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Extensions 1→N→G→Q→1 with N=C22×C10 and Q=C4

Direct product G=N×Q with N=C22×C10 and Q=C4
dρLabelID
C23×C20160C2^3xC20160,228

Semidirect products G=N:Q with N=C22×C10 and Q=C4
extensionφ:Q→Aut NdρLabelID
(C22×C10)⋊1C4 = C5×C23⋊C4φ: C4/C1C4 ⊆ Aut C22×C10404(C2^2xC10):1C4160,49
(C22×C10)⋊2C4 = C23⋊Dic5φ: C4/C1C4 ⊆ Aut C22×C10404(C2^2xC10):2C4160,41
(C22×C10)⋊3C4 = C23⋊F5φ: C4/C1C4 ⊆ Aut C22×C10404(C2^2xC10):3C4160,86
(C22×C10)⋊4C4 = C2×C22⋊F5φ: C4/C1C4 ⊆ Aut C22×C1040(C2^2xC10):4C4160,212
(C22×C10)⋊5C4 = C23×F5φ: C4/C1C4 ⊆ Aut C22×C1040(C2^2xC10):5C4160,236
(C22×C10)⋊6C4 = C10×C22⋊C4φ: C4/C2C2 ⊆ Aut C22×C1080(C2^2xC10):6C4160,176
(C22×C10)⋊7C4 = C2×C23.D5φ: C4/C2C2 ⊆ Aut C22×C1080(C2^2xC10):7C4160,173
(C22×C10)⋊8C4 = C23×Dic5φ: C4/C2C2 ⊆ Aut C22×C10160(C2^2xC10):8C4160,226

Non-split extensions G=N.Q with N=C22×C10 and Q=C4
extensionφ:Q→Aut NdρLabelID
(C22×C10).1C4 = C5×C4.D4φ: C4/C1C4 ⊆ Aut C22×C10404(C2^2xC10).1C4160,50
(C22×C10).2C4 = C20.D4φ: C4/C1C4 ⊆ Aut C22×C10404(C2^2xC10).2C4160,40
(C22×C10).3C4 = C23.2F5φ: C4/C1C4 ⊆ Aut C22×C1080(C2^2xC10).3C4160,87
(C22×C10).4C4 = C23.F5φ: C4/C1C4 ⊆ Aut C22×C10404(C2^2xC10).4C4160,88
(C22×C10).5C4 = C22×C5⋊C8φ: C4/C1C4 ⊆ Aut C22×C10160(C2^2xC10).5C4160,210
(C22×C10).6C4 = C2×C22.F5φ: C4/C1C4 ⊆ Aut C22×C1080(C2^2xC10).6C4160,211
(C22×C10).7C4 = C5×C22⋊C8φ: C4/C2C2 ⊆ Aut C22×C1080(C2^2xC10).7C4160,48
(C22×C10).8C4 = C10×M4(2)φ: C4/C2C2 ⊆ Aut C22×C1080(C2^2xC10).8C4160,191
(C22×C10).9C4 = C20.55D4φ: C4/C2C2 ⊆ Aut C22×C1080(C2^2xC10).9C4160,37
(C22×C10).10C4 = C22×C52C8φ: C4/C2C2 ⊆ Aut C22×C10160(C2^2xC10).10C4160,141
(C22×C10).11C4 = C2×C4.Dic5φ: C4/C2C2 ⊆ Aut C22×C1080(C2^2xC10).11C4160,142

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