(C4xC12):S3 - GroupNames

G = (C₄×C₁₂)⋊S₃ order 288 = 2⁵·3²

1^st semidirect product of C₄×C₁₂ and S₃ acting faithfully

Aliases: (C₄×C₁₂)⋊₁S₃, C₃⋊(C₄²⋊S₃), C₄²⋊(C₃⋊S₃), C₄²⋊C₃⋊₂S₃, (C₂×C₆).₃S₄, C₂².(C₃⋊S₄), (C₃×C₄²⋊C₃)⋊₄C₂, SmallGroup(288,401)

Series: Derived ►Chief ►Lower central ►Upper central

Derived series

C₁ — C₄² — C₃×C₄²⋊C₃ — (C₄×C₁₂)⋊S₃

Chief series

C₁ — C₂² — C₄² — C₄×C₁₂ — C₃×C₄²⋊C₃ — (C₄×C₁₂)⋊S₃

Lower central

C₃×C₄²⋊C₃ — (C₄×C₁₂)⋊S₃

Upper central

C₁

Generators and relations for (C₄×C₁₂)⋊S₃
G = < a,b,c,d | a⁴=b¹²=c³=d²=1, ab=ba, cac^-1=dad=b⁹, cbc^-1=a^-1b⁷, dbd=ab⁸, dcd=c^-1 >

Subgroups: 552 in 60 conjugacy classes, 11 normal (8 characteristic)
C₁, C₂, C₃, C₃, C₄, C₂², C₂², S₃, C₆, C₈, C₂×C₄, D₄, Q₈, C₃², Dic₃, C₁₂, A₄, D₆, C₂×C₆, C₄², M₄(2), C₄○D₄, C₃⋊S₃, C₃⋊C₈, Dic₆, C₄×S₃, D₁₂, C₃⋊D₄, C₂×C₁₂, S₄, C₄≀C₂, C₃×A₄, C₄²⋊C₃, C₄.Dic₃, C₄×C₁₂, C₄○D₁₂, C₃⋊S₄, C₄²⋊₄S₃, C₄²⋊S₃, C₃×C₄²⋊C₃, (C₄×C₁₂)⋊S₃
Quotients: C₁, C₂, S₃, C₃⋊S₃, S₄, C₃⋊S₄, C₄²⋊S₃, (C₄×C₁₂)⋊S₃

Character table of (C₄×C₁₂)⋊S₃

class	1	2A	2B	3A	3B	3C	3D	4A	4B	4C	4D	6	8A	8B	12A	12B	12C	12D
size	1	3	36	2	32	32	32	3	3	6	36	6	36	36	6	6	6	6
ρ₁	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	trivial
ρ₂	1	1	-1	1	1	1	1	1	1	1	-1	1	-1	-1	1	1	1	1	linear of order 2
ρ₃	2	2	0	-1	2	-1	-1	2	2	2	0	-1	0	0	-1	-1	-1	-1	orthogonal lifted from S₃
ρ₄	2	2	0	2	-1	-1	-1	2	2	2	0	2	0	0	2	2	2	2	orthogonal lifted from S₃
ρ₅	2	2	0	-1	-1	2	-1	2	2	2	0	-1	0	0	-1	-1	-1	-1	orthogonal lifted from S₃
ρ₆	2	2	0	-1	-1	-1	2	2	2	2	0	-1	0	0	-1	-1	-1	-1	orthogonal lifted from S₃
ρ₇	3	3	-1	3	0	0	0	-1	-1	-1	-1	3	1	1	-1	-1	-1	-1	orthogonal lifted from S₄
ρ₈	3	3	1	3	0	0	0	-1	-1	-1	1	3	-1	-1	-1	-1	-1	-1	orthogonal lifted from S₄
ρ₉	3	-1	-1	3	0	0	0	-1-2i	-1+2i	1	1	-1	-i	i	-1+2i	-1-2i	1	1	complex lifted from C₄²⋊S₃
ρ₁₀	3	-1	-1	3	0	0	0	-1+2i	-1-2i	1	1	-1	i	-i	-1-2i	-1+2i	1	1	complex lifted from C₄²⋊S₃
ρ₁₁	3	-1	1	3	0	0	0	-1-2i	-1+2i	1	-1	-1	i	-i	-1+2i	-1-2i	1	1	complex lifted from C₄²⋊S₃
ρ₁₂	3	-1	1	3	0	0	0	-1+2i	-1-2i	1	-1	-1	-i	i	-1-2i	-1+2i	1	1	complex lifted from C₄²⋊S₃
ρ₁₃	6	-2	0	6	0	0	0	2	2	-2	0	-2	0	0	2	2	-2	-2	orthogonal lifted from C₄²⋊S₃
ρ₁₄	6	6	0	-3	0	0	0	-2	-2	-2	0	-3	0	0	1	1	1	1	orthogonal lifted from C₃⋊S₄
ρ₁₅	6	-2	0	-3	0	0	0	2	2	-2	0	1	0	0	-1	-1	1+2√3	1-2√3	orthogonal faithful
ρ₁₆	6	-2	0	-3	0	0	0	2	2	-2	0	1	0	0	-1	-1	1-2√3	1+2√3	orthogonal faithful
ρ₁₇	6	-2	0	-3	0	0	0	-2+4i	-2-4i	2	0	1	0	0	1+2i	1-2i	-1	-1	complex faithful
ρ₁₈	6	-2	0	-3	0	0	0	-2-4i	-2+4i	2	0	1	0	0	1-2i	1+2i	-1	-1	complex faithful

Smallest permutation representation of (C₄×C₁₂)⋊S₃
►On 36 points

Generators in S₃₆

(1 7 10 6)(2 8 11 4)(3 9 12 5)(25 28 31 34)(26 29 32 35)(27 30 33 36)

(1 2 3)(4 5 6)(7 8 9)(10 11 12)(13 14 15 16 17 18 19 20 21 22 23 24)(25 26 27 28 29 30 31 32 33 34 35 36)

(1 21 30)(2 13 34)(3 17 26)(4 22 25)(5 14 29)(6 18 33)(7 24 27)(8 16 31)(9 20 35)(10 15 36)(11 19 28)(12 23 32)

(1 20)(2 16)(3 24)(4 19)(5 15)(6 23)(7 17)(8 13)(9 21)(10 14)(11 22)(12 18)(25 28)(26 27)(29 36)(30 35)(31 34)(32 33)

G:=sub<Sym(36)| (1,7,10,6)(2,8,11,4)(3,9,12,5)(25,28,31,34)(26,29,32,35)(27,30,33,36), (1,2,3)(4,5,6)(7,8,9)(10,11,12)(13,14,15,16,17,18,19,20,21,22,23,24)(25,26,27,28,29,30,31,32,33,34,35,36), (1,21,30)(2,13,34)(3,17,26)(4,22,25)(5,14,29)(6,18,33)(7,24,27)(8,16,31)(9,20,35)(10,15,36)(11,19,28)(12,23,32), (1,20)(2,16)(3,24)(4,19)(5,15)(6,23)(7,17)(8,13)(9,21)(10,14)(11,22)(12,18)(25,28)(26,27)(29,36)(30,35)(31,34)(32,33)>;

G:=Group( (1,7,10,6)(2,8,11,4)(3,9,12,5)(25,28,31,34)(26,29,32,35)(27,30,33,36), (1,2,3)(4,5,6)(7,8,9)(10,11,12)(13,14,15,16,17,18,19,20,21,22,23,24)(25,26,27,28,29,30,31,32,33,34,35,36), (1,21,30)(2,13,34)(3,17,26)(4,22,25)(5,14,29)(6,18,33)(7,24,27)(8,16,31)(9,20,35)(10,15,36)(11,19,28)(12,23,32), (1,20)(2,16)(3,24)(4,19)(5,15)(6,23)(7,17)(8,13)(9,21)(10,14)(11,22)(12,18)(25,28)(26,27)(29,36)(30,35)(31,34)(32,33) );

G=PermutationGroup([[(1,7,10,6),(2,8,11,4),(3,9,12,5),(25,28,31,34),(26,29,32,35),(27,30,33,36)], [(1,2,3),(4,5,6),(7,8,9),(10,11,12),(13,14,15,16,17,18,19,20,21,22,23,24),(25,26,27,28,29,30,31,32,33,34,35,36)], [(1,21,30),(2,13,34),(3,17,26),(4,22,25),(5,14,29),(6,18,33),(7,24,27),(8,16,31),(9,20,35),(10,15,36),(11,19,28),(12,23,32)], [(1,20),(2,16),(3,24),(4,19),(5,15),(6,23),(7,17),(8,13),(9,21),(10,14),(11,22),(12,18),(25,28),(26,27),(29,36),(30,35),(31,34),(32,33)]])

Matrix representation of (C₄×C₁₂)⋊S₃ ►in GL₅(𝔽₇₃)

1	0	0	0	0
0	1	0	0	0
0	0	72	0	46
0	0	0	46	0
0	0	0	0	46

72	1	0	0	0
72	0	0	0	0
0	0	46	0	27
0	0	0	46	27
0	0	0	0	72

1	0	0	0	0
0	1	0	0	0
0	0	0	72	47
0	0	72	72	47
0	0	0	45	1

0	1	0	0	0
1	0	0	0	0
0	0	72	0	0
0	0	72	72	47
0	0	45	0	1

G:=sub<GL(5,GF(73))| [1,0,0,0,0,0,1,0,0,0,0,0,72,0,0,0,0,0,46,0,0,0,46,0,46],[72,72,0,0,0,1,0,0,0,0,0,0,46,0,0,0,0,0,46,0,0,0,27,27,72],[1,0,0,0,0,0,1,0,0,0,0,0,0,72,0,0,0,72,72,45,0,0,47,47,1],[0,1,0,0,0,1,0,0,0,0,0,0,72,72,45,0,0,0,72,0,0,0,0,47,1] >;

(C₄×C₁₂)⋊S₃ in GAP, Magma, Sage, TeX

(C_4\times C_{12})\rtimes S_3

% in TeX

G:=Group("(C4xC12):S3");

// GroupNames label

G:=SmallGroup(288,401);

// by ID

G=gap.SmallGroup(288,401);

# by ID

G:=PCGroup([7,-2,-3,-3,-2,2,-2,2,57,254,1011,514,360,634,3476,102,9077,3036,5305]);

// Polycyclic

G:=Group<a,b,c,d|a^4=b^12=c^3=d^2=1,a*b=b*a,c*a*c^-1=d*a*d=b^9,c*b*c^-1=a^-1*b^7,d*b*d=a*b^8,d*c*d=c^-1>;

// generators/relations

Export

Character table of (C₄×C₁₂)⋊S₃ in TeX

G = (C4×C12)⋊S3 order 288 = 25·32

1st semidirect product of C4×C12 and S3 acting faithfully

G = (C₄×C₁₂)⋊S₃ order 288 = 2⁵·3²

1^st semidirect product of C₄×C₁₂ and S₃ acting faithfully