f = 5004 = 2^2 * 3^2 * 139 : \chi = \chi_{4} * \chi_{3} * \psi_{9} * \chi_{139}^{69} f(\chi) = 5004 ord(\chi) = 6 N(-B_{1,\chi}/2) = 225 = 3^2 * 5^2 ----- ----- f = 5005 = 5 * 7 * 11 * 13 : \chi = \chi_{5} * \chi_{7}^{3} * \chi_{11}^{5} * \chi_{13}^{6} f(\chi) = 5005 ord(\chi) = 4 N(-B_{1,\chi}/2) = 104 = 2^3 * 13 ----- \chi = \chi_{5}^{2} * \chi_{7}^{3} * \chi_{11}^{5} * \chi_{13}^3 f(\chi) = 5005 ord(\chi) = 4 N(-B_{1,\chi}/2) = 244 = 2^2 * 61 ----- \chi = \chi_{5}^{2} * \chi_{7}^2 * \chi_{11}^{5} * \chi_{13}^{6} f(\chi) = 5005 ord(\chi) = 6 N(-B_{1,\chi}/2) = 196 = 2^2 * 7^2 ----- \chi = \chi_{5}^{2} * \chi_{7}^{3} * \chi_{11}^2 * \chi_{13}^{6} f(\chi) = 5005 ord(\chi) = 10 N(-B_{1,\chi}/2) = 3905 = 5 * 11 * 71 ----- \chi = \chi_{5}^{2} * \chi_{7}^{3} * \chi_{11}^{5} * \chi_{13} f(\chi) = 5005 ord(\chi) = 12 N(-B_{1,\chi}/2) = 7252 = 2^2 * 7^2 * 37 ----- ----- f = 5007 = 3 * 1669 : \chi = \chi_{3} * \chi_{1669}^{834} f(\chi) = 5007 ord(\chi) = 2 N(-B_{1,\chi}/2) = 18 = 2 * 3^2 ----- ----- f = 5008 = 2^4 * 313 : \chi = \chi_{4} * \psi_{16} * \chi_{313}^{156} f(\chi) = 5008 ord(\chi) = 4 N(-B_{1,\chi}/2) = 90 = 2 * 3^2 * 5 ----- ----- f = 5012 = 2^2 * 7 * 179 : \chi = \chi_{4} * \chi_{7}^{3} * \chi_{179}^{89} f(\chi) = 5012 ord(\chi) = 2 N(-B_{1,\chi}/2) = 16 = 2^4 ----- \chi = \chi_{4} * \chi_{7} * \chi_{179}^{89} f(\chi) = 5012 ord(\chi) = 6 N(-B_{1,\chi}/2) = 91 = 7 * 13 ----- ----- f = 5013 = 3^2 * 557 : \chi = \chi_{3} * \psi_{9} * \chi_{557}^{278} f(\chi) = 5013 ord(\chi) = 6 N(-B_{1,\chi}/2) = 52 = 2^2 * 13 ----- ----- f = 5015 = 5 * 17 * 59 : \chi = \chi_{5}^{2} * \chi_{17}^{8} * \chi_{59}^{29} f(\chi) = 5015 ord(\chi) = 2 N(-B_{1,\chi}/2) = 44 = 2^2 * 11 ----- ----- f = 5016 = 2^3 * 3 * 11 * 19 : \chi = \psi_{8} * \chi_{3} * \chi_{11}^{5} * \chi_{19}^{9} f(\chi) = 5016 ord(\chi) = 2 N(-B_{1,\chi}/2) = 12 = 2^2 * 3 ----- \chi = \chi_{4} * \psi_{8} * \chi_{3} * \chi_{11}^2 * \chi_{19}^{9} f(\chi) = 5016 ord(\chi) = 10 N(-B_{1,\chi}/2) = 16631 = p(2) ----- ----- f = 5019 = 3 * 7 * 239 : \chi = \chi_{3} * \chi_{7}^{3} * \chi_{239}^{119} f(\chi) = 5019 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- \chi = \chi_{3} * \chi_{7} * \chi_{239}^{119} f(\chi) = 5019 ord(\chi) = 6 N(-B_{1,\chi}/2) = 148 = 2^2 * 37 ----- ----- f = 5020 = 2^2 * 5 * 251 : \chi = \chi_{4} * \chi_{5} * \chi_{251}^{125} f(\chi) = 5020 ord(\chi) = 4 N(-B_{1,\chi}/2) = 116 = 2^2 * 29 ----- ----- f = 5027 = 11 * 457 : \chi = \chi_{11}^{5} * \chi_{457}^{228} f(\chi) = 5027 ord(\chi) = 2 N(-B_{1,\chi}/2) = 7 = p(1) ----- ----- f = 5028 = 2^2 * 3 * 419 : \chi = \chi_{4} * \chi_{3} * \chi_{419}^{209} f(\chi) = 5028 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- ----- f = 5031 = 3^2 * 13 * 43 : \chi = \chi_{3}^2 * \psi_{9} * \chi_{13}^{6} * \chi_{43}^{21} f(\chi) = 5031 ord(\chi) = 6 N(-B_{1,\chi}/2) = 91 = 7 * 13 ----- ----- f = 5032 = 2^3 * 17 * 37 : \chi = \chi_{4} * \psi_{8} * \chi_{17}^{8} * \chi_{37}^{18} f(\chi) = 5032 ord(\chi) = 2 N(-B_{1,\chi}/2) = 6 = 2 * 3 ----- ----- f = 5033 = 7 * 719 : \chi = \chi_{7}^2 * \chi_{719}^{359} f(\chi) = 5033 ord(\chi) = 6 N(-B_{1,\chi}/2) = 57 = 3 * 19 ----- ----- f = 5035 = 5 * 19 * 53 : \chi = \chi_{5}^{2} * \chi_{19}^{9} * \chi_{53}^{26} f(\chi) = 5035 ord(\chi) = 2 N(-B_{1,\chi}/2) = 6 = 2 * 3 ----- ----- f = 5044 = 2^2 * 13 * 97 : \chi = \chi_{4} * \chi_{13}^{6} * \chi_{97}^{48} f(\chi) = 5044 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- ----- f = 5045 = 5 * 1009 : \chi = \chi_{5} * \chi_{1009}^{504} f(\chi) = 5045 ord(\chi) = 4 N(-B_{1,\chi}/2) = 82 = 2 * 41 ----- ----- f = 5048 = 2^3 * 631 : \chi = \psi_{8} * \chi_{631}^{315} f(\chi) = 5048 ord(\chi) = 2 N(-B_{1,\chi}/2) = 18 = 2 * 3^2 ----- ----- f = 5055 = 3 * 5 * 337 : \chi = \chi_{3} * \chi_{5}^{2} * \chi_{337}^{168} f(\chi) = 5055 ord(\chi) = 2 N(-B_{1,\chi}/2) = 18 = 2 * 3^2 ----- ----- f = 5057 = 13 * 389 : \chi = \chi_{13}^3 * \chi_{389}^{194} f(\chi) = 5057 ord(\chi) = 4 N(-B_{1,\chi}/2) = 50 = 2 * 5^2 ----- \chi = \chi_{13} * \chi_{389}^{194} f(\chi) = 5057 ord(\chi) = 12 N(-B_{1,\chi}/2) = 34624 = 2^6 * 541 ----- ----- f = 5060 = 2^2 * 5 * 11 * 23 : \chi = \chi_{4} * \chi_{5}^{2} * \chi_{11}^{5} * \chi_{23}^{11} f(\chi) = 5060 ord(\chi) = 2 N(-B_{1,\chi}/2) = 20 = 2^2 * 5 ----- ----- f = 5061 = 3 * 7 * 241 : \chi = \chi_{3} * \chi_{7}^2 * \chi_{241}^{120} f(\chi) = 5061 ord(\chi) = 6 N(-B_{1,\chi}/2) = 139 = p(2) ----- ----- f = 5063 = 61 * 83 : \chi = \chi_{61}^{30} * \chi_{83}^{41} f(\chi) = 5063 ord(\chi) = 2 N(-B_{1,\chi}/2) = 18 = 2 * 3^2 ----- ----- f = 5064 = 2^3 * 3 * 211 : \chi = \chi_{4} * \psi_{8} * \chi_{3} * \chi_{211}^{105} f(\chi) = 5064 ord(\chi) = 2 N(-B_{1,\chi}/2) = 16 = 2^4 ----- ----- f = 5065 = 5 * 1013 : \chi = \chi_{5} * \chi_{1013}^{506} f(\chi) = 5065 ord(\chi) = 4 N(-B_{1,\chi}/2) = 97 = p(2) ----- ----- f = 5067 = 3^2 * 563 : \chi = \chi_{3}^2 * \psi_{9} * \chi_{563}^{281} f(\chi) = 5067 ord(\chi) = 6 N(-B_{1,\chi}/2) = 183 = 3 * 61 ----- ----- f = 5068 = 2^2 * 7 * 181 : \chi = \chi_{4} * \chi_{7}^2 * \chi_{181}^{90} f(\chi) = 5068 ord(\chi) = 6 N(-B_{1,\chi}/2) = 156 = 2^2 * 3 * 13 ----- ----- f = 5071 = 11 * 461 : \chi = \chi_{11}^{5} * \chi_{461}^{230} f(\chi) = 5071 ord(\chi) = 2 N(-B_{1,\chi}/2) = 25 = 5^2 ----- ----- f = 5072 = 2^4 * 317 : \chi = \chi_{4} * \psi_{16} * \chi_{317}^{158} f(\chi) = 5072 ord(\chi) = 4 N(-B_{1,\chi}/2) = 145 = 5 * 29 ----- ----- f = 5079 = 3 * 1693 : \chi = \chi_{3} * \chi_{1693}^{846} f(\chi) = 5079 ord(\chi) = 2 N(-B_{1,\chi}/2) = 32 = 2^5 ----- ----- f = 5080 = 2^3 * 5 * 127 : \chi = \psi_{8} * \chi_{5}^{2} * \chi_{127}^{63} f(\chi) = 5080 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- \chi = \chi_{4} * \psi_{8} * \chi_{5} * \chi_{127}^{63} f(\chi) = 5080 ord(\chi) = 4 N(-B_{1,\chi}/2) = 122 = 2 * 61 ----- ----- f = 5083 = 13 * 17 * 23 : \chi = \chi_{13}^{6} * \chi_{17}^{8} * \chi_{23}^{11} f(\chi) = 5083 ord(\chi) = 2 N(-B_{1,\chi}/2) = 4 = 2^2 ----- ----- f = 5085 = 3^2 * 5 * 113 : \chi = \chi_{3} * \psi_{9} * \chi_{5}^{2} * \chi_{113}^{56} f(\chi) = 5085 ord(\chi) = 6 N(-B_{1,\chi}/2) = 91 = 7 * 13 ----- ----- f = 5089 = 7 * 727 : \chi = \chi_{7}^2 * \chi_{727}^{363} f(\chi) = 5089 ord(\chi) = 6 N(-B_{1,\chi}/2) = 144 = 2^4 * 3^2 ----- ----- f = 5091 = 3 * 1697 : \chi = \chi_{3} * \chi_{1697}^{848} f(\chi) = 5091 ord(\chi) = 2 N(-B_{1,\chi}/2) = 7 = p(1) ----- ----- f = 5092 = 2^2 * 19 * 67 : \chi = \chi_{4} * \chi_{19}^{9} * \chi_{67}^{33} f(\chi) = 5092 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- ----- f = 5093 = 11 * 463 : \chi = \chi_{11}^2 * \chi_{463}^{231} f(\chi) = 5093 ord(\chi) = 10 N(-B_{1,\chi}/2) = 15376 = 2^4 * 31^2 ----- ----- f = 5095 = 5 * 1019 : \chi = \chi_{5}^{2} * \chi_{1019}^{509} f(\chi) = 5095 ord(\chi) = 2 N(-B_{1,\chi}/2) = 24 = 2^3 * 3 ----- -----