f = 7704 = 2^3 * 3^2 * 107 : \chi = \chi_{4} * \psi_{8} * \chi_{3} * \psi_{9} * \chi_{107}^{53} f(\chi) = 7704 ord(\chi) = 6 N(-B_{1,\chi}/2) = 256 = 2^8 ----- \chi = \psi_{8} * \chi_{3}^2 * \psi_{9} * \chi_{107}^{53} f(\chi) = 7704 ord(\chi) = 6 N(-B_{1,\chi}/2) = 144 = 2^4 * 3^2 ----- ----- f = 7705 = 5 * 23 * 67 : \chi = \chi_{5} * \chi_{23}^{11} * \chi_{67}^{33} f(\chi) = 7705 ord(\chi) = 4 N(-B_{1,\chi}/2) = 170 = 2 * 5 * 17 ----- ----- f = 7707 = 3 * 7 * 367 : \chi = \chi_{3} * \chi_{7}^{3} * \chi_{367}^{183} f(\chi) = 7707 ord(\chi) = 2 N(-B_{1,\chi}/2) = 8 = 2^3 ----- \chi = \chi_{3} * \chi_{7} * \chi_{367}^{183} f(\chi) = 7707 ord(\chi) = 6 N(-B_{1,\chi}/2) = 301 = 7 * 43 ----- ----- f = 7709 = 13 * 593 : \chi = \chi_{13}^3 * \chi_{593}^{296} f(\chi) = 7709 ord(\chi) = 4 N(-B_{1,\chi}/2) = 85 = 5 * 17 ----- \chi = \chi_{13} * \chi_{593}^{296} f(\chi) = 7709 ord(\chi) = 12 N(-B_{1,\chi}/2) = 98788 = 2^2 * 24697 ----- ----- f = 7711 = 11 * 701 : \chi = \chi_{11}^{5} * \chi_{701}^{350} f(\chi) = 7711 ord(\chi) = 2 N(-B_{1,\chi}/2) = 17 = p(2) ----- ----- f = 7713 = 3^2 * 857 : \chi = \chi_{3} * \psi_{9} * \chi_{857}^{428} f(\chi) = 7713 ord(\chi) = 6 N(-B_{1,\chi}/2) = 199 = p(2) ----- ----- f = 7715 = 5 * 1543 : \chi = \chi_{5}^{2} * \chi_{1543}^{771} f(\chi) = 7715 ord(\chi) = 2 N(-B_{1,\chi}/2) = 9 = 3^2 ----- ----- f = 7716 = 2^2 * 3 * 643 : \chi = \chi_{4} * \chi_{3} * \chi_{643}^{321} f(\chi) = 7716 ord(\chi) = 2 N(-B_{1,\chi}/2) = 14 = 2 * 7 ----- ----- f = 7719 = 3 * 31 * 83 : \chi = \chi_{3} * \chi_{31}^{15} * \chi_{83}^{41} f(\chi) = 7719 ord(\chi) = 2 N(-B_{1,\chi}/2) = 48 = 2^4 * 3 ----- ----- f = 7720 = 2^3 * 5 * 193 : \chi = \chi_{4} * \psi_{8} * \chi_{5}^{2} * \chi_{193}^{96} f(\chi) = 7720 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- \chi = \psi_{8} * \chi_{5} * \chi_{193}^{96} f(\chi) = 7720 ord(\chi) = 4 N(-B_{1,\chi}/2) = 178 = 2 * 89 ----- ----- f = 7721 = 7 * 1103 : \chi = \chi_{7}^2 * \chi_{1103}^{551} f(\chi) = 7721 ord(\chi) = 6 N(-B_{1,\chi}/2) = 91 = 7 * 13 ----- ----- f = 7728 = 2^4 * 3 * 7 * 23 : \chi = \psi_{16} * \chi_{3} * \chi_{7}^{3} * \chi_{23}^{11} f(\chi) = 7728 ord(\chi) = 4 N(-B_{1,\chi}/2) = 160 = 2^5 * 5 ----- ----- f = 7731 = 3^2 * 859 : \chi = \chi_{3}^2 * \psi_{9} * \chi_{859}^{429} f(\chi) = 7731 ord(\chi) = 6 N(-B_{1,\chi}/2) = 175 = 5^2 * 7 ----- ----- f = 7732 = 2^2 * 1933 : \chi = \chi_{4} * \chi_{1933}^{966} f(\chi) = 7732 ord(\chi) = 2 N(-B_{1,\chi}/2) = 9 = 3^2 ----- ----- f = 7733 = 11 * 19 * 37 : \chi = \chi_{11}^2 * \chi_{19}^{9} * \chi_{37}^{18} f(\chi) = 7733 ord(\chi) = 10 N(-B_{1,\chi}/2) = 20005 = 5 * 4001 ----- ----- f = 7735 = 5 * 7 * 13 * 17 : \chi = \chi_{5}^{2} * \chi_{7}^{3} * \chi_{13}^{6} * \chi_{17}^{8} f(\chi) = 7735 ord(\chi) = 2 N(-B_{1,\chi}/2) = 24 = 2^3 * 3 ----- \chi = \chi_{5}^{2} * \chi_{7} * \chi_{13}^{6} * \chi_{17}^{8} f(\chi) = 7735 ord(\chi) = 6 N(-B_{1,\chi}/2) = 108 = 2^2 * 3^3 ----- ----- f = 7736 = 2^3 * 967 : \chi = \psi_{8} * \chi_{967}^{483} f(\chi) = 7736 ord(\chi) = 2 N(-B_{1,\chi}/2) = 26 = 2 * 13 ----- ----- f = 7739 = 71 * 109 : \chi = \chi_{71}^{35} * \chi_{109}^{54} f(\chi) = 7739 ord(\chi) = 2 N(-B_{1,\chi}/2) = 20 = 2^2 * 5 ----- ----- f = 7740 = 2^2 * 3^2 * 5 * 43 : \chi = \chi_{4} * \chi_{3} * \psi_{9} * \chi_{5}^{2} * \chi_{43}^{21} f(\chi) = 7740 ord(\chi) = 6 N(-B_{1,\chi}/2) = 349 = p(2) ----- ----- f = 7743 = 3 * 29 * 89 : \chi = \chi_{3} * \chi_{29}^{14} * \chi_{89}^{44} f(\chi) = 7743 ord(\chi) = 2 N(-B_{1,\chi}/2) = 26 = 2 * 13 ----- ----- f = 7745 = 5 * 1549 : \chi = \chi_{5} * \chi_{1549}^{774} f(\chi) = 7745 ord(\chi) = 4 N(-B_{1,\chi}/2) = 194 = 2 * 97 ----- ----- f = 7747 = 61 * 127 : \chi = \chi_{61}^{30} * \chi_{127}^{63} f(\chi) = 7747 ord(\chi) = 2 N(-B_{1,\chi}/2) = 8 = 2^3 ----- ----- f = 7748 = 2^2 * 13 * 149 : \chi = \chi_{4} * \chi_{13}^{6} * \chi_{149}^{74} f(\chi) = 7748 ord(\chi) = 2 N(-B_{1,\chi}/2) = 24 = 2^3 * 3 ----- ----- f = 7751 = 23 * 337 : \chi = \chi_{23}^{11} * \chi_{337}^{168} f(\chi) = 7751 ord(\chi) = 2 N(-B_{1,\chi}/2) = 55 = 5 * 11 ----- ----- f = 7752 = 2^3 * 3 * 17 * 19 : \chi = \chi_{4} * \psi_{8} * \chi_{3} * \chi_{17}^{8} * \chi_{19}^{9} f(\chi) = 7752 ord(\chi) = 2 N(-B_{1,\chi}/2) = 16 = 2^4 ----- ----- f = 7755 = 3 * 5 * 11 * 47 : \chi = \chi_{3} * \chi_{5}^{2} * \chi_{11}^{5} * \chi_{47}^{23} f(\chi) = 7755 ord(\chi) = 2 N(-B_{1,\chi}/2) = 8 = 2^3 ----- ----- f = 7756 = 2^2 * 7 * 277 : \chi = \chi_{4} * \chi_{7}^2 * \chi_{277}^{138} f(\chi) = 7756 ord(\chi) = 6 N(-B_{1,\chi}/2) = 471 = 3 * 157 ----- ----- f = 7760 = 2^4 * 5 * 97 : \chi = \chi_{4} * \psi_{16} * \chi_{5}^{2} * \chi_{97}^{48} f(\chi) = 7760 ord(\chi) = 4 N(-B_{1,\chi}/2) = 260 = 2^2 * 5 * 13 ----- ----- f = 7761 = 3 * 13 * 199 : \chi = \chi_{3} * \chi_{13}^3 * \chi_{199}^{99} f(\chi) = 7761 ord(\chi) = 4 N(-B_{1,\chi}/2) = 136 = 2^3 * 17 ----- \chi = \chi_{3} * \chi_{13} * \chi_{199}^{99} f(\chi) = 7761 ord(\chi) = 12 N(-B_{1,\chi}/2) = 43681 = 11^2 * 19^2 ----- ----- f = 7763 = 7 * 1109 : \chi = \chi_{7}^{3} * \chi_{1109}^{554} f(\chi) = 7763 ord(\chi) = 2 N(-B_{1,\chi}/2) = 11 = p(2) ----- \chi = \chi_{7} * \chi_{1109}^{554} f(\chi) = 7763 ord(\chi) = 6 N(-B_{1,\chi}/2) = 163 = p(2) ----- ----- f = 7764 = 2^2 * 3 * 647 : \chi = \chi_{4} * \chi_{3} * \chi_{647}^{323} f(\chi) = 7764 ord(\chi) = 2 N(-B_{1,\chi}/2) = 12 = 2^2 * 3 ----- ----- f = 7765 = 5 * 1553 : \chi = \chi_{5} * \chi_{1553}^{776} f(\chi) = 7765 ord(\chi) = 4 N(-B_{1,\chi}/2) = 101 = p(2) ----- ----- f = 7767 = 3^2 * 863 : \chi = \chi_{3}^2 * \psi_{9} * \chi_{863}^{431} f(\chi) = 7767 ord(\chi) = 6 N(-B_{1,\chi}/2) = 252 = 2^2 * 3^2 * 7 ----- ----- f = 7768 = 2^3 * 971 : \chi = \psi_{8} * \chi_{971}^{485} f(\chi) = 7768 ord(\chi) = 2 N(-B_{1,\chi}/2) = 11 = p(2) ----- ----- f = 7771 = 19 * 409 : \chi = \chi_{19}^{9} * \chi_{409}^{204} f(\chi) = 7771 ord(\chi) = 2 N(-B_{1,\chi}/2) = 9 = 3^2 ----- ----- f = 7777 = 7 * 11 * 101 : \chi = \chi_{7}^2 * \chi_{11}^{5} * \chi_{101}^{50} f(\chi) = 7777 ord(\chi) = 6 N(-B_{1,\chi}/2) = 129 = 3 * 43 ----- \chi = \chi_{7}^{3} * \chi_{11}^2 * \chi_{101}^{50} f(\chi) = 7777 ord(\chi) = 10 N(-B_{1,\chi}/2) = 66551 = 61 * 1091 ----- ----- f = 7779 = 3 * 2593 : \chi = \chi_{3} * \chi_{2593}^{1296} f(\chi) = 7779 ord(\chi) = 2 N(-B_{1,\chi}/2) = 12 = 2^2 * 3 ----- ----- f = 7780 = 2^2 * 5 * 389 : \chi = \chi_{4} * \chi_{5}^{2} * \chi_{389}^{194} f(\chi) = 7780 ord(\chi) = 2 N(-B_{1,\chi}/2) = 8 = 2^3 ----- ----- f = 7783 = 43 * 181 : \chi = \chi_{43}^{21} * \chi_{181}^{90} f(\chi) = 7783 ord(\chi) = 2 N(-B_{1,\chi}/2) = 22 = 2 * 11 ----- ----- f = 7784 = 2^3 * 7 * 139 : \chi = \chi_{4} * \psi_{8} * \chi_{7}^{3} * \chi_{139}^{69} f(\chi) = 7784 ord(\chi) = 2 N(-B_{1,\chi}/2) = 34 = 2 * 17 ----- \chi = \psi_{8} * \chi_{7}^2 * \chi_{139}^{69} f(\chi) = 7784 ord(\chi) = 6 N(-B_{1,\chi}/2) = 156 = 2^2 * 3 * 13 ----- \chi = \chi_{4} * \psi_{8} * \chi_{7} * \chi_{139}^{69} f(\chi) = 7784 ord(\chi) = 6 N(-B_{1,\chi}/2) = 76 = 2^2 * 19 ----- ----- f = 7785 = 3^2 * 5 * 173 : \chi = \chi_{3} * \psi_{9} * \chi_{5}^{2} * \chi_{173}^{86} f(\chi) = 7785 ord(\chi) = 6 N(-B_{1,\chi}/2) = 147 = 3 * 7^2 ----- ----- f = 7787 = 13 * 599 : \chi = \chi_{13}^{6} * \chi_{599}^{299} f(\chi) = 7787 ord(\chi) = 2 N(-B_{1,\chi}/2) = 14 = 2 * 7 ----- ----- f = 7788 = 2^2 * 3 * 11 * 59 : \chi = \chi_{4} * \chi_{3} * \chi_{11}^2 * \chi_{59}^{29} f(\chi) = 7788 ord(\chi) = 10 N(-B_{1,\chi}/2) = 69401 = p(2) ----- ----- f = 7792 = 2^4 * 487 : \chi = \psi_{16} * \chi_{487}^{243} f(\chi) = 7792 ord(\chi) = 4 N(-B_{1,\chi}/2) = 194 = 2 * 97 ----- ----- f = 7795 = 5 * 1559 : \chi = \chi_{5}^{2} * \chi_{1559}^{779} f(\chi) = 7795 ord(\chi) = 2 N(-B_{1,\chi}/2) = 8 = 2^3 ----- ----- f = 7796 = 2^2 * 1949 : \chi = \chi_{4} * \chi_{1949}^{974} f(\chi) = 7796 ord(\chi) = 2 N(-B_{1,\chi}/2) = 35 = 5 * 7 ----- ----- f = 7799 = 11 * 709 : \chi = \chi_{11}^{5} * \chi_{709}^{354} f(\chi) = 7799 ord(\chi) = 2 N(-B_{1,\chi}/2) = 48 = 2^4 * 3 ----- -----