| extension | φ:Q→Aut N | d | ρ | Label | ID |
|---|
| C22.1(C22×C12) = C12×C4○D4 | φ: C22×C12/C2×C12 → C2 ⊆ Aut C22 | 96 | | C2^2.1(C2^2xC12) | 192,1406 |
| C22.2(C22×C12) = C3×C22.11C24 | φ: C22×C12/C2×C12 → C2 ⊆ Aut C22 | 48 | | C2^2.2(C2^2xC12) | 192,1407 |
| C22.3(C22×C12) = C3×C23.33C23 | φ: C22×C12/C2×C12 → C2 ⊆ Aut C22 | 96 | | C2^2.3(C2^2xC12) | 192,1409 |
| C22.4(C22×C12) = C6×C8○D4 | φ: C22×C12/C2×C12 → C2 ⊆ Aut C22 | 96 | | C2^2.4(C2^2xC12) | 192,1456 |
| C22.5(C22×C12) = C3×Q8○M4(2) | φ: C22×C12/C2×C12 → C2 ⊆ Aut C22 | 48 | 4 | C2^2.5(C2^2xC12) | 192,1457 |
| C22.6(C22×C12) = C6×C23⋊C4 | φ: C22×C12/C22×C6 → C2 ⊆ Aut C22 | 48 | | C2^2.6(C2^2xC12) | 192,842 |
| C22.7(C22×C12) = C3×C23.C23 | φ: C22×C12/C22×C6 → C2 ⊆ Aut C22 | 48 | 4 | C2^2.7(C2^2xC12) | 192,843 |
| C22.8(C22×C12) = C6×C4.D4 | φ: C22×C12/C22×C6 → C2 ⊆ Aut C22 | 48 | | C2^2.8(C2^2xC12) | 192,844 |
| C22.9(C22×C12) = C6×C4.10D4 | φ: C22×C12/C22×C6 → C2 ⊆ Aut C22 | 96 | | C2^2.9(C2^2xC12) | 192,845 |
| C22.10(C22×C12) = C3×M4(2).8C22 | φ: C22×C12/C22×C6 → C2 ⊆ Aut C22 | 48 | 4 | C2^2.10(C2^2xC12) | 192,846 |
| C22.11(C22×C12) = C3×C23.32C23 | φ: C22×C12/C22×C6 → C2 ⊆ Aut C22 | 96 | | C2^2.11(C2^2xC12) | 192,1408 |
| C22.12(C22×C12) = C6×C2.C42 | central extension (φ=1) | 192 | | C2^2.12(C2^2xC12) | 192,808 |
| C22.13(C22×C12) = C3×C42⋊4C4 | central extension (φ=1) | 192 | | C2^2.13(C2^2xC12) | 192,809 |
| C22.14(C22×C12) = C12×C22⋊C4 | central extension (φ=1) | 96 | | C2^2.14(C2^2xC12) | 192,810 |
| C22.15(C22×C12) = C12×C4⋊C4 | central extension (φ=1) | 192 | | C2^2.15(C2^2xC12) | 192,811 |
| C22.16(C22×C12) = C6×C8⋊C4 | central extension (φ=1) | 192 | | C2^2.16(C2^2xC12) | 192,836 |
| C22.17(C22×C12) = C12×M4(2) | central extension (φ=1) | 96 | | C2^2.17(C2^2xC12) | 192,837 |
| C22.18(C22×C12) = C3×C8○2M4(2) | central extension (φ=1) | 96 | | C2^2.18(C2^2xC12) | 192,838 |
| C22.19(C22×C12) = C6×C22⋊C8 | central extension (φ=1) | 96 | | C2^2.19(C2^2xC12) | 192,839 |
| C22.20(C22×C12) = C6×C4⋊C8 | central extension (φ=1) | 192 | | C2^2.20(C2^2xC12) | 192,855 |
| C22.21(C22×C12) = C3×C42.12C4 | central extension (φ=1) | 96 | | C2^2.21(C2^2xC12) | 192,864 |
| C22.22(C22×C12) = D4×C24 | central extension (φ=1) | 96 | | C2^2.22(C2^2xC12) | 192,867 |
| C22.23(C22×C12) = Q8×C24 | central extension (φ=1) | 192 | | C2^2.23(C2^2xC12) | 192,878 |
| C22.24(C22×C12) = C2×C6×C4⋊C4 | central extension (φ=1) | 192 | | C2^2.24(C2^2xC12) | 192,1402 |
| C22.25(C22×C12) = C6×C42⋊C2 | central extension (φ=1) | 96 | | C2^2.25(C2^2xC12) | 192,1403 |
| C22.26(C22×C12) = Q8×C2×C12 | central extension (φ=1) | 192 | | C2^2.26(C2^2xC12) | 192,1405 |
| C22.27(C22×C12) = C2×C6×M4(2) | central extension (φ=1) | 96 | | C2^2.27(C2^2xC12) | 192,1455 |
| C22.28(C22×C12) = C3×C24⋊3C4 | central stem extension (φ=1) | 48 | | C2^2.28(C2^2xC12) | 192,812 |
| C22.29(C22×C12) = C3×C23.7Q8 | central stem extension (φ=1) | 96 | | C2^2.29(C2^2xC12) | 192,813 |
| C22.30(C22×C12) = C3×C23.34D4 | central stem extension (φ=1) | 96 | | C2^2.30(C2^2xC12) | 192,814 |
| C22.31(C22×C12) = C3×C42⋊8C4 | central stem extension (φ=1) | 192 | | C2^2.31(C2^2xC12) | 192,815 |
| C22.32(C22×C12) = C3×C42⋊5C4 | central stem extension (φ=1) | 192 | | C2^2.32(C2^2xC12) | 192,816 |
| C22.33(C22×C12) = C3×C42⋊9C4 | central stem extension (φ=1) | 192 | | C2^2.33(C2^2xC12) | 192,817 |
| C22.34(C22×C12) = C3×C23.8Q8 | central stem extension (φ=1) | 96 | | C2^2.34(C2^2xC12) | 192,818 |
| C22.35(C22×C12) = C3×C23.23D4 | central stem extension (φ=1) | 96 | | C2^2.35(C2^2xC12) | 192,819 |
| C22.36(C22×C12) = C3×C23.63C23 | central stem extension (φ=1) | 192 | | C2^2.36(C2^2xC12) | 192,820 |
| C22.37(C22×C12) = C3×C24.C22 | central stem extension (φ=1) | 96 | | C2^2.37(C2^2xC12) | 192,821 |
| C22.38(C22×C12) = C3×C23.65C23 | central stem extension (φ=1) | 192 | | C2^2.38(C2^2xC12) | 192,822 |
| C22.39(C22×C12) = C3×C24.3C22 | central stem extension (φ=1) | 96 | | C2^2.39(C2^2xC12) | 192,823 |
| C22.40(C22×C12) = C3×C23.67C23 | central stem extension (φ=1) | 192 | | C2^2.40(C2^2xC12) | 192,824 |
| C22.41(C22×C12) = C3×C24.4C4 | central stem extension (φ=1) | 48 | | C2^2.41(C2^2xC12) | 192,840 |
| C22.42(C22×C12) = C3×(C22×C8)⋊C2 | central stem extension (φ=1) | 96 | | C2^2.42(C2^2xC12) | 192,841 |
| C22.43(C22×C12) = C3×C4⋊M4(2) | central stem extension (φ=1) | 96 | | C2^2.43(C2^2xC12) | 192,856 |
| C22.44(C22×C12) = C3×C42.6C22 | central stem extension (φ=1) | 96 | | C2^2.44(C2^2xC12) | 192,857 |
| C22.45(C22×C12) = C3×C42.6C4 | central stem extension (φ=1) | 96 | | C2^2.45(C2^2xC12) | 192,865 |
| C22.46(C22×C12) = C3×C42.7C22 | central stem extension (φ=1) | 96 | | C2^2.46(C2^2xC12) | 192,866 |
| C22.47(C22×C12) = C3×C8⋊9D4 | central stem extension (φ=1) | 96 | | C2^2.47(C2^2xC12) | 192,868 |
| C22.48(C22×C12) = C3×C8⋊6D4 | central stem extension (φ=1) | 96 | | C2^2.48(C2^2xC12) | 192,869 |
| C22.49(C22×C12) = C3×C8⋊4Q8 | central stem extension (φ=1) | 192 | | C2^2.49(C2^2xC12) | 192,879 |