extension | φ:Q→Aut N | d | ρ | Label | ID |
(C22xC14).1C23 = C23:C4:5D7 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | 8- | (C2^2xC14).1C2^3 | 448,274 |
(C22xC14).2C23 = C23:D28 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 56 | 8+ | (C2^2xC14).2C2^3 | 448,275 |
(C22xC14).3C23 = C23.5D28 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | 8- | (C2^2xC14).3C2^3 | 448,276 |
(C22xC14).4C23 = D7xC23:C4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 56 | 8+ | (C2^2xC14).4C2^3 | 448,277 |
(C22xC14).5C23 = 2+ 1+4.2D7 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | 8- | (C2^2xC14).5C2^3 | 448,777 |
(C22xC14).6C23 = 2+ 1+4:2D7 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 56 | 8+ | (C2^2xC14).6C2^3 | 448,778 |
(C22xC14).7C23 = C24.56D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).7C2^3 | 448,1039 |
(C22xC14).8C23 = C24:2D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).8C2^3 | 448,1042 |
(C22xC14).9C23 = C24.33D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).9C2^3 | 448,1044 |
(C22xC14).10C23 = C24.34D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).10C2^3 | 448,1045 |
(C22xC14).11C23 = C28:(C4oD4) | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).11C2^3 | 448,1049 |
(C22xC14).12C23 = C14.682- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).12C2^3 | 448,1050 |
(C22xC14).13C23 = Dic14:19D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).13C2^3 | 448,1051 |
(C22xC14).14C23 = Dic14:20D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).14C2^3 | 448,1052 |
(C22xC14).15C23 = C4:C4.178D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).15C2^3 | 448,1053 |
(C22xC14).16C23 = C14.342+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).16C2^3 | 448,1054 |
(C22xC14).17C23 = C14.352+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).17C2^3 | 448,1055 |
(C22xC14).18C23 = C14.372+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).18C2^3 | 448,1058 |
(C22xC14).19C23 = C4:C4:21D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).19C2^3 | 448,1059 |
(C22xC14).20C23 = C14.382+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).20C2^3 | 448,1060 |
(C22xC14).21C23 = C14.402+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).21C2^3 | 448,1063 |
(C22xC14).22C23 = C14.732- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).22C2^3 | 448,1064 |
(C22xC14).23C23 = D28:20D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).23C2^3 | 448,1065 |
(C22xC14).24C23 = C14.422+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).24C2^3 | 448,1066 |
(C22xC14).25C23 = C14.432+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).25C2^3 | 448,1067 |
(C22xC14).26C23 = C14.442+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).26C2^3 | 448,1068 |
(C22xC14).27C23 = C14.462+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).27C2^3 | 448,1070 |
(C22xC14).28C23 = C14.792- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).28C2^3 | 448,1101 |
(C22xC14).29C23 = C4:C4.197D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).29C2^3 | 448,1102 |
(C22xC14).30C23 = C14.802- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).30C2^3 | 448,1103 |
(C22xC14).31C23 = D7xC22.D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).31C2^3 | 448,1105 |
(C22xC14).32C23 = C14.1202+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).32C2^3 | 448,1106 |
(C22xC14).33C23 = C14.1212+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).33C2^3 | 448,1107 |
(C22xC14).34C23 = C14.822- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).34C2^3 | 448,1108 |
(C22xC14).35C23 = C4:C4:28D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).35C2^3 | 448,1109 |
(C22xC14).36C23 = C14.832- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).36C2^3 | 448,1113 |
(C22xC14).37C23 = C14.642+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).37C2^3 | 448,1114 |
(C22xC14).38C23 = C14.842- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).38C2^3 | 448,1115 |
(C22xC14).39C23 = C14.662+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).39C2^3 | 448,1116 |
(C22xC14).40C23 = C14.672+ 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).40C2^3 | 448,1117 |
(C22xC14).41C23 = C14.852- 1+4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).41C2^3 | 448,1118 |
(C22xC14).42C23 = C42.233D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).42C2^3 | 448,1121 |
(C22xC14).43C23 = C42.137D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).43C2^3 | 448,1122 |
(C22xC14).44C23 = C42.138D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).44C2^3 | 448,1123 |
(C22xC14).45C23 = C42.139D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).45C2^3 | 448,1124 |
(C22xC14).46C23 = C42.140D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).46C2^3 | 448,1125 |
(C22xC14).47C23 = D7xC4.4D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).47C2^3 | 448,1126 |
(C22xC14).48C23 = C42:18D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).48C2^3 | 448,1127 |
(C22xC14).49C23 = C42.141D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).49C2^3 | 448,1128 |
(C22xC14).50C23 = D28:10D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).50C2^3 | 448,1129 |
(C22xC14).51C23 = Dic14:10D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).51C2^3 | 448,1130 |
(C22xC14).52C23 = C42:20D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).52C2^3 | 448,1131 |
(C22xC14).53C23 = C42:21D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).53C2^3 | 448,1132 |
(C22xC14).54C23 = C42.234D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).54C2^3 | 448,1133 |
(C22xC14).55C23 = C42.143D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).55C2^3 | 448,1134 |
(C22xC14).56C23 = C42.144D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).56C2^3 | 448,1135 |
(C22xC14).57C23 = C42:22D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).57C2^3 | 448,1136 |
(C22xC14).58C23 = C42.145D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).58C2^3 | 448,1137 |
(C22xC14).59C23 = C42.159D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).59C2^3 | 448,1154 |
(C22xC14).60C23 = C42.160D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).60C2^3 | 448,1155 |
(C22xC14).61C23 = D7xC42:2C2 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).61C2^3 | 448,1156 |
(C22xC14).62C23 = C42:23D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).62C2^3 | 448,1157 |
(C22xC14).63C23 = C42:24D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).63C2^3 | 448,1158 |
(C22xC14).64C23 = C42.189D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).64C2^3 | 448,1159 |
(C22xC14).65C23 = C42.161D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).65C2^3 | 448,1160 |
(C22xC14).66C23 = C42.162D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).66C2^3 | 448,1161 |
(C22xC14).67C23 = C42.163D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).67C2^3 | 448,1162 |
(C22xC14).68C23 = C42.164D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).68C2^3 | 448,1163 |
(C22xC14).69C23 = C42:25D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).69C2^3 | 448,1164 |
(C22xC14).70C23 = C42.165D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).70C2^3 | 448,1165 |
(C22xC14).71C23 = C42.166D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).71C2^3 | 448,1166 |
(C22xC14).72C23 = D7xC4:1D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).72C2^3 | 448,1167 |
(C22xC14).73C23 = C42:26D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).73C2^3 | 448,1168 |
(C22xC14).74C23 = C42.238D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).74C2^3 | 448,1169 |
(C22xC14).75C23 = D28:11D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).75C2^3 | 448,1170 |
(C22xC14).76C23 = Dic14:11D4 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).76C2^3 | 448,1171 |
(C22xC14).77C23 = C42.168D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).77C2^3 | 448,1172 |
(C22xC14).78C23 = C42:28D14 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).78C2^3 | 448,1173 |
(C22xC14).79C23 = D14.C24 | φ: C23/C1 → C23 ⊆ Aut C22xC14 | 112 | 8- | (C2^2xC14).79C2^3 | 448,1380 |
(C22xC14).80C23 = C14xC23:C4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).80C2^3 | 448,817 |
(C22xC14).81C23 = C7xC23.C23 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | 4 | (C2^2xC14).81C2^3 | 448,818 |
(C22xC14).82C23 = C7xC2wrC22 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 56 | 4 | (C2^2xC14).82C2^3 | 448,865 |
(C22xC14).83C23 = C7xC23.7D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | 4 | (C2^2xC14).83C2^3 | 448,866 |
(C22xC14).84C23 = C7xC22.19C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).84C2^3 | 448,1308 |
(C22xC14).85C23 = C14xC4.4D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).85C2^3 | 448,1309 |
(C22xC14).86C23 = C14xC42:2C2 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).86C2^3 | 448,1311 |
(C22xC14).87C23 = C7xC23.36C23 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).87C2^3 | 448,1312 |
(C22xC14).88C23 = C14xC4:1D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).88C2^3 | 448,1313 |
(C22xC14).89C23 = C7xC22.26C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).89C2^3 | 448,1315 |
(C22xC14).90C23 = C7xC23:3D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).90C2^3 | 448,1317 |
(C22xC14).91C23 = C7xC22.29C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).91C2^3 | 448,1318 |
(C22xC14).92C23 = C7xC22.31C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).92C2^3 | 448,1320 |
(C22xC14).93C23 = C7xC22.32C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).93C2^3 | 448,1321 |
(C22xC14).94C23 = C7xC22.33C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).94C2^3 | 448,1322 |
(C22xC14).95C23 = C7xC22.34C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).95C2^3 | 448,1323 |
(C22xC14).96C23 = C7xC22.35C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).96C2^3 | 448,1324 |
(C22xC14).97C23 = C7xC22.36C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).97C2^3 | 448,1325 |
(C22xC14).98C23 = C7xD4:5D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).98C2^3 | 448,1329 |
(C22xC14).99C23 = C7xD4:6D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).99C2^3 | 448,1330 |
(C22xC14).100C23 = C7xQ8:5D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).100C2^3 | 448,1331 |
(C22xC14).101C23 = C7xQ8:6D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).101C2^3 | 448,1333 |
(C22xC14).102C23 = C7xC22.47C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).102C2^3 | 448,1336 |
(C22xC14).103C23 = C7xC22.49C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).103C2^3 | 448,1338 |
(C22xC14).104C23 = C7xC22.50C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).104C2^3 | 448,1339 |
(C22xC14).105C23 = C7xC22.53C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).105C2^3 | 448,1342 |
(C22xC14).106C23 = C7xC22.54C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).106C2^3 | 448,1343 |
(C22xC14).107C23 = C7xC24:C22 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).107C2^3 | 448,1344 |
(C22xC14).108C23 = C7xC22.56C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).108C2^3 | 448,1345 |
(C22xC14).109C23 = C7xC22.57C24 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).109C2^3 | 448,1346 |
(C22xC14).110C23 = C7xC2.C25 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | 4 | (C2^2xC14).110C2^3 | 448,1391 |
(C22xC14).111C23 = C2xC23.1D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).111C2^3 | 448,488 |
(C22xC14).112C23 = (C2xD28):13C4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | 4 | (C2^2xC14).112C2^3 | 448,540 |
(C22xC14).113C23 = C24:D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 56 | 4 | (C2^2xC14).113C2^3 | 448,566 |
(C22xC14).114C23 = C22:C4:D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | 4 | (C2^2xC14).114C2^3 | 448,587 |
(C22xC14).115C23 = C2xC23:Dic7 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).115C2^3 | 448,753 |
(C22xC14).116C23 = (D4xC14):10C4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | 4 | (C2^2xC14).116C2^3 | 448,774 |
(C22xC14).117C23 = C2xC22:Dic14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).117C2^3 | 448,934 |
(C22xC14).118C23 = C2xC23.D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).118C2^3 | 448,935 |
(C22xC14).119C23 = C23:2Dic14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).119C2^3 | 448,936 |
(C22xC14).120C23 = C2xD7xC22:C4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).120C2^3 | 448,937 |
(C22xC14).121C23 = C2xDic7:4D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).121C2^3 | 448,938 |
(C22xC14).122C23 = C24.24D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).122C2^3 | 448,939 |
(C22xC14).123C23 = C2xC22:D28 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).123C2^3 | 448,940 |
(C22xC14).124C23 = C2xD14.D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).124C2^3 | 448,941 |
(C22xC14).125C23 = C2xD14:D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).125C2^3 | 448,942 |
(C22xC14).126C23 = C2xC22.D28 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).126C2^3 | 448,945 |
(C22xC14).127C23 = C23:3D28 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).127C2^3 | 448,946 |
(C22xC14).128C23 = C24.30D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).128C2^3 | 448,947 |
(C22xC14).129C23 = C24.31D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).129C2^3 | 448,948 |
(C22xC14).130C23 = C42.87D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).130C2^3 | 448,969 |
(C22xC14).131C23 = C42.88D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).131C2^3 | 448,970 |
(C22xC14).132C23 = C42.89D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).132C2^3 | 448,971 |
(C22xC14).133C23 = C42.90D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).133C2^3 | 448,972 |
(C22xC14).134C23 = D7xC42:C2 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).134C2^3 | 448,973 |
(C22xC14).135C23 = C42:7D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).135C2^3 | 448,974 |
(C22xC14).136C23 = C42.188D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).136C2^3 | 448,975 |
(C22xC14).137C23 = C42.91D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).137C2^3 | 448,976 |
(C22xC14).138C23 = C42:8D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).138C2^3 | 448,977 |
(C22xC14).139C23 = C42:9D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).139C2^3 | 448,978 |
(C22xC14).140C23 = C42.92D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).140C2^3 | 448,979 |
(C22xC14).141C23 = C42:10D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).141C2^3 | 448,980 |
(C22xC14).142C23 = C42.93D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).142C2^3 | 448,981 |
(C22xC14).143C23 = C42.94D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).143C2^3 | 448,982 |
(C22xC14).144C23 = C42.95D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).144C2^3 | 448,983 |
(C22xC14).145C23 = C42.96D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).145C2^3 | 448,984 |
(C22xC14).146C23 = C42.97D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).146C2^3 | 448,985 |
(C22xC14).147C23 = C42.98D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).147C2^3 | 448,986 |
(C22xC14).148C23 = C42.99D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).148C2^3 | 448,987 |
(C22xC14).149C23 = C42.100D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).149C2^3 | 448,988 |
(C22xC14).150C23 = C4xD4:2D7 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).150C2^3 | 448,989 |
(C22xC14).151C23 = D4xDic14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).151C2^3 | 448,990 |
(C22xC14).152C23 = C42.102D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).152C2^3 | 448,991 |
(C22xC14).153C23 = D4:5Dic14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).153C2^3 | 448,992 |
(C22xC14).154C23 = C42.104D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).154C2^3 | 448,993 |
(C22xC14).155C23 = C42.105D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).155C2^3 | 448,994 |
(C22xC14).156C23 = C42.106D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).156C2^3 | 448,995 |
(C22xC14).157C23 = D4:6Dic14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).157C2^3 | 448,996 |
(C22xC14).158C23 = C4xD4xD7 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).158C2^3 | 448,997 |
(C22xC14).159C23 = C42:11D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).159C2^3 | 448,998 |
(C22xC14).160C23 = C42.108D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).160C2^3 | 448,999 |
(C22xC14).161C23 = C42:12D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).161C2^3 | 448,1000 |
(C22xC14).162C23 = C42.228D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).162C2^3 | 448,1001 |
(C22xC14).163C23 = D4xD28 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).163C2^3 | 448,1002 |
(C22xC14).164C23 = D28:23D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).164C2^3 | 448,1003 |
(C22xC14).165C23 = D28:24D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).165C2^3 | 448,1004 |
(C22xC14).166C23 = Dic14:23D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).166C2^3 | 448,1005 |
(C22xC14).167C23 = Dic14:24D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).167C2^3 | 448,1006 |
(C22xC14).168C23 = D4:5D28 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).168C2^3 | 448,1007 |
(C22xC14).169C23 = D4:6D28 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).169C2^3 | 448,1008 |
(C22xC14).170C23 = C42:16D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).170C2^3 | 448,1009 |
(C22xC14).171C23 = C42.229D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).171C2^3 | 448,1010 |
(C22xC14).172C23 = C42.113D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).172C2^3 | 448,1011 |
(C22xC14).173C23 = C42.114D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).173C2^3 | 448,1012 |
(C22xC14).174C23 = C42:17D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).174C2^3 | 448,1013 |
(C22xC14).175C23 = C42.115D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).175C2^3 | 448,1014 |
(C22xC14).176C23 = C42.116D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).176C2^3 | 448,1015 |
(C22xC14).177C23 = C42.117D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).177C2^3 | 448,1016 |
(C22xC14).178C23 = C42.118D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).178C2^3 | 448,1017 |
(C22xC14).179C23 = C42.119D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).179C2^3 | 448,1018 |
(C22xC14).180C23 = C24.32D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).180C2^3 | 448,1040 |
(C22xC14).181C23 = C24:3D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).181C2^3 | 448,1043 |
(C22xC14).182C23 = C24.35D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).182C2^3 | 448,1046 |
(C22xC14).183C23 = C24:4D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).183C2^3 | 448,1047 |
(C22xC14).184C23 = C24.36D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).184C2^3 | 448,1048 |
(C22xC14).185C23 = C14.712- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).185C2^3 | 448,1056 |
(C22xC14).186C23 = D7xC4:D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).186C2^3 | 448,1057 |
(C22xC14).187C23 = C14.722- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).187C2^3 | 448,1061 |
(C22xC14).188C23 = D28:19D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).188C2^3 | 448,1062 |
(C22xC14).189C23 = C14.452+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).189C2^3 | 448,1069 |
(C22xC14).190C23 = C14.1152+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).190C2^3 | 448,1071 |
(C22xC14).191C23 = C14.472+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).191C2^3 | 448,1072 |
(C22xC14).192C23 = C14.482+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).192C2^3 | 448,1073 |
(C22xC14).193C23 = C14.492+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).193C2^3 | 448,1074 |
(C22xC14).194C23 = (Q8xDic7):C2 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).194C2^3 | 448,1075 |
(C22xC14).195C23 = C14.752- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).195C2^3 | 448,1076 |
(C22xC14).196C23 = C22:Q8:25D7 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).196C2^3 | 448,1077 |
(C22xC14).197C23 = C14.152- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).197C2^3 | 448,1078 |
(C22xC14).198C23 = D7xC22:Q8 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).198C2^3 | 448,1079 |
(C22xC14).199C23 = C4:C4:26D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).199C2^3 | 448,1080 |
(C22xC14).200C23 = C14.162- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).200C2^3 | 448,1081 |
(C22xC14).201C23 = C14.172- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).201C2^3 | 448,1082 |
(C22xC14).202C23 = D28:21D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).202C2^3 | 448,1083 |
(C22xC14).203C23 = D28:22D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).203C2^3 | 448,1084 |
(C22xC14).204C23 = Dic14:21D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).204C2^3 | 448,1085 |
(C22xC14).205C23 = Dic14:22D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).205C2^3 | 448,1086 |
(C22xC14).206C23 = C14.512+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).206C2^3 | 448,1087 |
(C22xC14).207C23 = C14.1182+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).207C2^3 | 448,1088 |
(C22xC14).208C23 = C14.522+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).208C2^3 | 448,1089 |
(C22xC14).209C23 = C14.532+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).209C2^3 | 448,1090 |
(C22xC14).210C23 = C14.202- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).210C2^3 | 448,1091 |
(C22xC14).211C23 = C14.212- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).211C2^3 | 448,1092 |
(C22xC14).212C23 = C14.222- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).212C2^3 | 448,1093 |
(C22xC14).213C23 = C14.232- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).213C2^3 | 448,1094 |
(C22xC14).214C23 = C14.772- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).214C2^3 | 448,1095 |
(C22xC14).215C23 = C14.242- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).215C2^3 | 448,1096 |
(C22xC14).216C23 = C14.562+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).216C2^3 | 448,1097 |
(C22xC14).217C23 = C14.572+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).217C2^3 | 448,1098 |
(C22xC14).218C23 = C14.582+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).218C2^3 | 448,1099 |
(C22xC14).219C23 = C14.262- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).219C2^3 | 448,1100 |
(C22xC14).220C23 = C14.602+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).220C2^3 | 448,1104 |
(C22xC14).221C23 = C14.612+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).221C2^3 | 448,1110 |
(C22xC14).222C23 = C14.1222+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).222C2^3 | 448,1111 |
(C22xC14).223C23 = C14.622+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).223C2^3 | 448,1112 |
(C22xC14).224C23 = C14.682+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).224C2^3 | 448,1119 |
(C22xC14).225C23 = C14.862- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).225C2^3 | 448,1120 |
(C22xC14).226C23 = C2xD4xDic7 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).226C2^3 | 448,1248 |
(C22xC14).227C23 = C2xC23.18D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).227C2^3 | 448,1249 |
(C22xC14).228C23 = C2xC28.17D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).228C2^3 | 448,1250 |
(C22xC14).229C23 = C24.38D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).229C2^3 | 448,1251 |
(C22xC14).230C23 = D4xC7:D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).230C2^3 | 448,1254 |
(C22xC14).231C23 = C2xDic7:D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).231C2^3 | 448,1255 |
(C22xC14).232C23 = C2xC28:D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).232C2^3 | 448,1256 |
(C22xC14).233C23 = C24:7D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).233C2^3 | 448,1257 |
(C22xC14).234C23 = C24.41D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).234C2^3 | 448,1258 |
(C22xC14).235C23 = C24.42D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).235C2^3 | 448,1259 |
(C22xC14).236C23 = C14.1042- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).236C2^3 | 448,1277 |
(C22xC14).237C23 = C14.1052- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).237C2^3 | 448,1278 |
(C22xC14).238C23 = C4oD4xDic7 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).238C2^3 | 448,1279 |
(C22xC14).239C23 = C14.1062- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).239C2^3 | 448,1280 |
(C22xC14).240C23 = (C2xC28):15D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).240C2^3 | 448,1281 |
(C22xC14).241C23 = C14.1452+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).241C2^3 | 448,1282 |
(C22xC14).242C23 = C14.1462+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).242C2^3 | 448,1283 |
(C22xC14).243C23 = C14.1072- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).243C2^3 | 448,1284 |
(C22xC14).244C23 = (C2xC28):17D4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).244C2^3 | 448,1285 |
(C22xC14).245C23 = C14.1082- 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).245C2^3 | 448,1286 |
(C22xC14).246C23 = C14.1482+ 1+4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).246C2^3 | 448,1287 |
(C22xC14).247C23 = C2xD7xC4oD4 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).247C2^3 | 448,1375 |
(C22xC14).248C23 = C2xD4:8D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).248C2^3 | 448,1376 |
(C22xC14).249C23 = C2xD4.10D14 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).249C2^3 | 448,1377 |
(C22xC14).250C23 = C14.C25 | φ: C23/C2 → C22 ⊆ Aut C22xC14 | 112 | 4 | (C2^2xC14).250C2^3 | 448,1378 |
(C22xC14).251C23 = C22:C4xC2xC14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).251C2^3 | 448,1295 |
(C22xC14).252C23 = D4xC2xC28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).252C2^3 | 448,1298 |
(C22xC14).253C23 = C4oD4xC28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).253C2^3 | 448,1300 |
(C22xC14).254C23 = C7xC22.11C24 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).254C2^3 | 448,1301 |
(C22xC14).255C23 = C7xC23.32C23 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).255C2^3 | 448,1302 |
(C22xC14).256C23 = C7xC23.33C23 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).256C2^3 | 448,1303 |
(C22xC14).257C23 = C14xC4:D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).257C2^3 | 448,1305 |
(C22xC14).258C23 = C14xC22:Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).258C2^3 | 448,1306 |
(C22xC14).259C23 = C14xC22.D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).259C2^3 | 448,1307 |
(C22xC14).260C23 = C7xC23.37C23 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).260C2^3 | 448,1316 |
(C22xC14).261C23 = C7xC23.38C23 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).261C2^3 | 448,1319 |
(C22xC14).262C23 = C7xC23:2Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).262C2^3 | 448,1326 |
(C22xC14).263C23 = C7xC23.41C23 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).263C2^3 | 448,1327 |
(C22xC14).264C23 = C7xD42 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).264C2^3 | 448,1328 |
(C22xC14).265C23 = C7xD4xQ8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).265C2^3 | 448,1332 |
(C22xC14).266C23 = C7xC22.45C24 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).266C2^3 | 448,1334 |
(C22xC14).267C23 = C7xC22.46C24 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).267C2^3 | 448,1335 |
(C22xC14).268C23 = C7xD4:3Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).268C2^3 | 448,1337 |
(C22xC14).269C23 = C4oD4xC2xC14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).269C2^3 | 448,1388 |
(C22xC14).270C23 = C14x2- 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).270C2^3 | 448,1390 |
(C22xC14).271C23 = (C2xC28):Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).271C2^3 | 448,180 |
(C22xC14).272C23 = C14.(C4xQ8) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).272C2^3 | 448,181 |
(C22xC14).273C23 = Dic7.5C42 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).273C2^3 | 448,182 |
(C22xC14).274C23 = Dic7:C42 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).274C2^3 | 448,183 |
(C22xC14).275C23 = C7:(C42:8C4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).275C2^3 | 448,184 |
(C22xC14).276C23 = C7:(C42:5C4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).276C2^3 | 448,185 |
(C22xC14).277C23 = Dic7:C4:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).277C2^3 | 448,186 |
(C22xC14).278C23 = C4:Dic7:7C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).278C2^3 | 448,187 |
(C22xC14).279C23 = C4:Dic7:8C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).279C2^3 | 448,188 |
(C22xC14).280C23 = C14.(C4xD4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).280C2^3 | 448,189 |
(C22xC14).281C23 = (C2xDic7):Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).281C2^3 | 448,190 |
(C22xC14).282C23 = C2.(C28:Q8) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).282C2^3 | 448,191 |
(C22xC14).283C23 = (C2xDic7).Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).283C2^3 | 448,192 |
(C22xC14).284C23 = (C2xC28).28D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).284C2^3 | 448,193 |
(C22xC14).285C23 = (C2xC4).Dic14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).285C2^3 | 448,194 |
(C22xC14).286C23 = C14.(C4:Q8) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).286C2^3 | 448,195 |
(C22xC14).287C23 = (C22xC4).D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).287C2^3 | 448,196 |
(C22xC14).288C23 = D7xC2.C42 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).288C2^3 | 448,197 |
(C22xC14).289C23 = C22.58(D4xD7) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).289C2^3 | 448,198 |
(C22xC14).290C23 = (C2xC4):9D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).290C2^3 | 448,199 |
(C22xC14).291C23 = D14:C42 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).291C2^3 | 448,200 |
(C22xC14).292C23 = D14:(C4:C4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).292C2^3 | 448,201 |
(C22xC14).293C23 = D14:C4:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).293C2^3 | 448,202 |
(C22xC14).294C23 = D14:C4:5C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).294C2^3 | 448,203 |
(C22xC14).295C23 = C2.(C4xD28) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).295C2^3 | 448,204 |
(C22xC14).296C23 = (C2xC28):5D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).296C2^3 | 448,205 |
(C22xC14).297C23 = (C2xDic7):3D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).297C2^3 | 448,206 |
(C22xC14).298C23 = (C2xC4).20D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).298C2^3 | 448,207 |
(C22xC14).299C23 = (C2xC4).21D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).299C2^3 | 448,208 |
(C22xC14).300C23 = (C22xD7).9D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).300C2^3 | 448,209 |
(C22xC14).301C23 = (C22xD7).Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).301C2^3 | 448,210 |
(C22xC14).302C23 = (C2xC28).33D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).302C2^3 | 448,211 |
(C22xC14).303C23 = C28:4(C4:C4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).303C2^3 | 448,462 |
(C22xC14).304C23 = (C2xC28):10Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).304C2^3 | 448,463 |
(C22xC14).305C23 = C42xDic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).305C2^3 | 448,464 |
(C22xC14).306C23 = C4xDic7:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).306C2^3 | 448,465 |
(C22xC14).307C23 = C42:4Dic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).307C2^3 | 448,466 |
(C22xC14).308C23 = (C2xC42).D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).308C2^3 | 448,467 |
(C22xC14).309C23 = C4xC4:Dic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).309C2^3 | 448,468 |
(C22xC14).310C23 = C42:8Dic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).310C2^3 | 448,469 |
(C22xC14).311C23 = C42:9Dic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).311C2^3 | 448,470 |
(C22xC14).312C23 = C42:5Dic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).312C2^3 | 448,471 |
(C22xC14).313C23 = C4xD14:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).313C2^3 | 448,472 |
(C22xC14).314C23 = (C2xC4):6D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).314C2^3 | 448,473 |
(C22xC14).315C23 = (C2xC42):D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).315C2^3 | 448,474 |
(C22xC14).316C23 = C22:C4xDic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).316C2^3 | 448,475 |
(C22xC14).317C23 = C24.44D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).317C2^3 | 448,476 |
(C22xC14).318C23 = C23.42D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).318C2^3 | 448,477 |
(C22xC14).319C23 = C24.3D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).319C2^3 | 448,478 |
(C22xC14).320C23 = C24.4D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).320C2^3 | 448,479 |
(C22xC14).321C23 = C24.46D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).321C2^3 | 448,480 |
(C22xC14).322C23 = C23:Dic14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).322C2^3 | 448,481 |
(C22xC14).323C23 = C24.6D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).323C2^3 | 448,482 |
(C22xC14).324C23 = C24.7D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).324C2^3 | 448,483 |
(C22xC14).325C23 = C24.47D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).325C2^3 | 448,484 |
(C22xC14).326C23 = C24.8D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).326C2^3 | 448,485 |
(C22xC14).327C23 = C24.9D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).327C2^3 | 448,486 |
(C22xC14).328C23 = C24.10D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).328C2^3 | 448,487 |
(C22xC14).329C23 = C23.44D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).329C2^3 | 448,489 |
(C22xC14).330C23 = C24.12D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).330C2^3 | 448,490 |
(C22xC14).331C23 = C24.13D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).331C2^3 | 448,491 |
(C22xC14).332C23 = C23.45D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).332C2^3 | 448,492 |
(C22xC14).333C23 = C24.14D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).333C2^3 | 448,493 |
(C22xC14).334C23 = C23:2D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).334C2^3 | 448,494 |
(C22xC14).335C23 = C23.16D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).335C2^3 | 448,495 |
(C22xC14).336C23 = Dic7:(C4:C4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).336C2^3 | 448,506 |
(C22xC14).337C23 = C28:(C4:C4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).337C2^3 | 448,507 |
(C22xC14).338C23 = (C2xDic7):6Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).338C2^3 | 448,508 |
(C22xC14).339C23 = C4:C4xDic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).339C2^3 | 448,509 |
(C22xC14).340C23 = (C4xDic7):8C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).340C2^3 | 448,510 |
(C22xC14).341C23 = (C4xDic7):9C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).341C2^3 | 448,511 |
(C22xC14).342C23 = C22.23(Q8xD7) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).342C2^3 | 448,512 |
(C22xC14).343C23 = (C2xC4):Dic14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).343C2^3 | 448,513 |
(C22xC14).344C23 = (C2xC28).287D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).344C2^3 | 448,514 |
(C22xC14).345C23 = C4:C4:5Dic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).345C2^3 | 448,515 |
(C22xC14).346C23 = (C2xC28).288D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).346C2^3 | 448,516 |
(C22xC14).347C23 = (C2xC4).44D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).347C2^3 | 448,517 |
(C22xC14).348C23 = (C2xC28).54D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).348C2^3 | 448,518 |
(C22xC14).349C23 = C4:(C4:Dic7) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).349C2^3 | 448,519 |
(C22xC14).350C23 = (C2xC28).55D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).350C2^3 | 448,520 |
(C22xC14).351C23 = C4:(D14:C4) | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).351C2^3 | 448,521 |
(C22xC14).352C23 = (C2xD28):10C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).352C2^3 | 448,522 |
(C22xC14).353C23 = D14:C4:6C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).353C2^3 | 448,523 |
(C22xC14).354C23 = D14:C4:7C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).354C2^3 | 448,524 |
(C22xC14).355C23 = (C2xC4):3D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).355C2^3 | 448,525 |
(C22xC14).356C23 = (C2xC28).289D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).356C2^3 | 448,526 |
(C22xC14).357C23 = (C2xC28).290D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).357C2^3 | 448,527 |
(C22xC14).358C23 = (C2xC4).45D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).358C2^3 | 448,528 |
(C22xC14).359C23 = C2xC14.C42 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).359C2^3 | 448,742 |
(C22xC14).360C23 = C4xC23.D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).360C2^3 | 448,743 |
(C22xC14).361C23 = C24.62D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).361C2^3 | 448,744 |
(C22xC14).362C23 = C24.63D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).362C2^3 | 448,745 |
(C22xC14).363C23 = C23.27D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).363C2^3 | 448,746 |
(C22xC14).364C23 = C23.28D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).364C2^3 | 448,747 |
(C22xC14).365C23 = C24.18D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).365C2^3 | 448,754 |
(C22xC14).366C23 = C24.19D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).366C2^3 | 448,755 |
(C22xC14).367C23 = C24.20D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).367C2^3 | 448,756 |
(C22xC14).368C23 = C24.21D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).368C2^3 | 448,757 |
(C22xC14).369C23 = C14.C22wrC2 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).369C2^3 | 448,763 |
(C22xC14).370C23 = (Q8xC14):7C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).370C2^3 | 448,764 |
(C22xC14).371C23 = (C22xQ8):D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).371C2^3 | 448,765 |
(C22xC14).372C23 = C25.D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).372C2^3 | 448,781 |
(C22xC14).373C23 = C2xC4xDic14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).373C2^3 | 448,920 |
(C22xC14).374C23 = C2xC28:2Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).374C2^3 | 448,921 |
(C22xC14).375C23 = C2xC28.6Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).375C2^3 | 448,922 |
(C22xC14).376C23 = C42.274D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).376C2^3 | 448,923 |
(C22xC14).377C23 = D7xC2xC42 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).377C2^3 | 448,924 |
(C22xC14).378C23 = C2xC42:D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).378C2^3 | 448,925 |
(C22xC14).379C23 = C2xC4xD28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).379C2^3 | 448,926 |
(C22xC14).380C23 = C4xC4oD28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).380C2^3 | 448,927 |
(C22xC14).381C23 = C2xC28:4D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).381C2^3 | 448,928 |
(C22xC14).382C23 = C2xC4.D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).382C2^3 | 448,929 |
(C22xC14).383C23 = C42.276D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).383C2^3 | 448,930 |
(C22xC14).384C23 = C2xC42:2D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).384C2^3 | 448,931 |
(C22xC14).385C23 = C42.277D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).385C2^3 | 448,932 |
(C22xC14).386C23 = C2xC23.11D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).386C2^3 | 448,933 |
(C22xC14).387C23 = C24.27D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).387C2^3 | 448,943 |
(C22xC14).388C23 = C2xDic7.D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).388C2^3 | 448,944 |
(C22xC14).389C23 = C2xDic7:3Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).389C2^3 | 448,949 |
(C22xC14).390C23 = C2xC28:Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).390C2^3 | 448,950 |
(C22xC14).391C23 = C2xDic7.Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).391C2^3 | 448,951 |
(C22xC14).392C23 = C2xC28.3Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).392C2^3 | 448,952 |
(C22xC14).393C23 = C14.72+ 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).393C2^3 | 448,953 |
(C22xC14).394C23 = C2xD7xC4:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).394C2^3 | 448,954 |
(C22xC14).395C23 = C2xC4:C4:7D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).395C2^3 | 448,955 |
(C22xC14).396C23 = C2xD28:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).396C2^3 | 448,956 |
(C22xC14).397C23 = C14.82+ 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).397C2^3 | 448,957 |
(C22xC14).398C23 = C2xD14.5D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).398C2^3 | 448,958 |
(C22xC14).399C23 = C2xC4:D28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).399C2^3 | 448,959 |
(C22xC14).400C23 = C14.2- 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).400C2^3 | 448,960 |
(C22xC14).401C23 = C2xD14:Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).401C2^3 | 448,961 |
(C22xC14).402C23 = C2xD14:2Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).402C2^3 | 448,962 |
(C22xC14).403C23 = C14.2+ 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).403C2^3 | 448,963 |
(C22xC14).404C23 = C14.102+ 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).404C2^3 | 448,964 |
(C22xC14).405C23 = C2xC4:C4:D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).405C2^3 | 448,965 |
(C22xC14).406C23 = C14.52- 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).406C2^3 | 448,966 |
(C22xC14).407C23 = C14.112+ 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).407C2^3 | 448,967 |
(C22xC14).408C23 = C14.62- 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).408C2^3 | 448,968 |
(C22xC14).409C23 = C22xC4xDic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).409C2^3 | 448,1235 |
(C22xC14).410C23 = C22xDic7:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).410C2^3 | 448,1236 |
(C22xC14).411C23 = C2xC28.48D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).411C2^3 | 448,1237 |
(C22xC14).412C23 = C22xC4:Dic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).412C2^3 | 448,1238 |
(C22xC14).413C23 = C2xC23.21D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).413C2^3 | 448,1239 |
(C22xC14).414C23 = C22xD14:C4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).414C2^3 | 448,1240 |
(C22xC14).415C23 = C2xC4xC7:D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).415C2^3 | 448,1241 |
(C22xC14).416C23 = C2xC23.23D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).416C2^3 | 448,1242 |
(C22xC14).417C23 = C2xC28:7D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).417C2^3 | 448,1243 |
(C22xC14).418C23 = C24.72D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).418C2^3 | 448,1244 |
(C22xC14).419C23 = C2xC28:2D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).419C2^3 | 448,1253 |
(C22xC14).420C23 = C2xDic7:Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).420C2^3 | 448,1263 |
(C22xC14).421C23 = C2xQ8xDic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).421C2^3 | 448,1264 |
(C22xC14).422C23 = C14.422- 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).422C2^3 | 448,1265 |
(C22xC14).423C23 = C2xD14:3Q8 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).423C2^3 | 448,1266 |
(C22xC14).424C23 = C2xC28.23D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).424C2^3 | 448,1267 |
(C22xC14).425C23 = Q8xC7:D4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).425C2^3 | 448,1268 |
(C22xC14).426C23 = C14.442- 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).426C2^3 | 448,1269 |
(C22xC14).427C23 = C14.452- 1+4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).427C2^3 | 448,1270 |
(C22xC14).428C23 = C22xC23.D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).428C2^3 | 448,1292 |
(C22xC14).429C23 = C2xC24:D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 112 | | (C2^2xC14).429C2^3 | 448,1293 |
(C22xC14).430C23 = C23xDic14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).430C2^3 | 448,1365 |
(C22xC14).431C23 = D7xC23xC4 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).431C2^3 | 448,1366 |
(C22xC14).432C23 = C23xD28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).432C2^3 | 448,1367 |
(C22xC14).433C23 = C22xC4oD28 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).433C2^3 | 448,1368 |
(C22xC14).434C23 = C22xD4:2D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).434C2^3 | 448,1370 |
(C22xC14).435C23 = C22xQ8xD7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).435C2^3 | 448,1372 |
(C22xC14).436C23 = C22xQ8:2D7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).436C2^3 | 448,1373 |
(C22xC14).437C23 = C2xQ8.10D14 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 224 | | (C2^2xC14).437C2^3 | 448,1374 |
(C22xC14).438C23 = C24xDic7 | φ: C23/C22 → C2 ⊆ Aut C22xC14 | 448 | | (C2^2xC14).438C2^3 | 448,1383 |
(C22xC14).439C23 = C14xC2.C42 | central extension (φ=1) | 448 | | (C2^2xC14).439C2^3 | 448,783 |
(C22xC14).440C23 = C7xC42:4C4 | central extension (φ=1) | 448 | | (C2^2xC14).440C2^3 | 448,784 |
(C22xC14).441C23 = C22:C4xC28 | central extension (φ=1) | 224 | | (C2^2xC14).441C2^3 | 448,785 |
(C22xC14).442C23 = C4:C4xC28 | central extension (φ=1) | 448 | | (C2^2xC14).442C2^3 | 448,786 |
(C22xC14).443C23 = C7xC24:3C4 | central extension (φ=1) | 112 | | (C2^2xC14).443C2^3 | 448,787 |
(C22xC14).444C23 = C7xC23.7Q8 | central extension (φ=1) | 224 | | (C2^2xC14).444C2^3 | 448,788 |
(C22xC14).445C23 = C7xC23.34D4 | central extension (φ=1) | 224 | | (C2^2xC14).445C2^3 | 448,789 |
(C22xC14).446C23 = C7xC42:8C4 | central extension (φ=1) | 448 | | (C2^2xC14).446C2^3 | 448,790 |
(C22xC14).447C23 = C7xC42:5C4 | central extension (φ=1) | 448 | | (C2^2xC14).447C2^3 | 448,791 |
(C22xC14).448C23 = C7xC42:9C4 | central extension (φ=1) | 448 | | (C2^2xC14).448C2^3 | 448,792 |
(C22xC14).449C23 = C7xC23.8Q8 | central extension (φ=1) | 224 | | (C2^2xC14).449C2^3 | 448,793 |
(C22xC14).450C23 = C7xC23.23D4 | central extension (φ=1) | 224 | | (C2^2xC14).450C2^3 | 448,794 |
(C22xC14).451C23 = C7xC23.63C23 | central extension (φ=1) | 448 | | (C2^2xC14).451C2^3 | 448,795 |
(C22xC14).452C23 = C7xC24.C22 | central extension (φ=1) | 224 | | (C2^2xC14).452C2^3 | 448,796 |
(C22xC14).453C23 = C7xC23.65C23 | central extension (φ=1) | 448 | | (C2^2xC14).453C2^3 | 448,797 |
(C22xC14).454C23 = C7xC24.3C22 | central extension (φ=1) | 224 | | (C2^2xC14).454C2^3 | 448,798 |
(C22xC14).455C23 = C7xC23.67C23 | central extension (φ=1) | 448 | | (C2^2xC14).455C2^3 | 448,799 |
(C22xC14).456C23 = C7xC23:2D4 | central extension (φ=1) | 224 | | (C2^2xC14).456C2^3 | 448,800 |
(C22xC14).457C23 = C7xC23:Q8 | central extension (φ=1) | 224 | | (C2^2xC14).457C2^3 | 448,801 |
(C22xC14).458C23 = C7xC23.10D4 | central extension (φ=1) | 224 | | (C2^2xC14).458C2^3 | 448,802 |
(C22xC14).459C23 = C7xC23.78C23 | central extension (φ=1) | 448 | | (C2^2xC14).459C2^3 | 448,803 |
(C22xC14).460C23 = C7xC23.Q8 | central extension (φ=1) | 224 | | (C2^2xC14).460C2^3 | 448,804 |
(C22xC14).461C23 = C7xC23.11D4 | central extension (φ=1) | 224 | | (C2^2xC14).461C2^3 | 448,805 |
(C22xC14).462C23 = C7xC23.81C23 | central extension (φ=1) | 448 | | (C2^2xC14).462C2^3 | 448,806 |
(C22xC14).463C23 = C7xC23.4Q8 | central extension (φ=1) | 224 | | (C2^2xC14).463C2^3 | 448,807 |
(C22xC14).464C23 = C7xC23.83C23 | central extension (φ=1) | 448 | | (C2^2xC14).464C2^3 | 448,808 |
(C22xC14).465C23 = C7xC23.84C23 | central extension (φ=1) | 448 | | (C2^2xC14).465C2^3 | 448,809 |
(C22xC14).466C23 = C4:C4xC2xC14 | central extension (φ=1) | 448 | | (C2^2xC14).466C2^3 | 448,1296 |
(C22xC14).467C23 = C14xC42:C2 | central extension (φ=1) | 224 | | (C2^2xC14).467C2^3 | 448,1297 |
(C22xC14).468C23 = Q8xC2xC28 | central extension (φ=1) | 448 | | (C2^2xC14).468C2^3 | 448,1299 |
(C22xC14).469C23 = C14xC42.C2 | central extension (φ=1) | 448 | | (C2^2xC14).469C2^3 | 448,1310 |
(C22xC14).470C23 = C14xC4:Q8 | central extension (φ=1) | 448 | | (C2^2xC14).470C2^3 | 448,1314 |
(C22xC14).471C23 = Q8xC22xC14 | central extension (φ=1) | 448 | | (C2^2xC14).471C2^3 | 448,1387 |