Extensions 1→N→G→Q→1 with N=C₂×C₄ and Q=C₂×C₄

Direct product G=N×Q with N=C₂×C₄ and Q=C₂×C₄

		d	ρ	Label	ID
C₂²×C₄²		64		C2^2xC4^2	64,192

Semidirect products G=N:Q with N=C₂×C₄ and Q=C₂×C₄

extension	φ:Q→Aut N	d	Label	ID
(C₂×C₄)⋊₁(C₂×C₄) = C₂×C₂³⋊C₄	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	16	(C2xC4):1(C2xC4)	64,90
(C₂×C₄)⋊₂(C₂×C₄) = C₂³.₈Q₈	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32	(C2xC4):2(C2xC4)	64,66
(C₂×C₄)⋊₃(C₂×C₄) = C₂³.₂₃D₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32	(C2xC4):3(C2xC4)	64,67
(C₂×C₄)⋊₄(C₂×C₄) = C₂².₁₁C₂⁴	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16	(C2xC4):4(C2xC4)	64,199
(C₂×C₄)⋊₅(C₂×C₄) = C₂³.₃₃C₂³	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32	(C2xC4):5(C2xC4)	64,201
(C₂×C₄)⋊₆(C₂×C₄) = C₄×C₂²⋊C₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32	(C2xC4):6(C2xC4)	64,58
(C₂×C₄)⋊₇(C₂×C₄) = C₂×C₄×D₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32	(C2xC4):7(C2xC4)	64,196
(C₂×C₄)⋊₈(C₂×C₄) = C₄×C₄○D₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32	(C2xC4):8(C2xC4)	64,198
(C₂×C₄)⋊₉(C₂×C₄) = C₂×C₂.C₄²	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64	(C2xC4):9(C2xC4)	64,56
(C₂×C₄)⋊₁₀(C₂×C₄) = C₂²×C₄⋊C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64	(C2xC4):10(C2xC4)	64,194
(C₂×C₄)⋊₁₁(C₂×C₄) = C₂×C₄²⋊C₂	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32	(C2xC4):11(C2xC4)	64,195

Non-split extensions G=N.Q with N=C₂×C₄ and Q=C₂×C₄

extension	φ:Q→Aut N	d	ρ	Label	ID
(C₂×C₄).₁(C₂×C₄) = C₄²⋊C₄	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	8	4+	(C2xC4).1(C2xC4)	64,34
(C₂×C₄).₂(C₂×C₄) = C₄²⋊₃C₄	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	16	4	(C2xC4).2(C2xC4)	64,35
(C₂×C₄).₃(C₂×C₄) = C₄².C₄	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	16	4	(C2xC4).3(C2xC4)	64,36
(C₂×C₄).₄(C₂×C₄) = C₄².₃C₄	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	16	4-	(C2xC4).4(C2xC4)	64,37
(C₂×C₄).₅(C₂×C₄) = C₂³.C₂³	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	16	4	(C2xC4).5(C2xC4)	64,91
(C₂×C₄).₆(C₂×C₄) = C₂×C₄.₁₀D₄	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	32		(C2xC4).6(C2xC4)	64,93
(C₂×C₄).₇(C₂×C₄) = M₄(2).₈C₂²	φ: C₂×C₄/C₂ → C₄ ⊆ Aut C₂×C₄	16	4	(C2xC4).7(C2xC4)	64,94
(C₂×C₄).₈(C₂×C₄) = C₂².SD₁₆	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16		(C2xC4).8(C2xC4)	64,8
(C₂×C₄).₉(C₂×C₄) = C₂³.₃₁D₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16		(C2xC4).9(C2xC4)	64,9
(C₂×C₄).₁₀(C₂×C₄) = C₄².C₂²	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).10(C2xC4)	64,10
(C₂×C₄).₁₁(C₂×C₄) = C₄².₂C₂²	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	64		(C2xC4).11(C2xC4)	64,11
(C₂×C₄).₁₂(C₂×C₄) = C₄.D₈	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).12(C2xC4)	64,12
(C₂×C₄).₁₃(C₂×C₄) = C₄.₁₀D₈	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	64		(C2xC4).13(C2xC4)	64,13
(C₂×C₄).₁₄(C₂×C₄) = C₄.₆Q₁₆	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	64		(C2xC4).14(C2xC4)	64,14
(C₂×C₄).₁₅(C₂×C₄) = C₂².C₄²	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).15(C2xC4)	64,24
(C₂×C₄).₁₆(C₂×C₄) = C₂³.₆₃C₂³	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	64		(C2xC4).16(C2xC4)	64,68
(C₂×C₄).₁₇(C₂×C₄) = C₂⁴.C₂²	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).17(C2xC4)	64,69
(C₂×C₄).₁₈(C₂×C₄) = C₂³.₆₅C₂³	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	64		(C2xC4).18(C2xC4)	64,70
(C₂×C₄).₁₉(C₂×C₄) = C₂³.₆₇C₂³	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	64		(C2xC4).19(C2xC4)	64,72
(C₂×C₄).₂₀(C₂×C₄) = C₂×C₄.D₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16		(C2xC4).20(C2xC4)	64,92
(C₂×C₄).₂₁(C₂×C₄) = C₂³.₃₆D₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).21(C2xC4)	64,98
(C₂×C₄).₂₂(C₂×C₄) = C₂³.₃₇D₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16		(C2xC4).22(C2xC4)	64,99
(C₂×C₄).₂₃(C₂×C₄) = C₂³.₃₈D₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).23(C2xC4)	64,100
(C₂×C₄).₂₄(C₂×C₄) = C₄²⋊C₂²	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16	4	(C2xC4).24(C2xC4)	64,102
(C₂×C₄).₂₅(C₂×C₄) = C₄².₆C₂²	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).25(C2xC4)	64,105
(C₂×C₄).₂₆(C₂×C₄) = M₄(2)⋊C₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).26(C2xC4)	64,109
(C₂×C₄).₂₇(C₂×C₄) = M₄(2).C₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16	4	(C2xC4).27(C2xC4)	64,111
(C₂×C₄).₂₈(C₂×C₄) = C₄².₇C₂²	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).28(C2xC4)	64,114
(C₂×C₄).₂₉(C₂×C₄) = C₈⋊₆D₄	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).29(C2xC4)	64,117
(C₂×C₄).₃₀(C₂×C₄) = C₈⋊₄Q₈	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	64		(C2xC4).30(C2xC4)	64,127
(C₂×C₄).₃₁(C₂×C₄) = C₂³.₃₂C₂³	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	32		(C2xC4).31(C2xC4)	64,200
(C₂×C₄).₃₂(C₂×C₄) = Q₈○M₄(2)	φ: C₂×C₄/C₂ → C₂² ⊆ Aut C₂×C₄	16	4	(C2xC4).32(C2xC4)	64,249
(C₂×C₄).₃₃(C₂×C₄) = C₄×C₄⋊C₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).33(C2xC4)	64,59
(C₂×C₄).₃₄(C₂×C₄) = C₈○₂M₄(2)	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).34(C2xC4)	64,86
(C₂×C₄).₃₅(C₂×C₄) = C₈×D₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).35(C2xC4)	64,115
(C₂×C₄).₃₆(C₂×C₄) = C₈⋊₉D₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).36(C2xC4)	64,116
(C₂×C₄).₃₇(C₂×C₄) = D₄⋊C₈	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).37(C2xC4)	64,6
(C₂×C₄).₃₈(C₂×C₄) = Q₈⋊C₈	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).38(C2xC4)	64,7
(C₂×C₄).₃₉(C₂×C₄) = C₂².₄Q₁₆	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).39(C2xC4)	64,21
(C₂×C₄).₄₀(C₂×C₄) = D₄.C₈	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32	2	(C2xC4).40(C2xC4)	64,31
(C₂×C₄).₄₁(C₂×C₄) = C₂⁴.₃C₂²	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).41(C2xC4)	64,71
(C₂×C₄).₄₂(C₂×C₄) = (C₂²×C₈)⋊C₂	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).42(C2xC4)	64,89
(C₂×C₄).₄₃(C₂×C₄) = C₂×D₄⋊C₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).43(C2xC4)	64,95
(C₂×C₄).₄₄(C₂×C₄) = C₂×Q₈⋊C₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).44(C2xC4)	64,96
(C₂×C₄).₄₅(C₂×C₄) = C₂³.₂₄D₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).45(C2xC4)	64,97
(C₂×C₄).₄₆(C₂×C₄) = C₂×C₄≀C₂	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	16		(C2xC4).46(C2xC4)	64,101
(C₂×C₄).₄₇(C₂×C₄) = C₈×Q₈	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).47(C2xC4)	64,126
(C₂×C₄).₄₈(C₂×C₄) = D₄○C₁₆	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32	2	(C2xC4).48(C2xC4)	64,185
(C₂×C₄).₄₉(C₂×C₄) = C₂×C₄×Q₈	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).49(C2xC4)	64,197
(C₂×C₄).₅₀(C₂×C₄) = C₂×C₈○D₄	φ: C₂×C₄/C₄ → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).50(C2xC4)	64,248
(C₂×C₄).₅₁(C₂×C₄) = C₄²⋊₄C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).51(C2xC4)	64,57
(C₂×C₄).₅₂(C₂×C₄) = C₂³.₃₄D₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).52(C2xC4)	64,62
(C₂×C₄).₅₃(C₂×C₄) = C₄²⋊₈C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).53(C2xC4)	64,63
(C₂×C₄).₅₄(C₂×C₄) = C₄²⋊₅C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).54(C2xC4)	64,64
(C₂×C₄).₅₅(C₂×C₄) = C₂×C₂²⋊C₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).55(C2xC4)	64,87
(C₂×C₄).₅₆(C₂×C₄) = C₄⋊M₄(2)	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).56(C2xC4)	64,104
(C₂×C₄).₅₇(C₂×C₄) = C₄².₁₂C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).57(C2xC4)	64,112
(C₂×C₄).₅₈(C₂×C₄) = C₄².₆C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).58(C2xC4)	64,113
(C₂×C₄).₅₉(C₂×C₄) = C₈⋊₂C₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).59(C2xC4)	64,15
(C₂×C₄).₆₀(C₂×C₄) = C₈⋊₁C₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).60(C2xC4)	64,16
(C₂×C₄).₆₁(C₂×C₄) = C₄.₉C₄²	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16	4	(C2xC4).61(C2xC4)	64,18
(C₂×C₄).₆₂(C₂×C₄) = C₄.₁₀C₄²	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16	4	(C2xC4).62(C2xC4)	64,19
(C₂×C₄).₆₃(C₂×C₄) = C₄²⋊₆C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16		(C2xC4).63(C2xC4)	64,20
(C₂×C₄).₆₄(C₂×C₄) = C₄.C₄²	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).64(C2xC4)	64,22
(C₂×C₄).₆₅(C₂×C₄) = M₄(2)⋊₄C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16	4	(C2xC4).65(C2xC4)	64,25
(C₂×C₄).₆₆(C₂×C₄) = C₁₆⋊C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16	4	(C2xC4).66(C2xC4)	64,28
(C₂×C₄).₆₇(C₂×C₄) = C₂³.C₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16	4	(C2xC4).67(C2xC4)	64,30
(C₂×C₄).₆₈(C₂×C₄) = C₈.C₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16	2	(C2xC4).68(C2xC4)	64,45
(C₂×C₄).₆₉(C₂×C₄) = C₂³.₇Q₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).69(C2xC4)	64,61
(C₂×C₄).₇₀(C₂×C₄) = C₄²⋊₉C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).70(C2xC4)	64,65
(C₂×C₄).₇₁(C₂×C₄) = C₂⁴.₄C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	16		(C2xC4).71(C2xC4)	64,88
(C₂×C₄).₇₂(C₂×C₄) = C₂×C₄.Q₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).72(C2xC4)	64,106
(C₂×C₄).₇₃(C₂×C₄) = C₂×C₂.D₈	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	64		(C2xC4).73(C2xC4)	64,107
(C₂×C₄).₇₄(C₂×C₄) = C₂³.₂₅D₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).74(C2xC4)	64,108
(C₂×C₄).₇₅(C₂×C₄) = C₂×C₈.C₄	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).75(C2xC4)	64,110
(C₂×C₄).₇₆(C₂×C₄) = C₂×M₅(2)	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).76(C2xC4)	64,184
(C₂×C₄).₇₇(C₂×C₄) = C₂²×M₄(2)	φ: C₂×C₄/C₂² → C₂ ⊆ Aut C₂×C₄	32		(C2xC4).77(C2xC4)	64,247
(C₂×C₄).₇₈(C₂×C₄) = C₈⋊C₈	central extension (φ=1)	64		(C2xC4).78(C2xC4)	64,3
(C₂×C₄).₇₉(C₂×C₄) = C₂².₇C₄²	central extension (φ=1)	64		(C2xC4).79(C2xC4)	64,17
(C₂×C₄).₈₀(C₂×C₄) = C₁₆⋊₅C₄	central extension (φ=1)	64		(C2xC4).80(C2xC4)	64,27
(C₂×C₄).₈₁(C₂×C₄) = C₂²⋊C₁₆	central extension (φ=1)	32		(C2xC4).81(C2xC4)	64,29
(C₂×C₄).₈₂(C₂×C₄) = C₄⋊C₁₆	central extension (φ=1)	64		(C2xC4).82(C2xC4)	64,44
(C₂×C₄).₈₃(C₂×C₄) = C₂×C₈⋊C₄	central extension (φ=1)	64		(C2xC4).83(C2xC4)	64,84
(C₂×C₄).₈₄(C₂×C₄) = C₄×M₄(2)	central extension (φ=1)	32		(C2xC4).84(C2xC4)	64,85
(C₂×C₄).₈₅(C₂×C₄) = C₂×C₄⋊C₈	central extension (φ=1)	64		(C2xC4).85(C2xC4)	64,103

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Extensions 1→N→G→Q→1 with N=C2×C4 and Q=C2×C4

Extensions 1→N→G→Q→1 with N=C₂×C₄ and Q=C₂×C₄