f = 1803 = 3 * 601 : \chi = \chi_{3} * \chi_{601}^{300} f(\chi) = 1803 ord(\chi) = 2 N(-B_{1,\chi}/2) = 4 = 2^2 ----- ----- f = 1804 = 2^2 * 11 * 41 : \chi = \chi_{4} * \chi_{11}^2 * \chi_{41}^{20} f(\chi) = 1804 ord(\chi) = 10 N(-B_{1,\chi}/2) = 905 = 5 * 181 ----- ----- f = 1807 = 13 * 139 : \chi = \chi_{13}^{6} * \chi_{139}^{69} f(\chi) = 1807 ord(\chi) = 2 N(-B_{1,\chi}/2) = 6 = 2 * 3 ----- ----- f = 1808 = 2^4 * 113 : \chi = \chi_{4} * \psi_{16} * \chi_{113}^{56} f(\chi) = 1808 ord(\chi) = 4 N(-B_{1,\chi}/2) = 40 = 2^3 * 5 ----- ----- f = 1812 = 2^2 * 3 * 151 : \chi = \chi_{4} * \chi_{3} * \chi_{151}^{75} f(\chi) = 1812 ord(\chi) = 2 N(-B_{1,\chi}/2) = 6 = 2 * 3 ----- ----- f = 1816 = 2^3 * 227 : \chi = \psi_{8} * \chi_{227}^{113} f(\chi) = 1816 ord(\chi) = 2 N(-B_{1,\chi}/2) = 7 = p(1) ----- ----- f = 1819 = 17 * 107 : \chi = \chi_{17}^{8} * \chi_{107}^{53} f(\chi) = 1819 ord(\chi) = 2 N(-B_{1,\chi}/2) = 5 = p(1) ----- ----- f = 1820 = 2^2 * 5 * 7 * 13 : \chi = \chi_{4} * \chi_{5} * \chi_{7}^{3} * \chi_{13}^{6} f(\chi) = 1820 ord(\chi) = 4 N(-B_{1,\chi}/2) = 52 = 2^2 * 13 ----- \chi = \chi_{4} * \chi_{5}^{2} * \chi_{7}^{3} * \chi_{13}^3 f(\chi) = 1820 ord(\chi) = 4 N(-B_{1,\chi}/2) = 20 = 2^2 * 5 ----- \chi = \chi_{4} * \chi_{5}^{2} * \chi_{7}^2 * \chi_{13}^{6} f(\chi) = 1820 ord(\chi) = 6 N(-B_{1,\chi}/2) = 28 = 2^2 * 7 ----- \chi = \chi_{4} * \chi_{5}^{2} * \chi_{7}^{3} * \chi_{13} f(\chi) = 1820 ord(\chi) = 12 N(-B_{1,\chi}/2) = 4516 = 2^2 * 1129 ----- ----- f = 1827 = 3^2 * 7 * 29 : \chi = \chi_{3}^2 * \psi_{9} * \chi_{7}^{3} * \chi_{29}^{14} f(\chi) = 1827 ord(\chi) = 6 N(-B_{1,\chi}/2) = 111 = 3 * 37 ----- ----- f = 1828 = 2^2 * 457 : \chi = \chi_{4} * \chi_{457}^{228} f(\chi) = 1828 ord(\chi) = 2 N(-B_{1,\chi}/2) = 4 = 2^2 ----- ----- f = 1832 = 2^3 * 229 : \chi = \chi_{4} * \psi_{8} * \chi_{229}^{114} f(\chi) = 1832 ord(\chi) = 2 N(-B_{1,\chi}/2) = 13 = p(2) ----- ----- f = 1833 = 3 * 13 * 47 : \chi = \chi_{3} * \chi_{13}^3 * \chi_{47}^{23} f(\chi) = 1833 ord(\chi) = 4 N(-B_{1,\chi}/2) = 40 = 2^3 * 5 ----- \chi = \chi_{3} * \chi_{13} * \chi_{47}^{23} f(\chi) = 1833 ord(\chi) = 12 N(-B_{1,\chi}/2) = 1732 = 2^2 * 433 ----- ----- f = 1835 = 5 * 367 : \chi = \chi_{5}^{2} * \chi_{367}^{183} f(\chi) = 1835 ord(\chi) = 2 N(-B_{1,\chi}/2) = 5 = p(1) ----- ----- f = 1837 = 11 * 167 : \chi = \chi_{11}^2 * \chi_{167}^{83} f(\chi) = 1837 ord(\chi) = 10 N(-B_{1,\chi}/2) = 605 = 5 * 11^2 ----- ----- f = 1839 = 3 * 613 : \chi = \chi_{3} * \chi_{613}^{306} f(\chi) = 1839 ord(\chi) = 2 N(-B_{1,\chi}/2) = 20 = 2^2 * 5 ----- ----- f = 1840 = 2^4 * 5 * 23 : \chi = \psi_{16} * \chi_{5}^{2} * \chi_{23}^{11} f(\chi) = 1840 ord(\chi) = 4 N(-B_{1,\chi}/2) = 32 = 2^5 ----- ----- f = 1841 = 7 * 263 : \chi = \chi_{7}^2 * \chi_{263}^{131} f(\chi) = 1841 ord(\chi) = 6 N(-B_{1,\chi}/2) = 19 = p(2) ----- ----- f = 1843 = 19 * 97 : \chi = \chi_{19}^{9} * \chi_{97}^{48} f(\chi) = 1843 ord(\chi) = 2 N(-B_{1,\chi}/2) = 3 = p(1) ----- ----- f = 1844 = 2^2 * 461 : \chi = \chi_{4} * \chi_{461}^{230} f(\chi) = 1844 ord(\chi) = 2 N(-B_{1,\chi}/2) = 15 = 3 * 5 ----- ----- f = 1845 = 3^2 * 5 * 41 : \chi = \chi_{3} * \psi_{9} * \chi_{5}^{2} * \chi_{41}^{20} f(\chi) = 1845 ord(\chi) = 6 N(-B_{1,\chi}/2) = 13 = p(2) ----- ----- f = 1848 = 2^3 * 3 * 7 * 11 : \chi = \psi_{8} * \chi_{3} * \chi_{7}^{3} * \chi_{11}^{5} f(\chi) = 1848 ord(\chi) = 2 N(-B_{1,\chi}/2) = 4 = 2^2 ----- \chi = \chi_{4} * \psi_{8} * \chi_{3} * \chi_{7}^2 * \chi_{11}^{5} f(\chi) = 1848 ord(\chi) = 6 N(-B_{1,\chi}/2) = 39 = 3 * 13 ----- \chi = \psi_{8} * \chi_{3} * \chi_{7} * \chi_{11}^{5} f(\chi) = 1848 ord(\chi) = 6 N(-B_{1,\chi}/2) = 49 = 7^2 ----- \chi = \chi_{4} * \psi_{8} * \chi_{3} * \chi_{7}^{3} * \chi_{11}^2 f(\chi) = 1848 ord(\chi) = 10 N(-B_{1,\chi}/2) = 3421 = 11 * 311 ----- ----- f = 1851 = 3 * 617 : \chi = \chi_{3} * \chi_{617}^{308} f(\chi) = 1851 ord(\chi) = 2 N(-B_{1,\chi}/2) = 7 = p(1) ----- ----- f = 1855 = 5 * 7 * 53 : \chi = \chi_{5}^{2} * \chi_{7}^{3} * \chi_{53}^{26} f(\chi) = 1855 ord(\chi) = 2 N(-B_{1,\chi}/2) = 14 = 2 * 7 ----- \chi = \chi_{5}^{2} * \chi_{7} * \chi_{53}^{26} f(\chi) = 1855 ord(\chi) = 6 N(-B_{1,\chi}/2) = 37 = p(2) ----- ----- f = 1860 = 2^2 * 3 * 5 * 31 : \chi = \chi_{4} * \chi_{3} * \chi_{5}^{2} * \chi_{31}^{15} f(\chi) = 1860 ord(\chi) = 2 N(-B_{1,\chi}/2) = 8 = 2^3 ----- ----- f = 1864 = 2^3 * 233 : \chi = \chi_{4} * \psi_{8} * \chi_{233}^{116} f(\chi) = 1864 ord(\chi) = 2 N(-B_{1,\chi}/2) = 4 = 2^2 ----- ----- f = 1865 = 5 * 373 : \chi = \chi_{5} * \chi_{373}^{186} f(\chi) = 1865 ord(\chi) = 4 N(-B_{1,\chi}/2) = 29 = p(2) ----- ----- f = 1869 = 3 * 7 * 89 : \chi = \chi_{3} * \chi_{7}^2 * \chi_{89}^{44} f(\chi) = 1869 ord(\chi) = 6 N(-B_{1,\chi}/2) = 91 = 7 * 13 ----- ----- f = 1876 = 2^2 * 7 * 67 : \chi = \chi_{4} * \chi_{7}^{3} * \chi_{67}^{33} f(\chi) = 1876 ord(\chi) = 2 N(-B_{1,\chi}/2) = 8 = 2^3 ----- \chi = \chi_{4} * \chi_{7} * \chi_{67}^{33} f(\chi) = 1876 ord(\chi) = 6 N(-B_{1,\chi}/2) = 61 = p(2) ----- ----- f = 1880 = 2^3 * 5 * 47 : \chi = \psi_{8} * \chi_{5}^{2} * \chi_{47}^{23} f(\chi) = 1880 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- \chi = \chi_{4} * \psi_{8} * \chi_{5} * \chi_{47}^{23} f(\chi) = 1880 ord(\chi) = 4 N(-B_{1,\chi}/2) = 34 = 2 * 17 ----- ----- f = 1881 = 3^2 * 11 * 19 : \chi = \chi_{3} * \psi_{9} * \chi_{11}^{5} * \chi_{19}^{9} f(\chi) = 1881 ord(\chi) = 6 N(-B_{1,\chi}/2) = 112 = 2^4 * 7 ----- ----- f = 1883 = 7 * 269 : \chi = \chi_{7}^{3} * \chi_{269}^{134} f(\chi) = 1883 ord(\chi) = 2 N(-B_{1,\chi}/2) = 7 = p(1) ----- \chi = \chi_{7} * \chi_{269}^{134} f(\chi) = 1883 ord(\chi) = 6 N(-B_{1,\chi}/2) = 31 = p(2) ----- ----- f = 1885 = 5 * 13 * 29 : \chi = \chi_{5} * \chi_{13}^{6} * \chi_{29}^{14} f(\chi) = 1885 ord(\chi) = 4 N(-B_{1,\chi}/2) = 36 = 2^2 * 3^2 ----- \chi = \chi_{5}^{2} * \chi_{13}^3 * \chi_{29}^{14} f(\chi) = 1885 ord(\chi) = 4 N(-B_{1,\chi}/2) = 72 = 2^3 * 3^2 ----- \chi = \chi_{5}^{2} * \chi_{13} * \chi_{29}^{14} f(\chi) = 1885 ord(\chi) = 12 N(-B_{1,\chi}/2) = 1332 = 2^2 * 3^2 * 37 ----- ----- f = 1887 = 3 * 17 * 37 : \chi = \chi_{3} * \chi_{17}^{8} * \chi_{37}^{18} f(\chi) = 1887 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- ----- f = 1891 = 31 * 61 : \chi = \chi_{31}^{15} * \chi_{61}^{30} f(\chi) = 1891 ord(\chi) = 2 N(-B_{1,\chi}/2) = 5 = p(1) ----- ----- f = 1892 = 2^2 * 11 * 43 : \chi = \chi_{4} * \chi_{11}^{5} * \chi_{43}^{21} f(\chi) = 1892 ord(\chi) = 2 N(-B_{1,\chi}/2) = 6 = 2 * 3 ----- ----- f = 1895 = 5 * 379 : \chi = \chi_{5}^{2} * \chi_{379}^{189} f(\chi) = 1895 ord(\chi) = 2 N(-B_{1,\chi}/2) = 24 = 2^3 * 3 ----- ----- f = 1896 = 2^3 * 3 * 79 : \chi = \chi_{4} * \psi_{8} * \chi_{3} * \chi_{79}^{39} f(\chi) = 1896 ord(\chi) = 2 N(-B_{1,\chi}/2) = 10 = 2 * 5 ----- ----- f = 1897 = 7 * 271 : \chi = \chi_{7}^2 * \chi_{271}^{135} f(\chi) = 1897 ord(\chi) = 6 N(-B_{1,\chi}/2) = 21 = 3 * 7 ----- ----- f = 1899 = 3^2 * 211 : \chi = \chi_{3}^2 * \psi_{9} * \chi_{211}^{105} f(\chi) = 1899 ord(\chi) = 6 N(-B_{1,\chi}/2) = 63 = 3^2 * 7 ----- -----