extension | φ:Q→Aut N | d | ρ | Label | ID |
(C2xC6).1(C22:C4) = C3:C2wrC4 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 24 | 8+ | (C2xC6).1(C2^2:C4) | 192,30 |
(C2xC6).2(C22:C4) = (C2xD4).D6 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 8- | (C2xC6).2(C2^2:C4) | 192,31 |
(C2xC6).3(C22:C4) = C23.D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 8- | (C2xC6).3(C2^2:C4) | 192,32 |
(C2xC6).4(C22:C4) = C23.2D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 24 | 8+ | (C2xC6).4(C2^2:C4) | 192,33 |
(C2xC6).5(C22:C4) = C23.3D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 24 | 8+ | (C2xC6).5(C2^2:C4) | 192,34 |
(C2xC6).6(C22:C4) = C23.4D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 8- | (C2xC6).6(C2^2:C4) | 192,35 |
(C2xC6).7(C22:C4) = (C2xC4).D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 8+ | (C2xC6).7(C2^2:C4) | 192,36 |
(C2xC6).8(C22:C4) = (C2xC12).D4 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 8- | (C2xC6).8(C2^2:C4) | 192,37 |
(C2xC6).9(C22:C4) = C24.12D6 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | | (C2xC6).9(C2^2:C4) | 192,85 |
(C2xC6).10(C22:C4) = (C2xC24):C4 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).10(C2^2:C4) | 192,115 |
(C2xC6).11(C22:C4) = C12.20C42 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).11(C2^2:C4) | 192,116 |
(C2xC6).12(C22:C4) = M4(2):4Dic3 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).12(C2^2:C4) | 192,118 |
(C2xC6).13(C22:C4) = C24.56D6 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).13(C2^2:C4) | 192,502 |
(C2xC6).14(C22:C4) = C4:C4:36D6 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | | (C2xC6).14(C2^2:C4) | 192,560 |
(C2xC6).15(C22:C4) = C4.(C2xD12) | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).15(C2^2:C4) | 192,561 |
(C2xC6).16(C22:C4) = C4:C4.237D6 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).16(C2^2:C4) | 192,563 |
(C2xC6).17(C22:C4) = C42:6D6 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).17(C2^2:C4) | 192,564 |
(C2xC6).18(C22:C4) = C23.51D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).18(C2^2:C4) | 192,679 |
(C2xC6).19(C22:C4) = D6:6M4(2) | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | | (C2xC6).19(C2^2:C4) | 192,685 |
(C2xC6).20(C22:C4) = D6:C8:40C2 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).20(C2^2:C4) | 192,688 |
(C2xC6).21(C22:C4) = C23.53D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | | (C2xC6).21(C2^2:C4) | 192,690 |
(C2xC6).22(C22:C4) = C23.54D12 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).22(C2^2:C4) | 192,692 |
(C2xC6).23(C22:C4) = M4(2):24D6 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).23(C2^2:C4) | 192,698 |
(C2xC6).24(C22:C4) = C4oD4:3Dic3 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).24(C2^2:C4) | 192,791 |
(C2xC6).25(C22:C4) = C4oD4:4Dic3 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).25(C2^2:C4) | 192,792 |
(C2xC6).26(C22:C4) = (C6xD4).11C4 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 96 | | (C2xC6).26(C2^2:C4) | 192,793 |
(C2xC6).27(C22:C4) = (C6xD4):9C4 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).27(C2^2:C4) | 192,795 |
(C2xC6).28(C22:C4) = (C6xD4).16C4 | φ: C22:C4/C22 → C22 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).28(C2^2:C4) | 192,796 |
(C2xC6).29(C22:C4) = C3x(C22xC8):C2 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).29(C2^2:C4) | 192,841 |
(C2xC6).30(C22:C4) = C3xM4(2).8C22 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).30(C2^2:C4) | 192,846 |
(C2xC6).31(C22:C4) = C3xC23.24D4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).31(C2^2:C4) | 192,849 |
(C2xC6).32(C22:C4) = C3xC23.36D4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).32(C2^2:C4) | 192,850 |
(C2xC6).33(C22:C4) = C6.C4wrC2 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).33(C2^2:C4) | 192,10 |
(C2xC6).34(C22:C4) = C4:Dic3:C4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).34(C2^2:C4) | 192,11 |
(C2xC6).35(C22:C4) = C4.8Dic12 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).35(C2^2:C4) | 192,15 |
(C2xC6).36(C22:C4) = C4.17D24 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).36(C2^2:C4) | 192,18 |
(C2xC6).37(C22:C4) = C42.D6 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).37(C2^2:C4) | 192,23 |
(C2xC6).38(C22:C4) = C42.2D6 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).38(C2^2:C4) | 192,24 |
(C2xC6).39(C22:C4) = C23.35D12 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).39(C2^2:C4) | 192,26 |
(C2xC6).40(C22:C4) = (C22xS3):C8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).40(C2^2:C4) | 192,27 |
(C2xC6).41(C22:C4) = (C2xDic3):C8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).41(C2^2:C4) | 192,28 |
(C2xC6).42(C22:C4) = C22.2D24 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).42(C2^2:C4) | 192,29 |
(C2xC6).43(C22:C4) = C4.Dic12 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).43(C2^2:C4) | 192,40 |
(C2xC6).44(C22:C4) = C12.47D8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).44(C2^2:C4) | 192,41 |
(C2xC6).45(C22:C4) = D12:2C8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).45(C2^2:C4) | 192,42 |
(C2xC6).46(C22:C4) = Dic6:2C8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).46(C2^2:C4) | 192,43 |
(C2xC6).47(C22:C4) = C4.D24 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).47(C2^2:C4) | 192,44 |
(C2xC6).48(C22:C4) = C12.2D8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).48(C2^2:C4) | 192,45 |
(C2xC6).49(C22:C4) = C12.8C42 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).49(C2^2:C4) | 192,82 |
(C2xC6).50(C22:C4) = C24.13D6 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).50(C2^2:C4) | 192,86 |
(C2xC6).51(C22:C4) = (C2xC24):5C4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).51(C2^2:C4) | 192,109 |
(C2xC6).52(C22:C4) = C12.9C42 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).52(C2^2:C4) | 192,110 |
(C2xC6).53(C22:C4) = M4(2):Dic3 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).53(C2^2:C4) | 192,113 |
(C2xC6).54(C22:C4) = C12.3C42 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).54(C2^2:C4) | 192,114 |
(C2xC6).55(C22:C4) = C2xC42:4S3 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).55(C2^2:C4) | 192,486 |
(C2xC6).56(C22:C4) = C2xC23.6D6 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).56(C2^2:C4) | 192,513 |
(C2xC6).57(C22:C4) = C2xC6.D8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).57(C2^2:C4) | 192,524 |
(C2xC6).58(C22:C4) = C4oD12:C4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).58(C2^2:C4) | 192,525 |
(C2xC6).59(C22:C4) = C2xC6.SD16 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).59(C2^2:C4) | 192,528 |
(C2xC6).60(C22:C4) = C2xC2.Dic12 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).60(C2^2:C4) | 192,662 |
(C2xC6).61(C22:C4) = C2xD6:C8 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).61(C2^2:C4) | 192,667 |
(C2xC6).62(C22:C4) = (C22xC8):7S3 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).62(C2^2:C4) | 192,669 |
(C2xC6).63(C22:C4) = C2xC2.D24 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).63(C2^2:C4) | 192,671 |
(C2xC6).64(C22:C4) = C23.28D12 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).64(C2^2:C4) | 192,672 |
(C2xC6).65(C22:C4) = C2xC12.46D4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).65(C2^2:C4) | 192,689 |
(C2xC6).66(C22:C4) = M4(2).31D6 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).66(C2^2:C4) | 192,691 |
(C2xC6).67(C22:C4) = C2xC12.47D4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).67(C2^2:C4) | 192,695 |
(C2xC6).68(C22:C4) = C2xD12:C4 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).68(C2^2:C4) | 192,697 |
(C2xC6).69(C22:C4) = C2xC6.C42 | φ: C22:C4/C2xC4 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).69(C2^2:C4) | 192,767 |
(C2xC6).70(C22:C4) = C3xC4.9C42 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).70(C2^2:C4) | 192,143 |
(C2xC6).71(C22:C4) = C3xC42:6C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).71(C2^2:C4) | 192,145 |
(C2xC6).72(C22:C4) = C3xM4(2):4C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).72(C2^2:C4) | 192,150 |
(C2xC6).73(C22:C4) = C3xC2wrC4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 24 | 4 | (C2xC6).73(C2^2:C4) | 192,157 |
(C2xC6).74(C22:C4) = C3xC23.D4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).74(C2^2:C4) | 192,158 |
(C2xC6).75(C22:C4) = C3xC42:C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 24 | 4 | (C2xC6).75(C2^2:C4) | 192,159 |
(C2xC6).76(C22:C4) = C3xC42:3C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).76(C2^2:C4) | 192,160 |
(C2xC6).77(C22:C4) = C3xC42.C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).77(C2^2:C4) | 192,161 |
(C2xC6).78(C22:C4) = C3xC42.3C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).78(C2^2:C4) | 192,162 |
(C2xC6).79(C22:C4) = C3xC23.34D4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).79(C2^2:C4) | 192,814 |
(C2xC6).80(C22:C4) = C3xC24.4C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).80(C2^2:C4) | 192,840 |
(C2xC6).81(C22:C4) = C3xC23.37D4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).81(C2^2:C4) | 192,851 |
(C2xC6).82(C22:C4) = C3xC23.38D4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).82(C2^2:C4) | 192,852 |
(C2xC6).83(C22:C4) = C3xC42:C22 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).83(C2^2:C4) | 192,854 |
(C2xC6).84(C22:C4) = (C2xC12):3C8 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).84(C2^2:C4) | 192,83 |
(C2xC6).85(C22:C4) = C24.3Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).85(C2^2:C4) | 192,84 |
(C2xC6).86(C22:C4) = (C2xC12):C8 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).86(C2^2:C4) | 192,87 |
(C2xC6).87(C22:C4) = C12.C42 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).87(C2^2:C4) | 192,88 |
(C2xC6).88(C22:C4) = C12.(C4:C4) | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).88(C2^2:C4) | 192,89 |
(C2xC6).89(C22:C4) = C42:3Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).89(C2^2:C4) | 192,90 |
(C2xC6).90(C22:C4) = C12.2C42 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).90(C2^2:C4) | 192,91 |
(C2xC6).91(C22:C4) = (C2xC12).Q8 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).91(C2^2:C4) | 192,92 |
(C2xC6).92(C22:C4) = C12.57D8 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).92(C2^2:C4) | 192,93 |
(C2xC6).93(C22:C4) = C12.26Q16 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).93(C2^2:C4) | 192,94 |
(C2xC6).94(C22:C4) = C24:5Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 24 | 4 | (C2xC6).94(C2^2:C4) | 192,95 |
(C2xC6).95(C22:C4) = (C6xD4):C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).95(C2^2:C4) | 192,96 |
(C2xC6).96(C22:C4) = (C6xQ8):C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).96(C2^2:C4) | 192,97 |
(C2xC6).97(C22:C4) = (C22xC12):C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).97(C2^2:C4) | 192,98 |
(C2xC6).98(C22:C4) = C42.7D6 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).98(C2^2:C4) | 192,99 |
(C2xC6).99(C22:C4) = C42:4Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).99(C2^2:C4) | 192,100 |
(C2xC6).100(C22:C4) = C42.Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).100(C2^2:C4) | 192,101 |
(C2xC6).101(C22:C4) = C42.8D6 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).101(C2^2:C4) | 192,102 |
(C2xC6).102(C22:C4) = C12.9D8 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).102(C2^2:C4) | 192,103 |
(C2xC6).103(C22:C4) = C42:5Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 24 | 4 | (C2xC6).103(C2^2:C4) | 192,104 |
(C2xC6).104(C22:C4) = C12.5Q16 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).104(C2^2:C4) | 192,105 |
(C2xC6).105(C22:C4) = C12.10D8 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).105(C2^2:C4) | 192,106 |
(C2xC6).106(C22:C4) = C42.3Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | 4 | (C2xC6).106(C2^2:C4) | 192,107 |
(C2xC6).107(C22:C4) = C2xC12.55D4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).107(C2^2:C4) | 192,765 |
(C2xC6).108(C22:C4) = C24.6Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).108(C2^2:C4) | 192,766 |
(C2xC6).109(C22:C4) = C24.74D6 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).109(C2^2:C4) | 192,770 |
(C2xC6).110(C22:C4) = C2xD4:Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).110(C2^2:C4) | 192,773 |
(C2xC6).111(C22:C4) = (C6xD4):6C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).111(C2^2:C4) | 192,774 |
(C2xC6).112(C22:C4) = C2xC12.D4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).112(C2^2:C4) | 192,775 |
(C2xC6).113(C22:C4) = C2xC23.7D6 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).113(C2^2:C4) | 192,778 |
(C2xC6).114(C22:C4) = C2xQ8:2Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 192 | | (C2xC6).114(C2^2:C4) | 192,783 |
(C2xC6).115(C22:C4) = (C6xQ8):6C4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).115(C2^2:C4) | 192,784 |
(C2xC6).116(C22:C4) = C2xC12.10D4 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 96 | | (C2xC6).116(C2^2:C4) | 192,785 |
(C2xC6).117(C22:C4) = C2xQ8:3Dic3 | φ: C22:C4/C23 → C2 ⊆ Aut C2xC6 | 48 | | (C2xC6).117(C2^2:C4) | 192,794 |
(C2xC6).118(C22:C4) = C3xC23:C8 | central extension (φ=1) | 48 | | (C2xC6).118(C2^2:C4) | 192,129 |
(C2xC6).119(C22:C4) = C3xC22.M4(2) | central extension (φ=1) | 96 | | (C2xC6).119(C2^2:C4) | 192,130 |
(C2xC6).120(C22:C4) = C3xD4:C8 | central extension (φ=1) | 96 | | (C2xC6).120(C2^2:C4) | 192,131 |
(C2xC6).121(C22:C4) = C3xQ8:C8 | central extension (φ=1) | 192 | | (C2xC6).121(C2^2:C4) | 192,132 |
(C2xC6).122(C22:C4) = C3xC22.SD16 | central extension (φ=1) | 48 | | (C2xC6).122(C2^2:C4) | 192,133 |
(C2xC6).123(C22:C4) = C3xC23.31D4 | central extension (φ=1) | 48 | | (C2xC6).123(C2^2:C4) | 192,134 |
(C2xC6).124(C22:C4) = C3xC42.C22 | central extension (φ=1) | 96 | | (C2xC6).124(C2^2:C4) | 192,135 |
(C2xC6).125(C22:C4) = C3xC42.2C22 | central extension (φ=1) | 192 | | (C2xC6).125(C2^2:C4) | 192,136 |
(C2xC6).126(C22:C4) = C3xC4.D8 | central extension (φ=1) | 96 | | (C2xC6).126(C2^2:C4) | 192,137 |
(C2xC6).127(C22:C4) = C3xC4.10D8 | central extension (φ=1) | 192 | | (C2xC6).127(C2^2:C4) | 192,138 |
(C2xC6).128(C22:C4) = C3xC4.6Q16 | central extension (φ=1) | 192 | | (C2xC6).128(C2^2:C4) | 192,139 |
(C2xC6).129(C22:C4) = C3xC22.7C42 | central extension (φ=1) | 192 | | (C2xC6).129(C2^2:C4) | 192,142 |
(C2xC6).130(C22:C4) = C3xC22.4Q16 | central extension (φ=1) | 192 | | (C2xC6).130(C2^2:C4) | 192,146 |
(C2xC6).131(C22:C4) = C3xC23.9D4 | central extension (φ=1) | 48 | | (C2xC6).131(C2^2:C4) | 192,148 |
(C2xC6).132(C22:C4) = C3xC22.C42 | central extension (φ=1) | 96 | | (C2xC6).132(C2^2:C4) | 192,149 |
(C2xC6).133(C22:C4) = C6xC2.C42 | central extension (φ=1) | 192 | | (C2xC6).133(C2^2:C4) | 192,808 |
(C2xC6).134(C22:C4) = C6xC22:C8 | central extension (φ=1) | 96 | | (C2xC6).134(C2^2:C4) | 192,839 |
(C2xC6).135(C22:C4) = C6xC23:C4 | central extension (φ=1) | 48 | | (C2xC6).135(C2^2:C4) | 192,842 |
(C2xC6).136(C22:C4) = C6xC4.D4 | central extension (φ=1) | 48 | | (C2xC6).136(C2^2:C4) | 192,844 |
(C2xC6).137(C22:C4) = C6xC4.10D4 | central extension (φ=1) | 96 | | (C2xC6).137(C2^2:C4) | 192,845 |
(C2xC6).138(C22:C4) = C6xD4:C4 | central extension (φ=1) | 96 | | (C2xC6).138(C2^2:C4) | 192,847 |
(C2xC6).139(C22:C4) = C6xQ8:C4 | central extension (φ=1) | 192 | | (C2xC6).139(C2^2:C4) | 192,848 |
(C2xC6).140(C22:C4) = C6xC4wrC2 | central extension (φ=1) | 48 | | (C2xC6).140(C2^2:C4) | 192,853 |