Relative $p$-adic families search results

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Label	$p$	$n$	$n_0$	$n_{\mathrm{abs}}$	$f$	$f_0$	$f_{\mathrm{abs}}$	$e$	$e_0$	$e_{\mathrm{abs}}$	$c$	$c_0$	$c_{\mathrm{abs}}$	Base	Abs. Artin slopes	Swan slopes	Means	Rams	Generic poly	Ambiguity	Field count	Mass	Mass (absolute)	Mass stored	Mass found	Wild segments
2.1.40.90p	$2$	$40$	$1$	$40$	$1$	$1$	$1$	$40$	$1$	$40$	$90$	$0$	$90$	$\Q_{2}$	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}, 1, 2]$	$\langle\frac{1}{10}, \frac{11}{20}, \frac{51}{40}\rangle$	$(1, 9, 29)$	$x^{40} + 4 b_{79} x^{39} + 2 b_{38} x^{38} + 4 b_{77} x^{37} + 4 b_{75} x^{35} + 2 b_{34} x^{34} + 4 b_{73} x^{33} + 4 b_{71} x^{31} + 2 b_{30} x^{30} + 4 b_{69} x^{29} + 4 b_{67} x^{27} + 2 b_{26} x^{26} + 4 b_{65} x^{25} + 4 b_{63} x^{23} + 2 a_{22} x^{22} + 4 b_{61} x^{21} + 4 b_{59} x^{19} + 4 b_{57} x^{17} + 4 b_{55} x^{15} + 4 b_{53} x^{13} + 4 a_{51} x^{11} + 2 c_{8} x^8 + 2 a_{4} x^4 + 4 c_{40} + 8 c_{80} + 2$	$8$	$0$	$262144$	$262144$	$0$	$0\%$	$3$
2.1.2.2a1.1-1.20.50b	$2$	$20$	$2$	$40$	$1$	$1$	$1$	$20$	$2$	$40$	$50$	$2$	$51$	$\Q_{2}(\sqrt{-1})$	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}, 3]$	$\langle\frac{1}{10}, \frac{31}{20}\rangle$	$(1, 29)$	$x^{20} + (b_{59} \pi^3 + b_{39} \pi^2) x^{19} + (b_{57} \pi^3 + b_{37} \pi^2) x^{17} + (b_{55} \pi^3 + b_{35} \pi^2) x^{15} + (b_{53} \pi^3 + b_{33} \pi^2) x^{13} + (b_{51} \pi^3 + a_{31} \pi^2) x^{11} + b_{49} \pi^3 x^9 + b_{47} \pi^3 x^7 + b_{45} \pi^3 x^5 + c_{4} \pi x^4 + b_{43} \pi^3 x^3 + a_{2} \pi x^2 + b_{41} \pi^3 x + c_{60} \pi^4 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.2.2a1.2-1.20.50b	$2$	$20$	$2$	$40$	$1$	$1$	$1$	$20$	$2$	$40$	$50$	$2$	$51$	$\Q_{2}(\sqrt{-5})$	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}, 3]$	$\langle\frac{1}{10}, \frac{31}{20}\rangle$	$(1, 29)$	$x^{20} + (b_{59} \pi^3 + b_{39} \pi^2) x^{19} + (b_{57} \pi^3 + b_{37} \pi^2) x^{17} + (b_{55} \pi^3 + b_{35} \pi^2) x^{15} + (b_{53} \pi^3 + b_{33} \pi^2) x^{13} + (b_{51} \pi^3 + a_{31} \pi^2) x^{11} + b_{49} \pi^3 x^9 + b_{47} \pi^3 x^7 + b_{45} \pi^3 x^5 + c_{4} \pi x^4 + b_{43} \pi^3 x^3 + a_{2} \pi x^2 + b_{41} \pi^3 x + c_{60} \pi^4 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.2.3a1.1-1.20.30b	$2$	$20$	$2$	$40$	$1$	$1$	$1$	$20$	$2$	$40$	$30$	$3$	$32$	$\Q_{2}(\sqrt{-2})$	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}, 1]$	$\langle\frac{1}{10}, \frac{11}{20}\rangle$	$(1, 9)$	$x^{20} + b_{19} \pi x^{19} + b_{17} \pi x^{17} + b_{15} \pi x^{15} + b_{13} \pi x^{13} + a_{11} \pi x^{11} + c_{4} \pi x^4 + a_{2} \pi x^2 + c_{20} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.2.3a1.2-1.20.30b	$2$	$20$	$2$	$40$	$1$	$1$	$1$	$20$	$2$	$40$	$30$	$3$	$32$	$\Q_{2}(\sqrt{-2\cdot 5})$	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}, 1]$	$\langle\frac{1}{10}, \frac{11}{20}\rangle$	$(1, 9)$	$x^{20} + b_{19} \pi x^{19} + b_{17} \pi x^{17} + b_{15} \pi x^{15} + b_{13} \pi x^{13} + a_{11} \pi x^{11} + c_{4} \pi x^4 + a_{2} \pi x^2 + c_{20} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.2.3a1.3-1.20.30b	$2$	$20$	$2$	$40$	$1$	$1$	$1$	$20$	$2$	$40$	$30$	$3$	$32$	$\Q_{2}(\sqrt{2})$	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}, 1]$	$\langle\frac{1}{10}, \frac{11}{20}\rangle$	$(1, 9)$	$x^{20} + b_{19} \pi x^{19} + b_{17} \pi x^{17} + b_{15} \pi x^{15} + b_{13} \pi x^{13} + a_{11} \pi x^{11} + c_{4} \pi x^4 + a_{2} \pi x^2 + c_{20} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.2.3a1.4-1.20.30b	$2$	$20$	$2$	$40$	$1$	$1$	$1$	$20$	$2$	$40$	$30$	$3$	$32$	$\Q_{2}(\sqrt{2\cdot 5})$	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}, 1]$	$\langle\frac{1}{10}, \frac{11}{20}\rangle$	$(1, 9)$	$x^{20} + b_{19} \pi x^{19} + b_{17} \pi x^{17} + b_{15} \pi x^{15} + b_{13} \pi x^{13} + a_{11} \pi x^{11} + c_{4} \pi x^4 + a_{2} \pi x^2 + c_{20} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.4.8b1.1-1.10.10a	$2$	$10$	$4$	$40$	$1$	$1$	$1$	$10$	$4$	$40$	$10$	$8$	$15$	2.1.4.8b1.1	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}]$	$\langle\frac{1}{10}\rangle$	$(1)$	$x^{10} + c_{2} \pi x^2 + a_{1} \pi x + \pi$	$2$	$0$	$1$	$1/4$	$0$	$0\%$	$1$
2.1.4.8b1.2-1.10.10a	$2$	$10$	$4$	$40$	$1$	$1$	$1$	$10$	$4$	$40$	$10$	$8$	$15$	2.1.4.8b1.2	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}]$	$\langle\frac{1}{10}\rangle$	$(1)$	$x^{10} + c_{2} \pi x^2 + a_{1} \pi x + \pi$	$2$	$0$	$1$	$1/4$	$0$	$0\%$	$1$
2.1.4.8b1.3-1.10.10a	$2$	$10$	$4$	$40$	$1$	$1$	$1$	$10$	$4$	$40$	$10$	$8$	$15$	2.1.4.8b1.3	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}]$	$\langle\frac{1}{10}\rangle$	$(1)$	$x^{10} + c_{2} \pi x^2 + a_{1} \pi x + \pi$	$2$	$0$	$1$	$1/2$	$0$	$0\%$	$1$
2.1.4.8b1.4-1.10.10a	$2$	$10$	$4$	$40$	$1$	$1$	$1$	$10$	$4$	$40$	$10$	$8$	$15$	2.1.4.8b1.4	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}]$	$\langle\frac{1}{10}\rangle$	$(1)$	$x^{10} + c_{2} \pi x^2 + a_{1} \pi x + \pi$	$2$	$0$	$1$	$1/2$	$0$	$0\%$	$1$
2.1.4.8b1.5-1.10.10a	$2$	$10$	$4$	$40$	$1$	$1$	$1$	$10$	$4$	$40$	$10$	$8$	$15$	2.1.4.8b1.5	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}]$	$\langle\frac{1}{10}\rangle$	$(1)$	$x^{10} + c_{2} \pi x^2 + a_{1} \pi x + \pi$	$2$	$0$	$1$	$1/4$	$0$	$0\%$	$1$
2.1.4.8b1.6-1.10.10a	$2$	$10$	$4$	$40$	$1$	$1$	$1$	$10$	$4$	$40$	$10$	$8$	$15$	2.1.4.8b1.6	$[\frac{6}{5}, 2, 3]$	$[\frac{1}{5}]$	$\langle\frac{1}{10}\rangle$	$(1)$	$x^{10} + c_{2} \pi x^2 + a_{1} \pi x + \pi$	$2$	$0$	$1$	$1/4$	$0$	$0\%$	$1$
2.1.5.4a1.1-1.8.58p	$2$	$8$	$5$	$40$	$1$	$1$	$1$	$8$	$5$	$40$	$58$	$4$	$58$	2.1.5.4a1.1	$[\frac{6}{5}, 2, 3]$	$[1, 5, 10]$	$\langle\frac{1}{2}, \frac{11}{4}, \frac{51}{8}\rangle$	$(1, 9, 29)$	$x^8 + (b_{79} \pi^{10} + b_{71} \pi^9 + b_{63} \pi^8 + b_{55} \pi^7) x^7 + (b_{38} \pi^5 + b_{30} \pi^4 + a_{22} \pi^3) x^6 + (b_{77} \pi^{10} + b_{69} \pi^9 + b_{61} \pi^8 + b_{53} \pi^7) x^5 + a_{4} \pi x^4 + (b_{75} \pi^{10} + b_{67} \pi^9 + b_{59} \pi^8 + a_{51} \pi^7) x^3 + (b_{34} \pi^5 + b_{26} \pi^4) x^2 + (b_{73} \pi^{10} + b_{65} \pi^9 + b_{57} \pi^8) x + c_{80} \pi^{11} + c_{40} \pi^6 + c_{8} \pi^2 + \pi$	$8$	$0$	$262144$	$262144$	$0$	$0\%$	$3$
2.1.10.10a1.1-1.4.50d	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$50$	$10$	$51$	2.1.10.10a1.1	$[\frac{6}{5}, 2, 3]$	$[9, 19]$	$\langle\frac{9}{2}, \frac{47}{4}\rangle$	$(9, 29)$	$x^4 + (b_{75} \pi^{19} + b_{71} \pi^{18} + b_{67} \pi^{17} + b_{63} \pi^{16} + b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + a_{47} \pi^{12}) x^3 + (b_{34} \pi^9 + b_{30} \pi^8 + b_{26} \pi^7 + b_{22} \pi^6 + a_{18} \pi^5) x^2 + (b_{73} \pi^{19} + b_{69} \pi^{18} + b_{65} \pi^{17} + b_{61} \pi^{16} + b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13}) x + c_{76} \pi^{20} + c_{36} \pi^{10} + \pi$	$4$	$0$	$262144$	$131072$	$0$	$0\%$	$2$
2.1.10.10a1.2-1.4.50d	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$50$	$10$	$51$	2.1.10.10a1.2	$[\frac{6}{5}, 2, 3]$	$[9, 19]$	$\langle\frac{9}{2}, \frac{47}{4}\rangle$	$(9, 29)$	$x^4 + (b_{75} \pi^{19} + b_{71} \pi^{18} + b_{67} \pi^{17} + b_{63} \pi^{16} + b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + a_{47} \pi^{12}) x^3 + (b_{34} \pi^9 + b_{30} \pi^8 + b_{26} \pi^7 + b_{22} \pi^6 + a_{18} \pi^5) x^2 + (b_{73} \pi^{19} + b_{69} \pi^{18} + b_{65} \pi^{17} + b_{61} \pi^{16} + b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13}) x + c_{76} \pi^{20} + c_{36} \pi^{10} + \pi$	$4$	$0$	$262144$	$131072$	$0$	$0\%$	$2$
2.1.10.14a1.1-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.1	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.14a1.2-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.2	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.14a1.3-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.3	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.14a1.4-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.4	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.14a1.5-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.5	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.14a1.6-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.6	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.14a1.7-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.7	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.14a1.8-1.4.34b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$34$	$14$	$39$	2.1.10.14a1.8	$[\frac{6}{5}, 2, 3]$	$[1, 15]$	$\langle\frac{1}{2}, \frac{31}{4}\rangle$	$(1, 29)$	$x^4 + (b_{59} \pi^{15} + b_{55} \pi^{14} + b_{51} \pi^{13} + b_{47} \pi^{12} + b_{43} \pi^{11} + b_{39} \pi^{10} + b_{35} \pi^9 + a_{31} \pi^8) x^3 + a_{2} \pi x^2 + (b_{57} \pi^{15} + b_{53} \pi^{14} + b_{49} \pi^{13} + b_{45} \pi^{12} + b_{41} \pi^{11} + b_{37} \pi^{10} + b_{33} \pi^9) x + c_{60} \pi^{16} + c_{4} \pi^2 + \pi$	$4$	$0$	$16384$	$8192$	$0$	$0\%$	$2$
2.1.10.19a1.1-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.1	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.2-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.2	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.3-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.3	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.4-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.4	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.5-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.5	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.6-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.6	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.7-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.7	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.8-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.8	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.9-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.9	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.10-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.10	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.11-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.11	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.12-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.12	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.13-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.13	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.14-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.14	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.15-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.15	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.16-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.16	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.17-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.17	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.18-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.18	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.19-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.19	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.20-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.20	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.21-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.21	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.22-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.22	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.23-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.23	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.24-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.24	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.25-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.25	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$
2.1.10.19a1.26-1.4.14b	$2$	$4$	$10$	$40$	$1$	$1$	$1$	$4$	$10$	$40$	$14$	$19$	$24$	2.1.10.19a1.26	$[\frac{6}{5}, 2, 3]$	$[1, 5]$	$\langle\frac{1}{2}, \frac{11}{4}\rangle$	$(1, 9)$	$x^4 + (b_{19} \pi^5 + b_{15} \pi^4 + a_{11} \pi^3) x^3 + a_{2} \pi x^2 + (b_{17} \pi^5 + b_{13} \pi^4) x + c_{20} \pi^6 + c_{4} \pi^2 + \pi$	$4$	$0$	$16$	$8$	$0$	$0\%$	$2$

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