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Extensions 1→N→G→Q→1 with N=Dic3×C13 and Q=C2

Direct product G=N×Q with N=Dic3×C13 and Q=C2
dρLabelID
Dic3×C26312Dic3xC26312,35

Semidirect products G=N:Q with N=Dic3×C13 and Q=C2
extensionφ:Q→Out NdρLabelID
(Dic3×C13)⋊1C2 = Dic3×D13φ: C2/C1C2 ⊆ Out Dic3×C131564-(Dic3xC13):1C2312,15
(Dic3×C13)⋊2C2 = D78.C2φ: C2/C1C2 ⊆ Out Dic3×C131564+(Dic3xC13):2C2312,17
(Dic3×C13)⋊3C2 = C3⋊D52φ: C2/C1C2 ⊆ Out Dic3×C131564+(Dic3xC13):3C2312,19
(Dic3×C13)⋊4C2 = C13×C3⋊D4φ: C2/C1C2 ⊆ Out Dic3×C131562(Dic3xC13):4C2312,36
(Dic3×C13)⋊5C2 = S3×C52φ: trivial image1562(Dic3xC13):5C2312,33

Non-split extensions G=N.Q with N=Dic3×C13 and Q=C2
extensionφ:Q→Out NdρLabelID
(Dic3×C13).1C2 = C39⋊Q8φ: C2/C1C2 ⊆ Out Dic3×C133124-(Dic3xC13).1C2312,21
(Dic3×C13).2C2 = C13×Dic6φ: C2/C1C2 ⊆ Out Dic3×C133122(Dic3xC13).2C2312,32

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