p_{8,195} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,195}^2 - 4(p_{8,0}+p_{8,192}+p_{8,224}+p_{8,48}+p_{8,112}+p_{8,232} \\ &+p_{8,56}+2p_{8,184}+p_{8,248}+p_{8,4}+p_{8,228}+p_{8,20}+p_{8,172}+p_{8,236} \\ &+p_{8,28}+2p_{8,124}+p_{8,18}+p_{8,114}+p_{7,74}+p_{8,170}+p_{8,234}+p_{8,134} \\ &+2p_{8,198}+p_{8,214}+p_{8,182}+p_{8,246}+p_{8,238}+p_{8,158}+p_{7,126} \\ &+p_{8,225}+p_{8,17}+p_{7,81}+p_{8,9}+3p_{8,21}+p_{8,85}+p_{8,245}+p_{8,45} \\ &+p_{8,189}+p_{8,125}+p_{8,67}+p_{8,51}+p_{8,139}+p_{8,27}+p_{8,251}+p_{8,7} \\ &+p_{8,199}+p_{7,23}+p_{8,239}+2p_{7,95}+p_{7,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,35} = \frac{1}{2}p_{8,35} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,35}^2 - 4(p_{8,64}+p_{8,32}+p_{8,96}+p_{8,144}+p_{8,208}+p_{8,72} \\ &+2p_{8,24}+p_{8,152}+p_{8,88}+p_{8,68}+p_{8,100}+p_{8,116}+p_{8,12}+p_{8,76} \\ &+2p_{8,220}+p_{8,124}+p_{8,210}+p_{8,114}+p_{8,10}+p_{8,74}+p_{7,42}+2p_{8,38} \\ &+p_{8,230}+p_{8,22}+p_{8,86}+p_{8,54}+p_{8,78}+p_{7,94}+p_{8,254}+p_{8,65} \\ &+p_{7,49}+p_{8,113}+p_{8,105}+p_{8,85}+p_{8,181}+3p_{8,117}+p_{8,141}+p_{8,29} \\ &+p_{8,221}+p_{8,163}+p_{8,147}+p_{8,235}+p_{8,91}+p_{8,123}+p_{8,39}+p_{8,103} \\ &+p_{7,119}+p_{8,79}+p_{7,31}+p_{8,223}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,291} = \frac{1}{2}p_{8,35} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,35}^2 - 4(p_{8,64}+p_{8,32}+p_{8,96}+p_{8,144}+p_{8,208}+p_{8,72} \\ &+2p_{8,24}+p_{8,152}+p_{8,88}+p_{8,68}+p_{8,100}+p_{8,116}+p_{8,12}+p_{8,76} \\ &+2p_{8,220}+p_{8,124}+p_{8,210}+p_{8,114}+p_{8,10}+p_{8,74}+p_{7,42}+2p_{8,38} \\ &+p_{8,230}+p_{8,22}+p_{8,86}+p_{8,54}+p_{8,78}+p_{7,94}+p_{8,254}+p_{8,65} \\ &+p_{7,49}+p_{8,113}+p_{8,105}+p_{8,85}+p_{8,181}+3p_{8,117}+p_{8,141}+p_{8,29} \\ &+p_{8,221}+p_{8,163}+p_{8,147}+p_{8,235}+p_{8,91}+p_{8,123}+p_{8,39}+p_{8,103} \\ &+p_{7,119}+p_{8,79}+p_{7,31}+p_{8,223}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,163} = \frac{1}{2}p_{8,163} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,163}^2 - 4(p_{8,192}+p_{8,160}+p_{8,224}+p_{8,16}+p_{8,80}+p_{8,200} \\ &+p_{8,24}+2p_{8,152}+p_{8,216}+p_{8,196}+p_{8,228}+p_{8,244}+p_{8,140}+p_{8,204} \\ &+2p_{8,92}+p_{8,252}+p_{8,82}+p_{8,242}+p_{8,138}+p_{8,202}+p_{7,42}+2p_{8,166} \\ &+p_{8,102}+p_{8,150}+p_{8,214}+p_{8,182}+p_{8,206}+p_{7,94}+p_{8,126}+p_{8,193} \\ &+p_{7,49}+p_{8,241}+p_{8,233}+p_{8,213}+p_{8,53}+3p_{8,245}+p_{8,13}+p_{8,157} \\ &+p_{8,93}+p_{8,35}+p_{8,19}+p_{8,107}+p_{8,219}+p_{8,251}+p_{8,167}+p_{8,231} \\ &+p_{7,119}+p_{8,207}+p_{7,31}+p_{8,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,419} = \frac{1}{2}p_{8,163} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,163}^2 - 4(p_{8,192}+p_{8,160}+p_{8,224}+p_{8,16}+p_{8,80}+p_{8,200} \\ &+p_{8,24}+2p_{8,152}+p_{8,216}+p_{8,196}+p_{8,228}+p_{8,244}+p_{8,140}+p_{8,204} \\ &+2p_{8,92}+p_{8,252}+p_{8,82}+p_{8,242}+p_{8,138}+p_{8,202}+p_{7,42}+2p_{8,166} \\ &+p_{8,102}+p_{8,150}+p_{8,214}+p_{8,182}+p_{8,206}+p_{7,94}+p_{8,126}+p_{8,193} \\ &+p_{7,49}+p_{8,241}+p_{8,233}+p_{8,213}+p_{8,53}+3p_{8,245}+p_{8,13}+p_{8,157} \\ &+p_{8,93}+p_{8,35}+p_{8,19}+p_{8,107}+p_{8,219}+p_{8,251}+p_{8,167}+p_{8,231} \\ &+p_{7,119}+p_{8,207}+p_{7,31}+p_{8,95}+2p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,99} = \frac{1}{2}p_{8,99} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,99}^2 - 4(p_{8,128}+p_{8,160}+p_{8,96}+p_{8,16}+p_{8,208}+p_{8,136} \\ &+p_{8,152}+2p_{8,88}+p_{8,216}+p_{8,132}+p_{8,164}+p_{8,180}+p_{8,140}+p_{8,76} \\ &+2p_{8,28}+p_{8,188}+p_{8,18}+p_{8,178}+p_{8,138}+p_{8,74}+p_{7,106}+p_{8,38} \\ &+2p_{8,102}+p_{8,150}+p_{8,86}+p_{8,118}+p_{8,142}+p_{7,30}+p_{8,62}+p_{8,129} \\ &+p_{8,177}+p_{7,113}+p_{8,169}+p_{8,149}+3p_{8,181}+p_{8,245}+p_{8,205}+p_{8,29} \\ &+p_{8,93}+p_{8,227}+p_{8,211}+p_{8,43}+p_{8,155}+p_{8,187}+p_{8,167}+p_{8,103} \\ &+p_{7,55}+p_{8,143}+p_{8,31}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,355} = \frac{1}{2}p_{8,99} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,99}^2 - 4(p_{8,128}+p_{8,160}+p_{8,96}+p_{8,16}+p_{8,208}+p_{8,136} \\ &+p_{8,152}+2p_{8,88}+p_{8,216}+p_{8,132}+p_{8,164}+p_{8,180}+p_{8,140}+p_{8,76} \\ &+2p_{8,28}+p_{8,188}+p_{8,18}+p_{8,178}+p_{8,138}+p_{8,74}+p_{7,106}+p_{8,38} \\ &+2p_{8,102}+p_{8,150}+p_{8,86}+p_{8,118}+p_{8,142}+p_{7,30}+p_{8,62}+p_{8,129} \\ &+p_{8,177}+p_{7,113}+p_{8,169}+p_{8,149}+3p_{8,181}+p_{8,245}+p_{8,205}+p_{8,29} \\ &+p_{8,93}+p_{8,227}+p_{8,211}+p_{8,43}+p_{8,155}+p_{8,187}+p_{8,167}+p_{8,103} \\ &+p_{7,55}+p_{8,143}+p_{8,31}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,227} = \frac{1}{2}p_{8,227} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,227}^2 - 4(p_{8,0}+p_{8,32}+p_{8,224}+p_{8,144}+p_{8,80}+p_{8,8} \\ &+p_{8,24}+p_{8,88}+2p_{8,216}+p_{8,4}+p_{8,36}+p_{8,52}+p_{8,12}+p_{8,204} \\ &+2p_{8,156}+p_{8,60}+p_{8,146}+p_{8,50}+p_{8,10}+p_{8,202}+p_{7,106}+p_{8,166} \\ &+2p_{8,230}+p_{8,22}+p_{8,214}+p_{8,246}+p_{8,14}+p_{7,30}+p_{8,190}+p_{8,1} \\ &+p_{8,49}+p_{7,113}+p_{8,41}+p_{8,21}+3p_{8,53}+p_{8,117}+p_{8,77}+p_{8,157} \\ &+p_{8,221}+p_{8,99}+p_{8,83}+p_{8,171}+p_{8,27}+p_{8,59}+p_{8,39}+p_{8,231} \\ &+p_{7,55}+p_{8,15}+p_{8,159}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,483} = \frac{1}{2}p_{8,227} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,227}^2 - 4(p_{8,0}+p_{8,32}+p_{8,224}+p_{8,144}+p_{8,80}+p_{8,8} \\ &+p_{8,24}+p_{8,88}+2p_{8,216}+p_{8,4}+p_{8,36}+p_{8,52}+p_{8,12}+p_{8,204} \\ &+2p_{8,156}+p_{8,60}+p_{8,146}+p_{8,50}+p_{8,10}+p_{8,202}+p_{7,106}+p_{8,166} \\ &+2p_{8,230}+p_{8,22}+p_{8,214}+p_{8,246}+p_{8,14}+p_{7,30}+p_{8,190}+p_{8,1} \\ &+p_{8,49}+p_{7,113}+p_{8,41}+p_{8,21}+3p_{8,53}+p_{8,117}+p_{8,77}+p_{8,157} \\ &+p_{8,221}+p_{8,99}+p_{8,83}+p_{8,171}+p_{8,27}+p_{8,59}+p_{8,39}+p_{8,231} \\ &+p_{7,55}+p_{8,15}+p_{8,159}+p_{7,95}+2p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,19} = \frac{1}{2}p_{8,19} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,19}^2 - 4(p_{8,128}+p_{8,192}+p_{8,16}+p_{8,80}+p_{8,48}+2p_{8,8} \\ &+p_{8,136}+p_{8,72}+p_{8,56}+p_{8,100}+p_{8,84}+p_{8,52}+2p_{8,204}+p_{8,108} \\ &+p_{8,60}+p_{8,252}+p_{8,194}+p_{8,98}+p_{7,26}+p_{8,58}+p_{8,250}+p_{8,6} \\ &+p_{8,70}+p_{8,38}+2p_{8,22}+p_{8,214}+p_{7,78}+p_{8,238}+p_{8,62}+p_{7,33} \\ &+p_{8,97}+p_{8,49}+p_{8,89}+p_{8,69}+p_{8,165}+3p_{8,101}+p_{8,13}+p_{8,205} \\ &+p_{8,125}+p_{8,131}+p_{8,147}+p_{8,75}+p_{8,107}+p_{8,219}+p_{7,103}+p_{8,23} \\ &+p_{8,87}+p_{7,15}+p_{8,207}+2p_{7,47}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,275} = \frac{1}{2}p_{8,19} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,19}^2 - 4(p_{8,128}+p_{8,192}+p_{8,16}+p_{8,80}+p_{8,48}+2p_{8,8} \\ &+p_{8,136}+p_{8,72}+p_{8,56}+p_{8,100}+p_{8,84}+p_{8,52}+2p_{8,204}+p_{8,108} \\ &+p_{8,60}+p_{8,252}+p_{8,194}+p_{8,98}+p_{7,26}+p_{8,58}+p_{8,250}+p_{8,6} \\ &+p_{8,70}+p_{8,38}+2p_{8,22}+p_{8,214}+p_{7,78}+p_{8,238}+p_{8,62}+p_{7,33} \\ &+p_{8,97}+p_{8,49}+p_{8,89}+p_{8,69}+p_{8,165}+3p_{8,101}+p_{8,13}+p_{8,205} \\ &+p_{8,125}+p_{8,131}+p_{8,147}+p_{8,75}+p_{8,107}+p_{8,219}+p_{7,103}+p_{8,23} \\ &+p_{8,87}+p_{7,15}+p_{8,207}+2p_{7,47}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,147} = \frac{1}{2}p_{8,147} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,147}^2 - 4(p_{8,0}+p_{8,64}+p_{8,144}+p_{8,208}+p_{8,176}+p_{8,8} \\ &+2p_{8,136}+p_{8,200}+p_{8,184}+p_{8,228}+p_{8,212}+p_{8,180}+2p_{8,76} \\ &+p_{8,236}+p_{8,188}+p_{8,124}+p_{8,66}+p_{8,226}+p_{7,26}+p_{8,186}+p_{8,122} \\ &+p_{8,134}+p_{8,198}+p_{8,166}+2p_{8,150}+p_{8,86}+p_{7,78}+p_{8,110}+p_{8,190} \\ &+p_{7,33}+p_{8,225}+p_{8,177}+p_{8,217}+p_{8,197}+p_{8,37}+3p_{8,229}+p_{8,141} \\ &+p_{8,77}+p_{8,253}+p_{8,3}+p_{8,19}+p_{8,203}+p_{8,235}+p_{8,91}+p_{7,103} \\ &+p_{8,151}+p_{8,215}+p_{7,15}+p_{8,79}+2p_{7,47}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,403} = \frac{1}{2}p_{8,147} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,147}^2 - 4(p_{8,0}+p_{8,64}+p_{8,144}+p_{8,208}+p_{8,176}+p_{8,8} \\ &+2p_{8,136}+p_{8,200}+p_{8,184}+p_{8,228}+p_{8,212}+p_{8,180}+2p_{8,76} \\ &+p_{8,236}+p_{8,188}+p_{8,124}+p_{8,66}+p_{8,226}+p_{7,26}+p_{8,186}+p_{8,122} \\ &+p_{8,134}+p_{8,198}+p_{8,166}+2p_{8,150}+p_{8,86}+p_{7,78}+p_{8,110}+p_{8,190} \\ &+p_{7,33}+p_{8,225}+p_{8,177}+p_{8,217}+p_{8,197}+p_{8,37}+3p_{8,229}+p_{8,141} \\ &+p_{8,77}+p_{8,253}+p_{8,3}+p_{8,19}+p_{8,203}+p_{8,235}+p_{8,91}+p_{7,103} \\ &+p_{8,151}+p_{8,215}+p_{7,15}+p_{8,79}+2p_{7,47}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,83} = \frac{1}{2}p_{8,83} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,83}^2 - 4(p_{8,0}+p_{8,192}+p_{8,144}+p_{8,80}+p_{8,112}+p_{8,136} \\ &+2p_{8,72}+p_{8,200}+p_{8,120}+p_{8,164}+p_{8,148}+p_{8,116}+2p_{8,12} \\ &+p_{8,172}+p_{8,60}+p_{8,124}+p_{8,2}+p_{8,162}+p_{7,90}+p_{8,58}+p_{8,122} \\ &+p_{8,134}+p_{8,70}+p_{8,102}+p_{8,22}+2p_{8,86}+p_{7,14}+p_{8,46}+p_{8,126} \\ &+p_{8,161}+p_{7,97}+p_{8,113}+p_{8,153}+p_{8,133}+3p_{8,165}+p_{8,229}+p_{8,13} \\ &+p_{8,77}+p_{8,189}+p_{8,195}+p_{8,211}+p_{8,139}+p_{8,171}+p_{8,27}+p_{7,39} \\ &+p_{8,151}+p_{8,87}+p_{8,15}+p_{7,79}+2p_{7,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,339} = \frac{1}{2}p_{8,83} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,83}^2 - 4(p_{8,0}+p_{8,192}+p_{8,144}+p_{8,80}+p_{8,112}+p_{8,136} \\ &+2p_{8,72}+p_{8,200}+p_{8,120}+p_{8,164}+p_{8,148}+p_{8,116}+2p_{8,12} \\ &+p_{8,172}+p_{8,60}+p_{8,124}+p_{8,2}+p_{8,162}+p_{7,90}+p_{8,58}+p_{8,122} \\ &+p_{8,134}+p_{8,70}+p_{8,102}+p_{8,22}+2p_{8,86}+p_{7,14}+p_{8,46}+p_{8,126} \\ &+p_{8,161}+p_{7,97}+p_{8,113}+p_{8,153}+p_{8,133}+3p_{8,165}+p_{8,229}+p_{8,13} \\ &+p_{8,77}+p_{8,189}+p_{8,195}+p_{8,211}+p_{8,139}+p_{8,171}+p_{8,27}+p_{7,39} \\ &+p_{8,151}+p_{8,87}+p_{8,15}+p_{7,79}+2p_{7,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,211} = \frac{1}{2}p_{8,211} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,211}^2 - 4(p_{8,128}+p_{8,64}+p_{8,16}+p_{8,208}+p_{8,240}+p_{8,8} \\ &+p_{8,72}+2p_{8,200}+p_{8,248}+p_{8,36}+p_{8,20}+p_{8,244}+2p_{8,140}+p_{8,44} \\ &+p_{8,188}+p_{8,252}+p_{8,130}+p_{8,34}+p_{7,90}+p_{8,186}+p_{8,250}+p_{8,6} \\ &+p_{8,198}+p_{8,230}+p_{8,150}+2p_{8,214}+p_{7,14}+p_{8,174}+p_{8,254}+p_{8,33} \\ &+p_{7,97}+p_{8,241}+p_{8,25}+p_{8,5}+3p_{8,37}+p_{8,101}+p_{8,141}+p_{8,205} \\ &+p_{8,61}+p_{8,67}+p_{8,83}+p_{8,11}+p_{8,43}+p_{8,155}+p_{7,39}+p_{8,23} \\ &+p_{8,215}+p_{8,143}+p_{7,79}+2p_{7,111}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,467} = \frac{1}{2}p_{8,211} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,211}^2 - 4(p_{8,128}+p_{8,64}+p_{8,16}+p_{8,208}+p_{8,240}+p_{8,8} \\ &+p_{8,72}+2p_{8,200}+p_{8,248}+p_{8,36}+p_{8,20}+p_{8,244}+2p_{8,140}+p_{8,44} \\ &+p_{8,188}+p_{8,252}+p_{8,130}+p_{8,34}+p_{7,90}+p_{8,186}+p_{8,250}+p_{8,6} \\ &+p_{8,198}+p_{8,230}+p_{8,150}+2p_{8,214}+p_{7,14}+p_{8,174}+p_{8,254}+p_{8,33} \\ &+p_{7,97}+p_{8,241}+p_{8,25}+p_{8,5}+3p_{8,37}+p_{8,101}+p_{8,141}+p_{8,205} \\ &+p_{8,61}+p_{8,67}+p_{8,83}+p_{8,11}+p_{8,43}+p_{8,155}+p_{7,39}+p_{8,23} \\ &+p_{8,215}+p_{8,143}+p_{7,79}+2p_{7,111}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,51} = \frac{1}{2}p_{8,51} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,51}^2 - 4(p_{8,160}+p_{8,224}+p_{8,80}+p_{8,48}+p_{8,112}+2p_{8,40} \\ &+p_{8,168}+p_{8,104}+p_{8,88}+p_{8,132}+p_{8,84}+p_{8,116}+p_{8,140}+2p_{8,236} \\ &+p_{8,28}+p_{8,92}+p_{8,130}+p_{8,226}+p_{8,26}+p_{8,90}+p_{7,58}+p_{8,70} \\ &+p_{8,38}+p_{8,102}+2p_{8,54}+p_{8,246}+p_{8,14}+p_{7,110}+p_{8,94}+p_{8,129} \\ &+p_{7,65}+p_{8,81}+p_{8,121}+3p_{8,133}+p_{8,197}+p_{8,101}+p_{8,45}+p_{8,237} \\ &+p_{8,157}+p_{8,163}+p_{8,179}+p_{8,139}+p_{8,107}+p_{8,251}+p_{7,7}+p_{8,55} \\ &+p_{8,119}+2p_{7,79}+p_{7,47}+p_{8,239}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,307} = \frac{1}{2}p_{8,51} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,51}^2 - 4(p_{8,160}+p_{8,224}+p_{8,80}+p_{8,48}+p_{8,112}+2p_{8,40} \\ &+p_{8,168}+p_{8,104}+p_{8,88}+p_{8,132}+p_{8,84}+p_{8,116}+p_{8,140}+2p_{8,236} \\ &+p_{8,28}+p_{8,92}+p_{8,130}+p_{8,226}+p_{8,26}+p_{8,90}+p_{7,58}+p_{8,70} \\ &+p_{8,38}+p_{8,102}+2p_{8,54}+p_{8,246}+p_{8,14}+p_{7,110}+p_{8,94}+p_{8,129} \\ &+p_{7,65}+p_{8,81}+p_{8,121}+3p_{8,133}+p_{8,197}+p_{8,101}+p_{8,45}+p_{8,237} \\ &+p_{8,157}+p_{8,163}+p_{8,179}+p_{8,139}+p_{8,107}+p_{8,251}+p_{7,7}+p_{8,55} \\ &+p_{8,119}+2p_{7,79}+p_{7,47}+p_{8,239}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,179} = \frac{1}{2}p_{8,179} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,179}^2 - 4(p_{8,32}+p_{8,96}+p_{8,208}+p_{8,176}+p_{8,240}+p_{8,40} \\ &+2p_{8,168}+p_{8,232}+p_{8,216}+p_{8,4}+p_{8,212}+p_{8,244}+p_{8,12}+2p_{8,108} \\ &+p_{8,156}+p_{8,220}+p_{8,2}+p_{8,98}+p_{8,154}+p_{8,218}+p_{7,58}+p_{8,198} \\ &+p_{8,166}+p_{8,230}+2p_{8,182}+p_{8,118}+p_{8,142}+p_{7,110}+p_{8,222}+p_{8,1} \\ &+p_{7,65}+p_{8,209}+p_{8,249}+3p_{8,5}+p_{8,69}+p_{8,229}+p_{8,173}+p_{8,109} \\ &+p_{8,29}+p_{8,35}+p_{8,51}+p_{8,11}+p_{8,235}+p_{8,123}+p_{7,7}+p_{8,183} \\ &+p_{8,247}+2p_{7,79}+p_{7,47}+p_{8,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,435} = \frac{1}{2}p_{8,179} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,179}^2 - 4(p_{8,32}+p_{8,96}+p_{8,208}+p_{8,176}+p_{8,240}+p_{8,40} \\ &+2p_{8,168}+p_{8,232}+p_{8,216}+p_{8,4}+p_{8,212}+p_{8,244}+p_{8,12}+2p_{8,108} \\ &+p_{8,156}+p_{8,220}+p_{8,2}+p_{8,98}+p_{8,154}+p_{8,218}+p_{7,58}+p_{8,198} \\ &+p_{8,166}+p_{8,230}+2p_{8,182}+p_{8,118}+p_{8,142}+p_{7,110}+p_{8,222}+p_{8,1} \\ &+p_{7,65}+p_{8,209}+p_{8,249}+3p_{8,5}+p_{8,69}+p_{8,229}+p_{8,173}+p_{8,109} \\ &+p_{8,29}+p_{8,35}+p_{8,51}+p_{8,11}+p_{8,235}+p_{8,123}+p_{7,7}+p_{8,183} \\ &+p_{8,247}+2p_{7,79}+p_{7,47}+p_{8,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,115} = \frac{1}{2}p_{8,115} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,115}^2 - 4(p_{8,32}+p_{8,224}+p_{8,144}+p_{8,176}+p_{8,112}+p_{8,168} \\ &+2p_{8,104}+p_{8,232}+p_{8,152}+p_{8,196}+p_{8,148}+p_{8,180}+p_{8,204} \\ &+2p_{8,44}+p_{8,156}+p_{8,92}+p_{8,194}+p_{8,34}+p_{8,154}+p_{8,90}+p_{7,122} \\ &+p_{8,134}+p_{8,166}+p_{8,102}+p_{8,54}+2p_{8,118}+p_{8,78}+p_{7,46}+p_{8,158} \\ &+p_{7,1}+p_{8,193}+p_{8,145}+p_{8,185}+p_{8,5}+3p_{8,197}+p_{8,165}+p_{8,45} \\ &+p_{8,109}+p_{8,221}+p_{8,227}+p_{8,243}+p_{8,203}+p_{8,171}+p_{8,59}+p_{7,71} \\ &+p_{8,183}+p_{8,119}+2p_{7,15}+p_{8,47}+p_{7,111}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,371} = \frac{1}{2}p_{8,115} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,115}^2 - 4(p_{8,32}+p_{8,224}+p_{8,144}+p_{8,176}+p_{8,112}+p_{8,168} \\ &+2p_{8,104}+p_{8,232}+p_{8,152}+p_{8,196}+p_{8,148}+p_{8,180}+p_{8,204} \\ &+2p_{8,44}+p_{8,156}+p_{8,92}+p_{8,194}+p_{8,34}+p_{8,154}+p_{8,90}+p_{7,122} \\ &+p_{8,134}+p_{8,166}+p_{8,102}+p_{8,54}+2p_{8,118}+p_{8,78}+p_{7,46}+p_{8,158} \\ &+p_{7,1}+p_{8,193}+p_{8,145}+p_{8,185}+p_{8,5}+3p_{8,197}+p_{8,165}+p_{8,45} \\ &+p_{8,109}+p_{8,221}+p_{8,227}+p_{8,243}+p_{8,203}+p_{8,171}+p_{8,59}+p_{7,71} \\ &+p_{8,183}+p_{8,119}+2p_{7,15}+p_{8,47}+p_{7,111}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,243} = \frac{1}{2}p_{8,243} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,243}^2 - 4(p_{8,160}+p_{8,96}+p_{8,16}+p_{8,48}+p_{8,240}+p_{8,40} \\ &+p_{8,104}+2p_{8,232}+p_{8,24}+p_{8,68}+p_{8,20}+p_{8,52}+p_{8,76}+2p_{8,172} \\ &+p_{8,28}+p_{8,220}+p_{8,66}+p_{8,162}+p_{8,26}+p_{8,218}+p_{7,122}+p_{8,6} \\ &+p_{8,38}+p_{8,230}+p_{8,182}+2p_{8,246}+p_{8,206}+p_{7,46}+p_{8,30}+p_{7,1} \\ &+p_{8,65}+p_{8,17}+p_{8,57}+p_{8,133}+3p_{8,69}+p_{8,37}+p_{8,173}+p_{8,237} \\ &+p_{8,93}+p_{8,99}+p_{8,115}+p_{8,75}+p_{8,43}+p_{8,187}+p_{7,71}+p_{8,55} \\ &+p_{8,247}+2p_{7,15}+p_{8,175}+p_{7,111}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,499} = \frac{1}{2}p_{8,243} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,243}^2 - 4(p_{8,160}+p_{8,96}+p_{8,16}+p_{8,48}+p_{8,240}+p_{8,40} \\ &+p_{8,104}+2p_{8,232}+p_{8,24}+p_{8,68}+p_{8,20}+p_{8,52}+p_{8,76}+2p_{8,172} \\ &+p_{8,28}+p_{8,220}+p_{8,66}+p_{8,162}+p_{8,26}+p_{8,218}+p_{7,122}+p_{8,6} \\ &+p_{8,38}+p_{8,230}+p_{8,182}+2p_{8,246}+p_{8,206}+p_{7,46}+p_{8,30}+p_{7,1} \\ &+p_{8,65}+p_{8,17}+p_{8,57}+p_{8,133}+3p_{8,69}+p_{8,37}+p_{8,173}+p_{8,237} \\ &+p_{8,93}+p_{8,99}+p_{8,115}+p_{8,75}+p_{8,43}+p_{8,187}+p_{7,71}+p_{8,55} \\ &+p_{8,247}+2p_{7,15}+p_{8,175}+p_{7,111}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,11} = \frac{1}{2}p_{8,11} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,11}^2 - 4(2p_{8,0}+p_{8,128}+p_{8,64}+p_{8,48}+p_{8,8}+p_{8,72} \\ &+p_{8,40}+p_{8,184}+p_{8,120}+2p_{8,196}+p_{8,100}+p_{8,52}+p_{8,244} \\ &+p_{8,76}+p_{8,44}+p_{8,92}+p_{7,18}+p_{8,50}+p_{8,242}+p_{8,90}+p_{8,186} \\ &+p_{7,70}+p_{8,230}+p_{8,54}+2p_{8,14}+p_{8,206}+p_{8,30}+p_{8,62}+p_{8,254} \\ &+p_{8,81}+p_{8,41}+p_{7,25}+p_{8,89}+p_{8,5}+p_{8,197}+p_{8,117}+p_{8,157} \\ &+3p_{8,93}+p_{8,61}+p_{8,67}+p_{8,99}+p_{8,211}+p_{8,139}+p_{8,123}+p_{7,7} \\ &+p_{8,199}+2p_{7,39}+p_{8,55}+p_{8,15}+p_{8,79}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,267} = \frac{1}{2}p_{8,11} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,11}^2 - 4(2p_{8,0}+p_{8,128}+p_{8,64}+p_{8,48}+p_{8,8}+p_{8,72} \\ &+p_{8,40}+p_{8,184}+p_{8,120}+2p_{8,196}+p_{8,100}+p_{8,52}+p_{8,244} \\ &+p_{8,76}+p_{8,44}+p_{8,92}+p_{7,18}+p_{8,50}+p_{8,242}+p_{8,90}+p_{8,186} \\ &+p_{7,70}+p_{8,230}+p_{8,54}+2p_{8,14}+p_{8,206}+p_{8,30}+p_{8,62}+p_{8,254} \\ &+p_{8,81}+p_{8,41}+p_{7,25}+p_{8,89}+p_{8,5}+p_{8,197}+p_{8,117}+p_{8,157} \\ &+3p_{8,93}+p_{8,61}+p_{8,67}+p_{8,99}+p_{8,211}+p_{8,139}+p_{8,123}+p_{7,7} \\ &+p_{8,199}+2p_{7,39}+p_{8,55}+p_{8,15}+p_{8,79}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,139} = \frac{1}{2}p_{8,139} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,139}^2 - 4(p_{8,0}+2p_{8,128}+p_{8,192}+p_{8,176}+p_{8,136}+p_{8,200} \\ &+p_{8,168}+p_{8,56}+p_{8,248}+2p_{8,68}+p_{8,228}+p_{8,180}+p_{8,116}+p_{8,204} \\ &+p_{8,172}+p_{8,220}+p_{7,18}+p_{8,178}+p_{8,114}+p_{8,218}+p_{8,58}+p_{7,70} \\ &+p_{8,102}+p_{8,182}+2p_{8,142}+p_{8,78}+p_{8,158}+p_{8,190}+p_{8,126}+p_{8,209} \\ &+p_{8,169}+p_{7,25}+p_{8,217}+p_{8,133}+p_{8,69}+p_{8,245}+p_{8,29}+3p_{8,221} \\ &+p_{8,189}+p_{8,195}+p_{8,227}+p_{8,83}+p_{8,11}+p_{8,251}+p_{7,7}+p_{8,71} \\ &+2p_{7,39}+p_{8,183}+p_{8,143}+p_{8,207}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,395} = \frac{1}{2}p_{8,139} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,139}^2 - 4(p_{8,0}+2p_{8,128}+p_{8,192}+p_{8,176}+p_{8,136}+p_{8,200} \\ &+p_{8,168}+p_{8,56}+p_{8,248}+2p_{8,68}+p_{8,228}+p_{8,180}+p_{8,116}+p_{8,204} \\ &+p_{8,172}+p_{8,220}+p_{7,18}+p_{8,178}+p_{8,114}+p_{8,218}+p_{8,58}+p_{7,70} \\ &+p_{8,102}+p_{8,182}+2p_{8,142}+p_{8,78}+p_{8,158}+p_{8,190}+p_{8,126}+p_{8,209} \\ &+p_{8,169}+p_{7,25}+p_{8,217}+p_{8,133}+p_{8,69}+p_{8,245}+p_{8,29}+3p_{8,221} \\ &+p_{8,189}+p_{8,195}+p_{8,227}+p_{8,83}+p_{8,11}+p_{8,251}+p_{7,7}+p_{8,71} \\ &+2p_{7,39}+p_{8,183}+p_{8,143}+p_{8,207}+p_{7,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,75} = \frac{1}{2}p_{8,75} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,75}^2 - 4(p_{8,128}+2p_{8,64}+p_{8,192}+p_{8,112}+p_{8,136}+p_{8,72} \\ &+p_{8,104}+p_{8,184}+p_{8,248}+2p_{8,4}+p_{8,164}+p_{8,52}+p_{8,116}+p_{8,140} \\ &+p_{8,108}+p_{8,156}+p_{7,82}+p_{8,50}+p_{8,114}+p_{8,154}+p_{8,250}+p_{7,6} \\ &+p_{8,38}+p_{8,118}+p_{8,14}+2p_{8,78}+p_{8,94}+p_{8,62}+p_{8,126}+p_{8,145} \\ &+p_{8,105}+p_{8,153}+p_{7,89}+p_{8,5}+p_{8,69}+p_{8,181}+3p_{8,157}+p_{8,221} \\ &+p_{8,125}+p_{8,131}+p_{8,163}+p_{8,19}+p_{8,203}+p_{8,187}+p_{8,7}+p_{7,71} \\ &+2p_{7,103}+p_{8,119}+p_{8,143}+p_{8,79}+p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,331} = \frac{1}{2}p_{8,75} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,75}^2 - 4(p_{8,128}+2p_{8,64}+p_{8,192}+p_{8,112}+p_{8,136}+p_{8,72} \\ &+p_{8,104}+p_{8,184}+p_{8,248}+2p_{8,4}+p_{8,164}+p_{8,52}+p_{8,116}+p_{8,140} \\ &+p_{8,108}+p_{8,156}+p_{7,82}+p_{8,50}+p_{8,114}+p_{8,154}+p_{8,250}+p_{7,6} \\ &+p_{8,38}+p_{8,118}+p_{8,14}+2p_{8,78}+p_{8,94}+p_{8,62}+p_{8,126}+p_{8,145} \\ &+p_{8,105}+p_{8,153}+p_{7,89}+p_{8,5}+p_{8,69}+p_{8,181}+3p_{8,157}+p_{8,221} \\ &+p_{8,125}+p_{8,131}+p_{8,163}+p_{8,19}+p_{8,203}+p_{8,187}+p_{8,7}+p_{7,71} \\ &+2p_{7,103}+p_{8,119}+p_{8,143}+p_{8,79}+p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,203} = \frac{1}{2}p_{8,203} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,203}^2 - 4(p_{8,0}+p_{8,64}+2p_{8,192}+p_{8,240}+p_{8,8}+p_{8,200} \\ &+p_{8,232}+p_{8,56}+p_{8,120}+2p_{8,132}+p_{8,36}+p_{8,180}+p_{8,244}+p_{8,12} \\ &+p_{8,236}+p_{8,28}+p_{7,82}+p_{8,178}+p_{8,242}+p_{8,26}+p_{8,122}+p_{7,6} \\ &+p_{8,166}+p_{8,246}+p_{8,142}+2p_{8,206}+p_{8,222}+p_{8,190}+p_{8,254} \\ &+p_{8,17}+p_{8,233}+p_{8,25}+p_{7,89}+p_{8,133}+p_{8,197}+p_{8,53}+3p_{8,29} \\ &+p_{8,93}+p_{8,253}+p_{8,3}+p_{8,35}+p_{8,147}+p_{8,75}+p_{8,59}+p_{8,135} \\ &+p_{7,71}+2p_{7,103}+p_{8,247}+p_{8,15}+p_{8,207}+p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,459} = \frac{1}{2}p_{8,203} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,203}^2 - 4(p_{8,0}+p_{8,64}+2p_{8,192}+p_{8,240}+p_{8,8}+p_{8,200} \\ &+p_{8,232}+p_{8,56}+p_{8,120}+2p_{8,132}+p_{8,36}+p_{8,180}+p_{8,244}+p_{8,12} \\ &+p_{8,236}+p_{8,28}+p_{7,82}+p_{8,178}+p_{8,242}+p_{8,26}+p_{8,122}+p_{7,6} \\ &+p_{8,166}+p_{8,246}+p_{8,142}+2p_{8,206}+p_{8,222}+p_{8,190}+p_{8,254} \\ &+p_{8,17}+p_{8,233}+p_{8,25}+p_{7,89}+p_{8,133}+p_{8,197}+p_{8,53}+3p_{8,29} \\ &+p_{8,93}+p_{8,253}+p_{8,3}+p_{8,35}+p_{8,147}+p_{8,75}+p_{8,59}+p_{8,135} \\ &+p_{7,71}+2p_{7,103}+p_{8,247}+p_{8,15}+p_{8,207}+p_{7,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,43} = \frac{1}{2}p_{8,43} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,43}^2 - 4(2p_{8,32}+p_{8,160}+p_{8,96}+p_{8,80}+p_{8,72}+p_{8,40} \\ &+p_{8,104}+p_{8,152}+p_{8,216}+p_{8,132}+2p_{8,228}+p_{8,20}+p_{8,84}+p_{8,76} \\ &+p_{8,108}+p_{8,124}+p_{8,18}+p_{8,82}+p_{7,50}+p_{8,218}+p_{8,122}+p_{8,6} \\ &+p_{7,102}+p_{8,86}+2p_{8,46}+p_{8,238}+p_{8,30}+p_{8,94}+p_{8,62}+p_{8,113} \\ &+p_{8,73}+p_{7,57}+p_{8,121}+p_{8,37}+p_{8,229}+p_{8,149}+p_{8,93}+p_{8,189} \\ &+3p_{8,125}+p_{8,131}+p_{8,99}+p_{8,243}+p_{8,171}+p_{8,155}+2p_{7,71} \\ &+p_{7,39}+p_{8,231}+p_{8,87}+p_{8,47}+p_{8,111}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,299} = \frac{1}{2}p_{8,43} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,43}^2 - 4(2p_{8,32}+p_{8,160}+p_{8,96}+p_{8,80}+p_{8,72}+p_{8,40} \\ &+p_{8,104}+p_{8,152}+p_{8,216}+p_{8,132}+2p_{8,228}+p_{8,20}+p_{8,84}+p_{8,76} \\ &+p_{8,108}+p_{8,124}+p_{8,18}+p_{8,82}+p_{7,50}+p_{8,218}+p_{8,122}+p_{8,6} \\ &+p_{7,102}+p_{8,86}+2p_{8,46}+p_{8,238}+p_{8,30}+p_{8,94}+p_{8,62}+p_{8,113} \\ &+p_{8,73}+p_{7,57}+p_{8,121}+p_{8,37}+p_{8,229}+p_{8,149}+p_{8,93}+p_{8,189} \\ &+3p_{8,125}+p_{8,131}+p_{8,99}+p_{8,243}+p_{8,171}+p_{8,155}+2p_{7,71} \\ &+p_{7,39}+p_{8,231}+p_{8,87}+p_{8,47}+p_{8,111}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,171} = \frac{1}{2}p_{8,171} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,171}^2 - 4(p_{8,32}+2p_{8,160}+p_{8,224}+p_{8,208}+p_{8,200}+p_{8,168} \\ &+p_{8,232}+p_{8,24}+p_{8,88}+p_{8,4}+2p_{8,100}+p_{8,148}+p_{8,212}+p_{8,204} \\ &+p_{8,236}+p_{8,252}+p_{8,146}+p_{8,210}+p_{7,50}+p_{8,90}+p_{8,250}+p_{8,134} \\ &+p_{7,102}+p_{8,214}+2p_{8,174}+p_{8,110}+p_{8,158}+p_{8,222}+p_{8,190} \\ &+p_{8,241}+p_{8,201}+p_{7,57}+p_{8,249}+p_{8,165}+p_{8,101}+p_{8,21}+p_{8,221} \\ &+p_{8,61}+3p_{8,253}+p_{8,3}+p_{8,227}+p_{8,115}+p_{8,43}+p_{8,27}+2p_{7,71} \\ &+p_{7,39}+p_{8,103}+p_{8,215}+p_{8,175}+p_{8,239}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,427} = \frac{1}{2}p_{8,171} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,171}^2 - 4(p_{8,32}+2p_{8,160}+p_{8,224}+p_{8,208}+p_{8,200}+p_{8,168} \\ &+p_{8,232}+p_{8,24}+p_{8,88}+p_{8,4}+2p_{8,100}+p_{8,148}+p_{8,212}+p_{8,204} \\ &+p_{8,236}+p_{8,252}+p_{8,146}+p_{8,210}+p_{7,50}+p_{8,90}+p_{8,250}+p_{8,134} \\ &+p_{7,102}+p_{8,214}+2p_{8,174}+p_{8,110}+p_{8,158}+p_{8,222}+p_{8,190} \\ &+p_{8,241}+p_{8,201}+p_{7,57}+p_{8,249}+p_{8,165}+p_{8,101}+p_{8,21}+p_{8,221} \\ &+p_{8,61}+3p_{8,253}+p_{8,3}+p_{8,227}+p_{8,115}+p_{8,43}+p_{8,27}+2p_{7,71} \\ &+p_{7,39}+p_{8,103}+p_{8,215}+p_{8,175}+p_{8,239}+p_{7,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,107} = \frac{1}{2}p_{8,107} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,107}^2 - 4(p_{8,160}+2p_{8,96}+p_{8,224}+p_{8,144}+p_{8,136}+p_{8,168} \\ &+p_{8,104}+p_{8,24}+p_{8,216}+p_{8,196}+2p_{8,36}+p_{8,148}+p_{8,84}+p_{8,140} \\ &+p_{8,172}+p_{8,188}+p_{8,146}+p_{8,82}+p_{7,114}+p_{8,26}+p_{8,186}+p_{8,70} \\ &+p_{7,38}+p_{8,150}+p_{8,46}+2p_{8,110}+p_{8,158}+p_{8,94}+p_{8,126}+p_{8,177} \\ &+p_{8,137}+p_{8,185}+p_{7,121}+p_{8,37}+p_{8,101}+p_{8,213}+p_{8,157}+3p_{8,189} \\ &+p_{8,253}+p_{8,195}+p_{8,163}+p_{8,51}+p_{8,235}+p_{8,219}+2p_{7,7}+p_{8,39} \\ &+p_{7,103}+p_{8,151}+p_{8,175}+p_{8,111}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,363} = \frac{1}{2}p_{8,107} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,107}^2 - 4(p_{8,160}+2p_{8,96}+p_{8,224}+p_{8,144}+p_{8,136}+p_{8,168} \\ &+p_{8,104}+p_{8,24}+p_{8,216}+p_{8,196}+2p_{8,36}+p_{8,148}+p_{8,84}+p_{8,140} \\ &+p_{8,172}+p_{8,188}+p_{8,146}+p_{8,82}+p_{7,114}+p_{8,26}+p_{8,186}+p_{8,70} \\ &+p_{7,38}+p_{8,150}+p_{8,46}+2p_{8,110}+p_{8,158}+p_{8,94}+p_{8,126}+p_{8,177} \\ &+p_{8,137}+p_{8,185}+p_{7,121}+p_{8,37}+p_{8,101}+p_{8,213}+p_{8,157}+3p_{8,189} \\ &+p_{8,253}+p_{8,195}+p_{8,163}+p_{8,51}+p_{8,235}+p_{8,219}+2p_{7,7}+p_{8,39} \\ &+p_{7,103}+p_{8,151}+p_{8,175}+p_{8,111}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,235} = \frac{1}{2}p_{8,235} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,235}^2 - 4(p_{8,32}+p_{8,96}+2p_{8,224}+p_{8,16}+p_{8,8}+p_{8,40} \\ &+p_{8,232}+p_{8,152}+p_{8,88}+p_{8,68}+2p_{8,164}+p_{8,20}+p_{8,212}+p_{8,12} \\ &+p_{8,44}+p_{8,60}+p_{8,18}+p_{8,210}+p_{7,114}+p_{8,154}+p_{8,58}+p_{8,198} \\ &+p_{7,38}+p_{8,22}+p_{8,174}+2p_{8,238}+p_{8,30}+p_{8,222}+p_{8,254}+p_{8,49} \\ &+p_{8,9}+p_{8,57}+p_{7,121}+p_{8,165}+p_{8,229}+p_{8,85}+p_{8,29}+3p_{8,61} \\ &+p_{8,125}+p_{8,67}+p_{8,35}+p_{8,179}+p_{8,107}+p_{8,91}+2p_{7,7}+p_{8,167} \\ &+p_{7,103}+p_{8,23}+p_{8,47}+p_{8,239}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,491} = \frac{1}{2}p_{8,235} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,235}^2 - 4(p_{8,32}+p_{8,96}+2p_{8,224}+p_{8,16}+p_{8,8}+p_{8,40} \\ &+p_{8,232}+p_{8,152}+p_{8,88}+p_{8,68}+2p_{8,164}+p_{8,20}+p_{8,212}+p_{8,12} \\ &+p_{8,44}+p_{8,60}+p_{8,18}+p_{8,210}+p_{7,114}+p_{8,154}+p_{8,58}+p_{8,198} \\ &+p_{7,38}+p_{8,22}+p_{8,174}+2p_{8,238}+p_{8,30}+p_{8,222}+p_{8,254}+p_{8,49} \\ &+p_{8,9}+p_{8,57}+p_{7,121}+p_{8,165}+p_{8,229}+p_{8,85}+p_{8,29}+3p_{8,61} \\ &+p_{8,125}+p_{8,67}+p_{8,35}+p_{8,179}+p_{8,107}+p_{8,91}+2p_{7,7}+p_{8,167} \\ &+p_{7,103}+p_{8,23}+p_{8,47}+p_{8,239}+p_{7,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,27} = \frac{1}{2}p_{8,27} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,27}^2 - 4(p_{8,64}+2p_{8,16}+p_{8,144}+p_{8,80}+p_{8,136}+p_{8,200} \\ &+p_{8,24}+p_{8,88}+p_{8,56}+p_{8,4}+p_{8,68}+2p_{8,212}+p_{8,116}+p_{8,108} \\ &+p_{8,92}+p_{8,60}+p_{8,2}+p_{8,66}+p_{7,34}+p_{8,202}+p_{8,106}+p_{8,70} \\ &+p_{7,86}+p_{8,246}+p_{8,14}+p_{8,78}+p_{8,46}+2p_{8,30}+p_{8,222}+p_{8,97} \\ &+p_{7,41}+p_{8,105}+p_{8,57}+p_{8,133}+p_{8,21}+p_{8,213}+p_{8,77}+p_{8,173} \\ &+3p_{8,109}+p_{8,227}+p_{8,83}+p_{8,115}+p_{8,139}+p_{8,155}+p_{8,71}+p_{7,23} \\ &+p_{8,215}+2p_{7,55}+p_{7,111}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,283} = \frac{1}{2}p_{8,27} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,27}^2 - 4(p_{8,64}+2p_{8,16}+p_{8,144}+p_{8,80}+p_{8,136}+p_{8,200} \\ &+p_{8,24}+p_{8,88}+p_{8,56}+p_{8,4}+p_{8,68}+2p_{8,212}+p_{8,116}+p_{8,108} \\ &+p_{8,92}+p_{8,60}+p_{8,2}+p_{8,66}+p_{7,34}+p_{8,202}+p_{8,106}+p_{8,70} \\ &+p_{7,86}+p_{8,246}+p_{8,14}+p_{8,78}+p_{8,46}+2p_{8,30}+p_{8,222}+p_{8,97} \\ &+p_{7,41}+p_{8,105}+p_{8,57}+p_{8,133}+p_{8,21}+p_{8,213}+p_{8,77}+p_{8,173} \\ &+3p_{8,109}+p_{8,227}+p_{8,83}+p_{8,115}+p_{8,139}+p_{8,155}+p_{8,71}+p_{7,23} \\ &+p_{8,215}+2p_{7,55}+p_{7,111}+p_{8,31}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,155} = \frac{1}{2}p_{8,155} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,155}^2 - 4(p_{8,192}+p_{8,16}+2p_{8,144}+p_{8,208}+p_{8,8}+p_{8,72} \\ &+p_{8,152}+p_{8,216}+p_{8,184}+p_{8,132}+p_{8,196}+2p_{8,84}+p_{8,244}+p_{8,236} \\ &+p_{8,220}+p_{8,188}+p_{8,130}+p_{8,194}+p_{7,34}+p_{8,74}+p_{8,234}+p_{8,198} \\ &+p_{7,86}+p_{8,118}+p_{8,142}+p_{8,206}+p_{8,174}+2p_{8,158}+p_{8,94}+p_{8,225} \\ &+p_{7,41}+p_{8,233}+p_{8,185}+p_{8,5}+p_{8,149}+p_{8,85}+p_{8,205}+p_{8,45} \\ &+3p_{8,237}+p_{8,99}+p_{8,211}+p_{8,243}+p_{8,11}+p_{8,27}+p_{8,199}+p_{7,23} \\ &+p_{8,87}+2p_{7,55}+p_{7,111}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,411} = \frac{1}{2}p_{8,155} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,155}^2 - 4(p_{8,192}+p_{8,16}+2p_{8,144}+p_{8,208}+p_{8,8}+p_{8,72} \\ &+p_{8,152}+p_{8,216}+p_{8,184}+p_{8,132}+p_{8,196}+2p_{8,84}+p_{8,244}+p_{8,236} \\ &+p_{8,220}+p_{8,188}+p_{8,130}+p_{8,194}+p_{7,34}+p_{8,74}+p_{8,234}+p_{8,198} \\ &+p_{7,86}+p_{8,118}+p_{8,142}+p_{8,206}+p_{8,174}+2p_{8,158}+p_{8,94}+p_{8,225} \\ &+p_{7,41}+p_{8,233}+p_{8,185}+p_{8,5}+p_{8,149}+p_{8,85}+p_{8,205}+p_{8,45} \\ &+3p_{8,237}+p_{8,99}+p_{8,211}+p_{8,243}+p_{8,11}+p_{8,27}+p_{8,199}+p_{7,23} \\ &+p_{8,87}+2p_{7,55}+p_{7,111}+p_{8,159}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,91} = \frac{1}{2}p_{8,91} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,91}^2 - 4(p_{8,128}+p_{8,144}+2p_{8,80}+p_{8,208}+p_{8,8}+p_{8,200} \\ &+p_{8,152}+p_{8,88}+p_{8,120}+p_{8,132}+p_{8,68}+2p_{8,20}+p_{8,180}+p_{8,172} \\ &+p_{8,156}+p_{8,124}+p_{8,130}+p_{8,66}+p_{7,98}+p_{8,10}+p_{8,170}+p_{8,134} \\ &+p_{7,22}+p_{8,54}+p_{8,142}+p_{8,78}+p_{8,110}+p_{8,30}+2p_{8,94}+p_{8,161} \\ &+p_{8,169}+p_{7,105}+p_{8,121}+p_{8,197}+p_{8,21}+p_{8,85}+p_{8,141}+3p_{8,173} \\ &+p_{8,237}+p_{8,35}+p_{8,147}+p_{8,179}+p_{8,203}+p_{8,219}+p_{8,135}+p_{8,23} \\ &+p_{7,87}+2p_{7,119}+p_{7,47}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,347} = \frac{1}{2}p_{8,91} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,91}^2 - 4(p_{8,128}+p_{8,144}+2p_{8,80}+p_{8,208}+p_{8,8}+p_{8,200} \\ &+p_{8,152}+p_{8,88}+p_{8,120}+p_{8,132}+p_{8,68}+2p_{8,20}+p_{8,180}+p_{8,172} \\ &+p_{8,156}+p_{8,124}+p_{8,130}+p_{8,66}+p_{7,98}+p_{8,10}+p_{8,170}+p_{8,134} \\ &+p_{7,22}+p_{8,54}+p_{8,142}+p_{8,78}+p_{8,110}+p_{8,30}+2p_{8,94}+p_{8,161} \\ &+p_{8,169}+p_{7,105}+p_{8,121}+p_{8,197}+p_{8,21}+p_{8,85}+p_{8,141}+3p_{8,173} \\ &+p_{8,237}+p_{8,35}+p_{8,147}+p_{8,179}+p_{8,203}+p_{8,219}+p_{8,135}+p_{8,23} \\ &+p_{7,87}+2p_{7,119}+p_{7,47}+p_{8,159}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,219} = \frac{1}{2}p_{8,219} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,219}^2 - 4(p_{8,0}+p_{8,16}+p_{8,80}+2p_{8,208}+p_{8,136}+p_{8,72} \\ &+p_{8,24}+p_{8,216}+p_{8,248}+p_{8,4}+p_{8,196}+2p_{8,148}+p_{8,52}+p_{8,44} \\ &+p_{8,28}+p_{8,252}+p_{8,2}+p_{8,194}+p_{7,98}+p_{8,138}+p_{8,42}+p_{8,6} \\ &+p_{7,22}+p_{8,182}+p_{8,14}+p_{8,206}+p_{8,238}+p_{8,158}+2p_{8,222}+p_{8,33} \\ &+p_{8,41}+p_{7,105}+p_{8,249}+p_{8,69}+p_{8,149}+p_{8,213}+p_{8,13}+3p_{8,45} \\ &+p_{8,109}+p_{8,163}+p_{8,19}+p_{8,51}+p_{8,75}+p_{8,91}+p_{8,7}+p_{8,151} \\ &+p_{7,87}+2p_{7,119}+p_{7,47}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,475} = \frac{1}{2}p_{8,219} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,219}^2 - 4(p_{8,0}+p_{8,16}+p_{8,80}+2p_{8,208}+p_{8,136}+p_{8,72} \\ &+p_{8,24}+p_{8,216}+p_{8,248}+p_{8,4}+p_{8,196}+2p_{8,148}+p_{8,52}+p_{8,44} \\ &+p_{8,28}+p_{8,252}+p_{8,2}+p_{8,194}+p_{7,98}+p_{8,138}+p_{8,42}+p_{8,6} \\ &+p_{7,22}+p_{8,182}+p_{8,14}+p_{8,206}+p_{8,238}+p_{8,158}+2p_{8,222}+p_{8,33} \\ &+p_{8,41}+p_{7,105}+p_{8,249}+p_{8,69}+p_{8,149}+p_{8,213}+p_{8,13}+3p_{8,45} \\ &+p_{8,109}+p_{8,163}+p_{8,19}+p_{8,51}+p_{8,75}+p_{8,91}+p_{8,7}+p_{8,151} \\ &+p_{7,87}+2p_{7,119}+p_{7,47}+p_{8,31}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,59} = \frac{1}{2}p_{8,59} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,59}^2 - 4(p_{8,96}+2p_{8,48}+p_{8,176}+p_{8,112}+p_{8,168}+p_{8,232} \\ &+p_{8,88}+p_{8,56}+p_{8,120}+p_{8,36}+p_{8,100}+p_{8,148}+2p_{8,244}+p_{8,140} \\ &+p_{8,92}+p_{8,124}+p_{7,66}+p_{8,34}+p_{8,98}+p_{8,138}+p_{8,234}+p_{8,102} \\ &+p_{8,22}+p_{7,118}+p_{8,78}+p_{8,46}+p_{8,110}+2p_{8,62}+p_{8,254}+p_{8,129} \\ &+p_{8,137}+p_{7,73}+p_{8,89}+p_{8,165}+p_{8,53}+p_{8,245}+3p_{8,141}+p_{8,205} \\ &+p_{8,109}+p_{8,3}+p_{8,147}+p_{8,115}+p_{8,171}+p_{8,187}+p_{8,103}+2p_{7,87} \\ &+p_{7,55}+p_{8,247}+p_{7,15}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,315} = \frac{1}{2}p_{8,59} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,59}^2 - 4(p_{8,96}+2p_{8,48}+p_{8,176}+p_{8,112}+p_{8,168}+p_{8,232} \\ &+p_{8,88}+p_{8,56}+p_{8,120}+p_{8,36}+p_{8,100}+p_{8,148}+2p_{8,244}+p_{8,140} \\ &+p_{8,92}+p_{8,124}+p_{7,66}+p_{8,34}+p_{8,98}+p_{8,138}+p_{8,234}+p_{8,102} \\ &+p_{8,22}+p_{7,118}+p_{8,78}+p_{8,46}+p_{8,110}+2p_{8,62}+p_{8,254}+p_{8,129} \\ &+p_{8,137}+p_{7,73}+p_{8,89}+p_{8,165}+p_{8,53}+p_{8,245}+3p_{8,141}+p_{8,205} \\ &+p_{8,109}+p_{8,3}+p_{8,147}+p_{8,115}+p_{8,171}+p_{8,187}+p_{8,103}+2p_{7,87} \\ &+p_{7,55}+p_{8,247}+p_{7,15}+p_{8,63}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,187} = \frac{1}{2}p_{8,187} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,187}^2 - 4(p_{8,224}+p_{8,48}+2p_{8,176}+p_{8,240}+p_{8,40}+p_{8,104} \\ &+p_{8,216}+p_{8,184}+p_{8,248}+p_{8,164}+p_{8,228}+p_{8,20}+2p_{8,116}+p_{8,12} \\ &+p_{8,220}+p_{8,252}+p_{7,66}+p_{8,162}+p_{8,226}+p_{8,10}+p_{8,106}+p_{8,230} \\ &+p_{8,150}+p_{7,118}+p_{8,206}+p_{8,174}+p_{8,238}+2p_{8,190}+p_{8,126}+p_{8,1} \\ &+p_{8,9}+p_{7,73}+p_{8,217}+p_{8,37}+p_{8,181}+p_{8,117}+3p_{8,13}+p_{8,77} \\ &+p_{8,237}+p_{8,131}+p_{8,19}+p_{8,243}+p_{8,43}+p_{8,59}+p_{8,231}+2p_{7,87} \\ &+p_{7,55}+p_{8,119}+p_{7,15}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,443} = \frac{1}{2}p_{8,187} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,187}^2 - 4(p_{8,224}+p_{8,48}+2p_{8,176}+p_{8,240}+p_{8,40}+p_{8,104} \\ &+p_{8,216}+p_{8,184}+p_{8,248}+p_{8,164}+p_{8,228}+p_{8,20}+2p_{8,116}+p_{8,12} \\ &+p_{8,220}+p_{8,252}+p_{7,66}+p_{8,162}+p_{8,226}+p_{8,10}+p_{8,106}+p_{8,230} \\ &+p_{8,150}+p_{7,118}+p_{8,206}+p_{8,174}+p_{8,238}+2p_{8,190}+p_{8,126}+p_{8,1} \\ &+p_{8,9}+p_{7,73}+p_{8,217}+p_{8,37}+p_{8,181}+p_{8,117}+3p_{8,13}+p_{8,77} \\ &+p_{8,237}+p_{8,131}+p_{8,19}+p_{8,243}+p_{8,43}+p_{8,59}+p_{8,231}+2p_{7,87} \\ &+p_{7,55}+p_{8,119}+p_{7,15}+p_{8,191}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,123} = \frac{1}{2}p_{8,123} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,123}^2 - 4(p_{8,160}+p_{8,176}+2p_{8,112}+p_{8,240}+p_{8,40}+p_{8,232} \\ &+p_{8,152}+p_{8,184}+p_{8,120}+p_{8,164}+p_{8,100}+p_{8,212}+2p_{8,52}+p_{8,204} \\ &+p_{8,156}+p_{8,188}+p_{7,2}+p_{8,162}+p_{8,98}+p_{8,202}+p_{8,42}+p_{8,166} \\ &+p_{8,86}+p_{7,54}+p_{8,142}+p_{8,174}+p_{8,110}+p_{8,62}+2p_{8,126}+p_{8,193} \\ &+p_{7,9}+p_{8,201}+p_{8,153}+p_{8,229}+p_{8,53}+p_{8,117}+p_{8,13}+3p_{8,205} \\ &+p_{8,173}+p_{8,67}+p_{8,211}+p_{8,179}+p_{8,235}+p_{8,251}+p_{8,167}+2p_{7,23} \\ &+p_{8,55}+p_{7,119}+p_{7,79}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,379} = \frac{1}{2}p_{8,123} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,123}^2 - 4(p_{8,160}+p_{8,176}+2p_{8,112}+p_{8,240}+p_{8,40}+p_{8,232} \\ &+p_{8,152}+p_{8,184}+p_{8,120}+p_{8,164}+p_{8,100}+p_{8,212}+2p_{8,52}+p_{8,204} \\ &+p_{8,156}+p_{8,188}+p_{7,2}+p_{8,162}+p_{8,98}+p_{8,202}+p_{8,42}+p_{8,166} \\ &+p_{8,86}+p_{7,54}+p_{8,142}+p_{8,174}+p_{8,110}+p_{8,62}+2p_{8,126}+p_{8,193} \\ &+p_{7,9}+p_{8,201}+p_{8,153}+p_{8,229}+p_{8,53}+p_{8,117}+p_{8,13}+3p_{8,205} \\ &+p_{8,173}+p_{8,67}+p_{8,211}+p_{8,179}+p_{8,235}+p_{8,251}+p_{8,167}+2p_{7,23} \\ &+p_{8,55}+p_{7,119}+p_{7,79}+p_{8,191}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,251} = \frac{1}{2}p_{8,251} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,251}^2 - 4(p_{8,32}+p_{8,48}+p_{8,112}+2p_{8,240}+p_{8,168}+p_{8,104} \\ &+p_{8,24}+p_{8,56}+p_{8,248}+p_{8,36}+p_{8,228}+p_{8,84}+2p_{8,180}+p_{8,76} \\ &+p_{8,28}+p_{8,60}+p_{7,2}+p_{8,34}+p_{8,226}+p_{8,74}+p_{8,170}+p_{8,38} \\ &+p_{8,214}+p_{7,54}+p_{8,14}+p_{8,46}+p_{8,238}+p_{8,190}+2p_{8,254}+p_{8,65} \\ &+p_{7,9}+p_{8,73}+p_{8,25}+p_{8,101}+p_{8,181}+p_{8,245}+p_{8,141}+3p_{8,77} \\ &+p_{8,45}+p_{8,195}+p_{8,83}+p_{8,51}+p_{8,107}+p_{8,123}+p_{8,39}+2p_{7,23} \\ &+p_{8,183}+p_{7,119}+p_{7,79}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,507} = \frac{1}{2}p_{8,251} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,251}^2 - 4(p_{8,32}+p_{8,48}+p_{8,112}+2p_{8,240}+p_{8,168}+p_{8,104} \\ &+p_{8,24}+p_{8,56}+p_{8,248}+p_{8,36}+p_{8,228}+p_{8,84}+2p_{8,180}+p_{8,76} \\ &+p_{8,28}+p_{8,60}+p_{7,2}+p_{8,34}+p_{8,226}+p_{8,74}+p_{8,170}+p_{8,38} \\ &+p_{8,214}+p_{7,54}+p_{8,14}+p_{8,46}+p_{8,238}+p_{8,190}+2p_{8,254}+p_{8,65} \\ &+p_{7,9}+p_{8,73}+p_{8,25}+p_{8,101}+p_{8,181}+p_{8,245}+p_{8,141}+3p_{8,77} \\ &+p_{8,45}+p_{8,195}+p_{8,83}+p_{8,51}+p_{8,107}+p_{8,123}+p_{8,39}+2p_{7,23} \\ &+p_{8,183}+p_{7,119}+p_{7,79}+p_{8,63}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,7} = \frac{1}{2}p_{8,7} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,7}^2 - 4(2p_{8,192}+p_{8,96}+p_{8,48}+p_{8,240}+p_{8,72}+p_{8,40} \\ &+p_{8,88}+p_{8,4}+p_{8,68}+p_{8,36}+p_{8,180}+p_{8,116}+p_{8,44}+p_{8,60} \\ &+p_{8,124}+2p_{8,252}+p_{7,66}+p_{8,226}+p_{8,50}+2p_{8,10}+p_{8,202} \\ &+p_{8,26}+p_{8,58}+p_{8,250}+p_{8,86}+p_{8,182}+p_{7,14}+p_{8,46}+p_{8,238} \\ &+p_{8,1}+p_{8,193}+p_{8,113}+p_{8,153}+3p_{8,89}+p_{8,57}+p_{8,37}+p_{7,21} \\ &+p_{8,85}+p_{8,77}+p_{7,3}+p_{8,195}+2p_{7,35}+p_{8,51}+p_{8,11}+p_{8,75} \\ &+p_{7,91}+p_{8,135}+p_{8,119}+p_{8,207}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,263} = \frac{1}{2}p_{8,7} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,7}^2 - 4(2p_{8,192}+p_{8,96}+p_{8,48}+p_{8,240}+p_{8,72}+p_{8,40} \\ &+p_{8,88}+p_{8,4}+p_{8,68}+p_{8,36}+p_{8,180}+p_{8,116}+p_{8,44}+p_{8,60} \\ &+p_{8,124}+2p_{8,252}+p_{7,66}+p_{8,226}+p_{8,50}+2p_{8,10}+p_{8,202} \\ &+p_{8,26}+p_{8,58}+p_{8,250}+p_{8,86}+p_{8,182}+p_{7,14}+p_{8,46}+p_{8,238} \\ &+p_{8,1}+p_{8,193}+p_{8,113}+p_{8,153}+3p_{8,89}+p_{8,57}+p_{8,37}+p_{7,21} \\ &+p_{8,85}+p_{8,77}+p_{7,3}+p_{8,195}+2p_{7,35}+p_{8,51}+p_{8,11}+p_{8,75} \\ &+p_{7,91}+p_{8,135}+p_{8,119}+p_{8,207}+p_{8,95}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,135} = \frac{1}{2}p_{8,135} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,135}^2 - 4(2p_{8,64}+p_{8,224}+p_{8,176}+p_{8,112}+p_{8,200}+p_{8,168} \\ &+p_{8,216}+p_{8,132}+p_{8,196}+p_{8,164}+p_{8,52}+p_{8,244}+p_{8,172}+p_{8,188} \\ &+2p_{8,124}+p_{8,252}+p_{7,66}+p_{8,98}+p_{8,178}+2p_{8,138}+p_{8,74}+p_{8,154} \\ &+p_{8,186}+p_{8,122}+p_{8,214}+p_{8,54}+p_{7,14}+p_{8,174}+p_{8,110}+p_{8,129} \\ &+p_{8,65}+p_{8,241}+p_{8,25}+3p_{8,217}+p_{8,185}+p_{8,165}+p_{7,21}+p_{8,213} \\ &+p_{8,205}+p_{7,3}+p_{8,67}+2p_{7,35}+p_{8,179}+p_{8,139}+p_{8,203}+p_{7,91} \\ &+p_{8,7}+p_{8,247}+p_{8,79}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,391} = \frac{1}{2}p_{8,135} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,135}^2 - 4(2p_{8,64}+p_{8,224}+p_{8,176}+p_{8,112}+p_{8,200}+p_{8,168} \\ &+p_{8,216}+p_{8,132}+p_{8,196}+p_{8,164}+p_{8,52}+p_{8,244}+p_{8,172}+p_{8,188} \\ &+2p_{8,124}+p_{8,252}+p_{7,66}+p_{8,98}+p_{8,178}+2p_{8,138}+p_{8,74}+p_{8,154} \\ &+p_{8,186}+p_{8,122}+p_{8,214}+p_{8,54}+p_{7,14}+p_{8,174}+p_{8,110}+p_{8,129} \\ &+p_{8,65}+p_{8,241}+p_{8,25}+3p_{8,217}+p_{8,185}+p_{8,165}+p_{7,21}+p_{8,213} \\ &+p_{8,205}+p_{7,3}+p_{8,67}+2p_{7,35}+p_{8,179}+p_{8,139}+p_{8,203}+p_{7,91} \\ &+p_{8,7}+p_{8,247}+p_{8,79}+p_{8,223}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,71} = \frac{1}{2}p_{8,71} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,71}^2 - 4(2p_{8,0}+p_{8,160}+p_{8,48}+p_{8,112}+p_{8,136}+p_{8,104} \\ &+p_{8,152}+p_{8,132}+p_{8,68}+p_{8,100}+p_{8,180}+p_{8,244}+p_{8,108}+2p_{8,60} \\ &+p_{8,188}+p_{8,124}+p_{7,2}+p_{8,34}+p_{8,114}+p_{8,10}+2p_{8,74}+p_{8,90} \\ &+p_{8,58}+p_{8,122}+p_{8,150}+p_{8,246}+p_{7,78}+p_{8,46}+p_{8,110}+p_{8,1} \\ &+p_{8,65}+p_{8,177}+3p_{8,153}+p_{8,217}+p_{8,121}+p_{8,101}+p_{8,149}+p_{7,85} \\ &+p_{8,141}+p_{8,3}+p_{7,67}+2p_{7,99}+p_{8,115}+p_{8,139}+p_{8,75}+p_{7,27} \\ &+p_{8,199}+p_{8,183}+p_{8,15}+p_{8,159}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,327} = \frac{1}{2}p_{8,71} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,71}^2 - 4(2p_{8,0}+p_{8,160}+p_{8,48}+p_{8,112}+p_{8,136}+p_{8,104} \\ &+p_{8,152}+p_{8,132}+p_{8,68}+p_{8,100}+p_{8,180}+p_{8,244}+p_{8,108}+2p_{8,60} \\ &+p_{8,188}+p_{8,124}+p_{7,2}+p_{8,34}+p_{8,114}+p_{8,10}+2p_{8,74}+p_{8,90} \\ &+p_{8,58}+p_{8,122}+p_{8,150}+p_{8,246}+p_{7,78}+p_{8,46}+p_{8,110}+p_{8,1} \\ &+p_{8,65}+p_{8,177}+3p_{8,153}+p_{8,217}+p_{8,121}+p_{8,101}+p_{8,149}+p_{7,85} \\ &+p_{8,141}+p_{8,3}+p_{7,67}+2p_{7,99}+p_{8,115}+p_{8,139}+p_{8,75}+p_{7,27} \\ &+p_{8,199}+p_{8,183}+p_{8,15}+p_{8,159}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,199} = \frac{1}{2}p_{8,199} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,199}^2 - 4(2p_{8,128}+p_{8,32}+p_{8,176}+p_{8,240}+p_{8,8}+p_{8,232} \\ &+p_{8,24}+p_{8,4}+p_{8,196}+p_{8,228}+p_{8,52}+p_{8,116}+p_{8,236}+p_{8,60} \\ &+2p_{8,188}+p_{8,252}+p_{7,2}+p_{8,162}+p_{8,242}+p_{8,138}+2p_{8,202} \\ &+p_{8,218}+p_{8,186}+p_{8,250}+p_{8,22}+p_{8,118}+p_{7,78}+p_{8,174}+p_{8,238} \\ &+p_{8,129}+p_{8,193}+p_{8,49}+3p_{8,25}+p_{8,89}+p_{8,249}+p_{8,229}+p_{8,21} \\ &+p_{7,85}+p_{8,13}+p_{8,131}+p_{7,67}+2p_{7,99}+p_{8,243}+p_{8,11}+p_{8,203} \\ &+p_{7,27}+p_{8,71}+p_{8,55}+p_{8,143}+p_{8,31}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,455} = \frac{1}{2}p_{8,199} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,199}^2 - 4(2p_{8,128}+p_{8,32}+p_{8,176}+p_{8,240}+p_{8,8}+p_{8,232} \\ &+p_{8,24}+p_{8,4}+p_{8,196}+p_{8,228}+p_{8,52}+p_{8,116}+p_{8,236}+p_{8,60} \\ &+2p_{8,188}+p_{8,252}+p_{7,2}+p_{8,162}+p_{8,242}+p_{8,138}+2p_{8,202} \\ &+p_{8,218}+p_{8,186}+p_{8,250}+p_{8,22}+p_{8,118}+p_{7,78}+p_{8,174}+p_{8,238} \\ &+p_{8,129}+p_{8,193}+p_{8,49}+3p_{8,25}+p_{8,89}+p_{8,249}+p_{8,229}+p_{8,21} \\ &+p_{7,85}+p_{8,13}+p_{8,131}+p_{7,67}+2p_{7,99}+p_{8,243}+p_{8,11}+p_{8,203} \\ &+p_{7,27}+p_{8,71}+p_{8,55}+p_{8,143}+p_{8,31}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,39} = \frac{1}{2}p_{8,39} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,39}^2 - 4(p_{8,128}+2p_{8,224}+p_{8,16}+p_{8,80}+p_{8,72}+p_{8,104} \\ &+p_{8,120}+p_{8,68}+p_{8,36}+p_{8,100}+p_{8,148}+p_{8,212}+p_{8,76}+2p_{8,28} \\ &+p_{8,156}+p_{8,92}+p_{8,2}+p_{7,98}+p_{8,82}+2p_{8,42}+p_{8,234}+p_{8,26} \\ &+p_{8,90}+p_{8,58}+p_{8,214}+p_{8,118}+p_{8,14}+p_{8,78}+p_{7,46}+p_{8,33} \\ &+p_{8,225}+p_{8,145}+p_{8,89}+p_{8,185}+3p_{8,121}+p_{8,69}+p_{7,53}+p_{8,117} \\ &+p_{8,109}+2p_{7,67}+p_{7,35}+p_{8,227}+p_{8,83}+p_{8,43}+p_{8,107}+p_{7,123} \\ &+p_{8,167}+p_{8,151}+p_{8,239}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,295} = \frac{1}{2}p_{8,39} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,39}^2 - 4(p_{8,128}+2p_{8,224}+p_{8,16}+p_{8,80}+p_{8,72}+p_{8,104} \\ &+p_{8,120}+p_{8,68}+p_{8,36}+p_{8,100}+p_{8,148}+p_{8,212}+p_{8,76}+2p_{8,28} \\ &+p_{8,156}+p_{8,92}+p_{8,2}+p_{7,98}+p_{8,82}+2p_{8,42}+p_{8,234}+p_{8,26} \\ &+p_{8,90}+p_{8,58}+p_{8,214}+p_{8,118}+p_{8,14}+p_{8,78}+p_{7,46}+p_{8,33} \\ &+p_{8,225}+p_{8,145}+p_{8,89}+p_{8,185}+3p_{8,121}+p_{8,69}+p_{7,53}+p_{8,117} \\ &+p_{8,109}+2p_{7,67}+p_{7,35}+p_{8,227}+p_{8,83}+p_{8,43}+p_{8,107}+p_{7,123} \\ &+p_{8,167}+p_{8,151}+p_{8,239}+p_{8,95}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,167} = \frac{1}{2}p_{8,167} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,167}^2 - 4(p_{8,0}+2p_{8,96}+p_{8,144}+p_{8,208}+p_{8,200}+p_{8,232} \\ &+p_{8,248}+p_{8,196}+p_{8,164}+p_{8,228}+p_{8,20}+p_{8,84}+p_{8,204}+p_{8,28} \\ &+2p_{8,156}+p_{8,220}+p_{8,130}+p_{7,98}+p_{8,210}+2p_{8,170}+p_{8,106} \\ &+p_{8,154}+p_{8,218}+p_{8,186}+p_{8,86}+p_{8,246}+p_{8,142}+p_{8,206}+p_{7,46} \\ &+p_{8,161}+p_{8,97}+p_{8,17}+p_{8,217}+p_{8,57}+3p_{8,249}+p_{8,197}+p_{7,53} \\ &+p_{8,245}+p_{8,237}+2p_{7,67}+p_{7,35}+p_{8,99}+p_{8,211}+p_{8,171}+p_{8,235} \\ &+p_{7,123}+p_{8,39}+p_{8,23}+p_{8,111}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,423} = \frac{1}{2}p_{8,167} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,167}^2 - 4(p_{8,0}+2p_{8,96}+p_{8,144}+p_{8,208}+p_{8,200}+p_{8,232} \\ &+p_{8,248}+p_{8,196}+p_{8,164}+p_{8,228}+p_{8,20}+p_{8,84}+p_{8,204}+p_{8,28} \\ &+2p_{8,156}+p_{8,220}+p_{8,130}+p_{7,98}+p_{8,210}+2p_{8,170}+p_{8,106} \\ &+p_{8,154}+p_{8,218}+p_{8,186}+p_{8,86}+p_{8,246}+p_{8,142}+p_{8,206}+p_{7,46} \\ &+p_{8,161}+p_{8,97}+p_{8,17}+p_{8,217}+p_{8,57}+3p_{8,249}+p_{8,197}+p_{7,53} \\ &+p_{8,245}+p_{8,237}+2p_{7,67}+p_{7,35}+p_{8,99}+p_{8,211}+p_{8,171}+p_{8,235} \\ &+p_{7,123}+p_{8,39}+p_{8,23}+p_{8,111}+p_{8,223}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,103} = \frac{1}{2}p_{8,103} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,103}^2 - 4(p_{8,192}+2p_{8,32}+p_{8,144}+p_{8,80}+p_{8,136}+p_{8,168} \\ &+p_{8,184}+p_{8,132}+p_{8,164}+p_{8,100}+p_{8,20}+p_{8,212}+p_{8,140}+p_{8,156} \\ &+2p_{8,92}+p_{8,220}+p_{8,66}+p_{7,34}+p_{8,146}+p_{8,42}+2p_{8,106}+p_{8,154} \\ &+p_{8,90}+p_{8,122}+p_{8,22}+p_{8,182}+p_{8,142}+p_{8,78}+p_{7,110}+p_{8,33} \\ &+p_{8,97}+p_{8,209}+p_{8,153}+3p_{8,185}+p_{8,249}+p_{8,133}+p_{8,181}+p_{7,117} \\ &+p_{8,173}+2p_{7,3}+p_{8,35}+p_{7,99}+p_{8,147}+p_{8,171}+p_{8,107}+p_{7,59} \\ &+p_{8,231}+p_{8,215}+p_{8,47}+p_{8,159}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,359} = \frac{1}{2}p_{8,103} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,103}^2 - 4(p_{8,192}+2p_{8,32}+p_{8,144}+p_{8,80}+p_{8,136}+p_{8,168} \\ &+p_{8,184}+p_{8,132}+p_{8,164}+p_{8,100}+p_{8,20}+p_{8,212}+p_{8,140}+p_{8,156} \\ &+2p_{8,92}+p_{8,220}+p_{8,66}+p_{7,34}+p_{8,146}+p_{8,42}+2p_{8,106}+p_{8,154} \\ &+p_{8,90}+p_{8,122}+p_{8,22}+p_{8,182}+p_{8,142}+p_{8,78}+p_{7,110}+p_{8,33} \\ &+p_{8,97}+p_{8,209}+p_{8,153}+3p_{8,185}+p_{8,249}+p_{8,133}+p_{8,181}+p_{7,117} \\ &+p_{8,173}+2p_{7,3}+p_{8,35}+p_{7,99}+p_{8,147}+p_{8,171}+p_{8,107}+p_{7,59} \\ &+p_{8,231}+p_{8,215}+p_{8,47}+p_{8,159}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,231} = \frac{1}{2}p_{8,231} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,231}^2 - 4(p_{8,64}+2p_{8,160}+p_{8,16}+p_{8,208}+p_{8,8}+p_{8,40} \\ &+p_{8,56}+p_{8,4}+p_{8,36}+p_{8,228}+p_{8,148}+p_{8,84}+p_{8,12}+p_{8,28} \\ &+p_{8,92}+2p_{8,220}+p_{8,194}+p_{7,34}+p_{8,18}+p_{8,170}+2p_{8,234}+p_{8,26} \\ &+p_{8,218}+p_{8,250}+p_{8,150}+p_{8,54}+p_{8,14}+p_{8,206}+p_{7,110}+p_{8,161} \\ &+p_{8,225}+p_{8,81}+p_{8,25}+3p_{8,57}+p_{8,121}+p_{8,5}+p_{8,53}+p_{7,117} \\ &+p_{8,45}+2p_{7,3}+p_{8,163}+p_{7,99}+p_{8,19}+p_{8,43}+p_{8,235}+p_{7,59} \\ &+p_{8,103}+p_{8,87}+p_{8,175}+p_{8,31}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,487} = \frac{1}{2}p_{8,231} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,231}^2 - 4(p_{8,64}+2p_{8,160}+p_{8,16}+p_{8,208}+p_{8,8}+p_{8,40} \\ &+p_{8,56}+p_{8,4}+p_{8,36}+p_{8,228}+p_{8,148}+p_{8,84}+p_{8,12}+p_{8,28} \\ &+p_{8,92}+2p_{8,220}+p_{8,194}+p_{7,34}+p_{8,18}+p_{8,170}+2p_{8,234}+p_{8,26} \\ &+p_{8,218}+p_{8,250}+p_{8,150}+p_{8,54}+p_{8,14}+p_{8,206}+p_{7,110}+p_{8,161} \\ &+p_{8,225}+p_{8,81}+p_{8,25}+3p_{8,57}+p_{8,121}+p_{8,5}+p_{8,53}+p_{7,117} \\ &+p_{8,45}+2p_{7,3}+p_{8,163}+p_{7,99}+p_{8,19}+p_{8,43}+p_{8,235}+p_{7,59} \\ &+p_{8,103}+p_{8,87}+p_{8,175}+p_{8,31}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,23} = \frac{1}{2}p_{8,23} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,23}^2 - 4(p_{8,0}+p_{8,64}+2p_{8,208}+p_{8,112}+p_{8,104}+p_{8,88} \\ &+p_{8,56}+p_{8,132}+p_{8,196}+p_{8,20}+p_{8,84}+p_{8,52}+2p_{8,12}+p_{8,140} \\ &+p_{8,76}+p_{8,60}+p_{8,66}+p_{7,82}+p_{8,242}+p_{8,10}+p_{8,74}+p_{8,42} \\ &+2p_{8,26}+p_{8,218}+p_{8,198}+p_{8,102}+p_{7,30}+p_{8,62}+p_{8,254}+p_{8,129} \\ &+p_{8,17}+p_{8,209}+p_{8,73}+p_{8,169}+3p_{8,105}+p_{7,37}+p_{8,101}+p_{8,53} \\ &+p_{8,93}+p_{8,67}+p_{7,19}+p_{8,211}+2p_{7,51}+p_{7,107}+p_{8,27}+p_{8,91} \\ &+p_{8,135}+p_{8,151}+p_{8,79}+p_{8,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,279} = \frac{1}{2}p_{8,23} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,23}^2 - 4(p_{8,0}+p_{8,64}+2p_{8,208}+p_{8,112}+p_{8,104}+p_{8,88} \\ &+p_{8,56}+p_{8,132}+p_{8,196}+p_{8,20}+p_{8,84}+p_{8,52}+2p_{8,12}+p_{8,140} \\ &+p_{8,76}+p_{8,60}+p_{8,66}+p_{7,82}+p_{8,242}+p_{8,10}+p_{8,74}+p_{8,42} \\ &+2p_{8,26}+p_{8,218}+p_{8,198}+p_{8,102}+p_{7,30}+p_{8,62}+p_{8,254}+p_{8,129} \\ &+p_{8,17}+p_{8,209}+p_{8,73}+p_{8,169}+3p_{8,105}+p_{7,37}+p_{8,101}+p_{8,53} \\ &+p_{8,93}+p_{8,67}+p_{7,19}+p_{8,211}+2p_{7,51}+p_{7,107}+p_{8,27}+p_{8,91} \\ &+p_{8,135}+p_{8,151}+p_{8,79}+p_{8,111}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,151} = \frac{1}{2}p_{8,151} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,151}^2 - 4(p_{8,128}+p_{8,192}+2p_{8,80}+p_{8,240}+p_{8,232}+p_{8,216} \\ &+p_{8,184}+p_{8,4}+p_{8,68}+p_{8,148}+p_{8,212}+p_{8,180}+p_{8,12}+2p_{8,140} \\ &+p_{8,204}+p_{8,188}+p_{8,194}+p_{7,82}+p_{8,114}+p_{8,138}+p_{8,202}+p_{8,170} \\ &+2p_{8,154}+p_{8,90}+p_{8,70}+p_{8,230}+p_{7,30}+p_{8,190}+p_{8,126}+p_{8,1} \\ &+p_{8,145}+p_{8,81}+p_{8,201}+p_{8,41}+3p_{8,233}+p_{7,37}+p_{8,229}+p_{8,181} \\ &+p_{8,221}+p_{8,195}+p_{7,19}+p_{8,83}+2p_{7,51}+p_{7,107}+p_{8,155}+p_{8,219} \\ &+p_{8,7}+p_{8,23}+p_{8,207}+p_{8,239}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,407} = \frac{1}{2}p_{8,151} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,151}^2 - 4(p_{8,128}+p_{8,192}+2p_{8,80}+p_{8,240}+p_{8,232}+p_{8,216} \\ &+p_{8,184}+p_{8,4}+p_{8,68}+p_{8,148}+p_{8,212}+p_{8,180}+p_{8,12}+2p_{8,140} \\ &+p_{8,204}+p_{8,188}+p_{8,194}+p_{7,82}+p_{8,114}+p_{8,138}+p_{8,202}+p_{8,170} \\ &+2p_{8,154}+p_{8,90}+p_{8,70}+p_{8,230}+p_{7,30}+p_{8,190}+p_{8,126}+p_{8,1} \\ &+p_{8,145}+p_{8,81}+p_{8,201}+p_{8,41}+3p_{8,233}+p_{7,37}+p_{8,229}+p_{8,181} \\ &+p_{8,221}+p_{8,195}+p_{7,19}+p_{8,83}+2p_{7,51}+p_{7,107}+p_{8,155}+p_{8,219} \\ &+p_{8,7}+p_{8,23}+p_{8,207}+p_{8,239}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,87} = \frac{1}{2}p_{8,87} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,87}^2 - 4(p_{8,128}+p_{8,64}+2p_{8,16}+p_{8,176}+p_{8,168}+p_{8,152} \\ &+p_{8,120}+p_{8,4}+p_{8,196}+p_{8,148}+p_{8,84}+p_{8,116}+p_{8,140}+2p_{8,76} \\ &+p_{8,204}+p_{8,124}+p_{8,130}+p_{7,18}+p_{8,50}+p_{8,138}+p_{8,74}+p_{8,106} \\ &+p_{8,26}+2p_{8,90}+p_{8,6}+p_{8,166}+p_{7,94}+p_{8,62}+p_{8,126}+p_{8,193} \\ &+p_{8,17}+p_{8,81}+p_{8,137}+3p_{8,169}+p_{8,233}+p_{8,165}+p_{7,101}+p_{8,117} \\ &+p_{8,157}+p_{8,131}+p_{8,19}+p_{7,83}+2p_{7,115}+p_{7,43}+p_{8,155}+p_{8,91} \\ &+p_{8,199}+p_{8,215}+p_{8,143}+p_{8,175}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,343} = \frac{1}{2}p_{8,87} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,87}^2 - 4(p_{8,128}+p_{8,64}+2p_{8,16}+p_{8,176}+p_{8,168}+p_{8,152} \\ &+p_{8,120}+p_{8,4}+p_{8,196}+p_{8,148}+p_{8,84}+p_{8,116}+p_{8,140}+2p_{8,76} \\ &+p_{8,204}+p_{8,124}+p_{8,130}+p_{7,18}+p_{8,50}+p_{8,138}+p_{8,74}+p_{8,106} \\ &+p_{8,26}+2p_{8,90}+p_{8,6}+p_{8,166}+p_{7,94}+p_{8,62}+p_{8,126}+p_{8,193} \\ &+p_{8,17}+p_{8,81}+p_{8,137}+3p_{8,169}+p_{8,233}+p_{8,165}+p_{7,101}+p_{8,117} \\ &+p_{8,157}+p_{8,131}+p_{8,19}+p_{7,83}+2p_{7,115}+p_{7,43}+p_{8,155}+p_{8,91} \\ &+p_{8,199}+p_{8,215}+p_{8,143}+p_{8,175}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,215} = \frac{1}{2}p_{8,215} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,215}^2 - 4(p_{8,0}+p_{8,192}+2p_{8,144}+p_{8,48}+p_{8,40}+p_{8,24} \\ &+p_{8,248}+p_{8,132}+p_{8,68}+p_{8,20}+p_{8,212}+p_{8,244}+p_{8,12}+p_{8,76} \\ &+2p_{8,204}+p_{8,252}+p_{8,2}+p_{7,18}+p_{8,178}+p_{8,10}+p_{8,202}+p_{8,234} \\ &+p_{8,154}+2p_{8,218}+p_{8,134}+p_{8,38}+p_{7,94}+p_{8,190}+p_{8,254}+p_{8,65} \\ &+p_{8,145}+p_{8,209}+p_{8,9}+3p_{8,41}+p_{8,105}+p_{8,37}+p_{7,101}+p_{8,245} \\ &+p_{8,29}+p_{8,3}+p_{8,147}+p_{7,83}+2p_{7,115}+p_{7,43}+p_{8,27}+p_{8,219} \\ &+p_{8,71}+p_{8,87}+p_{8,15}+p_{8,47}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,471} = \frac{1}{2}p_{8,215} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,215}^2 - 4(p_{8,0}+p_{8,192}+2p_{8,144}+p_{8,48}+p_{8,40}+p_{8,24} \\ &+p_{8,248}+p_{8,132}+p_{8,68}+p_{8,20}+p_{8,212}+p_{8,244}+p_{8,12}+p_{8,76} \\ &+2p_{8,204}+p_{8,252}+p_{8,2}+p_{7,18}+p_{8,178}+p_{8,10}+p_{8,202}+p_{8,234} \\ &+p_{8,154}+2p_{8,218}+p_{8,134}+p_{8,38}+p_{7,94}+p_{8,190}+p_{8,254}+p_{8,65} \\ &+p_{8,145}+p_{8,209}+p_{8,9}+3p_{8,41}+p_{8,105}+p_{8,37}+p_{7,101}+p_{8,245} \\ &+p_{8,29}+p_{8,3}+p_{8,147}+p_{7,83}+2p_{7,115}+p_{7,43}+p_{8,27}+p_{8,219} \\ &+p_{8,71}+p_{8,87}+p_{8,15}+p_{8,47}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,55} = \frac{1}{2}p_{8,55} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,55}^2 - 4(p_{8,32}+p_{8,96}+p_{8,144}+2p_{8,240}+p_{8,136}+p_{8,88} \\ &+p_{8,120}+p_{8,164}+p_{8,228}+p_{8,84}+p_{8,52}+p_{8,116}+2p_{8,44}+p_{8,172} \\ &+p_{8,108}+p_{8,92}+p_{8,98}+p_{8,18}+p_{7,114}+p_{8,74}+p_{8,42}+p_{8,106} \\ &+2p_{8,58}+p_{8,250}+p_{8,134}+p_{8,230}+p_{8,30}+p_{8,94}+p_{7,62}+p_{8,161} \\ &+p_{8,49}+p_{8,241}+3p_{8,137}+p_{8,201}+p_{8,105}+p_{8,133}+p_{7,69}+p_{8,85} \\ &+p_{8,125}+p_{8,99}+2p_{7,83}+p_{7,51}+p_{8,243}+p_{7,11}+p_{8,59}+p_{8,123} \\ &+p_{8,167}+p_{8,183}+p_{8,143}+p_{8,111}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,311} = \frac{1}{2}p_{8,55} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,55}^2 - 4(p_{8,32}+p_{8,96}+p_{8,144}+2p_{8,240}+p_{8,136}+p_{8,88} \\ &+p_{8,120}+p_{8,164}+p_{8,228}+p_{8,84}+p_{8,52}+p_{8,116}+2p_{8,44}+p_{8,172} \\ &+p_{8,108}+p_{8,92}+p_{8,98}+p_{8,18}+p_{7,114}+p_{8,74}+p_{8,42}+p_{8,106} \\ &+2p_{8,58}+p_{8,250}+p_{8,134}+p_{8,230}+p_{8,30}+p_{8,94}+p_{7,62}+p_{8,161} \\ &+p_{8,49}+p_{8,241}+3p_{8,137}+p_{8,201}+p_{8,105}+p_{8,133}+p_{7,69}+p_{8,85} \\ &+p_{8,125}+p_{8,99}+2p_{7,83}+p_{7,51}+p_{8,243}+p_{7,11}+p_{8,59}+p_{8,123} \\ &+p_{8,167}+p_{8,183}+p_{8,143}+p_{8,111}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,183} = \frac{1}{2}p_{8,183} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,183}^2 - 4(p_{8,160}+p_{8,224}+p_{8,16}+2p_{8,112}+p_{8,8}+p_{8,216} \\ &+p_{8,248}+p_{8,36}+p_{8,100}+p_{8,212}+p_{8,180}+p_{8,244}+p_{8,44}+2p_{8,172} \\ &+p_{8,236}+p_{8,220}+p_{8,226}+p_{8,146}+p_{7,114}+p_{8,202}+p_{8,170} \\ &+p_{8,234}+2p_{8,186}+p_{8,122}+p_{8,6}+p_{8,102}+p_{8,158}+p_{8,222}+p_{7,62} \\ &+p_{8,33}+p_{8,177}+p_{8,113}+3p_{8,9}+p_{8,73}+p_{8,233}+p_{8,5}+p_{7,69} \\ &+p_{8,213}+p_{8,253}+p_{8,227}+2p_{7,83}+p_{7,51}+p_{8,115}+p_{7,11}+p_{8,187} \\ &+p_{8,251}+p_{8,39}+p_{8,55}+p_{8,15}+p_{8,239}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,439} = \frac{1}{2}p_{8,183} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,183}^2 - 4(p_{8,160}+p_{8,224}+p_{8,16}+2p_{8,112}+p_{8,8}+p_{8,216} \\ &+p_{8,248}+p_{8,36}+p_{8,100}+p_{8,212}+p_{8,180}+p_{8,244}+p_{8,44}+2p_{8,172} \\ &+p_{8,236}+p_{8,220}+p_{8,226}+p_{8,146}+p_{7,114}+p_{8,202}+p_{8,170} \\ &+p_{8,234}+2p_{8,186}+p_{8,122}+p_{8,6}+p_{8,102}+p_{8,158}+p_{8,222}+p_{7,62} \\ &+p_{8,33}+p_{8,177}+p_{8,113}+3p_{8,9}+p_{8,73}+p_{8,233}+p_{8,5}+p_{7,69} \\ &+p_{8,213}+p_{8,253}+p_{8,227}+2p_{7,83}+p_{7,51}+p_{8,115}+p_{7,11}+p_{8,187} \\ &+p_{8,251}+p_{8,39}+p_{8,55}+p_{8,15}+p_{8,239}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,119} = \frac{1}{2}p_{8,119} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,119}^2 - 4(p_{8,160}+p_{8,96}+p_{8,208}+2p_{8,48}+p_{8,200}+p_{8,152} \\ &+p_{8,184}+p_{8,36}+p_{8,228}+p_{8,148}+p_{8,180}+p_{8,116}+p_{8,172}+2p_{8,108} \\ &+p_{8,236}+p_{8,156}+p_{8,162}+p_{8,82}+p_{7,50}+p_{8,138}+p_{8,170}+p_{8,106} \\ &+p_{8,58}+2p_{8,122}+p_{8,198}+p_{8,38}+p_{8,158}+p_{8,94}+p_{7,126}+p_{8,225} \\ &+p_{8,49}+p_{8,113}+p_{8,9}+3p_{8,201}+p_{8,169}+p_{7,5}+p_{8,197}+p_{8,149} \\ &+p_{8,189}+p_{8,163}+2p_{7,19}+p_{8,51}+p_{7,115}+p_{7,75}+p_{8,187}+p_{8,123} \\ &+p_{8,231}+p_{8,247}+p_{8,207}+p_{8,175}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,375} = \frac{1}{2}p_{8,119} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,119}^2 - 4(p_{8,160}+p_{8,96}+p_{8,208}+2p_{8,48}+p_{8,200}+p_{8,152} \\ &+p_{8,184}+p_{8,36}+p_{8,228}+p_{8,148}+p_{8,180}+p_{8,116}+p_{8,172}+2p_{8,108} \\ &+p_{8,236}+p_{8,156}+p_{8,162}+p_{8,82}+p_{7,50}+p_{8,138}+p_{8,170}+p_{8,106} \\ &+p_{8,58}+2p_{8,122}+p_{8,198}+p_{8,38}+p_{8,158}+p_{8,94}+p_{7,126}+p_{8,225} \\ &+p_{8,49}+p_{8,113}+p_{8,9}+3p_{8,201}+p_{8,169}+p_{7,5}+p_{8,197}+p_{8,149} \\ &+p_{8,189}+p_{8,163}+2p_{7,19}+p_{8,51}+p_{7,115}+p_{7,75}+p_{8,187}+p_{8,123} \\ &+p_{8,231}+p_{8,247}+p_{8,207}+p_{8,175}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,247} = \frac{1}{2}p_{8,247} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,247}^2 - 4(p_{8,32}+p_{8,224}+p_{8,80}+2p_{8,176}+p_{8,72}+p_{8,24} \\ &+p_{8,56}+p_{8,164}+p_{8,100}+p_{8,20}+p_{8,52}+p_{8,244}+p_{8,44}+p_{8,108} \\ &+2p_{8,236}+p_{8,28}+p_{8,34}+p_{8,210}+p_{7,50}+p_{8,10}+p_{8,42}+p_{8,234} \\ &+p_{8,186}+2p_{8,250}+p_{8,70}+p_{8,166}+p_{8,30}+p_{8,222}+p_{7,126}+p_{8,97} \\ &+p_{8,177}+p_{8,241}+p_{8,137}+3p_{8,73}+p_{8,41}+p_{7,5}+p_{8,69}+p_{8,21} \\ &+p_{8,61}+p_{8,35}+2p_{7,19}+p_{8,179}+p_{7,115}+p_{7,75}+p_{8,59}+p_{8,251} \\ &+p_{8,103}+p_{8,119}+p_{8,79}+p_{8,47}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,503} = \frac{1}{2}p_{8,247} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,247}^2 - 4(p_{8,32}+p_{8,224}+p_{8,80}+2p_{8,176}+p_{8,72}+p_{8,24} \\ &+p_{8,56}+p_{8,164}+p_{8,100}+p_{8,20}+p_{8,52}+p_{8,244}+p_{8,44}+p_{8,108} \\ &+2p_{8,236}+p_{8,28}+p_{8,34}+p_{8,210}+p_{7,50}+p_{8,10}+p_{8,42}+p_{8,234} \\ &+p_{8,186}+2p_{8,250}+p_{8,70}+p_{8,166}+p_{8,30}+p_{8,222}+p_{7,126}+p_{8,97} \\ &+p_{8,177}+p_{8,241}+p_{8,137}+3p_{8,73}+p_{8,41}+p_{7,5}+p_{8,69}+p_{8,21} \\ &+p_{8,61}+p_{8,35}+2p_{7,19}+p_{8,179}+p_{7,115}+p_{7,75}+p_{8,59}+p_{8,251} \\ &+p_{8,103}+p_{8,119}+p_{8,79}+p_{8,47}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,15} = \frac{1}{2}p_{8,15} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,15}^2 - 4(p_{8,96}+p_{8,80}+p_{8,48}+2p_{8,200}+p_{8,104}+p_{8,56} \\ &+p_{8,248}+2p_{8,4}+p_{8,132}+p_{8,68}+p_{8,52}+p_{8,12}+p_{8,76}+p_{8,44} \\ &+p_{8,188}+p_{8,124}+p_{8,2}+p_{8,66}+p_{8,34}+2p_{8,18}+p_{8,210}+p_{7,74} \\ &+p_{8,234}+p_{8,58}+p_{7,22}+p_{8,54}+p_{8,246}+p_{8,94}+p_{8,190}+p_{8,65} \\ &+p_{8,161}+3p_{8,97}+p_{8,9}+p_{8,201}+p_{8,121}+p_{8,85}+p_{8,45}+p_{7,29} \\ &+p_{8,93}+p_{7,99}+p_{8,19}+p_{8,83}+p_{7,11}+p_{8,203}+2p_{7,43}+p_{8,59} \\ &+p_{8,71}+p_{8,103}+p_{8,215}+p_{8,143}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,271} = \frac{1}{2}p_{8,15} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,15}^2 - 4(p_{8,96}+p_{8,80}+p_{8,48}+2p_{8,200}+p_{8,104}+p_{8,56} \\ &+p_{8,248}+2p_{8,4}+p_{8,132}+p_{8,68}+p_{8,52}+p_{8,12}+p_{8,76}+p_{8,44} \\ &+p_{8,188}+p_{8,124}+p_{8,2}+p_{8,66}+p_{8,34}+2p_{8,18}+p_{8,210}+p_{7,74} \\ &+p_{8,234}+p_{8,58}+p_{7,22}+p_{8,54}+p_{8,246}+p_{8,94}+p_{8,190}+p_{8,65} \\ &+p_{8,161}+3p_{8,97}+p_{8,9}+p_{8,201}+p_{8,121}+p_{8,85}+p_{8,45}+p_{7,29} \\ &+p_{8,93}+p_{7,99}+p_{8,19}+p_{8,83}+p_{7,11}+p_{8,203}+2p_{7,43}+p_{8,59} \\ &+p_{8,71}+p_{8,103}+p_{8,215}+p_{8,143}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,143} = \frac{1}{2}p_{8,143} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,143}^2 - 4(p_{8,224}+p_{8,208}+p_{8,176}+2p_{8,72}+p_{8,232}+p_{8,184} \\ &+p_{8,120}+p_{8,4}+2p_{8,132}+p_{8,196}+p_{8,180}+p_{8,140}+p_{8,204}+p_{8,172} \\ &+p_{8,60}+p_{8,252}+p_{8,130}+p_{8,194}+p_{8,162}+2p_{8,146}+p_{8,82}+p_{7,74} \\ &+p_{8,106}+p_{8,186}+p_{7,22}+p_{8,182}+p_{8,118}+p_{8,222}+p_{8,62}+p_{8,193} \\ &+p_{8,33}+3p_{8,225}+p_{8,137}+p_{8,73}+p_{8,249}+p_{8,213}+p_{8,173}+p_{7,29} \\ &+p_{8,221}+p_{7,99}+p_{8,147}+p_{8,211}+p_{7,11}+p_{8,75}+2p_{7,43}+p_{8,187} \\ &+p_{8,199}+p_{8,231}+p_{8,87}+p_{8,15}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,399} = \frac{1}{2}p_{8,143} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,143}^2 - 4(p_{8,224}+p_{8,208}+p_{8,176}+2p_{8,72}+p_{8,232}+p_{8,184} \\ &+p_{8,120}+p_{8,4}+2p_{8,132}+p_{8,196}+p_{8,180}+p_{8,140}+p_{8,204}+p_{8,172} \\ &+p_{8,60}+p_{8,252}+p_{8,130}+p_{8,194}+p_{8,162}+2p_{8,146}+p_{8,82}+p_{7,74} \\ &+p_{8,106}+p_{8,186}+p_{7,22}+p_{8,182}+p_{8,118}+p_{8,222}+p_{8,62}+p_{8,193} \\ &+p_{8,33}+3p_{8,225}+p_{8,137}+p_{8,73}+p_{8,249}+p_{8,213}+p_{8,173}+p_{7,29} \\ &+p_{8,221}+p_{7,99}+p_{8,147}+p_{8,211}+p_{7,11}+p_{8,75}+2p_{7,43}+p_{8,187} \\ &+p_{8,199}+p_{8,231}+p_{8,87}+p_{8,15}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,79} = \frac{1}{2}p_{8,79} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,79}^2 - 4(p_{8,160}+p_{8,144}+p_{8,112}+2p_{8,8}+p_{8,168}+p_{8,56} \\ &+p_{8,120}+p_{8,132}+2p_{8,68}+p_{8,196}+p_{8,116}+p_{8,140}+p_{8,76}+p_{8,108} \\ &+p_{8,188}+p_{8,252}+p_{8,130}+p_{8,66}+p_{8,98}+p_{8,18}+2p_{8,82}+p_{7,10} \\ &+p_{8,42}+p_{8,122}+p_{7,86}+p_{8,54}+p_{8,118}+p_{8,158}+p_{8,254}+p_{8,129} \\ &+3p_{8,161}+p_{8,225}+p_{8,9}+p_{8,73}+p_{8,185}+p_{8,149}+p_{8,109}+p_{8,157} \\ &+p_{7,93}+p_{7,35}+p_{8,147}+p_{8,83}+p_{8,11}+p_{7,75}+2p_{7,107}+p_{8,123} \\ &+p_{8,135}+p_{8,167}+p_{8,23}+p_{8,207}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,335} = \frac{1}{2}p_{8,79} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,79}^2 - 4(p_{8,160}+p_{8,144}+p_{8,112}+2p_{8,8}+p_{8,168}+p_{8,56} \\ &+p_{8,120}+p_{8,132}+2p_{8,68}+p_{8,196}+p_{8,116}+p_{8,140}+p_{8,76}+p_{8,108} \\ &+p_{8,188}+p_{8,252}+p_{8,130}+p_{8,66}+p_{8,98}+p_{8,18}+2p_{8,82}+p_{7,10} \\ &+p_{8,42}+p_{8,122}+p_{7,86}+p_{8,54}+p_{8,118}+p_{8,158}+p_{8,254}+p_{8,129} \\ &+3p_{8,161}+p_{8,225}+p_{8,9}+p_{8,73}+p_{8,185}+p_{8,149}+p_{8,109}+p_{8,157} \\ &+p_{7,93}+p_{7,35}+p_{8,147}+p_{8,83}+p_{8,11}+p_{7,75}+2p_{7,107}+p_{8,123} \\ &+p_{8,135}+p_{8,167}+p_{8,23}+p_{8,207}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,207} = \frac{1}{2}p_{8,207} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,207}^2 - 4(p_{8,32}+p_{8,16}+p_{8,240}+2p_{8,136}+p_{8,40}+p_{8,184} \\ &+p_{8,248}+p_{8,4}+p_{8,68}+2p_{8,196}+p_{8,244}+p_{8,12}+p_{8,204}+p_{8,236} \\ &+p_{8,60}+p_{8,124}+p_{8,2}+p_{8,194}+p_{8,226}+p_{8,146}+2p_{8,210}+p_{7,10} \\ &+p_{8,170}+p_{8,250}+p_{7,86}+p_{8,182}+p_{8,246}+p_{8,30}+p_{8,126}+p_{8,1} \\ &+3p_{8,33}+p_{8,97}+p_{8,137}+p_{8,201}+p_{8,57}+p_{8,21}+p_{8,237}+p_{8,29} \\ &+p_{7,93}+p_{7,35}+p_{8,19}+p_{8,211}+p_{8,139}+p_{7,75}+2p_{7,107}+p_{8,251} \\ &+p_{8,7}+p_{8,39}+p_{8,151}+p_{8,79}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,463} = \frac{1}{2}p_{8,207} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,207}^2 - 4(p_{8,32}+p_{8,16}+p_{8,240}+2p_{8,136}+p_{8,40}+p_{8,184} \\ &+p_{8,248}+p_{8,4}+p_{8,68}+2p_{8,196}+p_{8,244}+p_{8,12}+p_{8,204}+p_{8,236} \\ &+p_{8,60}+p_{8,124}+p_{8,2}+p_{8,194}+p_{8,226}+p_{8,146}+2p_{8,210}+p_{7,10} \\ &+p_{8,170}+p_{8,250}+p_{7,86}+p_{8,182}+p_{8,246}+p_{8,30}+p_{8,126}+p_{8,1} \\ &+3p_{8,33}+p_{8,97}+p_{8,137}+p_{8,201}+p_{8,57}+p_{8,21}+p_{8,237}+p_{8,29} \\ &+p_{7,93}+p_{7,35}+p_{8,19}+p_{8,211}+p_{8,139}+p_{7,75}+2p_{7,107}+p_{8,251} \\ &+p_{8,7}+p_{8,39}+p_{8,151}+p_{8,79}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,47} = \frac{1}{2}p_{8,47} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,47}^2 - 4(p_{8,128}+p_{8,80}+p_{8,112}+p_{8,136}+2p_{8,232}+p_{8,24} \\ &+p_{8,88}+2p_{8,36}+p_{8,164}+p_{8,100}+p_{8,84}+p_{8,76}+p_{8,44}+p_{8,108} \\ &+p_{8,156}+p_{8,220}+p_{8,66}+p_{8,34}+p_{8,98}+2p_{8,50}+p_{8,242}+p_{8,10} \\ &+p_{7,106}+p_{8,90}+p_{8,22}+p_{8,86}+p_{7,54}+p_{8,222}+p_{8,126}+3p_{8,129} \\ &+p_{8,193}+p_{8,97}+p_{8,41}+p_{8,233}+p_{8,153}+p_{8,117}+p_{8,77}+p_{7,61} \\ &+p_{8,125}+p_{7,3}+p_{8,51}+p_{8,115}+2p_{7,75}+p_{7,43}+p_{8,235}+p_{8,91} \\ &+p_{8,135}+p_{8,103}+p_{8,247}+p_{8,175}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,303} = \frac{1}{2}p_{8,47} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,47}^2 - 4(p_{8,128}+p_{8,80}+p_{8,112}+p_{8,136}+2p_{8,232}+p_{8,24} \\ &+p_{8,88}+2p_{8,36}+p_{8,164}+p_{8,100}+p_{8,84}+p_{8,76}+p_{8,44}+p_{8,108} \\ &+p_{8,156}+p_{8,220}+p_{8,66}+p_{8,34}+p_{8,98}+2p_{8,50}+p_{8,242}+p_{8,10} \\ &+p_{7,106}+p_{8,90}+p_{8,22}+p_{8,86}+p_{7,54}+p_{8,222}+p_{8,126}+3p_{8,129} \\ &+p_{8,193}+p_{8,97}+p_{8,41}+p_{8,233}+p_{8,153}+p_{8,117}+p_{8,77}+p_{7,61} \\ &+p_{8,125}+p_{7,3}+p_{8,51}+p_{8,115}+2p_{7,75}+p_{7,43}+p_{8,235}+p_{8,91} \\ &+p_{8,135}+p_{8,103}+p_{8,247}+p_{8,175}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,175} = \frac{1}{2}p_{8,175} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,175}^2 - 4(p_{8,0}+p_{8,208}+p_{8,240}+p_{8,8}+2p_{8,104}+p_{8,152} \\ &+p_{8,216}+p_{8,36}+2p_{8,164}+p_{8,228}+p_{8,212}+p_{8,204}+p_{8,172} \\ &+p_{8,236}+p_{8,28}+p_{8,92}+p_{8,194}+p_{8,162}+p_{8,226}+2p_{8,178}+p_{8,114} \\ &+p_{8,138}+p_{7,106}+p_{8,218}+p_{8,150}+p_{8,214}+p_{7,54}+p_{8,94}+p_{8,254} \\ &+3p_{8,1}+p_{8,65}+p_{8,225}+p_{8,169}+p_{8,105}+p_{8,25}+p_{8,245}+p_{8,205} \\ &+p_{7,61}+p_{8,253}+p_{7,3}+p_{8,179}+p_{8,243}+2p_{7,75}+p_{7,43}+p_{8,107} \\ &+p_{8,219}+p_{8,7}+p_{8,231}+p_{8,119}+p_{8,47}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,431} = \frac{1}{2}p_{8,175} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,175}^2 - 4(p_{8,0}+p_{8,208}+p_{8,240}+p_{8,8}+2p_{8,104}+p_{8,152} \\ &+p_{8,216}+p_{8,36}+2p_{8,164}+p_{8,228}+p_{8,212}+p_{8,204}+p_{8,172} \\ &+p_{8,236}+p_{8,28}+p_{8,92}+p_{8,194}+p_{8,162}+p_{8,226}+2p_{8,178}+p_{8,114} \\ &+p_{8,138}+p_{7,106}+p_{8,218}+p_{8,150}+p_{8,214}+p_{7,54}+p_{8,94}+p_{8,254} \\ &+3p_{8,1}+p_{8,65}+p_{8,225}+p_{8,169}+p_{8,105}+p_{8,25}+p_{8,245}+p_{8,205} \\ &+p_{7,61}+p_{8,253}+p_{7,3}+p_{8,179}+p_{8,243}+2p_{7,75}+p_{7,43}+p_{8,107} \\ &+p_{8,219}+p_{8,7}+p_{8,231}+p_{8,119}+p_{8,47}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,111} = \frac{1}{2}p_{8,111} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,111}^2 - 4(p_{8,192}+p_{8,144}+p_{8,176}+p_{8,200}+2p_{8,40}+p_{8,152} \\ &+p_{8,88}+p_{8,164}+2p_{8,100}+p_{8,228}+p_{8,148}+p_{8,140}+p_{8,172}+p_{8,108} \\ &+p_{8,28}+p_{8,220}+p_{8,130}+p_{8,162}+p_{8,98}+p_{8,50}+2p_{8,114}+p_{8,74} \\ &+p_{7,42}+p_{8,154}+p_{8,150}+p_{8,86}+p_{7,118}+p_{8,30}+p_{8,190}+p_{8,1} \\ &+3p_{8,193}+p_{8,161}+p_{8,41}+p_{8,105}+p_{8,217}+p_{8,181}+p_{8,141}+p_{8,189} \\ &+p_{7,125}+p_{7,67}+p_{8,179}+p_{8,115}+2p_{7,11}+p_{8,43}+p_{7,107}+p_{8,155} \\ &+p_{8,199}+p_{8,167}+p_{8,55}+p_{8,239}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,367} = \frac{1}{2}p_{8,111} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,111}^2 - 4(p_{8,192}+p_{8,144}+p_{8,176}+p_{8,200}+2p_{8,40}+p_{8,152} \\ &+p_{8,88}+p_{8,164}+2p_{8,100}+p_{8,228}+p_{8,148}+p_{8,140}+p_{8,172}+p_{8,108} \\ &+p_{8,28}+p_{8,220}+p_{8,130}+p_{8,162}+p_{8,98}+p_{8,50}+2p_{8,114}+p_{8,74} \\ &+p_{7,42}+p_{8,154}+p_{8,150}+p_{8,86}+p_{7,118}+p_{8,30}+p_{8,190}+p_{8,1} \\ &+3p_{8,193}+p_{8,161}+p_{8,41}+p_{8,105}+p_{8,217}+p_{8,181}+p_{8,141}+p_{8,189} \\ &+p_{7,125}+p_{7,67}+p_{8,179}+p_{8,115}+2p_{7,11}+p_{8,43}+p_{7,107}+p_{8,155} \\ &+p_{8,199}+p_{8,167}+p_{8,55}+p_{8,239}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,239} = \frac{1}{2}p_{8,239} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,239}^2 - 4(p_{8,64}+p_{8,16}+p_{8,48}+p_{8,72}+2p_{8,168}+p_{8,24} \\ &+p_{8,216}+p_{8,36}+p_{8,100}+2p_{8,228}+p_{8,20}+p_{8,12}+p_{8,44}+p_{8,236} \\ &+p_{8,156}+p_{8,92}+p_{8,2}+p_{8,34}+p_{8,226}+p_{8,178}+2p_{8,242}+p_{8,202} \\ &+p_{7,42}+p_{8,26}+p_{8,22}+p_{8,214}+p_{7,118}+p_{8,158}+p_{8,62}+p_{8,129} \\ &+3p_{8,65}+p_{8,33}+p_{8,169}+p_{8,233}+p_{8,89}+p_{8,53}+p_{8,13}+p_{8,61} \\ &+p_{7,125}+p_{7,67}+p_{8,51}+p_{8,243}+2p_{7,11}+p_{8,171}+p_{7,107}+p_{8,27} \\ &+p_{8,71}+p_{8,39}+p_{8,183}+p_{8,111}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,495} = \frac{1}{2}p_{8,239} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,239}^2 - 4(p_{8,64}+p_{8,16}+p_{8,48}+p_{8,72}+2p_{8,168}+p_{8,24} \\ &+p_{8,216}+p_{8,36}+p_{8,100}+2p_{8,228}+p_{8,20}+p_{8,12}+p_{8,44}+p_{8,236} \\ &+p_{8,156}+p_{8,92}+p_{8,2}+p_{8,34}+p_{8,226}+p_{8,178}+2p_{8,242}+p_{8,202} \\ &+p_{7,42}+p_{8,26}+p_{8,22}+p_{8,214}+p_{7,118}+p_{8,158}+p_{8,62}+p_{8,129} \\ &+3p_{8,65}+p_{8,33}+p_{8,169}+p_{8,233}+p_{8,89}+p_{8,53}+p_{8,13}+p_{8,61} \\ &+p_{7,125}+p_{7,67}+p_{8,51}+p_{8,243}+2p_{7,11}+p_{8,171}+p_{7,107}+p_{8,27} \\ &+p_{8,71}+p_{8,39}+p_{8,183}+p_{8,111}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,31} = \frac{1}{2}p_{8,31} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,31}^2 - 4(p_{8,64}+p_{8,96}+p_{8,112}+p_{8,8}+p_{8,72}+2p_{8,216} \\ &+p_{8,120}+p_{8,68}+2p_{8,20}+p_{8,148}+p_{8,84}+p_{8,140}+p_{8,204}+p_{8,28} \\ &+p_{8,92}+p_{8,60}+2p_{8,34}+p_{8,226}+p_{8,18}+p_{8,82}+p_{8,50}+p_{8,74} \\ &+p_{7,90}+p_{8,250}+p_{8,6}+p_{8,70}+p_{7,38}+p_{8,206}+p_{8,110}+p_{8,81} \\ &+p_{8,177}+3p_{8,113}+p_{8,137}+p_{8,25}+p_{8,217}+p_{8,101}+p_{7,45} \\ &+p_{8,109}+p_{8,61}+p_{8,35}+p_{8,99}+p_{7,115}+p_{8,75}+p_{7,27}+p_{8,219} \\ &+2p_{7,59}+p_{8,231}+p_{8,87}+p_{8,119}+p_{8,143}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,287} = \frac{1}{2}p_{8,31} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,31}^2 - 4(p_{8,64}+p_{8,96}+p_{8,112}+p_{8,8}+p_{8,72}+2p_{8,216} \\ &+p_{8,120}+p_{8,68}+2p_{8,20}+p_{8,148}+p_{8,84}+p_{8,140}+p_{8,204}+p_{8,28} \\ &+p_{8,92}+p_{8,60}+2p_{8,34}+p_{8,226}+p_{8,18}+p_{8,82}+p_{8,50}+p_{8,74} \\ &+p_{7,90}+p_{8,250}+p_{8,6}+p_{8,70}+p_{7,38}+p_{8,206}+p_{8,110}+p_{8,81} \\ &+p_{8,177}+3p_{8,113}+p_{8,137}+p_{8,25}+p_{8,217}+p_{8,101}+p_{7,45} \\ &+p_{8,109}+p_{8,61}+p_{8,35}+p_{8,99}+p_{7,115}+p_{8,75}+p_{7,27}+p_{8,219} \\ &+2p_{7,59}+p_{8,231}+p_{8,87}+p_{8,119}+p_{8,143}+p_{8,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,159} = \frac{1}{2}p_{8,159} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,159}^2 - 4(p_{8,192}+p_{8,224}+p_{8,240}+p_{8,136}+p_{8,200}+2p_{8,88} \\ &+p_{8,248}+p_{8,196}+p_{8,20}+2p_{8,148}+p_{8,212}+p_{8,12}+p_{8,76}+p_{8,156} \\ &+p_{8,220}+p_{8,188}+2p_{8,162}+p_{8,98}+p_{8,146}+p_{8,210}+p_{8,178}+p_{8,202} \\ &+p_{7,90}+p_{8,122}+p_{8,134}+p_{8,198}+p_{7,38}+p_{8,78}+p_{8,238}+p_{8,209} \\ &+p_{8,49}+3p_{8,241}+p_{8,9}+p_{8,153}+p_{8,89}+p_{8,229}+p_{7,45}+p_{8,237} \\ &+p_{8,189}+p_{8,163}+p_{8,227}+p_{7,115}+p_{8,203}+p_{7,27}+p_{8,91}+2p_{7,59} \\ &+p_{8,103}+p_{8,215}+p_{8,247}+p_{8,15}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,415} = \frac{1}{2}p_{8,159} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,159}^2 - 4(p_{8,192}+p_{8,224}+p_{8,240}+p_{8,136}+p_{8,200}+2p_{8,88} \\ &+p_{8,248}+p_{8,196}+p_{8,20}+2p_{8,148}+p_{8,212}+p_{8,12}+p_{8,76}+p_{8,156} \\ &+p_{8,220}+p_{8,188}+2p_{8,162}+p_{8,98}+p_{8,146}+p_{8,210}+p_{8,178}+p_{8,202} \\ &+p_{7,90}+p_{8,122}+p_{8,134}+p_{8,198}+p_{7,38}+p_{8,78}+p_{8,238}+p_{8,209} \\ &+p_{8,49}+3p_{8,241}+p_{8,9}+p_{8,153}+p_{8,89}+p_{8,229}+p_{7,45}+p_{8,237} \\ &+p_{8,189}+p_{8,163}+p_{8,227}+p_{7,115}+p_{8,203}+p_{7,27}+p_{8,91}+2p_{7,59} \\ &+p_{8,103}+p_{8,215}+p_{8,247}+p_{8,15}+p_{8,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,95} = \frac{1}{2}p_{8,95} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,95}^2 - 4(p_{8,128}+p_{8,160}+p_{8,176}+p_{8,136}+p_{8,72}+2p_{8,24} \\ &+p_{8,184}+p_{8,132}+p_{8,148}+2p_{8,84}+p_{8,212}+p_{8,12}+p_{8,204}+p_{8,156} \\ &+p_{8,92}+p_{8,124}+p_{8,34}+2p_{8,98}+p_{8,146}+p_{8,82}+p_{8,114}+p_{8,138} \\ &+p_{7,26}+p_{8,58}+p_{8,134}+p_{8,70}+p_{7,102}+p_{8,14}+p_{8,174}+p_{8,145} \\ &+3p_{8,177}+p_{8,241}+p_{8,201}+p_{8,25}+p_{8,89}+p_{8,165}+p_{8,173}+p_{7,109} \\ &+p_{8,125}+p_{8,163}+p_{8,99}+p_{7,51}+p_{8,139}+p_{8,27}+p_{7,91}+2p_{7,123} \\ &+p_{8,39}+p_{8,151}+p_{8,183}+p_{8,207}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,351} = \frac{1}{2}p_{8,95} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,95}^2 - 4(p_{8,128}+p_{8,160}+p_{8,176}+p_{8,136}+p_{8,72}+2p_{8,24} \\ &+p_{8,184}+p_{8,132}+p_{8,148}+2p_{8,84}+p_{8,212}+p_{8,12}+p_{8,204}+p_{8,156} \\ &+p_{8,92}+p_{8,124}+p_{8,34}+2p_{8,98}+p_{8,146}+p_{8,82}+p_{8,114}+p_{8,138} \\ &+p_{7,26}+p_{8,58}+p_{8,134}+p_{8,70}+p_{7,102}+p_{8,14}+p_{8,174}+p_{8,145} \\ &+3p_{8,177}+p_{8,241}+p_{8,201}+p_{8,25}+p_{8,89}+p_{8,165}+p_{8,173}+p_{7,109} \\ &+p_{8,125}+p_{8,163}+p_{8,99}+p_{7,51}+p_{8,139}+p_{8,27}+p_{7,91}+2p_{7,123} \\ &+p_{8,39}+p_{8,151}+p_{8,183}+p_{8,207}+p_{8,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,223} = \frac{1}{2}p_{8,223} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,223}^2 - 4(p_{8,0}+p_{8,32}+p_{8,48}+p_{8,8}+p_{8,200}+2p_{8,152} \\ &+p_{8,56}+p_{8,4}+p_{8,20}+p_{8,84}+2p_{8,212}+p_{8,140}+p_{8,76}+p_{8,28} \\ &+p_{8,220}+p_{8,252}+p_{8,162}+2p_{8,226}+p_{8,18}+p_{8,210}+p_{8,242} \\ &+p_{8,10}+p_{7,26}+p_{8,186}+p_{8,6}+p_{8,198}+p_{7,102}+p_{8,142}+p_{8,46} \\ &+p_{8,17}+3p_{8,49}+p_{8,113}+p_{8,73}+p_{8,153}+p_{8,217}+p_{8,37}+p_{8,45} \\ &+p_{7,109}+p_{8,253}+p_{8,35}+p_{8,227}+p_{7,51}+p_{8,11}+p_{8,155}+p_{7,91} \\ &+2p_{7,123}+p_{8,167}+p_{8,23}+p_{8,55}+p_{8,79}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,479} = \frac{1}{2}p_{8,223} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,223}^2 - 4(p_{8,0}+p_{8,32}+p_{8,48}+p_{8,8}+p_{8,200}+2p_{8,152} \\ &+p_{8,56}+p_{8,4}+p_{8,20}+p_{8,84}+2p_{8,212}+p_{8,140}+p_{8,76}+p_{8,28} \\ &+p_{8,220}+p_{8,252}+p_{8,162}+2p_{8,226}+p_{8,18}+p_{8,210}+p_{8,242} \\ &+p_{8,10}+p_{7,26}+p_{8,186}+p_{8,6}+p_{8,198}+p_{7,102}+p_{8,142}+p_{8,46} \\ &+p_{8,17}+3p_{8,49}+p_{8,113}+p_{8,73}+p_{8,153}+p_{8,217}+p_{8,37}+p_{8,45} \\ &+p_{7,109}+p_{8,253}+p_{8,35}+p_{8,227}+p_{7,51}+p_{8,11}+p_{8,155}+p_{7,91} \\ &+2p_{7,123}+p_{8,167}+p_{8,23}+p_{8,55}+p_{8,79}+p_{8,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,63} = \frac{1}{2}p_{8,63} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,63}^2 - 4(p_{8,128}+p_{8,96}+p_{8,144}+p_{8,40}+p_{8,104}+p_{8,152} \\ &+2p_{8,248}+p_{8,100}+2p_{8,52}+p_{8,180}+p_{8,116}+p_{8,172}+p_{8,236} \\ &+p_{8,92}+p_{8,60}+p_{8,124}+p_{8,2}+2p_{8,66}+p_{8,82}+p_{8,50}+p_{8,114} \\ &+p_{8,106}+p_{8,26}+p_{7,122}+p_{7,70}+p_{8,38}+p_{8,102}+p_{8,142}+p_{8,238} \\ &+3p_{8,145}+p_{8,209}+p_{8,113}+p_{8,169}+p_{8,57}+p_{8,249}+p_{8,133} \\ &+p_{8,141}+p_{7,77}+p_{8,93}+p_{8,131}+p_{8,67}+p_{7,19}+p_{8,107}+2p_{7,91} \\ &+p_{7,59}+p_{8,251}+p_{8,7}+p_{8,151}+p_{8,119}+p_{8,175}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,319} = \frac{1}{2}p_{8,63} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,63}^2 - 4(p_{8,128}+p_{8,96}+p_{8,144}+p_{8,40}+p_{8,104}+p_{8,152} \\ &+2p_{8,248}+p_{8,100}+2p_{8,52}+p_{8,180}+p_{8,116}+p_{8,172}+p_{8,236} \\ &+p_{8,92}+p_{8,60}+p_{8,124}+p_{8,2}+2p_{8,66}+p_{8,82}+p_{8,50}+p_{8,114} \\ &+p_{8,106}+p_{8,26}+p_{7,122}+p_{7,70}+p_{8,38}+p_{8,102}+p_{8,142}+p_{8,238} \\ &+3p_{8,145}+p_{8,209}+p_{8,113}+p_{8,169}+p_{8,57}+p_{8,249}+p_{8,133} \\ &+p_{8,141}+p_{7,77}+p_{8,93}+p_{8,131}+p_{8,67}+p_{7,19}+p_{8,107}+2p_{7,91} \\ &+p_{7,59}+p_{8,251}+p_{8,7}+p_{8,151}+p_{8,119}+p_{8,175}+p_{8,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,191} = \frac{1}{2}p_{8,191} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,191}^2 - 4(p_{8,0}+p_{8,224}+p_{8,16}+p_{8,168}+p_{8,232}+p_{8,24} \\ &+2p_{8,120}+p_{8,228}+p_{8,52}+2p_{8,180}+p_{8,244}+p_{8,44}+p_{8,108} \\ &+p_{8,220}+p_{8,188}+p_{8,252}+p_{8,130}+2p_{8,194}+p_{8,210}+p_{8,178} \\ &+p_{8,242}+p_{8,234}+p_{8,154}+p_{7,122}+p_{7,70}+p_{8,166}+p_{8,230}+p_{8,14} \\ &+p_{8,110}+3p_{8,17}+p_{8,81}+p_{8,241}+p_{8,41}+p_{8,185}+p_{8,121}+p_{8,5} \\ &+p_{8,13}+p_{7,77}+p_{8,221}+p_{8,3}+p_{8,195}+p_{7,19}+p_{8,235}+2p_{7,91} \\ &+p_{7,59}+p_{8,123}+p_{8,135}+p_{8,23}+p_{8,247}+p_{8,47}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,447} = \frac{1}{2}p_{8,191} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,191}^2 - 4(p_{8,0}+p_{8,224}+p_{8,16}+p_{8,168}+p_{8,232}+p_{8,24} \\ &+2p_{8,120}+p_{8,228}+p_{8,52}+2p_{8,180}+p_{8,244}+p_{8,44}+p_{8,108} \\ &+p_{8,220}+p_{8,188}+p_{8,252}+p_{8,130}+2p_{8,194}+p_{8,210}+p_{8,178} \\ &+p_{8,242}+p_{8,234}+p_{8,154}+p_{7,122}+p_{7,70}+p_{8,166}+p_{8,230}+p_{8,14} \\ &+p_{8,110}+3p_{8,17}+p_{8,81}+p_{8,241}+p_{8,41}+p_{8,185}+p_{8,121}+p_{8,5} \\ &+p_{8,13}+p_{7,77}+p_{8,221}+p_{8,3}+p_{8,195}+p_{7,19}+p_{8,235}+2p_{7,91} \\ &+p_{7,59}+p_{8,123}+p_{8,135}+p_{8,23}+p_{8,247}+p_{8,47}+p_{8,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,127} = \frac{1}{2}p_{8,127} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,127}^2 - 4(p_{8,192}+p_{8,160}+p_{8,208}+p_{8,168}+p_{8,104}+p_{8,216} \\ &+2p_{8,56}+p_{8,164}+p_{8,180}+2p_{8,116}+p_{8,244}+p_{8,44}+p_{8,236}+p_{8,156} \\ &+p_{8,188}+p_{8,124}+2p_{8,130}+p_{8,66}+p_{8,146}+p_{8,178}+p_{8,114}+p_{8,170} \\ &+p_{8,90}+p_{7,58}+p_{7,6}+p_{8,166}+p_{8,102}+p_{8,206}+p_{8,46}+p_{8,17} \\ &+3p_{8,209}+p_{8,177}+p_{8,233}+p_{8,57}+p_{8,121}+p_{8,197}+p_{7,13}+p_{8,205} \\ &+p_{8,157}+p_{8,131}+p_{8,195}+p_{7,83}+p_{8,171}+2p_{7,27}+p_{8,59}+p_{7,123} \\ &+p_{8,71}+p_{8,215}+p_{8,183}+p_{8,239}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,383} = \frac{1}{2}p_{8,127} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,127}^2 - 4(p_{8,192}+p_{8,160}+p_{8,208}+p_{8,168}+p_{8,104}+p_{8,216} \\ &+2p_{8,56}+p_{8,164}+p_{8,180}+2p_{8,116}+p_{8,244}+p_{8,44}+p_{8,236}+p_{8,156} \\ &+p_{8,188}+p_{8,124}+2p_{8,130}+p_{8,66}+p_{8,146}+p_{8,178}+p_{8,114}+p_{8,170} \\ &+p_{8,90}+p_{7,58}+p_{7,6}+p_{8,166}+p_{8,102}+p_{8,206}+p_{8,46}+p_{8,17} \\ &+3p_{8,209}+p_{8,177}+p_{8,233}+p_{8,57}+p_{8,121}+p_{8,197}+p_{7,13}+p_{8,205} \\ &+p_{8,157}+p_{8,131}+p_{8,195}+p_{7,83}+p_{8,171}+2p_{7,27}+p_{8,59}+p_{7,123} \\ &+p_{8,71}+p_{8,215}+p_{8,183}+p_{8,239}+p_{8,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,255} = \frac{1}{2}p_{8,255} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,255}^2 - 4(p_{8,64}+p_{8,32}+p_{8,80}+p_{8,40}+p_{8,232}+p_{8,88} \\ &+2p_{8,184}+p_{8,36}+p_{8,52}+p_{8,116}+2p_{8,244}+p_{8,172}+p_{8,108} \\ &+p_{8,28}+p_{8,60}+p_{8,252}+2p_{8,2}+p_{8,194}+p_{8,18}+p_{8,50}+p_{8,242} \\ &+p_{8,42}+p_{8,218}+p_{7,58}+p_{7,6}+p_{8,38}+p_{8,230}+p_{8,78}+p_{8,174} \\ &+p_{8,145}+3p_{8,81}+p_{8,49}+p_{8,105}+p_{8,185}+p_{8,249}+p_{8,69}+p_{7,13} \\ &+p_{8,77}+p_{8,29}+p_{8,3}+p_{8,67}+p_{7,83}+p_{8,43}+2p_{7,27}+p_{8,187} \\ &+p_{7,123}+p_{8,199}+p_{8,87}+p_{8,55}+p_{8,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{9,511} = \frac{1}{2}p_{8,255} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{8,255}^2 - 4(p_{8,64}+p_{8,32}+p_{8,80}+p_{8,40}+p_{8,232}+p_{8,88} \\ &+2p_{8,184}+p_{8,36}+p_{8,52}+p_{8,116}+2p_{8,244}+p_{8,172}+p_{8,108} \\ &+p_{8,28}+p_{8,60}+p_{8,252}+2p_{8,2}+p_{8,194}+p_{8,18}+p_{8,50}+p_{8,242} \\ &+p_{8,42}+p_{8,218}+p_{7,58}+p_{7,6}+p_{8,38}+p_{8,230}+p_{8,78}+p_{8,174} \\ &+p_{8,145}+3p_{8,81}+p_{8,49}+p_{8,105}+p_{8,185}+p_{8,249}+p_{8,69}+p_{7,13} \\ &+p_{8,77}+p_{8,29}+p_{8,3}+p_{8,67}+p_{7,83}+p_{8,43}+2p_{7,27}+p_{8,187} \\ &+p_{7,123}+p_{8,199}+p_{8,87}+p_{8,55}+p_{8,111}+p_{8,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,0} = \frac{1}{2}p_{9,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,0}^2 - 4(p_{9,80}+p_{9,464}+p_{9,48}+p_{9,40}+p_{9,232}+p_{9,280} \\ &+p_{9,268}+p_{9,108}+p_{9,348}+2p_{9,450}+p_{9,274}+p_{9,210}+p_{9,378} \\ &+2p_{9,134}+p_{9,302}+2p_{9,174}+p_{9,430}+p_{9,225}+p_{9,113}+p_{9,105} \\ &+p_{9,389}+p_{9,277}+2p_{9,85}+2p_{9,67}+p_{9,91}+2p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,512} = \frac{1}{2}p_{9,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,0}^2 - 4(p_{9,80}+p_{9,464}+p_{9,48}+p_{9,40}+p_{9,232}+p_{9,280} \\ &+p_{9,268}+p_{9,108}+p_{9,348}+2p_{9,450}+p_{9,274}+p_{9,210}+p_{9,378} \\ &+2p_{9,134}+p_{9,302}+2p_{9,174}+p_{9,430}+p_{9,225}+p_{9,113}+p_{9,105} \\ &+p_{9,389}+p_{9,277}+2p_{9,85}+2p_{9,67}+p_{9,91}+2p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,256} = \frac{1}{2}p_{9,256} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,256}^2 - 4(p_{9,336}+p_{9,208}+p_{9,304}+p_{9,296}+p_{9,488} \\ &+p_{9,24}+p_{9,12}+p_{9,364}+p_{9,92}+2p_{9,194}+p_{9,18}+p_{9,466} \\ &+p_{9,122}+2p_{9,390}+p_{9,46}+p_{9,174}+2p_{9,430}+p_{9,481}+p_{9,369} \\ &+p_{9,361}+p_{9,133}+p_{9,21}+2p_{9,341}+2p_{9,323}+p_{9,347}+2p_{9,343}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,768} = \frac{1}{2}p_{9,256} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,256}^2 - 4(p_{9,336}+p_{9,208}+p_{9,304}+p_{9,296}+p_{9,488} \\ &+p_{9,24}+p_{9,12}+p_{9,364}+p_{9,92}+2p_{9,194}+p_{9,18}+p_{9,466} \\ &+p_{9,122}+2p_{9,390}+p_{9,46}+p_{9,174}+2p_{9,430}+p_{9,481}+p_{9,369} \\ &+p_{9,361}+p_{9,133}+p_{9,21}+2p_{9,341}+2p_{9,323}+p_{9,347}+2p_{9,343}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,128} = \frac{1}{2}p_{9,128} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,128}^2 - 4(p_{9,80}+p_{9,208}+p_{9,176}+p_{9,168}+p_{9,360} \\ &+p_{9,408}+p_{9,396}+p_{9,236}+p_{9,476}+2p_{9,66}+p_{9,402}+p_{9,338} \\ &+p_{9,506}+2p_{9,262}+p_{9,46}+2p_{9,302}+p_{9,430}+p_{9,353}+p_{9,241} \\ &+p_{9,233}+p_{9,5}+p_{9,405}+2p_{9,213}+2p_{9,195}+p_{9,219}+2p_{9,215}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,640} = \frac{1}{2}p_{9,128} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,128}^2 - 4(p_{9,80}+p_{9,208}+p_{9,176}+p_{9,168}+p_{9,360} \\ &+p_{9,408}+p_{9,396}+p_{9,236}+p_{9,476}+2p_{9,66}+p_{9,402}+p_{9,338} \\ &+p_{9,506}+2p_{9,262}+p_{9,46}+2p_{9,302}+p_{9,430}+p_{9,353}+p_{9,241} \\ &+p_{9,233}+p_{9,5}+p_{9,405}+2p_{9,213}+2p_{9,195}+p_{9,219}+2p_{9,215}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,384} = \frac{1}{2}p_{9,384} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,384}^2 - 4(p_{9,336}+p_{9,464}+p_{9,432}+p_{9,424}+p_{9,104} \\ &+p_{9,152}+p_{9,140}+p_{9,492}+p_{9,220}+2p_{9,322}+p_{9,146}+p_{9,82} \\ &+p_{9,250}+2p_{9,6}+2p_{9,46}+p_{9,302}+p_{9,174}+p_{9,97}+p_{9,497} \\ &+p_{9,489}+p_{9,261}+p_{9,149}+2p_{9,469}+2p_{9,451}+p_{9,475}+2p_{9,471}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,64} = \frac{1}{2}p_{9,64} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,64}^2 - 4(p_{9,16}+p_{9,144}+p_{9,112}+p_{9,296}+p_{9,104}+p_{9,344} \\ &+p_{9,332}+p_{9,172}+p_{9,412}+2p_{9,2}+p_{9,274}+p_{9,338}+p_{9,442} \\ &+2p_{9,198}+p_{9,366}+2p_{9,238}+p_{9,494}+p_{9,289}+p_{9,177}+p_{9,169} \\ &+p_{9,453}+2p_{9,149}+p_{9,341}+2p_{9,131}+p_{9,155}+2p_{9,151}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,576} = \frac{1}{2}p_{9,64} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,64}^2 - 4(p_{9,16}+p_{9,144}+p_{9,112}+p_{9,296}+p_{9,104}+p_{9,344} \\ &+p_{9,332}+p_{9,172}+p_{9,412}+2p_{9,2}+p_{9,274}+p_{9,338}+p_{9,442} \\ &+2p_{9,198}+p_{9,366}+2p_{9,238}+p_{9,494}+p_{9,289}+p_{9,177}+p_{9,169} \\ &+p_{9,453}+2p_{9,149}+p_{9,341}+2p_{9,131}+p_{9,155}+2p_{9,151}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,192} = \frac{1}{2}p_{9,192} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,192}^2 - 4(p_{9,272}+p_{9,144}+p_{9,240}+p_{9,424}+p_{9,232} \\ &+p_{9,472}+p_{9,460}+p_{9,300}+p_{9,28}+2p_{9,130}+p_{9,402}+p_{9,466} \\ &+p_{9,58}+2p_{9,326}+p_{9,110}+2p_{9,366}+p_{9,494}+p_{9,417}+p_{9,305} \\ &+p_{9,297}+p_{9,69}+2p_{9,277}+p_{9,469}+2p_{9,259}+p_{9,283}+2p_{9,279}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,704} = \frac{1}{2}p_{9,192} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,192}^2 - 4(p_{9,272}+p_{9,144}+p_{9,240}+p_{9,424}+p_{9,232} \\ &+p_{9,472}+p_{9,460}+p_{9,300}+p_{9,28}+2p_{9,130}+p_{9,402}+p_{9,466} \\ &+p_{9,58}+2p_{9,326}+p_{9,110}+2p_{9,366}+p_{9,494}+p_{9,417}+p_{9,305} \\ &+p_{9,297}+p_{9,69}+2p_{9,277}+p_{9,469}+2p_{9,259}+p_{9,283}+2p_{9,279}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,960} = \frac{1}{2}p_{9,448} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,448}^2 - 4(p_{9,16}+p_{9,400}+p_{9,496}+p_{9,168}+p_{9,488} \\ &+p_{9,216}+p_{9,204}+p_{9,44}+p_{9,284}+2p_{9,386}+p_{9,146}+p_{9,210} \\ &+p_{9,314}+2p_{9,70}+2p_{9,110}+p_{9,366}+p_{9,238}+p_{9,161}+p_{9,49} \\ &+p_{9,41}+p_{9,325}+2p_{9,21}+p_{9,213}+2p_{9,3}+p_{9,27}+2p_{9,23}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 3 unreferenced roots were skipped} {\footnotesize \[p_{10,800} = \frac{1}{2}p_{9,288} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,288}^2 - 4(p_{9,336}+p_{9,368}+p_{9,240}+p_{9,8}+p_{9,328}+p_{9,56} \\ &+p_{9,396}+p_{9,44}+p_{9,124}+2p_{9,226}+p_{9,50}+p_{9,498}+p_{9,154} \\ &+2p_{9,422}+p_{9,78}+p_{9,206}+2p_{9,462}+p_{9,1}+p_{9,401}+p_{9,393} \\ &+p_{9,165}+p_{9,53}+2p_{9,373}+2p_{9,355}+p_{9,379}+2p_{9,375}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,160} = \frac{1}{2}p_{9,160} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,160}^2 - 4(p_{9,208}+p_{9,112}+p_{9,240}+p_{9,392}+p_{9,200} \\ &+p_{9,440}+p_{9,268}+p_{9,428}+p_{9,508}+2p_{9,98}+p_{9,434}+p_{9,370} \\ &+p_{9,26}+2p_{9,294}+p_{9,78}+2p_{9,334}+p_{9,462}+p_{9,385}+p_{9,273} \\ &+p_{9,265}+p_{9,37}+p_{9,437}+2p_{9,245}+2p_{9,227}+p_{9,251}+2p_{9,247}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,416} = \frac{1}{2}p_{9,416} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,416}^2 - 4(p_{9,464}+p_{9,368}+p_{9,496}+p_{9,136}+p_{9,456} \\ &+p_{9,184}+p_{9,12}+p_{9,172}+p_{9,252}+2p_{9,354}+p_{9,178}+p_{9,114} \\ &+p_{9,282}+2p_{9,38}+2p_{9,78}+p_{9,334}+p_{9,206}+p_{9,129}+p_{9,17} \\ &+p_{9,9}+p_{9,293}+p_{9,181}+2p_{9,501}+2p_{9,483}+p_{9,507}+2p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,928} = \frac{1}{2}p_{9,416} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,416}^2 - 4(p_{9,464}+p_{9,368}+p_{9,496}+p_{9,136}+p_{9,456} \\ &+p_{9,184}+p_{9,12}+p_{9,172}+p_{9,252}+2p_{9,354}+p_{9,178}+p_{9,114} \\ &+p_{9,282}+2p_{9,38}+2p_{9,78}+p_{9,334}+p_{9,206}+p_{9,129}+p_{9,17} \\ &+p_{9,9}+p_{9,293}+p_{9,181}+2p_{9,501}+2p_{9,483}+p_{9,507}+2p_{9,503}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,608} = \frac{1}{2}p_{9,96} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,96}^2 - 4(p_{9,144}+p_{9,48}+p_{9,176}+p_{9,136}+p_{9,328}+p_{9,376} \\ &+p_{9,204}+p_{9,364}+p_{9,444}+2p_{9,34}+p_{9,306}+p_{9,370}+p_{9,474} \\ &+2p_{9,230}+p_{9,14}+2p_{9,270}+p_{9,398}+p_{9,321}+p_{9,209}+p_{9,201} \\ &+p_{9,485}+2p_{9,181}+p_{9,373}+2p_{9,163}+p_{9,187}+2p_{9,183}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,352} = \frac{1}{2}p_{9,352} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,352}^2 - 4(p_{9,400}+p_{9,304}+p_{9,432}+p_{9,392}+p_{9,72} \\ &+p_{9,120}+p_{9,460}+p_{9,108}+p_{9,188}+2p_{9,290}+p_{9,50}+p_{9,114} \\ &+p_{9,218}+2p_{9,486}+2p_{9,14}+p_{9,270}+p_{9,142}+p_{9,65}+p_{9,465} \\ &+p_{9,457}+p_{9,229}+2p_{9,437}+p_{9,117}+2p_{9,419}+p_{9,443}+2p_{9,439}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,864} = \frac{1}{2}p_{9,352} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,352}^2 - 4(p_{9,400}+p_{9,304}+p_{9,432}+p_{9,392}+p_{9,72} \\ &+p_{9,120}+p_{9,460}+p_{9,108}+p_{9,188}+2p_{9,290}+p_{9,50}+p_{9,114} \\ &+p_{9,218}+2p_{9,486}+2p_{9,14}+p_{9,270}+p_{9,142}+p_{9,65}+p_{9,465} \\ &+p_{9,457}+p_{9,229}+2p_{9,437}+p_{9,117}+2p_{9,419}+p_{9,443}+2p_{9,439}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,224} = \frac{1}{2}p_{9,224} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,224}^2 - 4(p_{9,272}+p_{9,304}+p_{9,176}+p_{9,264}+p_{9,456} \\ &+p_{9,504}+p_{9,332}+p_{9,492}+p_{9,60}+2p_{9,162}+p_{9,434}+p_{9,498} \\ &+p_{9,90}+2p_{9,358}+p_{9,14}+p_{9,142}+2p_{9,398}+p_{9,449}+p_{9,337} \\ &+p_{9,329}+p_{9,101}+2p_{9,309}+p_{9,501}+2p_{9,291}+p_{9,315}+2p_{9,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,736} = \frac{1}{2}p_{9,224} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,224}^2 - 4(p_{9,272}+p_{9,304}+p_{9,176}+p_{9,264}+p_{9,456} \\ &+p_{9,504}+p_{9,332}+p_{9,492}+p_{9,60}+2p_{9,162}+p_{9,434}+p_{9,498} \\ &+p_{9,90}+2p_{9,358}+p_{9,14}+p_{9,142}+2p_{9,398}+p_{9,449}+p_{9,337} \\ &+p_{9,329}+p_{9,101}+2p_{9,309}+p_{9,501}+2p_{9,291}+p_{9,315}+2p_{9,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,480} = \frac{1}{2}p_{9,480} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,480}^2 - 4(p_{9,16}+p_{9,48}+p_{9,432}+p_{9,8}+p_{9,200}+p_{9,248} \\ &+p_{9,76}+p_{9,236}+p_{9,316}+2p_{9,418}+p_{9,178}+p_{9,242}+p_{9,346} \\ &+2p_{9,102}+p_{9,270}+2p_{9,142}+p_{9,398}+p_{9,193}+p_{9,81}+p_{9,73} \\ &+p_{9,357}+2p_{9,53}+p_{9,245}+2p_{9,35}+p_{9,59}+2p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,992} = \frac{1}{2}p_{9,480} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,480}^2 - 4(p_{9,16}+p_{9,48}+p_{9,432}+p_{9,8}+p_{9,200}+p_{9,248} \\ &+p_{9,76}+p_{9,236}+p_{9,316}+2p_{9,418}+p_{9,178}+p_{9,242}+p_{9,346} \\ &+2p_{9,102}+p_{9,270}+2p_{9,142}+p_{9,398}+p_{9,193}+p_{9,81}+p_{9,73} \\ &+p_{9,357}+2p_{9,53}+p_{9,245}+2p_{9,35}+p_{9,59}+2p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,16} = \frac{1}{2}p_{9,16} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,16}^2 - 4(p_{9,64}+p_{9,96}+p_{9,480}+p_{9,296}+p_{9,56}+p_{9,248} \\ &+p_{9,364}+p_{9,284}+p_{9,124}+p_{9,290}+p_{9,226}+2p_{9,466}+p_{9,394} \\ &+2p_{9,150}+p_{9,318}+2p_{9,190}+p_{9,446}+p_{9,129}+p_{9,241}+p_{9,121} \\ &+p_{9,293}+2p_{9,101}+p_{9,405}+2p_{9,83}+p_{9,107}+2p_{9,103}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,528} = \frac{1}{2}p_{9,16} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,16}^2 - 4(p_{9,64}+p_{9,96}+p_{9,480}+p_{9,296}+p_{9,56}+p_{9,248} \\ &+p_{9,364}+p_{9,284}+p_{9,124}+p_{9,290}+p_{9,226}+2p_{9,466}+p_{9,394} \\ &+2p_{9,150}+p_{9,318}+2p_{9,190}+p_{9,446}+p_{9,129}+p_{9,241}+p_{9,121} \\ &+p_{9,293}+2p_{9,101}+p_{9,405}+2p_{9,83}+p_{9,107}+2p_{9,103}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,272} = \frac{1}{2}p_{9,272} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,272}^2 - 4(p_{9,320}+p_{9,352}+p_{9,224}+p_{9,40}+p_{9,312} \\ &+p_{9,504}+p_{9,108}+p_{9,28}+p_{9,380}+p_{9,34}+p_{9,482}+2p_{9,210} \\ &+p_{9,138}+2p_{9,406}+p_{9,62}+p_{9,190}+2p_{9,446}+p_{9,385}+p_{9,497} \\ &+p_{9,377}+p_{9,37}+2p_{9,357}+p_{9,149}+2p_{9,339}+p_{9,363}+2p_{9,359}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,784} = \frac{1}{2}p_{9,272} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,272}^2 - 4(p_{9,320}+p_{9,352}+p_{9,224}+p_{9,40}+p_{9,312} \\ &+p_{9,504}+p_{9,108}+p_{9,28}+p_{9,380}+p_{9,34}+p_{9,482}+2p_{9,210} \\ &+p_{9,138}+2p_{9,406}+p_{9,62}+p_{9,190}+2p_{9,446}+p_{9,385}+p_{9,497} \\ &+p_{9,377}+p_{9,37}+2p_{9,357}+p_{9,149}+2p_{9,339}+p_{9,363}+2p_{9,359}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,656} = \frac{1}{2}p_{9,144} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,144}^2 - 4(p_{9,192}+p_{9,96}+p_{9,224}+p_{9,424}+p_{9,184} \\ &+p_{9,376}+p_{9,492}+p_{9,412}+p_{9,252}+p_{9,418}+p_{9,354}+2p_{9,82} \\ &+p_{9,10}+2p_{9,278}+p_{9,62}+2p_{9,318}+p_{9,446}+p_{9,257}+p_{9,369} \\ &+p_{9,249}+p_{9,421}+2p_{9,229}+p_{9,21}+2p_{9,211}+p_{9,235}+2p_{9,231}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,400} = \frac{1}{2}p_{9,400} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,400}^2 - 4(p_{9,448}+p_{9,352}+p_{9,480}+p_{9,168}+p_{9,440} \\ &+p_{9,120}+p_{9,236}+p_{9,156}+p_{9,508}+p_{9,162}+p_{9,98}+2p_{9,338} \\ &+p_{9,266}+2p_{9,22}+2p_{9,62}+p_{9,318}+p_{9,190}+p_{9,1}+p_{9,113} \\ &+p_{9,505}+p_{9,165}+2p_{9,485}+p_{9,277}+2p_{9,467}+p_{9,491}+2p_{9,487}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,912} = \frac{1}{2}p_{9,400} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,400}^2 - 4(p_{9,448}+p_{9,352}+p_{9,480}+p_{9,168}+p_{9,440} \\ &+p_{9,120}+p_{9,236}+p_{9,156}+p_{9,508}+p_{9,162}+p_{9,98}+2p_{9,338} \\ &+p_{9,266}+2p_{9,22}+2p_{9,62}+p_{9,318}+p_{9,190}+p_{9,1}+p_{9,113} \\ &+p_{9,505}+p_{9,165}+2p_{9,485}+p_{9,277}+2p_{9,467}+p_{9,491}+2p_{9,487}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,80} = \frac{1}{2}p_{9,80} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,80}^2 - 4(p_{9,128}+p_{9,32}+p_{9,160}+p_{9,360}+p_{9,312}+p_{9,120} \\ &+p_{9,428}+p_{9,348}+p_{9,188}+p_{9,290}+p_{9,354}+2p_{9,18}+p_{9,458} \\ &+2p_{9,214}+p_{9,382}+2p_{9,254}+p_{9,510}+p_{9,193}+p_{9,305}+p_{9,185} \\ &+2p_{9,165}+p_{9,357}+p_{9,469}+2p_{9,147}+p_{9,171}+2p_{9,167}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,592} = \frac{1}{2}p_{9,80} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,80}^2 - 4(p_{9,128}+p_{9,32}+p_{9,160}+p_{9,360}+p_{9,312}+p_{9,120} \\ &+p_{9,428}+p_{9,348}+p_{9,188}+p_{9,290}+p_{9,354}+2p_{9,18}+p_{9,458} \\ &+2p_{9,214}+p_{9,382}+2p_{9,254}+p_{9,510}+p_{9,193}+p_{9,305}+p_{9,185} \\ &+2p_{9,165}+p_{9,357}+p_{9,469}+2p_{9,147}+p_{9,171}+2p_{9,167}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,336} = \frac{1}{2}p_{9,336} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,336}^2 - 4(p_{9,384}+p_{9,288}+p_{9,416}+p_{9,104}+p_{9,56} \\ &+p_{9,376}+p_{9,172}+p_{9,92}+p_{9,444}+p_{9,34}+p_{9,98}+2p_{9,274} \\ &+p_{9,202}+2p_{9,470}+p_{9,126}+p_{9,254}+2p_{9,510}+p_{9,449}+p_{9,49} \\ &+p_{9,441}+2p_{9,421}+p_{9,101}+p_{9,213}+2p_{9,403}+p_{9,427}+2p_{9,423}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,848} = \frac{1}{2}p_{9,336} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,336}^2 - 4(p_{9,384}+p_{9,288}+p_{9,416}+p_{9,104}+p_{9,56} \\ &+p_{9,376}+p_{9,172}+p_{9,92}+p_{9,444}+p_{9,34}+p_{9,98}+2p_{9,274} \\ &+p_{9,202}+2p_{9,470}+p_{9,126}+p_{9,254}+2p_{9,510}+p_{9,449}+p_{9,49} \\ &+p_{9,441}+2p_{9,421}+p_{9,101}+p_{9,213}+2p_{9,403}+p_{9,427}+2p_{9,423}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,208} = \frac{1}{2}p_{9,208} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,208}^2 - 4(p_{9,256}+p_{9,288}+p_{9,160}+p_{9,488}+p_{9,440} \\ &+p_{9,248}+p_{9,44}+p_{9,476}+p_{9,316}+p_{9,418}+p_{9,482}+2p_{9,146} \\ &+p_{9,74}+2p_{9,342}+p_{9,126}+2p_{9,382}+p_{9,510}+p_{9,321}+p_{9,433} \\ &+p_{9,313}+2p_{9,293}+p_{9,485}+p_{9,85}+2p_{9,275}+p_{9,299}+2p_{9,295}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,720} = \frac{1}{2}p_{9,208} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,208}^2 - 4(p_{9,256}+p_{9,288}+p_{9,160}+p_{9,488}+p_{9,440} \\ &+p_{9,248}+p_{9,44}+p_{9,476}+p_{9,316}+p_{9,418}+p_{9,482}+2p_{9,146} \\ &+p_{9,74}+2p_{9,342}+p_{9,126}+2p_{9,382}+p_{9,510}+p_{9,321}+p_{9,433} \\ &+p_{9,313}+2p_{9,293}+p_{9,485}+p_{9,85}+2p_{9,275}+p_{9,299}+2p_{9,295}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,976} = \frac{1}{2}p_{9,464} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,464}^2 - 4(p_{9,0}+p_{9,32}+p_{9,416}+p_{9,232}+p_{9,184} \\ &+p_{9,504}+p_{9,300}+p_{9,220}+p_{9,60}+p_{9,162}+p_{9,226}+2p_{9,402} \\ &+p_{9,330}+2p_{9,86}+2p_{9,126}+p_{9,382}+p_{9,254}+p_{9,65}+p_{9,177} \\ &+p_{9,57}+2p_{9,37}+p_{9,229}+p_{9,341}+2p_{9,19}+p_{9,43}+2p_{9,39}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,304} = \frac{1}{2}p_{9,304} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,304}^2 - 4(p_{9,256}+p_{9,384}+p_{9,352}+p_{9,72}+p_{9,24} \\ &+p_{9,344}+p_{9,140}+p_{9,412}+p_{9,60}+p_{9,2}+p_{9,66}+2p_{9,242} \\ &+p_{9,170}+2p_{9,438}+p_{9,94}+p_{9,222}+2p_{9,478}+p_{9,417}+p_{9,17} \\ &+p_{9,409}+2p_{9,389}+p_{9,69}+p_{9,181}+2p_{9,371}+p_{9,395}+2p_{9,391}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,816} = \frac{1}{2}p_{9,304} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,304}^2 - 4(p_{9,256}+p_{9,384}+p_{9,352}+p_{9,72}+p_{9,24} \\ &+p_{9,344}+p_{9,140}+p_{9,412}+p_{9,60}+p_{9,2}+p_{9,66}+2p_{9,242} \\ &+p_{9,170}+2p_{9,438}+p_{9,94}+p_{9,222}+2p_{9,478}+p_{9,417}+p_{9,17} \\ &+p_{9,409}+2p_{9,389}+p_{9,69}+p_{9,181}+2p_{9,371}+p_{9,395}+2p_{9,391}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,176} = \frac{1}{2}p_{9,176} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,176}^2 - 4(p_{9,256}+p_{9,128}+p_{9,224}+p_{9,456}+p_{9,408} \\ &+p_{9,216}+p_{9,12}+p_{9,284}+p_{9,444}+p_{9,386}+p_{9,450}+2p_{9,114} \\ &+p_{9,42}+2p_{9,310}+p_{9,94}+2p_{9,350}+p_{9,478}+p_{9,289}+p_{9,401} \\ &+p_{9,281}+2p_{9,261}+p_{9,453}+p_{9,53}+2p_{9,243}+p_{9,267}+2p_{9,263}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,688} = \frac{1}{2}p_{9,176} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,176}^2 - 4(p_{9,256}+p_{9,128}+p_{9,224}+p_{9,456}+p_{9,408} \\ &+p_{9,216}+p_{9,12}+p_{9,284}+p_{9,444}+p_{9,386}+p_{9,450}+2p_{9,114} \\ &+p_{9,42}+2p_{9,310}+p_{9,94}+2p_{9,350}+p_{9,478}+p_{9,289}+p_{9,401} \\ &+p_{9,281}+2p_{9,261}+p_{9,453}+p_{9,53}+2p_{9,243}+p_{9,267}+2p_{9,263}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,432} = \frac{1}{2}p_{9,432} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,432}^2 - 4(p_{9,0}+p_{9,384}+p_{9,480}+p_{9,200}+p_{9,152} \\ &+p_{9,472}+p_{9,268}+p_{9,28}+p_{9,188}+p_{9,130}+p_{9,194}+2p_{9,370} \\ &+p_{9,298}+2p_{9,54}+2p_{9,94}+p_{9,350}+p_{9,222}+p_{9,33}+p_{9,145} \\ &+p_{9,25}+2p_{9,5}+p_{9,197}+p_{9,309}+2p_{9,499}+p_{9,11}+2p_{9,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,944} = \frac{1}{2}p_{9,432} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,432}^2 - 4(p_{9,0}+p_{9,384}+p_{9,480}+p_{9,200}+p_{9,152} \\ &+p_{9,472}+p_{9,268}+p_{9,28}+p_{9,188}+p_{9,130}+p_{9,194}+2p_{9,370} \\ &+p_{9,298}+2p_{9,54}+2p_{9,94}+p_{9,350}+p_{9,222}+p_{9,33}+p_{9,145} \\ &+p_{9,25}+2p_{9,5}+p_{9,197}+p_{9,309}+2p_{9,499}+p_{9,11}+2p_{9,7}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,112} = \frac{1}{2}p_{9,112} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,112}^2 - 4(p_{9,64}+p_{9,192}+p_{9,160}+p_{9,392}+p_{9,152} \\ &+p_{9,344}+p_{9,460}+p_{9,220}+p_{9,380}+p_{9,386}+p_{9,322}+2p_{9,50} \\ &+p_{9,490}+2p_{9,246}+p_{9,30}+2p_{9,286}+p_{9,414}+p_{9,225}+p_{9,337} \\ &+p_{9,217}+p_{9,389}+2p_{9,197}+p_{9,501}+2p_{9,179}+p_{9,203}+2p_{9,199}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,624} = \frac{1}{2}p_{9,112} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,112}^2 - 4(p_{9,64}+p_{9,192}+p_{9,160}+p_{9,392}+p_{9,152} \\ &+p_{9,344}+p_{9,460}+p_{9,220}+p_{9,380}+p_{9,386}+p_{9,322}+2p_{9,50} \\ &+p_{9,490}+2p_{9,246}+p_{9,30}+2p_{9,286}+p_{9,414}+p_{9,225}+p_{9,337} \\ &+p_{9,217}+p_{9,389}+2p_{9,197}+p_{9,501}+2p_{9,179}+p_{9,203}+2p_{9,199}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,368} = \frac{1}{2}p_{9,368} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,368}^2 - 4(p_{9,320}+p_{9,448}+p_{9,416}+p_{9,136}+p_{9,408} \\ &+p_{9,88}+p_{9,204}+p_{9,476}+p_{9,124}+p_{9,130}+p_{9,66}+2p_{9,306} \\ &+p_{9,234}+2p_{9,502}+2p_{9,30}+p_{9,286}+p_{9,158}+p_{9,481}+p_{9,81} \\ &+p_{9,473}+p_{9,133}+2p_{9,453}+p_{9,245}+2p_{9,435}+p_{9,459}+2p_{9,455}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,880} = \frac{1}{2}p_{9,368} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,368}^2 - 4(p_{9,320}+p_{9,448}+p_{9,416}+p_{9,136}+p_{9,408} \\ &+p_{9,88}+p_{9,204}+p_{9,476}+p_{9,124}+p_{9,130}+p_{9,66}+2p_{9,306} \\ &+p_{9,234}+2p_{9,502}+2p_{9,30}+p_{9,286}+p_{9,158}+p_{9,481}+p_{9,81} \\ &+p_{9,473}+p_{9,133}+2p_{9,453}+p_{9,245}+2p_{9,435}+p_{9,459}+2p_{9,455}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,240} = \frac{1}{2}p_{9,240} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,240}^2 - 4(p_{9,320}+p_{9,192}+p_{9,288}+p_{9,8}+p_{9,280} \\ &+p_{9,472}+p_{9,76}+p_{9,348}+p_{9,508}+p_{9,2}+p_{9,450}+2p_{9,178} \\ &+p_{9,106}+2p_{9,374}+p_{9,30}+p_{9,158}+2p_{9,414}+p_{9,353}+p_{9,465} \\ &+p_{9,345}+p_{9,5}+2p_{9,325}+p_{9,117}+2p_{9,307}+p_{9,331}+2p_{9,327}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,752} = \frac{1}{2}p_{9,240} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,240}^2 - 4(p_{9,320}+p_{9,192}+p_{9,288}+p_{9,8}+p_{9,280} \\ &+p_{9,472}+p_{9,76}+p_{9,348}+p_{9,508}+p_{9,2}+p_{9,450}+2p_{9,178} \\ &+p_{9,106}+2p_{9,374}+p_{9,30}+p_{9,158}+2p_{9,414}+p_{9,353}+p_{9,465} \\ &+p_{9,345}+p_{9,5}+2p_{9,325}+p_{9,117}+2p_{9,307}+p_{9,331}+2p_{9,327}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,496} = \frac{1}{2}p_{9,496} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,496}^2 - 4(p_{9,64}+p_{9,448}+p_{9,32}+p_{9,264}+p_{9,24}+p_{9,216} \\ &+p_{9,332}+p_{9,92}+p_{9,252}+p_{9,258}+p_{9,194}+2p_{9,434}+p_{9,362} \\ &+2p_{9,118}+p_{9,286}+2p_{9,158}+p_{9,414}+p_{9,97}+p_{9,209}+p_{9,89} \\ &+p_{9,261}+2p_{9,69}+p_{9,373}+2p_{9,51}+p_{9,75}+2p_{9,71}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1008} = \frac{1}{2}p_{9,496} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,496}^2 - 4(p_{9,64}+p_{9,448}+p_{9,32}+p_{9,264}+p_{9,24}+p_{9,216} \\ &+p_{9,332}+p_{9,92}+p_{9,252}+p_{9,258}+p_{9,194}+2p_{9,434}+p_{9,362} \\ &+2p_{9,118}+p_{9,286}+2p_{9,158}+p_{9,414}+p_{9,97}+p_{9,209}+p_{9,89} \\ &+p_{9,261}+2p_{9,69}+p_{9,373}+2p_{9,51}+p_{9,75}+2p_{9,71}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,264} = \frac{1}{2}p_{9,264} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,264}^2 - 4(p_{9,32}+p_{9,304}+p_{9,496}+p_{9,344}+p_{9,216} \\ &+p_{9,312}+p_{9,100}+p_{9,20}+p_{9,372}+p_{9,130}+2p_{9,202}+p_{9,26} \\ &+p_{9,474}+p_{9,54}+p_{9,182}+2p_{9,438}+2p_{9,398}+p_{9,369}+p_{9,489} \\ &+p_{9,377}+p_{9,141}+p_{9,29}+2p_{9,349}+p_{9,355}+2p_{9,331}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,776} = \frac{1}{2}p_{9,264} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,264}^2 - 4(p_{9,32}+p_{9,304}+p_{9,496}+p_{9,344}+p_{9,216} \\ &+p_{9,312}+p_{9,100}+p_{9,20}+p_{9,372}+p_{9,130}+2p_{9,202}+p_{9,26} \\ &+p_{9,474}+p_{9,54}+p_{9,182}+2p_{9,438}+2p_{9,398}+p_{9,369}+p_{9,489} \\ &+p_{9,377}+p_{9,141}+p_{9,29}+2p_{9,349}+p_{9,355}+2p_{9,331}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,136} = \frac{1}{2}p_{9,136} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,136}^2 - 4(p_{9,416}+p_{9,176}+p_{9,368}+p_{9,88}+p_{9,216} \\ &+p_{9,184}+p_{9,484}+p_{9,404}+p_{9,244}+p_{9,2}+2p_{9,74}+p_{9,410} \\ &+p_{9,346}+p_{9,54}+2p_{9,310}+p_{9,438}+2p_{9,270}+p_{9,241}+p_{9,361} \\ &+p_{9,249}+p_{9,13}+p_{9,413}+2p_{9,221}+p_{9,227}+2p_{9,203}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,648} = \frac{1}{2}p_{9,136} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,136}^2 - 4(p_{9,416}+p_{9,176}+p_{9,368}+p_{9,88}+p_{9,216} \\ &+p_{9,184}+p_{9,484}+p_{9,404}+p_{9,244}+p_{9,2}+2p_{9,74}+p_{9,410} \\ &+p_{9,346}+p_{9,54}+2p_{9,310}+p_{9,438}+2p_{9,270}+p_{9,241}+p_{9,361} \\ &+p_{9,249}+p_{9,13}+p_{9,413}+2p_{9,221}+p_{9,227}+2p_{9,203}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,392} = \frac{1}{2}p_{9,392} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,392}^2 - 4(p_{9,160}+p_{9,432}+p_{9,112}+p_{9,344}+p_{9,472} \\ &+p_{9,440}+p_{9,228}+p_{9,148}+p_{9,500}+p_{9,258}+2p_{9,330}+p_{9,154} \\ &+p_{9,90}+2p_{9,54}+p_{9,310}+p_{9,182}+2p_{9,14}+p_{9,497}+p_{9,105} \\ &+p_{9,505}+p_{9,269}+p_{9,157}+2p_{9,477}+p_{9,483}+2p_{9,459}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,904} = \frac{1}{2}p_{9,392} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,392}^2 - 4(p_{9,160}+p_{9,432}+p_{9,112}+p_{9,344}+p_{9,472} \\ &+p_{9,440}+p_{9,228}+p_{9,148}+p_{9,500}+p_{9,258}+2p_{9,330}+p_{9,154} \\ &+p_{9,90}+2p_{9,54}+p_{9,310}+p_{9,182}+2p_{9,14}+p_{9,497}+p_{9,105} \\ &+p_{9,505}+p_{9,269}+p_{9,157}+2p_{9,477}+p_{9,483}+2p_{9,459}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,72} = \frac{1}{2}p_{9,72} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,72}^2 - 4(p_{9,352}+p_{9,304}+p_{9,112}+p_{9,24}+p_{9,152}+p_{9,120} \\ &+p_{9,420}+p_{9,340}+p_{9,180}+p_{9,450}+2p_{9,10}+p_{9,282}+p_{9,346} \\ &+p_{9,374}+2p_{9,246}+p_{9,502}+2p_{9,206}+p_{9,177}+p_{9,297}+p_{9,185} \\ &+p_{9,461}+2p_{9,157}+p_{9,349}+p_{9,163}+2p_{9,139}+2p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,584} = \frac{1}{2}p_{9,72} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,72}^2 - 4(p_{9,352}+p_{9,304}+p_{9,112}+p_{9,24}+p_{9,152}+p_{9,120} \\ &+p_{9,420}+p_{9,340}+p_{9,180}+p_{9,450}+2p_{9,10}+p_{9,282}+p_{9,346} \\ &+p_{9,374}+2p_{9,246}+p_{9,502}+2p_{9,206}+p_{9,177}+p_{9,297}+p_{9,185} \\ &+p_{9,461}+2p_{9,157}+p_{9,349}+p_{9,163}+2p_{9,139}+2p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,328} = \frac{1}{2}p_{9,328} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,328}^2 - 4(p_{9,96}+p_{9,48}+p_{9,368}+p_{9,280}+p_{9,408} \\ &+p_{9,376}+p_{9,164}+p_{9,84}+p_{9,436}+p_{9,194}+2p_{9,266}+p_{9,26} \\ &+p_{9,90}+p_{9,118}+p_{9,246}+2p_{9,502}+2p_{9,462}+p_{9,433}+p_{9,41} \\ &+p_{9,441}+p_{9,205}+2p_{9,413}+p_{9,93}+p_{9,419}+2p_{9,395}+2p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,840} = \frac{1}{2}p_{9,328} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,328}^2 - 4(p_{9,96}+p_{9,48}+p_{9,368}+p_{9,280}+p_{9,408} \\ &+p_{9,376}+p_{9,164}+p_{9,84}+p_{9,436}+p_{9,194}+2p_{9,266}+p_{9,26} \\ &+p_{9,90}+p_{9,118}+p_{9,246}+2p_{9,502}+2p_{9,462}+p_{9,433}+p_{9,41} \\ &+p_{9,441}+p_{9,205}+2p_{9,413}+p_{9,93}+p_{9,419}+2p_{9,395}+2p_{9,415}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,712} = \frac{1}{2}p_{9,200} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,200}^2 - 4(p_{9,480}+p_{9,432}+p_{9,240}+p_{9,280}+p_{9,152} \\ &+p_{9,248}+p_{9,36}+p_{9,468}+p_{9,308}+p_{9,66}+2p_{9,138}+p_{9,410} \\ &+p_{9,474}+p_{9,118}+2p_{9,374}+p_{9,502}+2p_{9,334}+p_{9,305}+p_{9,425} \\ &+p_{9,313}+p_{9,77}+2p_{9,285}+p_{9,477}+p_{9,291}+2p_{9,267}+2p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,456} = \frac{1}{2}p_{9,456} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,456}^2 - 4(p_{9,224}+p_{9,176}+p_{9,496}+p_{9,24}+p_{9,408} \\ &+p_{9,504}+p_{9,292}+p_{9,212}+p_{9,52}+p_{9,322}+2p_{9,394}+p_{9,154} \\ &+p_{9,218}+2p_{9,118}+p_{9,374}+p_{9,246}+2p_{9,78}+p_{9,49}+p_{9,169} \\ &+p_{9,57}+p_{9,333}+2p_{9,29}+p_{9,221}+p_{9,35}+2p_{9,11}+2p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,968} = \frac{1}{2}p_{9,456} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,456}^2 - 4(p_{9,224}+p_{9,176}+p_{9,496}+p_{9,24}+p_{9,408} \\ &+p_{9,504}+p_{9,292}+p_{9,212}+p_{9,52}+p_{9,322}+2p_{9,394}+p_{9,154} \\ &+p_{9,218}+2p_{9,118}+p_{9,374}+p_{9,246}+2p_{9,78}+p_{9,49}+p_{9,169} \\ &+p_{9,57}+p_{9,333}+2p_{9,29}+p_{9,221}+p_{9,35}+2p_{9,11}+2p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,40} = \frac{1}{2}p_{9,40} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,40}^2 - 4(p_{9,320}+p_{9,272}+p_{9,80}+p_{9,88}+p_{9,120}+p_{9,504} \\ &+p_{9,388}+p_{9,148}+p_{9,308}+p_{9,418}+2p_{9,490}+p_{9,314}+p_{9,250} \\ &+p_{9,342}+2p_{9,214}+p_{9,470}+2p_{9,174}+p_{9,145}+p_{9,265}+p_{9,153} \\ &+p_{9,429}+p_{9,317}+2p_{9,125}+p_{9,131}+2p_{9,107}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,552} = \frac{1}{2}p_{9,40} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,40}^2 - 4(p_{9,320}+p_{9,272}+p_{9,80}+p_{9,88}+p_{9,120}+p_{9,504} \\ &+p_{9,388}+p_{9,148}+p_{9,308}+p_{9,418}+2p_{9,490}+p_{9,314}+p_{9,250} \\ &+p_{9,342}+2p_{9,214}+p_{9,470}+2p_{9,174}+p_{9,145}+p_{9,265}+p_{9,153} \\ &+p_{9,429}+p_{9,317}+2p_{9,125}+p_{9,131}+2p_{9,107}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,296} = \frac{1}{2}p_{9,296} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,296}^2 - 4(p_{9,64}+p_{9,16}+p_{9,336}+p_{9,344}+p_{9,376} \\ &+p_{9,248}+p_{9,132}+p_{9,404}+p_{9,52}+p_{9,162}+2p_{9,234}+p_{9,58} \\ &+p_{9,506}+p_{9,86}+p_{9,214}+2p_{9,470}+2p_{9,430}+p_{9,401}+p_{9,9} \\ &+p_{9,409}+p_{9,173}+p_{9,61}+2p_{9,381}+p_{9,387}+2p_{9,363}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,808} = \frac{1}{2}p_{9,296} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,296}^2 - 4(p_{9,64}+p_{9,16}+p_{9,336}+p_{9,344}+p_{9,376} \\ &+p_{9,248}+p_{9,132}+p_{9,404}+p_{9,52}+p_{9,162}+2p_{9,234}+p_{9,58} \\ &+p_{9,506}+p_{9,86}+p_{9,214}+2p_{9,470}+2p_{9,430}+p_{9,401}+p_{9,9} \\ &+p_{9,409}+p_{9,173}+p_{9,61}+2p_{9,381}+p_{9,387}+2p_{9,363}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,168} = \frac{1}{2}p_{9,168} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,168}^2 - 4(p_{9,448}+p_{9,400}+p_{9,208}+p_{9,216}+p_{9,120} \\ &+p_{9,248}+p_{9,4}+p_{9,276}+p_{9,436}+p_{9,34}+2p_{9,106}+p_{9,442} \\ &+p_{9,378}+p_{9,86}+2p_{9,342}+p_{9,470}+2p_{9,302}+p_{9,273}+p_{9,393} \\ &+p_{9,281}+p_{9,45}+p_{9,445}+2p_{9,253}+p_{9,259}+2p_{9,235}+2p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,680} = \frac{1}{2}p_{9,168} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,168}^2 - 4(p_{9,448}+p_{9,400}+p_{9,208}+p_{9,216}+p_{9,120} \\ &+p_{9,248}+p_{9,4}+p_{9,276}+p_{9,436}+p_{9,34}+2p_{9,106}+p_{9,442} \\ &+p_{9,378}+p_{9,86}+2p_{9,342}+p_{9,470}+2p_{9,302}+p_{9,273}+p_{9,393} \\ &+p_{9,281}+p_{9,45}+p_{9,445}+2p_{9,253}+p_{9,259}+2p_{9,235}+2p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,424} = \frac{1}{2}p_{9,424} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,424}^2 - 4(p_{9,192}+p_{9,144}+p_{9,464}+p_{9,472}+p_{9,376} \\ &+p_{9,504}+p_{9,260}+p_{9,20}+p_{9,180}+p_{9,290}+2p_{9,362}+p_{9,186} \\ &+p_{9,122}+2p_{9,86}+p_{9,342}+p_{9,214}+2p_{9,46}+p_{9,17}+p_{9,137} \\ &+p_{9,25}+p_{9,301}+p_{9,189}+2p_{9,509}+p_{9,3}+2p_{9,491}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,936} = \frac{1}{2}p_{9,424} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,424}^2 - 4(p_{9,192}+p_{9,144}+p_{9,464}+p_{9,472}+p_{9,376} \\ &+p_{9,504}+p_{9,260}+p_{9,20}+p_{9,180}+p_{9,290}+2p_{9,362}+p_{9,186} \\ &+p_{9,122}+2p_{9,86}+p_{9,342}+p_{9,214}+2p_{9,46}+p_{9,17}+p_{9,137} \\ &+p_{9,25}+p_{9,301}+p_{9,189}+2p_{9,509}+p_{9,3}+2p_{9,491}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,104} = \frac{1}{2}p_{9,104} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,104}^2 - 4(p_{9,384}+p_{9,144}+p_{9,336}+p_{9,152}+p_{9,56} \\ &+p_{9,184}+p_{9,452}+p_{9,212}+p_{9,372}+p_{9,482}+2p_{9,42}+p_{9,314} \\ &+p_{9,378}+p_{9,22}+2p_{9,278}+p_{9,406}+2p_{9,238}+p_{9,209}+p_{9,329} \\ &+p_{9,217}+p_{9,493}+2p_{9,189}+p_{9,381}+p_{9,195}+2p_{9,171}+2p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,616} = \frac{1}{2}p_{9,104} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,104}^2 - 4(p_{9,384}+p_{9,144}+p_{9,336}+p_{9,152}+p_{9,56} \\ &+p_{9,184}+p_{9,452}+p_{9,212}+p_{9,372}+p_{9,482}+2p_{9,42}+p_{9,314} \\ &+p_{9,378}+p_{9,22}+2p_{9,278}+p_{9,406}+2p_{9,238}+p_{9,209}+p_{9,329} \\ &+p_{9,217}+p_{9,493}+2p_{9,189}+p_{9,381}+p_{9,195}+2p_{9,171}+2p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,360} = \frac{1}{2}p_{9,360} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,360}^2 - 4(p_{9,128}+p_{9,400}+p_{9,80}+p_{9,408}+p_{9,312} \\ &+p_{9,440}+p_{9,196}+p_{9,468}+p_{9,116}+p_{9,226}+2p_{9,298}+p_{9,58} \\ &+p_{9,122}+2p_{9,22}+p_{9,278}+p_{9,150}+2p_{9,494}+p_{9,465}+p_{9,73} \\ &+p_{9,473}+p_{9,237}+2p_{9,445}+p_{9,125}+p_{9,451}+2p_{9,427}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,872} = \frac{1}{2}p_{9,360} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,360}^2 - 4(p_{9,128}+p_{9,400}+p_{9,80}+p_{9,408}+p_{9,312} \\ &+p_{9,440}+p_{9,196}+p_{9,468}+p_{9,116}+p_{9,226}+2p_{9,298}+p_{9,58} \\ &+p_{9,122}+2p_{9,22}+p_{9,278}+p_{9,150}+2p_{9,494}+p_{9,465}+p_{9,73} \\ &+p_{9,473}+p_{9,237}+2p_{9,445}+p_{9,125}+p_{9,451}+2p_{9,427}+2p_{9,447}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,488} = \frac{1}{2}p_{9,488} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,488}^2 - 4(p_{9,256}+p_{9,16}+p_{9,208}+p_{9,24}+p_{9,56}+p_{9,440} \\ &+p_{9,324}+p_{9,84}+p_{9,244}+p_{9,354}+2p_{9,426}+p_{9,186}+p_{9,250} \\ &+p_{9,278}+2p_{9,150}+p_{9,406}+2p_{9,110}+p_{9,81}+p_{9,201}+p_{9,89} \\ &+p_{9,365}+2p_{9,61}+p_{9,253}+p_{9,67}+2p_{9,43}+2p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1000} = \frac{1}{2}p_{9,488} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,488}^2 - 4(p_{9,256}+p_{9,16}+p_{9,208}+p_{9,24}+p_{9,56}+p_{9,440} \\ &+p_{9,324}+p_{9,84}+p_{9,244}+p_{9,354}+2p_{9,426}+p_{9,186}+p_{9,250} \\ &+p_{9,278}+2p_{9,150}+p_{9,406}+2p_{9,110}+p_{9,81}+p_{9,201}+p_{9,89} \\ &+p_{9,365}+2p_{9,61}+p_{9,253}+p_{9,67}+2p_{9,43}+2p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,24} = \frac{1}{2}p_{9,24} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,24}^2 - 4(p_{9,256}+p_{9,64}+p_{9,304}+p_{9,72}+p_{9,104}+p_{9,488} \\ &+p_{9,132}+p_{9,292}+p_{9,372}+p_{9,402}+p_{9,298}+p_{9,234}+2p_{9,474} \\ &+p_{9,326}+2p_{9,198}+p_{9,454}+2p_{9,158}+p_{9,129}+p_{9,137}+p_{9,249} \\ &+p_{9,301}+2p_{9,109}+p_{9,413}+p_{9,115}+2p_{9,91}+2p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,536} = \frac{1}{2}p_{9,24} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,24}^2 - 4(p_{9,256}+p_{9,64}+p_{9,304}+p_{9,72}+p_{9,104}+p_{9,488} \\ &+p_{9,132}+p_{9,292}+p_{9,372}+p_{9,402}+p_{9,298}+p_{9,234}+2p_{9,474} \\ &+p_{9,326}+2p_{9,198}+p_{9,454}+2p_{9,158}+p_{9,129}+p_{9,137}+p_{9,249} \\ &+p_{9,301}+2p_{9,109}+p_{9,413}+p_{9,115}+2p_{9,91}+2p_{9,111}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,792} = \frac{1}{2}p_{9,280} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,280}^2 - 4(p_{9,0}+p_{9,320}+p_{9,48}+p_{9,328}+p_{9,360}+p_{9,232} \\ &+p_{9,388}+p_{9,36}+p_{9,116}+p_{9,146}+p_{9,42}+p_{9,490}+2p_{9,218} \\ &+p_{9,70}+p_{9,198}+2p_{9,454}+2p_{9,414}+p_{9,385}+p_{9,393}+p_{9,505} \\ &+p_{9,45}+2p_{9,365}+p_{9,157}+p_{9,371}+2p_{9,347}+2p_{9,367}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,152} = \frac{1}{2}p_{9,152} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,152}^2 - 4(p_{9,384}+p_{9,192}+p_{9,432}+p_{9,200}+p_{9,104} \\ &+p_{9,232}+p_{9,260}+p_{9,420}+p_{9,500}+p_{9,18}+p_{9,426}+p_{9,362} \\ &+2p_{9,90}+p_{9,70}+2p_{9,326}+p_{9,454}+2p_{9,286}+p_{9,257}+p_{9,265} \\ &+p_{9,377}+p_{9,429}+2p_{9,237}+p_{9,29}+p_{9,243}+2p_{9,219}+2p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,664} = \frac{1}{2}p_{9,152} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,152}^2 - 4(p_{9,384}+p_{9,192}+p_{9,432}+p_{9,200}+p_{9,104} \\ &+p_{9,232}+p_{9,260}+p_{9,420}+p_{9,500}+p_{9,18}+p_{9,426}+p_{9,362} \\ &+2p_{9,90}+p_{9,70}+2p_{9,326}+p_{9,454}+2p_{9,286}+p_{9,257}+p_{9,265} \\ &+p_{9,377}+p_{9,429}+2p_{9,237}+p_{9,29}+p_{9,243}+2p_{9,219}+2p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,408} = \frac{1}{2}p_{9,408} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,408}^2 - 4(p_{9,128}+p_{9,448}+p_{9,176}+p_{9,456}+p_{9,360} \\ &+p_{9,488}+p_{9,4}+p_{9,164}+p_{9,244}+p_{9,274}+p_{9,170}+p_{9,106} \\ &+2p_{9,346}+2p_{9,70}+p_{9,326}+p_{9,198}+2p_{9,30}+p_{9,1}+p_{9,9} \\ &+p_{9,121}+p_{9,173}+2p_{9,493}+p_{9,285}+p_{9,499}+2p_{9,475}+2p_{9,495}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,88} = \frac{1}{2}p_{9,88} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,88}^2 - 4(p_{9,128}+p_{9,320}+p_{9,368}+p_{9,136}+p_{9,40}+p_{9,168} \\ &+p_{9,196}+p_{9,356}+p_{9,436}+p_{9,466}+p_{9,298}+p_{9,362}+2p_{9,26} \\ &+p_{9,6}+2p_{9,262}+p_{9,390}+2p_{9,222}+p_{9,193}+p_{9,201}+p_{9,313} \\ &+2p_{9,173}+p_{9,365}+p_{9,477}+p_{9,179}+2p_{9,155}+2p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,600} = \frac{1}{2}p_{9,88} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,88}^2 - 4(p_{9,128}+p_{9,320}+p_{9,368}+p_{9,136}+p_{9,40}+p_{9,168} \\ &+p_{9,196}+p_{9,356}+p_{9,436}+p_{9,466}+p_{9,298}+p_{9,362}+2p_{9,26} \\ &+p_{9,6}+2p_{9,262}+p_{9,390}+2p_{9,222}+p_{9,193}+p_{9,201}+p_{9,313} \\ &+2p_{9,173}+p_{9,365}+p_{9,477}+p_{9,179}+2p_{9,155}+2p_{9,175}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,856} = \frac{1}{2}p_{9,344} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,344}^2 - 4(p_{9,384}+p_{9,64}+p_{9,112}+p_{9,392}+p_{9,296} \\ &+p_{9,424}+p_{9,452}+p_{9,100}+p_{9,180}+p_{9,210}+p_{9,42}+p_{9,106} \\ &+2p_{9,282}+2p_{9,6}+p_{9,262}+p_{9,134}+2p_{9,478}+p_{9,449}+p_{9,457} \\ &+p_{9,57}+2p_{9,429}+p_{9,109}+p_{9,221}+p_{9,435}+2p_{9,411}+2p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,216} = \frac{1}{2}p_{9,216} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,216}^2 - 4(p_{9,256}+p_{9,448}+p_{9,496}+p_{9,264}+p_{9,296} \\ &+p_{9,168}+p_{9,324}+p_{9,484}+p_{9,52}+p_{9,82}+p_{9,426}+p_{9,490} \\ &+2p_{9,154}+p_{9,6}+p_{9,134}+2p_{9,390}+2p_{9,350}+p_{9,321}+p_{9,329} \\ &+p_{9,441}+2p_{9,301}+p_{9,493}+p_{9,93}+p_{9,307}+2p_{9,283}+2p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,728} = \frac{1}{2}p_{9,216} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,216}^2 - 4(p_{9,256}+p_{9,448}+p_{9,496}+p_{9,264}+p_{9,296} \\ &+p_{9,168}+p_{9,324}+p_{9,484}+p_{9,52}+p_{9,82}+p_{9,426}+p_{9,490} \\ &+2p_{9,154}+p_{9,6}+p_{9,134}+2p_{9,390}+2p_{9,350}+p_{9,321}+p_{9,329} \\ &+p_{9,441}+2p_{9,301}+p_{9,493}+p_{9,93}+p_{9,307}+2p_{9,283}+2p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,472} = \frac{1}{2}p_{9,472} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,472}^2 - 4(p_{9,0}+p_{9,192}+p_{9,240}+p_{9,8}+p_{9,40}+p_{9,424} \\ &+p_{9,68}+p_{9,228}+p_{9,308}+p_{9,338}+p_{9,170}+p_{9,234}+2p_{9,410} \\ &+p_{9,262}+2p_{9,134}+p_{9,390}+2p_{9,94}+p_{9,65}+p_{9,73}+p_{9,185} \\ &+2p_{9,45}+p_{9,237}+p_{9,349}+p_{9,51}+2p_{9,27}+2p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,984} = \frac{1}{2}p_{9,472} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,472}^2 - 4(p_{9,0}+p_{9,192}+p_{9,240}+p_{9,8}+p_{9,40}+p_{9,424} \\ &+p_{9,68}+p_{9,228}+p_{9,308}+p_{9,338}+p_{9,170}+p_{9,234}+2p_{9,410} \\ &+p_{9,262}+2p_{9,134}+p_{9,390}+2p_{9,94}+p_{9,65}+p_{9,73}+p_{9,185} \\ &+2p_{9,45}+p_{9,237}+p_{9,349}+p_{9,51}+2p_{9,27}+2p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,56} = \frac{1}{2}p_{9,56} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,56}^2 - 4(p_{9,288}+p_{9,96}+p_{9,336}+p_{9,8}+p_{9,136}+p_{9,104} \\ &+p_{9,324}+p_{9,164}+p_{9,404}+p_{9,434}+p_{9,266}+p_{9,330}+2p_{9,506} \\ &+p_{9,358}+2p_{9,230}+p_{9,486}+2p_{9,190}+p_{9,161}+p_{9,169}+p_{9,281} \\ &+2p_{9,141}+p_{9,333}+p_{9,445}+p_{9,147}+2p_{9,123}+2p_{9,143}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,568} = \frac{1}{2}p_{9,56} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,56}^2 - 4(p_{9,288}+p_{9,96}+p_{9,336}+p_{9,8}+p_{9,136}+p_{9,104} \\ &+p_{9,324}+p_{9,164}+p_{9,404}+p_{9,434}+p_{9,266}+p_{9,330}+2p_{9,506} \\ &+p_{9,358}+2p_{9,230}+p_{9,486}+2p_{9,190}+p_{9,161}+p_{9,169}+p_{9,281} \\ &+2p_{9,141}+p_{9,333}+p_{9,445}+p_{9,147}+2p_{9,123}+2p_{9,143}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,312} = \frac{1}{2}p_{9,312} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,312}^2 - 4(p_{9,32}+p_{9,352}+p_{9,80}+p_{9,264}+p_{9,392} \\ &+p_{9,360}+p_{9,68}+p_{9,420}+p_{9,148}+p_{9,178}+p_{9,10}+p_{9,74} \\ &+2p_{9,250}+p_{9,102}+p_{9,230}+2p_{9,486}+2p_{9,446}+p_{9,417}+p_{9,425} \\ &+p_{9,25}+2p_{9,397}+p_{9,77}+p_{9,189}+p_{9,403}+2p_{9,379}+2p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,824} = \frac{1}{2}p_{9,312} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,312}^2 - 4(p_{9,32}+p_{9,352}+p_{9,80}+p_{9,264}+p_{9,392} \\ &+p_{9,360}+p_{9,68}+p_{9,420}+p_{9,148}+p_{9,178}+p_{9,10}+p_{9,74} \\ &+2p_{9,250}+p_{9,102}+p_{9,230}+2p_{9,486}+2p_{9,446}+p_{9,417}+p_{9,425} \\ &+p_{9,25}+2p_{9,397}+p_{9,77}+p_{9,189}+p_{9,403}+2p_{9,379}+2p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,184} = \frac{1}{2}p_{9,184} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,184}^2 - 4(p_{9,416}+p_{9,224}+p_{9,464}+p_{9,264}+p_{9,136} \\ &+p_{9,232}+p_{9,452}+p_{9,292}+p_{9,20}+p_{9,50}+p_{9,394}+p_{9,458} \\ &+2p_{9,122}+p_{9,102}+2p_{9,358}+p_{9,486}+2p_{9,318}+p_{9,289}+p_{9,297} \\ &+p_{9,409}+2p_{9,269}+p_{9,461}+p_{9,61}+p_{9,275}+2p_{9,251}+2p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,696} = \frac{1}{2}p_{9,184} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,184}^2 - 4(p_{9,416}+p_{9,224}+p_{9,464}+p_{9,264}+p_{9,136} \\ &+p_{9,232}+p_{9,452}+p_{9,292}+p_{9,20}+p_{9,50}+p_{9,394}+p_{9,458} \\ &+2p_{9,122}+p_{9,102}+2p_{9,358}+p_{9,486}+2p_{9,318}+p_{9,289}+p_{9,297} \\ &+p_{9,409}+2p_{9,269}+p_{9,461}+p_{9,61}+p_{9,275}+2p_{9,251}+2p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,440} = \frac{1}{2}p_{9,440} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,440}^2 - 4(p_{9,160}+p_{9,480}+p_{9,208}+p_{9,8}+p_{9,392} \\ &+p_{9,488}+p_{9,196}+p_{9,36}+p_{9,276}+p_{9,306}+p_{9,138}+p_{9,202} \\ &+2p_{9,378}+2p_{9,102}+p_{9,358}+p_{9,230}+2p_{9,62}+p_{9,33}+p_{9,41} \\ &+p_{9,153}+2p_{9,13}+p_{9,205}+p_{9,317}+p_{9,19}+2p_{9,507}+2p_{9,15}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,120} = \frac{1}{2}p_{9,120} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,120}^2 - 4(p_{9,160}+p_{9,352}+p_{9,400}+p_{9,72}+p_{9,200} \\ &+p_{9,168}+p_{9,388}+p_{9,228}+p_{9,468}+p_{9,498}+p_{9,394}+p_{9,330} \\ &+2p_{9,58}+p_{9,38}+2p_{9,294}+p_{9,422}+2p_{9,254}+p_{9,225}+p_{9,233} \\ &+p_{9,345}+p_{9,397}+2p_{9,205}+p_{9,509}+p_{9,211}+2p_{9,187}+2p_{9,207}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,376} = \frac{1}{2}p_{9,376} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,376}^2 - 4(p_{9,416}+p_{9,96}+p_{9,144}+p_{9,328}+p_{9,456} \\ &+p_{9,424}+p_{9,132}+p_{9,484}+p_{9,212}+p_{9,242}+p_{9,138}+p_{9,74} \\ &+2p_{9,314}+2p_{9,38}+p_{9,294}+p_{9,166}+2p_{9,510}+p_{9,481}+p_{9,489} \\ &+p_{9,89}+p_{9,141}+2p_{9,461}+p_{9,253}+p_{9,467}+2p_{9,443}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,888} = \frac{1}{2}p_{9,376} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,376}^2 - 4(p_{9,416}+p_{9,96}+p_{9,144}+p_{9,328}+p_{9,456} \\ &+p_{9,424}+p_{9,132}+p_{9,484}+p_{9,212}+p_{9,242}+p_{9,138}+p_{9,74} \\ &+2p_{9,314}+2p_{9,38}+p_{9,294}+p_{9,166}+2p_{9,510}+p_{9,481}+p_{9,489} \\ &+p_{9,89}+p_{9,141}+2p_{9,461}+p_{9,253}+p_{9,467}+2p_{9,443}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,248} = \frac{1}{2}p_{9,248} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,248}^2 - 4(p_{9,288}+p_{9,480}+p_{9,16}+p_{9,328}+p_{9,200} \\ &+p_{9,296}+p_{9,4}+p_{9,356}+p_{9,84}+p_{9,114}+p_{9,10}+p_{9,458} \\ &+2p_{9,186}+p_{9,38}+p_{9,166}+2p_{9,422}+2p_{9,382}+p_{9,353}+p_{9,361} \\ &+p_{9,473}+p_{9,13}+2p_{9,333}+p_{9,125}+p_{9,339}+2p_{9,315}+2p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,760} = \frac{1}{2}p_{9,248} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,248}^2 - 4(p_{9,288}+p_{9,480}+p_{9,16}+p_{9,328}+p_{9,200} \\ &+p_{9,296}+p_{9,4}+p_{9,356}+p_{9,84}+p_{9,114}+p_{9,10}+p_{9,458} \\ &+2p_{9,186}+p_{9,38}+p_{9,166}+2p_{9,422}+2p_{9,382}+p_{9,353}+p_{9,361} \\ &+p_{9,473}+p_{9,13}+2p_{9,333}+p_{9,125}+p_{9,339}+2p_{9,315}+2p_{9,335}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,1016} = \frac{1}{2}p_{9,504} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,504}^2 - 4(p_{9,32}+p_{9,224}+p_{9,272}+p_{9,72}+p_{9,456}+p_{9,40} \\ &+p_{9,260}+p_{9,100}+p_{9,340}+p_{9,370}+p_{9,266}+p_{9,202}+2p_{9,442} \\ &+p_{9,294}+2p_{9,166}+p_{9,422}+2p_{9,126}+p_{9,97}+p_{9,105}+p_{9,217} \\ &+p_{9,269}+2p_{9,77}+p_{9,381}+p_{9,83}+2p_{9,59}+2p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,4} = \frac{1}{2}p_{9,4} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,4}^2 - 4(p_{9,352}+p_{9,272}+p_{9,112}+p_{9,84}+p_{9,468}+p_{9,52} \\ &+p_{9,44}+p_{9,236}+p_{9,284}+p_{9,306}+2p_{9,178}+p_{9,434}+2p_{9,138} \\ &+2p_{9,454}+p_{9,278}+p_{9,214}+p_{9,382}+p_{9,393}+p_{9,281}+2p_{9,89} \\ &+p_{9,229}+p_{9,117}+p_{9,109}+2p_{9,91}+2p_{9,71}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,516} = \frac{1}{2}p_{9,4} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,4}^2 - 4(p_{9,352}+p_{9,272}+p_{9,112}+p_{9,84}+p_{9,468}+p_{9,52} \\ &+p_{9,44}+p_{9,236}+p_{9,284}+p_{9,306}+2p_{9,178}+p_{9,434}+2p_{9,138} \\ &+2p_{9,454}+p_{9,278}+p_{9,214}+p_{9,382}+p_{9,393}+p_{9,281}+2p_{9,89} \\ &+p_{9,229}+p_{9,117}+p_{9,109}+2p_{9,91}+2p_{9,71}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,260} = \frac{1}{2}p_{9,260} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,260}^2 - 4(p_{9,96}+p_{9,16}+p_{9,368}+p_{9,340}+p_{9,212}+p_{9,308} \\ &+p_{9,300}+p_{9,492}+p_{9,28}+p_{9,50}+p_{9,178}+2p_{9,434}+2p_{9,394} \\ &+2p_{9,198}+p_{9,22}+p_{9,470}+p_{9,126}+p_{9,137}+p_{9,25}+2p_{9,345} \\ &+p_{9,485}+p_{9,373}+p_{9,365}+2p_{9,347}+2p_{9,327}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,772} = \frac{1}{2}p_{9,260} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,260}^2 - 4(p_{9,96}+p_{9,16}+p_{9,368}+p_{9,340}+p_{9,212}+p_{9,308} \\ &+p_{9,300}+p_{9,492}+p_{9,28}+p_{9,50}+p_{9,178}+2p_{9,434}+2p_{9,394} \\ &+2p_{9,198}+p_{9,22}+p_{9,470}+p_{9,126}+p_{9,137}+p_{9,25}+2p_{9,345} \\ &+p_{9,485}+p_{9,373}+p_{9,365}+2p_{9,347}+2p_{9,327}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,132} = \frac{1}{2}p_{9,132} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,132}^2 - 4(p_{9,480}+p_{9,400}+p_{9,240}+p_{9,84}+p_{9,212} \\ &+p_{9,180}+p_{9,172}+p_{9,364}+p_{9,412}+p_{9,50}+2p_{9,306}+p_{9,434} \\ &+2p_{9,266}+2p_{9,70}+p_{9,406}+p_{9,342}+p_{9,510}+p_{9,9}+p_{9,409} \\ &+2p_{9,217}+p_{9,357}+p_{9,245}+p_{9,237}+2p_{9,219}+2p_{9,199}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,644} = \frac{1}{2}p_{9,132} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,132}^2 - 4(p_{9,480}+p_{9,400}+p_{9,240}+p_{9,84}+p_{9,212} \\ &+p_{9,180}+p_{9,172}+p_{9,364}+p_{9,412}+p_{9,50}+2p_{9,306}+p_{9,434} \\ &+2p_{9,266}+2p_{9,70}+p_{9,406}+p_{9,342}+p_{9,510}+p_{9,9}+p_{9,409} \\ &+2p_{9,217}+p_{9,357}+p_{9,245}+p_{9,237}+2p_{9,219}+2p_{9,199}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,388} = \frac{1}{2}p_{9,388} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,388}^2 - 4(p_{9,224}+p_{9,144}+p_{9,496}+p_{9,340}+p_{9,468} \\ &+p_{9,436}+p_{9,428}+p_{9,108}+p_{9,156}+2p_{9,50}+p_{9,306}+p_{9,178} \\ &+2p_{9,10}+2p_{9,326}+p_{9,150}+p_{9,86}+p_{9,254}+p_{9,265}+p_{9,153} \\ &+2p_{9,473}+p_{9,101}+p_{9,501}+p_{9,493}+2p_{9,475}+2p_{9,455}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,900} = \frac{1}{2}p_{9,388} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,388}^2 - 4(p_{9,224}+p_{9,144}+p_{9,496}+p_{9,340}+p_{9,468} \\ &+p_{9,436}+p_{9,428}+p_{9,108}+p_{9,156}+2p_{9,50}+p_{9,306}+p_{9,178} \\ &+2p_{9,10}+2p_{9,326}+p_{9,150}+p_{9,86}+p_{9,254}+p_{9,265}+p_{9,153} \\ &+2p_{9,473}+p_{9,101}+p_{9,501}+p_{9,493}+2p_{9,475}+2p_{9,455}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,68} = \frac{1}{2}p_{9,68} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,68}^2 - 4(p_{9,416}+p_{9,336}+p_{9,176}+p_{9,20}+p_{9,148}+p_{9,116} \\ &+p_{9,300}+p_{9,108}+p_{9,348}+p_{9,370}+2p_{9,242}+p_{9,498}+2p_{9,202} \\ &+2p_{9,6}+p_{9,278}+p_{9,342}+p_{9,446}+p_{9,457}+2p_{9,153}+p_{9,345} \\ &+p_{9,293}+p_{9,181}+p_{9,173}+2p_{9,155}+2p_{9,135}+p_{9,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,324} = \frac{1}{2}p_{9,324} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,324}^2 - 4(p_{9,160}+p_{9,80}+p_{9,432}+p_{9,276}+p_{9,404} \\ &+p_{9,372}+p_{9,44}+p_{9,364}+p_{9,92}+p_{9,114}+p_{9,242}+2p_{9,498} \\ &+2p_{9,458}+2p_{9,262}+p_{9,22}+p_{9,86}+p_{9,190}+p_{9,201}+2p_{9,409} \\ &+p_{9,89}+p_{9,37}+p_{9,437}+p_{9,429}+2p_{9,411}+2p_{9,391}+p_{9,415}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,196} = \frac{1}{2}p_{9,196} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,196}^2 - 4(p_{9,32}+p_{9,464}+p_{9,304}+p_{9,276}+p_{9,148} \\ &+p_{9,244}+p_{9,428}+p_{9,236}+p_{9,476}+p_{9,114}+2p_{9,370}+p_{9,498} \\ &+2p_{9,330}+2p_{9,134}+p_{9,406}+p_{9,470}+p_{9,62}+p_{9,73}+2p_{9,281} \\ &+p_{9,473}+p_{9,421}+p_{9,309}+p_{9,301}+2p_{9,283}+2p_{9,263}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,708} = \frac{1}{2}p_{9,196} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,196}^2 - 4(p_{9,32}+p_{9,464}+p_{9,304}+p_{9,276}+p_{9,148} \\ &+p_{9,244}+p_{9,428}+p_{9,236}+p_{9,476}+p_{9,114}+2p_{9,370}+p_{9,498} \\ &+2p_{9,330}+2p_{9,134}+p_{9,406}+p_{9,470}+p_{9,62}+p_{9,73}+2p_{9,281} \\ &+p_{9,473}+p_{9,421}+p_{9,309}+p_{9,301}+2p_{9,283}+2p_{9,263}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,452} = \frac{1}{2}p_{9,452} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,452}^2 - 4(p_{9,288}+p_{9,208}+p_{9,48}+p_{9,20}+p_{9,404} \\ &+p_{9,500}+p_{9,172}+p_{9,492}+p_{9,220}+2p_{9,114}+p_{9,370}+p_{9,242} \\ &+2p_{9,74}+2p_{9,390}+p_{9,150}+p_{9,214}+p_{9,318}+p_{9,329}+2p_{9,25} \\ &+p_{9,217}+p_{9,165}+p_{9,53}+p_{9,45}+2p_{9,27}+2p_{9,7}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,964} = \frac{1}{2}p_{9,452} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,452}^2 - 4(p_{9,288}+p_{9,208}+p_{9,48}+p_{9,20}+p_{9,404} \\ &+p_{9,500}+p_{9,172}+p_{9,492}+p_{9,220}+2p_{9,114}+p_{9,370}+p_{9,242} \\ &+2p_{9,74}+2p_{9,390}+p_{9,150}+p_{9,214}+p_{9,318}+p_{9,329}+2p_{9,25} \\ &+p_{9,217}+p_{9,165}+p_{9,53}+p_{9,45}+2p_{9,27}+2p_{9,7}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,36} = \frac{1}{2}p_{9,36} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,36}^2 - 4(p_{9,384}+p_{9,144}+p_{9,304}+p_{9,84}+p_{9,116}+p_{9,500} \\ &+p_{9,268}+p_{9,76}+p_{9,316}+p_{9,338}+2p_{9,210}+p_{9,466}+2p_{9,170} \\ &+2p_{9,486}+p_{9,310}+p_{9,246}+p_{9,414}+p_{9,425}+p_{9,313}+2p_{9,121} \\ &+p_{9,261}+p_{9,149}+p_{9,141}+2p_{9,123}+2p_{9,103}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,548} = \frac{1}{2}p_{9,36} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,36}^2 - 4(p_{9,384}+p_{9,144}+p_{9,304}+p_{9,84}+p_{9,116}+p_{9,500} \\ &+p_{9,268}+p_{9,76}+p_{9,316}+p_{9,338}+2p_{9,210}+p_{9,466}+2p_{9,170} \\ &+2p_{9,486}+p_{9,310}+p_{9,246}+p_{9,414}+p_{9,425}+p_{9,313}+2p_{9,121} \\ &+p_{9,261}+p_{9,149}+p_{9,141}+2p_{9,123}+2p_{9,103}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,292} = \frac{1}{2}p_{9,292} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,292}^2 - 4(p_{9,128}+p_{9,400}+p_{9,48}+p_{9,340}+p_{9,372} \\ &+p_{9,244}+p_{9,12}+p_{9,332}+p_{9,60}+p_{9,82}+p_{9,210}+2p_{9,466} \\ &+2p_{9,426}+2p_{9,230}+p_{9,54}+p_{9,502}+p_{9,158}+p_{9,169}+p_{9,57} \\ &+2p_{9,377}+p_{9,5}+p_{9,405}+p_{9,397}+2p_{9,379}+2p_{9,359}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,804} = \frac{1}{2}p_{9,292} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,292}^2 - 4(p_{9,128}+p_{9,400}+p_{9,48}+p_{9,340}+p_{9,372} \\ &+p_{9,244}+p_{9,12}+p_{9,332}+p_{9,60}+p_{9,82}+p_{9,210}+2p_{9,466} \\ &+2p_{9,426}+2p_{9,230}+p_{9,54}+p_{9,502}+p_{9,158}+p_{9,169}+p_{9,57} \\ &+2p_{9,377}+p_{9,5}+p_{9,405}+p_{9,397}+2p_{9,379}+2p_{9,359}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,164} = \frac{1}{2}p_{9,164} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,164}^2 - 4(p_{9,0}+p_{9,272}+p_{9,432}+p_{9,212}+p_{9,116}+p_{9,244} \\ &+p_{9,396}+p_{9,204}+p_{9,444}+p_{9,82}+2p_{9,338}+p_{9,466}+2p_{9,298} \\ &+2p_{9,102}+p_{9,438}+p_{9,374}+p_{9,30}+p_{9,41}+p_{9,441}+2p_{9,249} \\ &+p_{9,389}+p_{9,277}+p_{9,269}+2p_{9,251}+2p_{9,231}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,676} = \frac{1}{2}p_{9,164} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,164}^2 - 4(p_{9,0}+p_{9,272}+p_{9,432}+p_{9,212}+p_{9,116}+p_{9,244} \\ &+p_{9,396}+p_{9,204}+p_{9,444}+p_{9,82}+2p_{9,338}+p_{9,466}+2p_{9,298} \\ &+2p_{9,102}+p_{9,438}+p_{9,374}+p_{9,30}+p_{9,41}+p_{9,441}+2p_{9,249} \\ &+p_{9,389}+p_{9,277}+p_{9,269}+2p_{9,251}+2p_{9,231}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,420} = \frac{1}{2}p_{9,420} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,420}^2 - 4(p_{9,256}+p_{9,16}+p_{9,176}+p_{9,468}+p_{9,372} \\ &+p_{9,500}+p_{9,140}+p_{9,460}+p_{9,188}+2p_{9,82}+p_{9,338}+p_{9,210} \\ &+2p_{9,42}+2p_{9,358}+p_{9,182}+p_{9,118}+p_{9,286}+p_{9,297}+p_{9,185} \\ &+2p_{9,505}+p_{9,133}+p_{9,21}+p_{9,13}+2p_{9,507}+2p_{9,487}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,932} = \frac{1}{2}p_{9,420} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,420}^2 - 4(p_{9,256}+p_{9,16}+p_{9,176}+p_{9,468}+p_{9,372} \\ &+p_{9,500}+p_{9,140}+p_{9,460}+p_{9,188}+2p_{9,82}+p_{9,338}+p_{9,210} \\ &+2p_{9,42}+2p_{9,358}+p_{9,182}+p_{9,118}+p_{9,286}+p_{9,297}+p_{9,185} \\ &+2p_{9,505}+p_{9,133}+p_{9,21}+p_{9,13}+2p_{9,507}+2p_{9,487}+p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,356} = \frac{1}{2}p_{9,356} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,356}^2 - 4(p_{9,192}+p_{9,464}+p_{9,112}+p_{9,404}+p_{9,308} \\ &+p_{9,436}+p_{9,396}+p_{9,76}+p_{9,124}+2p_{9,18}+p_{9,274}+p_{9,146} \\ &+2p_{9,490}+2p_{9,294}+p_{9,54}+p_{9,118}+p_{9,222}+p_{9,233}+2p_{9,441} \\ &+p_{9,121}+p_{9,69}+p_{9,469}+p_{9,461}+2p_{9,443}+2p_{9,423}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,868} = \frac{1}{2}p_{9,356} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,356}^2 - 4(p_{9,192}+p_{9,464}+p_{9,112}+p_{9,404}+p_{9,308} \\ &+p_{9,436}+p_{9,396}+p_{9,76}+p_{9,124}+2p_{9,18}+p_{9,274}+p_{9,146} \\ &+2p_{9,490}+2p_{9,294}+p_{9,54}+p_{9,118}+p_{9,222}+p_{9,233}+2p_{9,441} \\ &+p_{9,121}+p_{9,69}+p_{9,469}+p_{9,461}+2p_{9,443}+2p_{9,423}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,228} = \frac{1}{2}p_{9,228} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,228}^2 - 4(p_{9,64}+p_{9,336}+p_{9,496}+p_{9,276}+p_{9,308} \\ &+p_{9,180}+p_{9,268}+p_{9,460}+p_{9,508}+p_{9,18}+p_{9,146}+2p_{9,402} \\ &+2p_{9,362}+2p_{9,166}+p_{9,438}+p_{9,502}+p_{9,94}+p_{9,105}+2p_{9,313} \\ &+p_{9,505}+p_{9,453}+p_{9,341}+p_{9,333}+2p_{9,315}+2p_{9,295}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,740} = \frac{1}{2}p_{9,228} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,228}^2 - 4(p_{9,64}+p_{9,336}+p_{9,496}+p_{9,276}+p_{9,308} \\ &+p_{9,180}+p_{9,268}+p_{9,460}+p_{9,508}+p_{9,18}+p_{9,146}+2p_{9,402} \\ &+2p_{9,362}+2p_{9,166}+p_{9,438}+p_{9,502}+p_{9,94}+p_{9,105}+2p_{9,313} \\ &+p_{9,505}+p_{9,453}+p_{9,341}+p_{9,333}+2p_{9,315}+2p_{9,295}+p_{9,319}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,20} = \frac{1}{2}p_{9,20} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,20}^2 - 4(p_{9,128}+p_{9,288}+p_{9,368}+p_{9,68}+p_{9,100}+p_{9,484} \\ &+p_{9,300}+p_{9,60}+p_{9,252}+p_{9,322}+2p_{9,194}+p_{9,450}+2p_{9,154} \\ &+p_{9,294}+p_{9,230}+2p_{9,470}+p_{9,398}+p_{9,297}+2p_{9,105}+p_{9,409} \\ &+p_{9,133}+p_{9,245}+p_{9,125}+2p_{9,107}+2p_{9,87}+p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,532} = \frac{1}{2}p_{9,20} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,20}^2 - 4(p_{9,128}+p_{9,288}+p_{9,368}+p_{9,68}+p_{9,100}+p_{9,484} \\ &+p_{9,300}+p_{9,60}+p_{9,252}+p_{9,322}+2p_{9,194}+p_{9,450}+2p_{9,154} \\ &+p_{9,294}+p_{9,230}+2p_{9,470}+p_{9,398}+p_{9,297}+2p_{9,105}+p_{9,409} \\ &+p_{9,133}+p_{9,245}+p_{9,125}+2p_{9,107}+2p_{9,87}+p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,276} = \frac{1}{2}p_{9,276} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,276}^2 - 4(p_{9,384}+p_{9,32}+p_{9,112}+p_{9,324}+p_{9,356} \\ &+p_{9,228}+p_{9,44}+p_{9,316}+p_{9,508}+p_{9,66}+p_{9,194}+2p_{9,450} \\ &+2p_{9,410}+p_{9,38}+p_{9,486}+2p_{9,214}+p_{9,142}+p_{9,41}+2p_{9,361} \\ &+p_{9,153}+p_{9,389}+p_{9,501}+p_{9,381}+2p_{9,363}+2p_{9,343}+p_{9,367}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,788} = \frac{1}{2}p_{9,276} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,276}^2 - 4(p_{9,384}+p_{9,32}+p_{9,112}+p_{9,324}+p_{9,356} \\ &+p_{9,228}+p_{9,44}+p_{9,316}+p_{9,508}+p_{9,66}+p_{9,194}+2p_{9,450} \\ &+2p_{9,410}+p_{9,38}+p_{9,486}+2p_{9,214}+p_{9,142}+p_{9,41}+2p_{9,361} \\ &+p_{9,153}+p_{9,389}+p_{9,501}+p_{9,381}+2p_{9,363}+2p_{9,343}+p_{9,367}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,148} = \frac{1}{2}p_{9,148} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,148}^2 - 4(p_{9,256}+p_{9,416}+p_{9,496}+p_{9,196}+p_{9,100} \\ &+p_{9,228}+p_{9,428}+p_{9,188}+p_{9,380}+p_{9,66}+2p_{9,322}+p_{9,450} \\ &+2p_{9,282}+p_{9,422}+p_{9,358}+2p_{9,86}+p_{9,14}+p_{9,425}+2p_{9,233} \\ &+p_{9,25}+p_{9,261}+p_{9,373}+p_{9,253}+2p_{9,235}+2p_{9,215}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,660} = \frac{1}{2}p_{9,148} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,148}^2 - 4(p_{9,256}+p_{9,416}+p_{9,496}+p_{9,196}+p_{9,100} \\ &+p_{9,228}+p_{9,428}+p_{9,188}+p_{9,380}+p_{9,66}+2p_{9,322}+p_{9,450} \\ &+2p_{9,282}+p_{9,422}+p_{9,358}+2p_{9,86}+p_{9,14}+p_{9,425}+2p_{9,233} \\ &+p_{9,25}+p_{9,261}+p_{9,373}+p_{9,253}+2p_{9,235}+2p_{9,215}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,404} = \frac{1}{2}p_{9,404} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,404}^2 - 4(p_{9,0}+p_{9,160}+p_{9,240}+p_{9,452}+p_{9,356}+p_{9,484} \\ &+p_{9,172}+p_{9,444}+p_{9,124}+2p_{9,66}+p_{9,322}+p_{9,194}+2p_{9,26} \\ &+p_{9,166}+p_{9,102}+2p_{9,342}+p_{9,270}+p_{9,169}+2p_{9,489}+p_{9,281} \\ &+p_{9,5}+p_{9,117}+p_{9,509}+2p_{9,491}+2p_{9,471}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,916} = \frac{1}{2}p_{9,404} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,404}^2 - 4(p_{9,0}+p_{9,160}+p_{9,240}+p_{9,452}+p_{9,356}+p_{9,484} \\ &+p_{9,172}+p_{9,444}+p_{9,124}+2p_{9,66}+p_{9,322}+p_{9,194}+2p_{9,26} \\ &+p_{9,166}+p_{9,102}+2p_{9,342}+p_{9,270}+p_{9,169}+2p_{9,489}+p_{9,281} \\ &+p_{9,5}+p_{9,117}+p_{9,509}+2p_{9,491}+2p_{9,471}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,84} = \frac{1}{2}p_{9,84} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,84}^2 - 4(p_{9,192}+p_{9,352}+p_{9,432}+p_{9,132}+p_{9,36}+p_{9,164} \\ &+p_{9,364}+p_{9,316}+p_{9,124}+p_{9,2}+2p_{9,258}+p_{9,386}+2p_{9,218} \\ &+p_{9,294}+p_{9,358}+2p_{9,22}+p_{9,462}+2p_{9,169}+p_{9,361}+p_{9,473} \\ &+p_{9,197}+p_{9,309}+p_{9,189}+2p_{9,171}+2p_{9,151}+p_{9,175}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,852} = \frac{1}{2}p_{9,340} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,340}^2 - 4(p_{9,448}+p_{9,96}+p_{9,176}+p_{9,388}+p_{9,292} \\ &+p_{9,420}+p_{9,108}+p_{9,60}+p_{9,380}+2p_{9,2}+p_{9,258}+p_{9,130} \\ &+2p_{9,474}+p_{9,38}+p_{9,102}+2p_{9,278}+p_{9,206}+2p_{9,425}+p_{9,105} \\ &+p_{9,217}+p_{9,453}+p_{9,53}+p_{9,445}+2p_{9,427}+2p_{9,407}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,212} = \frac{1}{2}p_{9,212} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,212}^2 - 4(p_{9,320}+p_{9,480}+p_{9,48}+p_{9,260}+p_{9,292} \\ &+p_{9,164}+p_{9,492}+p_{9,444}+p_{9,252}+p_{9,2}+p_{9,130}+2p_{9,386} \\ &+2p_{9,346}+p_{9,422}+p_{9,486}+2p_{9,150}+p_{9,78}+2p_{9,297}+p_{9,489} \\ &+p_{9,89}+p_{9,325}+p_{9,437}+p_{9,317}+2p_{9,299}+2p_{9,279}+p_{9,303}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,468} = \frac{1}{2}p_{9,468} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,468}^2 - 4(p_{9,64}+p_{9,224}+p_{9,304}+p_{9,4}+p_{9,36}+p_{9,420} \\ &+p_{9,236}+p_{9,188}+p_{9,508}+p_{9,258}+2p_{9,130}+p_{9,386}+2p_{9,90} \\ &+p_{9,166}+p_{9,230}+2p_{9,406}+p_{9,334}+2p_{9,41}+p_{9,233}+p_{9,345} \\ &+p_{9,69}+p_{9,181}+p_{9,61}+2p_{9,43}+2p_{9,23}+p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,980} = \frac{1}{2}p_{9,468} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,468}^2 - 4(p_{9,64}+p_{9,224}+p_{9,304}+p_{9,4}+p_{9,36}+p_{9,420} \\ &+p_{9,236}+p_{9,188}+p_{9,508}+p_{9,258}+2p_{9,130}+p_{9,386}+2p_{9,90} \\ &+p_{9,166}+p_{9,230}+2p_{9,406}+p_{9,334}+2p_{9,41}+p_{9,233}+p_{9,345} \\ &+p_{9,69}+p_{9,181}+p_{9,61}+2p_{9,43}+2p_{9,23}+p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,52} = \frac{1}{2}p_{9,52} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,52}^2 - 4(p_{9,320}+p_{9,160}+p_{9,400}+p_{9,4}+p_{9,132}+p_{9,100} \\ &+p_{9,332}+p_{9,284}+p_{9,92}+p_{9,354}+2p_{9,226}+p_{9,482}+2p_{9,186} \\ &+p_{9,262}+p_{9,326}+2p_{9,502}+p_{9,430}+2p_{9,137}+p_{9,329}+p_{9,441} \\ &+p_{9,165}+p_{9,277}+p_{9,157}+2p_{9,139}+2p_{9,119}+p_{9,143}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,564} = \frac{1}{2}p_{9,52} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,52}^2 - 4(p_{9,320}+p_{9,160}+p_{9,400}+p_{9,4}+p_{9,132}+p_{9,100} \\ &+p_{9,332}+p_{9,284}+p_{9,92}+p_{9,354}+2p_{9,226}+p_{9,482}+2p_{9,186} \\ &+p_{9,262}+p_{9,326}+2p_{9,502}+p_{9,430}+2p_{9,137}+p_{9,329}+p_{9,441} \\ &+p_{9,165}+p_{9,277}+p_{9,157}+2p_{9,139}+2p_{9,119}+p_{9,143}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,308} = \frac{1}{2}p_{9,308} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,308}^2 - 4(p_{9,64}+p_{9,416}+p_{9,144}+p_{9,260}+p_{9,388} \\ &+p_{9,356}+p_{9,76}+p_{9,28}+p_{9,348}+p_{9,98}+p_{9,226}+2p_{9,482} \\ &+2p_{9,442}+p_{9,6}+p_{9,70}+2p_{9,246}+p_{9,174}+2p_{9,393}+p_{9,73} \\ &+p_{9,185}+p_{9,421}+p_{9,21}+p_{9,413}+2p_{9,395}+2p_{9,375}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,820} = \frac{1}{2}p_{9,308} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,308}^2 - 4(p_{9,64}+p_{9,416}+p_{9,144}+p_{9,260}+p_{9,388} \\ &+p_{9,356}+p_{9,76}+p_{9,28}+p_{9,348}+p_{9,98}+p_{9,226}+2p_{9,482} \\ &+2p_{9,442}+p_{9,6}+p_{9,70}+2p_{9,246}+p_{9,174}+2p_{9,393}+p_{9,73} \\ &+p_{9,185}+p_{9,421}+p_{9,21}+p_{9,413}+2p_{9,395}+2p_{9,375}+p_{9,399}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,692} = \frac{1}{2}p_{9,180} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,180}^2 - 4(p_{9,448}+p_{9,288}+p_{9,16}+p_{9,260}+p_{9,132} \\ &+p_{9,228}+p_{9,460}+p_{9,412}+p_{9,220}+p_{9,98}+2p_{9,354}+p_{9,482} \\ &+2p_{9,314}+p_{9,390}+p_{9,454}+2p_{9,118}+p_{9,46}+2p_{9,265}+p_{9,457} \\ &+p_{9,57}+p_{9,293}+p_{9,405}+p_{9,285}+2p_{9,267}+2p_{9,247}+p_{9,271}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,948} = \frac{1}{2}p_{9,436} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,436}^2 - 4(p_{9,192}+p_{9,32}+p_{9,272}+p_{9,4}+p_{9,388} \\ &+p_{9,484}+p_{9,204}+p_{9,156}+p_{9,476}+2p_{9,98}+p_{9,354}+p_{9,226} \\ &+2p_{9,58}+p_{9,134}+p_{9,198}+2p_{9,374}+p_{9,302}+2p_{9,9}+p_{9,201} \\ &+p_{9,313}+p_{9,37}+p_{9,149}+p_{9,29}+2p_{9,11}+2p_{9,503}+p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,116} = \frac{1}{2}p_{9,116} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,116}^2 - 4(p_{9,384}+p_{9,224}+p_{9,464}+p_{9,68}+p_{9,196} \\ &+p_{9,164}+p_{9,396}+p_{9,156}+p_{9,348}+p_{9,34}+2p_{9,290}+p_{9,418} \\ &+2p_{9,250}+p_{9,390}+p_{9,326}+2p_{9,54}+p_{9,494}+p_{9,393}+2p_{9,201} \\ &+p_{9,505}+p_{9,229}+p_{9,341}+p_{9,221}+2p_{9,203}+2p_{9,183}+p_{9,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,628} = \frac{1}{2}p_{9,116} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,116}^2 - 4(p_{9,384}+p_{9,224}+p_{9,464}+p_{9,68}+p_{9,196} \\ &+p_{9,164}+p_{9,396}+p_{9,156}+p_{9,348}+p_{9,34}+2p_{9,290}+p_{9,418} \\ &+2p_{9,250}+p_{9,390}+p_{9,326}+2p_{9,54}+p_{9,494}+p_{9,393}+2p_{9,201} \\ &+p_{9,505}+p_{9,229}+p_{9,341}+p_{9,221}+2p_{9,203}+2p_{9,183}+p_{9,207}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,884} = \frac{1}{2}p_{9,372} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,372}^2 - 4(p_{9,128}+p_{9,480}+p_{9,208}+p_{9,324}+p_{9,452} \\ &+p_{9,420}+p_{9,140}+p_{9,412}+p_{9,92}+2p_{9,34}+p_{9,290}+p_{9,162} \\ &+2p_{9,506}+p_{9,134}+p_{9,70}+2p_{9,310}+p_{9,238}+p_{9,137}+2p_{9,457} \\ &+p_{9,249}+p_{9,485}+p_{9,85}+p_{9,477}+2p_{9,459}+2p_{9,439}+p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,244} = \frac{1}{2}p_{9,244} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,244}^2 - 4(p_{9,0}+p_{9,352}+p_{9,80}+p_{9,324}+p_{9,196}+p_{9,292} \\ &+p_{9,12}+p_{9,284}+p_{9,476}+p_{9,34}+p_{9,162}+2p_{9,418}+2p_{9,378} \\ &+p_{9,6}+p_{9,454}+2p_{9,182}+p_{9,110}+p_{9,9}+2p_{9,329}+p_{9,121} \\ &+p_{9,357}+p_{9,469}+p_{9,349}+2p_{9,331}+2p_{9,311}+p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,756} = \frac{1}{2}p_{9,244} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,244}^2 - 4(p_{9,0}+p_{9,352}+p_{9,80}+p_{9,324}+p_{9,196}+p_{9,292} \\ &+p_{9,12}+p_{9,284}+p_{9,476}+p_{9,34}+p_{9,162}+2p_{9,418}+2p_{9,378} \\ &+p_{9,6}+p_{9,454}+2p_{9,182}+p_{9,110}+p_{9,9}+2p_{9,329}+p_{9,121} \\ &+p_{9,357}+p_{9,469}+p_{9,349}+2p_{9,331}+2p_{9,311}+p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,500} = \frac{1}{2}p_{9,500} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,500}^2 - 4(p_{9,256}+p_{9,96}+p_{9,336}+p_{9,68}+p_{9,452}+p_{9,36} \\ &+p_{9,268}+p_{9,28}+p_{9,220}+p_{9,290}+2p_{9,162}+p_{9,418}+2p_{9,122} \\ &+p_{9,262}+p_{9,198}+2p_{9,438}+p_{9,366}+p_{9,265}+2p_{9,73}+p_{9,377} \\ &+p_{9,101}+p_{9,213}+p_{9,93}+2p_{9,75}+2p_{9,55}+p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1012} = \frac{1}{2}p_{9,500} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,500}^2 - 4(p_{9,256}+p_{9,96}+p_{9,336}+p_{9,68}+p_{9,452}+p_{9,36} \\ &+p_{9,268}+p_{9,28}+p_{9,220}+p_{9,290}+2p_{9,162}+p_{9,418}+2p_{9,122} \\ &+p_{9,262}+p_{9,198}+2p_{9,438}+p_{9,366}+p_{9,265}+2p_{9,73}+p_{9,377} \\ &+p_{9,101}+p_{9,213}+p_{9,93}+2p_{9,75}+2p_{9,55}+p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,12} = \frac{1}{2}p_{9,12} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,12}^2 - 4(p_{9,360}+p_{9,280}+p_{9,120}+p_{9,292}+p_{9,52} \\ &+p_{9,244}+p_{9,92}+p_{9,476}+p_{9,60}+2p_{9,146}+p_{9,314}+2p_{9,186} \\ &+p_{9,442}+p_{9,390}+2p_{9,462}+p_{9,286}+p_{9,222}+p_{9,289}+2p_{9,97} \\ &+p_{9,401}+p_{9,117}+p_{9,237}+p_{9,125}+2p_{9,99}+p_{9,103}+2p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,524} = \frac{1}{2}p_{9,12} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,12}^2 - 4(p_{9,360}+p_{9,280}+p_{9,120}+p_{9,292}+p_{9,52} \\ &+p_{9,244}+p_{9,92}+p_{9,476}+p_{9,60}+2p_{9,146}+p_{9,314}+2p_{9,186} \\ &+p_{9,442}+p_{9,390}+2p_{9,462}+p_{9,286}+p_{9,222}+p_{9,289}+2p_{9,97} \\ &+p_{9,401}+p_{9,117}+p_{9,237}+p_{9,125}+2p_{9,99}+p_{9,103}+2p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,268} = \frac{1}{2}p_{9,268} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,268}^2 - 4(p_{9,104}+p_{9,24}+p_{9,376}+p_{9,36}+p_{9,308}+p_{9,500} \\ &+p_{9,348}+p_{9,220}+p_{9,316}+2p_{9,402}+p_{9,58}+p_{9,186}+2p_{9,442} \\ &+p_{9,134}+2p_{9,206}+p_{9,30}+p_{9,478}+p_{9,33}+2p_{9,353}+p_{9,145} \\ &+p_{9,373}+p_{9,493}+p_{9,381}+2p_{9,355}+p_{9,359}+2p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,780} = \frac{1}{2}p_{9,268} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,268}^2 - 4(p_{9,104}+p_{9,24}+p_{9,376}+p_{9,36}+p_{9,308}+p_{9,500} \\ &+p_{9,348}+p_{9,220}+p_{9,316}+2p_{9,402}+p_{9,58}+p_{9,186}+2p_{9,442} \\ &+p_{9,134}+2p_{9,206}+p_{9,30}+p_{9,478}+p_{9,33}+2p_{9,353}+p_{9,145} \\ &+p_{9,373}+p_{9,493}+p_{9,381}+2p_{9,355}+p_{9,359}+2p_{9,335}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,396} = \frac{1}{2}p_{9,396} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,396}^2 - 4(p_{9,232}+p_{9,152}+p_{9,504}+p_{9,164}+p_{9,436} \\ &+p_{9,116}+p_{9,348}+p_{9,476}+p_{9,444}+2p_{9,18}+2p_{9,58}+p_{9,314} \\ &+p_{9,186}+p_{9,262}+2p_{9,334}+p_{9,158}+p_{9,94}+p_{9,161}+2p_{9,481} \\ &+p_{9,273}+p_{9,501}+p_{9,109}+p_{9,509}+2p_{9,483}+p_{9,487}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,908} = \frac{1}{2}p_{9,396} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,396}^2 - 4(p_{9,232}+p_{9,152}+p_{9,504}+p_{9,164}+p_{9,436} \\ &+p_{9,116}+p_{9,348}+p_{9,476}+p_{9,444}+2p_{9,18}+2p_{9,58}+p_{9,314} \\ &+p_{9,186}+p_{9,262}+2p_{9,334}+p_{9,158}+p_{9,94}+p_{9,161}+2p_{9,481} \\ &+p_{9,273}+p_{9,501}+p_{9,109}+p_{9,509}+2p_{9,483}+p_{9,487}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,76} = \frac{1}{2}p_{9,76} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,76}^2 - 4(p_{9,424}+p_{9,344}+p_{9,184}+p_{9,356}+p_{9,308} \\ &+p_{9,116}+p_{9,28}+p_{9,156}+p_{9,124}+2p_{9,210}+p_{9,378}+2p_{9,250} \\ &+p_{9,506}+p_{9,454}+2p_{9,14}+p_{9,286}+p_{9,350}+2p_{9,161}+p_{9,353} \\ &+p_{9,465}+p_{9,181}+p_{9,301}+p_{9,189}+2p_{9,163}+p_{9,167}+2p_{9,143}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,332} = \frac{1}{2}p_{9,332} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,332}^2 - 4(p_{9,168}+p_{9,88}+p_{9,440}+p_{9,100}+p_{9,52}+p_{9,372} \\ &+p_{9,284}+p_{9,412}+p_{9,380}+2p_{9,466}+p_{9,122}+p_{9,250}+2p_{9,506} \\ &+p_{9,198}+2p_{9,270}+p_{9,30}+p_{9,94}+2p_{9,417}+p_{9,97}+p_{9,209} \\ &+p_{9,437}+p_{9,45}+p_{9,445}+2p_{9,419}+p_{9,423}+2p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,844} = \frac{1}{2}p_{9,332} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,332}^2 - 4(p_{9,168}+p_{9,88}+p_{9,440}+p_{9,100}+p_{9,52}+p_{9,372} \\ &+p_{9,284}+p_{9,412}+p_{9,380}+2p_{9,466}+p_{9,122}+p_{9,250}+2p_{9,506} \\ &+p_{9,198}+2p_{9,270}+p_{9,30}+p_{9,94}+2p_{9,417}+p_{9,97}+p_{9,209} \\ &+p_{9,437}+p_{9,45}+p_{9,445}+2p_{9,419}+p_{9,423}+2p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,204} = \frac{1}{2}p_{9,204} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,204}^2 - 4(p_{9,40}+p_{9,472}+p_{9,312}+p_{9,484}+p_{9,436} \\ &+p_{9,244}+p_{9,284}+p_{9,156}+p_{9,252}+2p_{9,338}+p_{9,122}+2p_{9,378} \\ &+p_{9,506}+p_{9,70}+2p_{9,142}+p_{9,414}+p_{9,478}+2p_{9,289}+p_{9,481} \\ &+p_{9,81}+p_{9,309}+p_{9,429}+p_{9,317}+2p_{9,291}+p_{9,295}+2p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,716} = \frac{1}{2}p_{9,204} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,204}^2 - 4(p_{9,40}+p_{9,472}+p_{9,312}+p_{9,484}+p_{9,436} \\ &+p_{9,244}+p_{9,284}+p_{9,156}+p_{9,252}+2p_{9,338}+p_{9,122}+2p_{9,378} \\ &+p_{9,506}+p_{9,70}+2p_{9,142}+p_{9,414}+p_{9,478}+2p_{9,289}+p_{9,481} \\ &+p_{9,81}+p_{9,309}+p_{9,429}+p_{9,317}+2p_{9,291}+p_{9,295}+2p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,460} = \frac{1}{2}p_{9,460} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,460}^2 - 4(p_{9,296}+p_{9,216}+p_{9,56}+p_{9,228}+p_{9,180} \\ &+p_{9,500}+p_{9,28}+p_{9,412}+p_{9,508}+2p_{9,82}+2p_{9,122}+p_{9,378} \\ &+p_{9,250}+p_{9,326}+2p_{9,398}+p_{9,158}+p_{9,222}+2p_{9,33}+p_{9,225} \\ &+p_{9,337}+p_{9,53}+p_{9,173}+p_{9,61}+2p_{9,35}+p_{9,39}+2p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,972} = \frac{1}{2}p_{9,460} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,460}^2 - 4(p_{9,296}+p_{9,216}+p_{9,56}+p_{9,228}+p_{9,180} \\ &+p_{9,500}+p_{9,28}+p_{9,412}+p_{9,508}+2p_{9,82}+2p_{9,122}+p_{9,378} \\ &+p_{9,250}+p_{9,326}+2p_{9,398}+p_{9,158}+p_{9,222}+2p_{9,33}+p_{9,225} \\ &+p_{9,337}+p_{9,53}+p_{9,173}+p_{9,61}+2p_{9,35}+p_{9,39}+2p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,44} = \frac{1}{2}p_{9,44} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,44}^2 - 4(p_{9,392}+p_{9,152}+p_{9,312}+p_{9,324}+p_{9,276}+p_{9,84} \\ &+p_{9,92}+p_{9,124}+p_{9,508}+2p_{9,178}+p_{9,346}+2p_{9,218}+p_{9,474} \\ &+p_{9,422}+2p_{9,494}+p_{9,318}+p_{9,254}+2p_{9,129}+p_{9,321}+p_{9,433} \\ &+p_{9,149}+p_{9,269}+p_{9,157}+2p_{9,131}+p_{9,135}+2p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,556} = \frac{1}{2}p_{9,44} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,44}^2 - 4(p_{9,392}+p_{9,152}+p_{9,312}+p_{9,324}+p_{9,276}+p_{9,84} \\ &+p_{9,92}+p_{9,124}+p_{9,508}+2p_{9,178}+p_{9,346}+2p_{9,218}+p_{9,474} \\ &+p_{9,422}+2p_{9,494}+p_{9,318}+p_{9,254}+2p_{9,129}+p_{9,321}+p_{9,433} \\ &+p_{9,149}+p_{9,269}+p_{9,157}+2p_{9,131}+p_{9,135}+2p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,300} = \frac{1}{2}p_{9,300} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,300}^2 - 4(p_{9,136}+p_{9,408}+p_{9,56}+p_{9,68}+p_{9,20}+p_{9,340} \\ &+p_{9,348}+p_{9,380}+p_{9,252}+2p_{9,434}+p_{9,90}+p_{9,218}+2p_{9,474} \\ &+p_{9,166}+2p_{9,238}+p_{9,62}+p_{9,510}+2p_{9,385}+p_{9,65}+p_{9,177} \\ &+p_{9,405}+p_{9,13}+p_{9,413}+2p_{9,387}+p_{9,391}+2p_{9,367}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,812} = \frac{1}{2}p_{9,300} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,300}^2 - 4(p_{9,136}+p_{9,408}+p_{9,56}+p_{9,68}+p_{9,20}+p_{9,340} \\ &+p_{9,348}+p_{9,380}+p_{9,252}+2p_{9,434}+p_{9,90}+p_{9,218}+2p_{9,474} \\ &+p_{9,166}+2p_{9,238}+p_{9,62}+p_{9,510}+2p_{9,385}+p_{9,65}+p_{9,177} \\ &+p_{9,405}+p_{9,13}+p_{9,413}+2p_{9,387}+p_{9,391}+2p_{9,367}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,172} = \frac{1}{2}p_{9,172} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,172}^2 - 4(p_{9,8}+p_{9,280}+p_{9,440}+p_{9,452}+p_{9,404}+p_{9,212} \\ &+p_{9,220}+p_{9,124}+p_{9,252}+2p_{9,306}+p_{9,90}+2p_{9,346}+p_{9,474} \\ &+p_{9,38}+2p_{9,110}+p_{9,446}+p_{9,382}+2p_{9,257}+p_{9,449}+p_{9,49} \\ &+p_{9,277}+p_{9,397}+p_{9,285}+2p_{9,259}+p_{9,263}+2p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,684} = \frac{1}{2}p_{9,172} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,172}^2 - 4(p_{9,8}+p_{9,280}+p_{9,440}+p_{9,452}+p_{9,404}+p_{9,212} \\ &+p_{9,220}+p_{9,124}+p_{9,252}+2p_{9,306}+p_{9,90}+2p_{9,346}+p_{9,474} \\ &+p_{9,38}+2p_{9,110}+p_{9,446}+p_{9,382}+2p_{9,257}+p_{9,449}+p_{9,49} \\ &+p_{9,277}+p_{9,397}+p_{9,285}+2p_{9,259}+p_{9,263}+2p_{9,239}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 3 unreferenced roots were skipped} {\footnotesize \[p_{10,620} = \frac{1}{2}p_{9,108} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,108}^2 - 4(p_{9,456}+p_{9,216}+p_{9,376}+p_{9,388}+p_{9,148} \\ &+p_{9,340}+p_{9,156}+p_{9,60}+p_{9,188}+2p_{9,242}+p_{9,26}+2p_{9,282} \\ &+p_{9,410}+p_{9,486}+2p_{9,46}+p_{9,318}+p_{9,382}+p_{9,385}+2p_{9,193} \\ &+p_{9,497}+p_{9,213}+p_{9,333}+p_{9,221}+2p_{9,195}+p_{9,199}+2p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,364} = \frac{1}{2}p_{9,364} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,364}^2 - 4(p_{9,200}+p_{9,472}+p_{9,120}+p_{9,132}+p_{9,404} \\ &+p_{9,84}+p_{9,412}+p_{9,316}+p_{9,444}+2p_{9,498}+2p_{9,26}+p_{9,282} \\ &+p_{9,154}+p_{9,230}+2p_{9,302}+p_{9,62}+p_{9,126}+p_{9,129}+2p_{9,449} \\ &+p_{9,241}+p_{9,469}+p_{9,77}+p_{9,477}+2p_{9,451}+p_{9,455}+2p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,876} = \frac{1}{2}p_{9,364} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,364}^2 - 4(p_{9,200}+p_{9,472}+p_{9,120}+p_{9,132}+p_{9,404} \\ &+p_{9,84}+p_{9,412}+p_{9,316}+p_{9,444}+2p_{9,498}+2p_{9,26}+p_{9,282} \\ &+p_{9,154}+p_{9,230}+2p_{9,302}+p_{9,62}+p_{9,126}+p_{9,129}+2p_{9,449} \\ &+p_{9,241}+p_{9,469}+p_{9,77}+p_{9,477}+2p_{9,451}+p_{9,455}+2p_{9,431}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,748} = \frac{1}{2}p_{9,236} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,236}^2 - 4(p_{9,72}+p_{9,344}+p_{9,504}+p_{9,4}+p_{9,276}+p_{9,468} \\ &+p_{9,284}+p_{9,316}+p_{9,188}+2p_{9,370}+p_{9,26}+p_{9,154}+2p_{9,410} \\ &+p_{9,102}+2p_{9,174}+p_{9,446}+p_{9,510}+p_{9,1}+2p_{9,321}+p_{9,113} \\ &+p_{9,341}+p_{9,461}+p_{9,349}+2p_{9,323}+p_{9,327}+2p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,492} = \frac{1}{2}p_{9,492} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,492}^2 - 4(p_{9,328}+p_{9,88}+p_{9,248}+p_{9,260}+p_{9,20} \\ &+p_{9,212}+p_{9,28}+p_{9,60}+p_{9,444}+2p_{9,114}+p_{9,282}+2p_{9,154} \\ &+p_{9,410}+p_{9,358}+2p_{9,430}+p_{9,190}+p_{9,254}+p_{9,257}+2p_{9,65} \\ &+p_{9,369}+p_{9,85}+p_{9,205}+p_{9,93}+2p_{9,67}+p_{9,71}+2p_{9,47}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,28} = \frac{1}{2}p_{9,28} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,28}^2 - 4(p_{9,136}+p_{9,296}+p_{9,376}+p_{9,260}+p_{9,68}+p_{9,308} \\ &+p_{9,76}+p_{9,108}+p_{9,492}+2p_{9,162}+p_{9,330}+2p_{9,202}+p_{9,458} \\ &+p_{9,406}+p_{9,302}+p_{9,238}+2p_{9,478}+p_{9,417}+p_{9,305}+2p_{9,113} \\ &+p_{9,133}+p_{9,141}+p_{9,253}+2p_{9,115}+p_{9,119}+2p_{9,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,284} = \frac{1}{2}p_{9,284} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,284}^2 - 4(p_{9,392}+p_{9,40}+p_{9,120}+p_{9,4}+p_{9,324}+p_{9,52} \\ &+p_{9,332}+p_{9,364}+p_{9,236}+2p_{9,418}+p_{9,74}+p_{9,202}+2p_{9,458} \\ &+p_{9,150}+p_{9,46}+p_{9,494}+2p_{9,222}+p_{9,161}+p_{9,49}+2p_{9,369} \\ &+p_{9,389}+p_{9,397}+p_{9,509}+2p_{9,371}+p_{9,375}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,796} = \frac{1}{2}p_{9,284} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,284}^2 - 4(p_{9,392}+p_{9,40}+p_{9,120}+p_{9,4}+p_{9,324}+p_{9,52} \\ &+p_{9,332}+p_{9,364}+p_{9,236}+2p_{9,418}+p_{9,74}+p_{9,202}+2p_{9,458} \\ &+p_{9,150}+p_{9,46}+p_{9,494}+2p_{9,222}+p_{9,161}+p_{9,49}+2p_{9,369} \\ &+p_{9,389}+p_{9,397}+p_{9,509}+2p_{9,371}+p_{9,375}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,156} = \frac{1}{2}p_{9,156} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,156}^2 - 4(p_{9,264}+p_{9,424}+p_{9,504}+p_{9,388}+p_{9,196} \\ &+p_{9,436}+p_{9,204}+p_{9,108}+p_{9,236}+2p_{9,290}+p_{9,74}+2p_{9,330} \\ &+p_{9,458}+p_{9,22}+p_{9,430}+p_{9,366}+2p_{9,94}+p_{9,33}+p_{9,433} \\ &+2p_{9,241}+p_{9,261}+p_{9,269}+p_{9,381}+2p_{9,243}+p_{9,247}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,668} = \frac{1}{2}p_{9,156} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,156}^2 - 4(p_{9,264}+p_{9,424}+p_{9,504}+p_{9,388}+p_{9,196} \\ &+p_{9,436}+p_{9,204}+p_{9,108}+p_{9,236}+2p_{9,290}+p_{9,74}+2p_{9,330} \\ &+p_{9,458}+p_{9,22}+p_{9,430}+p_{9,366}+2p_{9,94}+p_{9,33}+p_{9,433} \\ &+2p_{9,241}+p_{9,261}+p_{9,269}+p_{9,381}+2p_{9,243}+p_{9,247}+2p_{9,223}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,924} = \frac{1}{2}p_{9,412} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,412}^2 - 4(p_{9,8}+p_{9,168}+p_{9,248}+p_{9,132}+p_{9,452} \\ &+p_{9,180}+p_{9,460}+p_{9,364}+p_{9,492}+2p_{9,34}+2p_{9,74}+p_{9,330} \\ &+p_{9,202}+p_{9,278}+p_{9,174}+p_{9,110}+2p_{9,350}+p_{9,289}+p_{9,177} \\ &+2p_{9,497}+p_{9,5}+p_{9,13}+p_{9,125}+2p_{9,499}+p_{9,503}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,92} = \frac{1}{2}p_{9,92} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,92}^2 - 4(p_{9,200}+p_{9,360}+p_{9,440}+p_{9,132}+p_{9,324} \\ &+p_{9,372}+p_{9,140}+p_{9,44}+p_{9,172}+2p_{9,226}+p_{9,10}+2p_{9,266} \\ &+p_{9,394}+p_{9,470}+p_{9,302}+p_{9,366}+2p_{9,30}+p_{9,481}+2p_{9,177} \\ &+p_{9,369}+p_{9,197}+p_{9,205}+p_{9,317}+2p_{9,179}+p_{9,183}+2p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,604} = \frac{1}{2}p_{9,92} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,92}^2 - 4(p_{9,200}+p_{9,360}+p_{9,440}+p_{9,132}+p_{9,324} \\ &+p_{9,372}+p_{9,140}+p_{9,44}+p_{9,172}+2p_{9,226}+p_{9,10}+2p_{9,266} \\ &+p_{9,394}+p_{9,470}+p_{9,302}+p_{9,366}+2p_{9,30}+p_{9,481}+2p_{9,177} \\ &+p_{9,369}+p_{9,197}+p_{9,205}+p_{9,317}+2p_{9,179}+p_{9,183}+2p_{9,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 3 unreferenced roots were skipped} {\footnotesize \[p_{10,732} = \frac{1}{2}p_{9,220} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,220}^2 - 4(p_{9,328}+p_{9,488}+p_{9,56}+p_{9,260}+p_{9,452} \\ &+p_{9,500}+p_{9,268}+p_{9,300}+p_{9,172}+2p_{9,354}+p_{9,10}+p_{9,138} \\ &+2p_{9,394}+p_{9,86}+p_{9,430}+p_{9,494}+2p_{9,158}+p_{9,97}+2p_{9,305} \\ &+p_{9,497}+p_{9,325}+p_{9,333}+p_{9,445}+2p_{9,307}+p_{9,311}+2p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,476} = \frac{1}{2}p_{9,476} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,476}^2 - 4(p_{9,72}+p_{9,232}+p_{9,312}+p_{9,4}+p_{9,196} \\ &+p_{9,244}+p_{9,12}+p_{9,44}+p_{9,428}+2p_{9,98}+p_{9,266}+2p_{9,138} \\ &+p_{9,394}+p_{9,342}+p_{9,174}+p_{9,238}+2p_{9,414}+p_{9,353}+2p_{9,49} \\ &+p_{9,241}+p_{9,69}+p_{9,77}+p_{9,189}+2p_{9,51}+p_{9,55}+2p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,988} = \frac{1}{2}p_{9,476} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,476}^2 - 4(p_{9,72}+p_{9,232}+p_{9,312}+p_{9,4}+p_{9,196} \\ &+p_{9,244}+p_{9,12}+p_{9,44}+p_{9,428}+2p_{9,98}+p_{9,266}+2p_{9,138} \\ &+p_{9,394}+p_{9,342}+p_{9,174}+p_{9,238}+2p_{9,414}+p_{9,353}+2p_{9,49} \\ &+p_{9,241}+p_{9,69}+p_{9,77}+p_{9,189}+2p_{9,51}+p_{9,55}+2p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,60} = \frac{1}{2}p_{9,60} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,60}^2 - 4(p_{9,328}+p_{9,168}+p_{9,408}+p_{9,292}+p_{9,100}+p_{9,340} \\ &+p_{9,12}+p_{9,140}+p_{9,108}+2p_{9,194}+p_{9,362}+2p_{9,234}+p_{9,490} \\ &+p_{9,438}+p_{9,270}+p_{9,334}+2p_{9,510}+p_{9,449}+2p_{9,145}+p_{9,337} \\ &+p_{9,165}+p_{9,173}+p_{9,285}+2p_{9,147}+p_{9,151}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,572} = \frac{1}{2}p_{9,60} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,60}^2 - 4(p_{9,328}+p_{9,168}+p_{9,408}+p_{9,292}+p_{9,100}+p_{9,340} \\ &+p_{9,12}+p_{9,140}+p_{9,108}+2p_{9,194}+p_{9,362}+2p_{9,234}+p_{9,490} \\ &+p_{9,438}+p_{9,270}+p_{9,334}+2p_{9,510}+p_{9,449}+2p_{9,145}+p_{9,337} \\ &+p_{9,165}+p_{9,173}+p_{9,285}+2p_{9,147}+p_{9,151}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,316} = \frac{1}{2}p_{9,316} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,316}^2 - 4(p_{9,72}+p_{9,424}+p_{9,152}+p_{9,36}+p_{9,356}+p_{9,84} \\ &+p_{9,268}+p_{9,396}+p_{9,364}+2p_{9,450}+p_{9,106}+p_{9,234}+2p_{9,490} \\ &+p_{9,182}+p_{9,14}+p_{9,78}+2p_{9,254}+p_{9,193}+2p_{9,401}+p_{9,81} \\ &+p_{9,421}+p_{9,429}+p_{9,29}+2p_{9,403}+p_{9,407}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,828} = \frac{1}{2}p_{9,316} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,316}^2 - 4(p_{9,72}+p_{9,424}+p_{9,152}+p_{9,36}+p_{9,356}+p_{9,84} \\ &+p_{9,268}+p_{9,396}+p_{9,364}+2p_{9,450}+p_{9,106}+p_{9,234}+2p_{9,490} \\ &+p_{9,182}+p_{9,14}+p_{9,78}+2p_{9,254}+p_{9,193}+2p_{9,401}+p_{9,81} \\ &+p_{9,421}+p_{9,429}+p_{9,29}+2p_{9,403}+p_{9,407}+2p_{9,383}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,700} = \frac{1}{2}p_{9,188} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,188}^2 - 4(p_{9,456}+p_{9,296}+p_{9,24}+p_{9,420}+p_{9,228} \\ &+p_{9,468}+p_{9,268}+p_{9,140}+p_{9,236}+2p_{9,322}+p_{9,106}+2p_{9,362} \\ &+p_{9,490}+p_{9,54}+p_{9,398}+p_{9,462}+2p_{9,126}+p_{9,65}+2p_{9,273} \\ &+p_{9,465}+p_{9,293}+p_{9,301}+p_{9,413}+2p_{9,275}+p_{9,279}+2p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,444} = \frac{1}{2}p_{9,444} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,444}^2 - 4(p_{9,200}+p_{9,40}+p_{9,280}+p_{9,164}+p_{9,484} \\ &+p_{9,212}+p_{9,12}+p_{9,396}+p_{9,492}+2p_{9,66}+2p_{9,106}+p_{9,362} \\ &+p_{9,234}+p_{9,310}+p_{9,142}+p_{9,206}+2p_{9,382}+p_{9,321}+2p_{9,17} \\ &+p_{9,209}+p_{9,37}+p_{9,45}+p_{9,157}+2p_{9,19}+p_{9,23}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,956} = \frac{1}{2}p_{9,444} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,444}^2 - 4(p_{9,200}+p_{9,40}+p_{9,280}+p_{9,164}+p_{9,484} \\ &+p_{9,212}+p_{9,12}+p_{9,396}+p_{9,492}+2p_{9,66}+2p_{9,106}+p_{9,362} \\ &+p_{9,234}+p_{9,310}+p_{9,142}+p_{9,206}+2p_{9,382}+p_{9,321}+2p_{9,17} \\ &+p_{9,209}+p_{9,37}+p_{9,45}+p_{9,157}+2p_{9,19}+p_{9,23}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,124} = \frac{1}{2}p_{9,124} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,124}^2 - 4(p_{9,392}+p_{9,232}+p_{9,472}+p_{9,164}+p_{9,356} \\ &+p_{9,404}+p_{9,76}+p_{9,204}+p_{9,172}+2p_{9,258}+p_{9,42}+2p_{9,298} \\ &+p_{9,426}+p_{9,502}+p_{9,398}+p_{9,334}+2p_{9,62}+p_{9,1}+p_{9,401} \\ &+2p_{9,209}+p_{9,229}+p_{9,237}+p_{9,349}+2p_{9,211}+p_{9,215}+2p_{9,191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,380} = \frac{1}{2}p_{9,380} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,380}^2 - 4(p_{9,136}+p_{9,488}+p_{9,216}+p_{9,420}+p_{9,100} \\ &+p_{9,148}+p_{9,332}+p_{9,460}+p_{9,428}+2p_{9,2}+2p_{9,42}+p_{9,298} \\ &+p_{9,170}+p_{9,246}+p_{9,142}+p_{9,78}+2p_{9,318}+p_{9,257}+p_{9,145} \\ &+2p_{9,465}+p_{9,485}+p_{9,493}+p_{9,93}+2p_{9,467}+p_{9,471}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,892} = \frac{1}{2}p_{9,380} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,380}^2 - 4(p_{9,136}+p_{9,488}+p_{9,216}+p_{9,420}+p_{9,100} \\ &+p_{9,148}+p_{9,332}+p_{9,460}+p_{9,428}+2p_{9,2}+2p_{9,42}+p_{9,298} \\ &+p_{9,170}+p_{9,246}+p_{9,142}+p_{9,78}+2p_{9,318}+p_{9,257}+p_{9,145} \\ &+2p_{9,465}+p_{9,485}+p_{9,493}+p_{9,93}+2p_{9,467}+p_{9,471}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,252} = \frac{1}{2}p_{9,252} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,252}^2 - 4(p_{9,8}+p_{9,360}+p_{9,88}+p_{9,292}+p_{9,484}+p_{9,20} \\ &+p_{9,332}+p_{9,204}+p_{9,300}+2p_{9,386}+p_{9,42}+p_{9,170}+2p_{9,426} \\ &+p_{9,118}+p_{9,14}+p_{9,462}+2p_{9,190}+p_{9,129}+p_{9,17}+2p_{9,337} \\ &+p_{9,357}+p_{9,365}+p_{9,477}+2p_{9,339}+p_{9,343}+2p_{9,319}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,508} = \frac{1}{2}p_{9,508} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,508}^2 - 4(p_{9,264}+p_{9,104}+p_{9,344}+p_{9,36}+p_{9,228} \\ &+p_{9,276}+p_{9,76}+p_{9,460}+p_{9,44}+2p_{9,130}+p_{9,298}+2p_{9,170} \\ &+p_{9,426}+p_{9,374}+p_{9,270}+p_{9,206}+2p_{9,446}+p_{9,385}+p_{9,273} \\ &+2p_{9,81}+p_{9,101}+p_{9,109}+p_{9,221}+2p_{9,83}+p_{9,87}+2p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1020} = \frac{1}{2}p_{9,508} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,508}^2 - 4(p_{9,264}+p_{9,104}+p_{9,344}+p_{9,36}+p_{9,228} \\ &+p_{9,276}+p_{9,76}+p_{9,460}+p_{9,44}+2p_{9,130}+p_{9,298}+2p_{9,170} \\ &+p_{9,426}+p_{9,374}+p_{9,270}+p_{9,206}+2p_{9,446}+p_{9,385}+p_{9,273} \\ &+2p_{9,81}+p_{9,101}+p_{9,109}+p_{9,221}+2p_{9,83}+p_{9,87}+2p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,2} = \frac{1}{2}p_{9,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,2}^2 - 4(p_{9,304}+2p_{9,176}+p_{9,432}+2p_{9,136}+2p_{9,452} \\ &+p_{9,276}+p_{9,212}+p_{9,380}+p_{9,82}+p_{9,466}+p_{9,50}+p_{9,42} \\ &+p_{9,234}+p_{9,282}+p_{9,270}+p_{9,110}+p_{9,350}+2p_{9,89}+2p_{9,69} \\ &+p_{9,93}+p_{9,227}+p_{9,115}+p_{9,107}+p_{9,391}+p_{9,279}+2p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,514} = \frac{1}{2}p_{9,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,2}^2 - 4(p_{9,304}+2p_{9,176}+p_{9,432}+2p_{9,136}+2p_{9,452} \\ &+p_{9,276}+p_{9,212}+p_{9,380}+p_{9,82}+p_{9,466}+p_{9,50}+p_{9,42} \\ &+p_{9,234}+p_{9,282}+p_{9,270}+p_{9,110}+p_{9,350}+2p_{9,89}+2p_{9,69} \\ &+p_{9,93}+p_{9,227}+p_{9,115}+p_{9,107}+p_{9,391}+p_{9,279}+2p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,258} = \frac{1}{2}p_{9,258} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,258}^2 - 4(p_{9,48}+p_{9,176}+2p_{9,432}+2p_{9,392}+2p_{9,196} \\ &+p_{9,20}+p_{9,468}+p_{9,124}+p_{9,338}+p_{9,210}+p_{9,306}+p_{9,298} \\ &+p_{9,490}+p_{9,26}+p_{9,14}+p_{9,366}+p_{9,94}+2p_{9,345}+2p_{9,325} \\ &+p_{9,349}+p_{9,483}+p_{9,371}+p_{9,363}+p_{9,135}+p_{9,23}+2p_{9,343}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,770} = \frac{1}{2}p_{9,258} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,258}^2 - 4(p_{9,48}+p_{9,176}+2p_{9,432}+2p_{9,392}+2p_{9,196} \\ &+p_{9,20}+p_{9,468}+p_{9,124}+p_{9,338}+p_{9,210}+p_{9,306}+p_{9,298} \\ &+p_{9,490}+p_{9,26}+p_{9,14}+p_{9,366}+p_{9,94}+2p_{9,345}+2p_{9,325} \\ &+p_{9,349}+p_{9,483}+p_{9,371}+p_{9,363}+p_{9,135}+p_{9,23}+2p_{9,343}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,642} = \frac{1}{2}p_{9,130} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,130}^2 - 4(p_{9,48}+2p_{9,304}+p_{9,432}+2p_{9,264}+2p_{9,68} \\ &+p_{9,404}+p_{9,340}+p_{9,508}+p_{9,82}+p_{9,210}+p_{9,178}+p_{9,170} \\ &+p_{9,362}+p_{9,410}+p_{9,398}+p_{9,238}+p_{9,478}+2p_{9,217}+2p_{9,197} \\ &+p_{9,221}+p_{9,355}+p_{9,243}+p_{9,235}+p_{9,7}+p_{9,407}+2p_{9,215}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,898} = \frac{1}{2}p_{9,386} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,386}^2 - 4(2p_{9,48}+p_{9,304}+p_{9,176}+2p_{9,8}+2p_{9,324} \\ &+p_{9,148}+p_{9,84}+p_{9,252}+p_{9,338}+p_{9,466}+p_{9,434}+p_{9,426} \\ &+p_{9,106}+p_{9,154}+p_{9,142}+p_{9,494}+p_{9,222}+2p_{9,473}+2p_{9,453} \\ &+p_{9,477}+p_{9,99}+p_{9,499}+p_{9,491}+p_{9,263}+p_{9,151}+2p_{9,471}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,578} = \frac{1}{2}p_{9,66} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,66}^2 - 4(p_{9,368}+2p_{9,240}+p_{9,496}+2p_{9,200}+2p_{9,4} \\ &+p_{9,276}+p_{9,340}+p_{9,444}+p_{9,18}+p_{9,146}+p_{9,114}+p_{9,298} \\ &+p_{9,106}+p_{9,346}+p_{9,334}+p_{9,174}+p_{9,414}+2p_{9,153}+2p_{9,133} \\ &+p_{9,157}+p_{9,291}+p_{9,179}+p_{9,171}+p_{9,455}+2p_{9,151}+p_{9,343}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,322} = \frac{1}{2}p_{9,322} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,322}^2 - 4(p_{9,112}+p_{9,240}+2p_{9,496}+2p_{9,456}+2p_{9,260} \\ &+p_{9,20}+p_{9,84}+p_{9,188}+p_{9,274}+p_{9,402}+p_{9,370}+p_{9,42} \\ &+p_{9,362}+p_{9,90}+p_{9,78}+p_{9,430}+p_{9,158}+2p_{9,409}+2p_{9,389} \\ &+p_{9,413}+p_{9,35}+p_{9,435}+p_{9,427}+p_{9,199}+2p_{9,407}+p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,834} = \frac{1}{2}p_{9,322} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,322}^2 - 4(p_{9,112}+p_{9,240}+2p_{9,496}+2p_{9,456}+2p_{9,260} \\ &+p_{9,20}+p_{9,84}+p_{9,188}+p_{9,274}+p_{9,402}+p_{9,370}+p_{9,42} \\ &+p_{9,362}+p_{9,90}+p_{9,78}+p_{9,430}+p_{9,158}+2p_{9,409}+2p_{9,389} \\ &+p_{9,413}+p_{9,35}+p_{9,435}+p_{9,427}+p_{9,199}+2p_{9,407}+p_{9,87}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,706} = \frac{1}{2}p_{9,194} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,194}^2 - 4(p_{9,112}+2p_{9,368}+p_{9,496}+2p_{9,328}+2p_{9,132} \\ &+p_{9,404}+p_{9,468}+p_{9,60}+p_{9,274}+p_{9,146}+p_{9,242}+p_{9,426} \\ &+p_{9,234}+p_{9,474}+p_{9,462}+p_{9,302}+p_{9,30}+2p_{9,281}+2p_{9,261} \\ &+p_{9,285}+p_{9,419}+p_{9,307}+p_{9,299}+p_{9,71}+2p_{9,279}+p_{9,471}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,962} = \frac{1}{2}p_{9,450} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,450}^2 - 4(2p_{9,112}+p_{9,368}+p_{9,240}+2p_{9,72}+2p_{9,388} \\ &+p_{9,148}+p_{9,212}+p_{9,316}+p_{9,18}+p_{9,402}+p_{9,498}+p_{9,170} \\ &+p_{9,490}+p_{9,218}+p_{9,206}+p_{9,46}+p_{9,286}+2p_{9,25}+2p_{9,5} \\ &+p_{9,29}+p_{9,163}+p_{9,51}+p_{9,43}+p_{9,327}+2p_{9,23}+p_{9,215}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,546} = \frac{1}{2}p_{9,34} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,34}^2 - 4(p_{9,336}+2p_{9,208}+p_{9,464}+2p_{9,168}+2p_{9,484} \\ &+p_{9,308}+p_{9,244}+p_{9,412}+p_{9,82}+p_{9,114}+p_{9,498}+p_{9,266} \\ &+p_{9,74}+p_{9,314}+p_{9,142}+p_{9,302}+p_{9,382}+2p_{9,121}+2p_{9,101} \\ &+p_{9,125}+p_{9,259}+p_{9,147}+p_{9,139}+p_{9,423}+p_{9,311}+2p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,290} = \frac{1}{2}p_{9,290} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,290}^2 - 4(p_{9,80}+p_{9,208}+2p_{9,464}+2p_{9,424}+2p_{9,228} \\ &+p_{9,52}+p_{9,500}+p_{9,156}+p_{9,338}+p_{9,370}+p_{9,242}+p_{9,10} \\ &+p_{9,330}+p_{9,58}+p_{9,398}+p_{9,46}+p_{9,126}+2p_{9,377}+2p_{9,357} \\ &+p_{9,381}+p_{9,3}+p_{9,403}+p_{9,395}+p_{9,167}+p_{9,55}+2p_{9,375}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,162} = \frac{1}{2}p_{9,162} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,162}^2 - 4(p_{9,80}+2p_{9,336}+p_{9,464}+2p_{9,296}+2p_{9,100} \\ &+p_{9,436}+p_{9,372}+p_{9,28}+p_{9,210}+p_{9,114}+p_{9,242}+p_{9,394} \\ &+p_{9,202}+p_{9,442}+p_{9,270}+p_{9,430}+p_{9,510}+2p_{9,249}+2p_{9,229} \\ &+p_{9,253}+p_{9,387}+p_{9,275}+p_{9,267}+p_{9,39}+p_{9,439}+2p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,674} = \frac{1}{2}p_{9,162} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,162}^2 - 4(p_{9,80}+2p_{9,336}+p_{9,464}+2p_{9,296}+2p_{9,100} \\ &+p_{9,436}+p_{9,372}+p_{9,28}+p_{9,210}+p_{9,114}+p_{9,242}+p_{9,394} \\ &+p_{9,202}+p_{9,442}+p_{9,270}+p_{9,430}+p_{9,510}+2p_{9,249}+2p_{9,229} \\ &+p_{9,253}+p_{9,387}+p_{9,275}+p_{9,267}+p_{9,39}+p_{9,439}+2p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,418} = \frac{1}{2}p_{9,418} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,418}^2 - 4(2p_{9,80}+p_{9,336}+p_{9,208}+2p_{9,40}+2p_{9,356} \\ &+p_{9,180}+p_{9,116}+p_{9,284}+p_{9,466}+p_{9,370}+p_{9,498}+p_{9,138} \\ &+p_{9,458}+p_{9,186}+p_{9,14}+p_{9,174}+p_{9,254}+2p_{9,505}+2p_{9,485} \\ &+p_{9,509}+p_{9,131}+p_{9,19}+p_{9,11}+p_{9,295}+p_{9,183}+2p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,930} = \frac{1}{2}p_{9,418} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,418}^2 - 4(2p_{9,80}+p_{9,336}+p_{9,208}+2p_{9,40}+2p_{9,356} \\ &+p_{9,180}+p_{9,116}+p_{9,284}+p_{9,466}+p_{9,370}+p_{9,498}+p_{9,138} \\ &+p_{9,458}+p_{9,186}+p_{9,14}+p_{9,174}+p_{9,254}+2p_{9,505}+2p_{9,485} \\ &+p_{9,509}+p_{9,131}+p_{9,19}+p_{9,11}+p_{9,295}+p_{9,183}+2p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,98} = \frac{1}{2}p_{9,98} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,98}^2 - 4(p_{9,16}+2p_{9,272}+p_{9,400}+2p_{9,232}+2p_{9,36} \\ &+p_{9,308}+p_{9,372}+p_{9,476}+p_{9,146}+p_{9,50}+p_{9,178}+p_{9,138} \\ &+p_{9,330}+p_{9,378}+p_{9,206}+p_{9,366}+p_{9,446}+2p_{9,185}+2p_{9,165} \\ &+p_{9,189}+p_{9,323}+p_{9,211}+p_{9,203}+p_{9,487}+2p_{9,183}+p_{9,375}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,610} = \frac{1}{2}p_{9,98} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,98}^2 - 4(p_{9,16}+2p_{9,272}+p_{9,400}+2p_{9,232}+2p_{9,36} \\ &+p_{9,308}+p_{9,372}+p_{9,476}+p_{9,146}+p_{9,50}+p_{9,178}+p_{9,138} \\ &+p_{9,330}+p_{9,378}+p_{9,206}+p_{9,366}+p_{9,446}+2p_{9,185}+2p_{9,165} \\ &+p_{9,189}+p_{9,323}+p_{9,211}+p_{9,203}+p_{9,487}+2p_{9,183}+p_{9,375}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,354} = \frac{1}{2}p_{9,354} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,354}^2 - 4(2p_{9,16}+p_{9,272}+p_{9,144}+2p_{9,488}+2p_{9,292} \\ &+p_{9,52}+p_{9,116}+p_{9,220}+p_{9,402}+p_{9,306}+p_{9,434}+p_{9,394} \\ &+p_{9,74}+p_{9,122}+p_{9,462}+p_{9,110}+p_{9,190}+2p_{9,441}+2p_{9,421} \\ &+p_{9,445}+p_{9,67}+p_{9,467}+p_{9,459}+p_{9,231}+2p_{9,439}+p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,866} = \frac{1}{2}p_{9,354} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,354}^2 - 4(2p_{9,16}+p_{9,272}+p_{9,144}+2p_{9,488}+2p_{9,292} \\ &+p_{9,52}+p_{9,116}+p_{9,220}+p_{9,402}+p_{9,306}+p_{9,434}+p_{9,394} \\ &+p_{9,74}+p_{9,122}+p_{9,462}+p_{9,110}+p_{9,190}+2p_{9,441}+2p_{9,421} \\ &+p_{9,445}+p_{9,67}+p_{9,467}+p_{9,459}+p_{9,231}+2p_{9,439}+p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,226} = \frac{1}{2}p_{9,226} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,226}^2 - 4(p_{9,16}+p_{9,144}+2p_{9,400}+2p_{9,360}+2p_{9,164} \\ &+p_{9,436}+p_{9,500}+p_{9,92}+p_{9,274}+p_{9,306}+p_{9,178}+p_{9,266} \\ &+p_{9,458}+p_{9,506}+p_{9,334}+p_{9,494}+p_{9,62}+2p_{9,313}+2p_{9,293} \\ &+p_{9,317}+p_{9,451}+p_{9,339}+p_{9,331}+p_{9,103}+2p_{9,311}+p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,738} = \frac{1}{2}p_{9,226} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,226}^2 - 4(p_{9,16}+p_{9,144}+2p_{9,400}+2p_{9,360}+2p_{9,164} \\ &+p_{9,436}+p_{9,500}+p_{9,92}+p_{9,274}+p_{9,306}+p_{9,178}+p_{9,266} \\ &+p_{9,458}+p_{9,506}+p_{9,334}+p_{9,494}+p_{9,62}+2p_{9,313}+2p_{9,293} \\ &+p_{9,317}+p_{9,451}+p_{9,339}+p_{9,331}+p_{9,103}+2p_{9,311}+p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,482} = \frac{1}{2}p_{9,482} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,482}^2 - 4(p_{9,272}+2p_{9,144}+p_{9,400}+2p_{9,104}+2p_{9,420} \\ &+p_{9,180}+p_{9,244}+p_{9,348}+p_{9,18}+p_{9,50}+p_{9,434}+p_{9,10} \\ &+p_{9,202}+p_{9,250}+p_{9,78}+p_{9,238}+p_{9,318}+2p_{9,57}+2p_{9,37} \\ &+p_{9,61}+p_{9,195}+p_{9,83}+p_{9,75}+p_{9,359}+2p_{9,55}+p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,994} = \frac{1}{2}p_{9,482} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,482}^2 - 4(p_{9,272}+2p_{9,144}+p_{9,400}+2p_{9,104}+2p_{9,420} \\ &+p_{9,180}+p_{9,244}+p_{9,348}+p_{9,18}+p_{9,50}+p_{9,434}+p_{9,10} \\ &+p_{9,202}+p_{9,250}+p_{9,78}+p_{9,238}+p_{9,318}+2p_{9,57}+2p_{9,37} \\ &+p_{9,61}+p_{9,195}+p_{9,83}+p_{9,75}+p_{9,359}+2p_{9,55}+p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,18} = \frac{1}{2}p_{9,18} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,18}^2 - 4(p_{9,320}+2p_{9,192}+p_{9,448}+2p_{9,152}+p_{9,292} \\ &+p_{9,228}+2p_{9,468}+p_{9,396}+p_{9,66}+p_{9,98}+p_{9,482}+p_{9,298} \\ &+p_{9,58}+p_{9,250}+p_{9,366}+p_{9,286}+p_{9,126}+2p_{9,105}+2p_{9,85} \\ &+p_{9,109}+p_{9,131}+p_{9,243}+p_{9,123}+p_{9,295}+2p_{9,103}+p_{9,407}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,530} = \frac{1}{2}p_{9,18} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,18}^2 - 4(p_{9,320}+2p_{9,192}+p_{9,448}+2p_{9,152}+p_{9,292} \\ &+p_{9,228}+2p_{9,468}+p_{9,396}+p_{9,66}+p_{9,98}+p_{9,482}+p_{9,298} \\ &+p_{9,58}+p_{9,250}+p_{9,366}+p_{9,286}+p_{9,126}+2p_{9,105}+2p_{9,85} \\ &+p_{9,109}+p_{9,131}+p_{9,243}+p_{9,123}+p_{9,295}+2p_{9,103}+p_{9,407}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,274} = \frac{1}{2}p_{9,274} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,274}^2 - 4(p_{9,64}+p_{9,192}+2p_{9,448}+2p_{9,408}+p_{9,36} \\ &+p_{9,484}+2p_{9,212}+p_{9,140}+p_{9,322}+p_{9,354}+p_{9,226}+p_{9,42} \\ &+p_{9,314}+p_{9,506}+p_{9,110}+p_{9,30}+p_{9,382}+2p_{9,361}+2p_{9,341} \\ &+p_{9,365}+p_{9,387}+p_{9,499}+p_{9,379}+p_{9,39}+2p_{9,359}+p_{9,151}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,146} = \frac{1}{2}p_{9,146} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,146}^2 - 4(p_{9,64}+2p_{9,320}+p_{9,448}+2p_{9,280}+p_{9,420} \\ &+p_{9,356}+2p_{9,84}+p_{9,12}+p_{9,194}+p_{9,98}+p_{9,226}+p_{9,426} \\ &+p_{9,186}+p_{9,378}+p_{9,494}+p_{9,414}+p_{9,254}+2p_{9,233}+2p_{9,213} \\ &+p_{9,237}+p_{9,259}+p_{9,371}+p_{9,251}+p_{9,423}+2p_{9,231}+p_{9,23}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,658} = \frac{1}{2}p_{9,146} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,146}^2 - 4(p_{9,64}+2p_{9,320}+p_{9,448}+2p_{9,280}+p_{9,420} \\ &+p_{9,356}+2p_{9,84}+p_{9,12}+p_{9,194}+p_{9,98}+p_{9,226}+p_{9,426} \\ &+p_{9,186}+p_{9,378}+p_{9,494}+p_{9,414}+p_{9,254}+2p_{9,233}+2p_{9,213} \\ &+p_{9,237}+p_{9,259}+p_{9,371}+p_{9,251}+p_{9,423}+2p_{9,231}+p_{9,23}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,402} = \frac{1}{2}p_{9,402} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,402}^2 - 4(2p_{9,64}+p_{9,320}+p_{9,192}+2p_{9,24}+p_{9,164} \\ &+p_{9,100}+2p_{9,340}+p_{9,268}+p_{9,450}+p_{9,354}+p_{9,482}+p_{9,170} \\ &+p_{9,442}+p_{9,122}+p_{9,238}+p_{9,158}+p_{9,510}+2p_{9,489}+2p_{9,469} \\ &+p_{9,493}+p_{9,3}+p_{9,115}+p_{9,507}+p_{9,167}+2p_{9,487}+p_{9,279}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,914} = \frac{1}{2}p_{9,402} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,402}^2 - 4(2p_{9,64}+p_{9,320}+p_{9,192}+2p_{9,24}+p_{9,164} \\ &+p_{9,100}+2p_{9,340}+p_{9,268}+p_{9,450}+p_{9,354}+p_{9,482}+p_{9,170} \\ &+p_{9,442}+p_{9,122}+p_{9,238}+p_{9,158}+p_{9,510}+2p_{9,489}+2p_{9,469} \\ &+p_{9,493}+p_{9,3}+p_{9,115}+p_{9,507}+p_{9,167}+2p_{9,487}+p_{9,279}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,82} = \frac{1}{2}p_{9,82} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,82}^2 - 4(p_{9,0}+2p_{9,256}+p_{9,384}+2p_{9,216}+p_{9,292} \\ &+p_{9,356}+2p_{9,20}+p_{9,460}+p_{9,130}+p_{9,34}+p_{9,162}+p_{9,362} \\ &+p_{9,314}+p_{9,122}+p_{9,430}+p_{9,350}+p_{9,190}+2p_{9,169}+2p_{9,149} \\ &+p_{9,173}+p_{9,195}+p_{9,307}+p_{9,187}+2p_{9,167}+p_{9,359}+p_{9,471}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,594} = \frac{1}{2}p_{9,82} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,82}^2 - 4(p_{9,0}+2p_{9,256}+p_{9,384}+2p_{9,216}+p_{9,292} \\ &+p_{9,356}+2p_{9,20}+p_{9,460}+p_{9,130}+p_{9,34}+p_{9,162}+p_{9,362} \\ &+p_{9,314}+p_{9,122}+p_{9,430}+p_{9,350}+p_{9,190}+2p_{9,169}+2p_{9,149} \\ &+p_{9,173}+p_{9,195}+p_{9,307}+p_{9,187}+2p_{9,167}+p_{9,359}+p_{9,471}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,338} = \frac{1}{2}p_{9,338} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,338}^2 - 4(2p_{9,0}+p_{9,256}+p_{9,128}+2p_{9,472}+p_{9,36} \\ &+p_{9,100}+2p_{9,276}+p_{9,204}+p_{9,386}+p_{9,290}+p_{9,418}+p_{9,106} \\ &+p_{9,58}+p_{9,378}+p_{9,174}+p_{9,94}+p_{9,446}+2p_{9,425}+2p_{9,405} \\ &+p_{9,429}+p_{9,451}+p_{9,51}+p_{9,443}+2p_{9,423}+p_{9,103}+p_{9,215}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,210} = \frac{1}{2}p_{9,210} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,210}^2 - 4(p_{9,0}+p_{9,128}+2p_{9,384}+2p_{9,344}+p_{9,420} \\ &+p_{9,484}+2p_{9,148}+p_{9,76}+p_{9,258}+p_{9,290}+p_{9,162}+p_{9,490} \\ &+p_{9,442}+p_{9,250}+p_{9,46}+p_{9,478}+p_{9,318}+2p_{9,297}+2p_{9,277} \\ &+p_{9,301}+p_{9,323}+p_{9,435}+p_{9,315}+2p_{9,295}+p_{9,487}+p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,722} = \frac{1}{2}p_{9,210} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,210}^2 - 4(p_{9,0}+p_{9,128}+2p_{9,384}+2p_{9,344}+p_{9,420} \\ &+p_{9,484}+2p_{9,148}+p_{9,76}+p_{9,258}+p_{9,290}+p_{9,162}+p_{9,490} \\ &+p_{9,442}+p_{9,250}+p_{9,46}+p_{9,478}+p_{9,318}+2p_{9,297}+2p_{9,277} \\ &+p_{9,301}+p_{9,323}+p_{9,435}+p_{9,315}+2p_{9,295}+p_{9,487}+p_{9,87}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,50} = \frac{1}{2}p_{9,50} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,50}^2 - 4(p_{9,352}+2p_{9,224}+p_{9,480}+2p_{9,184}+p_{9,260} \\ &+p_{9,324}+2p_{9,500}+p_{9,428}+p_{9,2}+p_{9,130}+p_{9,98}+p_{9,330} \\ &+p_{9,282}+p_{9,90}+p_{9,398}+p_{9,158}+p_{9,318}+2p_{9,137}+2p_{9,117} \\ &+p_{9,141}+p_{9,163}+p_{9,275}+p_{9,155}+2p_{9,135}+p_{9,327}+p_{9,439}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,562} = \frac{1}{2}p_{9,50} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,50}^2 - 4(p_{9,352}+2p_{9,224}+p_{9,480}+2p_{9,184}+p_{9,260} \\ &+p_{9,324}+2p_{9,500}+p_{9,428}+p_{9,2}+p_{9,130}+p_{9,98}+p_{9,330} \\ &+p_{9,282}+p_{9,90}+p_{9,398}+p_{9,158}+p_{9,318}+2p_{9,137}+2p_{9,117} \\ &+p_{9,141}+p_{9,163}+p_{9,275}+p_{9,155}+2p_{9,135}+p_{9,327}+p_{9,439}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,306} = \frac{1}{2}p_{9,306} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,306}^2 - 4(p_{9,96}+p_{9,224}+2p_{9,480}+2p_{9,440}+p_{9,4} \\ &+p_{9,68}+2p_{9,244}+p_{9,172}+p_{9,258}+p_{9,386}+p_{9,354}+p_{9,74} \\ &+p_{9,26}+p_{9,346}+p_{9,142}+p_{9,414}+p_{9,62}+2p_{9,393}+2p_{9,373} \\ &+p_{9,397}+p_{9,419}+p_{9,19}+p_{9,411}+2p_{9,391}+p_{9,71}+p_{9,183}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,178} = \frac{1}{2}p_{9,178} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,178}^2 - 4(p_{9,96}+2p_{9,352}+p_{9,480}+2p_{9,312}+p_{9,388} \\ &+p_{9,452}+2p_{9,116}+p_{9,44}+p_{9,258}+p_{9,130}+p_{9,226}+p_{9,458} \\ &+p_{9,410}+p_{9,218}+p_{9,14}+p_{9,286}+p_{9,446}+2p_{9,265}+2p_{9,245} \\ &+p_{9,269}+p_{9,291}+p_{9,403}+p_{9,283}+2p_{9,263}+p_{9,455}+p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,690} = \frac{1}{2}p_{9,178} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,178}^2 - 4(p_{9,96}+2p_{9,352}+p_{9,480}+2p_{9,312}+p_{9,388} \\ &+p_{9,452}+2p_{9,116}+p_{9,44}+p_{9,258}+p_{9,130}+p_{9,226}+p_{9,458} \\ &+p_{9,410}+p_{9,218}+p_{9,14}+p_{9,286}+p_{9,446}+2p_{9,265}+2p_{9,245} \\ &+p_{9,269}+p_{9,291}+p_{9,403}+p_{9,283}+2p_{9,263}+p_{9,455}+p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,434} = \frac{1}{2}p_{9,434} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,434}^2 - 4(2p_{9,96}+p_{9,352}+p_{9,224}+2p_{9,56}+p_{9,132} \\ &+p_{9,196}+2p_{9,372}+p_{9,300}+p_{9,2}+p_{9,386}+p_{9,482}+p_{9,202} \\ &+p_{9,154}+p_{9,474}+p_{9,270}+p_{9,30}+p_{9,190}+2p_{9,9}+2p_{9,501} \\ &+p_{9,13}+p_{9,35}+p_{9,147}+p_{9,27}+2p_{9,7}+p_{9,199}+p_{9,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,946} = \frac{1}{2}p_{9,434} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,434}^2 - 4(2p_{9,96}+p_{9,352}+p_{9,224}+2p_{9,56}+p_{9,132} \\ &+p_{9,196}+2p_{9,372}+p_{9,300}+p_{9,2}+p_{9,386}+p_{9,482}+p_{9,202} \\ &+p_{9,154}+p_{9,474}+p_{9,270}+p_{9,30}+p_{9,190}+2p_{9,9}+2p_{9,501} \\ &+p_{9,13}+p_{9,35}+p_{9,147}+p_{9,27}+2p_{9,7}+p_{9,199}+p_{9,311}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,626} = \frac{1}{2}p_{9,114} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,114}^2 - 4(p_{9,32}+2p_{9,288}+p_{9,416}+2p_{9,248}+p_{9,388} \\ &+p_{9,324}+2p_{9,52}+p_{9,492}+p_{9,66}+p_{9,194}+p_{9,162}+p_{9,394} \\ &+p_{9,154}+p_{9,346}+p_{9,462}+p_{9,222}+p_{9,382}+2p_{9,201}+2p_{9,181} \\ &+p_{9,205}+p_{9,227}+p_{9,339}+p_{9,219}+p_{9,391}+2p_{9,199}+p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,370} = \frac{1}{2}p_{9,370} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,370}^2 - 4(2p_{9,32}+p_{9,288}+p_{9,160}+2p_{9,504}+p_{9,132} \\ &+p_{9,68}+2p_{9,308}+p_{9,236}+p_{9,322}+p_{9,450}+p_{9,418}+p_{9,138} \\ &+p_{9,410}+p_{9,90}+p_{9,206}+p_{9,478}+p_{9,126}+2p_{9,457}+2p_{9,437} \\ &+p_{9,461}+p_{9,483}+p_{9,83}+p_{9,475}+p_{9,135}+2p_{9,455}+p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,882} = \frac{1}{2}p_{9,370} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,370}^2 - 4(2p_{9,32}+p_{9,288}+p_{9,160}+2p_{9,504}+p_{9,132} \\ &+p_{9,68}+2p_{9,308}+p_{9,236}+p_{9,322}+p_{9,450}+p_{9,418}+p_{9,138} \\ &+p_{9,410}+p_{9,90}+p_{9,206}+p_{9,478}+p_{9,126}+2p_{9,457}+2p_{9,437} \\ &+p_{9,461}+p_{9,483}+p_{9,83}+p_{9,475}+p_{9,135}+2p_{9,455}+p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,242} = \frac{1}{2}p_{9,242} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,242}^2 - 4(p_{9,32}+p_{9,160}+2p_{9,416}+2p_{9,376}+p_{9,4} \\ &+p_{9,452}+2p_{9,180}+p_{9,108}+p_{9,322}+p_{9,194}+p_{9,290}+p_{9,10} \\ &+p_{9,282}+p_{9,474}+p_{9,78}+p_{9,350}+p_{9,510}+2p_{9,329}+2p_{9,309} \\ &+p_{9,333}+p_{9,355}+p_{9,467}+p_{9,347}+p_{9,7}+2p_{9,327}+p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,754} = \frac{1}{2}p_{9,242} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,242}^2 - 4(p_{9,32}+p_{9,160}+2p_{9,416}+2p_{9,376}+p_{9,4} \\ &+p_{9,452}+2p_{9,180}+p_{9,108}+p_{9,322}+p_{9,194}+p_{9,290}+p_{9,10} \\ &+p_{9,282}+p_{9,474}+p_{9,78}+p_{9,350}+p_{9,510}+2p_{9,329}+2p_{9,309} \\ &+p_{9,333}+p_{9,355}+p_{9,467}+p_{9,347}+p_{9,7}+2p_{9,327}+p_{9,119}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,1010} = \frac{1}{2}p_{9,498} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,498}^2 - 4(p_{9,288}+2p_{9,160}+p_{9,416}+2p_{9,120}+p_{9,260} \\ &+p_{9,196}+2p_{9,436}+p_{9,364}+p_{9,66}+p_{9,450}+p_{9,34}+p_{9,266} \\ &+p_{9,26}+p_{9,218}+p_{9,334}+p_{9,94}+p_{9,254}+2p_{9,73}+2p_{9,53} \\ &+p_{9,77}+p_{9,99}+p_{9,211}+p_{9,91}+p_{9,263}+2p_{9,71}+p_{9,375}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,10} = \frac{1}{2}p_{9,10} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,10}^2 - 4(2p_{9,144}+p_{9,312}+2p_{9,184}+p_{9,440}+p_{9,388} \\ &+2p_{9,460}+p_{9,284}+p_{9,220}+p_{9,290}+p_{9,50}+p_{9,242}+p_{9,90} \\ &+p_{9,474}+p_{9,58}+p_{9,358}+p_{9,278}+p_{9,118}+2p_{9,97}+p_{9,101} \\ &+2p_{9,77}+p_{9,115}+p_{9,235}+p_{9,123}+p_{9,399}+p_{9,287}+2p_{9,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,266} = \frac{1}{2}p_{9,266} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,266}^2 - 4(2p_{9,400}+p_{9,56}+p_{9,184}+2p_{9,440}+p_{9,132} \\ &+2p_{9,204}+p_{9,28}+p_{9,476}+p_{9,34}+p_{9,306}+p_{9,498}+p_{9,346} \\ &+p_{9,218}+p_{9,314}+p_{9,102}+p_{9,22}+p_{9,374}+2p_{9,353}+p_{9,357} \\ &+2p_{9,333}+p_{9,371}+p_{9,491}+p_{9,379}+p_{9,143}+p_{9,31}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,778} = \frac{1}{2}p_{9,266} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,266}^2 - 4(2p_{9,400}+p_{9,56}+p_{9,184}+2p_{9,440}+p_{9,132} \\ &+2p_{9,204}+p_{9,28}+p_{9,476}+p_{9,34}+p_{9,306}+p_{9,498}+p_{9,346} \\ &+p_{9,218}+p_{9,314}+p_{9,102}+p_{9,22}+p_{9,374}+2p_{9,353}+p_{9,357} \\ &+2p_{9,333}+p_{9,371}+p_{9,491}+p_{9,379}+p_{9,143}+p_{9,31}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,138} = \frac{1}{2}p_{9,138} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,138}^2 - 4(2p_{9,272}+p_{9,56}+2p_{9,312}+p_{9,440}+p_{9,4} \\ &+2p_{9,76}+p_{9,412}+p_{9,348}+p_{9,418}+p_{9,178}+p_{9,370}+p_{9,90} \\ &+p_{9,218}+p_{9,186}+p_{9,486}+p_{9,406}+p_{9,246}+2p_{9,225}+p_{9,229} \\ &+2p_{9,205}+p_{9,243}+p_{9,363}+p_{9,251}+p_{9,15}+p_{9,415}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,650} = \frac{1}{2}p_{9,138} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,138}^2 - 4(2p_{9,272}+p_{9,56}+2p_{9,312}+p_{9,440}+p_{9,4} \\ &+2p_{9,76}+p_{9,412}+p_{9,348}+p_{9,418}+p_{9,178}+p_{9,370}+p_{9,90} \\ &+p_{9,218}+p_{9,186}+p_{9,486}+p_{9,406}+p_{9,246}+2p_{9,225}+p_{9,229} \\ &+2p_{9,205}+p_{9,243}+p_{9,363}+p_{9,251}+p_{9,15}+p_{9,415}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,394} = \frac{1}{2}p_{9,394} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,394}^2 - 4(2p_{9,16}+2p_{9,56}+p_{9,312}+p_{9,184}+p_{9,260} \\ &+2p_{9,332}+p_{9,156}+p_{9,92}+p_{9,162}+p_{9,434}+p_{9,114}+p_{9,346} \\ &+p_{9,474}+p_{9,442}+p_{9,230}+p_{9,150}+p_{9,502}+2p_{9,481}+p_{9,485} \\ &+2p_{9,461}+p_{9,499}+p_{9,107}+p_{9,507}+p_{9,271}+p_{9,159}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,906} = \frac{1}{2}p_{9,394} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,394}^2 - 4(2p_{9,16}+2p_{9,56}+p_{9,312}+p_{9,184}+p_{9,260} \\ &+2p_{9,332}+p_{9,156}+p_{9,92}+p_{9,162}+p_{9,434}+p_{9,114}+p_{9,346} \\ &+p_{9,474}+p_{9,442}+p_{9,230}+p_{9,150}+p_{9,502}+2p_{9,481}+p_{9,485} \\ &+2p_{9,461}+p_{9,499}+p_{9,107}+p_{9,507}+p_{9,271}+p_{9,159}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,74} = \frac{1}{2}p_{9,74} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,74}^2 - 4(2p_{9,208}+p_{9,376}+2p_{9,248}+p_{9,504}+p_{9,452} \\ &+2p_{9,12}+p_{9,284}+p_{9,348}+p_{9,354}+p_{9,306}+p_{9,114}+p_{9,26} \\ &+p_{9,154}+p_{9,122}+p_{9,422}+p_{9,342}+p_{9,182}+2p_{9,161}+p_{9,165} \\ &+2p_{9,141}+p_{9,179}+p_{9,299}+p_{9,187}+p_{9,463}+2p_{9,159}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,586} = \frac{1}{2}p_{9,74} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,74}^2 - 4(2p_{9,208}+p_{9,376}+2p_{9,248}+p_{9,504}+p_{9,452} \\ &+2p_{9,12}+p_{9,284}+p_{9,348}+p_{9,354}+p_{9,306}+p_{9,114}+p_{9,26} \\ &+p_{9,154}+p_{9,122}+p_{9,422}+p_{9,342}+p_{9,182}+2p_{9,161}+p_{9,165} \\ &+2p_{9,141}+p_{9,179}+p_{9,299}+p_{9,187}+p_{9,463}+2p_{9,159}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,330} = \frac{1}{2}p_{9,330} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,330}^2 - 4(2p_{9,464}+p_{9,120}+p_{9,248}+2p_{9,504}+p_{9,196} \\ &+2p_{9,268}+p_{9,28}+p_{9,92}+p_{9,98}+p_{9,50}+p_{9,370}+p_{9,282} \\ &+p_{9,410}+p_{9,378}+p_{9,166}+p_{9,86}+p_{9,438}+2p_{9,417}+p_{9,421} \\ &+2p_{9,397}+p_{9,435}+p_{9,43}+p_{9,443}+p_{9,207}+2p_{9,415}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,842} = \frac{1}{2}p_{9,330} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,330}^2 - 4(2p_{9,464}+p_{9,120}+p_{9,248}+2p_{9,504}+p_{9,196} \\ &+2p_{9,268}+p_{9,28}+p_{9,92}+p_{9,98}+p_{9,50}+p_{9,370}+p_{9,282} \\ &+p_{9,410}+p_{9,378}+p_{9,166}+p_{9,86}+p_{9,438}+2p_{9,417}+p_{9,421} \\ &+2p_{9,397}+p_{9,435}+p_{9,43}+p_{9,443}+p_{9,207}+2p_{9,415}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,202} = \frac{1}{2}p_{9,202} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,202}^2 - 4(2p_{9,336}+p_{9,120}+2p_{9,376}+p_{9,504}+p_{9,68} \\ &+2p_{9,140}+p_{9,412}+p_{9,476}+p_{9,482}+p_{9,434}+p_{9,242}+p_{9,282} \\ &+p_{9,154}+p_{9,250}+p_{9,38}+p_{9,470}+p_{9,310}+2p_{9,289}+p_{9,293} \\ &+2p_{9,269}+p_{9,307}+p_{9,427}+p_{9,315}+p_{9,79}+2p_{9,287}+p_{9,479}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,458} = \frac{1}{2}p_{9,458} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,458}^2 - 4(2p_{9,80}+2p_{9,120}+p_{9,376}+p_{9,248}+p_{9,324} \\ &+2p_{9,396}+p_{9,156}+p_{9,220}+p_{9,226}+p_{9,178}+p_{9,498}+p_{9,26} \\ &+p_{9,410}+p_{9,506}+p_{9,294}+p_{9,214}+p_{9,54}+2p_{9,33}+p_{9,37} \\ &+2p_{9,13}+p_{9,51}+p_{9,171}+p_{9,59}+p_{9,335}+2p_{9,31}+p_{9,223}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,42} = \frac{1}{2}p_{9,42} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,42}^2 - 4(2p_{9,176}+p_{9,344}+2p_{9,216}+p_{9,472}+p_{9,420} \\ &+2p_{9,492}+p_{9,316}+p_{9,252}+p_{9,322}+p_{9,274}+p_{9,82}+p_{9,90} \\ &+p_{9,122}+p_{9,506}+p_{9,390}+p_{9,150}+p_{9,310}+2p_{9,129}+p_{9,133} \\ &+2p_{9,109}+p_{9,147}+p_{9,267}+p_{9,155}+p_{9,431}+p_{9,319}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,554} = \frac{1}{2}p_{9,42} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,42}^2 - 4(2p_{9,176}+p_{9,344}+2p_{9,216}+p_{9,472}+p_{9,420} \\ &+2p_{9,492}+p_{9,316}+p_{9,252}+p_{9,322}+p_{9,274}+p_{9,82}+p_{9,90} \\ &+p_{9,122}+p_{9,506}+p_{9,390}+p_{9,150}+p_{9,310}+2p_{9,129}+p_{9,133} \\ &+2p_{9,109}+p_{9,147}+p_{9,267}+p_{9,155}+p_{9,431}+p_{9,319}+2p_{9,127}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,810} = \frac{1}{2}p_{9,298} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,298}^2 - 4(2p_{9,432}+p_{9,88}+p_{9,216}+2p_{9,472}+p_{9,164} \\ &+2p_{9,236}+p_{9,60}+p_{9,508}+p_{9,66}+p_{9,18}+p_{9,338}+p_{9,346} \\ &+p_{9,378}+p_{9,250}+p_{9,134}+p_{9,406}+p_{9,54}+2p_{9,385}+p_{9,389} \\ &+2p_{9,365}+p_{9,403}+p_{9,11}+p_{9,411}+p_{9,175}+p_{9,63}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,170} = \frac{1}{2}p_{9,170} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,170}^2 - 4(2p_{9,304}+p_{9,88}+2p_{9,344}+p_{9,472}+p_{9,36} \\ &+2p_{9,108}+p_{9,444}+p_{9,380}+p_{9,450}+p_{9,402}+p_{9,210}+p_{9,218} \\ &+p_{9,122}+p_{9,250}+p_{9,6}+p_{9,278}+p_{9,438}+2p_{9,257}+p_{9,261} \\ &+2p_{9,237}+p_{9,275}+p_{9,395}+p_{9,283}+p_{9,47}+p_{9,447}+2p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,426} = \frac{1}{2}p_{9,426} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,426}^2 - 4(2p_{9,48}+2p_{9,88}+p_{9,344}+p_{9,216}+p_{9,292} \\ &+2p_{9,364}+p_{9,188}+p_{9,124}+p_{9,194}+p_{9,146}+p_{9,466}+p_{9,474} \\ &+p_{9,378}+p_{9,506}+p_{9,262}+p_{9,22}+p_{9,182}+2p_{9,1}+p_{9,5} \\ &+2p_{9,493}+p_{9,19}+p_{9,139}+p_{9,27}+p_{9,303}+p_{9,191}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,938} = \frac{1}{2}p_{9,426} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,426}^2 - 4(2p_{9,48}+2p_{9,88}+p_{9,344}+p_{9,216}+p_{9,292} \\ &+2p_{9,364}+p_{9,188}+p_{9,124}+p_{9,194}+p_{9,146}+p_{9,466}+p_{9,474} \\ &+p_{9,378}+p_{9,506}+p_{9,262}+p_{9,22}+p_{9,182}+2p_{9,1}+p_{9,5} \\ &+2p_{9,493}+p_{9,19}+p_{9,139}+p_{9,27}+p_{9,303}+p_{9,191}+2p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,362} = \frac{1}{2}p_{9,362} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,362}^2 - 4(2p_{9,496}+2p_{9,24}+p_{9,280}+p_{9,152}+p_{9,228} \\ &+2p_{9,300}+p_{9,60}+p_{9,124}+p_{9,130}+p_{9,402}+p_{9,82}+p_{9,410} \\ &+p_{9,314}+p_{9,442}+p_{9,198}+p_{9,470}+p_{9,118}+2p_{9,449}+p_{9,453} \\ &+2p_{9,429}+p_{9,467}+p_{9,75}+p_{9,475}+p_{9,239}+2p_{9,447}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,874} = \frac{1}{2}p_{9,362} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,362}^2 - 4(2p_{9,496}+2p_{9,24}+p_{9,280}+p_{9,152}+p_{9,228} \\ &+2p_{9,300}+p_{9,60}+p_{9,124}+p_{9,130}+p_{9,402}+p_{9,82}+p_{9,410} \\ &+p_{9,314}+p_{9,442}+p_{9,198}+p_{9,470}+p_{9,118}+2p_{9,449}+p_{9,453} \\ &+2p_{9,429}+p_{9,467}+p_{9,75}+p_{9,475}+p_{9,239}+2p_{9,447}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,234} = \frac{1}{2}p_{9,234} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,234}^2 - 4(2p_{9,368}+p_{9,24}+p_{9,152}+2p_{9,408}+p_{9,100} \\ &+2p_{9,172}+p_{9,444}+p_{9,508}+p_{9,2}+p_{9,274}+p_{9,466}+p_{9,282} \\ &+p_{9,314}+p_{9,186}+p_{9,70}+p_{9,342}+p_{9,502}+2p_{9,321}+p_{9,325} \\ &+2p_{9,301}+p_{9,339}+p_{9,459}+p_{9,347}+p_{9,111}+2p_{9,319}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,746} = \frac{1}{2}p_{9,234} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,234}^2 - 4(2p_{9,368}+p_{9,24}+p_{9,152}+2p_{9,408}+p_{9,100} \\ &+2p_{9,172}+p_{9,444}+p_{9,508}+p_{9,2}+p_{9,274}+p_{9,466}+p_{9,282} \\ &+p_{9,314}+p_{9,186}+p_{9,70}+p_{9,342}+p_{9,502}+2p_{9,321}+p_{9,325} \\ &+2p_{9,301}+p_{9,339}+p_{9,459}+p_{9,347}+p_{9,111}+2p_{9,319}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,490} = \frac{1}{2}p_{9,490} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,490}^2 - 4(2p_{9,112}+p_{9,280}+2p_{9,152}+p_{9,408}+p_{9,356} \\ &+2p_{9,428}+p_{9,188}+p_{9,252}+p_{9,258}+p_{9,18}+p_{9,210}+p_{9,26} \\ &+p_{9,58}+p_{9,442}+p_{9,326}+p_{9,86}+p_{9,246}+2p_{9,65}+p_{9,69} \\ &+2p_{9,45}+p_{9,83}+p_{9,203}+p_{9,91}+p_{9,367}+2p_{9,63}+p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,26} = \frac{1}{2}p_{9,26} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,26}^2 - 4(2p_{9,160}+p_{9,328}+2p_{9,200}+p_{9,456}+p_{9,404} \\ &+p_{9,300}+p_{9,236}+2p_{9,476}+p_{9,258}+p_{9,66}+p_{9,306}+p_{9,74} \\ &+p_{9,106}+p_{9,490}+p_{9,134}+p_{9,294}+p_{9,374}+2p_{9,113}+p_{9,117} \\ &+2p_{9,93}+p_{9,131}+p_{9,139}+p_{9,251}+p_{9,303}+2p_{9,111}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,538} = \frac{1}{2}p_{9,26} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,26}^2 - 4(2p_{9,160}+p_{9,328}+2p_{9,200}+p_{9,456}+p_{9,404} \\ &+p_{9,300}+p_{9,236}+2p_{9,476}+p_{9,258}+p_{9,66}+p_{9,306}+p_{9,74} \\ &+p_{9,106}+p_{9,490}+p_{9,134}+p_{9,294}+p_{9,374}+2p_{9,113}+p_{9,117} \\ &+2p_{9,93}+p_{9,131}+p_{9,139}+p_{9,251}+p_{9,303}+2p_{9,111}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,282} = \frac{1}{2}p_{9,282} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,282}^2 - 4(2p_{9,416}+p_{9,72}+p_{9,200}+2p_{9,456}+p_{9,148} \\ &+p_{9,44}+p_{9,492}+2p_{9,220}+p_{9,2}+p_{9,322}+p_{9,50}+p_{9,330} \\ &+p_{9,362}+p_{9,234}+p_{9,390}+p_{9,38}+p_{9,118}+2p_{9,369}+p_{9,373} \\ &+2p_{9,349}+p_{9,387}+p_{9,395}+p_{9,507}+p_{9,47}+2p_{9,367}+p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,794} = \frac{1}{2}p_{9,282} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,282}^2 - 4(2p_{9,416}+p_{9,72}+p_{9,200}+2p_{9,456}+p_{9,148} \\ &+p_{9,44}+p_{9,492}+2p_{9,220}+p_{9,2}+p_{9,322}+p_{9,50}+p_{9,330} \\ &+p_{9,362}+p_{9,234}+p_{9,390}+p_{9,38}+p_{9,118}+2p_{9,369}+p_{9,373} \\ &+2p_{9,349}+p_{9,387}+p_{9,395}+p_{9,507}+p_{9,47}+2p_{9,367}+p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,154} = \frac{1}{2}p_{9,154} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,154}^2 - 4(2p_{9,288}+p_{9,72}+2p_{9,328}+p_{9,456}+p_{9,20} \\ &+p_{9,428}+p_{9,364}+2p_{9,92}+p_{9,386}+p_{9,194}+p_{9,434}+p_{9,202} \\ &+p_{9,106}+p_{9,234}+p_{9,262}+p_{9,422}+p_{9,502}+2p_{9,241}+p_{9,245} \\ &+2p_{9,221}+p_{9,259}+p_{9,267}+p_{9,379}+p_{9,431}+2p_{9,239}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,666} = \frac{1}{2}p_{9,154} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,154}^2 - 4(2p_{9,288}+p_{9,72}+2p_{9,328}+p_{9,456}+p_{9,20} \\ &+p_{9,428}+p_{9,364}+2p_{9,92}+p_{9,386}+p_{9,194}+p_{9,434}+p_{9,202} \\ &+p_{9,106}+p_{9,234}+p_{9,262}+p_{9,422}+p_{9,502}+2p_{9,241}+p_{9,245} \\ &+2p_{9,221}+p_{9,259}+p_{9,267}+p_{9,379}+p_{9,431}+2p_{9,239}+p_{9,31}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,90} = \frac{1}{2}p_{9,90} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,90}^2 - 4(2p_{9,224}+p_{9,8}+2p_{9,264}+p_{9,392}+p_{9,468} \\ &+p_{9,300}+p_{9,364}+2p_{9,28}+p_{9,130}+p_{9,322}+p_{9,370}+p_{9,138} \\ &+p_{9,42}+p_{9,170}+p_{9,198}+p_{9,358}+p_{9,438}+2p_{9,177}+p_{9,181} \\ &+2p_{9,157}+p_{9,195}+p_{9,203}+p_{9,315}+2p_{9,175}+p_{9,367}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,602} = \frac{1}{2}p_{9,90} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,90}^2 - 4(2p_{9,224}+p_{9,8}+2p_{9,264}+p_{9,392}+p_{9,468} \\ &+p_{9,300}+p_{9,364}+2p_{9,28}+p_{9,130}+p_{9,322}+p_{9,370}+p_{9,138} \\ &+p_{9,42}+p_{9,170}+p_{9,198}+p_{9,358}+p_{9,438}+2p_{9,177}+p_{9,181} \\ &+2p_{9,157}+p_{9,195}+p_{9,203}+p_{9,315}+2p_{9,175}+p_{9,367}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,346} = \frac{1}{2}p_{9,346} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,346}^2 - 4(2p_{9,480}+2p_{9,8}+p_{9,264}+p_{9,136}+p_{9,212} \\ &+p_{9,44}+p_{9,108}+2p_{9,284}+p_{9,386}+p_{9,66}+p_{9,114}+p_{9,394} \\ &+p_{9,298}+p_{9,426}+p_{9,454}+p_{9,102}+p_{9,182}+2p_{9,433}+p_{9,437} \\ &+2p_{9,413}+p_{9,451}+p_{9,459}+p_{9,59}+2p_{9,431}+p_{9,111}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,858} = \frac{1}{2}p_{9,346} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,346}^2 - 4(2p_{9,480}+2p_{9,8}+p_{9,264}+p_{9,136}+p_{9,212} \\ &+p_{9,44}+p_{9,108}+2p_{9,284}+p_{9,386}+p_{9,66}+p_{9,114}+p_{9,394} \\ &+p_{9,298}+p_{9,426}+p_{9,454}+p_{9,102}+p_{9,182}+2p_{9,433}+p_{9,437} \\ &+2p_{9,413}+p_{9,451}+p_{9,459}+p_{9,59}+2p_{9,431}+p_{9,111}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,218} = \frac{1}{2}p_{9,218} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,218}^2 - 4(2p_{9,352}+p_{9,8}+p_{9,136}+2p_{9,392}+p_{9,84} \\ &+p_{9,428}+p_{9,492}+2p_{9,156}+p_{9,258}+p_{9,450}+p_{9,498}+p_{9,266} \\ &+p_{9,298}+p_{9,170}+p_{9,326}+p_{9,486}+p_{9,54}+2p_{9,305}+p_{9,309} \\ &+2p_{9,285}+p_{9,323}+p_{9,331}+p_{9,443}+2p_{9,303}+p_{9,495}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,730} = \frac{1}{2}p_{9,218} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,218}^2 - 4(2p_{9,352}+p_{9,8}+p_{9,136}+2p_{9,392}+p_{9,84} \\ &+p_{9,428}+p_{9,492}+2p_{9,156}+p_{9,258}+p_{9,450}+p_{9,498}+p_{9,266} \\ &+p_{9,298}+p_{9,170}+p_{9,326}+p_{9,486}+p_{9,54}+2p_{9,305}+p_{9,309} \\ &+2p_{9,285}+p_{9,323}+p_{9,331}+p_{9,443}+2p_{9,303}+p_{9,495}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,474} = \frac{1}{2}p_{9,474} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,474}^2 - 4(2p_{9,96}+p_{9,264}+2p_{9,136}+p_{9,392}+p_{9,340} \\ &+p_{9,172}+p_{9,236}+2p_{9,412}+p_{9,2}+p_{9,194}+p_{9,242}+p_{9,10} \\ &+p_{9,42}+p_{9,426}+p_{9,70}+p_{9,230}+p_{9,310}+2p_{9,49}+p_{9,53} \\ &+2p_{9,29}+p_{9,67}+p_{9,75}+p_{9,187}+2p_{9,47}+p_{9,239}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,986} = \frac{1}{2}p_{9,474} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,474}^2 - 4(2p_{9,96}+p_{9,264}+2p_{9,136}+p_{9,392}+p_{9,340} \\ &+p_{9,172}+p_{9,236}+2p_{9,412}+p_{9,2}+p_{9,194}+p_{9,242}+p_{9,10} \\ &+p_{9,42}+p_{9,426}+p_{9,70}+p_{9,230}+p_{9,310}+2p_{9,49}+p_{9,53} \\ &+2p_{9,29}+p_{9,67}+p_{9,75}+p_{9,187}+2p_{9,47}+p_{9,239}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,58} = \frac{1}{2}p_{9,58} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,58}^2 - 4(2p_{9,192}+p_{9,360}+2p_{9,232}+p_{9,488}+p_{9,436} \\ &+p_{9,268}+p_{9,332}+2p_{9,508}+p_{9,290}+p_{9,98}+p_{9,338}+p_{9,10} \\ &+p_{9,138}+p_{9,106}+p_{9,326}+p_{9,166}+p_{9,406}+2p_{9,145}+p_{9,149} \\ &+2p_{9,125}+p_{9,163}+p_{9,171}+p_{9,283}+2p_{9,143}+p_{9,335}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,570} = \frac{1}{2}p_{9,58} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,58}^2 - 4(2p_{9,192}+p_{9,360}+2p_{9,232}+p_{9,488}+p_{9,436} \\ &+p_{9,268}+p_{9,332}+2p_{9,508}+p_{9,290}+p_{9,98}+p_{9,338}+p_{9,10} \\ &+p_{9,138}+p_{9,106}+p_{9,326}+p_{9,166}+p_{9,406}+2p_{9,145}+p_{9,149} \\ &+2p_{9,125}+p_{9,163}+p_{9,171}+p_{9,283}+2p_{9,143}+p_{9,335}+p_{9,447}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,826} = \frac{1}{2}p_{9,314} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,314}^2 - 4(2p_{9,448}+p_{9,104}+p_{9,232}+2p_{9,488}+p_{9,180} \\ &+p_{9,12}+p_{9,76}+2p_{9,252}+p_{9,34}+p_{9,354}+p_{9,82}+p_{9,266} \\ &+p_{9,394}+p_{9,362}+p_{9,70}+p_{9,422}+p_{9,150}+2p_{9,401}+p_{9,405} \\ &+2p_{9,381}+p_{9,419}+p_{9,427}+p_{9,27}+2p_{9,399}+p_{9,79}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,186} = \frac{1}{2}p_{9,186} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,186}^2 - 4(2p_{9,320}+p_{9,104}+2p_{9,360}+p_{9,488}+p_{9,52} \\ &+p_{9,396}+p_{9,460}+2p_{9,124}+p_{9,418}+p_{9,226}+p_{9,466}+p_{9,266} \\ &+p_{9,138}+p_{9,234}+p_{9,454}+p_{9,294}+p_{9,22}+2p_{9,273}+p_{9,277} \\ &+2p_{9,253}+p_{9,291}+p_{9,299}+p_{9,411}+2p_{9,271}+p_{9,463}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,698} = \frac{1}{2}p_{9,186} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,186}^2 - 4(2p_{9,320}+p_{9,104}+2p_{9,360}+p_{9,488}+p_{9,52} \\ &+p_{9,396}+p_{9,460}+2p_{9,124}+p_{9,418}+p_{9,226}+p_{9,466}+p_{9,266} \\ &+p_{9,138}+p_{9,234}+p_{9,454}+p_{9,294}+p_{9,22}+2p_{9,273}+p_{9,277} \\ &+2p_{9,253}+p_{9,291}+p_{9,299}+p_{9,411}+2p_{9,271}+p_{9,463}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,442} = \frac{1}{2}p_{9,442} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,442}^2 - 4(2p_{9,64}+2p_{9,104}+p_{9,360}+p_{9,232}+p_{9,308} \\ &+p_{9,140}+p_{9,204}+2p_{9,380}+p_{9,162}+p_{9,482}+p_{9,210}+p_{9,10} \\ &+p_{9,394}+p_{9,490}+p_{9,198}+p_{9,38}+p_{9,278}+2p_{9,17}+p_{9,21} \\ &+2p_{9,509}+p_{9,35}+p_{9,43}+p_{9,155}+2p_{9,15}+p_{9,207}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,954} = \frac{1}{2}p_{9,442} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,442}^2 - 4(2p_{9,64}+2p_{9,104}+p_{9,360}+p_{9,232}+p_{9,308} \\ &+p_{9,140}+p_{9,204}+2p_{9,380}+p_{9,162}+p_{9,482}+p_{9,210}+p_{9,10} \\ &+p_{9,394}+p_{9,490}+p_{9,198}+p_{9,38}+p_{9,278}+2p_{9,17}+p_{9,21} \\ &+2p_{9,509}+p_{9,35}+p_{9,43}+p_{9,155}+2p_{9,15}+p_{9,207}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,122} = \frac{1}{2}p_{9,122} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,122}^2 - 4(2p_{9,256}+p_{9,40}+2p_{9,296}+p_{9,424}+p_{9,500} \\ &+p_{9,396}+p_{9,332}+2p_{9,60}+p_{9,162}+p_{9,354}+p_{9,402}+p_{9,74} \\ &+p_{9,202}+p_{9,170}+p_{9,390}+p_{9,230}+p_{9,470}+2p_{9,209}+p_{9,213} \\ &+2p_{9,189}+p_{9,227}+p_{9,235}+p_{9,347}+p_{9,399}+2p_{9,207}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,634} = \frac{1}{2}p_{9,122} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,122}^2 - 4(2p_{9,256}+p_{9,40}+2p_{9,296}+p_{9,424}+p_{9,500} \\ &+p_{9,396}+p_{9,332}+2p_{9,60}+p_{9,162}+p_{9,354}+p_{9,402}+p_{9,74} \\ &+p_{9,202}+p_{9,170}+p_{9,390}+p_{9,230}+p_{9,470}+2p_{9,209}+p_{9,213} \\ &+2p_{9,189}+p_{9,227}+p_{9,235}+p_{9,347}+p_{9,399}+2p_{9,207}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,378} = \frac{1}{2}p_{9,378} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,378}^2 - 4(2p_{9,0}+2p_{9,40}+p_{9,296}+p_{9,168}+p_{9,244} \\ &+p_{9,140}+p_{9,76}+2p_{9,316}+p_{9,418}+p_{9,98}+p_{9,146}+p_{9,330} \\ &+p_{9,458}+p_{9,426}+p_{9,134}+p_{9,486}+p_{9,214}+2p_{9,465}+p_{9,469} \\ &+2p_{9,445}+p_{9,483}+p_{9,491}+p_{9,91}+p_{9,143}+2p_{9,463}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,890} = \frac{1}{2}p_{9,378} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,378}^2 - 4(2p_{9,0}+2p_{9,40}+p_{9,296}+p_{9,168}+p_{9,244} \\ &+p_{9,140}+p_{9,76}+2p_{9,316}+p_{9,418}+p_{9,98}+p_{9,146}+p_{9,330} \\ &+p_{9,458}+p_{9,426}+p_{9,134}+p_{9,486}+p_{9,214}+2p_{9,465}+p_{9,469} \\ &+2p_{9,445}+p_{9,483}+p_{9,491}+p_{9,91}+p_{9,143}+2p_{9,463}+p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,762} = \frac{1}{2}p_{9,250} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,250}^2 - 4(2p_{9,384}+p_{9,40}+p_{9,168}+2p_{9,424}+p_{9,116} \\ &+p_{9,12}+p_{9,460}+2p_{9,188}+p_{9,290}+p_{9,482}+p_{9,18}+p_{9,330} \\ &+p_{9,202}+p_{9,298}+p_{9,6}+p_{9,358}+p_{9,86}+2p_{9,337}+p_{9,341} \\ &+2p_{9,317}+p_{9,355}+p_{9,363}+p_{9,475}+p_{9,15}+2p_{9,335}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,506} = \frac{1}{2}p_{9,506} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,506}^2 - 4(2p_{9,128}+p_{9,296}+2p_{9,168}+p_{9,424}+p_{9,372} \\ &+p_{9,268}+p_{9,204}+2p_{9,444}+p_{9,34}+p_{9,226}+p_{9,274}+p_{9,74} \\ &+p_{9,458}+p_{9,42}+p_{9,262}+p_{9,102}+p_{9,342}+2p_{9,81}+p_{9,85} \\ &+2p_{9,61}+p_{9,99}+p_{9,107}+p_{9,219}+p_{9,271}+2p_{9,79}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1018} = \frac{1}{2}p_{9,506} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,506}^2 - 4(2p_{9,128}+p_{9,296}+2p_{9,168}+p_{9,424}+p_{9,372} \\ &+p_{9,268}+p_{9,204}+2p_{9,444}+p_{9,34}+p_{9,226}+p_{9,274}+p_{9,74} \\ &+p_{9,458}+p_{9,42}+p_{9,262}+p_{9,102}+p_{9,342}+2p_{9,81}+p_{9,85} \\ &+2p_{9,61}+p_{9,99}+p_{9,107}+p_{9,219}+p_{9,271}+2p_{9,79}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,6} = \frac{1}{2}p_{9,6} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,6}^2 - 4(p_{9,384}+2p_{9,456}+p_{9,280}+p_{9,216}+p_{9,308} \\ &+2p_{9,180}+p_{9,436}+2p_{9,140}+p_{9,354}+p_{9,274}+p_{9,114}+p_{9,86} \\ &+p_{9,470}+p_{9,54}+p_{9,46}+p_{9,238}+p_{9,286}+p_{9,97}+2p_{9,73} \\ &+2p_{9,93}+p_{9,395}+p_{9,283}+2p_{9,91}+p_{9,231}+p_{9,119}+p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,518} = \frac{1}{2}p_{9,6} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,6}^2 - 4(p_{9,384}+2p_{9,456}+p_{9,280}+p_{9,216}+p_{9,308} \\ &+2p_{9,180}+p_{9,436}+2p_{9,140}+p_{9,354}+p_{9,274}+p_{9,114}+p_{9,86} \\ &+p_{9,470}+p_{9,54}+p_{9,46}+p_{9,238}+p_{9,286}+p_{9,97}+2p_{9,73} \\ &+2p_{9,93}+p_{9,395}+p_{9,283}+2p_{9,91}+p_{9,231}+p_{9,119}+p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,262} = \frac{1}{2}p_{9,262} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,262}^2 - 4(p_{9,128}+2p_{9,200}+p_{9,24}+p_{9,472}+p_{9,52} \\ &+p_{9,180}+2p_{9,436}+2p_{9,396}+p_{9,98}+p_{9,18}+p_{9,370}+p_{9,342} \\ &+p_{9,214}+p_{9,310}+p_{9,302}+p_{9,494}+p_{9,30}+p_{9,353}+2p_{9,329} \\ &+2p_{9,349}+p_{9,139}+p_{9,27}+2p_{9,347}+p_{9,487}+p_{9,375}+p_{9,367}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,134} = \frac{1}{2}p_{9,134} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,134}^2 - 4(p_{9,0}+2p_{9,72}+p_{9,408}+p_{9,344}+p_{9,52}+2p_{9,308} \\ &+p_{9,436}+2p_{9,268}+p_{9,482}+p_{9,402}+p_{9,242}+p_{9,86}+p_{9,214} \\ &+p_{9,182}+p_{9,174}+p_{9,366}+p_{9,414}+p_{9,225}+2p_{9,201}+2p_{9,221} \\ &+p_{9,11}+p_{9,411}+2p_{9,219}+p_{9,359}+p_{9,247}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,646} = \frac{1}{2}p_{9,134} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,134}^2 - 4(p_{9,0}+2p_{9,72}+p_{9,408}+p_{9,344}+p_{9,52}+2p_{9,308} \\ &+p_{9,436}+2p_{9,268}+p_{9,482}+p_{9,402}+p_{9,242}+p_{9,86}+p_{9,214} \\ &+p_{9,182}+p_{9,174}+p_{9,366}+p_{9,414}+p_{9,225}+2p_{9,201}+2p_{9,221} \\ &+p_{9,11}+p_{9,411}+2p_{9,219}+p_{9,359}+p_{9,247}+p_{9,239}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,902} = \frac{1}{2}p_{9,390} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,390}^2 - 4(p_{9,256}+2p_{9,328}+p_{9,152}+p_{9,88}+2p_{9,52} \\ &+p_{9,308}+p_{9,180}+2p_{9,12}+p_{9,226}+p_{9,146}+p_{9,498}+p_{9,342} \\ &+p_{9,470}+p_{9,438}+p_{9,430}+p_{9,110}+p_{9,158}+p_{9,481}+2p_{9,457} \\ &+2p_{9,477}+p_{9,267}+p_{9,155}+2p_{9,475}+p_{9,103}+p_{9,503}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,70} = \frac{1}{2}p_{9,70} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,70}^2 - 4(p_{9,448}+2p_{9,8}+p_{9,280}+p_{9,344}+p_{9,372} \\ &+2p_{9,244}+p_{9,500}+2p_{9,204}+p_{9,418}+p_{9,338}+p_{9,178}+p_{9,22} \\ &+p_{9,150}+p_{9,118}+p_{9,302}+p_{9,110}+p_{9,350}+p_{9,161}+2p_{9,137} \\ &+2p_{9,157}+p_{9,459}+2p_{9,155}+p_{9,347}+p_{9,295}+p_{9,183}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,582} = \frac{1}{2}p_{9,70} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,70}^2 - 4(p_{9,448}+2p_{9,8}+p_{9,280}+p_{9,344}+p_{9,372} \\ &+2p_{9,244}+p_{9,500}+2p_{9,204}+p_{9,418}+p_{9,338}+p_{9,178}+p_{9,22} \\ &+p_{9,150}+p_{9,118}+p_{9,302}+p_{9,110}+p_{9,350}+p_{9,161}+2p_{9,137} \\ &+2p_{9,157}+p_{9,459}+2p_{9,155}+p_{9,347}+p_{9,295}+p_{9,183}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,326} = \frac{1}{2}p_{9,326} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,326}^2 - 4(p_{9,192}+2p_{9,264}+p_{9,24}+p_{9,88}+p_{9,116} \\ &+p_{9,244}+2p_{9,500}+2p_{9,460}+p_{9,162}+p_{9,82}+p_{9,434}+p_{9,278} \\ &+p_{9,406}+p_{9,374}+p_{9,46}+p_{9,366}+p_{9,94}+p_{9,417}+2p_{9,393} \\ &+2p_{9,413}+p_{9,203}+2p_{9,411}+p_{9,91}+p_{9,39}+p_{9,439}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,838} = \frac{1}{2}p_{9,326} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,326}^2 - 4(p_{9,192}+2p_{9,264}+p_{9,24}+p_{9,88}+p_{9,116} \\ &+p_{9,244}+2p_{9,500}+2p_{9,460}+p_{9,162}+p_{9,82}+p_{9,434}+p_{9,278} \\ &+p_{9,406}+p_{9,374}+p_{9,46}+p_{9,366}+p_{9,94}+p_{9,417}+2p_{9,393} \\ &+2p_{9,413}+p_{9,203}+2p_{9,411}+p_{9,91}+p_{9,39}+p_{9,439}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,198} = \frac{1}{2}p_{9,198} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,198}^2 - 4(p_{9,64}+2p_{9,136}+p_{9,408}+p_{9,472}+p_{9,116} \\ &+2p_{9,372}+p_{9,500}+2p_{9,332}+p_{9,34}+p_{9,466}+p_{9,306}+p_{9,278} \\ &+p_{9,150}+p_{9,246}+p_{9,430}+p_{9,238}+p_{9,478}+p_{9,289}+2p_{9,265} \\ &+2p_{9,285}+p_{9,75}+2p_{9,283}+p_{9,475}+p_{9,423}+p_{9,311}+p_{9,303}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,454} = \frac{1}{2}p_{9,454} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,454}^2 - 4(p_{9,320}+2p_{9,392}+p_{9,152}+p_{9,216}+2p_{9,116} \\ &+p_{9,372}+p_{9,244}+2p_{9,76}+p_{9,290}+p_{9,210}+p_{9,50}+p_{9,22} \\ &+p_{9,406}+p_{9,502}+p_{9,174}+p_{9,494}+p_{9,222}+p_{9,33}+2p_{9,9} \\ &+2p_{9,29}+p_{9,331}+2p_{9,27}+p_{9,219}+p_{9,167}+p_{9,55}+p_{9,47}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,550} = \frac{1}{2}p_{9,38} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,38}^2 - 4(p_{9,416}+2p_{9,488}+p_{9,312}+p_{9,248}+p_{9,340} \\ &+2p_{9,212}+p_{9,468}+2p_{9,172}+p_{9,386}+p_{9,146}+p_{9,306}+p_{9,86} \\ &+p_{9,118}+p_{9,502}+p_{9,270}+p_{9,78}+p_{9,318}+p_{9,129}+2p_{9,105} \\ &+2p_{9,125}+p_{9,427}+p_{9,315}+2p_{9,123}+p_{9,263}+p_{9,151}+p_{9,143}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,806} = \frac{1}{2}p_{9,294} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,294}^2 - 4(p_{9,160}+2p_{9,232}+p_{9,56}+p_{9,504}+p_{9,84} \\ &+p_{9,212}+2p_{9,468}+2p_{9,428}+p_{9,130}+p_{9,402}+p_{9,50}+p_{9,342} \\ &+p_{9,374}+p_{9,246}+p_{9,14}+p_{9,334}+p_{9,62}+p_{9,385}+2p_{9,361} \\ &+2p_{9,381}+p_{9,171}+p_{9,59}+2p_{9,379}+p_{9,7}+p_{9,407}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,166} = \frac{1}{2}p_{9,166} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,166}^2 - 4(p_{9,32}+2p_{9,104}+p_{9,440}+p_{9,376}+p_{9,84} \\ &+2p_{9,340}+p_{9,468}+2p_{9,300}+p_{9,2}+p_{9,274}+p_{9,434}+p_{9,214} \\ &+p_{9,118}+p_{9,246}+p_{9,398}+p_{9,206}+p_{9,446}+p_{9,257}+2p_{9,233} \\ &+2p_{9,253}+p_{9,43}+p_{9,443}+2p_{9,251}+p_{9,391}+p_{9,279}+p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,678} = \frac{1}{2}p_{9,166} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,166}^2 - 4(p_{9,32}+2p_{9,104}+p_{9,440}+p_{9,376}+p_{9,84} \\ &+2p_{9,340}+p_{9,468}+2p_{9,300}+p_{9,2}+p_{9,274}+p_{9,434}+p_{9,214} \\ &+p_{9,118}+p_{9,246}+p_{9,398}+p_{9,206}+p_{9,446}+p_{9,257}+2p_{9,233} \\ &+2p_{9,253}+p_{9,43}+p_{9,443}+2p_{9,251}+p_{9,391}+p_{9,279}+p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,422} = \frac{1}{2}p_{9,422} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,422}^2 - 4(p_{9,288}+2p_{9,360}+p_{9,184}+p_{9,120}+2p_{9,84} \\ &+p_{9,340}+p_{9,212}+2p_{9,44}+p_{9,258}+p_{9,18}+p_{9,178}+p_{9,470} \\ &+p_{9,374}+p_{9,502}+p_{9,142}+p_{9,462}+p_{9,190}+p_{9,1}+2p_{9,489} \\ &+2p_{9,509}+p_{9,299}+p_{9,187}+2p_{9,507}+p_{9,135}+p_{9,23}+p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,934} = \frac{1}{2}p_{9,422} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,422}^2 - 4(p_{9,288}+2p_{9,360}+p_{9,184}+p_{9,120}+2p_{9,84} \\ &+p_{9,340}+p_{9,212}+2p_{9,44}+p_{9,258}+p_{9,18}+p_{9,178}+p_{9,470} \\ &+p_{9,374}+p_{9,502}+p_{9,142}+p_{9,462}+p_{9,190}+p_{9,1}+2p_{9,489} \\ &+2p_{9,509}+p_{9,299}+p_{9,187}+2p_{9,507}+p_{9,135}+p_{9,23}+p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,102} = \frac{1}{2}p_{9,102} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,102}^2 - 4(p_{9,480}+2p_{9,40}+p_{9,312}+p_{9,376}+p_{9,20} \\ &+2p_{9,276}+p_{9,404}+2p_{9,236}+p_{9,450}+p_{9,210}+p_{9,370}+p_{9,150} \\ &+p_{9,54}+p_{9,182}+p_{9,142}+p_{9,334}+p_{9,382}+p_{9,193}+2p_{9,169} \\ &+2p_{9,189}+p_{9,491}+2p_{9,187}+p_{9,379}+p_{9,327}+p_{9,215}+p_{9,207}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,358} = \frac{1}{2}p_{9,358} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,358}^2 - 4(p_{9,224}+2p_{9,296}+p_{9,56}+p_{9,120}+2p_{9,20} \\ &+p_{9,276}+p_{9,148}+2p_{9,492}+p_{9,194}+p_{9,466}+p_{9,114}+p_{9,406} \\ &+p_{9,310}+p_{9,438}+p_{9,398}+p_{9,78}+p_{9,126}+p_{9,449}+2p_{9,425} \\ &+2p_{9,445}+p_{9,235}+2p_{9,443}+p_{9,123}+p_{9,71}+p_{9,471}+p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,870} = \frac{1}{2}p_{9,358} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,358}^2 - 4(p_{9,224}+2p_{9,296}+p_{9,56}+p_{9,120}+2p_{9,20} \\ &+p_{9,276}+p_{9,148}+2p_{9,492}+p_{9,194}+p_{9,466}+p_{9,114}+p_{9,406} \\ &+p_{9,310}+p_{9,438}+p_{9,398}+p_{9,78}+p_{9,126}+p_{9,449}+2p_{9,425} \\ &+2p_{9,445}+p_{9,235}+2p_{9,443}+p_{9,123}+p_{9,71}+p_{9,471}+p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,230} = \frac{1}{2}p_{9,230} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,230}^2 - 4(p_{9,96}+2p_{9,168}+p_{9,440}+p_{9,504}+p_{9,20} \\ &+p_{9,148}+2p_{9,404}+2p_{9,364}+p_{9,66}+p_{9,338}+p_{9,498}+p_{9,278} \\ &+p_{9,310}+p_{9,182}+p_{9,270}+p_{9,462}+p_{9,510}+p_{9,321}+2p_{9,297} \\ &+2p_{9,317}+p_{9,107}+2p_{9,315}+p_{9,507}+p_{9,455}+p_{9,343}+p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,742} = \frac{1}{2}p_{9,230} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,230}^2 - 4(p_{9,96}+2p_{9,168}+p_{9,440}+p_{9,504}+p_{9,20} \\ &+p_{9,148}+2p_{9,404}+2p_{9,364}+p_{9,66}+p_{9,338}+p_{9,498}+p_{9,278} \\ &+p_{9,310}+p_{9,182}+p_{9,270}+p_{9,462}+p_{9,510}+p_{9,321}+2p_{9,297} \\ &+2p_{9,317}+p_{9,107}+2p_{9,315}+p_{9,507}+p_{9,455}+p_{9,343}+p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,486} = \frac{1}{2}p_{9,486} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,486}^2 - 4(p_{9,352}+2p_{9,424}+p_{9,184}+p_{9,248}+p_{9,276} \\ &+2p_{9,148}+p_{9,404}+2p_{9,108}+p_{9,322}+p_{9,82}+p_{9,242}+p_{9,22} \\ &+p_{9,54}+p_{9,438}+p_{9,14}+p_{9,206}+p_{9,254}+p_{9,65}+2p_{9,41} \\ &+2p_{9,61}+p_{9,363}+2p_{9,59}+p_{9,251}+p_{9,199}+p_{9,87}+p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,998} = \frac{1}{2}p_{9,486} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,486}^2 - 4(p_{9,352}+2p_{9,424}+p_{9,184}+p_{9,248}+p_{9,276} \\ &+2p_{9,148}+p_{9,404}+2p_{9,108}+p_{9,322}+p_{9,82}+p_{9,242}+p_{9,22} \\ &+p_{9,54}+p_{9,438}+p_{9,14}+p_{9,206}+p_{9,254}+p_{9,65}+2p_{9,41} \\ &+2p_{9,61}+p_{9,363}+2p_{9,59}+p_{9,251}+p_{9,199}+p_{9,87}+p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,22} = \frac{1}{2}p_{9,22} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,22}^2 - 4(p_{9,400}+p_{9,296}+p_{9,232}+2p_{9,472}+p_{9,324} \\ &+2p_{9,196}+p_{9,452}+2p_{9,156}+p_{9,130}+p_{9,290}+p_{9,370}+p_{9,70} \\ &+p_{9,102}+p_{9,486}+p_{9,302}+p_{9,62}+p_{9,254}+p_{9,113}+2p_{9,89} \\ &+2p_{9,109}+p_{9,299}+2p_{9,107}+p_{9,411}+p_{9,135}+p_{9,247}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,534} = \frac{1}{2}p_{9,22} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,22}^2 - 4(p_{9,400}+p_{9,296}+p_{9,232}+2p_{9,472}+p_{9,324} \\ &+2p_{9,196}+p_{9,452}+2p_{9,156}+p_{9,130}+p_{9,290}+p_{9,370}+p_{9,70} \\ &+p_{9,102}+p_{9,486}+p_{9,302}+p_{9,62}+p_{9,254}+p_{9,113}+2p_{9,89} \\ &+2p_{9,109}+p_{9,299}+2p_{9,107}+p_{9,411}+p_{9,135}+p_{9,247}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,278} = \frac{1}{2}p_{9,278} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,278}^2 - 4(p_{9,144}+p_{9,40}+p_{9,488}+2p_{9,216}+p_{9,68} \\ &+p_{9,196}+2p_{9,452}+2p_{9,412}+p_{9,386}+p_{9,34}+p_{9,114}+p_{9,326} \\ &+p_{9,358}+p_{9,230}+p_{9,46}+p_{9,318}+p_{9,510}+p_{9,369}+2p_{9,345} \\ &+2p_{9,365}+p_{9,43}+2p_{9,363}+p_{9,155}+p_{9,391}+p_{9,503}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,790} = \frac{1}{2}p_{9,278} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,278}^2 - 4(p_{9,144}+p_{9,40}+p_{9,488}+2p_{9,216}+p_{9,68} \\ &+p_{9,196}+2p_{9,452}+2p_{9,412}+p_{9,386}+p_{9,34}+p_{9,114}+p_{9,326} \\ &+p_{9,358}+p_{9,230}+p_{9,46}+p_{9,318}+p_{9,510}+p_{9,369}+2p_{9,345} \\ &+2p_{9,365}+p_{9,43}+2p_{9,363}+p_{9,155}+p_{9,391}+p_{9,503}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,150} = \frac{1}{2}p_{9,150} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,150}^2 - 4(p_{9,16}+p_{9,424}+p_{9,360}+2p_{9,88}+p_{9,68} \\ &+2p_{9,324}+p_{9,452}+2p_{9,284}+p_{9,258}+p_{9,418}+p_{9,498}+p_{9,198} \\ &+p_{9,102}+p_{9,230}+p_{9,430}+p_{9,190}+p_{9,382}+p_{9,241}+2p_{9,217} \\ &+2p_{9,237}+p_{9,427}+2p_{9,235}+p_{9,27}+p_{9,263}+p_{9,375}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,662} = \frac{1}{2}p_{9,150} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,150}^2 - 4(p_{9,16}+p_{9,424}+p_{9,360}+2p_{9,88}+p_{9,68} \\ &+2p_{9,324}+p_{9,452}+2p_{9,284}+p_{9,258}+p_{9,418}+p_{9,498}+p_{9,198} \\ &+p_{9,102}+p_{9,230}+p_{9,430}+p_{9,190}+p_{9,382}+p_{9,241}+2p_{9,217} \\ &+2p_{9,237}+p_{9,427}+2p_{9,235}+p_{9,27}+p_{9,263}+p_{9,375}+p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,918} = \frac{1}{2}p_{9,406} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,406}^2 - 4(p_{9,272}+p_{9,168}+p_{9,104}+2p_{9,344}+2p_{9,68} \\ &+p_{9,324}+p_{9,196}+2p_{9,28}+p_{9,2}+p_{9,162}+p_{9,242}+p_{9,454} \\ &+p_{9,358}+p_{9,486}+p_{9,174}+p_{9,446}+p_{9,126}+p_{9,497}+2p_{9,473} \\ &+2p_{9,493}+p_{9,171}+2p_{9,491}+p_{9,283}+p_{9,7}+p_{9,119}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,86} = \frac{1}{2}p_{9,86} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,86}^2 - 4(p_{9,464}+p_{9,296}+p_{9,360}+2p_{9,24}+p_{9,4}+2p_{9,260} \\ &+p_{9,388}+2p_{9,220}+p_{9,194}+p_{9,354}+p_{9,434}+p_{9,134}+p_{9,38} \\ &+p_{9,166}+p_{9,366}+p_{9,318}+p_{9,126}+p_{9,177}+2p_{9,153}+2p_{9,173} \\ &+2p_{9,171}+p_{9,363}+p_{9,475}+p_{9,199}+p_{9,311}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,598} = \frac{1}{2}p_{9,86} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,86}^2 - 4(p_{9,464}+p_{9,296}+p_{9,360}+2p_{9,24}+p_{9,4}+2p_{9,260} \\ &+p_{9,388}+2p_{9,220}+p_{9,194}+p_{9,354}+p_{9,434}+p_{9,134}+p_{9,38} \\ &+p_{9,166}+p_{9,366}+p_{9,318}+p_{9,126}+p_{9,177}+2p_{9,153}+2p_{9,173} \\ &+2p_{9,171}+p_{9,363}+p_{9,475}+p_{9,199}+p_{9,311}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,342} = \frac{1}{2}p_{9,342} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,342}^2 - 4(p_{9,208}+p_{9,40}+p_{9,104}+2p_{9,280}+2p_{9,4} \\ &+p_{9,260}+p_{9,132}+2p_{9,476}+p_{9,450}+p_{9,98}+p_{9,178}+p_{9,390} \\ &+p_{9,294}+p_{9,422}+p_{9,110}+p_{9,62}+p_{9,382}+p_{9,433}+2p_{9,409} \\ &+2p_{9,429}+2p_{9,427}+p_{9,107}+p_{9,219}+p_{9,455}+p_{9,55}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,854} = \frac{1}{2}p_{9,342} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,342}^2 - 4(p_{9,208}+p_{9,40}+p_{9,104}+2p_{9,280}+2p_{9,4} \\ &+p_{9,260}+p_{9,132}+2p_{9,476}+p_{9,450}+p_{9,98}+p_{9,178}+p_{9,390} \\ &+p_{9,294}+p_{9,422}+p_{9,110}+p_{9,62}+p_{9,382}+p_{9,433}+2p_{9,409} \\ &+2p_{9,429}+2p_{9,427}+p_{9,107}+p_{9,219}+p_{9,455}+p_{9,55}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,214} = \frac{1}{2}p_{9,214} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,214}^2 - 4(p_{9,80}+p_{9,424}+p_{9,488}+2p_{9,152}+p_{9,4}+p_{9,132} \\ &+2p_{9,388}+2p_{9,348}+p_{9,322}+p_{9,482}+p_{9,50}+p_{9,262}+p_{9,294} \\ &+p_{9,166}+p_{9,494}+p_{9,446}+p_{9,254}+p_{9,305}+2p_{9,281}+2p_{9,301} \\ &+2p_{9,299}+p_{9,491}+p_{9,91}+p_{9,327}+p_{9,439}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,726} = \frac{1}{2}p_{9,214} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,214}^2 - 4(p_{9,80}+p_{9,424}+p_{9,488}+2p_{9,152}+p_{9,4}+p_{9,132} \\ &+2p_{9,388}+2p_{9,348}+p_{9,322}+p_{9,482}+p_{9,50}+p_{9,262}+p_{9,294} \\ &+p_{9,166}+p_{9,494}+p_{9,446}+p_{9,254}+p_{9,305}+2p_{9,281}+2p_{9,301} \\ &+2p_{9,299}+p_{9,491}+p_{9,91}+p_{9,327}+p_{9,439}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,470} = \frac{1}{2}p_{9,470} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,470}^2 - 4(p_{9,336}+p_{9,168}+p_{9,232}+2p_{9,408}+p_{9,260} \\ &+2p_{9,132}+p_{9,388}+2p_{9,92}+p_{9,66}+p_{9,226}+p_{9,306}+p_{9,6} \\ &+p_{9,38}+p_{9,422}+p_{9,238}+p_{9,190}+p_{9,510}+p_{9,49}+2p_{9,25} \\ &+2p_{9,45}+2p_{9,43}+p_{9,235}+p_{9,347}+p_{9,71}+p_{9,183}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,982} = \frac{1}{2}p_{9,470} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,470}^2 - 4(p_{9,336}+p_{9,168}+p_{9,232}+2p_{9,408}+p_{9,260} \\ &+2p_{9,132}+p_{9,388}+2p_{9,92}+p_{9,66}+p_{9,226}+p_{9,306}+p_{9,6} \\ &+p_{9,38}+p_{9,422}+p_{9,238}+p_{9,190}+p_{9,510}+p_{9,49}+2p_{9,25} \\ &+2p_{9,45}+2p_{9,43}+p_{9,235}+p_{9,347}+p_{9,71}+p_{9,183}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,54} = \frac{1}{2}p_{9,54} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,54}^2 - 4(p_{9,432}+p_{9,264}+p_{9,328}+2p_{9,504}+p_{9,356} \\ &+2p_{9,228}+p_{9,484}+2p_{9,188}+p_{9,322}+p_{9,162}+p_{9,402}+p_{9,6} \\ &+p_{9,134}+p_{9,102}+p_{9,334}+p_{9,286}+p_{9,94}+p_{9,145}+2p_{9,121} \\ &+2p_{9,141}+2p_{9,139}+p_{9,331}+p_{9,443}+p_{9,167}+p_{9,279}+p_{9,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,310} = \frac{1}{2}p_{9,310} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,310}^2 - 4(p_{9,176}+p_{9,8}+p_{9,72}+2p_{9,248}+p_{9,100} \\ &+p_{9,228}+2p_{9,484}+2p_{9,444}+p_{9,66}+p_{9,418}+p_{9,146}+p_{9,262} \\ &+p_{9,390}+p_{9,358}+p_{9,78}+p_{9,30}+p_{9,350}+p_{9,401}+2p_{9,377} \\ &+2p_{9,397}+2p_{9,395}+p_{9,75}+p_{9,187}+p_{9,423}+p_{9,23}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,822} = \frac{1}{2}p_{9,310} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,310}^2 - 4(p_{9,176}+p_{9,8}+p_{9,72}+2p_{9,248}+p_{9,100} \\ &+p_{9,228}+2p_{9,484}+2p_{9,444}+p_{9,66}+p_{9,418}+p_{9,146}+p_{9,262} \\ &+p_{9,390}+p_{9,358}+p_{9,78}+p_{9,30}+p_{9,350}+p_{9,401}+2p_{9,377} \\ &+2p_{9,397}+2p_{9,395}+p_{9,75}+p_{9,187}+p_{9,423}+p_{9,23}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,182} = \frac{1}{2}p_{9,182} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,182}^2 - 4(p_{9,48}+p_{9,392}+p_{9,456}+2p_{9,120}+p_{9,100} \\ &+2p_{9,356}+p_{9,484}+2p_{9,316}+p_{9,450}+p_{9,290}+p_{9,18}+p_{9,262} \\ &+p_{9,134}+p_{9,230}+p_{9,462}+p_{9,414}+p_{9,222}+p_{9,273}+2p_{9,249} \\ &+2p_{9,269}+2p_{9,267}+p_{9,459}+p_{9,59}+p_{9,295}+p_{9,407}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,694} = \frac{1}{2}p_{9,182} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,182}^2 - 4(p_{9,48}+p_{9,392}+p_{9,456}+2p_{9,120}+p_{9,100} \\ &+2p_{9,356}+p_{9,484}+2p_{9,316}+p_{9,450}+p_{9,290}+p_{9,18}+p_{9,262} \\ &+p_{9,134}+p_{9,230}+p_{9,462}+p_{9,414}+p_{9,222}+p_{9,273}+2p_{9,249} \\ &+2p_{9,269}+2p_{9,267}+p_{9,459}+p_{9,59}+p_{9,295}+p_{9,407}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,438} = \frac{1}{2}p_{9,438} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,438}^2 - 4(p_{9,304}+p_{9,136}+p_{9,200}+2p_{9,376}+2p_{9,100} \\ &+p_{9,356}+p_{9,228}+2p_{9,60}+p_{9,194}+p_{9,34}+p_{9,274}+p_{9,6} \\ &+p_{9,390}+p_{9,486}+p_{9,206}+p_{9,158}+p_{9,478}+p_{9,17}+2p_{9,505} \\ &+2p_{9,13}+2p_{9,11}+p_{9,203}+p_{9,315}+p_{9,39}+p_{9,151}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,950} = \frac{1}{2}p_{9,438} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,438}^2 - 4(p_{9,304}+p_{9,136}+p_{9,200}+2p_{9,376}+2p_{9,100} \\ &+p_{9,356}+p_{9,228}+2p_{9,60}+p_{9,194}+p_{9,34}+p_{9,274}+p_{9,6} \\ &+p_{9,390}+p_{9,486}+p_{9,206}+p_{9,158}+p_{9,478}+p_{9,17}+2p_{9,505} \\ &+2p_{9,13}+2p_{9,11}+p_{9,203}+p_{9,315}+p_{9,39}+p_{9,151}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,118} = \frac{1}{2}p_{9,118} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,118}^2 - 4(p_{9,496}+p_{9,392}+p_{9,328}+2p_{9,56}+p_{9,36} \\ &+2p_{9,292}+p_{9,420}+2p_{9,252}+p_{9,386}+p_{9,226}+p_{9,466}+p_{9,70} \\ &+p_{9,198}+p_{9,166}+p_{9,398}+p_{9,158}+p_{9,350}+p_{9,209}+2p_{9,185} \\ &+2p_{9,205}+p_{9,395}+2p_{9,203}+p_{9,507}+p_{9,231}+p_{9,343}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,630} = \frac{1}{2}p_{9,118} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,118}^2 - 4(p_{9,496}+p_{9,392}+p_{9,328}+2p_{9,56}+p_{9,36} \\ &+2p_{9,292}+p_{9,420}+2p_{9,252}+p_{9,386}+p_{9,226}+p_{9,466}+p_{9,70} \\ &+p_{9,198}+p_{9,166}+p_{9,398}+p_{9,158}+p_{9,350}+p_{9,209}+2p_{9,185} \\ &+2p_{9,205}+p_{9,395}+2p_{9,203}+p_{9,507}+p_{9,231}+p_{9,343}+p_{9,223}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,886} = \frac{1}{2}p_{9,374} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,374}^2 - 4(p_{9,240}+p_{9,136}+p_{9,72}+2p_{9,312}+2p_{9,36} \\ &+p_{9,292}+p_{9,164}+2p_{9,508}+p_{9,130}+p_{9,482}+p_{9,210}+p_{9,326} \\ &+p_{9,454}+p_{9,422}+p_{9,142}+p_{9,414}+p_{9,94}+p_{9,465}+2p_{9,441} \\ &+2p_{9,461}+p_{9,139}+2p_{9,459}+p_{9,251}+p_{9,487}+p_{9,87}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,246} = \frac{1}{2}p_{9,246} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,246}^2 - 4(p_{9,112}+p_{9,8}+p_{9,456}+2p_{9,184}+p_{9,36} \\ &+p_{9,164}+2p_{9,420}+2p_{9,380}+p_{9,2}+p_{9,354}+p_{9,82}+p_{9,326} \\ &+p_{9,198}+p_{9,294}+p_{9,14}+p_{9,286}+p_{9,478}+p_{9,337}+2p_{9,313} \\ &+2p_{9,333}+p_{9,11}+2p_{9,331}+p_{9,123}+p_{9,359}+p_{9,471}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,758} = \frac{1}{2}p_{9,246} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,246}^2 - 4(p_{9,112}+p_{9,8}+p_{9,456}+2p_{9,184}+p_{9,36} \\ &+p_{9,164}+2p_{9,420}+2p_{9,380}+p_{9,2}+p_{9,354}+p_{9,82}+p_{9,326} \\ &+p_{9,198}+p_{9,294}+p_{9,14}+p_{9,286}+p_{9,478}+p_{9,337}+2p_{9,313} \\ &+2p_{9,333}+p_{9,11}+2p_{9,331}+p_{9,123}+p_{9,359}+p_{9,471}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,502} = \frac{1}{2}p_{9,502} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,502}^2 - 4(p_{9,368}+p_{9,264}+p_{9,200}+2p_{9,440}+p_{9,292} \\ &+2p_{9,164}+p_{9,420}+2p_{9,124}+p_{9,258}+p_{9,98}+p_{9,338}+p_{9,70} \\ &+p_{9,454}+p_{9,38}+p_{9,270}+p_{9,30}+p_{9,222}+p_{9,81}+2p_{9,57} \\ &+2p_{9,77}+p_{9,267}+2p_{9,75}+p_{9,379}+p_{9,103}+p_{9,215}+p_{9,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,14} = \frac{1}{2}p_{9,14} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,14}^2 - 4(p_{9,288}+p_{9,224}+2p_{9,464}+p_{9,392}+2p_{9,148} \\ &+p_{9,316}+2p_{9,188}+p_{9,444}+p_{9,362}+p_{9,282}+p_{9,122}+p_{9,294} \\ &+p_{9,54}+p_{9,246}+p_{9,94}+p_{9,478}+p_{9,62}+2p_{9,81}+p_{9,105} \\ &+2p_{9,101}+p_{9,291}+2p_{9,99}+p_{9,403}+p_{9,119}+p_{9,239}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,526} = \frac{1}{2}p_{9,14} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,14}^2 - 4(p_{9,288}+p_{9,224}+2p_{9,464}+p_{9,392}+2p_{9,148} \\ &+p_{9,316}+2p_{9,188}+p_{9,444}+p_{9,362}+p_{9,282}+p_{9,122}+p_{9,294} \\ &+p_{9,54}+p_{9,246}+p_{9,94}+p_{9,478}+p_{9,62}+2p_{9,81}+p_{9,105} \\ &+2p_{9,101}+p_{9,291}+2p_{9,99}+p_{9,403}+p_{9,119}+p_{9,239}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,270} = \frac{1}{2}p_{9,270} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,270}^2 - 4(p_{9,32}+p_{9,480}+2p_{9,208}+p_{9,136}+2p_{9,404} \\ &+p_{9,60}+p_{9,188}+2p_{9,444}+p_{9,106}+p_{9,26}+p_{9,378}+p_{9,38} \\ &+p_{9,310}+p_{9,502}+p_{9,350}+p_{9,222}+p_{9,318}+2p_{9,337}+p_{9,361} \\ &+2p_{9,357}+p_{9,35}+2p_{9,355}+p_{9,147}+p_{9,375}+p_{9,495}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,782} = \frac{1}{2}p_{9,270} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,270}^2 - 4(p_{9,32}+p_{9,480}+2p_{9,208}+p_{9,136}+2p_{9,404} \\ &+p_{9,60}+p_{9,188}+2p_{9,444}+p_{9,106}+p_{9,26}+p_{9,378}+p_{9,38} \\ &+p_{9,310}+p_{9,502}+p_{9,350}+p_{9,222}+p_{9,318}+2p_{9,337}+p_{9,361} \\ &+2p_{9,357}+p_{9,35}+2p_{9,355}+p_{9,147}+p_{9,375}+p_{9,495}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,142} = \frac{1}{2}p_{9,142} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,142}^2 - 4(p_{9,416}+p_{9,352}+2p_{9,80}+p_{9,8}+2p_{9,276}+p_{9,60} \\ &+2p_{9,316}+p_{9,444}+p_{9,490}+p_{9,410}+p_{9,250}+p_{9,422}+p_{9,182} \\ &+p_{9,374}+p_{9,94}+p_{9,222}+p_{9,190}+2p_{9,209}+p_{9,233}+2p_{9,229} \\ &+p_{9,419}+2p_{9,227}+p_{9,19}+p_{9,247}+p_{9,367}+p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,398} = \frac{1}{2}p_{9,398} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,398}^2 - 4(p_{9,160}+p_{9,96}+2p_{9,336}+p_{9,264}+2p_{9,20} \\ &+2p_{9,60}+p_{9,316}+p_{9,188}+p_{9,234}+p_{9,154}+p_{9,506}+p_{9,166} \\ &+p_{9,438}+p_{9,118}+p_{9,350}+p_{9,478}+p_{9,446}+2p_{9,465}+p_{9,489} \\ &+2p_{9,485}+p_{9,163}+2p_{9,483}+p_{9,275}+p_{9,503}+p_{9,111}+p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,78} = \frac{1}{2}p_{9,78} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,78}^2 - 4(p_{9,288}+p_{9,352}+2p_{9,16}+p_{9,456}+2p_{9,212} \\ &+p_{9,380}+2p_{9,252}+p_{9,508}+p_{9,426}+p_{9,346}+p_{9,186}+p_{9,358} \\ &+p_{9,310}+p_{9,118}+p_{9,30}+p_{9,158}+p_{9,126}+2p_{9,145}+p_{9,169} \\ &+2p_{9,165}+2p_{9,163}+p_{9,355}+p_{9,467}+p_{9,183}+p_{9,303}+p_{9,191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,334} = \frac{1}{2}p_{9,334} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,334}^2 - 4(p_{9,32}+p_{9,96}+2p_{9,272}+p_{9,200}+2p_{9,468} \\ &+p_{9,124}+p_{9,252}+2p_{9,508}+p_{9,170}+p_{9,90}+p_{9,442}+p_{9,102} \\ &+p_{9,54}+p_{9,374}+p_{9,286}+p_{9,414}+p_{9,382}+2p_{9,401}+p_{9,425} \\ &+2p_{9,421}+2p_{9,419}+p_{9,99}+p_{9,211}+p_{9,439}+p_{9,47}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,846} = \frac{1}{2}p_{9,334} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,334}^2 - 4(p_{9,32}+p_{9,96}+2p_{9,272}+p_{9,200}+2p_{9,468} \\ &+p_{9,124}+p_{9,252}+2p_{9,508}+p_{9,170}+p_{9,90}+p_{9,442}+p_{9,102} \\ &+p_{9,54}+p_{9,374}+p_{9,286}+p_{9,414}+p_{9,382}+2p_{9,401}+p_{9,425} \\ &+2p_{9,421}+2p_{9,419}+p_{9,99}+p_{9,211}+p_{9,439}+p_{9,47}+p_{9,447}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,718} = \frac{1}{2}p_{9,206} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,206}^2 - 4(p_{9,416}+p_{9,480}+2p_{9,144}+p_{9,72}+2p_{9,340} \\ &+p_{9,124}+2p_{9,380}+p_{9,508}+p_{9,42}+p_{9,474}+p_{9,314}+p_{9,486} \\ &+p_{9,438}+p_{9,246}+p_{9,286}+p_{9,158}+p_{9,254}+2p_{9,273}+p_{9,297} \\ &+2p_{9,293}+2p_{9,291}+p_{9,483}+p_{9,83}+p_{9,311}+p_{9,431}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,462} = \frac{1}{2}p_{9,462} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,462}^2 - 4(p_{9,160}+p_{9,224}+2p_{9,400}+p_{9,328}+2p_{9,84} \\ &+2p_{9,124}+p_{9,380}+p_{9,252}+p_{9,298}+p_{9,218}+p_{9,58}+p_{9,230} \\ &+p_{9,182}+p_{9,502}+p_{9,30}+p_{9,414}+p_{9,510}+2p_{9,17}+p_{9,41} \\ &+2p_{9,37}+2p_{9,35}+p_{9,227}+p_{9,339}+p_{9,55}+p_{9,175}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,974} = \frac{1}{2}p_{9,462} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,462}^2 - 4(p_{9,160}+p_{9,224}+2p_{9,400}+p_{9,328}+2p_{9,84} \\ &+2p_{9,124}+p_{9,380}+p_{9,252}+p_{9,298}+p_{9,218}+p_{9,58}+p_{9,230} \\ &+p_{9,182}+p_{9,502}+p_{9,30}+p_{9,414}+p_{9,510}+2p_{9,17}+p_{9,41} \\ &+2p_{9,37}+2p_{9,35}+p_{9,227}+p_{9,339}+p_{9,55}+p_{9,175}+p_{9,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,302} = \frac{1}{2}p_{9,302} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,302}^2 - 4(p_{9,0}+p_{9,64}+2p_{9,240}+p_{9,168}+2p_{9,436} \\ &+p_{9,92}+p_{9,220}+2p_{9,476}+p_{9,138}+p_{9,410}+p_{9,58}+p_{9,70} \\ &+p_{9,22}+p_{9,342}+p_{9,350}+p_{9,382}+p_{9,254}+2p_{9,369}+p_{9,393} \\ &+2p_{9,389}+2p_{9,387}+p_{9,67}+p_{9,179}+p_{9,407}+p_{9,15}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,814} = \frac{1}{2}p_{9,302} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,302}^2 - 4(p_{9,0}+p_{9,64}+2p_{9,240}+p_{9,168}+2p_{9,436} \\ &+p_{9,92}+p_{9,220}+2p_{9,476}+p_{9,138}+p_{9,410}+p_{9,58}+p_{9,70} \\ &+p_{9,22}+p_{9,342}+p_{9,350}+p_{9,382}+p_{9,254}+2p_{9,369}+p_{9,393} \\ &+2p_{9,389}+2p_{9,387}+p_{9,67}+p_{9,179}+p_{9,407}+p_{9,15}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,174} = \frac{1}{2}p_{9,174} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,174}^2 - 4(p_{9,384}+p_{9,448}+2p_{9,112}+p_{9,40}+2p_{9,308} \\ &+p_{9,92}+2p_{9,348}+p_{9,476}+p_{9,10}+p_{9,282}+p_{9,442}+p_{9,454} \\ &+p_{9,406}+p_{9,214}+p_{9,222}+p_{9,126}+p_{9,254}+2p_{9,241}+p_{9,265} \\ &+2p_{9,261}+2p_{9,259}+p_{9,451}+p_{9,51}+p_{9,279}+p_{9,399}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,686} = \frac{1}{2}p_{9,174} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,174}^2 - 4(p_{9,384}+p_{9,448}+2p_{9,112}+p_{9,40}+2p_{9,308} \\ &+p_{9,92}+2p_{9,348}+p_{9,476}+p_{9,10}+p_{9,282}+p_{9,442}+p_{9,454} \\ &+p_{9,406}+p_{9,214}+p_{9,222}+p_{9,126}+p_{9,254}+2p_{9,241}+p_{9,265} \\ &+2p_{9,261}+2p_{9,259}+p_{9,451}+p_{9,51}+p_{9,279}+p_{9,399}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,430} = \frac{1}{2}p_{9,430} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,430}^2 - 4(p_{9,128}+p_{9,192}+2p_{9,368}+p_{9,296}+2p_{9,52} \\ &+2p_{9,92}+p_{9,348}+p_{9,220}+p_{9,266}+p_{9,26}+p_{9,186}+p_{9,198} \\ &+p_{9,150}+p_{9,470}+p_{9,478}+p_{9,382}+p_{9,510}+2p_{9,497}+p_{9,9} \\ &+2p_{9,5}+2p_{9,3}+p_{9,195}+p_{9,307}+p_{9,23}+p_{9,143}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,942} = \frac{1}{2}p_{9,430} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,430}^2 - 4(p_{9,128}+p_{9,192}+2p_{9,368}+p_{9,296}+2p_{9,52} \\ &+2p_{9,92}+p_{9,348}+p_{9,220}+p_{9,266}+p_{9,26}+p_{9,186}+p_{9,198} \\ &+p_{9,150}+p_{9,470}+p_{9,478}+p_{9,382}+p_{9,510}+2p_{9,497}+p_{9,9} \\ &+2p_{9,5}+2p_{9,3}+p_{9,195}+p_{9,307}+p_{9,23}+p_{9,143}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,110} = \frac{1}{2}p_{9,110} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,110}^2 - 4(p_{9,384}+p_{9,320}+2p_{9,48}+p_{9,488}+2p_{9,244} \\ &+p_{9,28}+2p_{9,284}+p_{9,412}+p_{9,458}+p_{9,218}+p_{9,378}+p_{9,390} \\ &+p_{9,150}+p_{9,342}+p_{9,158}+p_{9,62}+p_{9,190}+2p_{9,177}+p_{9,201} \\ &+2p_{9,197}+p_{9,387}+2p_{9,195}+p_{9,499}+p_{9,215}+p_{9,335}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,622} = \frac{1}{2}p_{9,110} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,110}^2 - 4(p_{9,384}+p_{9,320}+2p_{9,48}+p_{9,488}+2p_{9,244} \\ &+p_{9,28}+2p_{9,284}+p_{9,412}+p_{9,458}+p_{9,218}+p_{9,378}+p_{9,390} \\ &+p_{9,150}+p_{9,342}+p_{9,158}+p_{9,62}+p_{9,190}+2p_{9,177}+p_{9,201} \\ &+2p_{9,197}+p_{9,387}+2p_{9,195}+p_{9,499}+p_{9,215}+p_{9,335}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,366} = \frac{1}{2}p_{9,366} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,366}^2 - 4(p_{9,128}+p_{9,64}+2p_{9,304}+p_{9,232}+2p_{9,500} \\ &+2p_{9,28}+p_{9,284}+p_{9,156}+p_{9,202}+p_{9,474}+p_{9,122}+p_{9,134} \\ &+p_{9,406}+p_{9,86}+p_{9,414}+p_{9,318}+p_{9,446}+2p_{9,433}+p_{9,457} \\ &+2p_{9,453}+p_{9,131}+2p_{9,451}+p_{9,243}+p_{9,471}+p_{9,79}+p_{9,479}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,238} = \frac{1}{2}p_{9,238} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,238}^2 - 4(p_{9,0}+p_{9,448}+2p_{9,176}+p_{9,104}+2p_{9,372} \\ &+p_{9,28}+p_{9,156}+2p_{9,412}+p_{9,74}+p_{9,346}+p_{9,506}+p_{9,6} \\ &+p_{9,278}+p_{9,470}+p_{9,286}+p_{9,318}+p_{9,190}+2p_{9,305}+p_{9,329} \\ &+2p_{9,325}+p_{9,3}+2p_{9,323}+p_{9,115}+p_{9,343}+p_{9,463}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,750} = \frac{1}{2}p_{9,238} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,238}^2 - 4(p_{9,0}+p_{9,448}+2p_{9,176}+p_{9,104}+2p_{9,372} \\ &+p_{9,28}+p_{9,156}+2p_{9,412}+p_{9,74}+p_{9,346}+p_{9,506}+p_{9,6} \\ &+p_{9,278}+p_{9,470}+p_{9,286}+p_{9,318}+p_{9,190}+2p_{9,305}+p_{9,329} \\ &+2p_{9,325}+p_{9,3}+2p_{9,323}+p_{9,115}+p_{9,343}+p_{9,463}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,494} = \frac{1}{2}p_{9,494} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,494}^2 - 4(p_{9,256}+p_{9,192}+2p_{9,432}+p_{9,360}+2p_{9,116} \\ &+p_{9,284}+2p_{9,156}+p_{9,412}+p_{9,330}+p_{9,90}+p_{9,250}+p_{9,262} \\ &+p_{9,22}+p_{9,214}+p_{9,30}+p_{9,62}+p_{9,446}+2p_{9,49}+p_{9,73} \\ &+2p_{9,69}+p_{9,259}+2p_{9,67}+p_{9,371}+p_{9,87}+p_{9,207}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1006} = \frac{1}{2}p_{9,494} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,494}^2 - 4(p_{9,256}+p_{9,192}+2p_{9,432}+p_{9,360}+2p_{9,116} \\ &+p_{9,284}+2p_{9,156}+p_{9,412}+p_{9,330}+p_{9,90}+p_{9,250}+p_{9,262} \\ &+p_{9,22}+p_{9,214}+p_{9,30}+p_{9,62}+p_{9,446}+2p_{9,49}+p_{9,73} \\ &+2p_{9,69}+p_{9,259}+2p_{9,67}+p_{9,371}+p_{9,87}+p_{9,207}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,30} = \frac{1}{2}p_{9,30} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,30}^2 - 4(2p_{9,480}+p_{9,304}+p_{9,240}+p_{9,408}+2p_{9,164} \\ &+p_{9,332}+2p_{9,204}+p_{9,460}+p_{9,138}+p_{9,298}+p_{9,378}+p_{9,262} \\ &+p_{9,70}+p_{9,310}+p_{9,78}+p_{9,110}+p_{9,494}+2p_{9,97}+p_{9,121} \\ &+2p_{9,117}+p_{9,419}+p_{9,307}+2p_{9,115}+p_{9,135}+p_{9,143}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,542} = \frac{1}{2}p_{9,30} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,30}^2 - 4(2p_{9,480}+p_{9,304}+p_{9,240}+p_{9,408}+2p_{9,164} \\ &+p_{9,332}+2p_{9,204}+p_{9,460}+p_{9,138}+p_{9,298}+p_{9,378}+p_{9,262} \\ &+p_{9,70}+p_{9,310}+p_{9,78}+p_{9,110}+p_{9,494}+2p_{9,97}+p_{9,121} \\ &+2p_{9,117}+p_{9,419}+p_{9,307}+2p_{9,115}+p_{9,135}+p_{9,143}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,286} = \frac{1}{2}p_{9,286} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,286}^2 - 4(2p_{9,224}+p_{9,48}+p_{9,496}+p_{9,152}+2p_{9,420} \\ &+p_{9,76}+p_{9,204}+2p_{9,460}+p_{9,394}+p_{9,42}+p_{9,122}+p_{9,6} \\ &+p_{9,326}+p_{9,54}+p_{9,334}+p_{9,366}+p_{9,238}+2p_{9,353}+p_{9,377} \\ &+2p_{9,373}+p_{9,163}+p_{9,51}+2p_{9,371}+p_{9,391}+p_{9,399}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,798} = \frac{1}{2}p_{9,286} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,286}^2 - 4(2p_{9,224}+p_{9,48}+p_{9,496}+p_{9,152}+2p_{9,420} \\ &+p_{9,76}+p_{9,204}+2p_{9,460}+p_{9,394}+p_{9,42}+p_{9,122}+p_{9,6} \\ &+p_{9,326}+p_{9,54}+p_{9,334}+p_{9,366}+p_{9,238}+2p_{9,353}+p_{9,377} \\ &+2p_{9,373}+p_{9,163}+p_{9,51}+2p_{9,371}+p_{9,391}+p_{9,399}+p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,414} = \frac{1}{2}p_{9,414} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,414}^2 - 4(2p_{9,352}+p_{9,176}+p_{9,112}+p_{9,280}+2p_{9,36} \\ &+2p_{9,76}+p_{9,332}+p_{9,204}+p_{9,10}+p_{9,170}+p_{9,250}+p_{9,134} \\ &+p_{9,454}+p_{9,182}+p_{9,462}+p_{9,366}+p_{9,494}+2p_{9,481}+p_{9,505} \\ &+2p_{9,501}+p_{9,291}+p_{9,179}+2p_{9,499}+p_{9,7}+p_{9,15}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,926} = \frac{1}{2}p_{9,414} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,414}^2 - 4(2p_{9,352}+p_{9,176}+p_{9,112}+p_{9,280}+2p_{9,36} \\ &+2p_{9,76}+p_{9,332}+p_{9,204}+p_{9,10}+p_{9,170}+p_{9,250}+p_{9,134} \\ &+p_{9,454}+p_{9,182}+p_{9,462}+p_{9,366}+p_{9,494}+2p_{9,481}+p_{9,505} \\ &+2p_{9,501}+p_{9,291}+p_{9,179}+2p_{9,499}+p_{9,7}+p_{9,15}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,94} = \frac{1}{2}p_{9,94} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,94}^2 - 4(2p_{9,32}+p_{9,304}+p_{9,368}+p_{9,472}+2p_{9,228} \\ &+p_{9,12}+2p_{9,268}+p_{9,396}+p_{9,202}+p_{9,362}+p_{9,442}+p_{9,134} \\ &+p_{9,326}+p_{9,374}+p_{9,142}+p_{9,46}+p_{9,174}+2p_{9,161}+p_{9,185} \\ &+2p_{9,181}+p_{9,483}+2p_{9,179}+p_{9,371}+p_{9,199}+p_{9,207}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,606} = \frac{1}{2}p_{9,94} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,94}^2 - 4(2p_{9,32}+p_{9,304}+p_{9,368}+p_{9,472}+2p_{9,228} \\ &+p_{9,12}+2p_{9,268}+p_{9,396}+p_{9,202}+p_{9,362}+p_{9,442}+p_{9,134} \\ &+p_{9,326}+p_{9,374}+p_{9,142}+p_{9,46}+p_{9,174}+2p_{9,161}+p_{9,185} \\ &+2p_{9,181}+p_{9,483}+2p_{9,179}+p_{9,371}+p_{9,199}+p_{9,207}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,350} = \frac{1}{2}p_{9,350} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,350}^2 - 4(2p_{9,288}+p_{9,48}+p_{9,112}+p_{9,216}+2p_{9,484} \\ &+2p_{9,12}+p_{9,268}+p_{9,140}+p_{9,458}+p_{9,106}+p_{9,186}+p_{9,390} \\ &+p_{9,70}+p_{9,118}+p_{9,398}+p_{9,302}+p_{9,430}+2p_{9,417}+p_{9,441} \\ &+2p_{9,437}+p_{9,227}+2p_{9,435}+p_{9,115}+p_{9,455}+p_{9,463}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,862} = \frac{1}{2}p_{9,350} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,350}^2 - 4(2p_{9,288}+p_{9,48}+p_{9,112}+p_{9,216}+2p_{9,484} \\ &+2p_{9,12}+p_{9,268}+p_{9,140}+p_{9,458}+p_{9,106}+p_{9,186}+p_{9,390} \\ &+p_{9,70}+p_{9,118}+p_{9,398}+p_{9,302}+p_{9,430}+2p_{9,417}+p_{9,441} \\ &+2p_{9,437}+p_{9,227}+2p_{9,435}+p_{9,115}+p_{9,455}+p_{9,463}+p_{9,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,734} = \frac{1}{2}p_{9,222} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,222}^2 - 4(2p_{9,160}+p_{9,432}+p_{9,496}+p_{9,88}+2p_{9,356} \\ &+p_{9,12}+p_{9,140}+2p_{9,396}+p_{9,330}+p_{9,490}+p_{9,58}+p_{9,262} \\ &+p_{9,454}+p_{9,502}+p_{9,270}+p_{9,302}+p_{9,174}+2p_{9,289}+p_{9,313} \\ &+2p_{9,309}+p_{9,99}+2p_{9,307}+p_{9,499}+p_{9,327}+p_{9,335}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,478} = \frac{1}{2}p_{9,478} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,478}^2 - 4(2p_{9,416}+p_{9,176}+p_{9,240}+p_{9,344}+2p_{9,100} \\ &+p_{9,268}+2p_{9,140}+p_{9,396}+p_{9,74}+p_{9,234}+p_{9,314}+p_{9,6} \\ &+p_{9,198}+p_{9,246}+p_{9,14}+p_{9,46}+p_{9,430}+2p_{9,33}+p_{9,57} \\ &+2p_{9,53}+p_{9,355}+2p_{9,51}+p_{9,243}+p_{9,71}+p_{9,79}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,990} = \frac{1}{2}p_{9,478} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,478}^2 - 4(2p_{9,416}+p_{9,176}+p_{9,240}+p_{9,344}+2p_{9,100} \\ &+p_{9,268}+2p_{9,140}+p_{9,396}+p_{9,74}+p_{9,234}+p_{9,314}+p_{9,6} \\ &+p_{9,198}+p_{9,246}+p_{9,14}+p_{9,46}+p_{9,430}+2p_{9,33}+p_{9,57} \\ &+2p_{9,53}+p_{9,355}+2p_{9,51}+p_{9,243}+p_{9,71}+p_{9,79}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,62} = \frac{1}{2}p_{9,62} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,62}^2 - 4(2p_{9,0}+p_{9,272}+p_{9,336}+p_{9,440}+2p_{9,196} \\ &+p_{9,364}+2p_{9,236}+p_{9,492}+p_{9,330}+p_{9,170}+p_{9,410}+p_{9,294} \\ &+p_{9,102}+p_{9,342}+p_{9,14}+p_{9,142}+p_{9,110}+2p_{9,129}+p_{9,153} \\ &+2p_{9,149}+p_{9,451}+2p_{9,147}+p_{9,339}+p_{9,167}+p_{9,175}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,574} = \frac{1}{2}p_{9,62} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,62}^2 - 4(2p_{9,0}+p_{9,272}+p_{9,336}+p_{9,440}+2p_{9,196} \\ &+p_{9,364}+2p_{9,236}+p_{9,492}+p_{9,330}+p_{9,170}+p_{9,410}+p_{9,294} \\ &+p_{9,102}+p_{9,342}+p_{9,14}+p_{9,142}+p_{9,110}+2p_{9,129}+p_{9,153} \\ &+2p_{9,149}+p_{9,451}+2p_{9,147}+p_{9,339}+p_{9,167}+p_{9,175}+p_{9,287}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,830} = \frac{1}{2}p_{9,318} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,318}^2 - 4(2p_{9,256}+p_{9,16}+p_{9,80}+p_{9,184}+2p_{9,452} \\ &+p_{9,108}+p_{9,236}+2p_{9,492}+p_{9,74}+p_{9,426}+p_{9,154}+p_{9,38} \\ &+p_{9,358}+p_{9,86}+p_{9,270}+p_{9,398}+p_{9,366}+2p_{9,385}+p_{9,409} \\ &+2p_{9,405}+p_{9,195}+2p_{9,403}+p_{9,83}+p_{9,423}+p_{9,431}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,190} = \frac{1}{2}p_{9,190} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,190}^2 - 4(2p_{9,128}+p_{9,400}+p_{9,464}+p_{9,56}+2p_{9,324} \\ &+p_{9,108}+2p_{9,364}+p_{9,492}+p_{9,458}+p_{9,298}+p_{9,26}+p_{9,422} \\ &+p_{9,230}+p_{9,470}+p_{9,270}+p_{9,142}+p_{9,238}+2p_{9,257}+p_{9,281} \\ &+2p_{9,277}+p_{9,67}+2p_{9,275}+p_{9,467}+p_{9,295}+p_{9,303}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,702} = \frac{1}{2}p_{9,190} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,190}^2 - 4(2p_{9,128}+p_{9,400}+p_{9,464}+p_{9,56}+2p_{9,324} \\ &+p_{9,108}+2p_{9,364}+p_{9,492}+p_{9,458}+p_{9,298}+p_{9,26}+p_{9,422} \\ &+p_{9,230}+p_{9,470}+p_{9,270}+p_{9,142}+p_{9,238}+2p_{9,257}+p_{9,281} \\ &+2p_{9,277}+p_{9,67}+2p_{9,275}+p_{9,467}+p_{9,295}+p_{9,303}+p_{9,415}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,958} = \frac{1}{2}p_{9,446} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,446}^2 - 4(2p_{9,384}+p_{9,144}+p_{9,208}+p_{9,312}+2p_{9,68} \\ &+2p_{9,108}+p_{9,364}+p_{9,236}+p_{9,202}+p_{9,42}+p_{9,282}+p_{9,166} \\ &+p_{9,486}+p_{9,214}+p_{9,14}+p_{9,398}+p_{9,494}+2p_{9,1}+p_{9,25} \\ &+2p_{9,21}+p_{9,323}+2p_{9,19}+p_{9,211}+p_{9,39}+p_{9,47}+p_{9,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,638} = \frac{1}{2}p_{9,126} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,126}^2 - 4(2p_{9,64}+p_{9,400}+p_{9,336}+p_{9,504}+2p_{9,260} \\ &+p_{9,44}+2p_{9,300}+p_{9,428}+p_{9,394}+p_{9,234}+p_{9,474}+p_{9,166} \\ &+p_{9,358}+p_{9,406}+p_{9,78}+p_{9,206}+p_{9,174}+2p_{9,193}+p_{9,217} \\ &+2p_{9,213}+p_{9,3}+p_{9,403}+2p_{9,211}+p_{9,231}+p_{9,239}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,382} = \frac{1}{2}p_{9,382} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,382}^2 - 4(2p_{9,320}+p_{9,144}+p_{9,80}+p_{9,248}+2p_{9,4} \\ &+2p_{9,44}+p_{9,300}+p_{9,172}+p_{9,138}+p_{9,490}+p_{9,218}+p_{9,422} \\ &+p_{9,102}+p_{9,150}+p_{9,334}+p_{9,462}+p_{9,430}+2p_{9,449}+p_{9,473} \\ &+2p_{9,469}+p_{9,259}+p_{9,147}+2p_{9,467}+p_{9,487}+p_{9,495}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,894} = \frac{1}{2}p_{9,382} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,382}^2 - 4(2p_{9,320}+p_{9,144}+p_{9,80}+p_{9,248}+2p_{9,4} \\ &+2p_{9,44}+p_{9,300}+p_{9,172}+p_{9,138}+p_{9,490}+p_{9,218}+p_{9,422} \\ &+p_{9,102}+p_{9,150}+p_{9,334}+p_{9,462}+p_{9,430}+2p_{9,449}+p_{9,473} \\ &+2p_{9,469}+p_{9,259}+p_{9,147}+2p_{9,467}+p_{9,487}+p_{9,495}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,254} = \frac{1}{2}p_{9,254} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,254}^2 - 4(2p_{9,192}+p_{9,16}+p_{9,464}+p_{9,120}+2p_{9,388} \\ &+p_{9,44}+p_{9,172}+2p_{9,428}+p_{9,10}+p_{9,362}+p_{9,90}+p_{9,294} \\ &+p_{9,486}+p_{9,22}+p_{9,334}+p_{9,206}+p_{9,302}+2p_{9,321}+p_{9,345} \\ &+2p_{9,341}+p_{9,131}+p_{9,19}+2p_{9,339}+p_{9,359}+p_{9,367}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,766} = \frac{1}{2}p_{9,254} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,254}^2 - 4(2p_{9,192}+p_{9,16}+p_{9,464}+p_{9,120}+2p_{9,388} \\ &+p_{9,44}+p_{9,172}+2p_{9,428}+p_{9,10}+p_{9,362}+p_{9,90}+p_{9,294} \\ &+p_{9,486}+p_{9,22}+p_{9,334}+p_{9,206}+p_{9,302}+2p_{9,321}+p_{9,345} \\ &+2p_{9,341}+p_{9,131}+p_{9,19}+2p_{9,339}+p_{9,359}+p_{9,367}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,510} = \frac{1}{2}p_{9,510} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,510}^2 - 4(2p_{9,448}+p_{9,272}+p_{9,208}+p_{9,376}+2p_{9,132} \\ &+p_{9,300}+2p_{9,172}+p_{9,428}+p_{9,266}+p_{9,106}+p_{9,346}+p_{9,38} \\ &+p_{9,230}+p_{9,278}+p_{9,78}+p_{9,462}+p_{9,46}+2p_{9,65}+p_{9,89} \\ &+2p_{9,85}+p_{9,387}+p_{9,275}+2p_{9,83}+p_{9,103}+p_{9,111}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1022} = \frac{1}{2}p_{9,510} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,510}^2 - 4(2p_{9,448}+p_{9,272}+p_{9,208}+p_{9,376}+2p_{9,132} \\ &+p_{9,300}+2p_{9,172}+p_{9,428}+p_{9,266}+p_{9,106}+p_{9,346}+p_{9,38} \\ &+p_{9,230}+p_{9,278}+p_{9,78}+p_{9,462}+p_{9,46}+2p_{9,65}+p_{9,89} \\ &+2p_{9,85}+p_{9,387}+p_{9,275}+2p_{9,83}+p_{9,103}+p_{9,111}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1} = \frac{1}{2}p_{9,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,1}^2 - 4(2p_{9,88}+2p_{9,68}+p_{9,92}+p_{9,226}+p_{9,114}+p_{9,106} \\ &+p_{9,390}+p_{9,278}+2p_{9,86}+p_{9,81}+p_{9,465}+p_{9,49}+p_{9,41} \\ &+p_{9,233}+p_{9,281}+p_{9,269}+p_{9,109}+p_{9,349}+2p_{9,451}+p_{9,275} \\ &+p_{9,211}+p_{9,379}+2p_{9,135}+p_{9,303}+2p_{9,175}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,513} = \frac{1}{2}p_{9,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,1}^2 - 4(2p_{9,88}+2p_{9,68}+p_{9,92}+p_{9,226}+p_{9,114}+p_{9,106} \\ &+p_{9,390}+p_{9,278}+2p_{9,86}+p_{9,81}+p_{9,465}+p_{9,49}+p_{9,41} \\ &+p_{9,233}+p_{9,281}+p_{9,269}+p_{9,109}+p_{9,349}+2p_{9,451}+p_{9,275} \\ &+p_{9,211}+p_{9,379}+2p_{9,135}+p_{9,303}+2p_{9,175}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,257} = \frac{1}{2}p_{9,257} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,257}^2 - 4(2p_{9,344}+2p_{9,324}+p_{9,348}+p_{9,482}+p_{9,370} \\ &+p_{9,362}+p_{9,134}+p_{9,22}+2p_{9,342}+p_{9,337}+p_{9,209}+p_{9,305} \\ &+p_{9,297}+p_{9,489}+p_{9,25}+p_{9,13}+p_{9,365}+p_{9,93}+2p_{9,195} \\ &+p_{9,19}+p_{9,467}+p_{9,123}+2p_{9,391}+p_{9,47}+p_{9,175}+2p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,769} = \frac{1}{2}p_{9,257} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,257}^2 - 4(2p_{9,344}+2p_{9,324}+p_{9,348}+p_{9,482}+p_{9,370} \\ &+p_{9,362}+p_{9,134}+p_{9,22}+2p_{9,342}+p_{9,337}+p_{9,209}+p_{9,305} \\ &+p_{9,297}+p_{9,489}+p_{9,25}+p_{9,13}+p_{9,365}+p_{9,93}+2p_{9,195} \\ &+p_{9,19}+p_{9,467}+p_{9,123}+2p_{9,391}+p_{9,47}+p_{9,175}+2p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,129} = \frac{1}{2}p_{9,129} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,129}^2 - 4(2p_{9,216}+2p_{9,196}+p_{9,220}+p_{9,354}+p_{9,242} \\ &+p_{9,234}+p_{9,6}+p_{9,406}+2p_{9,214}+p_{9,81}+p_{9,209}+p_{9,177} \\ &+p_{9,169}+p_{9,361}+p_{9,409}+p_{9,397}+p_{9,237}+p_{9,477}+2p_{9,67} \\ &+p_{9,403}+p_{9,339}+p_{9,507}+2p_{9,263}+p_{9,47}+2p_{9,303}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,641} = \frac{1}{2}p_{9,129} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,129}^2 - 4(2p_{9,216}+2p_{9,196}+p_{9,220}+p_{9,354}+p_{9,242} \\ &+p_{9,234}+p_{9,6}+p_{9,406}+2p_{9,214}+p_{9,81}+p_{9,209}+p_{9,177} \\ &+p_{9,169}+p_{9,361}+p_{9,409}+p_{9,397}+p_{9,237}+p_{9,477}+2p_{9,67} \\ &+p_{9,403}+p_{9,339}+p_{9,507}+2p_{9,263}+p_{9,47}+2p_{9,303}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,385} = \frac{1}{2}p_{9,385} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,385}^2 - 4(2p_{9,472}+2p_{9,452}+p_{9,476}+p_{9,98}+p_{9,498} \\ &+p_{9,490}+p_{9,262}+p_{9,150}+2p_{9,470}+p_{9,337}+p_{9,465}+p_{9,433} \\ &+p_{9,425}+p_{9,105}+p_{9,153}+p_{9,141}+p_{9,493}+p_{9,221}+2p_{9,323} \\ &+p_{9,147}+p_{9,83}+p_{9,251}+2p_{9,7}+2p_{9,47}+p_{9,303}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,897} = \frac{1}{2}p_{9,385} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,385}^2 - 4(2p_{9,472}+2p_{9,452}+p_{9,476}+p_{9,98}+p_{9,498} \\ &+p_{9,490}+p_{9,262}+p_{9,150}+2p_{9,470}+p_{9,337}+p_{9,465}+p_{9,433} \\ &+p_{9,425}+p_{9,105}+p_{9,153}+p_{9,141}+p_{9,493}+p_{9,221}+2p_{9,323} \\ &+p_{9,147}+p_{9,83}+p_{9,251}+2p_{9,7}+2p_{9,47}+p_{9,303}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,65} = \frac{1}{2}p_{9,65} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,65}^2 - 4(2p_{9,152}+2p_{9,132}+p_{9,156}+p_{9,290}+p_{9,178} \\ &+p_{9,170}+p_{9,454}+2p_{9,150}+p_{9,342}+p_{9,17}+p_{9,145}+p_{9,113} \\ &+p_{9,297}+p_{9,105}+p_{9,345}+p_{9,333}+p_{9,173}+p_{9,413}+2p_{9,3} \\ &+p_{9,275}+p_{9,339}+p_{9,443}+2p_{9,199}+p_{9,367}+2p_{9,239}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,577} = \frac{1}{2}p_{9,65} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,65}^2 - 4(2p_{9,152}+2p_{9,132}+p_{9,156}+p_{9,290}+p_{9,178} \\ &+p_{9,170}+p_{9,454}+2p_{9,150}+p_{9,342}+p_{9,17}+p_{9,145}+p_{9,113} \\ &+p_{9,297}+p_{9,105}+p_{9,345}+p_{9,333}+p_{9,173}+p_{9,413}+2p_{9,3} \\ &+p_{9,275}+p_{9,339}+p_{9,443}+2p_{9,199}+p_{9,367}+2p_{9,239}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,321} = \frac{1}{2}p_{9,321} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,321}^2 - 4(2p_{9,408}+2p_{9,388}+p_{9,412}+p_{9,34}+p_{9,434} \\ &+p_{9,426}+p_{9,198}+2p_{9,406}+p_{9,86}+p_{9,273}+p_{9,401}+p_{9,369} \\ &+p_{9,41}+p_{9,361}+p_{9,89}+p_{9,77}+p_{9,429}+p_{9,157}+2p_{9,259} \\ &+p_{9,19}+p_{9,83}+p_{9,187}+2p_{9,455}+p_{9,111}+p_{9,239}+2p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,833} = \frac{1}{2}p_{9,321} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,321}^2 - 4(2p_{9,408}+2p_{9,388}+p_{9,412}+p_{9,34}+p_{9,434} \\ &+p_{9,426}+p_{9,198}+2p_{9,406}+p_{9,86}+p_{9,273}+p_{9,401}+p_{9,369} \\ &+p_{9,41}+p_{9,361}+p_{9,89}+p_{9,77}+p_{9,429}+p_{9,157}+2p_{9,259} \\ &+p_{9,19}+p_{9,83}+p_{9,187}+2p_{9,455}+p_{9,111}+p_{9,239}+2p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,193} = \frac{1}{2}p_{9,193} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,193}^2 - 4(2p_{9,280}+2p_{9,260}+p_{9,284}+p_{9,418}+p_{9,306} \\ &+p_{9,298}+p_{9,70}+2p_{9,278}+p_{9,470}+p_{9,273}+p_{9,145}+p_{9,241} \\ &+p_{9,425}+p_{9,233}+p_{9,473}+p_{9,461}+p_{9,301}+p_{9,29}+2p_{9,131} \\ &+p_{9,403}+p_{9,467}+p_{9,59}+2p_{9,327}+p_{9,111}+2p_{9,367}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,705} = \frac{1}{2}p_{9,193} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,193}^2 - 4(2p_{9,280}+2p_{9,260}+p_{9,284}+p_{9,418}+p_{9,306} \\ &+p_{9,298}+p_{9,70}+2p_{9,278}+p_{9,470}+p_{9,273}+p_{9,145}+p_{9,241} \\ &+p_{9,425}+p_{9,233}+p_{9,473}+p_{9,461}+p_{9,301}+p_{9,29}+2p_{9,131} \\ &+p_{9,403}+p_{9,467}+p_{9,59}+2p_{9,327}+p_{9,111}+2p_{9,367}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,449} = \frac{1}{2}p_{9,449} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,449}^2 - 4(2p_{9,24}+2p_{9,4}+p_{9,28}+p_{9,162}+p_{9,50}+p_{9,42} \\ &+p_{9,326}+2p_{9,22}+p_{9,214}+p_{9,17}+p_{9,401}+p_{9,497}+p_{9,169} \\ &+p_{9,489}+p_{9,217}+p_{9,205}+p_{9,45}+p_{9,285}+2p_{9,387}+p_{9,147} \\ &+p_{9,211}+p_{9,315}+2p_{9,71}+2p_{9,111}+p_{9,367}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,961} = \frac{1}{2}p_{9,449} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,449}^2 - 4(2p_{9,24}+2p_{9,4}+p_{9,28}+p_{9,162}+p_{9,50}+p_{9,42} \\ &+p_{9,326}+2p_{9,22}+p_{9,214}+p_{9,17}+p_{9,401}+p_{9,497}+p_{9,169} \\ &+p_{9,489}+p_{9,217}+p_{9,205}+p_{9,45}+p_{9,285}+2p_{9,387}+p_{9,147} \\ &+p_{9,211}+p_{9,315}+2p_{9,71}+2p_{9,111}+p_{9,367}+p_{9,239}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,289} = \frac{1}{2}p_{9,289} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,289}^2 - 4(2p_{9,376}+2p_{9,356}+p_{9,380}+p_{9,2}+p_{9,402} \\ &+p_{9,394}+p_{9,166}+p_{9,54}+2p_{9,374}+p_{9,337}+p_{9,369}+p_{9,241} \\ &+p_{9,9}+p_{9,329}+p_{9,57}+p_{9,397}+p_{9,45}+p_{9,125}+2p_{9,227} \\ &+p_{9,51}+p_{9,499}+p_{9,155}+2p_{9,423}+p_{9,79}+p_{9,207}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,801} = \frac{1}{2}p_{9,289} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,289}^2 - 4(2p_{9,376}+2p_{9,356}+p_{9,380}+p_{9,2}+p_{9,402} \\ &+p_{9,394}+p_{9,166}+p_{9,54}+2p_{9,374}+p_{9,337}+p_{9,369}+p_{9,241} \\ &+p_{9,9}+p_{9,329}+p_{9,57}+p_{9,397}+p_{9,45}+p_{9,125}+2p_{9,227} \\ &+p_{9,51}+p_{9,499}+p_{9,155}+2p_{9,423}+p_{9,79}+p_{9,207}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,161} = \frac{1}{2}p_{9,161} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,161}^2 - 4(2p_{9,248}+2p_{9,228}+p_{9,252}+p_{9,386}+p_{9,274} \\ &+p_{9,266}+p_{9,38}+p_{9,438}+2p_{9,246}+p_{9,209}+p_{9,113}+p_{9,241} \\ &+p_{9,393}+p_{9,201}+p_{9,441}+p_{9,269}+p_{9,429}+p_{9,509}+2p_{9,99} \\ &+p_{9,435}+p_{9,371}+p_{9,27}+2p_{9,295}+p_{9,79}+2p_{9,335}+p_{9,463}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,417} = \frac{1}{2}p_{9,417} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,417}^2 - 4(2p_{9,504}+2p_{9,484}+p_{9,508}+p_{9,130}+p_{9,18} \\ &+p_{9,10}+p_{9,294}+p_{9,182}+2p_{9,502}+p_{9,465}+p_{9,369}+p_{9,497} \\ &+p_{9,137}+p_{9,457}+p_{9,185}+p_{9,13}+p_{9,173}+p_{9,253}+2p_{9,355} \\ &+p_{9,179}+p_{9,115}+p_{9,283}+2p_{9,39}+2p_{9,79}+p_{9,335}+p_{9,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,929} = \frac{1}{2}p_{9,417} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,417}^2 - 4(2p_{9,504}+2p_{9,484}+p_{9,508}+p_{9,130}+p_{9,18} \\ &+p_{9,10}+p_{9,294}+p_{9,182}+2p_{9,502}+p_{9,465}+p_{9,369}+p_{9,497} \\ &+p_{9,137}+p_{9,457}+p_{9,185}+p_{9,13}+p_{9,173}+p_{9,253}+2p_{9,355} \\ &+p_{9,179}+p_{9,115}+p_{9,283}+2p_{9,39}+2p_{9,79}+p_{9,335}+p_{9,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,97} = \frac{1}{2}p_{9,97} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,97}^2 - 4(2p_{9,184}+2p_{9,164}+p_{9,188}+p_{9,322}+p_{9,210} \\ &+p_{9,202}+p_{9,486}+2p_{9,182}+p_{9,374}+p_{9,145}+p_{9,49}+p_{9,177} \\ &+p_{9,137}+p_{9,329}+p_{9,377}+p_{9,205}+p_{9,365}+p_{9,445}+2p_{9,35} \\ &+p_{9,307}+p_{9,371}+p_{9,475}+2p_{9,231}+p_{9,15}+2p_{9,271}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,609} = \frac{1}{2}p_{9,97} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,97}^2 - 4(2p_{9,184}+2p_{9,164}+p_{9,188}+p_{9,322}+p_{9,210} \\ &+p_{9,202}+p_{9,486}+2p_{9,182}+p_{9,374}+p_{9,145}+p_{9,49}+p_{9,177} \\ &+p_{9,137}+p_{9,329}+p_{9,377}+p_{9,205}+p_{9,365}+p_{9,445}+2p_{9,35} \\ &+p_{9,307}+p_{9,371}+p_{9,475}+2p_{9,231}+p_{9,15}+2p_{9,271}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,353} = \frac{1}{2}p_{9,353} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,353}^2 - 4(2p_{9,440}+2p_{9,420}+p_{9,444}+p_{9,66}+p_{9,466} \\ &+p_{9,458}+p_{9,230}+2p_{9,438}+p_{9,118}+p_{9,401}+p_{9,305}+p_{9,433} \\ &+p_{9,393}+p_{9,73}+p_{9,121}+p_{9,461}+p_{9,109}+p_{9,189}+2p_{9,291} \\ &+p_{9,51}+p_{9,115}+p_{9,219}+2p_{9,487}+2p_{9,15}+p_{9,271}+p_{9,143}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,865} = \frac{1}{2}p_{9,353} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,353}^2 - 4(2p_{9,440}+2p_{9,420}+p_{9,444}+p_{9,66}+p_{9,466} \\ &+p_{9,458}+p_{9,230}+2p_{9,438}+p_{9,118}+p_{9,401}+p_{9,305}+p_{9,433} \\ &+p_{9,393}+p_{9,73}+p_{9,121}+p_{9,461}+p_{9,109}+p_{9,189}+2p_{9,291} \\ &+p_{9,51}+p_{9,115}+p_{9,219}+2p_{9,487}+2p_{9,15}+p_{9,271}+p_{9,143}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,481} = \frac{1}{2}p_{9,481} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,481}^2 - 4(2p_{9,56}+2p_{9,36}+p_{9,60}+p_{9,194}+p_{9,82} \\ &+p_{9,74}+p_{9,358}+2p_{9,54}+p_{9,246}+p_{9,17}+p_{9,49}+p_{9,433} \\ &+p_{9,9}+p_{9,201}+p_{9,249}+p_{9,77}+p_{9,237}+p_{9,317}+2p_{9,419} \\ &+p_{9,179}+p_{9,243}+p_{9,347}+2p_{9,103}+p_{9,271}+2p_{9,143}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,993} = \frac{1}{2}p_{9,481} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,481}^2 - 4(2p_{9,56}+2p_{9,36}+p_{9,60}+p_{9,194}+p_{9,82} \\ &+p_{9,74}+p_{9,358}+2p_{9,54}+p_{9,246}+p_{9,17}+p_{9,49}+p_{9,433} \\ &+p_{9,9}+p_{9,201}+p_{9,249}+p_{9,77}+p_{9,237}+p_{9,317}+2p_{9,419} \\ &+p_{9,179}+p_{9,243}+p_{9,347}+2p_{9,103}+p_{9,271}+2p_{9,143}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,17} = \frac{1}{2}p_{9,17} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,17}^2 - 4(2p_{9,104}+2p_{9,84}+p_{9,108}+p_{9,130}+p_{9,242} \\ &+p_{9,122}+p_{9,294}+2p_{9,102}+p_{9,406}+p_{9,65}+p_{9,97}+p_{9,481} \\ &+p_{9,297}+p_{9,57}+p_{9,249}+p_{9,365}+p_{9,285}+p_{9,125}+p_{9,291} \\ &+p_{9,227}+2p_{9,467}+p_{9,395}+2p_{9,151}+p_{9,319}+2p_{9,191}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,529} = \frac{1}{2}p_{9,17} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,17}^2 - 4(2p_{9,104}+2p_{9,84}+p_{9,108}+p_{9,130}+p_{9,242} \\ &+p_{9,122}+p_{9,294}+2p_{9,102}+p_{9,406}+p_{9,65}+p_{9,97}+p_{9,481} \\ &+p_{9,297}+p_{9,57}+p_{9,249}+p_{9,365}+p_{9,285}+p_{9,125}+p_{9,291} \\ &+p_{9,227}+2p_{9,467}+p_{9,395}+2p_{9,151}+p_{9,319}+2p_{9,191}+p_{9,447}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,785} = \frac{1}{2}p_{9,273} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,273}^2 - 4(2p_{9,360}+2p_{9,340}+p_{9,364}+p_{9,386}+p_{9,498} \\ &+p_{9,378}+p_{9,38}+2p_{9,358}+p_{9,150}+p_{9,321}+p_{9,353}+p_{9,225} \\ &+p_{9,41}+p_{9,313}+p_{9,505}+p_{9,109}+p_{9,29}+p_{9,381}+p_{9,35} \\ &+p_{9,483}+2p_{9,211}+p_{9,139}+2p_{9,407}+p_{9,63}+p_{9,191}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,145} = \frac{1}{2}p_{9,145} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,145}^2 - 4(2p_{9,232}+2p_{9,212}+p_{9,236}+p_{9,258}+p_{9,370} \\ &+p_{9,250}+p_{9,422}+2p_{9,230}+p_{9,22}+p_{9,193}+p_{9,97}+p_{9,225} \\ &+p_{9,425}+p_{9,185}+p_{9,377}+p_{9,493}+p_{9,413}+p_{9,253}+p_{9,419} \\ &+p_{9,355}+2p_{9,83}+p_{9,11}+2p_{9,279}+p_{9,63}+2p_{9,319}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,657} = \frac{1}{2}p_{9,145} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,145}^2 - 4(2p_{9,232}+2p_{9,212}+p_{9,236}+p_{9,258}+p_{9,370} \\ &+p_{9,250}+p_{9,422}+2p_{9,230}+p_{9,22}+p_{9,193}+p_{9,97}+p_{9,225} \\ &+p_{9,425}+p_{9,185}+p_{9,377}+p_{9,493}+p_{9,413}+p_{9,253}+p_{9,419} \\ &+p_{9,355}+2p_{9,83}+p_{9,11}+2p_{9,279}+p_{9,63}+2p_{9,319}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,401} = \frac{1}{2}p_{9,401} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,401}^2 - 4(2p_{9,488}+2p_{9,468}+p_{9,492}+p_{9,2}+p_{9,114} \\ &+p_{9,506}+p_{9,166}+2p_{9,486}+p_{9,278}+p_{9,449}+p_{9,353}+p_{9,481} \\ &+p_{9,169}+p_{9,441}+p_{9,121}+p_{9,237}+p_{9,157}+p_{9,509}+p_{9,163} \\ &+p_{9,99}+2p_{9,339}+p_{9,267}+2p_{9,23}+2p_{9,63}+p_{9,319}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,913} = \frac{1}{2}p_{9,401} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,401}^2 - 4(2p_{9,488}+2p_{9,468}+p_{9,492}+p_{9,2}+p_{9,114} \\ &+p_{9,506}+p_{9,166}+2p_{9,486}+p_{9,278}+p_{9,449}+p_{9,353}+p_{9,481} \\ &+p_{9,169}+p_{9,441}+p_{9,121}+p_{9,237}+p_{9,157}+p_{9,509}+p_{9,163} \\ &+p_{9,99}+2p_{9,339}+p_{9,267}+2p_{9,23}+2p_{9,63}+p_{9,319}+p_{9,191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,593} = \frac{1}{2}p_{9,81} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,81}^2 - 4(2p_{9,168}+2p_{9,148}+p_{9,172}+p_{9,194}+p_{9,306} \\ &+p_{9,186}+2p_{9,166}+p_{9,358}+p_{9,470}+p_{9,129}+p_{9,33}+p_{9,161} \\ &+p_{9,361}+p_{9,313}+p_{9,121}+p_{9,429}+p_{9,349}+p_{9,189}+p_{9,291} \\ &+p_{9,355}+2p_{9,19}+p_{9,459}+2p_{9,215}+p_{9,383}+2p_{9,255}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,337} = \frac{1}{2}p_{9,337} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,337}^2 - 4(2p_{9,424}+2p_{9,404}+p_{9,428}+p_{9,450}+p_{9,50} \\ &+p_{9,442}+2p_{9,422}+p_{9,102}+p_{9,214}+p_{9,385}+p_{9,289}+p_{9,417} \\ &+p_{9,105}+p_{9,57}+p_{9,377}+p_{9,173}+p_{9,93}+p_{9,445}+p_{9,35}+p_{9,99} \\ &+2p_{9,275}+p_{9,203}+2p_{9,471}+p_{9,127}+p_{9,255}+2p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,721} = \frac{1}{2}p_{9,209} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,209}^2 - 4(2p_{9,296}+2p_{9,276}+p_{9,300}+p_{9,322}+p_{9,434} \\ &+p_{9,314}+2p_{9,294}+p_{9,486}+p_{9,86}+p_{9,257}+p_{9,289}+p_{9,161} \\ &+p_{9,489}+p_{9,441}+p_{9,249}+p_{9,45}+p_{9,477}+p_{9,317}+p_{9,419} \\ &+p_{9,483}+2p_{9,147}+p_{9,75}+2p_{9,343}+p_{9,127}+2p_{9,383}+p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{10,305} = \frac{1}{2}p_{9,305} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,305}^2 - 4(2p_{9,392}+2p_{9,372}+p_{9,396}+p_{9,418}+p_{9,18} \\ &+p_{9,410}+2p_{9,390}+p_{9,70}+p_{9,182}+p_{9,257}+p_{9,385}+p_{9,353} \\ &+p_{9,73}+p_{9,25}+p_{9,345}+p_{9,141}+p_{9,413}+p_{9,61}+p_{9,3}+p_{9,67} \\ &+2p_{9,243}+p_{9,171}+2p_{9,439}+p_{9,95}+p_{9,223}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,817} = \frac{1}{2}p_{9,305} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,305}^2 - 4(2p_{9,392}+2p_{9,372}+p_{9,396}+p_{9,418}+p_{9,18} \\ &+p_{9,410}+2p_{9,390}+p_{9,70}+p_{9,182}+p_{9,257}+p_{9,385}+p_{9,353} \\ &+p_{9,73}+p_{9,25}+p_{9,345}+p_{9,141}+p_{9,413}+p_{9,61}+p_{9,3}+p_{9,67} \\ &+2p_{9,243}+p_{9,171}+2p_{9,439}+p_{9,95}+p_{9,223}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,177} = \frac{1}{2}p_{9,177} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,177}^2 - 4(2p_{9,264}+2p_{9,244}+p_{9,268}+p_{9,290}+p_{9,402} \\ &+p_{9,282}+2p_{9,262}+p_{9,454}+p_{9,54}+p_{9,257}+p_{9,129}+p_{9,225} \\ &+p_{9,457}+p_{9,409}+p_{9,217}+p_{9,13}+p_{9,285}+p_{9,445}+p_{9,387} \\ &+p_{9,451}+2p_{9,115}+p_{9,43}+2p_{9,311}+p_{9,95}+2p_{9,351}+p_{9,479}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,433} = \frac{1}{2}p_{9,433} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,433}^2 - 4(2p_{9,8}+2p_{9,500}+p_{9,12}+p_{9,34}+p_{9,146} \\ &+p_{9,26}+2p_{9,6}+p_{9,198}+p_{9,310}+p_{9,1}+p_{9,385}+p_{9,481} \\ &+p_{9,201}+p_{9,153}+p_{9,473}+p_{9,269}+p_{9,29}+p_{9,189}+p_{9,131} \\ &+p_{9,195}+2p_{9,371}+p_{9,299}+2p_{9,55}+2p_{9,95}+p_{9,351}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,945} = \frac{1}{2}p_{9,433} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,433}^2 - 4(2p_{9,8}+2p_{9,500}+p_{9,12}+p_{9,34}+p_{9,146} \\ &+p_{9,26}+2p_{9,6}+p_{9,198}+p_{9,310}+p_{9,1}+p_{9,385}+p_{9,481} \\ &+p_{9,201}+p_{9,153}+p_{9,473}+p_{9,269}+p_{9,29}+p_{9,189}+p_{9,131} \\ &+p_{9,195}+2p_{9,371}+p_{9,299}+2p_{9,55}+2p_{9,95}+p_{9,351}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,113} = \frac{1}{2}p_{9,113} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,113}^2 - 4(2p_{9,200}+2p_{9,180}+p_{9,204}+p_{9,226}+p_{9,338} \\ &+p_{9,218}+p_{9,390}+2p_{9,198}+p_{9,502}+p_{9,65}+p_{9,193}+p_{9,161} \\ &+p_{9,393}+p_{9,153}+p_{9,345}+p_{9,461}+p_{9,221}+p_{9,381}+p_{9,387} \\ &+p_{9,323}+2p_{9,51}+p_{9,491}+2p_{9,247}+p_{9,31}+2p_{9,287}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,625} = \frac{1}{2}p_{9,113} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,113}^2 - 4(2p_{9,200}+2p_{9,180}+p_{9,204}+p_{9,226}+p_{9,338} \\ &+p_{9,218}+p_{9,390}+2p_{9,198}+p_{9,502}+p_{9,65}+p_{9,193}+p_{9,161} \\ &+p_{9,393}+p_{9,153}+p_{9,345}+p_{9,461}+p_{9,221}+p_{9,381}+p_{9,387} \\ &+p_{9,323}+2p_{9,51}+p_{9,491}+2p_{9,247}+p_{9,31}+2p_{9,287}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,369} = \frac{1}{2}p_{9,369} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,369}^2 - 4(2p_{9,456}+2p_{9,436}+p_{9,460}+p_{9,482}+p_{9,82} \\ &+p_{9,474}+p_{9,134}+2p_{9,454}+p_{9,246}+p_{9,321}+p_{9,449}+p_{9,417} \\ &+p_{9,137}+p_{9,409}+p_{9,89}+p_{9,205}+p_{9,477}+p_{9,125}+p_{9,131} \\ &+p_{9,67}+2p_{9,307}+p_{9,235}+2p_{9,503}+2p_{9,31}+p_{9,287}+p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,881} = \frac{1}{2}p_{9,369} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,369}^2 - 4(2p_{9,456}+2p_{9,436}+p_{9,460}+p_{9,482}+p_{9,82} \\ &+p_{9,474}+p_{9,134}+2p_{9,454}+p_{9,246}+p_{9,321}+p_{9,449}+p_{9,417} \\ &+p_{9,137}+p_{9,409}+p_{9,89}+p_{9,205}+p_{9,477}+p_{9,125}+p_{9,131} \\ &+p_{9,67}+2p_{9,307}+p_{9,235}+2p_{9,503}+2p_{9,31}+p_{9,287}+p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,241} = \frac{1}{2}p_{9,241} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,241}^2 - 4(2p_{9,328}+2p_{9,308}+p_{9,332}+p_{9,354}+p_{9,466} \\ &+p_{9,346}+p_{9,6}+2p_{9,326}+p_{9,118}+p_{9,321}+p_{9,193}+p_{9,289} \\ &+p_{9,9}+p_{9,281}+p_{9,473}+p_{9,77}+p_{9,349}+p_{9,509}+p_{9,3}+p_{9,451} \\ &+2p_{9,179}+p_{9,107}+2p_{9,375}+p_{9,31}+p_{9,159}+2p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,753} = \frac{1}{2}p_{9,241} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,241}^2 - 4(2p_{9,328}+2p_{9,308}+p_{9,332}+p_{9,354}+p_{9,466} \\ &+p_{9,346}+p_{9,6}+2p_{9,326}+p_{9,118}+p_{9,321}+p_{9,193}+p_{9,289} \\ &+p_{9,9}+p_{9,281}+p_{9,473}+p_{9,77}+p_{9,349}+p_{9,509}+p_{9,3}+p_{9,451} \\ &+2p_{9,179}+p_{9,107}+2p_{9,375}+p_{9,31}+p_{9,159}+2p_{9,415}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{10,265} = \frac{1}{2}p_{9,265} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,265}^2 - 4(2p_{9,352}+p_{9,356}+2p_{9,332}+p_{9,370}+p_{9,490} \\ &+p_{9,378}+p_{9,142}+p_{9,30}+2p_{9,350}+p_{9,33}+p_{9,305}+p_{9,497} \\ &+p_{9,345}+p_{9,217}+p_{9,313}+p_{9,101}+p_{9,21}+p_{9,373}+p_{9,131} \\ &+2p_{9,203}+p_{9,27}+p_{9,475}+p_{9,55}+p_{9,183}+2p_{9,439}+2p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,777} = \frac{1}{2}p_{9,265} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,265}^2 - 4(2p_{9,352}+p_{9,356}+2p_{9,332}+p_{9,370}+p_{9,490} \\ &+p_{9,378}+p_{9,142}+p_{9,30}+2p_{9,350}+p_{9,33}+p_{9,305}+p_{9,497} \\ &+p_{9,345}+p_{9,217}+p_{9,313}+p_{9,101}+p_{9,21}+p_{9,373}+p_{9,131} \\ &+2p_{9,203}+p_{9,27}+p_{9,475}+p_{9,55}+p_{9,183}+2p_{9,439}+2p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,137} = \frac{1}{2}p_{9,137} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,137}^2 - 4(2p_{9,224}+p_{9,228}+2p_{9,204}+p_{9,242}+p_{9,362} \\ &+p_{9,250}+p_{9,14}+p_{9,414}+2p_{9,222}+p_{9,417}+p_{9,177}+p_{9,369} \\ &+p_{9,89}+p_{9,217}+p_{9,185}+p_{9,485}+p_{9,405}+p_{9,245}+p_{9,3} \\ &+2p_{9,75}+p_{9,411}+p_{9,347}+p_{9,55}+2p_{9,311}+p_{9,439}+2p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,649} = \frac{1}{2}p_{9,137} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,137}^2 - 4(2p_{9,224}+p_{9,228}+2p_{9,204}+p_{9,242}+p_{9,362} \\ &+p_{9,250}+p_{9,14}+p_{9,414}+2p_{9,222}+p_{9,417}+p_{9,177}+p_{9,369} \\ &+p_{9,89}+p_{9,217}+p_{9,185}+p_{9,485}+p_{9,405}+p_{9,245}+p_{9,3} \\ &+2p_{9,75}+p_{9,411}+p_{9,347}+p_{9,55}+2p_{9,311}+p_{9,439}+2p_{9,271}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,393} = \frac{1}{2}p_{9,393} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,393}^2 - 4(2p_{9,480}+p_{9,484}+2p_{9,460}+p_{9,498}+p_{9,106} \\ &+p_{9,506}+p_{9,270}+p_{9,158}+2p_{9,478}+p_{9,161}+p_{9,433}+p_{9,113} \\ &+p_{9,345}+p_{9,473}+p_{9,441}+p_{9,229}+p_{9,149}+p_{9,501}+p_{9,259} \\ &+2p_{9,331}+p_{9,155}+p_{9,91}+2p_{9,55}+p_{9,311}+p_{9,183}+2p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,905} = \frac{1}{2}p_{9,393} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,393}^2 - 4(2p_{9,480}+p_{9,484}+2p_{9,460}+p_{9,498}+p_{9,106} \\ &+p_{9,506}+p_{9,270}+p_{9,158}+2p_{9,478}+p_{9,161}+p_{9,433}+p_{9,113} \\ &+p_{9,345}+p_{9,473}+p_{9,441}+p_{9,229}+p_{9,149}+p_{9,501}+p_{9,259} \\ &+2p_{9,331}+p_{9,155}+p_{9,91}+2p_{9,55}+p_{9,311}+p_{9,183}+2p_{9,15}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,585} = \frac{1}{2}p_{9,73} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,73}^2 - 4(2p_{9,160}+p_{9,164}+2p_{9,140}+p_{9,178}+p_{9,298} \\ &+p_{9,186}+p_{9,462}+2p_{9,158}+p_{9,350}+p_{9,353}+p_{9,305}+p_{9,113} \\ &+p_{9,25}+p_{9,153}+p_{9,121}+p_{9,421}+p_{9,341}+p_{9,181}+p_{9,451} \\ &+2p_{9,11}+p_{9,283}+p_{9,347}+p_{9,375}+2p_{9,247}+p_{9,503}+2p_{9,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,329} = \frac{1}{2}p_{9,329} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,329}^2 - 4(2p_{9,416}+p_{9,420}+2p_{9,396}+p_{9,434}+p_{9,42} \\ &+p_{9,442}+p_{9,206}+2p_{9,414}+p_{9,94}+p_{9,97}+p_{9,49}+p_{9,369} \\ &+p_{9,281}+p_{9,409}+p_{9,377}+p_{9,165}+p_{9,85}+p_{9,437}+p_{9,195} \\ &+2p_{9,267}+p_{9,27}+p_{9,91}+p_{9,119}+p_{9,247}+2p_{9,503}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,841} = \frac{1}{2}p_{9,329} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,329}^2 - 4(2p_{9,416}+p_{9,420}+2p_{9,396}+p_{9,434}+p_{9,42} \\ &+p_{9,442}+p_{9,206}+2p_{9,414}+p_{9,94}+p_{9,97}+p_{9,49}+p_{9,369} \\ &+p_{9,281}+p_{9,409}+p_{9,377}+p_{9,165}+p_{9,85}+p_{9,437}+p_{9,195} \\ &+2p_{9,267}+p_{9,27}+p_{9,91}+p_{9,119}+p_{9,247}+2p_{9,503}+2p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,201} = \frac{1}{2}p_{9,201} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,201}^2 - 4(2p_{9,288}+p_{9,292}+2p_{9,268}+p_{9,306}+p_{9,426} \\ &+p_{9,314}+p_{9,78}+2p_{9,286}+p_{9,478}+p_{9,481}+p_{9,433}+p_{9,241} \\ &+p_{9,281}+p_{9,153}+p_{9,249}+p_{9,37}+p_{9,469}+p_{9,309}+p_{9,67} \\ &+2p_{9,139}+p_{9,411}+p_{9,475}+p_{9,119}+2p_{9,375}+p_{9,503}+2p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,713} = \frac{1}{2}p_{9,201} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,201}^2 - 4(2p_{9,288}+p_{9,292}+2p_{9,268}+p_{9,306}+p_{9,426} \\ &+p_{9,314}+p_{9,78}+2p_{9,286}+p_{9,478}+p_{9,481}+p_{9,433}+p_{9,241} \\ &+p_{9,281}+p_{9,153}+p_{9,249}+p_{9,37}+p_{9,469}+p_{9,309}+p_{9,67} \\ &+2p_{9,139}+p_{9,411}+p_{9,475}+p_{9,119}+2p_{9,375}+p_{9,503}+2p_{9,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,457} = \frac{1}{2}p_{9,457} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,457}^2 - 4(2p_{9,32}+p_{9,36}+2p_{9,12}+p_{9,50}+p_{9,170}+p_{9,58} \\ &+p_{9,334}+2p_{9,30}+p_{9,222}+p_{9,225}+p_{9,177}+p_{9,497}+p_{9,25} \\ &+p_{9,409}+p_{9,505}+p_{9,293}+p_{9,213}+p_{9,53}+p_{9,323}+2p_{9,395} \\ &+p_{9,155}+p_{9,219}+2p_{9,119}+p_{9,375}+p_{9,247}+2p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,969} = \frac{1}{2}p_{9,457} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,457}^2 - 4(2p_{9,32}+p_{9,36}+2p_{9,12}+p_{9,50}+p_{9,170}+p_{9,58} \\ &+p_{9,334}+2p_{9,30}+p_{9,222}+p_{9,225}+p_{9,177}+p_{9,497}+p_{9,25} \\ &+p_{9,409}+p_{9,505}+p_{9,293}+p_{9,213}+p_{9,53}+p_{9,323}+2p_{9,395} \\ &+p_{9,155}+p_{9,219}+2p_{9,119}+p_{9,375}+p_{9,247}+2p_{9,79}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,41} = \frac{1}{2}p_{9,41} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,41}^2 - 4(2p_{9,128}+p_{9,132}+2p_{9,108}+p_{9,146}+p_{9,266} \\ &+p_{9,154}+p_{9,430}+p_{9,318}+2p_{9,126}+p_{9,321}+p_{9,273}+p_{9,81} \\ &+p_{9,89}+p_{9,121}+p_{9,505}+p_{9,389}+p_{9,149}+p_{9,309}+p_{9,419} \\ &+2p_{9,491}+p_{9,315}+p_{9,251}+p_{9,343}+2p_{9,215}+p_{9,471}+2p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,553} = \frac{1}{2}p_{9,41} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,41}^2 - 4(2p_{9,128}+p_{9,132}+2p_{9,108}+p_{9,146}+p_{9,266} \\ &+p_{9,154}+p_{9,430}+p_{9,318}+2p_{9,126}+p_{9,321}+p_{9,273}+p_{9,81} \\ &+p_{9,89}+p_{9,121}+p_{9,505}+p_{9,389}+p_{9,149}+p_{9,309}+p_{9,419} \\ &+2p_{9,491}+p_{9,315}+p_{9,251}+p_{9,343}+2p_{9,215}+p_{9,471}+2p_{9,175}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,809} = \frac{1}{2}p_{9,297} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,297}^2 - 4(2p_{9,384}+p_{9,388}+2p_{9,364}+p_{9,402}+p_{9,10} \\ &+p_{9,410}+p_{9,174}+p_{9,62}+2p_{9,382}+p_{9,65}+p_{9,17}+p_{9,337} \\ &+p_{9,345}+p_{9,377}+p_{9,249}+p_{9,133}+p_{9,405}+p_{9,53}+p_{9,163} \\ &+2p_{9,235}+p_{9,59}+p_{9,507}+p_{9,87}+p_{9,215}+2p_{9,471}+2p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,169} = \frac{1}{2}p_{9,169} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,169}^2 - 4(2p_{9,256}+p_{9,260}+2p_{9,236}+p_{9,274}+p_{9,394} \\ &+p_{9,282}+p_{9,46}+p_{9,446}+2p_{9,254}+p_{9,449}+p_{9,401}+p_{9,209} \\ &+p_{9,217}+p_{9,121}+p_{9,249}+p_{9,5}+p_{9,277}+p_{9,437}+p_{9,35} \\ &+2p_{9,107}+p_{9,443}+p_{9,379}+p_{9,87}+2p_{9,343}+p_{9,471}+2p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,681} = \frac{1}{2}p_{9,169} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,169}^2 - 4(2p_{9,256}+p_{9,260}+2p_{9,236}+p_{9,274}+p_{9,394} \\ &+p_{9,282}+p_{9,46}+p_{9,446}+2p_{9,254}+p_{9,449}+p_{9,401}+p_{9,209} \\ &+p_{9,217}+p_{9,121}+p_{9,249}+p_{9,5}+p_{9,277}+p_{9,437}+p_{9,35} \\ &+2p_{9,107}+p_{9,443}+p_{9,379}+p_{9,87}+2p_{9,343}+p_{9,471}+2p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,425} = \frac{1}{2}p_{9,425} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,425}^2 - 4(2p_{9,0}+p_{9,4}+2p_{9,492}+p_{9,18}+p_{9,138}+p_{9,26} \\ &+p_{9,302}+p_{9,190}+2p_{9,510}+p_{9,193}+p_{9,145}+p_{9,465}+p_{9,473} \\ &+p_{9,377}+p_{9,505}+p_{9,261}+p_{9,21}+p_{9,181}+p_{9,291}+2p_{9,363} \\ &+p_{9,187}+p_{9,123}+2p_{9,87}+p_{9,343}+p_{9,215}+2p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,937} = \frac{1}{2}p_{9,425} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,425}^2 - 4(2p_{9,0}+p_{9,4}+2p_{9,492}+p_{9,18}+p_{9,138}+p_{9,26} \\ &+p_{9,302}+p_{9,190}+2p_{9,510}+p_{9,193}+p_{9,145}+p_{9,465}+p_{9,473} \\ &+p_{9,377}+p_{9,505}+p_{9,261}+p_{9,21}+p_{9,181}+p_{9,291}+2p_{9,363} \\ &+p_{9,187}+p_{9,123}+2p_{9,87}+p_{9,343}+p_{9,215}+2p_{9,47}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,617} = \frac{1}{2}p_{9,105} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,105}^2 - 4(2p_{9,192}+p_{9,196}+2p_{9,172}+p_{9,210}+p_{9,330} \\ &+p_{9,218}+p_{9,494}+2p_{9,190}+p_{9,382}+p_{9,385}+p_{9,145}+p_{9,337} \\ &+p_{9,153}+p_{9,57}+p_{9,185}+p_{9,453}+p_{9,213}+p_{9,373}+p_{9,483} \\ &+2p_{9,43}+p_{9,315}+p_{9,379}+p_{9,23}+2p_{9,279}+p_{9,407}+2p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,361} = \frac{1}{2}p_{9,361} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,361}^2 - 4(2p_{9,448}+p_{9,452}+2p_{9,428}+p_{9,466}+p_{9,74} \\ &+p_{9,474}+p_{9,238}+2p_{9,446}+p_{9,126}+p_{9,129}+p_{9,401}+p_{9,81} \\ &+p_{9,409}+p_{9,313}+p_{9,441}+p_{9,197}+p_{9,469}+p_{9,117}+p_{9,227} \\ &+2p_{9,299}+p_{9,59}+p_{9,123}+2p_{9,23}+p_{9,279}+p_{9,151}+2p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,873} = \frac{1}{2}p_{9,361} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,361}^2 - 4(2p_{9,448}+p_{9,452}+2p_{9,428}+p_{9,466}+p_{9,74} \\ &+p_{9,474}+p_{9,238}+2p_{9,446}+p_{9,126}+p_{9,129}+p_{9,401}+p_{9,81} \\ &+p_{9,409}+p_{9,313}+p_{9,441}+p_{9,197}+p_{9,469}+p_{9,117}+p_{9,227} \\ &+2p_{9,299}+p_{9,59}+p_{9,123}+2p_{9,23}+p_{9,279}+p_{9,151}+2p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,233} = \frac{1}{2}p_{9,233} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,233}^2 - 4(2p_{9,320}+p_{9,324}+2p_{9,300}+p_{9,338}+p_{9,458} \\ &+p_{9,346}+p_{9,110}+2p_{9,318}+p_{9,510}+p_{9,1}+p_{9,273}+p_{9,465} \\ &+p_{9,281}+p_{9,313}+p_{9,185}+p_{9,69}+p_{9,341}+p_{9,501}+p_{9,99} \\ &+2p_{9,171}+p_{9,443}+p_{9,507}+p_{9,23}+p_{9,151}+2p_{9,407}+2p_{9,367}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,489} = \frac{1}{2}p_{9,489} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,489}^2 - 4(2p_{9,64}+p_{9,68}+2p_{9,44}+p_{9,82}+p_{9,202}+p_{9,90} \\ &+p_{9,366}+2p_{9,62}+p_{9,254}+p_{9,257}+p_{9,17}+p_{9,209}+p_{9,25} \\ &+p_{9,57}+p_{9,441}+p_{9,325}+p_{9,85}+p_{9,245}+p_{9,355}+2p_{9,427} \\ &+p_{9,187}+p_{9,251}+p_{9,279}+2p_{9,151}+p_{9,407}+2p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1001} = \frac{1}{2}p_{9,489} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,489}^2 - 4(2p_{9,64}+p_{9,68}+2p_{9,44}+p_{9,82}+p_{9,202}+p_{9,90} \\ &+p_{9,366}+2p_{9,62}+p_{9,254}+p_{9,257}+p_{9,17}+p_{9,209}+p_{9,25} \\ &+p_{9,57}+p_{9,441}+p_{9,325}+p_{9,85}+p_{9,245}+p_{9,355}+2p_{9,427} \\ &+p_{9,187}+p_{9,251}+p_{9,279}+2p_{9,151}+p_{9,407}+2p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,25} = \frac{1}{2}p_{9,25} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,25}^2 - 4(2p_{9,112}+p_{9,116}+2p_{9,92}+p_{9,130}+p_{9,138} \\ &+p_{9,250}+p_{9,302}+2p_{9,110}+p_{9,414}+p_{9,257}+p_{9,65}+p_{9,305} \\ &+p_{9,73}+p_{9,105}+p_{9,489}+p_{9,133}+p_{9,293}+p_{9,373}+p_{9,403} \\ &+p_{9,299}+p_{9,235}+2p_{9,475}+p_{9,327}+2p_{9,199}+p_{9,455}+2p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,537} = \frac{1}{2}p_{9,25} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,25}^2 - 4(2p_{9,112}+p_{9,116}+2p_{9,92}+p_{9,130}+p_{9,138} \\ &+p_{9,250}+p_{9,302}+2p_{9,110}+p_{9,414}+p_{9,257}+p_{9,65}+p_{9,305} \\ &+p_{9,73}+p_{9,105}+p_{9,489}+p_{9,133}+p_{9,293}+p_{9,373}+p_{9,403} \\ &+p_{9,299}+p_{9,235}+2p_{9,475}+p_{9,327}+2p_{9,199}+p_{9,455}+2p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,281} = \frac{1}{2}p_{9,281} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,281}^2 - 4(2p_{9,368}+p_{9,372}+2p_{9,348}+p_{9,386}+p_{9,394} \\ &+p_{9,506}+p_{9,46}+2p_{9,366}+p_{9,158}+p_{9,1}+p_{9,321}+p_{9,49} \\ &+p_{9,329}+p_{9,361}+p_{9,233}+p_{9,389}+p_{9,37}+p_{9,117}+p_{9,147} \\ &+p_{9,43}+p_{9,491}+2p_{9,219}+p_{9,71}+p_{9,199}+2p_{9,455}+2p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,793} = \frac{1}{2}p_{9,281} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,281}^2 - 4(2p_{9,368}+p_{9,372}+2p_{9,348}+p_{9,386}+p_{9,394} \\ &+p_{9,506}+p_{9,46}+2p_{9,366}+p_{9,158}+p_{9,1}+p_{9,321}+p_{9,49} \\ &+p_{9,329}+p_{9,361}+p_{9,233}+p_{9,389}+p_{9,37}+p_{9,117}+p_{9,147} \\ &+p_{9,43}+p_{9,491}+2p_{9,219}+p_{9,71}+p_{9,199}+2p_{9,455}+2p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,153} = \frac{1}{2}p_{9,153} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,153}^2 - 4(2p_{9,240}+p_{9,244}+2p_{9,220}+p_{9,258}+p_{9,266} \\ &+p_{9,378}+p_{9,430}+2p_{9,238}+p_{9,30}+p_{9,385}+p_{9,193}+p_{9,433} \\ &+p_{9,201}+p_{9,105}+p_{9,233}+p_{9,261}+p_{9,421}+p_{9,501}+p_{9,19} \\ &+p_{9,427}+p_{9,363}+2p_{9,91}+p_{9,71}+2p_{9,327}+p_{9,455}+2p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,665} = \frac{1}{2}p_{9,153} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,153}^2 - 4(2p_{9,240}+p_{9,244}+2p_{9,220}+p_{9,258}+p_{9,266} \\ &+p_{9,378}+p_{9,430}+2p_{9,238}+p_{9,30}+p_{9,385}+p_{9,193}+p_{9,433} \\ &+p_{9,201}+p_{9,105}+p_{9,233}+p_{9,261}+p_{9,421}+p_{9,501}+p_{9,19} \\ &+p_{9,427}+p_{9,363}+2p_{9,91}+p_{9,71}+2p_{9,327}+p_{9,455}+2p_{9,287}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,89} = \frac{1}{2}p_{9,89} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,89}^2 - 4(2p_{9,176}+p_{9,180}+2p_{9,156}+p_{9,194}+p_{9,202} \\ &+p_{9,314}+2p_{9,174}+p_{9,366}+p_{9,478}+p_{9,129}+p_{9,321}+p_{9,369} \\ &+p_{9,137}+p_{9,41}+p_{9,169}+p_{9,197}+p_{9,357}+p_{9,437}+p_{9,467} \\ &+p_{9,299}+p_{9,363}+2p_{9,27}+p_{9,7}+2p_{9,263}+p_{9,391}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,601} = \frac{1}{2}p_{9,89} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,89}^2 - 4(2p_{9,176}+p_{9,180}+2p_{9,156}+p_{9,194}+p_{9,202} \\ &+p_{9,314}+2p_{9,174}+p_{9,366}+p_{9,478}+p_{9,129}+p_{9,321}+p_{9,369} \\ &+p_{9,137}+p_{9,41}+p_{9,169}+p_{9,197}+p_{9,357}+p_{9,437}+p_{9,467} \\ &+p_{9,299}+p_{9,363}+2p_{9,27}+p_{9,7}+2p_{9,263}+p_{9,391}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,345} = \frac{1}{2}p_{9,345} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,345}^2 - 4(2p_{9,432}+p_{9,436}+2p_{9,412}+p_{9,450}+p_{9,458} \\ &+p_{9,58}+2p_{9,430}+p_{9,110}+p_{9,222}+p_{9,385}+p_{9,65}+p_{9,113} \\ &+p_{9,393}+p_{9,297}+p_{9,425}+p_{9,453}+p_{9,101}+p_{9,181}+p_{9,211} \\ &+p_{9,43}+p_{9,107}+2p_{9,283}+2p_{9,7}+p_{9,263}+p_{9,135}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,857} = \frac{1}{2}p_{9,345} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,345}^2 - 4(2p_{9,432}+p_{9,436}+2p_{9,412}+p_{9,450}+p_{9,458} \\ &+p_{9,58}+2p_{9,430}+p_{9,110}+p_{9,222}+p_{9,385}+p_{9,65}+p_{9,113} \\ &+p_{9,393}+p_{9,297}+p_{9,425}+p_{9,453}+p_{9,101}+p_{9,181}+p_{9,211} \\ &+p_{9,43}+p_{9,107}+2p_{9,283}+2p_{9,7}+p_{9,263}+p_{9,135}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,217} = \frac{1}{2}p_{9,217} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,217}^2 - 4(2p_{9,304}+p_{9,308}+2p_{9,284}+p_{9,322}+p_{9,330} \\ &+p_{9,442}+2p_{9,302}+p_{9,494}+p_{9,94}+p_{9,257}+p_{9,449}+p_{9,497} \\ &+p_{9,265}+p_{9,297}+p_{9,169}+p_{9,325}+p_{9,485}+p_{9,53}+p_{9,83} \\ &+p_{9,427}+p_{9,491}+2p_{9,155}+p_{9,7}+p_{9,135}+2p_{9,391}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,729} = \frac{1}{2}p_{9,217} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,217}^2 - 4(2p_{9,304}+p_{9,308}+2p_{9,284}+p_{9,322}+p_{9,330} \\ &+p_{9,442}+2p_{9,302}+p_{9,494}+p_{9,94}+p_{9,257}+p_{9,449}+p_{9,497} \\ &+p_{9,265}+p_{9,297}+p_{9,169}+p_{9,325}+p_{9,485}+p_{9,53}+p_{9,83} \\ &+p_{9,427}+p_{9,491}+2p_{9,155}+p_{9,7}+p_{9,135}+2p_{9,391}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,473} = \frac{1}{2}p_{9,473} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,473}^2 - 4(2p_{9,48}+p_{9,52}+2p_{9,28}+p_{9,66}+p_{9,74} \\ &+p_{9,186}+2p_{9,46}+p_{9,238}+p_{9,350}+p_{9,1}+p_{9,193}+p_{9,241} \\ &+p_{9,9}+p_{9,41}+p_{9,425}+p_{9,69}+p_{9,229}+p_{9,309}+p_{9,339} \\ &+p_{9,171}+p_{9,235}+2p_{9,411}+p_{9,263}+2p_{9,135}+p_{9,391}+2p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,985} = \frac{1}{2}p_{9,473} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,473}^2 - 4(2p_{9,48}+p_{9,52}+2p_{9,28}+p_{9,66}+p_{9,74} \\ &+p_{9,186}+2p_{9,46}+p_{9,238}+p_{9,350}+p_{9,1}+p_{9,193}+p_{9,241} \\ &+p_{9,9}+p_{9,41}+p_{9,425}+p_{9,69}+p_{9,229}+p_{9,309}+p_{9,339} \\ &+p_{9,171}+p_{9,235}+2p_{9,411}+p_{9,263}+2p_{9,135}+p_{9,391}+2p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,57} = \frac{1}{2}p_{9,57} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,57}^2 - 4(2p_{9,144}+p_{9,148}+2p_{9,124}+p_{9,162}+p_{9,170} \\ &+p_{9,282}+2p_{9,142}+p_{9,334}+p_{9,446}+p_{9,289}+p_{9,97}+p_{9,337} \\ &+p_{9,9}+p_{9,137}+p_{9,105}+p_{9,325}+p_{9,165}+p_{9,405}+p_{9,435} \\ &+p_{9,267}+p_{9,331}+2p_{9,507}+p_{9,359}+2p_{9,231}+p_{9,487}+2p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,569} = \frac{1}{2}p_{9,57} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,57}^2 - 4(2p_{9,144}+p_{9,148}+2p_{9,124}+p_{9,162}+p_{9,170} \\ &+p_{9,282}+2p_{9,142}+p_{9,334}+p_{9,446}+p_{9,289}+p_{9,97}+p_{9,337} \\ &+p_{9,9}+p_{9,137}+p_{9,105}+p_{9,325}+p_{9,165}+p_{9,405}+p_{9,435} \\ &+p_{9,267}+p_{9,331}+2p_{9,507}+p_{9,359}+2p_{9,231}+p_{9,487}+2p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,313} = \frac{1}{2}p_{9,313} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,313}^2 - 4(2p_{9,400}+p_{9,404}+2p_{9,380}+p_{9,418}+p_{9,426} \\ &+p_{9,26}+2p_{9,398}+p_{9,78}+p_{9,190}+p_{9,33}+p_{9,353}+p_{9,81} \\ &+p_{9,265}+p_{9,393}+p_{9,361}+p_{9,69}+p_{9,421}+p_{9,149}+p_{9,179} \\ &+p_{9,11}+p_{9,75}+2p_{9,251}+p_{9,103}+p_{9,231}+2p_{9,487}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,825} = \frac{1}{2}p_{9,313} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,313}^2 - 4(2p_{9,400}+p_{9,404}+2p_{9,380}+p_{9,418}+p_{9,426} \\ &+p_{9,26}+2p_{9,398}+p_{9,78}+p_{9,190}+p_{9,33}+p_{9,353}+p_{9,81} \\ &+p_{9,265}+p_{9,393}+p_{9,361}+p_{9,69}+p_{9,421}+p_{9,149}+p_{9,179} \\ &+p_{9,11}+p_{9,75}+2p_{9,251}+p_{9,103}+p_{9,231}+2p_{9,487}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,185} = \frac{1}{2}p_{9,185} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,185}^2 - 4(2p_{9,272}+p_{9,276}+2p_{9,252}+p_{9,290}+p_{9,298} \\ &+p_{9,410}+2p_{9,270}+p_{9,462}+p_{9,62}+p_{9,417}+p_{9,225}+p_{9,465} \\ &+p_{9,265}+p_{9,137}+p_{9,233}+p_{9,453}+p_{9,293}+p_{9,21}+p_{9,51} \\ &+p_{9,395}+p_{9,459}+2p_{9,123}+p_{9,103}+2p_{9,359}+p_{9,487}+2p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,697} = \frac{1}{2}p_{9,185} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,185}^2 - 4(2p_{9,272}+p_{9,276}+2p_{9,252}+p_{9,290}+p_{9,298} \\ &+p_{9,410}+2p_{9,270}+p_{9,462}+p_{9,62}+p_{9,417}+p_{9,225}+p_{9,465} \\ &+p_{9,265}+p_{9,137}+p_{9,233}+p_{9,453}+p_{9,293}+p_{9,21}+p_{9,51} \\ &+p_{9,395}+p_{9,459}+2p_{9,123}+p_{9,103}+2p_{9,359}+p_{9,487}+2p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,441} = \frac{1}{2}p_{9,441} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,441}^2 - 4(2p_{9,16}+p_{9,20}+2p_{9,508}+p_{9,34}+p_{9,42} \\ &+p_{9,154}+2p_{9,14}+p_{9,206}+p_{9,318}+p_{9,161}+p_{9,481}+p_{9,209} \\ &+p_{9,9}+p_{9,393}+p_{9,489}+p_{9,197}+p_{9,37}+p_{9,277}+p_{9,307} \\ &+p_{9,139}+p_{9,203}+2p_{9,379}+2p_{9,103}+p_{9,359}+p_{9,231}+2p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,953} = \frac{1}{2}p_{9,441} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,441}^2 - 4(2p_{9,16}+p_{9,20}+2p_{9,508}+p_{9,34}+p_{9,42} \\ &+p_{9,154}+2p_{9,14}+p_{9,206}+p_{9,318}+p_{9,161}+p_{9,481}+p_{9,209} \\ &+p_{9,9}+p_{9,393}+p_{9,489}+p_{9,197}+p_{9,37}+p_{9,277}+p_{9,307} \\ &+p_{9,139}+p_{9,203}+2p_{9,379}+2p_{9,103}+p_{9,359}+p_{9,231}+2p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,121} = \frac{1}{2}p_{9,121} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,121}^2 - 4(2p_{9,208}+p_{9,212}+2p_{9,188}+p_{9,226}+p_{9,234} \\ &+p_{9,346}+p_{9,398}+2p_{9,206}+p_{9,510}+p_{9,161}+p_{9,353}+p_{9,401} \\ &+p_{9,73}+p_{9,201}+p_{9,169}+p_{9,389}+p_{9,229}+p_{9,469}+p_{9,499} \\ &+p_{9,395}+p_{9,331}+2p_{9,59}+p_{9,39}+2p_{9,295}+p_{9,423}+2p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,377} = \frac{1}{2}p_{9,377} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,377}^2 - 4(2p_{9,464}+p_{9,468}+2p_{9,444}+p_{9,482}+p_{9,490} \\ &+p_{9,90}+p_{9,142}+2p_{9,462}+p_{9,254}+p_{9,417}+p_{9,97}+p_{9,145} \\ &+p_{9,329}+p_{9,457}+p_{9,425}+p_{9,133}+p_{9,485}+p_{9,213}+p_{9,243} \\ &+p_{9,139}+p_{9,75}+2p_{9,315}+2p_{9,39}+p_{9,295}+p_{9,167}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,889} = \frac{1}{2}p_{9,377} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,377}^2 - 4(2p_{9,464}+p_{9,468}+2p_{9,444}+p_{9,482}+p_{9,490} \\ &+p_{9,90}+p_{9,142}+2p_{9,462}+p_{9,254}+p_{9,417}+p_{9,97}+p_{9,145} \\ &+p_{9,329}+p_{9,457}+p_{9,425}+p_{9,133}+p_{9,485}+p_{9,213}+p_{9,243} \\ &+p_{9,139}+p_{9,75}+2p_{9,315}+2p_{9,39}+p_{9,295}+p_{9,167}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,249} = \frac{1}{2}p_{9,249} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,249}^2 - 4(2p_{9,336}+p_{9,340}+2p_{9,316}+p_{9,354}+p_{9,362} \\ &+p_{9,474}+p_{9,14}+2p_{9,334}+p_{9,126}+p_{9,289}+p_{9,481}+p_{9,17} \\ &+p_{9,329}+p_{9,201}+p_{9,297}+p_{9,5}+p_{9,357}+p_{9,85}+p_{9,115} \\ &+p_{9,11}+p_{9,459}+2p_{9,187}+p_{9,39}+p_{9,167}+2p_{9,423}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,761} = \frac{1}{2}p_{9,249} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,249}^2 - 4(2p_{9,336}+p_{9,340}+2p_{9,316}+p_{9,354}+p_{9,362} \\ &+p_{9,474}+p_{9,14}+2p_{9,334}+p_{9,126}+p_{9,289}+p_{9,481}+p_{9,17} \\ &+p_{9,329}+p_{9,201}+p_{9,297}+p_{9,5}+p_{9,357}+p_{9,85}+p_{9,115} \\ &+p_{9,11}+p_{9,459}+2p_{9,187}+p_{9,39}+p_{9,167}+2p_{9,423}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,505} = \frac{1}{2}p_{9,505} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,505}^2 - 4(2p_{9,80}+p_{9,84}+2p_{9,60}+p_{9,98}+p_{9,106} \\ &+p_{9,218}+p_{9,270}+2p_{9,78}+p_{9,382}+p_{9,33}+p_{9,225}+p_{9,273} \\ &+p_{9,73}+p_{9,457}+p_{9,41}+p_{9,261}+p_{9,101}+p_{9,341}+p_{9,371} \\ &+p_{9,267}+p_{9,203}+2p_{9,443}+p_{9,295}+2p_{9,167}+p_{9,423}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1017} = \frac{1}{2}p_{9,505} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,505}^2 - 4(2p_{9,80}+p_{9,84}+2p_{9,60}+p_{9,98}+p_{9,106} \\ &+p_{9,218}+p_{9,270}+2p_{9,78}+p_{9,382}+p_{9,33}+p_{9,225}+p_{9,273} \\ &+p_{9,73}+p_{9,457}+p_{9,41}+p_{9,261}+p_{9,101}+p_{9,341}+p_{9,371} \\ &+p_{9,267}+p_{9,203}+2p_{9,443}+p_{9,295}+2p_{9,167}+p_{9,423}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,5} = \frac{1}{2}p_{9,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,5}^2 - 4(p_{9,96}+2p_{9,72}+2p_{9,92}+p_{9,394}+p_{9,282}+2p_{9,90} \\ &+p_{9,230}+p_{9,118}+p_{9,110}+p_{9,353}+p_{9,273}+p_{9,113}+p_{9,85} \\ &+p_{9,469}+p_{9,53}+p_{9,45}+p_{9,237}+p_{9,285}+p_{9,307}+2p_{9,179} \\ &+p_{9,435}+2p_{9,139}+2p_{9,455}+p_{9,279}+p_{9,215}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,517} = \frac{1}{2}p_{9,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,5}^2 - 4(p_{9,96}+2p_{9,72}+2p_{9,92}+p_{9,394}+p_{9,282}+2p_{9,90} \\ &+p_{9,230}+p_{9,118}+p_{9,110}+p_{9,353}+p_{9,273}+p_{9,113}+p_{9,85} \\ &+p_{9,469}+p_{9,53}+p_{9,45}+p_{9,237}+p_{9,285}+p_{9,307}+2p_{9,179} \\ &+p_{9,435}+2p_{9,139}+2p_{9,455}+p_{9,279}+p_{9,215}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,261} = \frac{1}{2}p_{9,261} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,261}^2 - 4(p_{9,352}+2p_{9,328}+2p_{9,348}+p_{9,138}+p_{9,26} \\ &+2p_{9,346}+p_{9,486}+p_{9,374}+p_{9,366}+p_{9,97}+p_{9,17}+p_{9,369} \\ &+p_{9,341}+p_{9,213}+p_{9,309}+p_{9,301}+p_{9,493}+p_{9,29}+p_{9,51} \\ &+p_{9,179}+2p_{9,435}+2p_{9,395}+2p_{9,199}+p_{9,23}+p_{9,471}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,773} = \frac{1}{2}p_{9,261} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,261}^2 - 4(p_{9,352}+2p_{9,328}+2p_{9,348}+p_{9,138}+p_{9,26} \\ &+2p_{9,346}+p_{9,486}+p_{9,374}+p_{9,366}+p_{9,97}+p_{9,17}+p_{9,369} \\ &+p_{9,341}+p_{9,213}+p_{9,309}+p_{9,301}+p_{9,493}+p_{9,29}+p_{9,51} \\ &+p_{9,179}+2p_{9,435}+2p_{9,395}+2p_{9,199}+p_{9,23}+p_{9,471}+p_{9,127}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,645} = \frac{1}{2}p_{9,133} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,133}^2 - 4(p_{9,224}+2p_{9,200}+2p_{9,220}+p_{9,10}+p_{9,410} \\ &+2p_{9,218}+p_{9,358}+p_{9,246}+p_{9,238}+p_{9,481}+p_{9,401}+p_{9,241} \\ &+p_{9,85}+p_{9,213}+p_{9,181}+p_{9,173}+p_{9,365}+p_{9,413}+p_{9,51} \\ &+2p_{9,307}+p_{9,435}+2p_{9,267}+2p_{9,71}+p_{9,407}+p_{9,343}+p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,901} = \frac{1}{2}p_{9,389} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,389}^2 - 4(p_{9,480}+2p_{9,456}+2p_{9,476}+p_{9,266}+p_{9,154} \\ &+2p_{9,474}+p_{9,102}+p_{9,502}+p_{9,494}+p_{9,225}+p_{9,145}+p_{9,497} \\ &+p_{9,341}+p_{9,469}+p_{9,437}+p_{9,429}+p_{9,109}+p_{9,157}+2p_{9,51} \\ &+p_{9,307}+p_{9,179}+2p_{9,11}+2p_{9,327}+p_{9,151}+p_{9,87}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,69} = \frac{1}{2}p_{9,69} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,69}^2 - 4(p_{9,160}+2p_{9,136}+2p_{9,156}+p_{9,458}+2p_{9,154} \\ &+p_{9,346}+p_{9,294}+p_{9,182}+p_{9,174}+p_{9,417}+p_{9,337}+p_{9,177} \\ &+p_{9,21}+p_{9,149}+p_{9,117}+p_{9,301}+p_{9,109}+p_{9,349}+p_{9,371} \\ &+2p_{9,243}+p_{9,499}+2p_{9,203}+2p_{9,7}+p_{9,279}+p_{9,343}+p_{9,447}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,325} = \frac{1}{2}p_{9,325} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,325}^2 - 4(p_{9,416}+2p_{9,392}+2p_{9,412}+p_{9,202}+2p_{9,410} \\ &+p_{9,90}+p_{9,38}+p_{9,438}+p_{9,430}+p_{9,161}+p_{9,81}+p_{9,433} \\ &+p_{9,277}+p_{9,405}+p_{9,373}+p_{9,45}+p_{9,365}+p_{9,93}+p_{9,115} \\ &+p_{9,243}+2p_{9,499}+2p_{9,459}+2p_{9,263}+p_{9,23}+p_{9,87}+p_{9,191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,709} = \frac{1}{2}p_{9,197} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,197}^2 - 4(p_{9,288}+2p_{9,264}+2p_{9,284}+p_{9,74}+2p_{9,282} \\ &+p_{9,474}+p_{9,422}+p_{9,310}+p_{9,302}+p_{9,33}+p_{9,465}+p_{9,305} \\ &+p_{9,277}+p_{9,149}+p_{9,245}+p_{9,429}+p_{9,237}+p_{9,477}+p_{9,115} \\ &+2p_{9,371}+p_{9,499}+2p_{9,331}+2p_{9,135}+p_{9,407}+p_{9,471}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,453} = \frac{1}{2}p_{9,453} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,453}^2 - 4(p_{9,32}+2p_{9,8}+2p_{9,28}+p_{9,330}+2p_{9,26} \\ &+p_{9,218}+p_{9,166}+p_{9,54}+p_{9,46}+p_{9,289}+p_{9,209}+p_{9,49} \\ &+p_{9,21}+p_{9,405}+p_{9,501}+p_{9,173}+p_{9,493}+p_{9,221}+2p_{9,115} \\ &+p_{9,371}+p_{9,243}+2p_{9,75}+2p_{9,391}+p_{9,151}+p_{9,215}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,965} = \frac{1}{2}p_{9,453} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,453}^2 - 4(p_{9,32}+2p_{9,8}+2p_{9,28}+p_{9,330}+2p_{9,26} \\ &+p_{9,218}+p_{9,166}+p_{9,54}+p_{9,46}+p_{9,289}+p_{9,209}+p_{9,49} \\ &+p_{9,21}+p_{9,405}+p_{9,501}+p_{9,173}+p_{9,493}+p_{9,221}+2p_{9,115} \\ &+p_{9,371}+p_{9,243}+2p_{9,75}+2p_{9,391}+p_{9,151}+p_{9,215}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,37} = \frac{1}{2}p_{9,37} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,37}^2 - 4(p_{9,128}+2p_{9,104}+2p_{9,124}+p_{9,426}+p_{9,314} \\ &+2p_{9,122}+p_{9,262}+p_{9,150}+p_{9,142}+p_{9,385}+p_{9,145}+p_{9,305} \\ &+p_{9,85}+p_{9,117}+p_{9,501}+p_{9,269}+p_{9,77}+p_{9,317}+p_{9,339} \\ &+2p_{9,211}+p_{9,467}+2p_{9,171}+2p_{9,487}+p_{9,311}+p_{9,247}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,549} = \frac{1}{2}p_{9,37} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,37}^2 - 4(p_{9,128}+2p_{9,104}+2p_{9,124}+p_{9,426}+p_{9,314} \\ &+2p_{9,122}+p_{9,262}+p_{9,150}+p_{9,142}+p_{9,385}+p_{9,145}+p_{9,305} \\ &+p_{9,85}+p_{9,117}+p_{9,501}+p_{9,269}+p_{9,77}+p_{9,317}+p_{9,339} \\ &+2p_{9,211}+p_{9,467}+2p_{9,171}+2p_{9,487}+p_{9,311}+p_{9,247}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,293} = \frac{1}{2}p_{9,293} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,293}^2 - 4(p_{9,384}+2p_{9,360}+2p_{9,380}+p_{9,170}+p_{9,58} \\ &+2p_{9,378}+p_{9,6}+p_{9,406}+p_{9,398}+p_{9,129}+p_{9,401}+p_{9,49} \\ &+p_{9,341}+p_{9,373}+p_{9,245}+p_{9,13}+p_{9,333}+p_{9,61}+p_{9,83} \\ &+p_{9,211}+2p_{9,467}+2p_{9,427}+2p_{9,231}+p_{9,55}+p_{9,503}+p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,805} = \frac{1}{2}p_{9,293} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,293}^2 - 4(p_{9,384}+2p_{9,360}+2p_{9,380}+p_{9,170}+p_{9,58} \\ &+2p_{9,378}+p_{9,6}+p_{9,406}+p_{9,398}+p_{9,129}+p_{9,401}+p_{9,49} \\ &+p_{9,341}+p_{9,373}+p_{9,245}+p_{9,13}+p_{9,333}+p_{9,61}+p_{9,83} \\ &+p_{9,211}+2p_{9,467}+2p_{9,427}+2p_{9,231}+p_{9,55}+p_{9,503}+p_{9,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,677} = \frac{1}{2}p_{9,165} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,165}^2 - 4(p_{9,256}+2p_{9,232}+2p_{9,252}+p_{9,42}+p_{9,442} \\ &+2p_{9,250}+p_{9,390}+p_{9,278}+p_{9,270}+p_{9,1}+p_{9,273}+p_{9,433} \\ &+p_{9,213}+p_{9,117}+p_{9,245}+p_{9,397}+p_{9,205}+p_{9,445}+p_{9,83} \\ &+2p_{9,339}+p_{9,467}+2p_{9,299}+2p_{9,103}+p_{9,439}+p_{9,375}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,421} = \frac{1}{2}p_{9,421} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,421}^2 - 4(p_{9,0}+2p_{9,488}+2p_{9,508}+p_{9,298}+p_{9,186} \\ &+2p_{9,506}+p_{9,134}+p_{9,22}+p_{9,14}+p_{9,257}+p_{9,17}+p_{9,177} \\ &+p_{9,469}+p_{9,373}+p_{9,501}+p_{9,141}+p_{9,461}+p_{9,189}+2p_{9,83} \\ &+p_{9,339}+p_{9,211}+2p_{9,43}+2p_{9,359}+p_{9,183}+p_{9,119}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,933} = \frac{1}{2}p_{9,421} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,421}^2 - 4(p_{9,0}+2p_{9,488}+2p_{9,508}+p_{9,298}+p_{9,186} \\ &+2p_{9,506}+p_{9,134}+p_{9,22}+p_{9,14}+p_{9,257}+p_{9,17}+p_{9,177} \\ &+p_{9,469}+p_{9,373}+p_{9,501}+p_{9,141}+p_{9,461}+p_{9,189}+2p_{9,83} \\ &+p_{9,339}+p_{9,211}+2p_{9,43}+2p_{9,359}+p_{9,183}+p_{9,119}+p_{9,287}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,357} = \frac{1}{2}p_{9,357} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,357}^2 - 4(p_{9,448}+2p_{9,424}+2p_{9,444}+p_{9,234}+2p_{9,442} \\ &+p_{9,122}+p_{9,70}+p_{9,470}+p_{9,462}+p_{9,193}+p_{9,465}+p_{9,113} \\ &+p_{9,405}+p_{9,309}+p_{9,437}+p_{9,397}+p_{9,77}+p_{9,125}+2p_{9,19} \\ &+p_{9,275}+p_{9,147}+2p_{9,491}+2p_{9,295}+p_{9,55}+p_{9,119}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,869} = \frac{1}{2}p_{9,357} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,357}^2 - 4(p_{9,448}+2p_{9,424}+2p_{9,444}+p_{9,234}+2p_{9,442} \\ &+p_{9,122}+p_{9,70}+p_{9,470}+p_{9,462}+p_{9,193}+p_{9,465}+p_{9,113} \\ &+p_{9,405}+p_{9,309}+p_{9,437}+p_{9,397}+p_{9,77}+p_{9,125}+2p_{9,19} \\ &+p_{9,275}+p_{9,147}+2p_{9,491}+2p_{9,295}+p_{9,55}+p_{9,119}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,229} = \frac{1}{2}p_{9,229} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,229}^2 - 4(p_{9,320}+2p_{9,296}+2p_{9,316}+p_{9,106}+2p_{9,314} \\ &+p_{9,506}+p_{9,454}+p_{9,342}+p_{9,334}+p_{9,65}+p_{9,337}+p_{9,497} \\ &+p_{9,277}+p_{9,309}+p_{9,181}+p_{9,269}+p_{9,461}+p_{9,509}+p_{9,19} \\ &+p_{9,147}+2p_{9,403}+2p_{9,363}+2p_{9,167}+p_{9,439}+p_{9,503}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,741} = \frac{1}{2}p_{9,229} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,229}^2 - 4(p_{9,320}+2p_{9,296}+2p_{9,316}+p_{9,106}+2p_{9,314} \\ &+p_{9,506}+p_{9,454}+p_{9,342}+p_{9,334}+p_{9,65}+p_{9,337}+p_{9,497} \\ &+p_{9,277}+p_{9,309}+p_{9,181}+p_{9,269}+p_{9,461}+p_{9,509}+p_{9,19} \\ &+p_{9,147}+2p_{9,403}+2p_{9,363}+2p_{9,167}+p_{9,439}+p_{9,503}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,485} = \frac{1}{2}p_{9,485} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,485}^2 - 4(p_{9,64}+2p_{9,40}+2p_{9,60}+p_{9,362}+2p_{9,58} \\ &+p_{9,250}+p_{9,198}+p_{9,86}+p_{9,78}+p_{9,321}+p_{9,81}+p_{9,241} \\ &+p_{9,21}+p_{9,53}+p_{9,437}+p_{9,13}+p_{9,205}+p_{9,253}+p_{9,275} \\ &+2p_{9,147}+p_{9,403}+2p_{9,107}+2p_{9,423}+p_{9,183}+p_{9,247}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,997} = \frac{1}{2}p_{9,485} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,485}^2 - 4(p_{9,64}+2p_{9,40}+2p_{9,60}+p_{9,362}+2p_{9,58} \\ &+p_{9,250}+p_{9,198}+p_{9,86}+p_{9,78}+p_{9,321}+p_{9,81}+p_{9,241} \\ &+p_{9,21}+p_{9,53}+p_{9,437}+p_{9,13}+p_{9,205}+p_{9,253}+p_{9,275} \\ &+2p_{9,147}+p_{9,403}+2p_{9,107}+2p_{9,423}+p_{9,183}+p_{9,247}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,21} = \frac{1}{2}p_{9,21} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,21}^2 - 4(p_{9,112}+2p_{9,88}+2p_{9,108}+p_{9,298}+2p_{9,106} \\ &+p_{9,410}+p_{9,134}+p_{9,246}+p_{9,126}+p_{9,129}+p_{9,289}+p_{9,369} \\ &+p_{9,69}+p_{9,101}+p_{9,485}+p_{9,301}+p_{9,61}+p_{9,253}+p_{9,323} \\ &+2p_{9,195}+p_{9,451}+2p_{9,155}+p_{9,295}+p_{9,231}+2p_{9,471}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,533} = \frac{1}{2}p_{9,21} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,21}^2 - 4(p_{9,112}+2p_{9,88}+2p_{9,108}+p_{9,298}+2p_{9,106} \\ &+p_{9,410}+p_{9,134}+p_{9,246}+p_{9,126}+p_{9,129}+p_{9,289}+p_{9,369} \\ &+p_{9,69}+p_{9,101}+p_{9,485}+p_{9,301}+p_{9,61}+p_{9,253}+p_{9,323} \\ &+2p_{9,195}+p_{9,451}+2p_{9,155}+p_{9,295}+p_{9,231}+2p_{9,471}+p_{9,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,277} = \frac{1}{2}p_{9,277} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,277}^2 - 4(p_{9,368}+2p_{9,344}+2p_{9,364}+p_{9,42}+2p_{9,362} \\ &+p_{9,154}+p_{9,390}+p_{9,502}+p_{9,382}+p_{9,385}+p_{9,33}+p_{9,113} \\ &+p_{9,325}+p_{9,357}+p_{9,229}+p_{9,45}+p_{9,317}+p_{9,509}+p_{9,67} \\ &+p_{9,195}+2p_{9,451}+2p_{9,411}+p_{9,39}+p_{9,487}+2p_{9,215}+p_{9,143}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,149} = \frac{1}{2}p_{9,149} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,149}^2 - 4(p_{9,240}+2p_{9,216}+2p_{9,236}+p_{9,426}+2p_{9,234} \\ &+p_{9,26}+p_{9,262}+p_{9,374}+p_{9,254}+p_{9,257}+p_{9,417}+p_{9,497} \\ &+p_{9,197}+p_{9,101}+p_{9,229}+p_{9,429}+p_{9,189}+p_{9,381}+p_{9,67} \\ &+2p_{9,323}+p_{9,451}+2p_{9,283}+p_{9,423}+p_{9,359}+2p_{9,87}+p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,661} = \frac{1}{2}p_{9,149} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,149}^2 - 4(p_{9,240}+2p_{9,216}+2p_{9,236}+p_{9,426}+2p_{9,234} \\ &+p_{9,26}+p_{9,262}+p_{9,374}+p_{9,254}+p_{9,257}+p_{9,417}+p_{9,497} \\ &+p_{9,197}+p_{9,101}+p_{9,229}+p_{9,429}+p_{9,189}+p_{9,381}+p_{9,67} \\ &+2p_{9,323}+p_{9,451}+2p_{9,283}+p_{9,423}+p_{9,359}+2p_{9,87}+p_{9,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,405} = \frac{1}{2}p_{9,405} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,405}^2 - 4(p_{9,496}+2p_{9,472}+2p_{9,492}+p_{9,170}+2p_{9,490} \\ &+p_{9,282}+p_{9,6}+p_{9,118}+p_{9,510}+p_{9,1}+p_{9,161}+p_{9,241}+p_{9,453} \\ &+p_{9,357}+p_{9,485}+p_{9,173}+p_{9,445}+p_{9,125}+2p_{9,67}+p_{9,323} \\ &+p_{9,195}+2p_{9,27}+p_{9,167}+p_{9,103}+2p_{9,343}+p_{9,271}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,85} = \frac{1}{2}p_{9,85} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,85}^2 - 4(p_{9,176}+2p_{9,152}+2p_{9,172}+2p_{9,170}+p_{9,362} \\ &+p_{9,474}+p_{9,198}+p_{9,310}+p_{9,190}+p_{9,193}+p_{9,353}+p_{9,433} \\ &+p_{9,133}+p_{9,37}+p_{9,165}+p_{9,365}+p_{9,317}+p_{9,125}+p_{9,3} \\ &+2p_{9,259}+p_{9,387}+2p_{9,219}+p_{9,295}+p_{9,359}+2p_{9,23}+p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,597} = \frac{1}{2}p_{9,85} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,85}^2 - 4(p_{9,176}+2p_{9,152}+2p_{9,172}+2p_{9,170}+p_{9,362} \\ &+p_{9,474}+p_{9,198}+p_{9,310}+p_{9,190}+p_{9,193}+p_{9,353}+p_{9,433} \\ &+p_{9,133}+p_{9,37}+p_{9,165}+p_{9,365}+p_{9,317}+p_{9,125}+p_{9,3} \\ &+2p_{9,259}+p_{9,387}+2p_{9,219}+p_{9,295}+p_{9,359}+2p_{9,23}+p_{9,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,341} = \frac{1}{2}p_{9,341} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,341}^2 - 4(p_{9,432}+2p_{9,408}+2p_{9,428}+2p_{9,426}+p_{9,106} \\ &+p_{9,218}+p_{9,454}+p_{9,54}+p_{9,446}+p_{9,449}+p_{9,97}+p_{9,177} \\ &+p_{9,389}+p_{9,293}+p_{9,421}+p_{9,109}+p_{9,61}+p_{9,381}+2p_{9,3} \\ &+p_{9,259}+p_{9,131}+2p_{9,475}+p_{9,39}+p_{9,103}+2p_{9,279}+p_{9,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,853} = \frac{1}{2}p_{9,341} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,341}^2 - 4(p_{9,432}+2p_{9,408}+2p_{9,428}+2p_{9,426}+p_{9,106} \\ &+p_{9,218}+p_{9,454}+p_{9,54}+p_{9,446}+p_{9,449}+p_{9,97}+p_{9,177} \\ &+p_{9,389}+p_{9,293}+p_{9,421}+p_{9,109}+p_{9,61}+p_{9,381}+2p_{9,3} \\ &+p_{9,259}+p_{9,131}+2p_{9,475}+p_{9,39}+p_{9,103}+2p_{9,279}+p_{9,207}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,213} = \frac{1}{2}p_{9,213} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,213}^2 - 4(p_{9,304}+2p_{9,280}+2p_{9,300}+2p_{9,298}+p_{9,490} \\ &+p_{9,90}+p_{9,326}+p_{9,438}+p_{9,318}+p_{9,321}+p_{9,481}+p_{9,49} \\ &+p_{9,261}+p_{9,293}+p_{9,165}+p_{9,493}+p_{9,445}+p_{9,253}+p_{9,3} \\ &+p_{9,131}+2p_{9,387}+2p_{9,347}+p_{9,423}+p_{9,487}+2p_{9,151}+p_{9,79}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 3 unreferenced roots were skipped} {\footnotesize \[p_{10,53} = \frac{1}{2}p_{9,53} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,53}^2 - 4(p_{9,144}+2p_{9,120}+2p_{9,140}+2p_{9,138}+p_{9,330} \\ &+p_{9,442}+p_{9,166}+p_{9,278}+p_{9,158}+p_{9,321}+p_{9,161}+p_{9,401} \\ &+p_{9,5}+p_{9,133}+p_{9,101}+p_{9,333}+p_{9,285}+p_{9,93}+p_{9,355} \\ &+2p_{9,227}+p_{9,483}+2p_{9,187}+p_{9,263}+p_{9,327}+2p_{9,503}+p_{9,431}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,309} = \frac{1}{2}p_{9,309} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,309}^2 - 4(p_{9,400}+2p_{9,376}+2p_{9,396}+2p_{9,394}+p_{9,74} \\ &+p_{9,186}+p_{9,422}+p_{9,22}+p_{9,414}+p_{9,65}+p_{9,417}+p_{9,145} \\ &+p_{9,261}+p_{9,389}+p_{9,357}+p_{9,77}+p_{9,29}+p_{9,349}+p_{9,99} \\ &+p_{9,227}+2p_{9,483}+2p_{9,443}+p_{9,7}+p_{9,71}+2p_{9,247}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,821} = \frac{1}{2}p_{9,309} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,309}^2 - 4(p_{9,400}+2p_{9,376}+2p_{9,396}+2p_{9,394}+p_{9,74} \\ &+p_{9,186}+p_{9,422}+p_{9,22}+p_{9,414}+p_{9,65}+p_{9,417}+p_{9,145} \\ &+p_{9,261}+p_{9,389}+p_{9,357}+p_{9,77}+p_{9,29}+p_{9,349}+p_{9,99} \\ &+p_{9,227}+2p_{9,483}+2p_{9,443}+p_{9,7}+p_{9,71}+2p_{9,247}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,181} = \frac{1}{2}p_{9,181} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,181}^2 - 4(p_{9,272}+2p_{9,248}+2p_{9,268}+2p_{9,266}+p_{9,458} \\ &+p_{9,58}+p_{9,294}+p_{9,406}+p_{9,286}+p_{9,449}+p_{9,289}+p_{9,17} \\ &+p_{9,261}+p_{9,133}+p_{9,229}+p_{9,461}+p_{9,413}+p_{9,221}+p_{9,99} \\ &+2p_{9,355}+p_{9,483}+2p_{9,315}+p_{9,391}+p_{9,455}+2p_{9,119}+p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,693} = \frac{1}{2}p_{9,181} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,181}^2 - 4(p_{9,272}+2p_{9,248}+2p_{9,268}+2p_{9,266}+p_{9,458} \\ &+p_{9,58}+p_{9,294}+p_{9,406}+p_{9,286}+p_{9,449}+p_{9,289}+p_{9,17} \\ &+p_{9,261}+p_{9,133}+p_{9,229}+p_{9,461}+p_{9,413}+p_{9,221}+p_{9,99} \\ &+2p_{9,355}+p_{9,483}+2p_{9,315}+p_{9,391}+p_{9,455}+2p_{9,119}+p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,437} = \frac{1}{2}p_{9,437} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,437}^2 - 4(p_{9,16}+2p_{9,504}+2p_{9,12}+2p_{9,10}+p_{9,202} \\ &+p_{9,314}+p_{9,38}+p_{9,150}+p_{9,30}+p_{9,193}+p_{9,33}+p_{9,273}+p_{9,5} \\ &+p_{9,389}+p_{9,485}+p_{9,205}+p_{9,157}+p_{9,477}+2p_{9,99}+p_{9,355} \\ &+p_{9,227}+2p_{9,59}+p_{9,135}+p_{9,199}+2p_{9,375}+p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,949} = \frac{1}{2}p_{9,437} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,437}^2 - 4(p_{9,16}+2p_{9,504}+2p_{9,12}+2p_{9,10}+p_{9,202} \\ &+p_{9,314}+p_{9,38}+p_{9,150}+p_{9,30}+p_{9,193}+p_{9,33}+p_{9,273}+p_{9,5} \\ &+p_{9,389}+p_{9,485}+p_{9,205}+p_{9,157}+p_{9,477}+2p_{9,99}+p_{9,355} \\ &+p_{9,227}+2p_{9,59}+p_{9,135}+p_{9,199}+2p_{9,375}+p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,117} = \frac{1}{2}p_{9,117} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,117}^2 - 4(p_{9,208}+2p_{9,184}+2p_{9,204}+p_{9,394}+2p_{9,202} \\ &+p_{9,506}+p_{9,230}+p_{9,342}+p_{9,222}+p_{9,385}+p_{9,225}+p_{9,465} \\ &+p_{9,69}+p_{9,197}+p_{9,165}+p_{9,397}+p_{9,157}+p_{9,349}+p_{9,35} \\ &+2p_{9,291}+p_{9,419}+2p_{9,251}+p_{9,391}+p_{9,327}+2p_{9,55}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,629} = \frac{1}{2}p_{9,117} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,117}^2 - 4(p_{9,208}+2p_{9,184}+2p_{9,204}+p_{9,394}+2p_{9,202} \\ &+p_{9,506}+p_{9,230}+p_{9,342}+p_{9,222}+p_{9,385}+p_{9,225}+p_{9,465} \\ &+p_{9,69}+p_{9,197}+p_{9,165}+p_{9,397}+p_{9,157}+p_{9,349}+p_{9,35} \\ &+2p_{9,291}+p_{9,419}+2p_{9,251}+p_{9,391}+p_{9,327}+2p_{9,55}+p_{9,495}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,885} = \frac{1}{2}p_{9,373} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,373}^2 - 4(p_{9,464}+2p_{9,440}+2p_{9,460}+p_{9,138}+2p_{9,458} \\ &+p_{9,250}+p_{9,486}+p_{9,86}+p_{9,478}+p_{9,129}+p_{9,481}+p_{9,209} \\ &+p_{9,325}+p_{9,453}+p_{9,421}+p_{9,141}+p_{9,413}+p_{9,93}+2p_{9,35} \\ &+p_{9,291}+p_{9,163}+2p_{9,507}+p_{9,135}+p_{9,71}+2p_{9,311}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,245} = \frac{1}{2}p_{9,245} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,245}^2 - 4(p_{9,336}+2p_{9,312}+2p_{9,332}+p_{9,10}+2p_{9,330} \\ &+p_{9,122}+p_{9,358}+p_{9,470}+p_{9,350}+p_{9,1}+p_{9,353}+p_{9,81} \\ &+p_{9,325}+p_{9,197}+p_{9,293}+p_{9,13}+p_{9,285}+p_{9,477}+p_{9,35} \\ &+p_{9,163}+2p_{9,419}+2p_{9,379}+p_{9,7}+p_{9,455}+2p_{9,183}+p_{9,111}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,501} = \frac{1}{2}p_{9,501} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,501}^2 - 4(p_{9,80}+2p_{9,56}+2p_{9,76}+p_{9,266}+2p_{9,74} \\ &+p_{9,378}+p_{9,102}+p_{9,214}+p_{9,94}+p_{9,257}+p_{9,97}+p_{9,337} \\ &+p_{9,69}+p_{9,453}+p_{9,37}+p_{9,269}+p_{9,29}+p_{9,221}+p_{9,291} \\ &+2p_{9,163}+p_{9,419}+2p_{9,123}+p_{9,263}+p_{9,199}+2p_{9,439}+p_{9,367}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,13} = \frac{1}{2}p_{9,13} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,13}^2 - 4(2p_{9,80}+p_{9,104}+2p_{9,100}+p_{9,290}+2p_{9,98} \\ &+p_{9,402}+p_{9,118}+p_{9,238}+p_{9,126}+p_{9,361}+p_{9,281}+p_{9,121} \\ &+p_{9,293}+p_{9,53}+p_{9,245}+p_{9,93}+p_{9,477}+p_{9,61}+2p_{9,147} \\ &+p_{9,315}+2p_{9,187}+p_{9,443}+p_{9,391}+2p_{9,463}+p_{9,287}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,525} = \frac{1}{2}p_{9,13} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,13}^2 - 4(2p_{9,80}+p_{9,104}+2p_{9,100}+p_{9,290}+2p_{9,98} \\ &+p_{9,402}+p_{9,118}+p_{9,238}+p_{9,126}+p_{9,361}+p_{9,281}+p_{9,121} \\ &+p_{9,293}+p_{9,53}+p_{9,245}+p_{9,93}+p_{9,477}+p_{9,61}+2p_{9,147} \\ &+p_{9,315}+2p_{9,187}+p_{9,443}+p_{9,391}+2p_{9,463}+p_{9,287}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,269} = \frac{1}{2}p_{9,269} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,269}^2 - 4(2p_{9,336}+p_{9,360}+2p_{9,356}+p_{9,34}+2p_{9,354} \\ &+p_{9,146}+p_{9,374}+p_{9,494}+p_{9,382}+p_{9,105}+p_{9,25}+p_{9,377} \\ &+p_{9,37}+p_{9,309}+p_{9,501}+p_{9,349}+p_{9,221}+p_{9,317}+2p_{9,403} \\ &+p_{9,59}+p_{9,187}+2p_{9,443}+p_{9,135}+2p_{9,207}+p_{9,31}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,781} = \frac{1}{2}p_{9,269} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,269}^2 - 4(2p_{9,336}+p_{9,360}+2p_{9,356}+p_{9,34}+2p_{9,354} \\ &+p_{9,146}+p_{9,374}+p_{9,494}+p_{9,382}+p_{9,105}+p_{9,25}+p_{9,377} \\ &+p_{9,37}+p_{9,309}+p_{9,501}+p_{9,349}+p_{9,221}+p_{9,317}+2p_{9,403} \\ &+p_{9,59}+p_{9,187}+2p_{9,443}+p_{9,135}+2p_{9,207}+p_{9,31}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,141} = \frac{1}{2}p_{9,141} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,141}^2 - 4(2p_{9,208}+p_{9,232}+2p_{9,228}+p_{9,418}+2p_{9,226} \\ &+p_{9,18}+p_{9,246}+p_{9,366}+p_{9,254}+p_{9,489}+p_{9,409}+p_{9,249} \\ &+p_{9,421}+p_{9,181}+p_{9,373}+p_{9,93}+p_{9,221}+p_{9,189}+2p_{9,275} \\ &+p_{9,59}+2p_{9,315}+p_{9,443}+p_{9,7}+2p_{9,79}+p_{9,415}+p_{9,351}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,397} = \frac{1}{2}p_{9,397} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,397}^2 - 4(2p_{9,464}+p_{9,488}+2p_{9,484}+p_{9,162}+2p_{9,482} \\ &+p_{9,274}+p_{9,502}+p_{9,110}+p_{9,510}+p_{9,233}+p_{9,153}+p_{9,505} \\ &+p_{9,165}+p_{9,437}+p_{9,117}+p_{9,349}+p_{9,477}+p_{9,445}+2p_{9,19} \\ &+2p_{9,59}+p_{9,315}+p_{9,187}+p_{9,263}+2p_{9,335}+p_{9,159}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,909} = \frac{1}{2}p_{9,397} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,397}^2 - 4(2p_{9,464}+p_{9,488}+2p_{9,484}+p_{9,162}+2p_{9,482} \\ &+p_{9,274}+p_{9,502}+p_{9,110}+p_{9,510}+p_{9,233}+p_{9,153}+p_{9,505} \\ &+p_{9,165}+p_{9,437}+p_{9,117}+p_{9,349}+p_{9,477}+p_{9,445}+2p_{9,19} \\ &+2p_{9,59}+p_{9,315}+p_{9,187}+p_{9,263}+2p_{9,335}+p_{9,159}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,77} = \frac{1}{2}p_{9,77} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,77}^2 - 4(2p_{9,144}+p_{9,168}+2p_{9,164}+2p_{9,162}+p_{9,354} \\ &+p_{9,466}+p_{9,182}+p_{9,302}+p_{9,190}+p_{9,425}+p_{9,345}+p_{9,185} \\ &+p_{9,357}+p_{9,309}+p_{9,117}+p_{9,29}+p_{9,157}+p_{9,125}+2p_{9,211} \\ &+p_{9,379}+2p_{9,251}+p_{9,507}+p_{9,455}+2p_{9,15}+p_{9,287}+p_{9,351}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,333} = \frac{1}{2}p_{9,333} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,333}^2 - 4(2p_{9,400}+p_{9,424}+2p_{9,420}+2p_{9,418}+p_{9,98} \\ &+p_{9,210}+p_{9,438}+p_{9,46}+p_{9,446}+p_{9,169}+p_{9,89}+p_{9,441} \\ &+p_{9,101}+p_{9,53}+p_{9,373}+p_{9,285}+p_{9,413}+p_{9,381}+2p_{9,467} \\ &+p_{9,123}+p_{9,251}+2p_{9,507}+p_{9,199}+2p_{9,271}+p_{9,31}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,845} = \frac{1}{2}p_{9,333} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,333}^2 - 4(2p_{9,400}+p_{9,424}+2p_{9,420}+2p_{9,418}+p_{9,98} \\ &+p_{9,210}+p_{9,438}+p_{9,46}+p_{9,446}+p_{9,169}+p_{9,89}+p_{9,441} \\ &+p_{9,101}+p_{9,53}+p_{9,373}+p_{9,285}+p_{9,413}+p_{9,381}+2p_{9,467} \\ &+p_{9,123}+p_{9,251}+2p_{9,507}+p_{9,199}+2p_{9,271}+p_{9,31}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,205} = \frac{1}{2}p_{9,205} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,205}^2 - 4(2p_{9,272}+p_{9,296}+2p_{9,292}+2p_{9,290}+p_{9,482} \\ &+p_{9,82}+p_{9,310}+p_{9,430}+p_{9,318}+p_{9,41}+p_{9,473}+p_{9,313} \\ &+p_{9,485}+p_{9,437}+p_{9,245}+p_{9,285}+p_{9,157}+p_{9,253}+2p_{9,339} \\ &+p_{9,123}+2p_{9,379}+p_{9,507}+p_{9,71}+2p_{9,143}+p_{9,415}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,717} = \frac{1}{2}p_{9,205} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,205}^2 - 4(2p_{9,272}+p_{9,296}+2p_{9,292}+2p_{9,290}+p_{9,482} \\ &+p_{9,82}+p_{9,310}+p_{9,430}+p_{9,318}+p_{9,41}+p_{9,473}+p_{9,313} \\ &+p_{9,485}+p_{9,437}+p_{9,245}+p_{9,285}+p_{9,157}+p_{9,253}+2p_{9,339} \\ &+p_{9,123}+2p_{9,379}+p_{9,507}+p_{9,71}+2p_{9,143}+p_{9,415}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,461} = \frac{1}{2}p_{9,461} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,461}^2 - 4(2p_{9,16}+p_{9,40}+2p_{9,36}+2p_{9,34}+p_{9,226} \\ &+p_{9,338}+p_{9,54}+p_{9,174}+p_{9,62}+p_{9,297}+p_{9,217}+p_{9,57} \\ &+p_{9,229}+p_{9,181}+p_{9,501}+p_{9,29}+p_{9,413}+p_{9,509}+2p_{9,83} \\ &+2p_{9,123}+p_{9,379}+p_{9,251}+p_{9,327}+2p_{9,399}+p_{9,159}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,973} = \frac{1}{2}p_{9,461} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,461}^2 - 4(2p_{9,16}+p_{9,40}+2p_{9,36}+2p_{9,34}+p_{9,226} \\ &+p_{9,338}+p_{9,54}+p_{9,174}+p_{9,62}+p_{9,297}+p_{9,217}+p_{9,57} \\ &+p_{9,229}+p_{9,181}+p_{9,501}+p_{9,29}+p_{9,413}+p_{9,509}+2p_{9,83} \\ &+2p_{9,123}+p_{9,379}+p_{9,251}+p_{9,327}+2p_{9,399}+p_{9,159}+p_{9,223}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,301} = \frac{1}{2}p_{9,301} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,301}^2 - 4(2p_{9,368}+p_{9,392}+2p_{9,388}+2p_{9,386}+p_{9,66} \\ &+p_{9,178}+p_{9,406}+p_{9,14}+p_{9,414}+p_{9,137}+p_{9,409}+p_{9,57} \\ &+p_{9,69}+p_{9,21}+p_{9,341}+p_{9,349}+p_{9,381}+p_{9,253}+2p_{9,435} \\ &+p_{9,91}+p_{9,219}+2p_{9,475}+p_{9,167}+2p_{9,239}+p_{9,63}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,813} = \frac{1}{2}p_{9,301} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,301}^2 - 4(2p_{9,368}+p_{9,392}+2p_{9,388}+2p_{9,386}+p_{9,66} \\ &+p_{9,178}+p_{9,406}+p_{9,14}+p_{9,414}+p_{9,137}+p_{9,409}+p_{9,57} \\ &+p_{9,69}+p_{9,21}+p_{9,341}+p_{9,349}+p_{9,381}+p_{9,253}+2p_{9,435} \\ &+p_{9,91}+p_{9,219}+2p_{9,475}+p_{9,167}+2p_{9,239}+p_{9,63}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,173} = \frac{1}{2}p_{9,173} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,173}^2 - 4(2p_{9,240}+p_{9,264}+2p_{9,260}+2p_{9,258}+p_{9,450} \\ &+p_{9,50}+p_{9,278}+p_{9,398}+p_{9,286}+p_{9,9}+p_{9,281}+p_{9,441} \\ &+p_{9,453}+p_{9,405}+p_{9,213}+p_{9,221}+p_{9,125}+p_{9,253}+2p_{9,307} \\ &+p_{9,91}+2p_{9,347}+p_{9,475}+p_{9,39}+2p_{9,111}+p_{9,447}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,685} = \frac{1}{2}p_{9,173} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,173}^2 - 4(2p_{9,240}+p_{9,264}+2p_{9,260}+2p_{9,258}+p_{9,450} \\ &+p_{9,50}+p_{9,278}+p_{9,398}+p_{9,286}+p_{9,9}+p_{9,281}+p_{9,441} \\ &+p_{9,453}+p_{9,405}+p_{9,213}+p_{9,221}+p_{9,125}+p_{9,253}+2p_{9,307} \\ &+p_{9,91}+2p_{9,347}+p_{9,475}+p_{9,39}+2p_{9,111}+p_{9,447}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,429} = \frac{1}{2}p_{9,429} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,429}^2 - 4(2p_{9,496}+p_{9,8}+2p_{9,4}+2p_{9,2}+p_{9,194} \\ &+p_{9,306}+p_{9,22}+p_{9,142}+p_{9,30}+p_{9,265}+p_{9,25}+p_{9,185} \\ &+p_{9,197}+p_{9,149}+p_{9,469}+p_{9,477}+p_{9,381}+p_{9,509}+2p_{9,51} \\ &+2p_{9,91}+p_{9,347}+p_{9,219}+p_{9,295}+2p_{9,367}+p_{9,191}+p_{9,127}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,109} = \frac{1}{2}p_{9,109} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,109}^2 - 4(2p_{9,176}+p_{9,200}+2p_{9,196}+p_{9,386}+2p_{9,194} \\ &+p_{9,498}+p_{9,214}+p_{9,334}+p_{9,222}+p_{9,457}+p_{9,217}+p_{9,377} \\ &+p_{9,389}+p_{9,149}+p_{9,341}+p_{9,157}+p_{9,61}+p_{9,189}+2p_{9,243} \\ &+p_{9,27}+2p_{9,283}+p_{9,411}+p_{9,487}+2p_{9,47}+p_{9,319}+p_{9,383}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,877} = \frac{1}{2}p_{9,365} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,365}^2 - 4(2p_{9,432}+p_{9,456}+2p_{9,452}+p_{9,130}+2p_{9,450} \\ &+p_{9,242}+p_{9,470}+p_{9,78}+p_{9,478}+p_{9,201}+p_{9,473}+p_{9,121} \\ &+p_{9,133}+p_{9,405}+p_{9,85}+p_{9,413}+p_{9,317}+p_{9,445}+2p_{9,499} \\ &+2p_{9,27}+p_{9,283}+p_{9,155}+p_{9,231}+2p_{9,303}+p_{9,63}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,237} = \frac{1}{2}p_{9,237} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,237}^2 - 4(2p_{9,304}+p_{9,328}+2p_{9,324}+p_{9,2}+2p_{9,322} \\ &+p_{9,114}+p_{9,342}+p_{9,462}+p_{9,350}+p_{9,73}+p_{9,345}+p_{9,505} \\ &+p_{9,5}+p_{9,277}+p_{9,469}+p_{9,285}+p_{9,317}+p_{9,189}+2p_{9,371} \\ &+p_{9,27}+p_{9,155}+2p_{9,411}+p_{9,103}+2p_{9,175}+p_{9,447}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,749} = \frac{1}{2}p_{9,237} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,237}^2 - 4(2p_{9,304}+p_{9,328}+2p_{9,324}+p_{9,2}+2p_{9,322} \\ &+p_{9,114}+p_{9,342}+p_{9,462}+p_{9,350}+p_{9,73}+p_{9,345}+p_{9,505} \\ &+p_{9,5}+p_{9,277}+p_{9,469}+p_{9,285}+p_{9,317}+p_{9,189}+2p_{9,371} \\ &+p_{9,27}+p_{9,155}+2p_{9,411}+p_{9,103}+2p_{9,175}+p_{9,447}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,493} = \frac{1}{2}p_{9,493} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,493}^2 - 4(2p_{9,48}+p_{9,72}+2p_{9,68}+p_{9,258}+2p_{9,66} \\ &+p_{9,370}+p_{9,86}+p_{9,206}+p_{9,94}+p_{9,329}+p_{9,89}+p_{9,249} \\ &+p_{9,261}+p_{9,21}+p_{9,213}+p_{9,29}+p_{9,61}+p_{9,445}+2p_{9,115} \\ &+p_{9,283}+2p_{9,155}+p_{9,411}+p_{9,359}+2p_{9,431}+p_{9,191}+p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,29} = \frac{1}{2}p_{9,29} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,29}^2 - 4(2p_{9,96}+p_{9,120}+2p_{9,116}+p_{9,418}+p_{9,306} \\ &+2p_{9,114}+p_{9,134}+p_{9,142}+p_{9,254}+p_{9,137}+p_{9,297}+p_{9,377} \\ &+p_{9,261}+p_{9,69}+p_{9,309}+p_{9,77}+p_{9,109}+p_{9,493}+2p_{9,163} \\ &+p_{9,331}+2p_{9,203}+p_{9,459}+p_{9,407}+p_{9,303}+p_{9,239}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,541} = \frac{1}{2}p_{9,29} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,29}^2 - 4(2p_{9,96}+p_{9,120}+2p_{9,116}+p_{9,418}+p_{9,306} \\ &+2p_{9,114}+p_{9,134}+p_{9,142}+p_{9,254}+p_{9,137}+p_{9,297}+p_{9,377} \\ &+p_{9,261}+p_{9,69}+p_{9,309}+p_{9,77}+p_{9,109}+p_{9,493}+2p_{9,163} \\ &+p_{9,331}+2p_{9,203}+p_{9,459}+p_{9,407}+p_{9,303}+p_{9,239}+2p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,285} = \frac{1}{2}p_{9,285} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,285}^2 - 4(2p_{9,352}+p_{9,376}+2p_{9,372}+p_{9,162}+p_{9,50} \\ &+2p_{9,370}+p_{9,390}+p_{9,398}+p_{9,510}+p_{9,393}+p_{9,41}+p_{9,121} \\ &+p_{9,5}+p_{9,325}+p_{9,53}+p_{9,333}+p_{9,365}+p_{9,237}+2p_{9,419} \\ &+p_{9,75}+p_{9,203}+2p_{9,459}+p_{9,151}+p_{9,47}+p_{9,495}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,797} = \frac{1}{2}p_{9,285} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,285}^2 - 4(2p_{9,352}+p_{9,376}+2p_{9,372}+p_{9,162}+p_{9,50} \\ &+2p_{9,370}+p_{9,390}+p_{9,398}+p_{9,510}+p_{9,393}+p_{9,41}+p_{9,121} \\ &+p_{9,5}+p_{9,325}+p_{9,53}+p_{9,333}+p_{9,365}+p_{9,237}+2p_{9,419} \\ &+p_{9,75}+p_{9,203}+2p_{9,459}+p_{9,151}+p_{9,47}+p_{9,495}+2p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,157} = \frac{1}{2}p_{9,157} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,157}^2 - 4(2p_{9,224}+p_{9,248}+2p_{9,244}+p_{9,34}+p_{9,434} \\ &+2p_{9,242}+p_{9,262}+p_{9,270}+p_{9,382}+p_{9,265}+p_{9,425}+p_{9,505} \\ &+p_{9,389}+p_{9,197}+p_{9,437}+p_{9,205}+p_{9,109}+p_{9,237}+2p_{9,291} \\ &+p_{9,75}+2p_{9,331}+p_{9,459}+p_{9,23}+p_{9,431}+p_{9,367}+2p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,669} = \frac{1}{2}p_{9,157} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,157}^2 - 4(2p_{9,224}+p_{9,248}+2p_{9,244}+p_{9,34}+p_{9,434} \\ &+2p_{9,242}+p_{9,262}+p_{9,270}+p_{9,382}+p_{9,265}+p_{9,425}+p_{9,505} \\ &+p_{9,389}+p_{9,197}+p_{9,437}+p_{9,205}+p_{9,109}+p_{9,237}+2p_{9,291} \\ &+p_{9,75}+2p_{9,331}+p_{9,459}+p_{9,23}+p_{9,431}+p_{9,367}+2p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,413} = \frac{1}{2}p_{9,413} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,413}^2 - 4(2p_{9,480}+p_{9,504}+2p_{9,500}+p_{9,290}+p_{9,178} \\ &+2p_{9,498}+p_{9,6}+p_{9,14}+p_{9,126}+p_{9,9}+p_{9,169}+p_{9,249} \\ &+p_{9,133}+p_{9,453}+p_{9,181}+p_{9,461}+p_{9,365}+p_{9,493}+2p_{9,35} \\ &+2p_{9,75}+p_{9,331}+p_{9,203}+p_{9,279}+p_{9,175}+p_{9,111}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,925} = \frac{1}{2}p_{9,413} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,413}^2 - 4(2p_{9,480}+p_{9,504}+2p_{9,500}+p_{9,290}+p_{9,178} \\ &+2p_{9,498}+p_{9,6}+p_{9,14}+p_{9,126}+p_{9,9}+p_{9,169}+p_{9,249} \\ &+p_{9,133}+p_{9,453}+p_{9,181}+p_{9,461}+p_{9,365}+p_{9,493}+2p_{9,35} \\ &+2p_{9,75}+p_{9,331}+p_{9,203}+p_{9,279}+p_{9,175}+p_{9,111}+2p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,93} = \frac{1}{2}p_{9,93} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,93}^2 - 4(2p_{9,160}+p_{9,184}+2p_{9,180}+p_{9,482}+2p_{9,178} \\ &+p_{9,370}+p_{9,198}+p_{9,206}+p_{9,318}+p_{9,201}+p_{9,361}+p_{9,441} \\ &+p_{9,133}+p_{9,325}+p_{9,373}+p_{9,141}+p_{9,45}+p_{9,173}+2p_{9,227} \\ &+p_{9,11}+2p_{9,267}+p_{9,395}+p_{9,471}+p_{9,303}+p_{9,367}+2p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,605} = \frac{1}{2}p_{9,93} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,93}^2 - 4(2p_{9,160}+p_{9,184}+2p_{9,180}+p_{9,482}+2p_{9,178} \\ &+p_{9,370}+p_{9,198}+p_{9,206}+p_{9,318}+p_{9,201}+p_{9,361}+p_{9,441} \\ &+p_{9,133}+p_{9,325}+p_{9,373}+p_{9,141}+p_{9,45}+p_{9,173}+2p_{9,227} \\ &+p_{9,11}+2p_{9,267}+p_{9,395}+p_{9,471}+p_{9,303}+p_{9,367}+2p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,349} = \frac{1}{2}p_{9,349} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,349}^2 - 4(2p_{9,416}+p_{9,440}+2p_{9,436}+p_{9,226}+2p_{9,434} \\ &+p_{9,114}+p_{9,454}+p_{9,462}+p_{9,62}+p_{9,457}+p_{9,105}+p_{9,185} \\ &+p_{9,389}+p_{9,69}+p_{9,117}+p_{9,397}+p_{9,301}+p_{9,429}+2p_{9,483} \\ &+2p_{9,11}+p_{9,267}+p_{9,139}+p_{9,215}+p_{9,47}+p_{9,111}+2p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,861} = \frac{1}{2}p_{9,349} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,349}^2 - 4(2p_{9,416}+p_{9,440}+2p_{9,436}+p_{9,226}+2p_{9,434} \\ &+p_{9,114}+p_{9,454}+p_{9,462}+p_{9,62}+p_{9,457}+p_{9,105}+p_{9,185} \\ &+p_{9,389}+p_{9,69}+p_{9,117}+p_{9,397}+p_{9,301}+p_{9,429}+2p_{9,483} \\ &+2p_{9,11}+p_{9,267}+p_{9,139}+p_{9,215}+p_{9,47}+p_{9,111}+2p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,221} = \frac{1}{2}p_{9,221} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,221}^2 - 4(2p_{9,288}+p_{9,312}+2p_{9,308}+p_{9,98}+2p_{9,306} \\ &+p_{9,498}+p_{9,326}+p_{9,334}+p_{9,446}+p_{9,329}+p_{9,489}+p_{9,57} \\ &+p_{9,261}+p_{9,453}+p_{9,501}+p_{9,269}+p_{9,301}+p_{9,173}+2p_{9,355} \\ &+p_{9,11}+p_{9,139}+2p_{9,395}+p_{9,87}+p_{9,431}+p_{9,495}+2p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,733} = \frac{1}{2}p_{9,221} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,221}^2 - 4(2p_{9,288}+p_{9,312}+2p_{9,308}+p_{9,98}+2p_{9,306} \\ &+p_{9,498}+p_{9,326}+p_{9,334}+p_{9,446}+p_{9,329}+p_{9,489}+p_{9,57} \\ &+p_{9,261}+p_{9,453}+p_{9,501}+p_{9,269}+p_{9,301}+p_{9,173}+2p_{9,355} \\ &+p_{9,11}+p_{9,139}+2p_{9,395}+p_{9,87}+p_{9,431}+p_{9,495}+2p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,477} = \frac{1}{2}p_{9,477} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,477}^2 - 4(2p_{9,32}+p_{9,56}+2p_{9,52}+p_{9,354}+2p_{9,50} \\ &+p_{9,242}+p_{9,70}+p_{9,78}+p_{9,190}+p_{9,73}+p_{9,233}+p_{9,313} \\ &+p_{9,5}+p_{9,197}+p_{9,245}+p_{9,13}+p_{9,45}+p_{9,429}+2p_{9,99} \\ &+p_{9,267}+2p_{9,139}+p_{9,395}+p_{9,343}+p_{9,175}+p_{9,239}+2p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,989} = \frac{1}{2}p_{9,477} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,477}^2 - 4(2p_{9,32}+p_{9,56}+2p_{9,52}+p_{9,354}+2p_{9,50} \\ &+p_{9,242}+p_{9,70}+p_{9,78}+p_{9,190}+p_{9,73}+p_{9,233}+p_{9,313} \\ &+p_{9,5}+p_{9,197}+p_{9,245}+p_{9,13}+p_{9,45}+p_{9,429}+2p_{9,99} \\ &+p_{9,267}+2p_{9,139}+p_{9,395}+p_{9,343}+p_{9,175}+p_{9,239}+2p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,61} = \frac{1}{2}p_{9,61} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,61}^2 - 4(2p_{9,128}+p_{9,152}+2p_{9,148}+p_{9,450}+2p_{9,146} \\ &+p_{9,338}+p_{9,166}+p_{9,174}+p_{9,286}+p_{9,329}+p_{9,169}+p_{9,409} \\ &+p_{9,293}+p_{9,101}+p_{9,341}+p_{9,13}+p_{9,141}+p_{9,109}+2p_{9,195} \\ &+p_{9,363}+2p_{9,235}+p_{9,491}+p_{9,439}+p_{9,271}+p_{9,335}+2p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,573} = \frac{1}{2}p_{9,61} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,61}^2 - 4(2p_{9,128}+p_{9,152}+2p_{9,148}+p_{9,450}+2p_{9,146} \\ &+p_{9,338}+p_{9,166}+p_{9,174}+p_{9,286}+p_{9,329}+p_{9,169}+p_{9,409} \\ &+p_{9,293}+p_{9,101}+p_{9,341}+p_{9,13}+p_{9,141}+p_{9,109}+2p_{9,195} \\ &+p_{9,363}+2p_{9,235}+p_{9,491}+p_{9,439}+p_{9,271}+p_{9,335}+2p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,189} = \frac{1}{2}p_{9,189} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,189}^2 - 4(2p_{9,256}+p_{9,280}+2p_{9,276}+p_{9,66}+2p_{9,274} \\ &+p_{9,466}+p_{9,294}+p_{9,302}+p_{9,414}+p_{9,457}+p_{9,297}+p_{9,25} \\ &+p_{9,421}+p_{9,229}+p_{9,469}+p_{9,269}+p_{9,141}+p_{9,237}+2p_{9,323} \\ &+p_{9,107}+2p_{9,363}+p_{9,491}+p_{9,55}+p_{9,399}+p_{9,463}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,701} = \frac{1}{2}p_{9,189} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,189}^2 - 4(2p_{9,256}+p_{9,280}+2p_{9,276}+p_{9,66}+2p_{9,274} \\ &+p_{9,466}+p_{9,294}+p_{9,302}+p_{9,414}+p_{9,457}+p_{9,297}+p_{9,25} \\ &+p_{9,421}+p_{9,229}+p_{9,469}+p_{9,269}+p_{9,141}+p_{9,237}+2p_{9,323} \\ &+p_{9,107}+2p_{9,363}+p_{9,491}+p_{9,55}+p_{9,399}+p_{9,463}+2p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,445} = \frac{1}{2}p_{9,445} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,445}^2 - 4(2p_{9,0}+p_{9,24}+2p_{9,20}+p_{9,322}+2p_{9,18} \\ &+p_{9,210}+p_{9,38}+p_{9,46}+p_{9,158}+p_{9,201}+p_{9,41}+p_{9,281} \\ &+p_{9,165}+p_{9,485}+p_{9,213}+p_{9,13}+p_{9,397}+p_{9,493}+2p_{9,67} \\ &+2p_{9,107}+p_{9,363}+p_{9,235}+p_{9,311}+p_{9,143}+p_{9,207}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,957} = \frac{1}{2}p_{9,445} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,445}^2 - 4(2p_{9,0}+p_{9,24}+2p_{9,20}+p_{9,322}+2p_{9,18} \\ &+p_{9,210}+p_{9,38}+p_{9,46}+p_{9,158}+p_{9,201}+p_{9,41}+p_{9,281} \\ &+p_{9,165}+p_{9,485}+p_{9,213}+p_{9,13}+p_{9,397}+p_{9,493}+2p_{9,67} \\ &+2p_{9,107}+p_{9,363}+p_{9,235}+p_{9,311}+p_{9,143}+p_{9,207}+2p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,125} = \frac{1}{2}p_{9,125} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,125}^2 - 4(2p_{9,192}+p_{9,216}+2p_{9,212}+p_{9,2}+p_{9,402} \\ &+2p_{9,210}+p_{9,230}+p_{9,238}+p_{9,350}+p_{9,393}+p_{9,233}+p_{9,473} \\ &+p_{9,165}+p_{9,357}+p_{9,405}+p_{9,77}+p_{9,205}+p_{9,173}+2p_{9,259} \\ &+p_{9,43}+2p_{9,299}+p_{9,427}+p_{9,503}+p_{9,399}+p_{9,335}+2p_{9,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,381} = \frac{1}{2}p_{9,381} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,381}^2 - 4(2p_{9,448}+p_{9,472}+2p_{9,468}+p_{9,258}+p_{9,146} \\ &+2p_{9,466}+p_{9,486}+p_{9,494}+p_{9,94}+p_{9,137}+p_{9,489}+p_{9,217} \\ &+p_{9,421}+p_{9,101}+p_{9,149}+p_{9,333}+p_{9,461}+p_{9,429}+2p_{9,3} \\ &+2p_{9,43}+p_{9,299}+p_{9,171}+p_{9,247}+p_{9,143}+p_{9,79}+2p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,893} = \frac{1}{2}p_{9,381} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,381}^2 - 4(2p_{9,448}+p_{9,472}+2p_{9,468}+p_{9,258}+p_{9,146} \\ &+2p_{9,466}+p_{9,486}+p_{9,494}+p_{9,94}+p_{9,137}+p_{9,489}+p_{9,217} \\ &+p_{9,421}+p_{9,101}+p_{9,149}+p_{9,333}+p_{9,461}+p_{9,429}+2p_{9,3} \\ &+2p_{9,43}+p_{9,299}+p_{9,171}+p_{9,247}+p_{9,143}+p_{9,79}+2p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,253} = \frac{1}{2}p_{9,253} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,253}^2 - 4(2p_{9,320}+p_{9,344}+2p_{9,340}+p_{9,130}+p_{9,18} \\ &+2p_{9,338}+p_{9,358}+p_{9,366}+p_{9,478}+p_{9,9}+p_{9,361}+p_{9,89} \\ &+p_{9,293}+p_{9,485}+p_{9,21}+p_{9,333}+p_{9,205}+p_{9,301}+2p_{9,387} \\ &+p_{9,43}+p_{9,171}+2p_{9,427}+p_{9,119}+p_{9,15}+p_{9,463}+2p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,765} = \frac{1}{2}p_{9,253} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,253}^2 - 4(2p_{9,320}+p_{9,344}+2p_{9,340}+p_{9,130}+p_{9,18} \\ &+2p_{9,338}+p_{9,358}+p_{9,366}+p_{9,478}+p_{9,9}+p_{9,361}+p_{9,89} \\ &+p_{9,293}+p_{9,485}+p_{9,21}+p_{9,333}+p_{9,205}+p_{9,301}+2p_{9,387} \\ &+p_{9,43}+p_{9,171}+2p_{9,427}+p_{9,119}+p_{9,15}+p_{9,463}+2p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,509} = \frac{1}{2}p_{9,509} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,509}^2 - 4(2p_{9,64}+p_{9,88}+2p_{9,84}+p_{9,386}+p_{9,274} \\ &+2p_{9,82}+p_{9,102}+p_{9,110}+p_{9,222}+p_{9,265}+p_{9,105}+p_{9,345} \\ &+p_{9,37}+p_{9,229}+p_{9,277}+p_{9,77}+p_{9,461}+p_{9,45}+2p_{9,131} \\ &+p_{9,299}+2p_{9,171}+p_{9,427}+p_{9,375}+p_{9,271}+p_{9,207}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1021} = \frac{1}{2}p_{9,509} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,509}^2 - 4(2p_{9,64}+p_{9,88}+2p_{9,84}+p_{9,386}+p_{9,274} \\ &+2p_{9,82}+p_{9,102}+p_{9,110}+p_{9,222}+p_{9,265}+p_{9,105}+p_{9,345} \\ &+p_{9,37}+p_{9,229}+p_{9,277}+p_{9,77}+p_{9,461}+p_{9,45}+2p_{9,131} \\ &+p_{9,299}+2p_{9,171}+p_{9,427}+p_{9,375}+p_{9,271}+p_{9,207}+2p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,3} = \frac{1}{2}p_{9,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,3}^2 - 4(p_{9,392}+p_{9,280}+2p_{9,88}+p_{9,228}+p_{9,116} \\ &+p_{9,108}+2p_{9,90}+2p_{9,70}+p_{9,94}+p_{9,305}+2p_{9,177}+p_{9,433} \\ &+2p_{9,137}+2p_{9,453}+p_{9,277}+p_{9,213}+p_{9,381}+p_{9,83}+p_{9,467} \\ &+p_{9,51}+p_{9,43}+p_{9,235}+p_{9,283}+p_{9,271}+p_{9,111}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,515} = \frac{1}{2}p_{9,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,3}^2 - 4(p_{9,392}+p_{9,280}+2p_{9,88}+p_{9,228}+p_{9,116} \\ &+p_{9,108}+2p_{9,90}+2p_{9,70}+p_{9,94}+p_{9,305}+2p_{9,177}+p_{9,433} \\ &+2p_{9,137}+2p_{9,453}+p_{9,277}+p_{9,213}+p_{9,381}+p_{9,83}+p_{9,467} \\ &+p_{9,51}+p_{9,43}+p_{9,235}+p_{9,283}+p_{9,271}+p_{9,111}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,259} = \frac{1}{2}p_{9,259} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,259}^2 - 4(p_{9,136}+p_{9,24}+2p_{9,344}+p_{9,484}+p_{9,372} \\ &+p_{9,364}+2p_{9,346}+2p_{9,326}+p_{9,350}+p_{9,49}+p_{9,177}+2p_{9,433} \\ &+2p_{9,393}+2p_{9,197}+p_{9,21}+p_{9,469}+p_{9,125}+p_{9,339}+p_{9,211} \\ &+p_{9,307}+p_{9,299}+p_{9,491}+p_{9,27}+p_{9,15}+p_{9,367}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,771} = \frac{1}{2}p_{9,259} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,259}^2 - 4(p_{9,136}+p_{9,24}+2p_{9,344}+p_{9,484}+p_{9,372} \\ &+p_{9,364}+2p_{9,346}+2p_{9,326}+p_{9,350}+p_{9,49}+p_{9,177}+2p_{9,433} \\ &+2p_{9,393}+2p_{9,197}+p_{9,21}+p_{9,469}+p_{9,125}+p_{9,339}+p_{9,211} \\ &+p_{9,307}+p_{9,299}+p_{9,491}+p_{9,27}+p_{9,15}+p_{9,367}+p_{9,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,643} = \frac{1}{2}p_{9,131} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,131}^2 - 4(p_{9,8}+p_{9,408}+2p_{9,216}+p_{9,356}+p_{9,244} \\ &+p_{9,236}+2p_{9,218}+2p_{9,198}+p_{9,222}+p_{9,49}+2p_{9,305}+p_{9,433} \\ &+2p_{9,265}+2p_{9,69}+p_{9,405}+p_{9,341}+p_{9,509}+p_{9,83}+p_{9,211} \\ &+p_{9,179}+p_{9,171}+p_{9,363}+p_{9,411}+p_{9,399}+p_{9,239}+p_{9,479}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,899} = \frac{1}{2}p_{9,387} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,387}^2 - 4(p_{9,264}+p_{9,152}+2p_{9,472}+p_{9,100}+p_{9,500} \\ &+p_{9,492}+2p_{9,474}+2p_{9,454}+p_{9,478}+2p_{9,49}+p_{9,305}+p_{9,177} \\ &+2p_{9,9}+2p_{9,325}+p_{9,149}+p_{9,85}+p_{9,253}+p_{9,339}+p_{9,467} \\ &+p_{9,435}+p_{9,427}+p_{9,107}+p_{9,155}+p_{9,143}+p_{9,495}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,67} = \frac{1}{2}p_{9,67} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,67}^2 - 4(p_{9,456}+2p_{9,152}+p_{9,344}+p_{9,292}+p_{9,180} \\ &+p_{9,172}+2p_{9,154}+2p_{9,134}+p_{9,158}+p_{9,369}+2p_{9,241}+p_{9,497} \\ &+2p_{9,201}+2p_{9,5}+p_{9,277}+p_{9,341}+p_{9,445}+p_{9,19}+p_{9,147} \\ &+p_{9,115}+p_{9,299}+p_{9,107}+p_{9,347}+p_{9,335}+p_{9,175}+p_{9,415}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,579} = \frac{1}{2}p_{9,67} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,67}^2 - 4(p_{9,456}+2p_{9,152}+p_{9,344}+p_{9,292}+p_{9,180} \\ &+p_{9,172}+2p_{9,154}+2p_{9,134}+p_{9,158}+p_{9,369}+2p_{9,241}+p_{9,497} \\ &+2p_{9,201}+2p_{9,5}+p_{9,277}+p_{9,341}+p_{9,445}+p_{9,19}+p_{9,147} \\ &+p_{9,115}+p_{9,299}+p_{9,107}+p_{9,347}+p_{9,335}+p_{9,175}+p_{9,415}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,835} = \frac{1}{2}p_{9,323} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,323}^2 - 4(p_{9,200}+2p_{9,408}+p_{9,88}+p_{9,36}+p_{9,436} \\ &+p_{9,428}+2p_{9,410}+2p_{9,390}+p_{9,414}+p_{9,113}+p_{9,241}+2p_{9,497} \\ &+2p_{9,457}+2p_{9,261}+p_{9,21}+p_{9,85}+p_{9,189}+p_{9,275}+p_{9,403} \\ &+p_{9,371}+p_{9,43}+p_{9,363}+p_{9,91}+p_{9,79}+p_{9,431}+p_{9,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,707} = \frac{1}{2}p_{9,195} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,195}^2 - 4(p_{9,72}+2p_{9,280}+p_{9,472}+p_{9,420}+p_{9,308} \\ &+p_{9,300}+2p_{9,282}+2p_{9,262}+p_{9,286}+p_{9,113}+2p_{9,369}+p_{9,497} \\ &+2p_{9,329}+2p_{9,133}+p_{9,405}+p_{9,469}+p_{9,61}+p_{9,275}+p_{9,147} \\ &+p_{9,243}+p_{9,427}+p_{9,235}+p_{9,475}+p_{9,463}+p_{9,303}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,451} = \frac{1}{2}p_{9,451} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,451}^2 - 4(p_{9,328}+2p_{9,24}+p_{9,216}+p_{9,164}+p_{9,52} \\ &+p_{9,44}+2p_{9,26}+2p_{9,6}+p_{9,30}+2p_{9,113}+p_{9,369}+p_{9,241} \\ &+2p_{9,73}+2p_{9,389}+p_{9,149}+p_{9,213}+p_{9,317}+p_{9,19}+p_{9,403} \\ &+p_{9,499}+p_{9,171}+p_{9,491}+p_{9,219}+p_{9,207}+p_{9,47}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,963} = \frac{1}{2}p_{9,451} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,451}^2 - 4(p_{9,328}+2p_{9,24}+p_{9,216}+p_{9,164}+p_{9,52} \\ &+p_{9,44}+2p_{9,26}+2p_{9,6}+p_{9,30}+2p_{9,113}+p_{9,369}+p_{9,241} \\ &+2p_{9,73}+2p_{9,389}+p_{9,149}+p_{9,213}+p_{9,317}+p_{9,19}+p_{9,403} \\ &+p_{9,499}+p_{9,171}+p_{9,491}+p_{9,219}+p_{9,207}+p_{9,47}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,35} = \frac{1}{2}p_{9,35} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,35}^2 - 4(p_{9,424}+p_{9,312}+2p_{9,120}+p_{9,260}+p_{9,148} \\ &+p_{9,140}+2p_{9,122}+2p_{9,102}+p_{9,126}+p_{9,337}+2p_{9,209}+p_{9,465} \\ &+2p_{9,169}+2p_{9,485}+p_{9,309}+p_{9,245}+p_{9,413}+p_{9,83}+p_{9,115} \\ &+p_{9,499}+p_{9,267}+p_{9,75}+p_{9,315}+p_{9,143}+p_{9,303}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,547} = \frac{1}{2}p_{9,35} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,35}^2 - 4(p_{9,424}+p_{9,312}+2p_{9,120}+p_{9,260}+p_{9,148} \\ &+p_{9,140}+2p_{9,122}+2p_{9,102}+p_{9,126}+p_{9,337}+2p_{9,209}+p_{9,465} \\ &+2p_{9,169}+2p_{9,485}+p_{9,309}+p_{9,245}+p_{9,413}+p_{9,83}+p_{9,115} \\ &+p_{9,499}+p_{9,267}+p_{9,75}+p_{9,315}+p_{9,143}+p_{9,303}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,291} = \frac{1}{2}p_{9,291} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,291}^2 - 4(p_{9,168}+p_{9,56}+2p_{9,376}+p_{9,4}+p_{9,404} \\ &+p_{9,396}+2p_{9,378}+2p_{9,358}+p_{9,382}+p_{9,81}+p_{9,209}+2p_{9,465} \\ &+2p_{9,425}+2p_{9,229}+p_{9,53}+p_{9,501}+p_{9,157}+p_{9,339}+p_{9,371} \\ &+p_{9,243}+p_{9,11}+p_{9,331}+p_{9,59}+p_{9,399}+p_{9,47}+p_{9,127}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,163} = \frac{1}{2}p_{9,163} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,163}^2 - 4(p_{9,40}+p_{9,440}+2p_{9,248}+p_{9,388}+p_{9,276} \\ &+p_{9,268}+2p_{9,250}+2p_{9,230}+p_{9,254}+p_{9,81}+2p_{9,337}+p_{9,465} \\ &+2p_{9,297}+2p_{9,101}+p_{9,437}+p_{9,373}+p_{9,29}+p_{9,211}+p_{9,115} \\ &+p_{9,243}+p_{9,395}+p_{9,203}+p_{9,443}+p_{9,271}+p_{9,431}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,675} = \frac{1}{2}p_{9,163} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,163}^2 - 4(p_{9,40}+p_{9,440}+2p_{9,248}+p_{9,388}+p_{9,276} \\ &+p_{9,268}+2p_{9,250}+2p_{9,230}+p_{9,254}+p_{9,81}+2p_{9,337}+p_{9,465} \\ &+2p_{9,297}+2p_{9,101}+p_{9,437}+p_{9,373}+p_{9,29}+p_{9,211}+p_{9,115} \\ &+p_{9,243}+p_{9,395}+p_{9,203}+p_{9,443}+p_{9,271}+p_{9,431}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,419} = \frac{1}{2}p_{9,419} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,419}^2 - 4(p_{9,296}+p_{9,184}+2p_{9,504}+p_{9,132}+p_{9,20} \\ &+p_{9,12}+2p_{9,506}+2p_{9,486}+p_{9,510}+2p_{9,81}+p_{9,337}+p_{9,209} \\ &+2p_{9,41}+2p_{9,357}+p_{9,181}+p_{9,117}+p_{9,285}+p_{9,467}+p_{9,371} \\ &+p_{9,499}+p_{9,139}+p_{9,459}+p_{9,187}+p_{9,15}+p_{9,175}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,931} = \frac{1}{2}p_{9,419} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,419}^2 - 4(p_{9,296}+p_{9,184}+2p_{9,504}+p_{9,132}+p_{9,20} \\ &+p_{9,12}+2p_{9,506}+2p_{9,486}+p_{9,510}+2p_{9,81}+p_{9,337}+p_{9,209} \\ &+2p_{9,41}+2p_{9,357}+p_{9,181}+p_{9,117}+p_{9,285}+p_{9,467}+p_{9,371} \\ &+p_{9,499}+p_{9,139}+p_{9,459}+p_{9,187}+p_{9,15}+p_{9,175}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,99} = \frac{1}{2}p_{9,99} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,99}^2 - 4(p_{9,488}+2p_{9,184}+p_{9,376}+p_{9,324}+p_{9,212} \\ &+p_{9,204}+2p_{9,186}+2p_{9,166}+p_{9,190}+p_{9,17}+2p_{9,273}+p_{9,401} \\ &+2p_{9,233}+2p_{9,37}+p_{9,309}+p_{9,373}+p_{9,477}+p_{9,147}+p_{9,51} \\ &+p_{9,179}+p_{9,139}+p_{9,331}+p_{9,379}+p_{9,207}+p_{9,367}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,611} = \frac{1}{2}p_{9,99} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,99}^2 - 4(p_{9,488}+2p_{9,184}+p_{9,376}+p_{9,324}+p_{9,212} \\ &+p_{9,204}+2p_{9,186}+2p_{9,166}+p_{9,190}+p_{9,17}+2p_{9,273}+p_{9,401} \\ &+2p_{9,233}+2p_{9,37}+p_{9,309}+p_{9,373}+p_{9,477}+p_{9,147}+p_{9,51} \\ &+p_{9,179}+p_{9,139}+p_{9,331}+p_{9,379}+p_{9,207}+p_{9,367}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,355} = \frac{1}{2}p_{9,355} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,355}^2 - 4(p_{9,232}+2p_{9,440}+p_{9,120}+p_{9,68}+p_{9,468} \\ &+p_{9,460}+2p_{9,442}+2p_{9,422}+p_{9,446}+2p_{9,17}+p_{9,273}+p_{9,145} \\ &+2p_{9,489}+2p_{9,293}+p_{9,53}+p_{9,117}+p_{9,221}+p_{9,403}+p_{9,307} \\ &+p_{9,435}+p_{9,395}+p_{9,75}+p_{9,123}+p_{9,463}+p_{9,111}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,867} = \frac{1}{2}p_{9,355} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,355}^2 - 4(p_{9,232}+2p_{9,440}+p_{9,120}+p_{9,68}+p_{9,468} \\ &+p_{9,460}+2p_{9,442}+2p_{9,422}+p_{9,446}+2p_{9,17}+p_{9,273}+p_{9,145} \\ &+2p_{9,489}+2p_{9,293}+p_{9,53}+p_{9,117}+p_{9,221}+p_{9,403}+p_{9,307} \\ &+p_{9,435}+p_{9,395}+p_{9,75}+p_{9,123}+p_{9,463}+p_{9,111}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,227} = \frac{1}{2}p_{9,227} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,227}^2 - 4(p_{9,104}+2p_{9,312}+p_{9,504}+p_{9,452}+p_{9,340} \\ &+p_{9,332}+2p_{9,314}+2p_{9,294}+p_{9,318}+p_{9,17}+p_{9,145}+2p_{9,401} \\ &+2p_{9,361}+2p_{9,165}+p_{9,437}+p_{9,501}+p_{9,93}+p_{9,275}+p_{9,307} \\ &+p_{9,179}+p_{9,267}+p_{9,459}+p_{9,507}+p_{9,335}+p_{9,495}+p_{9,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,483} = \frac{1}{2}p_{9,483} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,483}^2 - 4(p_{9,360}+2p_{9,56}+p_{9,248}+p_{9,196}+p_{9,84} \\ &+p_{9,76}+2p_{9,58}+2p_{9,38}+p_{9,62}+p_{9,273}+2p_{9,145}+p_{9,401} \\ &+2p_{9,105}+2p_{9,421}+p_{9,181}+p_{9,245}+p_{9,349}+p_{9,19}+p_{9,51} \\ &+p_{9,435}+p_{9,11}+p_{9,203}+p_{9,251}+p_{9,79}+p_{9,239}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,995} = \frac{1}{2}p_{9,483} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,483}^2 - 4(p_{9,360}+2p_{9,56}+p_{9,248}+p_{9,196}+p_{9,84} \\ &+p_{9,76}+2p_{9,58}+2p_{9,38}+p_{9,62}+p_{9,273}+2p_{9,145}+p_{9,401} \\ &+2p_{9,105}+2p_{9,421}+p_{9,181}+p_{9,245}+p_{9,349}+p_{9,19}+p_{9,51} \\ &+p_{9,435}+p_{9,11}+p_{9,203}+p_{9,251}+p_{9,79}+p_{9,239}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,19} = \frac{1}{2}p_{9,19} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,19}^2 - 4(p_{9,296}+2p_{9,104}+p_{9,408}+p_{9,132}+p_{9,244} \\ &+p_{9,124}+2p_{9,106}+2p_{9,86}+p_{9,110}+p_{9,321}+2p_{9,193}+p_{9,449} \\ &+2p_{9,153}+p_{9,293}+p_{9,229}+2p_{9,469}+p_{9,397}+p_{9,67}+p_{9,99} \\ &+p_{9,483}+p_{9,299}+p_{9,59}+p_{9,251}+p_{9,367}+p_{9,287}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,531} = \frac{1}{2}p_{9,19} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,19}^2 - 4(p_{9,296}+2p_{9,104}+p_{9,408}+p_{9,132}+p_{9,244} \\ &+p_{9,124}+2p_{9,106}+2p_{9,86}+p_{9,110}+p_{9,321}+2p_{9,193}+p_{9,449} \\ &+2p_{9,153}+p_{9,293}+p_{9,229}+2p_{9,469}+p_{9,397}+p_{9,67}+p_{9,99} \\ &+p_{9,483}+p_{9,299}+p_{9,59}+p_{9,251}+p_{9,367}+p_{9,287}+p_{9,127}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,787} = \frac{1}{2}p_{9,275} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,275}^2 - 4(p_{9,40}+2p_{9,360}+p_{9,152}+p_{9,388}+p_{9,500} \\ &+p_{9,380}+2p_{9,362}+2p_{9,342}+p_{9,366}+p_{9,65}+p_{9,193}+2p_{9,449} \\ &+2p_{9,409}+p_{9,37}+p_{9,485}+2p_{9,213}+p_{9,141}+p_{9,323}+p_{9,355} \\ &+p_{9,227}+p_{9,43}+p_{9,315}+p_{9,507}+p_{9,111}+p_{9,31}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,147} = \frac{1}{2}p_{9,147} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,147}^2 - 4(p_{9,424}+2p_{9,232}+p_{9,24}+p_{9,260}+p_{9,372} \\ &+p_{9,252}+2p_{9,234}+2p_{9,214}+p_{9,238}+p_{9,65}+2p_{9,321}+p_{9,449} \\ &+2p_{9,281}+p_{9,421}+p_{9,357}+2p_{9,85}+p_{9,13}+p_{9,195}+p_{9,99} \\ &+p_{9,227}+p_{9,427}+p_{9,187}+p_{9,379}+p_{9,495}+p_{9,415}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,659} = \frac{1}{2}p_{9,147} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,147}^2 - 4(p_{9,424}+2p_{9,232}+p_{9,24}+p_{9,260}+p_{9,372} \\ &+p_{9,252}+2p_{9,234}+2p_{9,214}+p_{9,238}+p_{9,65}+2p_{9,321}+p_{9,449} \\ &+2p_{9,281}+p_{9,421}+p_{9,357}+2p_{9,85}+p_{9,13}+p_{9,195}+p_{9,99} \\ &+p_{9,227}+p_{9,427}+p_{9,187}+p_{9,379}+p_{9,495}+p_{9,415}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,403} = \frac{1}{2}p_{9,403} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,403}^2 - 4(p_{9,168}+2p_{9,488}+p_{9,280}+p_{9,4}+p_{9,116} \\ &+p_{9,508}+2p_{9,490}+2p_{9,470}+p_{9,494}+2p_{9,65}+p_{9,321}+p_{9,193} \\ &+2p_{9,25}+p_{9,165}+p_{9,101}+2p_{9,341}+p_{9,269}+p_{9,451}+p_{9,355} \\ &+p_{9,483}+p_{9,171}+p_{9,443}+p_{9,123}+p_{9,239}+p_{9,159}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,915} = \frac{1}{2}p_{9,403} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,403}^2 - 4(p_{9,168}+2p_{9,488}+p_{9,280}+p_{9,4}+p_{9,116} \\ &+p_{9,508}+2p_{9,490}+2p_{9,470}+p_{9,494}+2p_{9,65}+p_{9,321}+p_{9,193} \\ &+2p_{9,25}+p_{9,165}+p_{9,101}+2p_{9,341}+p_{9,269}+p_{9,451}+p_{9,355} \\ &+p_{9,483}+p_{9,171}+p_{9,443}+p_{9,123}+p_{9,239}+p_{9,159}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,83} = \frac{1}{2}p_{9,83} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,83}^2 - 4(2p_{9,168}+p_{9,360}+p_{9,472}+p_{9,196}+p_{9,308} \\ &+p_{9,188}+2p_{9,170}+2p_{9,150}+p_{9,174}+p_{9,1}+2p_{9,257}+p_{9,385} \\ &+2p_{9,217}+p_{9,293}+p_{9,357}+2p_{9,21}+p_{9,461}+p_{9,131}+p_{9,35} \\ &+p_{9,163}+p_{9,363}+p_{9,315}+p_{9,123}+p_{9,431}+p_{9,351}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,595} = \frac{1}{2}p_{9,83} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,83}^2 - 4(2p_{9,168}+p_{9,360}+p_{9,472}+p_{9,196}+p_{9,308} \\ &+p_{9,188}+2p_{9,170}+2p_{9,150}+p_{9,174}+p_{9,1}+2p_{9,257}+p_{9,385} \\ &+2p_{9,217}+p_{9,293}+p_{9,357}+2p_{9,21}+p_{9,461}+p_{9,131}+p_{9,35} \\ &+p_{9,163}+p_{9,363}+p_{9,315}+p_{9,123}+p_{9,431}+p_{9,351}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,339} = \frac{1}{2}p_{9,339} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,339}^2 - 4(2p_{9,424}+p_{9,104}+p_{9,216}+p_{9,452}+p_{9,52} \\ &+p_{9,444}+2p_{9,426}+2p_{9,406}+p_{9,430}+2p_{9,1}+p_{9,257}+p_{9,129} \\ &+2p_{9,473}+p_{9,37}+p_{9,101}+2p_{9,277}+p_{9,205}+p_{9,387}+p_{9,291} \\ &+p_{9,419}+p_{9,107}+p_{9,59}+p_{9,379}+p_{9,175}+p_{9,95}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,851} = \frac{1}{2}p_{9,339} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,339}^2 - 4(2p_{9,424}+p_{9,104}+p_{9,216}+p_{9,452}+p_{9,52} \\ &+p_{9,444}+2p_{9,426}+2p_{9,406}+p_{9,430}+2p_{9,1}+p_{9,257}+p_{9,129} \\ &+2p_{9,473}+p_{9,37}+p_{9,101}+2p_{9,277}+p_{9,205}+p_{9,387}+p_{9,291} \\ &+p_{9,419}+p_{9,107}+p_{9,59}+p_{9,379}+p_{9,175}+p_{9,95}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,211} = \frac{1}{2}p_{9,211} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,211}^2 - 4(2p_{9,296}+p_{9,488}+p_{9,88}+p_{9,324}+p_{9,436} \\ &+p_{9,316}+2p_{9,298}+2p_{9,278}+p_{9,302}+p_{9,1}+p_{9,129}+2p_{9,385} \\ &+2p_{9,345}+p_{9,421}+p_{9,485}+2p_{9,149}+p_{9,77}+p_{9,259}+p_{9,291} \\ &+p_{9,163}+p_{9,491}+p_{9,443}+p_{9,251}+p_{9,47}+p_{9,479}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,723} = \frac{1}{2}p_{9,211} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,211}^2 - 4(2p_{9,296}+p_{9,488}+p_{9,88}+p_{9,324}+p_{9,436} \\ &+p_{9,316}+2p_{9,298}+2p_{9,278}+p_{9,302}+p_{9,1}+p_{9,129}+2p_{9,385} \\ &+2p_{9,345}+p_{9,421}+p_{9,485}+2p_{9,149}+p_{9,77}+p_{9,259}+p_{9,291} \\ &+p_{9,163}+p_{9,491}+p_{9,443}+p_{9,251}+p_{9,47}+p_{9,479}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,467} = \frac{1}{2}p_{9,467} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,467}^2 - 4(2p_{9,40}+p_{9,232}+p_{9,344}+p_{9,68}+p_{9,180} \\ &+p_{9,60}+2p_{9,42}+2p_{9,22}+p_{9,46}+p_{9,257}+2p_{9,129}+p_{9,385} \\ &+2p_{9,89}+p_{9,165}+p_{9,229}+2p_{9,405}+p_{9,333}+p_{9,3}+p_{9,35} \\ &+p_{9,419}+p_{9,235}+p_{9,187}+p_{9,507}+p_{9,303}+p_{9,223}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,979} = \frac{1}{2}p_{9,467} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,467}^2 - 4(2p_{9,40}+p_{9,232}+p_{9,344}+p_{9,68}+p_{9,180} \\ &+p_{9,60}+2p_{9,42}+2p_{9,22}+p_{9,46}+p_{9,257}+2p_{9,129}+p_{9,385} \\ &+2p_{9,89}+p_{9,165}+p_{9,229}+2p_{9,405}+p_{9,333}+p_{9,3}+p_{9,35} \\ &+p_{9,419}+p_{9,235}+p_{9,187}+p_{9,507}+p_{9,303}+p_{9,223}+p_{9,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,563} = \frac{1}{2}p_{9,51} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,51}^2 - 4(2p_{9,136}+p_{9,328}+p_{9,440}+p_{9,164}+p_{9,276} \\ &+p_{9,156}+2p_{9,138}+2p_{9,118}+p_{9,142}+p_{9,353}+2p_{9,225}+p_{9,481} \\ &+2p_{9,185}+p_{9,261}+p_{9,325}+2p_{9,501}+p_{9,429}+p_{9,3}+p_{9,131} \\ &+p_{9,99}+p_{9,331}+p_{9,283}+p_{9,91}+p_{9,399}+p_{9,159}+p_{9,319}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,307} = \frac{1}{2}p_{9,307} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,307}^2 - 4(2p_{9,392}+p_{9,72}+p_{9,184}+p_{9,420}+p_{9,20} \\ &+p_{9,412}+2p_{9,394}+2p_{9,374}+p_{9,398}+p_{9,97}+p_{9,225}+2p_{9,481} \\ &+2p_{9,441}+p_{9,5}+p_{9,69}+2p_{9,245}+p_{9,173}+p_{9,259}+p_{9,387} \\ &+p_{9,355}+p_{9,75}+p_{9,27}+p_{9,347}+p_{9,143}+p_{9,415}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,819} = \frac{1}{2}p_{9,307} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,307}^2 - 4(2p_{9,392}+p_{9,72}+p_{9,184}+p_{9,420}+p_{9,20} \\ &+p_{9,412}+2p_{9,394}+2p_{9,374}+p_{9,398}+p_{9,97}+p_{9,225}+2p_{9,481} \\ &+2p_{9,441}+p_{9,5}+p_{9,69}+2p_{9,245}+p_{9,173}+p_{9,259}+p_{9,387} \\ &+p_{9,355}+p_{9,75}+p_{9,27}+p_{9,347}+p_{9,143}+p_{9,415}+p_{9,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,691} = \frac{1}{2}p_{9,179} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,179}^2 - 4(2p_{9,264}+p_{9,456}+p_{9,56}+p_{9,292}+p_{9,404} \\ &+p_{9,284}+2p_{9,266}+2p_{9,246}+p_{9,270}+p_{9,97}+2p_{9,353}+p_{9,481} \\ &+2p_{9,313}+p_{9,389}+p_{9,453}+2p_{9,117}+p_{9,45}+p_{9,259}+p_{9,131} \\ &+p_{9,227}+p_{9,459}+p_{9,411}+p_{9,219}+p_{9,15}+p_{9,287}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,435} = \frac{1}{2}p_{9,435} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,435}^2 - 4(2p_{9,8}+p_{9,200}+p_{9,312}+p_{9,36}+p_{9,148} \\ &+p_{9,28}+2p_{9,10}+2p_{9,502}+p_{9,14}+2p_{9,97}+p_{9,353}+p_{9,225} \\ &+2p_{9,57}+p_{9,133}+p_{9,197}+2p_{9,373}+p_{9,301}+p_{9,3}+p_{9,387} \\ &+p_{9,483}+p_{9,203}+p_{9,155}+p_{9,475}+p_{9,271}+p_{9,31}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,947} = \frac{1}{2}p_{9,435} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,435}^2 - 4(2p_{9,8}+p_{9,200}+p_{9,312}+p_{9,36}+p_{9,148} \\ &+p_{9,28}+2p_{9,10}+2p_{9,502}+p_{9,14}+2p_{9,97}+p_{9,353}+p_{9,225} \\ &+2p_{9,57}+p_{9,133}+p_{9,197}+2p_{9,373}+p_{9,301}+p_{9,3}+p_{9,387} \\ &+p_{9,483}+p_{9,203}+p_{9,155}+p_{9,475}+p_{9,271}+p_{9,31}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,115} = \frac{1}{2}p_{9,115} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,115}^2 - 4(p_{9,392}+2p_{9,200}+p_{9,504}+p_{9,228}+p_{9,340} \\ &+p_{9,220}+2p_{9,202}+2p_{9,182}+p_{9,206}+p_{9,33}+2p_{9,289}+p_{9,417} \\ &+2p_{9,249}+p_{9,389}+p_{9,325}+2p_{9,53}+p_{9,493}+p_{9,67}+p_{9,195} \\ &+p_{9,163}+p_{9,395}+p_{9,155}+p_{9,347}+p_{9,463}+p_{9,223}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,627} = \frac{1}{2}p_{9,115} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,115}^2 - 4(p_{9,392}+2p_{9,200}+p_{9,504}+p_{9,228}+p_{9,340} \\ &+p_{9,220}+2p_{9,202}+2p_{9,182}+p_{9,206}+p_{9,33}+2p_{9,289}+p_{9,417} \\ &+2p_{9,249}+p_{9,389}+p_{9,325}+2p_{9,53}+p_{9,493}+p_{9,67}+p_{9,195} \\ &+p_{9,163}+p_{9,395}+p_{9,155}+p_{9,347}+p_{9,463}+p_{9,223}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,371} = \frac{1}{2}p_{9,371} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,371}^2 - 4(p_{9,136}+2p_{9,456}+p_{9,248}+p_{9,484}+p_{9,84} \\ &+p_{9,476}+2p_{9,458}+2p_{9,438}+p_{9,462}+2p_{9,33}+p_{9,289}+p_{9,161} \\ &+2p_{9,505}+p_{9,133}+p_{9,69}+2p_{9,309}+p_{9,237}+p_{9,323}+p_{9,451} \\ &+p_{9,419}+p_{9,139}+p_{9,411}+p_{9,91}+p_{9,207}+p_{9,479}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,883} = \frac{1}{2}p_{9,371} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,371}^2 - 4(p_{9,136}+2p_{9,456}+p_{9,248}+p_{9,484}+p_{9,84} \\ &+p_{9,476}+2p_{9,458}+2p_{9,438}+p_{9,462}+2p_{9,33}+p_{9,289}+p_{9,161} \\ &+2p_{9,505}+p_{9,133}+p_{9,69}+2p_{9,309}+p_{9,237}+p_{9,323}+p_{9,451} \\ &+p_{9,419}+p_{9,139}+p_{9,411}+p_{9,91}+p_{9,207}+p_{9,479}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,243} = \frac{1}{2}p_{9,243} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,243}^2 - 4(p_{9,8}+2p_{9,328}+p_{9,120}+p_{9,356}+p_{9,468} \\ &+p_{9,348}+2p_{9,330}+2p_{9,310}+p_{9,334}+p_{9,33}+p_{9,161}+2p_{9,417} \\ &+2p_{9,377}+p_{9,5}+p_{9,453}+2p_{9,181}+p_{9,109}+p_{9,323}+p_{9,195} \\ &+p_{9,291}+p_{9,11}+p_{9,283}+p_{9,475}+p_{9,79}+p_{9,351}+p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,499} = \frac{1}{2}p_{9,499} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,499}^2 - 4(p_{9,264}+2p_{9,72}+p_{9,376}+p_{9,100}+p_{9,212} \\ &+p_{9,92}+2p_{9,74}+2p_{9,54}+p_{9,78}+p_{9,289}+2p_{9,161}+p_{9,417} \\ &+2p_{9,121}+p_{9,261}+p_{9,197}+2p_{9,437}+p_{9,365}+p_{9,67}+p_{9,451} \\ &+p_{9,35}+p_{9,267}+p_{9,27}+p_{9,219}+p_{9,335}+p_{9,95}+p_{9,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,11} = \frac{1}{2}p_{9,11} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,11}^2 - 4(p_{9,288}+2p_{9,96}+p_{9,400}+p_{9,116}+p_{9,236} \\ &+p_{9,124}+2p_{9,98}+p_{9,102}+2p_{9,78}+2p_{9,145}+p_{9,313}+2p_{9,185} \\ &+p_{9,441}+p_{9,389}+2p_{9,461}+p_{9,285}+p_{9,221}+p_{9,291}+p_{9,51} \\ &+p_{9,243}+p_{9,91}+p_{9,475}+p_{9,59}+p_{9,359}+p_{9,279}+p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,523} = \frac{1}{2}p_{9,11} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,11}^2 - 4(p_{9,288}+2p_{9,96}+p_{9,400}+p_{9,116}+p_{9,236} \\ &+p_{9,124}+2p_{9,98}+p_{9,102}+2p_{9,78}+2p_{9,145}+p_{9,313}+2p_{9,185} \\ &+p_{9,441}+p_{9,389}+2p_{9,461}+p_{9,285}+p_{9,221}+p_{9,291}+p_{9,51} \\ &+p_{9,243}+p_{9,91}+p_{9,475}+p_{9,59}+p_{9,359}+p_{9,279}+p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,267} = \frac{1}{2}p_{9,267} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,267}^2 - 4(p_{9,32}+2p_{9,352}+p_{9,144}+p_{9,372}+p_{9,492} \\ &+p_{9,380}+2p_{9,354}+p_{9,358}+2p_{9,334}+2p_{9,401}+p_{9,57}+p_{9,185} \\ &+2p_{9,441}+p_{9,133}+2p_{9,205}+p_{9,29}+p_{9,477}+p_{9,35}+p_{9,307} \\ &+p_{9,499}+p_{9,347}+p_{9,219}+p_{9,315}+p_{9,103}+p_{9,23}+p_{9,375}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,779} = \frac{1}{2}p_{9,267} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,267}^2 - 4(p_{9,32}+2p_{9,352}+p_{9,144}+p_{9,372}+p_{9,492} \\ &+p_{9,380}+2p_{9,354}+p_{9,358}+2p_{9,334}+2p_{9,401}+p_{9,57}+p_{9,185} \\ &+2p_{9,441}+p_{9,133}+2p_{9,205}+p_{9,29}+p_{9,477}+p_{9,35}+p_{9,307} \\ &+p_{9,499}+p_{9,347}+p_{9,219}+p_{9,315}+p_{9,103}+p_{9,23}+p_{9,375}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,651} = \frac{1}{2}p_{9,139} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,139}^2 - 4(p_{9,416}+2p_{9,224}+p_{9,16}+p_{9,244}+p_{9,364} \\ &+p_{9,252}+2p_{9,226}+p_{9,230}+2p_{9,206}+2p_{9,273}+p_{9,57}+2p_{9,313} \\ &+p_{9,441}+p_{9,5}+2p_{9,77}+p_{9,413}+p_{9,349}+p_{9,419}+p_{9,179} \\ &+p_{9,371}+p_{9,91}+p_{9,219}+p_{9,187}+p_{9,487}+p_{9,407}+p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,395} = \frac{1}{2}p_{9,395} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,395}^2 - 4(p_{9,160}+2p_{9,480}+p_{9,272}+p_{9,500}+p_{9,108} \\ &+p_{9,508}+2p_{9,482}+p_{9,486}+2p_{9,462}+2p_{9,17}+2p_{9,57}+p_{9,313} \\ &+p_{9,185}+p_{9,261}+2p_{9,333}+p_{9,157}+p_{9,93}+p_{9,163}+p_{9,435} \\ &+p_{9,115}+p_{9,347}+p_{9,475}+p_{9,443}+p_{9,231}+p_{9,151}+p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,907} = \frac{1}{2}p_{9,395} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,395}^2 - 4(p_{9,160}+2p_{9,480}+p_{9,272}+p_{9,500}+p_{9,108} \\ &+p_{9,508}+2p_{9,482}+p_{9,486}+2p_{9,462}+2p_{9,17}+2p_{9,57}+p_{9,313} \\ &+p_{9,185}+p_{9,261}+2p_{9,333}+p_{9,157}+p_{9,93}+p_{9,163}+p_{9,435} \\ &+p_{9,115}+p_{9,347}+p_{9,475}+p_{9,443}+p_{9,231}+p_{9,151}+p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,75} = \frac{1}{2}p_{9,75} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,75}^2 - 4(2p_{9,160}+p_{9,352}+p_{9,464}+p_{9,180}+p_{9,300} \\ &+p_{9,188}+2p_{9,162}+p_{9,166}+2p_{9,142}+2p_{9,209}+p_{9,377}+2p_{9,249} \\ &+p_{9,505}+p_{9,453}+2p_{9,13}+p_{9,285}+p_{9,349}+p_{9,355}+p_{9,307} \\ &+p_{9,115}+p_{9,27}+p_{9,155}+p_{9,123}+p_{9,423}+p_{9,343}+p_{9,183}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,587} = \frac{1}{2}p_{9,75} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,75}^2 - 4(2p_{9,160}+p_{9,352}+p_{9,464}+p_{9,180}+p_{9,300} \\ &+p_{9,188}+2p_{9,162}+p_{9,166}+2p_{9,142}+2p_{9,209}+p_{9,377}+2p_{9,249} \\ &+p_{9,505}+p_{9,453}+2p_{9,13}+p_{9,285}+p_{9,349}+p_{9,355}+p_{9,307} \\ &+p_{9,115}+p_{9,27}+p_{9,155}+p_{9,123}+p_{9,423}+p_{9,343}+p_{9,183}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,331} = \frac{1}{2}p_{9,331} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,331}^2 - 4(2p_{9,416}+p_{9,96}+p_{9,208}+p_{9,436}+p_{9,44} \\ &+p_{9,444}+2p_{9,418}+p_{9,422}+2p_{9,398}+2p_{9,465}+p_{9,121}+p_{9,249} \\ &+2p_{9,505}+p_{9,197}+2p_{9,269}+p_{9,29}+p_{9,93}+p_{9,99}+p_{9,51} \\ &+p_{9,371}+p_{9,283}+p_{9,411}+p_{9,379}+p_{9,167}+p_{9,87}+p_{9,439}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,843} = \frac{1}{2}p_{9,331} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,331}^2 - 4(2p_{9,416}+p_{9,96}+p_{9,208}+p_{9,436}+p_{9,44} \\ &+p_{9,444}+2p_{9,418}+p_{9,422}+2p_{9,398}+2p_{9,465}+p_{9,121}+p_{9,249} \\ &+2p_{9,505}+p_{9,197}+2p_{9,269}+p_{9,29}+p_{9,93}+p_{9,99}+p_{9,51} \\ &+p_{9,371}+p_{9,283}+p_{9,411}+p_{9,379}+p_{9,167}+p_{9,87}+p_{9,439}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,715} = \frac{1}{2}p_{9,203} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,203}^2 - 4(2p_{9,288}+p_{9,480}+p_{9,80}+p_{9,308}+p_{9,428} \\ &+p_{9,316}+2p_{9,290}+p_{9,294}+2p_{9,270}+2p_{9,337}+p_{9,121}+2p_{9,377} \\ &+p_{9,505}+p_{9,69}+2p_{9,141}+p_{9,413}+p_{9,477}+p_{9,483}+p_{9,435} \\ &+p_{9,243}+p_{9,283}+p_{9,155}+p_{9,251}+p_{9,39}+p_{9,471}+p_{9,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,459} = \frac{1}{2}p_{9,459} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,459}^2 - 4(2p_{9,32}+p_{9,224}+p_{9,336}+p_{9,52}+p_{9,172} \\ &+p_{9,60}+2p_{9,34}+p_{9,38}+2p_{9,14}+2p_{9,81}+2p_{9,121}+p_{9,377} \\ &+p_{9,249}+p_{9,325}+2p_{9,397}+p_{9,157}+p_{9,221}+p_{9,227}+p_{9,179} \\ &+p_{9,499}+p_{9,27}+p_{9,411}+p_{9,507}+p_{9,295}+p_{9,215}+p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,971} = \frac{1}{2}p_{9,459} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,459}^2 - 4(2p_{9,32}+p_{9,224}+p_{9,336}+p_{9,52}+p_{9,172} \\ &+p_{9,60}+2p_{9,34}+p_{9,38}+2p_{9,14}+2p_{9,81}+2p_{9,121}+p_{9,377} \\ &+p_{9,249}+p_{9,325}+2p_{9,397}+p_{9,157}+p_{9,221}+p_{9,227}+p_{9,179} \\ &+p_{9,499}+p_{9,27}+p_{9,411}+p_{9,507}+p_{9,295}+p_{9,215}+p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,43} = \frac{1}{2}p_{9,43} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,43}^2 - 4(2p_{9,128}+p_{9,320}+p_{9,432}+p_{9,148}+p_{9,268} \\ &+p_{9,156}+2p_{9,130}+p_{9,134}+2p_{9,110}+2p_{9,177}+p_{9,345}+2p_{9,217} \\ &+p_{9,473}+p_{9,421}+2p_{9,493}+p_{9,317}+p_{9,253}+p_{9,323}+p_{9,275} \\ &+p_{9,83}+p_{9,91}+p_{9,123}+p_{9,507}+p_{9,391}+p_{9,151}+p_{9,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,555} = \frac{1}{2}p_{9,43} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,43}^2 - 4(2p_{9,128}+p_{9,320}+p_{9,432}+p_{9,148}+p_{9,268} \\ &+p_{9,156}+2p_{9,130}+p_{9,134}+2p_{9,110}+2p_{9,177}+p_{9,345}+2p_{9,217} \\ &+p_{9,473}+p_{9,421}+2p_{9,493}+p_{9,317}+p_{9,253}+p_{9,323}+p_{9,275} \\ &+p_{9,83}+p_{9,91}+p_{9,123}+p_{9,507}+p_{9,391}+p_{9,151}+p_{9,311}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,811} = \frac{1}{2}p_{9,299} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,299}^2 - 4(2p_{9,384}+p_{9,64}+p_{9,176}+p_{9,404}+p_{9,12} \\ &+p_{9,412}+2p_{9,386}+p_{9,390}+2p_{9,366}+2p_{9,433}+p_{9,89}+p_{9,217} \\ &+2p_{9,473}+p_{9,165}+2p_{9,237}+p_{9,61}+p_{9,509}+p_{9,67}+p_{9,19} \\ &+p_{9,339}+p_{9,347}+p_{9,379}+p_{9,251}+p_{9,135}+p_{9,407}+p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,171} = \frac{1}{2}p_{9,171} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,171}^2 - 4(2p_{9,256}+p_{9,448}+p_{9,48}+p_{9,276}+p_{9,396} \\ &+p_{9,284}+2p_{9,258}+p_{9,262}+2p_{9,238}+2p_{9,305}+p_{9,89}+2p_{9,345} \\ &+p_{9,473}+p_{9,37}+2p_{9,109}+p_{9,445}+p_{9,381}+p_{9,451}+p_{9,403} \\ &+p_{9,211}+p_{9,219}+p_{9,123}+p_{9,251}+p_{9,7}+p_{9,279}+p_{9,439}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,683} = \frac{1}{2}p_{9,171} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,171}^2 - 4(2p_{9,256}+p_{9,448}+p_{9,48}+p_{9,276}+p_{9,396} \\ &+p_{9,284}+2p_{9,258}+p_{9,262}+2p_{9,238}+2p_{9,305}+p_{9,89}+2p_{9,345} \\ &+p_{9,473}+p_{9,37}+2p_{9,109}+p_{9,445}+p_{9,381}+p_{9,451}+p_{9,403} \\ &+p_{9,211}+p_{9,219}+p_{9,123}+p_{9,251}+p_{9,7}+p_{9,279}+p_{9,439}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,427} = \frac{1}{2}p_{9,427} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,427}^2 - 4(2p_{9,0}+p_{9,192}+p_{9,304}+p_{9,20}+p_{9,140} \\ &+p_{9,28}+2p_{9,2}+p_{9,6}+2p_{9,494}+2p_{9,49}+2p_{9,89}+p_{9,345} \\ &+p_{9,217}+p_{9,293}+2p_{9,365}+p_{9,189}+p_{9,125}+p_{9,195}+p_{9,147} \\ &+p_{9,467}+p_{9,475}+p_{9,379}+p_{9,507}+p_{9,263}+p_{9,23}+p_{9,183}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,939} = \frac{1}{2}p_{9,427} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,427}^2 - 4(2p_{9,0}+p_{9,192}+p_{9,304}+p_{9,20}+p_{9,140} \\ &+p_{9,28}+2p_{9,2}+p_{9,6}+2p_{9,494}+2p_{9,49}+2p_{9,89}+p_{9,345} \\ &+p_{9,217}+p_{9,293}+2p_{9,365}+p_{9,189}+p_{9,125}+p_{9,195}+p_{9,147} \\ &+p_{9,467}+p_{9,475}+p_{9,379}+p_{9,507}+p_{9,263}+p_{9,23}+p_{9,183}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 3 unreferenced roots were skipped} {\footnotesize \[p_{10,875} = \frac{1}{2}p_{9,363} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,363}^2 - 4(p_{9,128}+2p_{9,448}+p_{9,240}+p_{9,468}+p_{9,76} \\ &+p_{9,476}+2p_{9,450}+p_{9,454}+2p_{9,430}+2p_{9,497}+2p_{9,25}+p_{9,281} \\ &+p_{9,153}+p_{9,229}+2p_{9,301}+p_{9,61}+p_{9,125}+p_{9,131}+p_{9,403} \\ &+p_{9,83}+p_{9,411}+p_{9,315}+p_{9,443}+p_{9,199}+p_{9,471}+p_{9,119}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,747} = \frac{1}{2}p_{9,235} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,235}^2 - 4(p_{9,0}+2p_{9,320}+p_{9,112}+p_{9,340}+p_{9,460} \\ &+p_{9,348}+2p_{9,322}+p_{9,326}+2p_{9,302}+2p_{9,369}+p_{9,25}+p_{9,153} \\ &+2p_{9,409}+p_{9,101}+2p_{9,173}+p_{9,445}+p_{9,509}+p_{9,3}+p_{9,275} \\ &+p_{9,467}+p_{9,283}+p_{9,315}+p_{9,187}+p_{9,71}+p_{9,343}+p_{9,503}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,27} = \frac{1}{2}p_{9,27} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,27}^2 - 4(p_{9,416}+p_{9,304}+2p_{9,112}+p_{9,132}+p_{9,140} \\ &+p_{9,252}+2p_{9,114}+p_{9,118}+2p_{9,94}+2p_{9,161}+p_{9,329}+2p_{9,201} \\ &+p_{9,457}+p_{9,405}+p_{9,301}+p_{9,237}+2p_{9,477}+p_{9,259}+p_{9,67} \\ &+p_{9,307}+p_{9,75}+p_{9,107}+p_{9,491}+p_{9,135}+p_{9,295}+p_{9,375}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,283} = \frac{1}{2}p_{9,283} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,283}^2 - 4(p_{9,160}+p_{9,48}+2p_{9,368}+p_{9,388}+p_{9,396} \\ &+p_{9,508}+2p_{9,370}+p_{9,374}+2p_{9,350}+2p_{9,417}+p_{9,73}+p_{9,201} \\ &+2p_{9,457}+p_{9,149}+p_{9,45}+p_{9,493}+2p_{9,221}+p_{9,3}+p_{9,323} \\ &+p_{9,51}+p_{9,331}+p_{9,363}+p_{9,235}+p_{9,391}+p_{9,39}+p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,795} = \frac{1}{2}p_{9,283} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,283}^2 - 4(p_{9,160}+p_{9,48}+2p_{9,368}+p_{9,388}+p_{9,396} \\ &+p_{9,508}+2p_{9,370}+p_{9,374}+2p_{9,350}+2p_{9,417}+p_{9,73}+p_{9,201} \\ &+2p_{9,457}+p_{9,149}+p_{9,45}+p_{9,493}+2p_{9,221}+p_{9,3}+p_{9,323} \\ &+p_{9,51}+p_{9,331}+p_{9,363}+p_{9,235}+p_{9,391}+p_{9,39}+p_{9,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,155} = \frac{1}{2}p_{9,155} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,155}^2 - 4(p_{9,32}+p_{9,432}+2p_{9,240}+p_{9,260}+p_{9,268} \\ &+p_{9,380}+2p_{9,242}+p_{9,246}+2p_{9,222}+2p_{9,289}+p_{9,73}+2p_{9,329} \\ &+p_{9,457}+p_{9,21}+p_{9,429}+p_{9,365}+2p_{9,93}+p_{9,387}+p_{9,195} \\ &+p_{9,435}+p_{9,203}+p_{9,107}+p_{9,235}+p_{9,263}+p_{9,423}+p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,667} = \frac{1}{2}p_{9,155} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,155}^2 - 4(p_{9,32}+p_{9,432}+2p_{9,240}+p_{9,260}+p_{9,268} \\ &+p_{9,380}+2p_{9,242}+p_{9,246}+2p_{9,222}+2p_{9,289}+p_{9,73}+2p_{9,329} \\ &+p_{9,457}+p_{9,21}+p_{9,429}+p_{9,365}+2p_{9,93}+p_{9,387}+p_{9,195} \\ &+p_{9,435}+p_{9,203}+p_{9,107}+p_{9,235}+p_{9,263}+p_{9,423}+p_{9,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,411} = \frac{1}{2}p_{9,411} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,411}^2 - 4(p_{9,288}+p_{9,176}+2p_{9,496}+p_{9,4}+p_{9,12} \\ &+p_{9,124}+2p_{9,498}+p_{9,502}+2p_{9,478}+2p_{9,33}+2p_{9,73}+p_{9,329} \\ &+p_{9,201}+p_{9,277}+p_{9,173}+p_{9,109}+2p_{9,349}+p_{9,131}+p_{9,451} \\ &+p_{9,179}+p_{9,459}+p_{9,363}+p_{9,491}+p_{9,7}+p_{9,167}+p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,923} = \frac{1}{2}p_{9,411} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,411}^2 - 4(p_{9,288}+p_{9,176}+2p_{9,496}+p_{9,4}+p_{9,12} \\ &+p_{9,124}+2p_{9,498}+p_{9,502}+2p_{9,478}+2p_{9,33}+2p_{9,73}+p_{9,329} \\ &+p_{9,201}+p_{9,277}+p_{9,173}+p_{9,109}+2p_{9,349}+p_{9,131}+p_{9,451} \\ &+p_{9,179}+p_{9,459}+p_{9,363}+p_{9,491}+p_{9,7}+p_{9,167}+p_{9,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,91} = \frac{1}{2}p_{9,91} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,91}^2 - 4(p_{9,480}+2p_{9,176}+p_{9,368}+p_{9,196}+p_{9,204} \\ &+p_{9,316}+2p_{9,178}+p_{9,182}+2p_{9,158}+2p_{9,225}+p_{9,9}+2p_{9,265} \\ &+p_{9,393}+p_{9,469}+p_{9,301}+p_{9,365}+2p_{9,29}+p_{9,131}+p_{9,323} \\ &+p_{9,371}+p_{9,139}+p_{9,43}+p_{9,171}+p_{9,199}+p_{9,359}+p_{9,439}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,347} = \frac{1}{2}p_{9,347} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,347}^2 - 4(p_{9,224}+2p_{9,432}+p_{9,112}+p_{9,452}+p_{9,460} \\ &+p_{9,60}+2p_{9,434}+p_{9,438}+2p_{9,414}+2p_{9,481}+2p_{9,9}+p_{9,265} \\ &+p_{9,137}+p_{9,213}+p_{9,45}+p_{9,109}+2p_{9,285}+p_{9,387}+p_{9,67} \\ &+p_{9,115}+p_{9,395}+p_{9,299}+p_{9,427}+p_{9,455}+p_{9,103}+p_{9,183}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,219} = \frac{1}{2}p_{9,219} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,219}^2 - 4(p_{9,96}+2p_{9,304}+p_{9,496}+p_{9,324}+p_{9,332} \\ &+p_{9,444}+2p_{9,306}+p_{9,310}+2p_{9,286}+2p_{9,353}+p_{9,9}+p_{9,137} \\ &+2p_{9,393}+p_{9,85}+p_{9,429}+p_{9,493}+2p_{9,157}+p_{9,259}+p_{9,451} \\ &+p_{9,499}+p_{9,267}+p_{9,299}+p_{9,171}+p_{9,327}+p_{9,487}+p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,731} = \frac{1}{2}p_{9,219} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,219}^2 - 4(p_{9,96}+2p_{9,304}+p_{9,496}+p_{9,324}+p_{9,332} \\ &+p_{9,444}+2p_{9,306}+p_{9,310}+2p_{9,286}+2p_{9,353}+p_{9,9}+p_{9,137} \\ &+2p_{9,393}+p_{9,85}+p_{9,429}+p_{9,493}+2p_{9,157}+p_{9,259}+p_{9,451} \\ &+p_{9,499}+p_{9,267}+p_{9,299}+p_{9,171}+p_{9,327}+p_{9,487}+p_{9,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,475} = \frac{1}{2}p_{9,475} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,475}^2 - 4(p_{9,352}+2p_{9,48}+p_{9,240}+p_{9,68}+p_{9,76} \\ &+p_{9,188}+2p_{9,50}+p_{9,54}+2p_{9,30}+2p_{9,97}+p_{9,265}+2p_{9,137} \\ &+p_{9,393}+p_{9,341}+p_{9,173}+p_{9,237}+2p_{9,413}+p_{9,3}+p_{9,195} \\ &+p_{9,243}+p_{9,11}+p_{9,43}+p_{9,427}+p_{9,71}+p_{9,231}+p_{9,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,987} = \frac{1}{2}p_{9,475} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,475}^2 - 4(p_{9,352}+2p_{9,48}+p_{9,240}+p_{9,68}+p_{9,76} \\ &+p_{9,188}+2p_{9,50}+p_{9,54}+2p_{9,30}+2p_{9,97}+p_{9,265}+2p_{9,137} \\ &+p_{9,393}+p_{9,341}+p_{9,173}+p_{9,237}+2p_{9,413}+p_{9,3}+p_{9,195} \\ &+p_{9,243}+p_{9,11}+p_{9,43}+p_{9,427}+p_{9,71}+p_{9,231}+p_{9,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,59} = \frac{1}{2}p_{9,59} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,59}^2 - 4(p_{9,448}+2p_{9,144}+p_{9,336}+p_{9,164}+p_{9,172} \\ &+p_{9,284}+2p_{9,146}+p_{9,150}+2p_{9,126}+2p_{9,193}+p_{9,361}+2p_{9,233} \\ &+p_{9,489}+p_{9,437}+p_{9,269}+p_{9,333}+2p_{9,509}+p_{9,291}+p_{9,99} \\ &+p_{9,339}+p_{9,11}+p_{9,139}+p_{9,107}+p_{9,327}+p_{9,167}+p_{9,407}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,571} = \frac{1}{2}p_{9,59} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,59}^2 - 4(p_{9,448}+2p_{9,144}+p_{9,336}+p_{9,164}+p_{9,172} \\ &+p_{9,284}+2p_{9,146}+p_{9,150}+2p_{9,126}+2p_{9,193}+p_{9,361}+2p_{9,233} \\ &+p_{9,489}+p_{9,437}+p_{9,269}+p_{9,333}+2p_{9,509}+p_{9,291}+p_{9,99} \\ &+p_{9,339}+p_{9,11}+p_{9,139}+p_{9,107}+p_{9,327}+p_{9,167}+p_{9,407}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,827} = \frac{1}{2}p_{9,315} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,315}^2 - 4(p_{9,192}+2p_{9,400}+p_{9,80}+p_{9,420}+p_{9,428} \\ &+p_{9,28}+2p_{9,402}+p_{9,406}+2p_{9,382}+2p_{9,449}+p_{9,105}+p_{9,233} \\ &+2p_{9,489}+p_{9,181}+p_{9,13}+p_{9,77}+2p_{9,253}+p_{9,35}+p_{9,355} \\ &+p_{9,83}+p_{9,267}+p_{9,395}+p_{9,363}+p_{9,71}+p_{9,423}+p_{9,151}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,187} = \frac{1}{2}p_{9,187} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,187}^2 - 4(p_{9,64}+2p_{9,272}+p_{9,464}+p_{9,292}+p_{9,300} \\ &+p_{9,412}+2p_{9,274}+p_{9,278}+2p_{9,254}+2p_{9,321}+p_{9,105}+2p_{9,361} \\ &+p_{9,489}+p_{9,53}+p_{9,397}+p_{9,461}+2p_{9,125}+p_{9,419}+p_{9,227} \\ &+p_{9,467}+p_{9,267}+p_{9,139}+p_{9,235}+p_{9,455}+p_{9,295}+p_{9,23}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,699} = \frac{1}{2}p_{9,187} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,187}^2 - 4(p_{9,64}+2p_{9,272}+p_{9,464}+p_{9,292}+p_{9,300} \\ &+p_{9,412}+2p_{9,274}+p_{9,278}+2p_{9,254}+2p_{9,321}+p_{9,105}+2p_{9,361} \\ &+p_{9,489}+p_{9,53}+p_{9,397}+p_{9,461}+2p_{9,125}+p_{9,419}+p_{9,227} \\ &+p_{9,467}+p_{9,267}+p_{9,139}+p_{9,235}+p_{9,455}+p_{9,295}+p_{9,23}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,443} = \frac{1}{2}p_{9,443} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,443}^2 - 4(p_{9,320}+2p_{9,16}+p_{9,208}+p_{9,36}+p_{9,44} \\ &+p_{9,156}+2p_{9,18}+p_{9,22}+2p_{9,510}+2p_{9,65}+2p_{9,105}+p_{9,361} \\ &+p_{9,233}+p_{9,309}+p_{9,141}+p_{9,205}+2p_{9,381}+p_{9,163}+p_{9,483} \\ &+p_{9,211}+p_{9,11}+p_{9,395}+p_{9,491}+p_{9,199}+p_{9,39}+p_{9,279}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,955} = \frac{1}{2}p_{9,443} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,443}^2 - 4(p_{9,320}+2p_{9,16}+p_{9,208}+p_{9,36}+p_{9,44} \\ &+p_{9,156}+2p_{9,18}+p_{9,22}+2p_{9,510}+2p_{9,65}+2p_{9,105}+p_{9,361} \\ &+p_{9,233}+p_{9,309}+p_{9,141}+p_{9,205}+2p_{9,381}+p_{9,163}+p_{9,483} \\ &+p_{9,211}+p_{9,11}+p_{9,395}+p_{9,491}+p_{9,199}+p_{9,39}+p_{9,279}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,123} = \frac{1}{2}p_{9,123} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,123}^2 - 4(p_{9,0}+p_{9,400}+2p_{9,208}+p_{9,228}+p_{9,236} \\ &+p_{9,348}+2p_{9,210}+p_{9,214}+2p_{9,190}+2p_{9,257}+p_{9,41}+2p_{9,297} \\ &+p_{9,425}+p_{9,501}+p_{9,397}+p_{9,333}+2p_{9,61}+p_{9,163}+p_{9,355} \\ &+p_{9,403}+p_{9,75}+p_{9,203}+p_{9,171}+p_{9,391}+p_{9,231}+p_{9,471}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,635} = \frac{1}{2}p_{9,123} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,123}^2 - 4(p_{9,0}+p_{9,400}+2p_{9,208}+p_{9,228}+p_{9,236} \\ &+p_{9,348}+2p_{9,210}+p_{9,214}+2p_{9,190}+2p_{9,257}+p_{9,41}+2p_{9,297} \\ &+p_{9,425}+p_{9,501}+p_{9,397}+p_{9,333}+2p_{9,61}+p_{9,163}+p_{9,355} \\ &+p_{9,403}+p_{9,75}+p_{9,203}+p_{9,171}+p_{9,391}+p_{9,231}+p_{9,471}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,379} = \frac{1}{2}p_{9,379} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,379}^2 - 4(p_{9,256}+p_{9,144}+2p_{9,464}+p_{9,484}+p_{9,492} \\ &+p_{9,92}+2p_{9,466}+p_{9,470}+2p_{9,446}+2p_{9,1}+2p_{9,41}+p_{9,297} \\ &+p_{9,169}+p_{9,245}+p_{9,141}+p_{9,77}+2p_{9,317}+p_{9,419}+p_{9,99} \\ &+p_{9,147}+p_{9,331}+p_{9,459}+p_{9,427}+p_{9,135}+p_{9,487}+p_{9,215}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,891} = \frac{1}{2}p_{9,379} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,379}^2 - 4(p_{9,256}+p_{9,144}+2p_{9,464}+p_{9,484}+p_{9,492} \\ &+p_{9,92}+2p_{9,466}+p_{9,470}+2p_{9,446}+2p_{9,1}+2p_{9,41}+p_{9,297} \\ &+p_{9,169}+p_{9,245}+p_{9,141}+p_{9,77}+2p_{9,317}+p_{9,419}+p_{9,99} \\ &+p_{9,147}+p_{9,331}+p_{9,459}+p_{9,427}+p_{9,135}+p_{9,487}+p_{9,215}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,251} = \frac{1}{2}p_{9,251} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,251}^2 - 4(p_{9,128}+p_{9,16}+2p_{9,336}+p_{9,356}+p_{9,364} \\ &+p_{9,476}+2p_{9,338}+p_{9,342}+2p_{9,318}+2p_{9,385}+p_{9,41}+p_{9,169} \\ &+2p_{9,425}+p_{9,117}+p_{9,13}+p_{9,461}+2p_{9,189}+p_{9,291}+p_{9,483} \\ &+p_{9,19}+p_{9,331}+p_{9,203}+p_{9,299}+p_{9,7}+p_{9,359}+p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,763} = \frac{1}{2}p_{9,251} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,251}^2 - 4(p_{9,128}+p_{9,16}+2p_{9,336}+p_{9,356}+p_{9,364} \\ &+p_{9,476}+2p_{9,338}+p_{9,342}+2p_{9,318}+2p_{9,385}+p_{9,41}+p_{9,169} \\ &+2p_{9,425}+p_{9,117}+p_{9,13}+p_{9,461}+2p_{9,189}+p_{9,291}+p_{9,483} \\ &+p_{9,19}+p_{9,331}+p_{9,203}+p_{9,299}+p_{9,7}+p_{9,359}+p_{9,87}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,507} = \frac{1}{2}p_{9,507} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,507}^2 - 4(p_{9,384}+p_{9,272}+2p_{9,80}+p_{9,100}+p_{9,108} \\ &+p_{9,220}+2p_{9,82}+p_{9,86}+2p_{9,62}+2p_{9,129}+p_{9,297}+2p_{9,169} \\ &+p_{9,425}+p_{9,373}+p_{9,269}+p_{9,205}+2p_{9,445}+p_{9,35}+p_{9,227} \\ &+p_{9,275}+p_{9,75}+p_{9,459}+p_{9,43}+p_{9,263}+p_{9,103}+p_{9,343}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1019} = \frac{1}{2}p_{9,507} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,507}^2 - 4(p_{9,384}+p_{9,272}+2p_{9,80}+p_{9,100}+p_{9,108} \\ &+p_{9,220}+2p_{9,82}+p_{9,86}+2p_{9,62}+2p_{9,129}+p_{9,297}+2p_{9,169} \\ &+p_{9,425}+p_{9,373}+p_{9,269}+p_{9,205}+2p_{9,445}+p_{9,35}+p_{9,227} \\ &+p_{9,275}+p_{9,75}+p_{9,459}+p_{9,43}+p_{9,263}+p_{9,103}+p_{9,343}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,7} = \frac{1}{2}p_{9,7} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,7}^2 - 4(p_{9,112}+p_{9,232}+p_{9,120}+p_{9,396}+p_{9,284} \\ &+2p_{9,92}+p_{9,98}+2p_{9,74}+2p_{9,94}+p_{9,385}+2p_{9,457}+p_{9,281} \\ &+p_{9,217}+p_{9,309}+2p_{9,181}+p_{9,437}+2p_{9,141}+p_{9,355}+p_{9,275} \\ &+p_{9,115}+p_{9,87}+p_{9,471}+p_{9,55}+p_{9,47}+p_{9,239}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,519} = \frac{1}{2}p_{9,7} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,7}^2 - 4(p_{9,112}+p_{9,232}+p_{9,120}+p_{9,396}+p_{9,284} \\ &+2p_{9,92}+p_{9,98}+2p_{9,74}+2p_{9,94}+p_{9,385}+2p_{9,457}+p_{9,281} \\ &+p_{9,217}+p_{9,309}+2p_{9,181}+p_{9,437}+2p_{9,141}+p_{9,355}+p_{9,275} \\ &+p_{9,115}+p_{9,87}+p_{9,471}+p_{9,55}+p_{9,47}+p_{9,239}+p_{9,287}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,263} = \frac{1}{2}p_{9,263} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,263}^2 - 4(p_{9,368}+p_{9,488}+p_{9,376}+p_{9,140}+p_{9,28} \\ &+2p_{9,348}+p_{9,354}+2p_{9,330}+2p_{9,350}+p_{9,129}+2p_{9,201}+p_{9,25} \\ &+p_{9,473}+p_{9,53}+p_{9,181}+2p_{9,437}+2p_{9,397}+p_{9,99}+p_{9,19} \\ &+p_{9,371}+p_{9,343}+p_{9,215}+p_{9,311}+p_{9,303}+p_{9,495}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,775} = \frac{1}{2}p_{9,263} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,263}^2 - 4(p_{9,368}+p_{9,488}+p_{9,376}+p_{9,140}+p_{9,28} \\ &+2p_{9,348}+p_{9,354}+2p_{9,330}+2p_{9,350}+p_{9,129}+2p_{9,201}+p_{9,25} \\ &+p_{9,473}+p_{9,53}+p_{9,181}+2p_{9,437}+2p_{9,397}+p_{9,99}+p_{9,19} \\ &+p_{9,371}+p_{9,343}+p_{9,215}+p_{9,311}+p_{9,303}+p_{9,495}+p_{9,31}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,135} = \frac{1}{2}p_{9,135} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,135}^2 - 4(p_{9,240}+p_{9,360}+p_{9,248}+p_{9,12}+p_{9,412} \\ &+2p_{9,220}+p_{9,226}+2p_{9,202}+2p_{9,222}+p_{9,1}+2p_{9,73}+p_{9,409} \\ &+p_{9,345}+p_{9,53}+2p_{9,309}+p_{9,437}+2p_{9,269}+p_{9,483}+p_{9,403} \\ &+p_{9,243}+p_{9,87}+p_{9,215}+p_{9,183}+p_{9,175}+p_{9,367}+p_{9,415}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,903} = \frac{1}{2}p_{9,391} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,391}^2 - 4(p_{9,496}+p_{9,104}+p_{9,504}+p_{9,268}+p_{9,156} \\ &+2p_{9,476}+p_{9,482}+2p_{9,458}+2p_{9,478}+p_{9,257}+2p_{9,329}+p_{9,153} \\ &+p_{9,89}+2p_{9,53}+p_{9,309}+p_{9,181}+2p_{9,13}+p_{9,227}+p_{9,147} \\ &+p_{9,499}+p_{9,343}+p_{9,471}+p_{9,439}+p_{9,431}+p_{9,111}+p_{9,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,71} = \frac{1}{2}p_{9,71} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,71}^2 - 4(p_{9,176}+p_{9,296}+p_{9,184}+p_{9,460}+2p_{9,156} \\ &+p_{9,348}+p_{9,162}+2p_{9,138}+2p_{9,158}+p_{9,449}+2p_{9,9}+p_{9,281} \\ &+p_{9,345}+p_{9,373}+2p_{9,245}+p_{9,501}+2p_{9,205}+p_{9,419}+p_{9,339} \\ &+p_{9,179}+p_{9,23}+p_{9,151}+p_{9,119}+p_{9,303}+p_{9,111}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,583} = \frac{1}{2}p_{9,71} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,71}^2 - 4(p_{9,176}+p_{9,296}+p_{9,184}+p_{9,460}+2p_{9,156} \\ &+p_{9,348}+p_{9,162}+2p_{9,138}+2p_{9,158}+p_{9,449}+2p_{9,9}+p_{9,281} \\ &+p_{9,345}+p_{9,373}+2p_{9,245}+p_{9,501}+2p_{9,205}+p_{9,419}+p_{9,339} \\ &+p_{9,179}+p_{9,23}+p_{9,151}+p_{9,119}+p_{9,303}+p_{9,111}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,327} = \frac{1}{2}p_{9,327} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,327}^2 - 4(p_{9,432}+p_{9,40}+p_{9,440}+p_{9,204}+2p_{9,412} \\ &+p_{9,92}+p_{9,418}+2p_{9,394}+2p_{9,414}+p_{9,193}+2p_{9,265}+p_{9,25} \\ &+p_{9,89}+p_{9,117}+p_{9,245}+2p_{9,501}+2p_{9,461}+p_{9,163}+p_{9,83} \\ &+p_{9,435}+p_{9,279}+p_{9,407}+p_{9,375}+p_{9,47}+p_{9,367}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,839} = \frac{1}{2}p_{9,327} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,327}^2 - 4(p_{9,432}+p_{9,40}+p_{9,440}+p_{9,204}+2p_{9,412} \\ &+p_{9,92}+p_{9,418}+2p_{9,394}+2p_{9,414}+p_{9,193}+2p_{9,265}+p_{9,25} \\ &+p_{9,89}+p_{9,117}+p_{9,245}+2p_{9,501}+2p_{9,461}+p_{9,163}+p_{9,83} \\ &+p_{9,435}+p_{9,279}+p_{9,407}+p_{9,375}+p_{9,47}+p_{9,367}+p_{9,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,455} = \frac{1}{2}p_{9,455} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,455}^2 - 4(p_{9,48}+p_{9,168}+p_{9,56}+p_{9,332}+2p_{9,28} \\ &+p_{9,220}+p_{9,34}+2p_{9,10}+2p_{9,30}+p_{9,321}+2p_{9,393}+p_{9,153} \\ &+p_{9,217}+2p_{9,117}+p_{9,373}+p_{9,245}+2p_{9,77}+p_{9,291}+p_{9,211} \\ &+p_{9,51}+p_{9,23}+p_{9,407}+p_{9,503}+p_{9,175}+p_{9,495}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,967} = \frac{1}{2}p_{9,455} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,455}^2 - 4(p_{9,48}+p_{9,168}+p_{9,56}+p_{9,332}+2p_{9,28} \\ &+p_{9,220}+p_{9,34}+2p_{9,10}+2p_{9,30}+p_{9,321}+2p_{9,393}+p_{9,153} \\ &+p_{9,217}+2p_{9,117}+p_{9,373}+p_{9,245}+2p_{9,77}+p_{9,291}+p_{9,211} \\ &+p_{9,51}+p_{9,23}+p_{9,407}+p_{9,503}+p_{9,175}+p_{9,495}+p_{9,223}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,551} = \frac{1}{2}p_{9,39} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,39}^2 - 4(p_{9,144}+p_{9,264}+p_{9,152}+p_{9,428}+p_{9,316} \\ &+2p_{9,124}+p_{9,130}+2p_{9,106}+2p_{9,126}+p_{9,417}+2p_{9,489}+p_{9,313} \\ &+p_{9,249}+p_{9,341}+2p_{9,213}+p_{9,469}+2p_{9,173}+p_{9,387}+p_{9,147} \\ &+p_{9,307}+p_{9,87}+p_{9,119}+p_{9,503}+p_{9,271}+p_{9,79}+p_{9,319}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,807} = \frac{1}{2}p_{9,295} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,295}^2 - 4(p_{9,400}+p_{9,8}+p_{9,408}+p_{9,172}+p_{9,60} \\ &+2p_{9,380}+p_{9,386}+2p_{9,362}+2p_{9,382}+p_{9,161}+2p_{9,233}+p_{9,57} \\ &+p_{9,505}+p_{9,85}+p_{9,213}+2p_{9,469}+2p_{9,429}+p_{9,131}+p_{9,403} \\ &+p_{9,51}+p_{9,343}+p_{9,375}+p_{9,247}+p_{9,15}+p_{9,335}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,167} = \frac{1}{2}p_{9,167} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,167}^2 - 4(p_{9,272}+p_{9,392}+p_{9,280}+p_{9,44}+p_{9,444} \\ &+2p_{9,252}+p_{9,258}+2p_{9,234}+2p_{9,254}+p_{9,33}+2p_{9,105}+p_{9,441} \\ &+p_{9,377}+p_{9,85}+2p_{9,341}+p_{9,469}+2p_{9,301}+p_{9,3}+p_{9,275} \\ &+p_{9,435}+p_{9,215}+p_{9,119}+p_{9,247}+p_{9,399}+p_{9,207}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,679} = \frac{1}{2}p_{9,167} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,167}^2 - 4(p_{9,272}+p_{9,392}+p_{9,280}+p_{9,44}+p_{9,444} \\ &+2p_{9,252}+p_{9,258}+2p_{9,234}+2p_{9,254}+p_{9,33}+2p_{9,105}+p_{9,441} \\ &+p_{9,377}+p_{9,85}+2p_{9,341}+p_{9,469}+2p_{9,301}+p_{9,3}+p_{9,275} \\ &+p_{9,435}+p_{9,215}+p_{9,119}+p_{9,247}+p_{9,399}+p_{9,207}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,423} = \frac{1}{2}p_{9,423} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,423}^2 - 4(p_{9,16}+p_{9,136}+p_{9,24}+p_{9,300}+p_{9,188} \\ &+2p_{9,508}+p_{9,2}+2p_{9,490}+2p_{9,510}+p_{9,289}+2p_{9,361}+p_{9,185} \\ &+p_{9,121}+2p_{9,85}+p_{9,341}+p_{9,213}+2p_{9,45}+p_{9,259}+p_{9,19} \\ &+p_{9,179}+p_{9,471}+p_{9,375}+p_{9,503}+p_{9,143}+p_{9,463}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,935} = \frac{1}{2}p_{9,423} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,423}^2 - 4(p_{9,16}+p_{9,136}+p_{9,24}+p_{9,300}+p_{9,188} \\ &+2p_{9,508}+p_{9,2}+2p_{9,490}+2p_{9,510}+p_{9,289}+2p_{9,361}+p_{9,185} \\ &+p_{9,121}+2p_{9,85}+p_{9,341}+p_{9,213}+2p_{9,45}+p_{9,259}+p_{9,19} \\ &+p_{9,179}+p_{9,471}+p_{9,375}+p_{9,503}+p_{9,143}+p_{9,463}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,103} = \frac{1}{2}p_{9,103} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,103}^2 - 4(p_{9,208}+p_{9,328}+p_{9,216}+p_{9,492}+2p_{9,188} \\ &+p_{9,380}+p_{9,194}+2p_{9,170}+2p_{9,190}+p_{9,481}+2p_{9,41}+p_{9,313} \\ &+p_{9,377}+p_{9,21}+2p_{9,277}+p_{9,405}+2p_{9,237}+p_{9,451}+p_{9,211} \\ &+p_{9,371}+p_{9,151}+p_{9,55}+p_{9,183}+p_{9,143}+p_{9,335}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,615} = \frac{1}{2}p_{9,103} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,103}^2 - 4(p_{9,208}+p_{9,328}+p_{9,216}+p_{9,492}+2p_{9,188} \\ &+p_{9,380}+p_{9,194}+2p_{9,170}+2p_{9,190}+p_{9,481}+2p_{9,41}+p_{9,313} \\ &+p_{9,377}+p_{9,21}+2p_{9,277}+p_{9,405}+2p_{9,237}+p_{9,451}+p_{9,211} \\ &+p_{9,371}+p_{9,151}+p_{9,55}+p_{9,183}+p_{9,143}+p_{9,335}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,359} = \frac{1}{2}p_{9,359} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,359}^2 - 4(p_{9,464}+p_{9,72}+p_{9,472}+p_{9,236}+2p_{9,444} \\ &+p_{9,124}+p_{9,450}+2p_{9,426}+2p_{9,446}+p_{9,225}+2p_{9,297}+p_{9,57} \\ &+p_{9,121}+2p_{9,21}+p_{9,277}+p_{9,149}+2p_{9,493}+p_{9,195}+p_{9,467} \\ &+p_{9,115}+p_{9,407}+p_{9,311}+p_{9,439}+p_{9,399}+p_{9,79}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,871} = \frac{1}{2}p_{9,359} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,359}^2 - 4(p_{9,464}+p_{9,72}+p_{9,472}+p_{9,236}+2p_{9,444} \\ &+p_{9,124}+p_{9,450}+2p_{9,426}+2p_{9,446}+p_{9,225}+2p_{9,297}+p_{9,57} \\ &+p_{9,121}+2p_{9,21}+p_{9,277}+p_{9,149}+2p_{9,493}+p_{9,195}+p_{9,467} \\ &+p_{9,115}+p_{9,407}+p_{9,311}+p_{9,439}+p_{9,399}+p_{9,79}+p_{9,127}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,743} = \frac{1}{2}p_{9,231} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,231}^2 - 4(p_{9,336}+p_{9,456}+p_{9,344}+p_{9,108}+2p_{9,316} \\ &+p_{9,508}+p_{9,322}+2p_{9,298}+2p_{9,318}+p_{9,97}+2p_{9,169}+p_{9,441} \\ &+p_{9,505}+p_{9,21}+p_{9,149}+2p_{9,405}+2p_{9,365}+p_{9,67}+p_{9,339} \\ &+p_{9,499}+p_{9,279}+p_{9,311}+p_{9,183}+p_{9,271}+p_{9,463}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,487} = \frac{1}{2}p_{9,487} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,487}^2 - 4(p_{9,80}+p_{9,200}+p_{9,88}+p_{9,364}+2p_{9,60} \\ &+p_{9,252}+p_{9,66}+2p_{9,42}+2p_{9,62}+p_{9,353}+2p_{9,425}+p_{9,185} \\ &+p_{9,249}+p_{9,277}+2p_{9,149}+p_{9,405}+2p_{9,109}+p_{9,323}+p_{9,83} \\ &+p_{9,243}+p_{9,23}+p_{9,55}+p_{9,439}+p_{9,15}+p_{9,207}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,999} = \frac{1}{2}p_{9,487} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,487}^2 - 4(p_{9,80}+p_{9,200}+p_{9,88}+p_{9,364}+2p_{9,60} \\ &+p_{9,252}+p_{9,66}+2p_{9,42}+2p_{9,62}+p_{9,353}+2p_{9,425}+p_{9,185} \\ &+p_{9,249}+p_{9,277}+2p_{9,149}+p_{9,405}+2p_{9,109}+p_{9,323}+p_{9,83} \\ &+p_{9,243}+p_{9,23}+p_{9,55}+p_{9,439}+p_{9,15}+p_{9,207}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,23} = \frac{1}{2}p_{9,23} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,23}^2 - 4(p_{9,128}+p_{9,136}+p_{9,248}+p_{9,300}+2p_{9,108} \\ &+p_{9,412}+p_{9,114}+2p_{9,90}+2p_{9,110}+p_{9,401}+p_{9,297}+p_{9,233} \\ &+2p_{9,473}+p_{9,325}+2p_{9,197}+p_{9,453}+2p_{9,157}+p_{9,131}+p_{9,291} \\ &+p_{9,371}+p_{9,71}+p_{9,103}+p_{9,487}+p_{9,303}+p_{9,63}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,535} = \frac{1}{2}p_{9,23} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,23}^2 - 4(p_{9,128}+p_{9,136}+p_{9,248}+p_{9,300}+2p_{9,108} \\ &+p_{9,412}+p_{9,114}+2p_{9,90}+2p_{9,110}+p_{9,401}+p_{9,297}+p_{9,233} \\ &+2p_{9,473}+p_{9,325}+2p_{9,197}+p_{9,453}+2p_{9,157}+p_{9,131}+p_{9,291} \\ &+p_{9,371}+p_{9,71}+p_{9,103}+p_{9,487}+p_{9,303}+p_{9,63}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,279} = \frac{1}{2}p_{9,279} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,279}^2 - 4(p_{9,384}+p_{9,392}+p_{9,504}+p_{9,44}+2p_{9,364} \\ &+p_{9,156}+p_{9,370}+2p_{9,346}+2p_{9,366}+p_{9,145}+p_{9,41}+p_{9,489} \\ &+2p_{9,217}+p_{9,69}+p_{9,197}+2p_{9,453}+2p_{9,413}+p_{9,387}+p_{9,35} \\ &+p_{9,115}+p_{9,327}+p_{9,359}+p_{9,231}+p_{9,47}+p_{9,319}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,791} = \frac{1}{2}p_{9,279} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,279}^2 - 4(p_{9,384}+p_{9,392}+p_{9,504}+p_{9,44}+2p_{9,364} \\ &+p_{9,156}+p_{9,370}+2p_{9,346}+2p_{9,366}+p_{9,145}+p_{9,41}+p_{9,489} \\ &+2p_{9,217}+p_{9,69}+p_{9,197}+2p_{9,453}+2p_{9,413}+p_{9,387}+p_{9,35} \\ &+p_{9,115}+p_{9,327}+p_{9,359}+p_{9,231}+p_{9,47}+p_{9,319}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,151} = \frac{1}{2}p_{9,151} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,151}^2 - 4(p_{9,256}+p_{9,264}+p_{9,376}+p_{9,428}+2p_{9,236} \\ &+p_{9,28}+p_{9,242}+2p_{9,218}+2p_{9,238}+p_{9,17}+p_{9,425}+p_{9,361} \\ &+2p_{9,89}+p_{9,69}+2p_{9,325}+p_{9,453}+2p_{9,285}+p_{9,259}+p_{9,419} \\ &+p_{9,499}+p_{9,199}+p_{9,103}+p_{9,231}+p_{9,431}+p_{9,191}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,663} = \frac{1}{2}p_{9,151} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,151}^2 - 4(p_{9,256}+p_{9,264}+p_{9,376}+p_{9,428}+2p_{9,236} \\ &+p_{9,28}+p_{9,242}+2p_{9,218}+2p_{9,238}+p_{9,17}+p_{9,425}+p_{9,361} \\ &+2p_{9,89}+p_{9,69}+2p_{9,325}+p_{9,453}+2p_{9,285}+p_{9,259}+p_{9,419} \\ &+p_{9,499}+p_{9,199}+p_{9,103}+p_{9,231}+p_{9,431}+p_{9,191}+p_{9,383}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{10,87} = \frac{1}{2}p_{9,87} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,87}^2 - 4(p_{9,192}+p_{9,200}+p_{9,312}+2p_{9,172}+p_{9,364} \\ &+p_{9,476}+p_{9,178}+2p_{9,154}+2p_{9,174}+p_{9,465}+p_{9,297}+p_{9,361} \\ &+2p_{9,25}+p_{9,5}+2p_{9,261}+p_{9,389}+2p_{9,221}+p_{9,195}+p_{9,355} \\ &+p_{9,435}+p_{9,135}+p_{9,39}+p_{9,167}+p_{9,367}+p_{9,319}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,599} = \frac{1}{2}p_{9,87} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,87}^2 - 4(p_{9,192}+p_{9,200}+p_{9,312}+2p_{9,172}+p_{9,364} \\ &+p_{9,476}+p_{9,178}+2p_{9,154}+2p_{9,174}+p_{9,465}+p_{9,297}+p_{9,361} \\ &+2p_{9,25}+p_{9,5}+2p_{9,261}+p_{9,389}+2p_{9,221}+p_{9,195}+p_{9,355} \\ &+p_{9,435}+p_{9,135}+p_{9,39}+p_{9,167}+p_{9,367}+p_{9,319}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,343} = \frac{1}{2}p_{9,343} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,343}^2 - 4(p_{9,448}+p_{9,456}+p_{9,56}+2p_{9,428}+p_{9,108} \\ &+p_{9,220}+p_{9,434}+2p_{9,410}+2p_{9,430}+p_{9,209}+p_{9,41}+p_{9,105} \\ &+2p_{9,281}+2p_{9,5}+p_{9,261}+p_{9,133}+2p_{9,477}+p_{9,451}+p_{9,99} \\ &+p_{9,179}+p_{9,391}+p_{9,295}+p_{9,423}+p_{9,111}+p_{9,63}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,855} = \frac{1}{2}p_{9,343} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,343}^2 - 4(p_{9,448}+p_{9,456}+p_{9,56}+2p_{9,428}+p_{9,108} \\ &+p_{9,220}+p_{9,434}+2p_{9,410}+2p_{9,430}+p_{9,209}+p_{9,41}+p_{9,105} \\ &+2p_{9,281}+2p_{9,5}+p_{9,261}+p_{9,133}+2p_{9,477}+p_{9,451}+p_{9,99} \\ &+p_{9,179}+p_{9,391}+p_{9,295}+p_{9,423}+p_{9,111}+p_{9,63}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,215} = \frac{1}{2}p_{9,215} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,215}^2 - 4(p_{9,320}+p_{9,328}+p_{9,440}+2p_{9,300}+p_{9,492} \\ &+p_{9,92}+p_{9,306}+2p_{9,282}+2p_{9,302}+p_{9,81}+p_{9,425}+p_{9,489} \\ &+2p_{9,153}+p_{9,5}+p_{9,133}+2p_{9,389}+2p_{9,349}+p_{9,323}+p_{9,483} \\ &+p_{9,51}+p_{9,263}+p_{9,295}+p_{9,167}+p_{9,495}+p_{9,447}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,727} = \frac{1}{2}p_{9,215} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,215}^2 - 4(p_{9,320}+p_{9,328}+p_{9,440}+2p_{9,300}+p_{9,492} \\ &+p_{9,92}+p_{9,306}+2p_{9,282}+2p_{9,302}+p_{9,81}+p_{9,425}+p_{9,489} \\ &+2p_{9,153}+p_{9,5}+p_{9,133}+2p_{9,389}+2p_{9,349}+p_{9,323}+p_{9,483} \\ &+p_{9,51}+p_{9,263}+p_{9,295}+p_{9,167}+p_{9,495}+p_{9,447}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,471} = \frac{1}{2}p_{9,471} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,471}^2 - 4(p_{9,64}+p_{9,72}+p_{9,184}+2p_{9,44}+p_{9,236} \\ &+p_{9,348}+p_{9,50}+2p_{9,26}+2p_{9,46}+p_{9,337}+p_{9,169}+p_{9,233} \\ &+2p_{9,409}+p_{9,261}+2p_{9,133}+p_{9,389}+2p_{9,93}+p_{9,67}+p_{9,227} \\ &+p_{9,307}+p_{9,7}+p_{9,39}+p_{9,423}+p_{9,239}+p_{9,191}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,983} = \frac{1}{2}p_{9,471} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,471}^2 - 4(p_{9,64}+p_{9,72}+p_{9,184}+2p_{9,44}+p_{9,236} \\ &+p_{9,348}+p_{9,50}+2p_{9,26}+2p_{9,46}+p_{9,337}+p_{9,169}+p_{9,233} \\ &+2p_{9,409}+p_{9,261}+2p_{9,133}+p_{9,389}+2p_{9,93}+p_{9,67}+p_{9,227} \\ &+p_{9,307}+p_{9,7}+p_{9,39}+p_{9,423}+p_{9,239}+p_{9,191}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,55} = \frac{1}{2}p_{9,55} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,55}^2 - 4(p_{9,160}+p_{9,168}+p_{9,280}+2p_{9,140}+p_{9,332} \\ &+p_{9,444}+p_{9,146}+2p_{9,122}+2p_{9,142}+p_{9,433}+p_{9,265}+p_{9,329} \\ &+2p_{9,505}+p_{9,357}+2p_{9,229}+p_{9,485}+2p_{9,189}+p_{9,323}+p_{9,163} \\ &+p_{9,403}+p_{9,7}+p_{9,135}+p_{9,103}+p_{9,335}+p_{9,287}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,567} = \frac{1}{2}p_{9,55} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,55}^2 - 4(p_{9,160}+p_{9,168}+p_{9,280}+2p_{9,140}+p_{9,332} \\ &+p_{9,444}+p_{9,146}+2p_{9,122}+2p_{9,142}+p_{9,433}+p_{9,265}+p_{9,329} \\ &+2p_{9,505}+p_{9,357}+2p_{9,229}+p_{9,485}+2p_{9,189}+p_{9,323}+p_{9,163} \\ &+p_{9,403}+p_{9,7}+p_{9,135}+p_{9,103}+p_{9,335}+p_{9,287}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,311} = \frac{1}{2}p_{9,311} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,311}^2 - 4(p_{9,416}+p_{9,424}+p_{9,24}+2p_{9,396}+p_{9,76} \\ &+p_{9,188}+p_{9,402}+2p_{9,378}+2p_{9,398}+p_{9,177}+p_{9,9}+p_{9,73} \\ &+2p_{9,249}+p_{9,101}+p_{9,229}+2p_{9,485}+2p_{9,445}+p_{9,67}+p_{9,419} \\ &+p_{9,147}+p_{9,263}+p_{9,391}+p_{9,359}+p_{9,79}+p_{9,31}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,823} = \frac{1}{2}p_{9,311} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,311}^2 - 4(p_{9,416}+p_{9,424}+p_{9,24}+2p_{9,396}+p_{9,76} \\ &+p_{9,188}+p_{9,402}+2p_{9,378}+2p_{9,398}+p_{9,177}+p_{9,9}+p_{9,73} \\ &+2p_{9,249}+p_{9,101}+p_{9,229}+2p_{9,485}+2p_{9,445}+p_{9,67}+p_{9,419} \\ &+p_{9,147}+p_{9,263}+p_{9,391}+p_{9,359}+p_{9,79}+p_{9,31}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,183} = \frac{1}{2}p_{9,183} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,183}^2 - 4(p_{9,288}+p_{9,296}+p_{9,408}+2p_{9,268}+p_{9,460} \\ &+p_{9,60}+p_{9,274}+2p_{9,250}+2p_{9,270}+p_{9,49}+p_{9,393}+p_{9,457} \\ &+2p_{9,121}+p_{9,101}+2p_{9,357}+p_{9,485}+2p_{9,317}+p_{9,451}+p_{9,291} \\ &+p_{9,19}+p_{9,263}+p_{9,135}+p_{9,231}+p_{9,463}+p_{9,415}+p_{9,223}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,439} = \frac{1}{2}p_{9,439} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,439}^2 - 4(p_{9,32}+p_{9,40}+p_{9,152}+2p_{9,12}+p_{9,204} \\ &+p_{9,316}+p_{9,18}+2p_{9,506}+2p_{9,14}+p_{9,305}+p_{9,137}+p_{9,201} \\ &+2p_{9,377}+2p_{9,101}+p_{9,357}+p_{9,229}+2p_{9,61}+p_{9,195}+p_{9,35} \\ &+p_{9,275}+p_{9,7}+p_{9,391}+p_{9,487}+p_{9,207}+p_{9,159}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,951} = \frac{1}{2}p_{9,439} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,439}^2 - 4(p_{9,32}+p_{9,40}+p_{9,152}+2p_{9,12}+p_{9,204} \\ &+p_{9,316}+p_{9,18}+2p_{9,506}+2p_{9,14}+p_{9,305}+p_{9,137}+p_{9,201} \\ &+2p_{9,377}+2p_{9,101}+p_{9,357}+p_{9,229}+2p_{9,61}+p_{9,195}+p_{9,35} \\ &+p_{9,275}+p_{9,7}+p_{9,391}+p_{9,487}+p_{9,207}+p_{9,159}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,119} = \frac{1}{2}p_{9,119} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,119}^2 - 4(p_{9,224}+p_{9,232}+p_{9,344}+p_{9,396}+2p_{9,204} \\ &+p_{9,508}+p_{9,210}+2p_{9,186}+2p_{9,206}+p_{9,497}+p_{9,393}+p_{9,329} \\ &+2p_{9,57}+p_{9,37}+2p_{9,293}+p_{9,421}+2p_{9,253}+p_{9,387}+p_{9,227} \\ &+p_{9,467}+p_{9,71}+p_{9,199}+p_{9,167}+p_{9,399}+p_{9,159}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,631} = \frac{1}{2}p_{9,119} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,119}^2 - 4(p_{9,224}+p_{9,232}+p_{9,344}+p_{9,396}+2p_{9,204} \\ &+p_{9,508}+p_{9,210}+2p_{9,186}+2p_{9,206}+p_{9,497}+p_{9,393}+p_{9,329} \\ &+2p_{9,57}+p_{9,37}+2p_{9,293}+p_{9,421}+2p_{9,253}+p_{9,387}+p_{9,227} \\ &+p_{9,467}+p_{9,71}+p_{9,199}+p_{9,167}+p_{9,399}+p_{9,159}+p_{9,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,375} = \frac{1}{2}p_{9,375} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,375}^2 - 4(p_{9,480}+p_{9,488}+p_{9,88}+p_{9,140}+2p_{9,460} \\ &+p_{9,252}+p_{9,466}+2p_{9,442}+2p_{9,462}+p_{9,241}+p_{9,137}+p_{9,73} \\ &+2p_{9,313}+2p_{9,37}+p_{9,293}+p_{9,165}+2p_{9,509}+p_{9,131}+p_{9,483} \\ &+p_{9,211}+p_{9,327}+p_{9,455}+p_{9,423}+p_{9,143}+p_{9,415}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,887} = \frac{1}{2}p_{9,375} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,375}^2 - 4(p_{9,480}+p_{9,488}+p_{9,88}+p_{9,140}+2p_{9,460} \\ &+p_{9,252}+p_{9,466}+2p_{9,442}+2p_{9,462}+p_{9,241}+p_{9,137}+p_{9,73} \\ &+2p_{9,313}+2p_{9,37}+p_{9,293}+p_{9,165}+2p_{9,509}+p_{9,131}+p_{9,483} \\ &+p_{9,211}+p_{9,327}+p_{9,455}+p_{9,423}+p_{9,143}+p_{9,415}+p_{9,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,247} = \frac{1}{2}p_{9,247} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,247}^2 - 4(p_{9,352}+p_{9,360}+p_{9,472}+p_{9,12}+2p_{9,332} \\ &+p_{9,124}+p_{9,338}+2p_{9,314}+2p_{9,334}+p_{9,113}+p_{9,9}+p_{9,457} \\ &+2p_{9,185}+p_{9,37}+p_{9,165}+2p_{9,421}+2p_{9,381}+p_{9,3}+p_{9,355} \\ &+p_{9,83}+p_{9,327}+p_{9,199}+p_{9,295}+p_{9,15}+p_{9,287}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,759} = \frac{1}{2}p_{9,247} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,247}^2 - 4(p_{9,352}+p_{9,360}+p_{9,472}+p_{9,12}+2p_{9,332} \\ &+p_{9,124}+p_{9,338}+2p_{9,314}+2p_{9,334}+p_{9,113}+p_{9,9}+p_{9,457} \\ &+2p_{9,185}+p_{9,37}+p_{9,165}+2p_{9,421}+2p_{9,381}+p_{9,3}+p_{9,355} \\ &+p_{9,83}+p_{9,327}+p_{9,199}+p_{9,295}+p_{9,15}+p_{9,287}+p_{9,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,503} = \frac{1}{2}p_{9,503} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,503}^2 - 4(p_{9,96}+p_{9,104}+p_{9,216}+p_{9,268}+2p_{9,76} \\ &+p_{9,380}+p_{9,82}+2p_{9,58}+2p_{9,78}+p_{9,369}+p_{9,265}+p_{9,201} \\ &+2p_{9,441}+p_{9,293}+2p_{9,165}+p_{9,421}+2p_{9,125}+p_{9,259}+p_{9,99} \\ &+p_{9,339}+p_{9,71}+p_{9,455}+p_{9,39}+p_{9,271}+p_{9,31}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1015} = \frac{1}{2}p_{9,503} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,503}^2 - 4(p_{9,96}+p_{9,104}+p_{9,216}+p_{9,268}+2p_{9,76} \\ &+p_{9,380}+p_{9,82}+2p_{9,58}+2p_{9,78}+p_{9,369}+p_{9,265}+p_{9,201} \\ &+2p_{9,441}+p_{9,293}+2p_{9,165}+p_{9,421}+2p_{9,125}+p_{9,259}+p_{9,99} \\ &+p_{9,339}+p_{9,71}+p_{9,455}+p_{9,39}+p_{9,271}+p_{9,31}+p_{9,223}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,15} = \frac{1}{2}p_{9,15} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,15}^2 - 4(p_{9,128}+p_{9,240}+p_{9,120}+p_{9,292}+2p_{9,100} \\ &+p_{9,404}+2p_{9,82}+p_{9,106}+2p_{9,102}+p_{9,289}+p_{9,225}+2p_{9,465} \\ &+p_{9,393}+2p_{9,149}+p_{9,317}+2p_{9,189}+p_{9,445}+p_{9,363}+p_{9,283} \\ &+p_{9,123}+p_{9,295}+p_{9,55}+p_{9,247}+p_{9,95}+p_{9,479}+p_{9,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,527} = \frac{1}{2}p_{9,15} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,15}^2 - 4(p_{9,128}+p_{9,240}+p_{9,120}+p_{9,292}+2p_{9,100} \\ &+p_{9,404}+2p_{9,82}+p_{9,106}+2p_{9,102}+p_{9,289}+p_{9,225}+2p_{9,465} \\ &+p_{9,393}+2p_{9,149}+p_{9,317}+2p_{9,189}+p_{9,445}+p_{9,363}+p_{9,283} \\ &+p_{9,123}+p_{9,295}+p_{9,55}+p_{9,247}+p_{9,95}+p_{9,479}+p_{9,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,783} = \frac{1}{2}p_{9,271} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,271}^2 - 4(p_{9,384}+p_{9,496}+p_{9,376}+p_{9,36}+2p_{9,356} \\ &+p_{9,148}+2p_{9,338}+p_{9,362}+2p_{9,358}+p_{9,33}+p_{9,481}+2p_{9,209} \\ &+p_{9,137}+2p_{9,405}+p_{9,61}+p_{9,189}+2p_{9,445}+p_{9,107}+p_{9,27} \\ &+p_{9,379}+p_{9,39}+p_{9,311}+p_{9,503}+p_{9,351}+p_{9,223}+p_{9,319}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,655} = \frac{1}{2}p_{9,143} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,143}^2 - 4(p_{9,256}+p_{9,368}+p_{9,248}+p_{9,420}+2p_{9,228} \\ &+p_{9,20}+2p_{9,210}+p_{9,234}+2p_{9,230}+p_{9,417}+p_{9,353}+2p_{9,81} \\ &+p_{9,9}+2p_{9,277}+p_{9,61}+2p_{9,317}+p_{9,445}+p_{9,491}+p_{9,411} \\ &+p_{9,251}+p_{9,423}+p_{9,183}+p_{9,375}+p_{9,95}+p_{9,223}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,399} = \frac{1}{2}p_{9,399} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,399}^2 - 4(p_{9,0}+p_{9,112}+p_{9,504}+p_{9,164}+2p_{9,484} \\ &+p_{9,276}+2p_{9,466}+p_{9,490}+2p_{9,486}+p_{9,161}+p_{9,97}+2p_{9,337} \\ &+p_{9,265}+2p_{9,21}+2p_{9,61}+p_{9,317}+p_{9,189}+p_{9,235}+p_{9,155} \\ &+p_{9,507}+p_{9,167}+p_{9,439}+p_{9,119}+p_{9,351}+p_{9,479}+p_{9,447}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,79} = \frac{1}{2}p_{9,79} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,79}^2 - 4(p_{9,192}+p_{9,304}+p_{9,184}+2p_{9,164}+p_{9,356} \\ &+p_{9,468}+2p_{9,146}+p_{9,170}+2p_{9,166}+p_{9,289}+p_{9,353}+2p_{9,17} \\ &+p_{9,457}+2p_{9,213}+p_{9,381}+2p_{9,253}+p_{9,509}+p_{9,427}+p_{9,347} \\ &+p_{9,187}+p_{9,359}+p_{9,311}+p_{9,119}+p_{9,31}+p_{9,159}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,591} = \frac{1}{2}p_{9,79} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,79}^2 - 4(p_{9,192}+p_{9,304}+p_{9,184}+2p_{9,164}+p_{9,356} \\ &+p_{9,468}+2p_{9,146}+p_{9,170}+2p_{9,166}+p_{9,289}+p_{9,353}+2p_{9,17} \\ &+p_{9,457}+2p_{9,213}+p_{9,381}+2p_{9,253}+p_{9,509}+p_{9,427}+p_{9,347} \\ &+p_{9,187}+p_{9,359}+p_{9,311}+p_{9,119}+p_{9,31}+p_{9,159}+p_{9,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,335} = \frac{1}{2}p_{9,335} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,335}^2 - 4(p_{9,448}+p_{9,48}+p_{9,440}+2p_{9,420}+p_{9,100} \\ &+p_{9,212}+2p_{9,402}+p_{9,426}+2p_{9,422}+p_{9,33}+p_{9,97}+2p_{9,273} \\ &+p_{9,201}+2p_{9,469}+p_{9,125}+p_{9,253}+2p_{9,509}+p_{9,171}+p_{9,91} \\ &+p_{9,443}+p_{9,103}+p_{9,55}+p_{9,375}+p_{9,287}+p_{9,415}+p_{9,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,847} = \frac{1}{2}p_{9,335} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,335}^2 - 4(p_{9,448}+p_{9,48}+p_{9,440}+2p_{9,420}+p_{9,100} \\ &+p_{9,212}+2p_{9,402}+p_{9,426}+2p_{9,422}+p_{9,33}+p_{9,97}+2p_{9,273} \\ &+p_{9,201}+2p_{9,469}+p_{9,125}+p_{9,253}+2p_{9,509}+p_{9,171}+p_{9,91} \\ &+p_{9,443}+p_{9,103}+p_{9,55}+p_{9,375}+p_{9,287}+p_{9,415}+p_{9,383}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,719} = \frac{1}{2}p_{9,207} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,207}^2 - 4(p_{9,320}+p_{9,432}+p_{9,312}+2p_{9,292}+p_{9,484} \\ &+p_{9,84}+2p_{9,274}+p_{9,298}+2p_{9,294}+p_{9,417}+p_{9,481}+2p_{9,145} \\ &+p_{9,73}+2p_{9,341}+p_{9,125}+2p_{9,381}+p_{9,509}+p_{9,43}+p_{9,475} \\ &+p_{9,315}+p_{9,487}+p_{9,439}+p_{9,247}+p_{9,287}+p_{9,159}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,463} = \frac{1}{2}p_{9,463} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,463}^2 - 4(p_{9,64}+p_{9,176}+p_{9,56}+2p_{9,36}+p_{9,228} \\ &+p_{9,340}+2p_{9,18}+p_{9,42}+2p_{9,38}+p_{9,161}+p_{9,225}+2p_{9,401} \\ &+p_{9,329}+2p_{9,85}+2p_{9,125}+p_{9,381}+p_{9,253}+p_{9,299}+p_{9,219} \\ &+p_{9,59}+p_{9,231}+p_{9,183}+p_{9,503}+p_{9,31}+p_{9,415}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,975} = \frac{1}{2}p_{9,463} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,463}^2 - 4(p_{9,64}+p_{9,176}+p_{9,56}+2p_{9,36}+p_{9,228} \\ &+p_{9,340}+2p_{9,18}+p_{9,42}+2p_{9,38}+p_{9,161}+p_{9,225}+2p_{9,401} \\ &+p_{9,329}+2p_{9,85}+2p_{9,125}+p_{9,381}+p_{9,253}+p_{9,299}+p_{9,219} \\ &+p_{9,59}+p_{9,231}+p_{9,183}+p_{9,503}+p_{9,31}+p_{9,415}+p_{9,511}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,559} = \frac{1}{2}p_{9,47} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,47}^2 - 4(p_{9,160}+p_{9,272}+p_{9,152}+2p_{9,132}+p_{9,324} \\ &+p_{9,436}+2p_{9,114}+p_{9,138}+2p_{9,134}+p_{9,257}+p_{9,321}+2p_{9,497} \\ &+p_{9,425}+2p_{9,181}+p_{9,349}+2p_{9,221}+p_{9,477}+p_{9,395}+p_{9,155} \\ &+p_{9,315}+p_{9,327}+p_{9,279}+p_{9,87}+p_{9,95}+p_{9,127}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,303} = \frac{1}{2}p_{9,303} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,303}^2 - 4(p_{9,416}+p_{9,16}+p_{9,408}+2p_{9,388}+p_{9,68} \\ &+p_{9,180}+2p_{9,370}+p_{9,394}+2p_{9,390}+p_{9,1}+p_{9,65}+2p_{9,241} \\ &+p_{9,169}+2p_{9,437}+p_{9,93}+p_{9,221}+2p_{9,477}+p_{9,139}+p_{9,411} \\ &+p_{9,59}+p_{9,71}+p_{9,23}+p_{9,343}+p_{9,351}+p_{9,383}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,815} = \frac{1}{2}p_{9,303} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,303}^2 - 4(p_{9,416}+p_{9,16}+p_{9,408}+2p_{9,388}+p_{9,68} \\ &+p_{9,180}+2p_{9,370}+p_{9,394}+2p_{9,390}+p_{9,1}+p_{9,65}+2p_{9,241} \\ &+p_{9,169}+2p_{9,437}+p_{9,93}+p_{9,221}+2p_{9,477}+p_{9,139}+p_{9,411} \\ &+p_{9,59}+p_{9,71}+p_{9,23}+p_{9,343}+p_{9,351}+p_{9,383}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,175} = \frac{1}{2}p_{9,175} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,175}^2 - 4(p_{9,288}+p_{9,400}+p_{9,280}+2p_{9,260}+p_{9,452} \\ &+p_{9,52}+2p_{9,242}+p_{9,266}+2p_{9,262}+p_{9,385}+p_{9,449}+2p_{9,113} \\ &+p_{9,41}+2p_{9,309}+p_{9,93}+2p_{9,349}+p_{9,477}+p_{9,11}+p_{9,283} \\ &+p_{9,443}+p_{9,455}+p_{9,407}+p_{9,215}+p_{9,223}+p_{9,127}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,687} = \frac{1}{2}p_{9,175} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,175}^2 - 4(p_{9,288}+p_{9,400}+p_{9,280}+2p_{9,260}+p_{9,452} \\ &+p_{9,52}+2p_{9,242}+p_{9,266}+2p_{9,262}+p_{9,385}+p_{9,449}+2p_{9,113} \\ &+p_{9,41}+2p_{9,309}+p_{9,93}+2p_{9,349}+p_{9,477}+p_{9,11}+p_{9,283} \\ &+p_{9,443}+p_{9,455}+p_{9,407}+p_{9,215}+p_{9,223}+p_{9,127}+p_{9,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,431} = \frac{1}{2}p_{9,431} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,431}^2 - 4(p_{9,32}+p_{9,144}+p_{9,24}+2p_{9,4}+p_{9,196}+p_{9,308} \\ &+2p_{9,498}+p_{9,10}+2p_{9,6}+p_{9,129}+p_{9,193}+2p_{9,369}+p_{9,297} \\ &+2p_{9,53}+2p_{9,93}+p_{9,349}+p_{9,221}+p_{9,267}+p_{9,27}+p_{9,187} \\ &+p_{9,199}+p_{9,151}+p_{9,471}+p_{9,479}+p_{9,383}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,943} = \frac{1}{2}p_{9,431} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,431}^2 - 4(p_{9,32}+p_{9,144}+p_{9,24}+2p_{9,4}+p_{9,196}+p_{9,308} \\ &+2p_{9,498}+p_{9,10}+2p_{9,6}+p_{9,129}+p_{9,193}+2p_{9,369}+p_{9,297} \\ &+2p_{9,53}+2p_{9,93}+p_{9,349}+p_{9,221}+p_{9,267}+p_{9,27}+p_{9,187} \\ &+p_{9,199}+p_{9,151}+p_{9,471}+p_{9,479}+p_{9,383}+p_{9,511}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,111} = \frac{1}{2}p_{9,111} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,111}^2 - 4(p_{9,224}+p_{9,336}+p_{9,216}+p_{9,388}+2p_{9,196} \\ &+p_{9,500}+2p_{9,178}+p_{9,202}+2p_{9,198}+p_{9,385}+p_{9,321}+2p_{9,49} \\ &+p_{9,489}+2p_{9,245}+p_{9,29}+2p_{9,285}+p_{9,413}+p_{9,459}+p_{9,219} \\ &+p_{9,379}+p_{9,391}+p_{9,151}+p_{9,343}+p_{9,159}+p_{9,63}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,623} = \frac{1}{2}p_{9,111} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,111}^2 - 4(p_{9,224}+p_{9,336}+p_{9,216}+p_{9,388}+2p_{9,196} \\ &+p_{9,500}+2p_{9,178}+p_{9,202}+2p_{9,198}+p_{9,385}+p_{9,321}+2p_{9,49} \\ &+p_{9,489}+2p_{9,245}+p_{9,29}+2p_{9,285}+p_{9,413}+p_{9,459}+p_{9,219} \\ &+p_{9,379}+p_{9,391}+p_{9,151}+p_{9,343}+p_{9,159}+p_{9,63}+p_{9,191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,879} = \frac{1}{2}p_{9,367} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,367}^2 - 4(p_{9,480}+p_{9,80}+p_{9,472}+p_{9,132}+2p_{9,452} \\ &+p_{9,244}+2p_{9,434}+p_{9,458}+2p_{9,454}+p_{9,129}+p_{9,65}+2p_{9,305} \\ &+p_{9,233}+2p_{9,501}+2p_{9,29}+p_{9,285}+p_{9,157}+p_{9,203}+p_{9,475} \\ &+p_{9,123}+p_{9,135}+p_{9,407}+p_{9,87}+p_{9,415}+p_{9,319}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,239} = \frac{1}{2}p_{9,239} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,239}^2 - 4(p_{9,352}+p_{9,464}+p_{9,344}+p_{9,4}+2p_{9,324} \\ &+p_{9,116}+2p_{9,306}+p_{9,330}+2p_{9,326}+p_{9,1}+p_{9,449}+2p_{9,177} \\ &+p_{9,105}+2p_{9,373}+p_{9,29}+p_{9,157}+2p_{9,413}+p_{9,75}+p_{9,347} \\ &+p_{9,507}+p_{9,7}+p_{9,279}+p_{9,471}+p_{9,287}+p_{9,319}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,751} = \frac{1}{2}p_{9,239} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,239}^2 - 4(p_{9,352}+p_{9,464}+p_{9,344}+p_{9,4}+2p_{9,324} \\ &+p_{9,116}+2p_{9,306}+p_{9,330}+2p_{9,326}+p_{9,1}+p_{9,449}+2p_{9,177} \\ &+p_{9,105}+2p_{9,373}+p_{9,29}+p_{9,157}+2p_{9,413}+p_{9,75}+p_{9,347} \\ &+p_{9,507}+p_{9,7}+p_{9,279}+p_{9,471}+p_{9,287}+p_{9,319}+p_{9,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,495} = \frac{1}{2}p_{9,495} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,495}^2 - 4(p_{9,96}+p_{9,208}+p_{9,88}+p_{9,260}+2p_{9,68} \\ &+p_{9,372}+2p_{9,50}+p_{9,74}+2p_{9,70}+p_{9,257}+p_{9,193}+2p_{9,433} \\ &+p_{9,361}+2p_{9,117}+p_{9,285}+2p_{9,157}+p_{9,413}+p_{9,331}+p_{9,91} \\ &+p_{9,251}+p_{9,263}+p_{9,23}+p_{9,215}+p_{9,31}+p_{9,63}+p_{9,447}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1007} = \frac{1}{2}p_{9,495} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,495}^2 - 4(p_{9,96}+p_{9,208}+p_{9,88}+p_{9,260}+2p_{9,68} \\ &+p_{9,372}+2p_{9,50}+p_{9,74}+2p_{9,70}+p_{9,257}+p_{9,193}+2p_{9,433} \\ &+p_{9,361}+2p_{9,117}+p_{9,285}+2p_{9,157}+p_{9,413}+p_{9,331}+p_{9,91} \\ &+p_{9,251}+p_{9,263}+p_{9,23}+p_{9,215}+p_{9,31}+p_{9,63}+p_{9,447}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 3 unreferenced roots were skipped} {\footnotesize \[p_{10,799} = \frac{1}{2}p_{9,287} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,287}^2 - 4(p_{9,0}+p_{9,400}+p_{9,392}+p_{9,164}+p_{9,52} \\ &+2p_{9,372}+2p_{9,354}+p_{9,378}+2p_{9,374}+2p_{9,225}+p_{9,49}+p_{9,497} \\ &+p_{9,153}+2p_{9,421}+p_{9,77}+p_{9,205}+2p_{9,461}+p_{9,395}+p_{9,43} \\ &+p_{9,123}+p_{9,7}+p_{9,327}+p_{9,55}+p_{9,335}+p_{9,367}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,159} = \frac{1}{2}p_{9,159} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,159}^2 - 4(p_{9,384}+p_{9,272}+p_{9,264}+p_{9,36}+p_{9,436} \\ &+2p_{9,244}+2p_{9,226}+p_{9,250}+2p_{9,246}+2p_{9,97}+p_{9,433}+p_{9,369} \\ &+p_{9,25}+2p_{9,293}+p_{9,77}+2p_{9,333}+p_{9,461}+p_{9,267}+p_{9,427} \\ &+p_{9,507}+p_{9,391}+p_{9,199}+p_{9,439}+p_{9,207}+p_{9,111}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,671} = \frac{1}{2}p_{9,159} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,159}^2 - 4(p_{9,384}+p_{9,272}+p_{9,264}+p_{9,36}+p_{9,436} \\ &+2p_{9,244}+2p_{9,226}+p_{9,250}+2p_{9,246}+2p_{9,97}+p_{9,433}+p_{9,369} \\ &+p_{9,25}+2p_{9,293}+p_{9,77}+2p_{9,333}+p_{9,461}+p_{9,267}+p_{9,427} \\ &+p_{9,507}+p_{9,391}+p_{9,199}+p_{9,439}+p_{9,207}+p_{9,111}+p_{9,239}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,927} = \frac{1}{2}p_{9,415} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,415}^2 - 4(p_{9,128}+p_{9,16}+p_{9,8}+p_{9,292}+p_{9,180}+2p_{9,500} \\ &+2p_{9,482}+p_{9,506}+2p_{9,502}+2p_{9,353}+p_{9,177}+p_{9,113}+p_{9,281} \\ &+2p_{9,37}+2p_{9,77}+p_{9,333}+p_{9,205}+p_{9,11}+p_{9,171}+p_{9,251} \\ &+p_{9,135}+p_{9,455}+p_{9,183}+p_{9,463}+p_{9,367}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,95} = \frac{1}{2}p_{9,95} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,95}^2 - 4(p_{9,320}+p_{9,208}+p_{9,200}+p_{9,484}+2p_{9,180} \\ &+p_{9,372}+2p_{9,162}+p_{9,186}+2p_{9,182}+2p_{9,33}+p_{9,305}+p_{9,369} \\ &+p_{9,473}+2p_{9,229}+p_{9,13}+2p_{9,269}+p_{9,397}+p_{9,203}+p_{9,363} \\ &+p_{9,443}+p_{9,135}+p_{9,327}+p_{9,375}+p_{9,143}+p_{9,47}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,607} = \frac{1}{2}p_{9,95} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,95}^2 - 4(p_{9,320}+p_{9,208}+p_{9,200}+p_{9,484}+2p_{9,180} \\ &+p_{9,372}+2p_{9,162}+p_{9,186}+2p_{9,182}+2p_{9,33}+p_{9,305}+p_{9,369} \\ &+p_{9,473}+2p_{9,229}+p_{9,13}+2p_{9,269}+p_{9,397}+p_{9,203}+p_{9,363} \\ &+p_{9,443}+p_{9,135}+p_{9,327}+p_{9,375}+p_{9,143}+p_{9,47}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,351} = \frac{1}{2}p_{9,351} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,351}^2 - 4(p_{9,64}+p_{9,464}+p_{9,456}+p_{9,228}+2p_{9,436} \\ &+p_{9,116}+2p_{9,418}+p_{9,442}+2p_{9,438}+2p_{9,289}+p_{9,49}+p_{9,113} \\ &+p_{9,217}+2p_{9,485}+2p_{9,13}+p_{9,269}+p_{9,141}+p_{9,459}+p_{9,107} \\ &+p_{9,187}+p_{9,391}+p_{9,71}+p_{9,119}+p_{9,399}+p_{9,303}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,863} = \frac{1}{2}p_{9,351} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,351}^2 - 4(p_{9,64}+p_{9,464}+p_{9,456}+p_{9,228}+2p_{9,436} \\ &+p_{9,116}+2p_{9,418}+p_{9,442}+2p_{9,438}+2p_{9,289}+p_{9,49}+p_{9,113} \\ &+p_{9,217}+2p_{9,485}+2p_{9,13}+p_{9,269}+p_{9,141}+p_{9,459}+p_{9,107} \\ &+p_{9,187}+p_{9,391}+p_{9,71}+p_{9,119}+p_{9,399}+p_{9,303}+p_{9,431}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,735} = \frac{1}{2}p_{9,223} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,223}^2 - 4(p_{9,448}+p_{9,336}+p_{9,328}+p_{9,100}+2p_{9,308} \\ &+p_{9,500}+2p_{9,290}+p_{9,314}+2p_{9,310}+2p_{9,161}+p_{9,433}+p_{9,497} \\ &+p_{9,89}+2p_{9,357}+p_{9,13}+p_{9,141}+2p_{9,397}+p_{9,331}+p_{9,491} \\ &+p_{9,59}+p_{9,263}+p_{9,455}+p_{9,503}+p_{9,271}+p_{9,303}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,479} = \frac{1}{2}p_{9,479} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,479}^2 - 4(p_{9,192}+p_{9,80}+p_{9,72}+p_{9,356}+2p_{9,52} \\ &+p_{9,244}+2p_{9,34}+p_{9,58}+2p_{9,54}+2p_{9,417}+p_{9,177}+p_{9,241} \\ &+p_{9,345}+2p_{9,101}+p_{9,269}+2p_{9,141}+p_{9,397}+p_{9,75}+p_{9,235} \\ &+p_{9,315}+p_{9,7}+p_{9,199}+p_{9,247}+p_{9,15}+p_{9,47}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,991} = \frac{1}{2}p_{9,479} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,479}^2 - 4(p_{9,192}+p_{9,80}+p_{9,72}+p_{9,356}+2p_{9,52} \\ &+p_{9,244}+2p_{9,34}+p_{9,58}+2p_{9,54}+2p_{9,417}+p_{9,177}+p_{9,241} \\ &+p_{9,345}+2p_{9,101}+p_{9,269}+2p_{9,141}+p_{9,397}+p_{9,75}+p_{9,235} \\ &+p_{9,315}+p_{9,7}+p_{9,199}+p_{9,247}+p_{9,15}+p_{9,47}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,63} = \frac{1}{2}p_{9,63} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,63}^2 - 4(p_{9,288}+p_{9,176}+p_{9,168}+p_{9,452}+2p_{9,148} \\ &+p_{9,340}+2p_{9,130}+p_{9,154}+2p_{9,150}+2p_{9,1}+p_{9,273}+p_{9,337} \\ &+p_{9,441}+2p_{9,197}+p_{9,365}+2p_{9,237}+p_{9,493}+p_{9,331}+p_{9,171} \\ &+p_{9,411}+p_{9,295}+p_{9,103}+p_{9,343}+p_{9,15}+p_{9,143}+p_{9,111}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,575} = \frac{1}{2}p_{9,63} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,63}^2 - 4(p_{9,288}+p_{9,176}+p_{9,168}+p_{9,452}+2p_{9,148} \\ &+p_{9,340}+2p_{9,130}+p_{9,154}+2p_{9,150}+2p_{9,1}+p_{9,273}+p_{9,337} \\ &+p_{9,441}+2p_{9,197}+p_{9,365}+2p_{9,237}+p_{9,493}+p_{9,331}+p_{9,171} \\ &+p_{9,411}+p_{9,295}+p_{9,103}+p_{9,343}+p_{9,15}+p_{9,143}+p_{9,111}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,831} = \frac{1}{2}p_{9,319} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,319}^2 - 4(p_{9,32}+p_{9,432}+p_{9,424}+p_{9,196}+2p_{9,404} \\ &+p_{9,84}+2p_{9,386}+p_{9,410}+2p_{9,406}+2p_{9,257}+p_{9,17}+p_{9,81} \\ &+p_{9,185}+2p_{9,453}+p_{9,109}+p_{9,237}+2p_{9,493}+p_{9,75}+p_{9,427} \\ &+p_{9,155}+p_{9,39}+p_{9,359}+p_{9,87}+p_{9,271}+p_{9,399}+p_{9,367}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,191} = \frac{1}{2}p_{9,191} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,191}^2 - 4(p_{9,416}+p_{9,304}+p_{9,296}+p_{9,68}+2p_{9,276} \\ &+p_{9,468}+2p_{9,258}+p_{9,282}+2p_{9,278}+2p_{9,129}+p_{9,401}+p_{9,465} \\ &+p_{9,57}+2p_{9,325}+p_{9,109}+2p_{9,365}+p_{9,493}+p_{9,459}+p_{9,299} \\ &+p_{9,27}+p_{9,423}+p_{9,231}+p_{9,471}+p_{9,271}+p_{9,143}+p_{9,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,703} = \frac{1}{2}p_{9,191} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,191}^2 - 4(p_{9,416}+p_{9,304}+p_{9,296}+p_{9,68}+2p_{9,276} \\ &+p_{9,468}+2p_{9,258}+p_{9,282}+2p_{9,278}+2p_{9,129}+p_{9,401}+p_{9,465} \\ &+p_{9,57}+2p_{9,325}+p_{9,109}+2p_{9,365}+p_{9,493}+p_{9,459}+p_{9,299} \\ &+p_{9,27}+p_{9,423}+p_{9,231}+p_{9,471}+p_{9,271}+p_{9,143}+p_{9,239}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{10,959} = \frac{1}{2}p_{9,447} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,447}^2 - 4(p_{9,160}+p_{9,48}+p_{9,40}+p_{9,324}+2p_{9,20} \\ &+p_{9,212}+2p_{9,2}+p_{9,26}+2p_{9,22}+2p_{9,385}+p_{9,145}+p_{9,209} \\ &+p_{9,313}+2p_{9,69}+2p_{9,109}+p_{9,365}+p_{9,237}+p_{9,203}+p_{9,43} \\ &+p_{9,283}+p_{9,167}+p_{9,487}+p_{9,215}+p_{9,15}+p_{9,399}+p_{9,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,127} = \frac{1}{2}p_{9,127} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,127}^2 - 4(p_{9,352}+p_{9,240}+p_{9,232}+p_{9,4}+p_{9,404} \\ &+2p_{9,212}+2p_{9,194}+p_{9,218}+2p_{9,214}+2p_{9,65}+p_{9,401}+p_{9,337} \\ &+p_{9,505}+2p_{9,261}+p_{9,45}+2p_{9,301}+p_{9,429}+p_{9,395}+p_{9,235} \\ &+p_{9,475}+p_{9,167}+p_{9,359}+p_{9,407}+p_{9,79}+p_{9,207}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,639} = \frac{1}{2}p_{9,127} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,127}^2 - 4(p_{9,352}+p_{9,240}+p_{9,232}+p_{9,4}+p_{9,404} \\ &+2p_{9,212}+2p_{9,194}+p_{9,218}+2p_{9,214}+2p_{9,65}+p_{9,401}+p_{9,337} \\ &+p_{9,505}+2p_{9,261}+p_{9,45}+2p_{9,301}+p_{9,429}+p_{9,395}+p_{9,235} \\ &+p_{9,475}+p_{9,167}+p_{9,359}+p_{9,407}+p_{9,79}+p_{9,207}+p_{9,175}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,383} = \frac{1}{2}p_{9,383} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,383}^2 - 4(p_{9,96}+p_{9,496}+p_{9,488}+p_{9,260}+p_{9,148} \\ &+2p_{9,468}+2p_{9,450}+p_{9,474}+2p_{9,470}+2p_{9,321}+p_{9,145}+p_{9,81} \\ &+p_{9,249}+2p_{9,5}+2p_{9,45}+p_{9,301}+p_{9,173}+p_{9,139}+p_{9,491} \\ &+p_{9,219}+p_{9,423}+p_{9,103}+p_{9,151}+p_{9,335}+p_{9,463}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,895} = \frac{1}{2}p_{9,383} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,383}^2 - 4(p_{9,96}+p_{9,496}+p_{9,488}+p_{9,260}+p_{9,148} \\ &+2p_{9,468}+2p_{9,450}+p_{9,474}+2p_{9,470}+2p_{9,321}+p_{9,145}+p_{9,81} \\ &+p_{9,249}+2p_{9,5}+2p_{9,45}+p_{9,301}+p_{9,173}+p_{9,139}+p_{9,491} \\ &+p_{9,219}+p_{9,423}+p_{9,103}+p_{9,151}+p_{9,335}+p_{9,463}+p_{9,431}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,255} = \frac{1}{2}p_{9,255} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,255}^2 - 4(p_{9,480}+p_{9,368}+p_{9,360}+p_{9,132}+p_{9,20} \\ &+2p_{9,340}+2p_{9,322}+p_{9,346}+2p_{9,342}+2p_{9,193}+p_{9,17}+p_{9,465} \\ &+p_{9,121}+2p_{9,389}+p_{9,45}+p_{9,173}+2p_{9,429}+p_{9,11}+p_{9,363} \\ &+p_{9,91}+p_{9,295}+p_{9,487}+p_{9,23}+p_{9,335}+p_{9,207}+p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,767} = \frac{1}{2}p_{9,255} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,255}^2 - 4(p_{9,480}+p_{9,368}+p_{9,360}+p_{9,132}+p_{9,20} \\ &+2p_{9,340}+2p_{9,322}+p_{9,346}+2p_{9,342}+2p_{9,193}+p_{9,17}+p_{9,465} \\ &+p_{9,121}+2p_{9,389}+p_{9,45}+p_{9,173}+2p_{9,429}+p_{9,11}+p_{9,363} \\ &+p_{9,91}+p_{9,295}+p_{9,487}+p_{9,23}+p_{9,335}+p_{9,207}+p_{9,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,511} = \frac{1}{2}p_{9,511} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,511}^2 - 4(p_{9,224}+p_{9,112}+p_{9,104}+p_{9,388}+p_{9,276} \\ &+2p_{9,84}+2p_{9,66}+p_{9,90}+2p_{9,86}+2p_{9,449}+p_{9,273}+p_{9,209} \\ &+p_{9,377}+2p_{9,133}+p_{9,301}+2p_{9,173}+p_{9,429}+p_{9,267}+p_{9,107} \\ &+p_{9,347}+p_{9,39}+p_{9,231}+p_{9,279}+p_{9,79}+p_{9,463}+p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{10,1023} = \frac{1}{2}p_{9,511} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{9,511}^2 - 4(p_{9,224}+p_{9,112}+p_{9,104}+p_{9,388}+p_{9,276} \\ &+2p_{9,84}+2p_{9,66}+p_{9,90}+2p_{9,86}+2p_{9,449}+p_{9,273}+p_{9,209} \\ &+p_{9,377}+2p_{9,133}+p_{9,301}+2p_{9,173}+p_{9,429}+p_{9,267}+p_{9,107} \\ &+p_{9,347}+p_{9,39}+p_{9,231}+p_{9,279}+p_{9,79}+p_{9,463}+p_{9,47}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,0} = \frac{1}{2}p_{10,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,0}^2 - 4(2p_{10,0}+p_{10,840}+p_{10,184} \\ &+p_{10,308}+p_{10,530}+2p_{10,154}+p_{10,666}+p_{10,718} \\ &+p_{10,945}+2p_{10,777}+p_{10,733}+p_{10,359}+p_{10,23}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1024} = \frac{1}{2}p_{10,0} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,0}^2 - 4(2p_{10,0}+p_{10,840}+p_{10,184} \\ &+p_{10,308}+p_{10,530}+2p_{10,154}+p_{10,666}+p_{10,718} \\ &+p_{10,945}+2p_{10,777}+p_{10,733}+p_{10,359}+p_{10,23}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 36 unreferenced roots were skipped} {\footnotesize \[p_{11,800} = \frac{1}{2}p_{10,800} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,800}^2 - 4(2p_{10,800}+p_{10,616}+p_{10,984} \\ &+p_{10,84}+p_{10,306}+p_{10,442}+2p_{10,954}+p_{10,494} \\ &+p_{10,721}+2p_{10,553}+p_{10,509}+p_{10,135}+p_{10,823}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1824} = \frac{1}{2}p_{10,800} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,800}^2 - 4(2p_{10,800}+p_{10,616}+p_{10,984} \\ &+p_{10,84}+p_{10,306}+p_{10,442}+2p_{10,954}+p_{10,494} \\ &+p_{10,721}+2p_{10,553}+p_{10,509}+p_{10,135}+p_{10,823}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 16 unreferenced roots were skipped} {\footnotesize \[p_{11,224} = \frac{1}{2}p_{10,224} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,224}^2 - 4(2p_{10,224}+p_{10,40}+p_{10,408} \\ &+p_{10,532}+p_{10,754}+2p_{10,378}+p_{10,890}+p_{10,942} \\ &+p_{10,145}+2p_{10,1001}+p_{10,957}+p_{10,583}+p_{10,247}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1248} = \frac{1}{2}p_{10,224} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,224}^2 - 4(2p_{10,224}+p_{10,40}+p_{10,408} \\ &+p_{10,532}+p_{10,754}+2p_{10,378}+p_{10,890}+p_{10,942} \\ &+p_{10,145}+2p_{10,1001}+p_{10,957}+p_{10,583}+p_{10,247}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{11,480} = \frac{1}{2}p_{10,480} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,480}^2 - 4(2p_{10,480}+p_{10,296}+p_{10,664} \\ &+p_{10,788}+p_{10,1010}+p_{10,122}+2p_{10,634}+p_{10,174} \\ &+p_{10,401}+2p_{10,233}+p_{10,189}+p_{10,839}+p_{10,503}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1504} = \frac{1}{2}p_{10,480} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,480}^2 - 4(2p_{10,480}+p_{10,296}+p_{10,664} \\ &+p_{10,788}+p_{10,1010}+p_{10,122}+2p_{10,634}+p_{10,174} \\ &+p_{10,401}+2p_{10,233}+p_{10,189}+p_{10,839}+p_{10,503}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,784} = \frac{1}{2}p_{10,784} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,784}^2 - 4(2p_{10,784}+p_{10,968}+p_{10,600} \\ &+p_{10,68}+p_{10,290}+p_{10,426}+2p_{10,938}+p_{10,478} \\ &+p_{10,705}+2p_{10,537}+p_{10,493}+p_{10,807}+p_{10,119}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1808} = \frac{1}{2}p_{10,784} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,784}^2 - 4(2p_{10,784}+p_{10,968}+p_{10,600} \\ &+p_{10,68}+p_{10,290}+p_{10,426}+2p_{10,938}+p_{10,478} \\ &+p_{10,705}+2p_{10,537}+p_{10,493}+p_{10,807}+p_{10,119}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 10 unreferenced roots were skipped} {\footnotesize \[p_{11,592} = \frac{1}{2}p_{10,592} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,592}^2 - 4(2p_{10,592}+p_{10,776}+p_{10,408} \\ &+p_{10,900}+p_{10,98}+p_{10,234}+2p_{10,746}+p_{10,286} \\ &+p_{10,513}+2p_{10,345}+p_{10,301}+p_{10,615}+p_{10,951}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1616} = \frac{1}{2}p_{10,592} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,592}^2 - 4(2p_{10,592}+p_{10,776}+p_{10,408} \\ &+p_{10,900}+p_{10,98}+p_{10,234}+2p_{10,746}+p_{10,286} \\ &+p_{10,513}+2p_{10,345}+p_{10,301}+p_{10,615}+p_{10,951}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,720} = \frac{1}{2}p_{10,720} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,720}^2 - 4(2p_{10,720}+p_{10,904}+p_{10,536} \\ &+p_{10,4}+p_{10,226}+p_{10,362}+2p_{10,874}+p_{10,414} \\ &+p_{10,641}+2p_{10,473}+p_{10,429}+p_{10,743}+p_{10,55}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1744} = \frac{1}{2}p_{10,720} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,720}^2 - 4(2p_{10,720}+p_{10,904}+p_{10,536} \\ &+p_{10,4}+p_{10,226}+p_{10,362}+2p_{10,874}+p_{10,414} \\ &+p_{10,641}+2p_{10,473}+p_{10,429}+p_{10,743}+p_{10,55}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 28 unreferenced roots were skipped} {\footnotesize \[p_{11,240} = \frac{1}{2}p_{10,240} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,240}^2 - 4(2p_{10,240}+p_{10,424}+p_{10,56} \\ &+p_{10,548}+p_{10,770}+2p_{10,394}+p_{10,906}+p_{10,958} \\ &+p_{10,161}+2p_{10,1017}+p_{10,973}+p_{10,263}+p_{10,599}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1264} = \frac{1}{2}p_{10,240} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,240}^2 - 4(2p_{10,240}+p_{10,424}+p_{10,56} \\ &+p_{10,548}+p_{10,770}+2p_{10,394}+p_{10,906}+p_{10,958} \\ &+p_{10,161}+2p_{10,1017}+p_{10,973}+p_{10,263}+p_{10,599}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,1008} = \frac{1}{2}p_{10,1008} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1008}^2 - 4(2p_{10,1008}+p_{10,168}+p_{10,824} \\ &+p_{10,292}+p_{10,514}+2p_{10,138}+p_{10,650}+p_{10,702} \\ &+p_{10,929}+2p_{10,761}+p_{10,717}+p_{10,7}+p_{10,343}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,2032} = \frac{1}{2}p_{10,1008} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1008}^2 - 4(2p_{10,1008}+p_{10,168}+p_{10,824} \\ &+p_{10,292}+p_{10,514}+2p_{10,138}+p_{10,650}+p_{10,702} \\ &+p_{10,929}+2p_{10,761}+p_{10,717}+p_{10,7}+p_{10,343}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,776} = \frac{1}{2}p_{10,776} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,776}^2 - 4(p_{10,960}+p_{10,592}+2p_{10,776} \\ &+p_{10,60}+p_{10,418}+2p_{10,930}+p_{10,282}+p_{10,470} \\ &+2p_{10,529}+p_{10,697}+p_{10,485}+p_{10,111}+p_{10,799}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1800} = \frac{1}{2}p_{10,776} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,776}^2 - 4(p_{10,960}+p_{10,592}+2p_{10,776} \\ &+p_{10,60}+p_{10,418}+2p_{10,930}+p_{10,282}+p_{10,470} \\ &+2p_{10,529}+p_{10,697}+p_{10,485}+p_{10,111}+p_{10,799}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,840} = \frac{1}{2}p_{10,840} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,840}^2 - 4(p_{10,0}+p_{10,656}+2p_{10,840} \\ &+p_{10,124}+p_{10,482}+2p_{10,994}+p_{10,346}+p_{10,534} \\ &+2p_{10,593}+p_{10,761}+p_{10,549}+p_{10,175}+p_{10,863}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1864} = \frac{1}{2}p_{10,840} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,840}^2 - 4(p_{10,0}+p_{10,656}+2p_{10,840} \\ &+p_{10,124}+p_{10,482}+2p_{10,994}+p_{10,346}+p_{10,534} \\ &+2p_{10,593}+p_{10,761}+p_{10,549}+p_{10,175}+p_{10,863}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,968} = \frac{1}{2}p_{10,968} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,968}^2 - 4(p_{10,128}+p_{10,784}+2p_{10,968} \\ &+p_{10,252}+2p_{10,98}+p_{10,610}+p_{10,474}+p_{10,662} \\ &+2p_{10,721}+p_{10,889}+p_{10,677}+p_{10,303}+p_{10,991}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1992} = \frac{1}{2}p_{10,968} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,968}^2 - 4(p_{10,128}+p_{10,784}+2p_{10,968} \\ &+p_{10,252}+2p_{10,98}+p_{10,610}+p_{10,474}+p_{10,662} \\ &+2p_{10,721}+p_{10,889}+p_{10,677}+p_{10,303}+p_{10,991}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,168} = \frac{1}{2}p_{10,168} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,168}^2 - 4(p_{10,352}+p_{10,1008}+2p_{10,168} \\ &+p_{10,476}+2p_{10,322}+p_{10,834}+p_{10,698}+p_{10,886} \\ &+2p_{10,945}+p_{10,89}+p_{10,901}+p_{10,527}+p_{10,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1192} = \frac{1}{2}p_{10,168} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,168}^2 - 4(p_{10,352}+p_{10,1008}+2p_{10,168} \\ &+p_{10,476}+2p_{10,322}+p_{10,834}+p_{10,698}+p_{10,886} \\ &+2p_{10,945}+p_{10,89}+p_{10,901}+p_{10,527}+p_{10,191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,536} = \frac{1}{2}p_{10,536} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,536}^2 - 4(p_{10,352}+p_{10,720}+2p_{10,536} \\ &+p_{10,844}+p_{10,178}+2p_{10,690}+p_{10,42}+p_{10,230} \\ &+2p_{10,289}+p_{10,457}+p_{10,245}+p_{10,559}+p_{10,895}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1560} = \frac{1}{2}p_{10,536} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,536}^2 - 4(p_{10,352}+p_{10,720}+2p_{10,536} \\ &+p_{10,844}+p_{10,178}+2p_{10,690}+p_{10,42}+p_{10,230} \\ &+2p_{10,289}+p_{10,457}+p_{10,245}+p_{10,559}+p_{10,895}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,408} = \frac{1}{2}p_{10,408} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,408}^2 - 4(p_{10,224}+p_{10,592}+2p_{10,408} \\ &+p_{10,716}+p_{10,50}+2p_{10,562}+p_{10,938}+p_{10,102} \\ &+2p_{10,161}+p_{10,329}+p_{10,117}+p_{10,431}+p_{10,767}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1432} = \frac{1}{2}p_{10,408} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,408}^2 - 4(p_{10,224}+p_{10,592}+2p_{10,408} \\ &+p_{10,716}+p_{10,50}+2p_{10,562}+p_{10,938}+p_{10,102} \\ &+2p_{10,161}+p_{10,329}+p_{10,117}+p_{10,431}+p_{10,767}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 62 unreferenced roots were skipped} {\footnotesize \[p_{11,388} = \frac{1}{2}p_{10,388} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,388}^2 - 4(p_{10,696}+2p_{10,388}+p_{10,204} \\ &+p_{10,572}+p_{10,82}+p_{10,918}+p_{10,30}+2p_{10,542} \\ &+p_{10,97}+p_{10,309}+2p_{10,141}+p_{10,747}+p_{10,411}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1412} = \frac{1}{2}p_{10,388} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,388}^2 - 4(p_{10,696}+2p_{10,388}+p_{10,204} \\ &+p_{10,572}+p_{10,82}+p_{10,918}+p_{10,30}+2p_{10,542} \\ &+p_{10,97}+p_{10,309}+2p_{10,141}+p_{10,747}+p_{10,411}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,708} = \frac{1}{2}p_{10,708} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,708}^2 - 4(p_{10,1016}+2p_{10,708}+p_{10,524} \\ &+p_{10,892}+p_{10,402}+p_{10,214}+p_{10,350}+2p_{10,862} \\ &+p_{10,417}+p_{10,629}+2p_{10,461}+p_{10,43}+p_{10,731}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1732} = \frac{1}{2}p_{10,708} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,708}^2 - 4(p_{10,1016}+2p_{10,708}+p_{10,524} \\ &+p_{10,892}+p_{10,402}+p_{10,214}+p_{10,350}+2p_{10,862} \\ &+p_{10,417}+p_{10,629}+2p_{10,461}+p_{10,43}+p_{10,731}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 18 unreferenced roots were skipped} {\footnotesize \[p_{11,932} = \frac{1}{2}p_{10,932} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,932}^2 - 4(p_{10,216}+2p_{10,932}+p_{10,748} \\ &+p_{10,92}+p_{10,626}+p_{10,438}+2p_{10,62}+p_{10,574} \\ &+p_{10,641}+p_{10,853}+2p_{10,685}+p_{10,267}+p_{10,955}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1956} = \frac{1}{2}p_{10,932} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,932}^2 - 4(p_{10,216}+2p_{10,932}+p_{10,748} \\ &+p_{10,92}+p_{10,626}+p_{10,438}+2p_{10,62}+p_{10,574} \\ &+p_{10,641}+p_{10,853}+2p_{10,685}+p_{10,267}+p_{10,955}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,148} = \frac{1}{2}p_{10,148} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,148}^2 - 4(p_{10,456}+2p_{10,148}+p_{10,332} \\ &+p_{10,988}+p_{10,866}+p_{10,678}+2p_{10,302}+p_{10,814} \\ &+p_{10,881}+p_{10,69}+2p_{10,925}+p_{10,171}+p_{10,507}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1172} = \frac{1}{2}p_{10,148} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,148}^2 - 4(p_{10,456}+2p_{10,148}+p_{10,332} \\ &+p_{10,988}+p_{10,866}+p_{10,678}+2p_{10,302}+p_{10,814} \\ &+p_{10,881}+p_{10,69}+2p_{10,925}+p_{10,171}+p_{10,507}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 40 unreferenced roots were skipped} {\footnotesize \[p_{11,628} = \frac{1}{2}p_{10,628} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,628}^2 - 4(p_{10,936}+2p_{10,628}+p_{10,812} \\ &+p_{10,444}+p_{10,322}+p_{10,134}+p_{10,270}+2p_{10,782} \\ &+p_{10,337}+p_{10,549}+2p_{10,381}+p_{10,651}+p_{10,987}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1652} = \frac{1}{2}p_{10,628} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,628}^2 - 4(p_{10,936}+2p_{10,628}+p_{10,812} \\ &+p_{10,444}+p_{10,322}+p_{10,134}+p_{10,270}+2p_{10,782} \\ &+p_{10,337}+p_{10,549}+2p_{10,381}+p_{10,651}+p_{10,987}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 28 unreferenced roots were skipped} {\footnotesize \[p_{11,76} = \frac{1}{2}p_{10,76} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,76}^2 - 4(p_{10,384}+p_{10,260}+p_{10,916} \\ &+2p_{10,76}+p_{10,794}+2p_{10,230}+p_{10,742}+p_{10,606} \\ &+p_{10,809}+2p_{10,853}+p_{10,1021}+p_{10,99}+p_{10,435}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1100} = \frac{1}{2}p_{10,76} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,76}^2 - 4(p_{10,384}+p_{10,260}+p_{10,916} \\ &+2p_{10,76}+p_{10,794}+2p_{10,230}+p_{10,742}+p_{10,606} \\ &+p_{10,809}+2p_{10,853}+p_{10,1021}+p_{10,99}+p_{10,435}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{11,332} = \frac{1}{2}p_{10,332} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,332}^2 - 4(p_{10,640}+p_{10,516}+p_{10,148} \\ &+2p_{10,332}+p_{10,26}+2p_{10,486}+p_{10,998}+p_{10,862} \\ &+p_{10,41}+2p_{10,85}+p_{10,253}+p_{10,355}+p_{10,691}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1356} = \frac{1}{2}p_{10,332} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,332}^2 - 4(p_{10,640}+p_{10,516}+p_{10,148} \\ &+2p_{10,332}+p_{10,26}+2p_{10,486}+p_{10,998}+p_{10,862} \\ &+p_{10,41}+2p_{10,85}+p_{10,253}+p_{10,355}+p_{10,691}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 20 unreferenced roots were skipped} {\footnotesize \[p_{11,684} = \frac{1}{2}p_{10,684} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,684}^2 - 4(p_{10,992}+p_{10,868}+p_{10,500} \\ &+2p_{10,684}+p_{10,378}+p_{10,326}+2p_{10,838}+p_{10,190} \\ &+p_{10,393}+2p_{10,437}+p_{10,605}+p_{10,707}+p_{10,19}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1708} = \frac{1}{2}p_{10,684} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,684}^2 - 4(p_{10,992}+p_{10,868}+p_{10,500} \\ &+2p_{10,684}+p_{10,378}+p_{10,326}+2p_{10,838}+p_{10,190} \\ &+p_{10,393}+2p_{10,437}+p_{10,605}+p_{10,707}+p_{10,19}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 10 unreferenced roots were skipped} {\footnotesize \[p_{11,876} = \frac{1}{2}p_{10,876} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,876}^2 - 4(p_{10,160}+p_{10,36}+p_{10,692} \\ &+2p_{10,876}+p_{10,570}+2p_{10,6}+p_{10,518}+p_{10,382} \\ &+p_{10,585}+2p_{10,629}+p_{10,797}+p_{10,899}+p_{10,211}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1900} = \frac{1}{2}p_{10,876} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,876}^2 - 4(p_{10,160}+p_{10,36}+p_{10,692} \\ &+2p_{10,876}+p_{10,570}+2p_{10,6}+p_{10,518}+p_{10,382} \\ &+p_{10,585}+2p_{10,629}+p_{10,797}+p_{10,899}+p_{10,211}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,92} = \frac{1}{2}p_{10,92} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,92}^2 - 4(p_{10,400}+p_{10,932}+p_{10,276} \\ &+2p_{10,92}+p_{10,810}+2p_{10,246}+p_{10,758}+p_{10,622} \\ &+p_{10,825}+2p_{10,869}+p_{10,13}+p_{10,451}+p_{10,115}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1116} = \frac{1}{2}p_{10,92} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,92}^2 - 4(p_{10,400}+p_{10,932}+p_{10,276} \\ &+2p_{10,92}+p_{10,810}+2p_{10,246}+p_{10,758}+p_{10,622} \\ &+p_{10,825}+2p_{10,869}+p_{10,13}+p_{10,451}+p_{10,115}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 16 unreferenced roots were skipped} {\footnotesize \[p_{11,572} = \frac{1}{2}p_{10,572} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,572}^2 - 4(p_{10,880}+p_{10,388}+p_{10,756} \\ &+2p_{10,572}+p_{10,266}+p_{10,214}+2p_{10,726}+p_{10,78} \\ &+p_{10,281}+2p_{10,325}+p_{10,493}+p_{10,931}+p_{10,595}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1596} = \frac{1}{2}p_{10,572} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,572}^2 - 4(p_{10,880}+p_{10,388}+p_{10,756} \\ &+2p_{10,572}+p_{10,266}+p_{10,214}+2p_{10,726}+p_{10,78} \\ &+p_{10,281}+2p_{10,325}+p_{10,493}+p_{10,931}+p_{10,595}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,316} = \frac{1}{2}p_{10,316} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,316}^2 - 4(p_{10,624}+p_{10,132}+p_{10,500} \\ &+2p_{10,316}+p_{10,10}+2p_{10,470}+p_{10,982}+p_{10,846} \\ &+p_{10,25}+2p_{10,69}+p_{10,237}+p_{10,675}+p_{10,339}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1340} = \frac{1}{2}p_{10,316} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,316}^2 - 4(p_{10,624}+p_{10,132}+p_{10,500} \\ &+2p_{10,316}+p_{10,10}+2p_{10,470}+p_{10,982}+p_{10,846} \\ &+p_{10,25}+2p_{10,69}+p_{10,237}+p_{10,675}+p_{10,339}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 16 unreferenced roots were skipped} {\footnotesize \[p_{11,892} = \frac{1}{2}p_{10,892} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,892}^2 - 4(p_{10,176}+p_{10,708}+p_{10,52} \\ &+2p_{10,892}+p_{10,586}+2p_{10,22}+p_{10,534}+p_{10,398} \\ &+p_{10,601}+2p_{10,645}+p_{10,813}+p_{10,227}+p_{10,915}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1916} = \frac{1}{2}p_{10,892} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,892}^2 - 4(p_{10,176}+p_{10,708}+p_{10,52} \\ &+2p_{10,892}+p_{10,586}+2p_{10,22}+p_{10,534}+p_{10,398} \\ &+p_{10,601}+2p_{10,645}+p_{10,813}+p_{10,227}+p_{10,915}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,2} = \frac{1}{2}p_{10,2} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,2}^2 - 4(p_{10,720}+p_{10,532}+2p_{10,156} \\ &+p_{10,668}+2p_{10,2}+p_{10,842}+p_{10,186}+p_{10,310} \\ &+p_{10,361}+p_{10,25}+p_{10,947}+2p_{10,779}+p_{10,735}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1026} = \frac{1}{2}p_{10,2} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,2}^2 - 4(p_{10,720}+p_{10,532}+2p_{10,156} \\ &+p_{10,668}+2p_{10,2}+p_{10,842}+p_{10,186}+p_{10,310} \\ &+p_{10,361}+p_{10,25}+p_{10,947}+2p_{10,779}+p_{10,735}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 62 unreferenced roots were skipped} {\footnotesize \[p_{11,18} = \frac{1}{2}p_{10,18} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,18}^2 - 4(p_{10,736}+p_{10,548}+2p_{10,172} \\ &+p_{10,684}+2p_{10,18}+p_{10,202}+p_{10,858}+p_{10,326} \\ &+p_{10,41}+p_{10,377}+p_{10,963}+2p_{10,795}+p_{10,751}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1042} = \frac{1}{2}p_{10,18} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,18}^2 - 4(p_{10,736}+p_{10,548}+2p_{10,172} \\ &+p_{10,684}+2p_{10,18}+p_{10,202}+p_{10,858}+p_{10,326} \\ &+p_{10,41}+p_{10,377}+p_{10,963}+2p_{10,795}+p_{10,751}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,146} = \frac{1}{2}p_{10,146} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,146}^2 - 4(p_{10,864}+p_{10,676}+2p_{10,300} \\ &+p_{10,812}+2p_{10,146}+p_{10,330}+p_{10,986}+p_{10,454} \\ &+p_{10,169}+p_{10,505}+p_{10,67}+2p_{10,923}+p_{10,879}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1170} = \frac{1}{2}p_{10,146} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,146}^2 - 4(p_{10,864}+p_{10,676}+2p_{10,300} \\ &+p_{10,812}+2p_{10,146}+p_{10,330}+p_{10,986}+p_{10,454} \\ &+p_{10,169}+p_{10,505}+p_{10,67}+2p_{10,923}+p_{10,879}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,914} = \frac{1}{2}p_{10,914} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,914}^2 - 4(p_{10,608}+p_{10,420}+2p_{10,44} \\ &+p_{10,556}+2p_{10,914}+p_{10,74}+p_{10,730}+p_{10,198} \\ &+p_{10,937}+p_{10,249}+p_{10,835}+2p_{10,667}+p_{10,623}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1938} = \frac{1}{2}p_{10,914} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,914}^2 - 4(p_{10,608}+p_{10,420}+2p_{10,44} \\ &+p_{10,556}+2p_{10,914}+p_{10,74}+p_{10,730}+p_{10,198} \\ &+p_{10,937}+p_{10,249}+p_{10,835}+2p_{10,667}+p_{10,623}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 40 unreferenced roots were skipped} {\footnotesize \[p_{11,242} = \frac{1}{2}p_{10,242} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,242}^2 - 4(p_{10,960}+p_{10,772}+2p_{10,396} \\ &+p_{10,908}+2p_{10,242}+p_{10,426}+p_{10,58}+p_{10,550} \\ &+p_{10,265}+p_{10,601}+p_{10,163}+2p_{10,1019}+p_{10,975}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1266} = \frac{1}{2}p_{10,242} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,242}^2 - 4(p_{10,960}+p_{10,772}+2p_{10,396} \\ &+p_{10,908}+2p_{10,242}+p_{10,426}+p_{10,58}+p_{10,550} \\ &+p_{10,265}+p_{10,601}+p_{10,163}+2p_{10,1019}+p_{10,975}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,778} = \frac{1}{2}p_{10,778} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,778}^2 - 4(p_{10,472}+p_{10,420}+2p_{10,932} \\ &+p_{10,284}+p_{10,962}+p_{10,594}+2p_{10,778}+p_{10,62} \\ &+p_{10,801}+p_{10,113}+2p_{10,531}+p_{10,699}+p_{10,487}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1802} = \frac{1}{2}p_{10,778} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,778}^2 - 4(p_{10,472}+p_{10,420}+2p_{10,932} \\ &+p_{10,284}+p_{10,962}+p_{10,594}+2p_{10,778}+p_{10,62} \\ &+p_{10,801}+p_{10,113}+2p_{10,531}+p_{10,699}+p_{10,487}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,74} = \frac{1}{2}p_{10,74} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,74}^2 - 4(p_{10,792}+2p_{10,228}+p_{10,740} \\ &+p_{10,604}+p_{10,258}+p_{10,914}+2p_{10,74}+p_{10,382} \\ &+p_{10,97}+p_{10,433}+2p_{10,851}+p_{10,1019}+p_{10,807}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1098} = \frac{1}{2}p_{10,74} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,74}^2 - 4(p_{10,792}+2p_{10,228}+p_{10,740} \\ &+p_{10,604}+p_{10,258}+p_{10,914}+2p_{10,74}+p_{10,382} \\ &+p_{10,97}+p_{10,433}+2p_{10,851}+p_{10,1019}+p_{10,807}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 54 unreferenced roots were skipped} {\footnotesize \[p_{11,154} = \frac{1}{2}p_{10,154} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,154}^2 - 4(p_{10,872}+2p_{10,308}+p_{10,820} \\ &+p_{10,684}+p_{10,994}+p_{10,338}+2p_{10,154}+p_{10,462} \\ &+p_{10,513}+p_{10,177}+2p_{10,931}+p_{10,75}+p_{10,887}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1178} = \frac{1}{2}p_{10,154} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,154}^2 - 4(p_{10,872}+2p_{10,308}+p_{10,820} \\ &+p_{10,684}+p_{10,994}+p_{10,338}+2p_{10,154}+p_{10,462} \\ &+p_{10,513}+p_{10,177}+2p_{10,931}+p_{10,75}+p_{10,887}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,90} = \frac{1}{2}p_{10,90} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,90}^2 - 4(p_{10,808}+2p_{10,244}+p_{10,756} \\ &+p_{10,620}+p_{10,930}+p_{10,274}+2p_{10,90}+p_{10,398} \\ &+p_{10,449}+p_{10,113}+2p_{10,867}+p_{10,11}+p_{10,823}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1114} = \frac{1}{2}p_{10,90} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,90}^2 - 4(p_{10,808}+2p_{10,244}+p_{10,756} \\ &+p_{10,620}+p_{10,930}+p_{10,274}+2p_{10,90}+p_{10,398} \\ &+p_{10,449}+p_{10,113}+2p_{10,867}+p_{10,11}+p_{10,823}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,858} = \frac{1}{2}p_{10,858} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,858}^2 - 4(p_{10,552}+p_{10,500}+2p_{10,1012} \\ &+p_{10,364}+p_{10,674}+p_{10,18}+2p_{10,858}+p_{10,142} \\ &+p_{10,193}+p_{10,881}+2p_{10,611}+p_{10,779}+p_{10,567}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1882} = \frac{1}{2}p_{10,858} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,858}^2 - 4(p_{10,552}+p_{10,500}+2p_{10,1012} \\ &+p_{10,364}+p_{10,674}+p_{10,18}+2p_{10,858}+p_{10,142} \\ &+p_{10,193}+p_{10,881}+2p_{10,611}+p_{10,779}+p_{10,567}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 38 unreferenced roots were skipped} {\footnotesize \[p_{11,1018} = \frac{1}{2}p_{10,1018} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1018}^2 - 4(p_{10,712}+2p_{10,148}+p_{10,660} \\ &+p_{10,524}+p_{10,834}+p_{10,178}+2p_{10,1018}+p_{10,302} \\ &+p_{10,353}+p_{10,17}+2p_{10,771}+p_{10,939}+p_{10,727}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,2042} = \frac{1}{2}p_{10,1018} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1018}^2 - 4(p_{10,712}+2p_{10,148}+p_{10,660} \\ &+p_{10,524}+p_{10,834}+p_{10,178}+2p_{10,1018}+p_{10,302} \\ &+p_{10,353}+p_{10,17}+2p_{10,771}+p_{10,939}+p_{10,727}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 46 unreferenced roots were skipped} {\footnotesize \[p_{11,934} = \frac{1}{2}p_{10,934} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,934}^2 - 4(2p_{10,64}+p_{10,576}+p_{10,440} \\ &+p_{10,628}+p_{10,218}+2p_{10,934}+p_{10,750}+p_{10,94} \\ &+p_{10,269}+p_{10,957}+p_{10,643}+p_{10,855}+2p_{10,687}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1958} = \frac{1}{2}p_{10,934} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,934}^2 - 4(2p_{10,64}+p_{10,576}+p_{10,440} \\ &+p_{10,628}+p_{10,218}+2p_{10,934}+p_{10,750}+p_{10,94} \\ &+p_{10,269}+p_{10,957}+p_{10,643}+p_{10,855}+2p_{10,687}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,870} = \frac{1}{2}p_{10,870} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,870}^2 - 4(2p_{10,0}+p_{10,512}+p_{10,376} \\ &+p_{10,564}+p_{10,154}+2p_{10,870}+p_{10,686}+p_{10,30} \\ &+p_{10,205}+p_{10,893}+p_{10,579}+p_{10,791}+2p_{10,623}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1894} = \frac{1}{2}p_{10,870} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,870}^2 - 4(2p_{10,0}+p_{10,512}+p_{10,376} \\ &+p_{10,564}+p_{10,154}+2p_{10,870}+p_{10,686}+p_{10,30} \\ &+p_{10,205}+p_{10,893}+p_{10,579}+p_{10,791}+2p_{10,623}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 16 unreferenced roots were skipped} {\footnotesize \[p_{11,150} = \frac{1}{2}p_{10,150} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,150}^2 - 4(2p_{10,304}+p_{10,816}+p_{10,680} \\ &+p_{10,868}+p_{10,458}+2p_{10,150}+p_{10,334}+p_{10,990} \\ &+p_{10,173}+p_{10,509}+p_{10,883}+p_{10,71}+2p_{10,927}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1174} = \frac{1}{2}p_{10,150} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,150}^2 - 4(2p_{10,304}+p_{10,816}+p_{10,680} \\ &+p_{10,868}+p_{10,458}+2p_{10,150}+p_{10,334}+p_{10,990} \\ &+p_{10,173}+p_{10,509}+p_{10,883}+p_{10,71}+2p_{10,927}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,86} = \frac{1}{2}p_{10,86} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,86}^2 - 4(2p_{10,240}+p_{10,752}+p_{10,616} \\ &+p_{10,804}+p_{10,394}+2p_{10,86}+p_{10,270}+p_{10,926} \\ &+p_{10,109}+p_{10,445}+p_{10,819}+p_{10,7}+2p_{10,863}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1110} = \frac{1}{2}p_{10,86} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,86}^2 - 4(2p_{10,240}+p_{10,752}+p_{10,616} \\ &+p_{10,804}+p_{10,394}+2p_{10,86}+p_{10,270}+p_{10,926} \\ &+p_{10,109}+p_{10,445}+p_{10,819}+p_{10,7}+2p_{10,863}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,54} = \frac{1}{2}p_{10,54} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,54}^2 - 4(2p_{10,208}+p_{10,720}+p_{10,584} \\ &+p_{10,772}+p_{10,362}+2p_{10,54}+p_{10,238}+p_{10,894} \\ &+p_{10,77}+p_{10,413}+p_{10,787}+p_{10,999}+2p_{10,831}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1078} = \frac{1}{2}p_{10,54} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,54}^2 - 4(2p_{10,208}+p_{10,720}+p_{10,584} \\ &+p_{10,772}+p_{10,362}+2p_{10,54}+p_{10,238}+p_{10,894} \\ &+p_{10,77}+p_{10,413}+p_{10,787}+p_{10,999}+2p_{10,831}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,182} = \frac{1}{2}p_{10,182} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,182}^2 - 4(2p_{10,336}+p_{10,848}+p_{10,712} \\ &+p_{10,900}+p_{10,490}+2p_{10,182}+p_{10,366}+p_{10,1022} \\ &+p_{10,205}+p_{10,541}+p_{10,915}+p_{10,103}+2p_{10,959}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1206} = \frac{1}{2}p_{10,182} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,182}^2 - 4(2p_{10,336}+p_{10,848}+p_{10,712} \\ &+p_{10,900}+p_{10,490}+2p_{10,182}+p_{10,366}+p_{10,1022} \\ &+p_{10,205}+p_{10,541}+p_{10,915}+p_{10,103}+2p_{10,959}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,950} = \frac{1}{2}p_{10,950} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,950}^2 - 4(2p_{10,80}+p_{10,592}+p_{10,456} \\ &+p_{10,644}+p_{10,234}+2p_{10,950}+p_{10,110}+p_{10,766} \\ &+p_{10,973}+p_{10,285}+p_{10,659}+p_{10,871}+2p_{10,703}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1974} = \frac{1}{2}p_{10,950} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,950}^2 - 4(2p_{10,80}+p_{10,592}+p_{10,456} \\ &+p_{10,644}+p_{10,234}+2p_{10,950}+p_{10,110}+p_{10,766} \\ &+p_{10,973}+p_{10,285}+p_{10,659}+p_{10,871}+2p_{10,703}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,246} = \frac{1}{2}p_{10,246} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,246}^2 - 4(2p_{10,400}+p_{10,912}+p_{10,776} \\ &+p_{10,964}+p_{10,554}+2p_{10,246}+p_{10,430}+p_{10,62} \\ &+p_{10,269}+p_{10,605}+p_{10,979}+p_{10,167}+2p_{10,1023}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1270} = \frac{1}{2}p_{10,246} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,246}^2 - 4(2p_{10,400}+p_{10,912}+p_{10,776} \\ &+p_{10,964}+p_{10,554}+2p_{10,246}+p_{10,430}+p_{10,62} \\ &+p_{10,269}+p_{10,605}+p_{10,979}+p_{10,167}+2p_{10,1023}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 26 unreferenced roots were skipped} {\footnotesize \[p_{11,334} = \frac{1}{2}p_{10,334} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,334}^2 - 4(p_{10,864}+2p_{10,488}+p_{10,1000} \\ &+p_{10,28}+p_{10,642}+p_{10,518}+p_{10,150}+2p_{10,334} \\ &+p_{10,357}+p_{10,693}+p_{10,43}+2p_{10,87}+p_{10,255}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1358} = \frac{1}{2}p_{10,334} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,334}^2 - 4(p_{10,864}+2p_{10,488}+p_{10,1000} \\ &+p_{10,28}+p_{10,642}+p_{10,518}+p_{10,150}+2p_{10,334} \\ &+p_{10,357}+p_{10,693}+p_{10,43}+2p_{10,87}+p_{10,255}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 20 unreferenced roots were skipped} {\footnotesize \[p_{11,686} = \frac{1}{2}p_{10,686} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,686}^2 - 4(p_{10,192}+p_{10,328}+2p_{10,840} \\ &+p_{10,380}+p_{10,994}+p_{10,870}+p_{10,502}+2p_{10,686} \\ &+p_{10,709}+p_{10,21}+p_{10,395}+2p_{10,439}+p_{10,607}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1710} = \frac{1}{2}p_{10,686} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,686}^2 - 4(p_{10,192}+p_{10,328}+2p_{10,840} \\ &+p_{10,380}+p_{10,994}+p_{10,870}+p_{10,502}+2p_{10,686} \\ &+p_{10,709}+p_{10,21}+p_{10,395}+2p_{10,439}+p_{10,607}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,238} = \frac{1}{2}p_{10,238} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,238}^2 - 4(p_{10,768}+2p_{10,392}+p_{10,904} \\ &+p_{10,956}+p_{10,546}+p_{10,422}+p_{10,54}+2p_{10,238} \\ &+p_{10,261}+p_{10,597}+p_{10,971}+2p_{10,1015}+p_{10,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1262} = \frac{1}{2}p_{10,238} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,238}^2 - 4(p_{10,768}+2p_{10,392}+p_{10,904} \\ &+p_{10,956}+p_{10,546}+p_{10,422}+p_{10,54}+2p_{10,238} \\ &+p_{10,261}+p_{10,597}+p_{10,971}+2p_{10,1015}+p_{10,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,1006} = \frac{1}{2}p_{10,1006} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1006}^2 - 4(p_{10,512}+2p_{10,136}+p_{10,648} \\ &+p_{10,700}+p_{10,290}+p_{10,166}+p_{10,822}+2p_{10,1006} \\ &+p_{10,5}+p_{10,341}+p_{10,715}+2p_{10,759}+p_{10,927}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,2030} = \frac{1}{2}p_{10,1006} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1006}^2 - 4(p_{10,512}+2p_{10,136}+p_{10,648} \\ &+p_{10,700}+p_{10,290}+p_{10,166}+p_{10,822}+2p_{10,1006} \\ &+p_{10,5}+p_{10,341}+p_{10,715}+2p_{10,759}+p_{10,927}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,926} = \frac{1}{2}p_{10,926} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,926}^2 - 4(p_{10,432}+2p_{10,56}+p_{10,568} \\ &+p_{10,620}+p_{10,210}+p_{10,742}+p_{10,86}+2p_{10,926} \\ &+p_{10,261}+p_{10,949}+p_{10,635}+2p_{10,679}+p_{10,847}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1950} = \frac{1}{2}p_{10,926} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,926}^2 - 4(p_{10,432}+2p_{10,56}+p_{10,568} \\ &+p_{10,620}+p_{10,210}+p_{10,742}+p_{10,86}+2p_{10,926} \\ &+p_{10,261}+p_{10,949}+p_{10,635}+2p_{10,679}+p_{10,847}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,94} = \frac{1}{2}p_{10,94} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,94}^2 - 4(p_{10,624}+2p_{10,248}+p_{10,760} \\ &+p_{10,812}+p_{10,402}+p_{10,934}+p_{10,278}+2p_{10,94} \\ &+p_{10,453}+p_{10,117}+p_{10,827}+2p_{10,871}+p_{10,15}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1118} = \frac{1}{2}p_{10,94} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,94}^2 - 4(p_{10,624}+2p_{10,248}+p_{10,760} \\ &+p_{10,812}+p_{10,402}+p_{10,934}+p_{10,278}+2p_{10,94} \\ &+p_{10,453}+p_{10,117}+p_{10,827}+2p_{10,871}+p_{10,15}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,62} = \frac{1}{2}p_{10,62} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,62}^2 - 4(p_{10,592}+2p_{10,216}+p_{10,728} \\ &+p_{10,780}+p_{10,370}+p_{10,902}+p_{10,246}+2p_{10,62} \\ &+p_{10,421}+p_{10,85}+p_{10,795}+2p_{10,839}+p_{10,1007}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1086} = \frac{1}{2}p_{10,62} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,62}^2 - 4(p_{10,592}+2p_{10,216}+p_{10,728} \\ &+p_{10,780}+p_{10,370}+p_{10,902}+p_{10,246}+2p_{10,62} \\ &+p_{10,421}+p_{10,85}+p_{10,795}+2p_{10,839}+p_{10,1007}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 28 unreferenced roots were skipped} {\footnotesize \[p_{11,1022} = \frac{1}{2}p_{10,1022} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1022}^2 - 4(p_{10,528}+2p_{10,152}+p_{10,664} \\ &+p_{10,716}+p_{10,306}+p_{10,838}+p_{10,182}+2p_{10,1022} \\ &+p_{10,357}+p_{10,21}+p_{10,731}+2p_{10,775}+p_{10,943}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,2046} = \frac{1}{2}p_{10,1022} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1022}^2 - 4(p_{10,528}+2p_{10,152}+p_{10,664} \\ &+p_{10,716}+p_{10,306}+p_{10,838}+p_{10,182}+2p_{10,1022} \\ &+p_{10,357}+p_{10,21}+p_{10,731}+2p_{10,775}+p_{10,943}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1} = \frac{1}{2}p_{10,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1}^2 - 4(p_{10,360}+p_{10,24}+p_{10,946} \\ &+2p_{10,778}+p_{10,734}+2p_{10,1}+p_{10,841}+p_{10,185} \\ &+p_{10,309}+p_{10,531}+2p_{10,155}+p_{10,667} \\ &+p_{10,719}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1025} = \frac{1}{2}p_{10,1} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1}^2 - 4(p_{10,360}+p_{10,24}+p_{10,946} \\ &+2p_{10,778}+p_{10,734}+2p_{10,1}+p_{10,841}+p_{10,185} \\ &+p_{10,309}+p_{10,531}+2p_{10,155}+p_{10,667} \\ &+p_{10,719}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 36 unreferenced roots were skipped} {\footnotesize \[p_{11,801} = \frac{1}{2}p_{10,801} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,801}^2 - 4(p_{10,136}+p_{10,824}+p_{10,722} \\ &+2p_{10,554}+p_{10,510}+2p_{10,801}+p_{10,617}+p_{10,985} \\ &+p_{10,85}+p_{10,307}+p_{10,443}+2p_{10,955}+p_{10,495}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1825} = \frac{1}{2}p_{10,801} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,801}^2 - 4(p_{10,136}+p_{10,824}+p_{10,722} \\ &+2p_{10,554}+p_{10,510}+2p_{10,801}+p_{10,617}+p_{10,985} \\ &+p_{10,85}+p_{10,307}+p_{10,443}+2p_{10,955}+p_{10,495}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,97} = \frac{1}{2}p_{10,97} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,97}^2 - 4(p_{10,456}+p_{10,120}+p_{10,18} \\ &+2p_{10,874}+p_{10,830}+2p_{10,97}+p_{10,937}+p_{10,281} \\ &+p_{10,405}+p_{10,627}+2p_{10,251}+p_{10,763}+p_{10,815}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1121} = \frac{1}{2}p_{10,97} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,97}^2 - 4(p_{10,456}+p_{10,120}+p_{10,18} \\ &+2p_{10,874}+p_{10,830}+2p_{10,97}+p_{10,937}+p_{10,281} \\ &+p_{10,405}+p_{10,627}+2p_{10,251}+p_{10,763}+p_{10,815}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,993} = \frac{1}{2}p_{10,993} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,993}^2 - 4(p_{10,328}+p_{10,1016}+p_{10,914} \\ &+2p_{10,746}+p_{10,702}+2p_{10,993}+p_{10,809}+p_{10,153} \\ &+p_{10,277}+p_{10,499}+2p_{10,123}+p_{10,635}+p_{10,687}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,2017} = \frac{1}{2}p_{10,993} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,993}^2 - 4(p_{10,328}+p_{10,1016}+p_{10,914} \\ &+2p_{10,746}+p_{10,702}+2p_{10,993}+p_{10,809}+p_{10,153} \\ &+p_{10,277}+p_{10,499}+2p_{10,123}+p_{10,635}+p_{10,687}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,17} = \frac{1}{2}p_{10,17} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,17}^2 - 4(p_{10,40}+p_{10,376}+p_{10,962} \\ &+2p_{10,794}+p_{10,750}+2p_{10,17}+p_{10,201}+p_{10,857} \\ &+p_{10,325}+p_{10,547}+2p_{10,171}+p_{10,683}+p_{10,735}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1041} = \frac{1}{2}p_{10,17} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,17}^2 - 4(p_{10,40}+p_{10,376}+p_{10,962} \\ &+2p_{10,794}+p_{10,750}+2p_{10,17}+p_{10,201}+p_{10,857} \\ &+p_{10,325}+p_{10,547}+2p_{10,171}+p_{10,683}+p_{10,735}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,785} = \frac{1}{2}p_{10,785} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,785}^2 - 4(p_{10,808}+p_{10,120}+p_{10,706} \\ &+2p_{10,538}+p_{10,494}+2p_{10,785}+p_{10,969}+p_{10,601} \\ &+p_{10,69}+p_{10,291}+p_{10,427}+2p_{10,939}+p_{10,479}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1809} = \frac{1}{2}p_{10,785} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,785}^2 - 4(p_{10,808}+p_{10,120}+p_{10,706} \\ &+2p_{10,538}+p_{10,494}+2p_{10,785}+p_{10,969}+p_{10,601} \\ &+p_{10,69}+p_{10,291}+p_{10,427}+2p_{10,939}+p_{10,479}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 48 unreferenced roots were skipped} {\footnotesize \[p_{11,241} = \frac{1}{2}p_{10,241} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,241}^2 - 4(p_{10,264}+p_{10,600}+p_{10,162} \\ &+2p_{10,1018}+p_{10,974}+2p_{10,241}+p_{10,425}+p_{10,57} \\ &+p_{10,549}+p_{10,771}+2p_{10,395}+p_{10,907}+p_{10,959}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1265} = \frac{1}{2}p_{10,241} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,241}^2 - 4(p_{10,264}+p_{10,600}+p_{10,162} \\ &+2p_{10,1018}+p_{10,974}+2p_{10,241}+p_{10,425}+p_{10,57} \\ &+p_{10,549}+p_{10,771}+2p_{10,395}+p_{10,907}+p_{10,959}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,777} = \frac{1}{2}p_{10,777} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,777}^2 - 4(p_{10,800}+p_{10,112}+2p_{10,530} \\ &+p_{10,698}+p_{10,486}+p_{10,961}+p_{10,593}+2p_{10,777} \\ &+p_{10,61}+p_{10,419}+2p_{10,931}+p_{10,283}+p_{10,471}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1801} = \frac{1}{2}p_{10,777} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,777}^2 - 4(p_{10,800}+p_{10,112}+2p_{10,530} \\ &+p_{10,698}+p_{10,486}+p_{10,961}+p_{10,593}+2p_{10,777} \\ &+p_{10,61}+p_{10,419}+2p_{10,931}+p_{10,283}+p_{10,471}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,841} = \frac{1}{2}p_{10,841} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,841}^2 - 4(p_{10,864}+p_{10,176}+2p_{10,594} \\ &+p_{10,762}+p_{10,550}+p_{10,1}+p_{10,657}+2p_{10,841} \\ &+p_{10,125}+p_{10,483}+2p_{10,995}+p_{10,347}+p_{10,535}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1865} = \frac{1}{2}p_{10,841} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,841}^2 - 4(p_{10,864}+p_{10,176}+2p_{10,594} \\ &+p_{10,762}+p_{10,550}+p_{10,1}+p_{10,657}+2p_{10,841} \\ &+p_{10,125}+p_{10,483}+2p_{10,995}+p_{10,347}+p_{10,535}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,969} = \frac{1}{2}p_{10,969} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,969}^2 - 4(p_{10,992}+p_{10,304}+2p_{10,722} \\ &+p_{10,890}+p_{10,678}+p_{10,129}+p_{10,785}+2p_{10,969} \\ &+p_{10,253}+2p_{10,99}+p_{10,611}+p_{10,475}+p_{10,663}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1993} = \frac{1}{2}p_{10,969} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,969}^2 - 4(p_{10,992}+p_{10,304}+2p_{10,722} \\ &+p_{10,890}+p_{10,678}+p_{10,129}+p_{10,785}+2p_{10,969} \\ &+p_{10,253}+2p_{10,99}+p_{10,611}+p_{10,475}+p_{10,663}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,937} = \frac{1}{2}p_{10,937} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,937}^2 - 4(p_{10,960}+p_{10,272}+2p_{10,690} \\ &+p_{10,858}+p_{10,646}+p_{10,97}+p_{10,753}+2p_{10,937} \\ &+p_{10,221}+2p_{10,67}+p_{10,579}+p_{10,443}+p_{10,631}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1961} = \frac{1}{2}p_{10,937} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,937}^2 - 4(p_{10,960}+p_{10,272}+2p_{10,690} \\ &+p_{10,858}+p_{10,646}+p_{10,97}+p_{10,753}+2p_{10,937} \\ &+p_{10,221}+2p_{10,67}+p_{10,579}+p_{10,443}+p_{10,631}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,153} = \frac{1}{2}p_{10,153} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,153}^2 - 4(p_{10,512}+p_{10,176}+2p_{10,930} \\ &+p_{10,74}+p_{10,886}+p_{10,993}+p_{10,337}+2p_{10,153} \\ &+p_{10,461}+2p_{10,307}+p_{10,819}+p_{10,683}+p_{10,871}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1177} = \frac{1}{2}p_{10,153} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,153}^2 - 4(p_{10,512}+p_{10,176}+2p_{10,930} \\ &+p_{10,74}+p_{10,886}+p_{10,993}+p_{10,337}+2p_{10,153} \\ &+p_{10,461}+2p_{10,307}+p_{10,819}+p_{10,683}+p_{10,871}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 54 unreferenced roots were skipped} {\footnotesize \[p_{11,5} = \frac{1}{2}p_{10,5} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,5}^2 - 4(p_{10,364}+p_{10,28}+p_{10,738} \\ &+p_{10,950}+2p_{10,782}+p_{10,313}+2p_{10,5}+p_{10,845} \\ &+p_{10,189}+p_{10,723}+p_{10,535}+2p_{10,159} \\ &+p_{10,671}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1029} = \frac{1}{2}p_{10,5} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,5}^2 - 4(p_{10,364}+p_{10,28}+p_{10,738} \\ &+p_{10,950}+2p_{10,782}+p_{10,313}+2p_{10,5}+p_{10,845} \\ &+p_{10,189}+p_{10,723}+p_{10,535}+2p_{10,159} \\ &+p_{10,671}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,709} = \frac{1}{2}p_{10,709} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,709}^2 - 4(p_{10,44}+p_{10,732}+p_{10,418} \\ &+p_{10,630}+2p_{10,462}+p_{10,1017}+2p_{10,709}+p_{10,525} \\ &+p_{10,893}+p_{10,403}+p_{10,215}+p_{10,351}+2p_{10,863}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1733} = \frac{1}{2}p_{10,709} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,709}^2 - 4(p_{10,44}+p_{10,732}+p_{10,418} \\ &+p_{10,630}+2p_{10,462}+p_{10,1017}+2p_{10,709}+p_{10,525} \\ &+p_{10,893}+p_{10,403}+p_{10,215}+p_{10,351}+2p_{10,863}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 18 unreferenced roots were skipped} {\footnotesize \[p_{11,933} = \frac{1}{2}p_{10,933} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,933}^2 - 4(p_{10,268}+p_{10,956}+p_{10,642} \\ &+p_{10,854}+2p_{10,686}+p_{10,217}+2p_{10,933}+p_{10,749} \\ &+p_{10,93}+p_{10,627}+p_{10,439}+2p_{10,63}+p_{10,575}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1957} = \frac{1}{2}p_{10,933} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,933}^2 - 4(p_{10,268}+p_{10,956}+p_{10,642} \\ &+p_{10,854}+2p_{10,686}+p_{10,217}+2p_{10,933}+p_{10,749} \\ &+p_{10,93}+p_{10,627}+p_{10,439}+2p_{10,63}+p_{10,575}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,869} = \frac{1}{2}p_{10,869} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,869}^2 - 4(p_{10,204}+p_{10,892}+p_{10,578} \\ &+p_{10,790}+2p_{10,622}+p_{10,153}+2p_{10,869}+p_{10,685} \\ &+p_{10,29}+p_{10,563}+p_{10,375}+p_{10,511}+2p_{10,1023}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1893} = \frac{1}{2}p_{10,869} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,869}^2 - 4(p_{10,204}+p_{10,892}+p_{10,578} \\ &+p_{10,790}+2p_{10,622}+p_{10,153}+2p_{10,869}+p_{10,685} \\ &+p_{10,29}+p_{10,563}+p_{10,375}+p_{10,511}+2p_{10,1023}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 16 unreferenced roots were skipped} {\footnotesize \[p_{11,149} = \frac{1}{2}p_{10,149} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,149}^2 - 4(p_{10,172}+p_{10,508}+p_{10,882} \\ &+p_{10,70}+2p_{10,926}+p_{10,457}+2p_{10,149}+p_{10,333} \\ &+p_{10,989}+p_{10,867}+p_{10,679}+2p_{10,303}+p_{10,815}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1173} = \frac{1}{2}p_{10,149} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,149}^2 - 4(p_{10,172}+p_{10,508}+p_{10,882} \\ &+p_{10,70}+2p_{10,926}+p_{10,457}+2p_{10,149}+p_{10,333} \\ &+p_{10,989}+p_{10,867}+p_{10,679}+2p_{10,303}+p_{10,815}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 36 unreferenced roots were skipped} {\footnotesize \[p_{11,949} = \frac{1}{2}p_{10,949} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,949}^2 - 4(p_{10,972}+p_{10,284}+p_{10,658} \\ &+p_{10,870}+2p_{10,702}+p_{10,233}+2p_{10,949}+p_{10,109} \\ &+p_{10,765}+p_{10,643}+p_{10,455}+2p_{10,79}+p_{10,591}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1973} = \frac{1}{2}p_{10,949} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,949}^2 - 4(p_{10,972}+p_{10,284}+p_{10,658} \\ &+p_{10,870}+2p_{10,702}+p_{10,233}+2p_{10,949}+p_{10,109} \\ &+p_{10,765}+p_{10,643}+p_{10,455}+2p_{10,79}+p_{10,591}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 36 unreferenced roots were skipped} {\footnotesize \[p_{11,333} = \frac{1}{2}p_{10,333} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,333}^2 - 4(p_{10,356}+p_{10,692}+p_{10,42} \\ &+2p_{10,86}+p_{10,254}+p_{10,641}+p_{10,517}+p_{10,149} \\ &+2p_{10,333}+p_{10,27}+2p_{10,487}+p_{10,999}+p_{10,863}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1357} = \frac{1}{2}p_{10,333} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,333}^2 - 4(p_{10,356}+p_{10,692}+p_{10,42} \\ &+2p_{10,86}+p_{10,254}+p_{10,641}+p_{10,517}+p_{10,149} \\ &+2p_{10,333}+p_{10,27}+2p_{10,487}+p_{10,999}+p_{10,863}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 20 unreferenced roots were skipped} {\footnotesize \[p_{11,685} = \frac{1}{2}p_{10,685} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,685}^2 - 4(p_{10,708}+p_{10,20}+p_{10,394} \\ &+2p_{10,438}+p_{10,606}+p_{10,993}+p_{10,869}+p_{10,501} \\ &+2p_{10,685}+p_{10,379}+p_{10,327}+2p_{10,839}+p_{10,191}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1709} = \frac{1}{2}p_{10,685} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,685}^2 - 4(p_{10,708}+p_{10,20}+p_{10,394} \\ &+2p_{10,438}+p_{10,606}+p_{10,993}+p_{10,869}+p_{10,501} \\ &+2p_{10,685}+p_{10,379}+p_{10,327}+2p_{10,839}+p_{10,191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,109} = \frac{1}{2}p_{10,109} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,109}^2 - 4(p_{10,132}+p_{10,468}+p_{10,842} \\ &+2p_{10,886}+p_{10,30}+p_{10,417}+p_{10,293}+p_{10,949} \\ &+2p_{10,109}+p_{10,827}+2p_{10,263}+p_{10,775}+p_{10,639}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1133} = \frac{1}{2}p_{10,109} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,109}^2 - 4(p_{10,132}+p_{10,468}+p_{10,842} \\ &+2p_{10,886}+p_{10,30}+p_{10,417}+p_{10,293}+p_{10,949} \\ &+2p_{10,109}+p_{10,827}+2p_{10,263}+p_{10,775}+p_{10,639}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,877} = \frac{1}{2}p_{10,877} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,877}^2 - 4(p_{10,900}+p_{10,212}+p_{10,586} \\ &+2p_{10,630}+p_{10,798}+p_{10,161}+p_{10,37}+p_{10,693} \\ &+2p_{10,877}+p_{10,571}+2p_{10,7}+p_{10,519}+p_{10,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1901} = \frac{1}{2}p_{10,877} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,877}^2 - 4(p_{10,900}+p_{10,212}+p_{10,586} \\ &+2p_{10,630}+p_{10,798}+p_{10,161}+p_{10,37}+p_{10,693} \\ &+2p_{10,877}+p_{10,571}+2p_{10,7}+p_{10,519}+p_{10,383}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,93} = \frac{1}{2}p_{10,93} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,93}^2 - 4(p_{10,452}+p_{10,116}+p_{10,826} \\ &+2p_{10,870}+p_{10,14}+p_{10,401}+p_{10,933}+p_{10,277} \\ &+2p_{10,93}+p_{10,811}+2p_{10,247}+p_{10,759}+p_{10,623}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1117} = \frac{1}{2}p_{10,93} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,93}^2 - 4(p_{10,452}+p_{10,116}+p_{10,826} \\ &+2p_{10,870}+p_{10,14}+p_{10,401}+p_{10,933}+p_{10,277} \\ &+2p_{10,93}+p_{10,811}+2p_{10,247}+p_{10,759}+p_{10,623}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,61} = \frac{1}{2}p_{10,61} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,61}^2 - 4(p_{10,420}+p_{10,84}+p_{10,794} \\ &+2p_{10,838}+p_{10,1006}+p_{10,369}+p_{10,901}+p_{10,245} \\ &+2p_{10,61}+p_{10,779}+2p_{10,215}+p_{10,727}+p_{10,591}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1085} = \frac{1}{2}p_{10,61} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,61}^2 - 4(p_{10,420}+p_{10,84}+p_{10,794} \\ &+2p_{10,838}+p_{10,1006}+p_{10,369}+p_{10,901}+p_{10,245} \\ &+2p_{10,61}+p_{10,779}+2p_{10,215}+p_{10,727}+p_{10,591}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 20 unreferenced roots were skipped} {\footnotesize \[p_{11,893} = \frac{1}{2}p_{10,893} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,893}^2 - 4(p_{10,228}+p_{10,916}+p_{10,602} \\ &+2p_{10,646}+p_{10,814}+p_{10,177}+p_{10,709}+p_{10,53} \\ &+2p_{10,893}+p_{10,587}+2p_{10,23}+p_{10,535}+p_{10,399}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1917} = \frac{1}{2}p_{10,893} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,893}^2 - 4(p_{10,228}+p_{10,916}+p_{10,602} \\ &+2p_{10,646}+p_{10,814}+p_{10,177}+p_{10,709}+p_{10,53} \\ &+2p_{10,893}+p_{10,587}+2p_{10,23}+p_{10,535}+p_{10,399}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,3} = \frac{1}{2}p_{10,3} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,3}^2 - 4(p_{10,736}+p_{10,948}+2p_{10,780} \\ &+p_{10,362}+p_{10,26}+p_{10,721}+p_{10,533}+2p_{10,157} \\ &+p_{10,669}+2p_{10,3}+p_{10,843}+p_{10,187}+p_{10,311}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1027} = \frac{1}{2}p_{10,3} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,3}^2 - 4(p_{10,736}+p_{10,948}+2p_{10,780} \\ &+p_{10,362}+p_{10,26}+p_{10,721}+p_{10,533}+2p_{10,157} \\ &+p_{10,669}+2p_{10,3}+p_{10,843}+p_{10,187}+p_{10,311}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,707} = \frac{1}{2}p_{10,707} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,707}^2 - 4(p_{10,416}+p_{10,628}+2p_{10,460} \\ &+p_{10,42}+p_{10,730}+p_{10,401}+p_{10,213}+p_{10,349} \\ &+2p_{10,861}+2p_{10,707}+p_{10,523}+p_{10,891} \\ &+p_{10,1015}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1731} = \frac{1}{2}p_{10,707} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,707}^2 - 4(p_{10,416}+p_{10,628}+2p_{10,460} \\ &+p_{10,42}+p_{10,730}+p_{10,401}+p_{10,213}+p_{10,349} \\ &+2p_{10,861}+2p_{10,707}+p_{10,523}+p_{10,891} \\ &+p_{10,1015}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 18 unreferenced roots were skipped} {\footnotesize \[p_{11,931} = \frac{1}{2}p_{10,931} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,931}^2 - 4(p_{10,640}+p_{10,852}+2p_{10,684} \\ &+p_{10,266}+p_{10,954}+p_{10,625}+p_{10,437}+2p_{10,61} \\ &+p_{10,573}+2p_{10,931}+p_{10,747}+p_{10,91}+p_{10,215}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1955} = \frac{1}{2}p_{10,931} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,931}^2 - 4(p_{10,640}+p_{10,852}+2p_{10,684} \\ &+p_{10,266}+p_{10,954}+p_{10,625}+p_{10,437}+2p_{10,61} \\ &+p_{10,573}+2p_{10,931}+p_{10,747}+p_{10,91}+p_{10,215}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 24 unreferenced roots were skipped} {\footnotesize \[p_{11,147} = \frac{1}{2}p_{10,147} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,147}^2 - 4(p_{10,880}+p_{10,68}+2p_{10,924} \\ &+p_{10,170}+p_{10,506}+p_{10,865}+p_{10,677}+2p_{10,301} \\ &+p_{10,813}+2p_{10,147}+p_{10,331}+p_{10,987}+p_{10,455}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1171} = \frac{1}{2}p_{10,147} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,147}^2 - 4(p_{10,880}+p_{10,68}+2p_{10,924} \\ &+p_{10,170}+p_{10,506}+p_{10,865}+p_{10,677}+2p_{10,301} \\ &+p_{10,813}+2p_{10,147}+p_{10,331}+p_{10,987}+p_{10,455}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 46 unreferenced roots were skipped} {\footnotesize \[p_{11,243} = \frac{1}{2}p_{10,243} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,243}^2 - 4(p_{10,976}+p_{10,164}+2p_{10,1020} \\ &+p_{10,266}+p_{10,602}+p_{10,961}+p_{10,773}+2p_{10,397} \\ &+p_{10,909}+2p_{10,243}+p_{10,427}+p_{10,59}+p_{10,551}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1267} = \frac{1}{2}p_{10,243} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,243}^2 - 4(p_{10,976}+p_{10,164}+2p_{10,1020} \\ &+p_{10,266}+p_{10,602}+p_{10,961}+p_{10,773}+2p_{10,397} \\ &+p_{10,909}+2p_{10,243}+p_{10,427}+p_{10,59}+p_{10,551}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 16 unreferenced roots were skipped} {\footnotesize \[p_{11,651} = \frac{1}{2}p_{10,651} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,651}^2 - 4(p_{10,360}+2p_{10,404}+p_{10,572} \\ &+p_{10,674}+p_{10,1010}+p_{10,345}+p_{10,293}+2p_{10,805} \\ &+p_{10,157}+p_{10,835}+p_{10,467}+2p_{10,651}+p_{10,959}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1675} = \frac{1}{2}p_{10,651} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,651}^2 - 4(p_{10,360}+2p_{10,404}+p_{10,572} \\ &+p_{10,674}+p_{10,1010}+p_{10,345}+p_{10,293}+2p_{10,805} \\ &+p_{10,157}+p_{10,835}+p_{10,467}+2p_{10,651}+p_{10,959}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,395} = \frac{1}{2}p_{10,395} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,395}^2 - 4(p_{10,104}+2p_{10,148}+p_{10,316} \\ &+p_{10,418}+p_{10,754}+p_{10,89}+p_{10,37}+2p_{10,549} \\ &+p_{10,925}+p_{10,579}+p_{10,211}+2p_{10,395}+p_{10,703}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1419} = \frac{1}{2}p_{10,395} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,395}^2 - 4(p_{10,104}+2p_{10,148}+p_{10,316} \\ &+p_{10,418}+p_{10,754}+p_{10,89}+p_{10,37}+2p_{10,549} \\ &+p_{10,925}+p_{10,579}+p_{10,211}+2p_{10,395}+p_{10,703}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{11,75} = \frac{1}{2}p_{10,75} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,75}^2 - 4(p_{10,808}+2p_{10,852}+p_{10,1020} \\ &+p_{10,98}+p_{10,434}+p_{10,793}+2p_{10,229}+p_{10,741} \\ &+p_{10,605}+p_{10,259}+p_{10,915}+2p_{10,75}+p_{10,383}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1099} = \frac{1}{2}p_{10,75} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,75}^2 - 4(p_{10,808}+2p_{10,852}+p_{10,1020} \\ &+p_{10,98}+p_{10,434}+p_{10,793}+2p_{10,229}+p_{10,741} \\ &+p_{10,605}+p_{10,259}+p_{10,915}+2p_{10,75}+p_{10,383}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{11,331} = \frac{1}{2}p_{10,331} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,331}^2 - 4(p_{10,40}+2p_{10,84}+p_{10,252} \\ &+p_{10,354}+p_{10,690}+p_{10,25}+2p_{10,485}+p_{10,997} \\ &+p_{10,861}+p_{10,515}+p_{10,147}+2p_{10,331}+p_{10,639}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1355} = \frac{1}{2}p_{10,331} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,331}^2 - 4(p_{10,40}+2p_{10,84}+p_{10,252} \\ &+p_{10,354}+p_{10,690}+p_{10,25}+2p_{10,485}+p_{10,997} \\ &+p_{10,861}+p_{10,515}+p_{10,147}+2p_{10,331}+p_{10,639}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 32 unreferenced roots were skipped} {\footnotesize \[p_{11,875} = \frac{1}{2}p_{10,875} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,875}^2 - 4(p_{10,584}+2p_{10,628}+p_{10,796} \\ &+p_{10,898}+p_{10,210}+p_{10,569}+2p_{10,5}+p_{10,517} \\ &+p_{10,381}+p_{10,35}+p_{10,691}+2p_{10,875}+p_{10,159}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1899} = \frac{1}{2}p_{10,875} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,875}^2 - 4(p_{10,584}+2p_{10,628}+p_{10,796} \\ &+p_{10,898}+p_{10,210}+p_{10,569}+2p_{10,5}+p_{10,517} \\ &+p_{10,381}+p_{10,35}+p_{10,691}+2p_{10,875}+p_{10,159}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 16 unreferenced roots were skipped} {\footnotesize \[p_{11,155} = \frac{1}{2}p_{10,155} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,155}^2 - 4(p_{10,888}+2p_{10,932}+p_{10,76} \\ &+p_{10,514}+p_{10,178}+p_{10,873}+2p_{10,309}+p_{10,821} \\ &+p_{10,685}+p_{10,995}+p_{10,339}+2p_{10,155}+p_{10,463}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1179} = \frac{1}{2}p_{10,155} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,155}^2 - 4(p_{10,888}+2p_{10,932}+p_{10,76} \\ &+p_{10,514}+p_{10,178}+p_{10,873}+2p_{10,309}+p_{10,821} \\ &+p_{10,685}+p_{10,995}+p_{10,339}+2p_{10,155}+p_{10,463}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 76 unreferenced roots were skipped} {\footnotesize \[p_{11,839} = \frac{1}{2}p_{10,839} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,839}^2 - 4(2p_{10,592}+p_{10,760}+p_{10,548} \\ &+p_{10,174}+p_{10,862}+p_{10,481}+2p_{10,993}+p_{10,345} \\ &+p_{10,533}+p_{10,123}+2p_{10,839}+p_{10,655}+p_{10,1023}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1863} = \frac{1}{2}p_{10,839} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,839}^2 - 4(2p_{10,592}+p_{10,760}+p_{10,548} \\ &+p_{10,174}+p_{10,862}+p_{10,481}+2p_{10,993}+p_{10,345} \\ &+p_{10,533}+p_{10,123}+2p_{10,839}+p_{10,655}+p_{10,1023}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,967} = \frac{1}{2}p_{10,967} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,967}^2 - 4(2p_{10,720}+p_{10,888}+p_{10,676} \\ &+p_{10,302}+p_{10,990}+2p_{10,97}+p_{10,609}+p_{10,473} \\ &+p_{10,661}+p_{10,251}+2p_{10,967}+p_{10,783}+p_{10,127}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1991} = \frac{1}{2}p_{10,967} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,967}^2 - 4(2p_{10,720}+p_{10,888}+p_{10,676} \\ &+p_{10,302}+p_{10,990}+2p_{10,97}+p_{10,609}+p_{10,473} \\ &+p_{10,661}+p_{10,251}+2p_{10,967}+p_{10,783}+p_{10,127}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,167} = \frac{1}{2}p_{10,167} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,167}^2 - 4(2p_{10,944}+p_{10,88}+p_{10,900} \\ &+p_{10,526}+p_{10,190}+2p_{10,321}+p_{10,833}+p_{10,697} \\ &+p_{10,885}+p_{10,475}+2p_{10,167}+p_{10,1007}+p_{10,351}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1191} = \frac{1}{2}p_{10,167} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,167}^2 - 4(2p_{10,944}+p_{10,88}+p_{10,900} \\ &+p_{10,526}+p_{10,190}+2p_{10,321}+p_{10,833}+p_{10,697} \\ &+p_{10,885}+p_{10,475}+2p_{10,167}+p_{10,1007}+p_{10,351}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,935} = \frac{1}{2}p_{10,935} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,935}^2 - 4(2p_{10,688}+p_{10,856}+p_{10,644} \\ &+p_{10,270}+p_{10,958}+2p_{10,65}+p_{10,577}+p_{10,441} \\ &+p_{10,629}+p_{10,219}+2p_{10,935}+p_{10,751}+p_{10,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1959} = \frac{1}{2}p_{10,935} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,935}^2 - 4(2p_{10,688}+p_{10,856}+p_{10,644} \\ &+p_{10,270}+p_{10,958}+2p_{10,65}+p_{10,577}+p_{10,441} \\ &+p_{10,629}+p_{10,219}+2p_{10,935}+p_{10,751}+p_{10,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{11,615} = \frac{1}{2}p_{10,615} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,615}^2 - 4(2p_{10,368}+p_{10,536}+p_{10,324} \\ &+p_{10,974}+p_{10,638}+p_{10,257}+2p_{10,769}+p_{10,121} \\ &+p_{10,309}+p_{10,923}+2p_{10,615}+p_{10,431}+p_{10,799}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1639} = \frac{1}{2}p_{10,615} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,615}^2 - 4(2p_{10,368}+p_{10,536}+p_{10,324} \\ &+p_{10,974}+p_{10,638}+p_{10,257}+2p_{10,769}+p_{10,121} \\ &+p_{10,309}+p_{10,923}+2p_{10,615}+p_{10,431}+p_{10,799}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,743} = \frac{1}{2}p_{10,743} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,743}^2 - 4(2p_{10,496}+p_{10,664}+p_{10,452} \\ &+p_{10,78}+p_{10,766}+p_{10,385}+2p_{10,897}+p_{10,249} \\ &+p_{10,437}+p_{10,27}+2p_{10,743}+p_{10,559}+p_{10,927}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1767} = \frac{1}{2}p_{10,743} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,743}^2 - 4(2p_{10,496}+p_{10,664}+p_{10,452} \\ &+p_{10,78}+p_{10,766}+p_{10,385}+2p_{10,897}+p_{10,249} \\ &+p_{10,437}+p_{10,27}+2p_{10,743}+p_{10,559}+p_{10,927}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,487} = \frac{1}{2}p_{10,487} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,487}^2 - 4(2p_{10,240}+p_{10,408}+p_{10,196} \\ &+p_{10,846}+p_{10,510}+p_{10,129}+2p_{10,641}+p_{10,1017} \\ &+p_{10,181}+p_{10,795}+2p_{10,487}+p_{10,303}+p_{10,671}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1511} = \frac{1}{2}p_{10,487} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,487}^2 - 4(2p_{10,240}+p_{10,408}+p_{10,196} \\ &+p_{10,846}+p_{10,510}+p_{10,129}+2p_{10,641}+p_{10,1017} \\ &+p_{10,181}+p_{10,795}+2p_{10,487}+p_{10,303}+p_{10,671}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 10 unreferenced roots were skipped} {\footnotesize \[p_{11,151} = \frac{1}{2}p_{10,151} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,151}^2 - 4(2p_{10,928}+p_{10,72}+p_{10,884} \\ &+p_{10,174}+p_{10,510}+2p_{10,305}+p_{10,817}+p_{10,681} \\ &+p_{10,869}+p_{10,459}+2p_{10,151}+p_{10,335}+p_{10,991}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1175} = \frac{1}{2}p_{10,151} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,151}^2 - 4(2p_{10,928}+p_{10,72}+p_{10,884} \\ &+p_{10,174}+p_{10,510}+2p_{10,305}+p_{10,817}+p_{10,681} \\ &+p_{10,869}+p_{10,459}+2p_{10,151}+p_{10,335}+p_{10,991}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 46 unreferenced roots were skipped} {\footnotesize \[p_{11,247} = \frac{1}{2}p_{10,247} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,247}^2 - 4(2p_{10,0}+p_{10,168}+p_{10,980} \\ &+p_{10,270}+p_{10,606}+2p_{10,401}+p_{10,913}+p_{10,777} \\ &+p_{10,965}+p_{10,555}+2p_{10,247}+p_{10,431}+p_{10,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1271} = \frac{1}{2}p_{10,247} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,247}^2 - 4(2p_{10,0}+p_{10,168}+p_{10,980} \\ &+p_{10,270}+p_{10,606}+2p_{10,401}+p_{10,913}+p_{10,777} \\ &+p_{10,965}+p_{10,555}+2p_{10,247}+p_{10,431}+p_{10,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,783} = \frac{1}{2}p_{10,783} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,783}^2 - 4(p_{10,704}+2p_{10,536}+p_{10,492} \\ &+p_{10,806}+p_{10,118}+p_{10,289}+p_{10,425}+2p_{10,937} \\ &+p_{10,477}+p_{10,67}+p_{10,967}+p_{10,599}+2p_{10,783}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1807} = \frac{1}{2}p_{10,783} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,783}^2 - 4(p_{10,704}+2p_{10,536}+p_{10,492} \\ &+p_{10,806}+p_{10,118}+p_{10,289}+p_{10,425}+2p_{10,937} \\ &+p_{10,477}+p_{10,67}+p_{10,967}+p_{10,599}+2p_{10,783}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,335} = \frac{1}{2}p_{10,335} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,335}^2 - 4(p_{10,256}+2p_{10,88}+p_{10,44} \\ &+p_{10,358}+p_{10,694}+p_{10,865}+2p_{10,489}+p_{10,1001} \\ &+p_{10,29}+p_{10,643}+p_{10,519}+p_{10,151}+2p_{10,335}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1359} = \frac{1}{2}p_{10,335} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,335}^2 - 4(p_{10,256}+2p_{10,88}+p_{10,44} \\ &+p_{10,358}+p_{10,694}+p_{10,865}+2p_{10,489}+p_{10,1001} \\ &+p_{10,29}+p_{10,643}+p_{10,519}+p_{10,151}+2p_{10,335}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{11,559} = \frac{1}{2}p_{10,559} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,559}^2 - 4(p_{10,480}+2p_{10,312}+p_{10,268} \\ &+p_{10,582}+p_{10,918}+p_{10,65}+p_{10,201}+2p_{10,713} \\ &+p_{10,253}+p_{10,867}+p_{10,743}+p_{10,375}+2p_{10,559}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1583} = \frac{1}{2}p_{10,559} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,559}^2 - 4(p_{10,480}+2p_{10,312}+p_{10,268} \\ &+p_{10,582}+p_{10,918}+p_{10,65}+p_{10,201}+2p_{10,713} \\ &+p_{10,253}+p_{10,867}+p_{10,743}+p_{10,375}+2p_{10,559}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,303} = \frac{1}{2}p_{10,303} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,303}^2 - 4(p_{10,224}+2p_{10,56}+p_{10,12} \\ &+p_{10,326}+p_{10,662}+p_{10,833}+2p_{10,457}+p_{10,969} \\ &+p_{10,1021}+p_{10,611}+p_{10,487}+p_{10,119}+2p_{10,303}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1327} = \frac{1}{2}p_{10,303} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,303}^2 - 4(p_{10,224}+2p_{10,56}+p_{10,12} \\ &+p_{10,326}+p_{10,662}+p_{10,833}+2p_{10,457}+p_{10,969} \\ &+p_{10,1021}+p_{10,611}+p_{10,487}+p_{10,119}+2p_{10,303}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 18 unreferenced roots were skipped} {\footnotesize \[p_{11,239} = \frac{1}{2}p_{10,239} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,239}^2 - 4(p_{10,160}+2p_{10,1016}+p_{10,972} \\ &+p_{10,262}+p_{10,598}+p_{10,769}+2p_{10,393}+p_{10,905} \\ &+p_{10,957}+p_{10,547}+p_{10,423}+p_{10,55}+2p_{10,239}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1263} = \frac{1}{2}p_{10,239} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,239}^2 - 4(p_{10,160}+2p_{10,1016}+p_{10,972} \\ &+p_{10,262}+p_{10,598}+p_{10,769}+2p_{10,393}+p_{10,905} \\ &+p_{10,957}+p_{10,547}+p_{10,423}+p_{10,55}+2p_{10,239}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{11,1007} = \frac{1}{2}p_{10,1007} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1007}^2 - 4(p_{10,928}+2p_{10,760}+p_{10,716} \\ &+p_{10,6}+p_{10,342}+p_{10,513}+2p_{10,137}+p_{10,649} \\ &+p_{10,701}+p_{10,291}+p_{10,167}+p_{10,823}+2p_{10,1007}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,2031} = \frac{1}{2}p_{10,1007} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1007}^2 - 4(p_{10,928}+2p_{10,760}+p_{10,716} \\ &+p_{10,6}+p_{10,342}+p_{10,513}+2p_{10,137}+p_{10,649} \\ &+p_{10,701}+p_{10,291}+p_{10,167}+p_{10,823}+2p_{10,1007}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 6 unreferenced roots were skipped} {\footnotesize \[p_{11,799} = \frac{1}{2}p_{10,799} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,799}^2 - 4(p_{10,720}+2p_{10,552}+p_{10,508} \\ &+p_{10,134}+p_{10,822}+p_{10,305}+p_{10,441}+2p_{10,953} \\ &+p_{10,493}+p_{10,83}+p_{10,615}+p_{10,983}+2p_{10,799}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1823} = \frac{1}{2}p_{10,799} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,799}^2 - 4(p_{10,720}+2p_{10,552}+p_{10,508} \\ &+p_{10,134}+p_{10,822}+p_{10,305}+p_{10,441}+2p_{10,953} \\ &+p_{10,493}+p_{10,83}+p_{10,615}+p_{10,983}+2p_{10,799}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 8 unreferenced roots were skipped} {\footnotesize \[p_{11,95} = \frac{1}{2}p_{10,95} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,95}^2 - 4(p_{10,16}+2p_{10,872}+p_{10,828} \\ &+p_{10,454}+p_{10,118}+p_{10,625}+2p_{10,249}+p_{10,761} \\ &+p_{10,813}+p_{10,403}+p_{10,935}+p_{10,279}+2p_{10,95}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1119} = \frac{1}{2}p_{10,95} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,95}^2 - 4(p_{10,16}+2p_{10,872}+p_{10,828} \\ &+p_{10,454}+p_{10,118}+p_{10,625}+2p_{10,249}+p_{10,761} \\ &+p_{10,813}+p_{10,403}+p_{10,935}+p_{10,279}+2p_{10,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 14 unreferenced roots were skipped} {\footnotesize \[p_{11,63} = \frac{1}{2}p_{10,63} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,63}^2 - 4(p_{10,1008}+2p_{10,840}+p_{10,796} \\ &+p_{10,422}+p_{10,86}+p_{10,593}+2p_{10,217}+p_{10,729} \\ &+p_{10,781}+p_{10,371}+p_{10,903}+p_{10,247}+2p_{10,63}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,1087} = \frac{1}{2}p_{10,63} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,63}^2 - 4(p_{10,1008}+2p_{10,840}+p_{10,796} \\ &+p_{10,422}+p_{10,86}+p_{10,593}+2p_{10,217}+p_{10,729} \\ &+p_{10,781}+p_{10,371}+p_{10,903}+p_{10,247}+2p_{10,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 28 unreferenced roots were skipped} {\footnotesize \[p_{11,1023} = \frac{1}{2}p_{10,1023} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1023}^2 - 4(p_{10,944}+2p_{10,776}+p_{10,732} \\ &+p_{10,358}+p_{10,22}+p_{10,529}+2p_{10,153}+p_{10,665} \\ &+p_{10,717}+p_{10,307}+p_{10,839}+p_{10,183}+2p_{10,1023}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{11,2047} = \frac{1}{2}p_{10,1023} - \frac{1}{2}\sqrt{ \begin{aligned} & p_{10,1023}^2 - 4(p_{10,944}+2p_{10,776}+p_{10,732} \\ &+p_{10,358}+p_{10,22}+p_{10,529}+2p_{10,153}+p_{10,665} \\ &+p_{10,717}+p_{10,307}+p_{10,839}+p_{10,183}+2p_{10,1023}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{12,0} = \frac{1}{2}p_{11,0} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,0}^2 - 4(p_{11,0}+p_{11,800}+p_{11,2} \\ &+p_{11,1178}+p_{11,1}+p_{11,777}+p_{11,1099} \\ &+p_{11,1263}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{12,3072} = \frac{1}{2}p_{11,1024} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1024}^2 - 4(p_{11,1024}+p_{11,1824}+p_{11,1026} \\ &+p_{11,154}+p_{11,1025}+p_{11,1801}+p_{11,75}+p_{11,239}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 601 unreferenced roots were skipped} {\footnotesize \[p_{12,2980} = \frac{1}{2}p_{11,932} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,932}^2 - 4(p_{11,1732}+p_{11,932}+p_{11,934} \\ &+p_{11,62}+p_{11,933}+p_{11,1709}+p_{11,147}+p_{11,2031}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,4004} = \frac{1}{2}p_{11,1956} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1956}^2 - 4(p_{11,708}+p_{11,1956}+p_{11,1958} \\ &+p_{11,1086}+p_{11,1957}+p_{11,685}+p_{11,1171}+p_{11,1007}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 321 unreferenced roots were skipped} {\footnotesize \[p_{12,2140} = \frac{1}{2}p_{11,92} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,92}^2 - 4(p_{11,92}+p_{11,892}+p_{11,1270} \\ &+p_{11,94}+p_{11,869}+p_{11,93}+p_{11,1355}+p_{11,1191}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,3164} = \frac{1}{2}p_{11,1116} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1116}^2 - 4(p_{11,1116}+p_{11,1916}+p_{11,246} \\ &+p_{11,1118}+p_{11,1893}+p_{11,1117}+p_{11,331}+p_{11,167}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1116 unreferenced roots were skipped} {\footnotesize \[p_{12,1} = \frac{1}{2}p_{11,1} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1}^2 - 4(p_{11,1264}+p_{11,1100}+p_{11,2} \\ &+p_{11,778}+p_{11,1}+p_{11,801}+p_{11,3}+p_{11,1179}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{12,3073} = \frac{1}{2}p_{11,1025} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1025}^2 - 4(p_{11,240}+p_{11,76}+p_{11,1026} \\ &+p_{11,1802}+p_{11,1025}+p_{11,1825}+p_{11,1027} \\ &+p_{11,155}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 236 unreferenced roots were skipped} {\footnotesize \[p_{12,241} = \frac{1}{2}p_{11,241} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,241}^2 - 4(p_{11,1504}+p_{11,1340}+p_{11,242} \\ &+p_{11,1018}+p_{11,1041}+p_{11,241}+p_{11,243}+p_{11,1419}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,1265} = \frac{1}{2}p_{11,1265} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1265}^2 - 4(p_{11,480}+p_{11,316}+p_{11,1266} \\ &+p_{11,2042}+p_{11,17}+p_{11,1265}+p_{11,1267}+p_{11,395}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 362 unreferenced roots were skipped} {\footnotesize \[p_{12,2981} = \frac{1}{2}p_{11,933} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,933}^2 - 4(p_{11,2032}+p_{11,148}+p_{11,934} \\ &+p_{11,1710}+p_{11,1733}+p_{11,933}+p_{11,935}+p_{11,63}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,4005} = \frac{1}{2}p_{11,1957} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1957}^2 - 4(p_{11,1008}+p_{11,1172}+p_{11,1958} \\ &+p_{11,686}+p_{11,709}+p_{11,1957}+p_{11,1959}+p_{11,1087}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 48 unreferenced roots were skipped} {\footnotesize \[p_{12,149} = \frac{1}{2}p_{11,149} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,149}^2 - 4(p_{11,1248}+p_{11,1412}+p_{11,150} \\ &+p_{11,926}+p_{11,149}+p_{11,949}+p_{11,151}+p_{11,1327}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,1173} = \frac{1}{2}p_{11,1173} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1173}^2 - 4(p_{11,224}+p_{11,388}+p_{11,1174} \\ &+p_{11,1950}+p_{11,1173}+p_{11,1973}+p_{11,1175} \\ &+p_{11,303}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 149 unreferenced roots were skipped} {\footnotesize \[p_{12,333} = \frac{1}{2}p_{11,333} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,333}^2 - 4(p_{11,1432}+p_{11,1596}+p_{11,1110} \\ &+p_{11,334}+p_{11,333}+p_{11,1133}+p_{11,1511}+p_{11,335}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{12,3405} = \frac{1}{2}p_{11,1357} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1357}^2 - 4(p_{11,408}+p_{11,572}+p_{11,86} \\ &+p_{11,1358}+p_{11,1357}+p_{11,109}+p_{11,487} \\ &+p_{11,1359}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 117 unreferenced roots were skipped} {\footnotesize \[p_{12,2141} = \frac{1}{2}p_{11,93} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,93}^2 - 4(p_{11,1192}+p_{11,1356}+p_{11,870} \\ &+p_{11,94}+p_{11,93}+p_{11,893}+p_{11,1271}+p_{11,95}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,3165} = \frac{1}{2}p_{11,1117} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1117}^2 - 4(p_{11,168}+p_{11,332}+p_{11,1894} \\ &+p_{11,1118}+p_{11,1117}+p_{11,1917}+p_{11,247} \\ &+p_{11,1119}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 185 unreferenced roots were skipped} {\footnotesize \[p_{12,2979} = \frac{1}{2}p_{11,931} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,931}^2 - 4(p_{11,932}+p_{11,1708}+p_{11,146} \\ &+p_{11,2030}+p_{11,933}+p_{11,61}+p_{11,1731}+p_{11,931}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,4003} = \frac{1}{2}p_{11,1955} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1955}^2 - 4(p_{11,1956}+p_{11,684}+p_{11,1170} \\ &+p_{11,1006}+p_{11,1957}+p_{11,1085}+p_{11,707}+p_{11,1955}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 268 unreferenced roots were skipped} {\footnotesize \[p_{12,875} = \frac{1}{2}p_{11,875} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,875}^2 - 4(p_{11,1652}+p_{11,876}+p_{11,90} \\ &+p_{11,1974}+p_{11,5}+p_{11,877}+p_{11,1675}+p_{11,875}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,1899} = \frac{1}{2}p_{11,1899} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1899}^2 - 4(p_{11,628}+p_{11,1900}+p_{11,1114} \\ &+p_{11,950}+p_{11,1029}+p_{11,1901}+p_{11,651}+p_{11,1899}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 190 unreferenced roots were skipped} {\footnotesize \[p_{12,2887} = \frac{1}{2}p_{11,839} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,839}^2 - 4(p_{11,1616}+p_{11,840}+p_{11,1938} \\ &+p_{11,54}+p_{11,2017}+p_{11,841}+p_{11,839}+p_{11,1639}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,3911} = \frac{1}{2}p_{11,1863} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1863}^2 - 4(p_{11,592}+p_{11,1864}+p_{11,914} \\ &+p_{11,1078}+p_{11,993}+p_{11,1865}+p_{11,1863}+p_{11,615}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 12 unreferenced roots were skipped} {\footnotesize \[p_{12,967} = \frac{1}{2}p_{11,967} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,967}^2 - 4(p_{11,1744}+p_{11,968}+p_{11,18} \\ &+p_{11,182}+p_{11,97}+p_{11,969}+p_{11,967}+p_{11,1767}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{12,4039} = \frac{1}{2}p_{11,1991} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1991}^2 - 4(p_{11,720}+p_{11,1992}+p_{11,1042} \\ &+p_{11,1206}+p_{11,1121}+p_{11,1993}+p_{11,1991}+p_{11,743}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 204 unreferenced roots were skipped} {\footnotesize \[p_{12,783} = \frac{1}{2}p_{11,783} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,783}^2 - 4(p_{11,784}+p_{11,1560}+p_{11,1882} \\ &+p_{11,2046}+p_{11,785}+p_{11,1961}+p_{11,783}+p_{11,1583}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} {\footnotesize \[p_{12,1807} = \frac{1}{2}p_{11,1807} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1807}^2 - 4(p_{11,1808}+p_{11,536}+p_{11,858} \\ &+p_{11,1022}+p_{11,1809}+p_{11,937}+p_{11,1807}+p_{11,559}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 238 unreferenced roots were skipped} {\footnotesize \[p_{12,3071} = \frac{1}{2}p_{11,1023} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,1023}^2 - 4(p_{11,1024}+p_{11,1800}+p_{11,74} \\ &+p_{11,238}+p_{11,1025}+p_{11,153}+p_{11,1823}+p_{11,1023}) \end{aligned} }\] }%footnotesize {\footnotesize \[p_{12,2047} = \frac{1}{2}p_{11,2047} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{11,2047}^2 - 4(p_{11,0}+p_{11,776}+p_{11,1098} \\ &+p_{11,1262}+p_{11,1}+p_{11,1177}+p_{11,799}+p_{11,2047}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1 unreferenced roots were skipped} \[p_{13,0} = \tfrac{p_{12,0} + \sqrt{p_{12,0}^2 - 4(p_{12,1}+p_{12,1265}+p_{12,4003}+p_{12,1899})}}{2}\] \centerline{\footnotesize 5 unreferenced roots were skipped} {\footnotesize \[p_{13,3072} = \frac{1}{2}p_{12,3072} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{12,3072}^2 - 4(p_{12,3073}+p_{12,241}+p_{12,2979}+p_{12,875}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 1203 unreferenced roots were skipped} {\footnotesize \[p_{13,2980} = \frac{1}{2}p_{12,2980} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{12,2980}^2 - 4(p_{12,2981}+p_{12,149}+p_{12,2887}+p_{12,783}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 4 unreferenced roots were skipped} {\footnotesize \[p_{13,8100} = \frac{1}{2}p_{12,4004} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{12,4004}^2 - 4(p_{12,4005}+p_{12,1173}+p_{12,3911}+p_{12,1807}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 643 unreferenced roots were skipped} {\footnotesize \[p_{13,6236} = \frac{1}{2}p_{12,2140} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{12,2140}^2 - 4(p_{12,3405}+p_{12,2141}+p_{12,4039}+p_{12,2047}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 2 unreferenced roots were skipped} {\footnotesize \[p_{13,3164} = \frac{1}{2}p_{12,3164} + \frac{1}{2}\sqrt{ \begin{aligned} & p_{12,3164}^2 - 4(p_{12,333}+p_{12,3165}+p_{12,967}+p_{12,3071}) \end{aligned} }\] }%footnotesize \centerline{\footnotesize 39 unreferenced roots were skipped} \[p_{14,0} = \tfrac{p_{13,0} + \sqrt{p_{13,0}^2 - 4(p_{13,8100}+p_{13,3164})}}{2}\] \centerline{\footnotesize 11 unreferenced roots were skipped} \[p_{14,3072} = \tfrac{p_{13,3072} + \sqrt{p_{13,3072}^2 - 4(p_{13,2980}+p_{13,6236})}}{2}\] \centerline{\footnotesize 5 unreferenced roots were skipped} \[p_{15,0} = \tfrac{p_{14,0} - \sqrt{p_{14,0}^2 - 4(p_{14,3072})}}{2}\] \begin{verbatim} % 1/2 * p_{15,0} = NaN % cos(2*pi/65537): 0.9999999954042476 % Taking reference values! \end{verbatim} \centerline{\footnotesize 1 unreferenced roots were skipped} \[p_{15,0} = \tfrac{p_{14,0} + \sqrt{p_{14,0}^2 - 4(p_{14,3072})}}{2}\] \begin{verbatim} % 1/2 * p_{15,0} = 0.9999999954039087 % Time used: 33.214807469sec Used: 2105; Skipped: 8009; Roots: 1365686447 \end{verbatim}