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Extensions 1→N→G→Q→1 with N=C3xM4(2) and Q=C2

Direct product G=NxQ with N=C3xM4(2) and Q=C2
dρLabelID
C6xM4(2)48C6xM4(2)96,177

Semidirect products G=N:Q with N=C3xM4(2) and Q=C2
extensionφ:Q→Out NdρLabelID
(C3xM4(2)):1C2 = C8:D6φ: C2/C1C2 ⊆ Out C3xM4(2)244+(C3xM4(2)):1C296,115
(C3xM4(2)):2C2 = C8.D6φ: C2/C1C2 ⊆ Out C3xM4(2)484-(C3xM4(2)):2C296,116
(C3xM4(2)):3C2 = C3xC8:C22φ: C2/C1C2 ⊆ Out C3xM4(2)244(C3xM4(2)):3C296,183
(C3xM4(2)):4C2 = C3xC8.C22φ: C2/C1C2 ⊆ Out C3xM4(2)484(C3xM4(2)):4C296,184
(C3xM4(2)):5C2 = S3xM4(2)φ: C2/C1C2 ⊆ Out C3xM4(2)244(C3xM4(2)):5C296,113
(C3xM4(2)):6C2 = D12.C4φ: C2/C1C2 ⊆ Out C3xM4(2)484(C3xM4(2)):6C296,114
(C3xM4(2)):7C2 = C12.46D4φ: C2/C1C2 ⊆ Out C3xM4(2)244+(C3xM4(2)):7C296,30
(C3xM4(2)):8C2 = D12:C4φ: C2/C1C2 ⊆ Out C3xM4(2)244(C3xM4(2)):8C296,32
(C3xM4(2)):9C2 = C3xC4.D4φ: C2/C1C2 ⊆ Out C3xM4(2)244(C3xM4(2)):9C296,50
(C3xM4(2)):10C2 = C3xC4wrC2φ: C2/C1C2 ⊆ Out C3xM4(2)242(C3xM4(2)):10C296,54
(C3xM4(2)):11C2 = C3xC8oD4φ: trivial image482(C3xM4(2)):11C296,178

Non-split extensions G=N.Q with N=C3xM4(2) and Q=C2
extensionφ:Q→Out NdρLabelID
(C3xM4(2)).1C2 = C12.53D4φ: C2/C1C2 ⊆ Out C3xM4(2)484(C3xM4(2)).1C296,29
(C3xM4(2)).2C2 = C12.47D4φ: C2/C1C2 ⊆ Out C3xM4(2)484-(C3xM4(2)).2C296,31
(C3xM4(2)).3C2 = C3xC4.10D4φ: C2/C1C2 ⊆ Out C3xM4(2)484(C3xM4(2)).3C296,51
(C3xM4(2)).4C2 = C3xC8.C4φ: C2/C1C2 ⊆ Out C3xM4(2)482(C3xM4(2)).4C296,58

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