C2xC29:C7 - GroupNames

class	1	2	7A	7B	7C	7D	7E	7F	14A	14B	14C	14D	14E	14F	29A	29B	29C	29D	58A	58B	58C	58D
size	1	1	29	29	29	29	29	29	29	29	29	29	29	29	7	7	7	7	7	7	7	7
ρ₁	1	1	1	1	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	-1	-1	-1	-1	linear of order 2
ρ₃	1	-1	ζ₇⁴	ζ₇³	ζ₇⁶	ζ₇²	ζ₇⁵	ζ₇	-ζ₇⁴	-ζ₇³	-ζ₇⁶	-ζ₇²	-ζ₇⁵	-ζ₇	1	1	1	1	-1	-1	-1	-1	linear of order 14
ρ₄	1	-1	ζ₇	ζ₇⁶	ζ₇⁵	ζ₇⁴	ζ₇³	ζ₇²	-ζ₇	-ζ₇⁶	-ζ₇⁵	-ζ₇⁴	-ζ₇³	-ζ₇²	1	1	1	1	-1	-1	-1	-1	linear of order 14
ρ₅	1	-1	ζ₇⁵	ζ₇²	ζ₇⁴	ζ₇⁶	ζ₇	ζ₇³	-ζ₇⁵	-ζ₇²	-ζ₇⁴	-ζ₇⁶	-ζ₇	-ζ₇³	1	1	1	1	-1	-1	-1	-1	linear of order 14
ρ₆	1	-1	ζ₇²	ζ₇⁵	ζ₇³	ζ₇	ζ₇⁶	ζ₇⁴	-ζ₇²	-ζ₇⁵	-ζ₇³	-ζ₇	-ζ₇⁶	-ζ₇⁴	1	1	1	1	-1	-1	-1	-1	linear of order 14
ρ₇	1	1	ζ₇⁴	ζ₇³	ζ₇⁶	ζ₇²	ζ₇⁵	ζ₇	ζ₇⁴	ζ₇³	ζ₇⁶	ζ₇²	ζ₇⁵	ζ₇	1	1	1	1	1	1	1	1	linear of order 7
ρ₈	1	1	ζ₇³	ζ₇⁴	ζ₇	ζ₇⁵	ζ₇²	ζ₇⁶	ζ₇³	ζ₇⁴	ζ₇	ζ₇⁵	ζ₇²	ζ₇⁶	1	1	1	1	1	1	1	1	linear of order 7
ρ₉	1	-1	ζ₇⁶	ζ₇	ζ₇²	ζ₇³	ζ₇⁴	ζ₇⁵	-ζ₇⁶	-ζ₇	-ζ₇²	-ζ₇³	-ζ₇⁴	-ζ₇⁵	1	1	1	1	-1	-1	-1	-1	linear of order 14
ρ₁₀	1	1	ζ₇²	ζ₇⁵	ζ₇³	ζ₇	ζ₇⁶	ζ₇⁴	ζ₇²	ζ₇⁵	ζ₇³	ζ₇	ζ₇⁶	ζ₇⁴	1	1	1	1	1	1	1	1	linear of order 7
ρ₁₁	1	1	ζ₇⁶	ζ₇	ζ₇²	ζ₇³	ζ₇⁴	ζ₇⁵	ζ₇⁶	ζ₇	ζ₇²	ζ₇³	ζ₇⁴	ζ₇⁵	1	1	1	1	1	1	1	1	linear of order 7
ρ₁₂	1	-1	ζ₇³	ζ₇⁴	ζ₇	ζ₇⁵	ζ₇²	ζ₇⁶	-ζ₇³	-ζ₇⁴	-ζ₇	-ζ₇⁵	-ζ₇²	-ζ₇⁶	1	1	1	1	-1	-1	-1	-1	linear of order 14
ρ₁₃	1	1	ζ₇⁵	ζ₇²	ζ₇⁴	ζ₇⁶	ζ₇	ζ₇³	ζ₇⁵	ζ₇²	ζ₇⁴	ζ₇⁶	ζ₇	ζ₇³	1	1	1	1	1	1	1	1	linear of order 7
ρ₁₄	1	1	ζ₇	ζ₇⁶	ζ₇⁵	ζ₇⁴	ζ₇³	ζ₇²	ζ₇	ζ₇⁶	ζ₇⁵	ζ₇⁴	ζ₇³	ζ₇²	1	1	1	1	1	1	1	1	linear of order 7
ρ₁₅	7	-7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	-ζ₂₉²⁵-ζ₂₉²⁴-ζ₂₉²³-ζ₂₉²⁰-ζ₂₉¹⁶-ζ₂₉⁷-ζ₂₉	-ζ₂₉²¹-ζ₂₉¹⁹-ζ₂₉¹⁷-ζ₂₉¹⁴-ζ₂₉¹¹-ζ₂₉³-ζ₂₉²	-ζ₂₉²⁸-ζ₂₉²²-ζ₂₉¹³-ζ₂₉⁹-ζ₂₉⁶-ζ₂₉⁵-ζ₂₉⁴	-ζ₂₉²⁷-ζ₂₉²⁶-ζ₂₉¹⁸-ζ₂₉¹⁵-ζ₂₉¹²-ζ₂₉¹⁰-ζ₂₉⁸	complex faithful
ρ₁₆	7	-7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	-ζ₂₉²¹-ζ₂₉¹⁹-ζ₂₉¹⁷-ζ₂₉¹⁴-ζ₂₉¹¹-ζ₂₉³-ζ₂₉²	-ζ₂₉²⁸-ζ₂₉²²-ζ₂₉¹³-ζ₂₉⁹-ζ₂₉⁶-ζ₂₉⁵-ζ₂₉⁴	-ζ₂₉²⁷-ζ₂₉²⁶-ζ₂₉¹⁸-ζ₂₉¹⁵-ζ₂₉¹²-ζ₂₉¹⁰-ζ₂₉⁸	-ζ₂₉²⁵-ζ₂₉²⁴-ζ₂₉²³-ζ₂₉²⁰-ζ₂₉¹⁶-ζ₂₉⁷-ζ₂₉	complex faithful
ρ₁₇	7	-7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	-ζ₂₉²⁸-ζ₂₉²²-ζ₂₉¹³-ζ₂₉⁹-ζ₂₉⁶-ζ₂₉⁵-ζ₂₉⁴	-ζ₂₉²⁷-ζ₂₉²⁶-ζ₂₉¹⁸-ζ₂₉¹⁵-ζ₂₉¹²-ζ₂₉¹⁰-ζ₂₉⁸	-ζ₂₉²⁵-ζ₂₉²⁴-ζ₂₉²³-ζ₂₉²⁰-ζ₂₉¹⁶-ζ₂₉⁷-ζ₂₉	-ζ₂₉²¹-ζ₂₉¹⁹-ζ₂₉¹⁷-ζ₂₉¹⁴-ζ₂₉¹¹-ζ₂₉³-ζ₂₉²	complex faithful
ρ₁₈	7	7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	complex lifted from C₂₉⋊C₇
ρ₁₉	7	7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	complex lifted from C₂₉⋊C₇
ρ₂₀	7	-7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	-ζ₂₉²⁷-ζ₂₉²⁶-ζ₂₉¹⁸-ζ₂₉¹⁵-ζ₂₉¹²-ζ₂₉¹⁰-ζ₂₉⁸	-ζ₂₉²⁵-ζ₂₉²⁴-ζ₂₉²³-ζ₂₉²⁰-ζ₂₉¹⁶-ζ₂₉⁷-ζ₂₉	-ζ₂₉²¹-ζ₂₉¹⁹-ζ₂₉¹⁷-ζ₂₉¹⁴-ζ₂₉¹¹-ζ₂₉³-ζ₂₉²	-ζ₂₉²⁸-ζ₂₉²²-ζ₂₉¹³-ζ₂₉⁹-ζ₂₉⁶-ζ₂₉⁵-ζ₂₉⁴	complex faithful
ρ₂₁	7	7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	complex lifted from C₂₉⋊C₇
ρ₂₂	7	7	0	0	0	0	0	0	0	0	0	0	0	0	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁷+ζ₂₉²⁶+ζ₂₉¹⁸+ζ₂₉¹⁵+ζ₂₉¹²+ζ₂₉¹⁰+ζ₂₉⁸	ζ₂₉²⁵+ζ₂₉²⁴+ζ₂₉²³+ζ₂₉²⁰+ζ₂₉¹⁶+ζ₂₉⁷+ζ₂₉	ζ₂₉²¹+ζ₂₉¹⁹+ζ₂₉¹⁷+ζ₂₉¹⁴+ζ₂₉¹¹+ζ₂₉³+ζ₂₉²	ζ₂₉²⁸+ζ₂₉²²+ζ₂₉¹³+ζ₂₉⁹+ζ₂₉⁶+ζ₂₉⁵+ζ₂₉⁴	complex lifted from C₂₉⋊C₇

Smallest permutation representation of C₂×C₂₉⋊C₇
►On 58 points

Generators in S₅₈

(1 30)(2 31)(3 32)(4 33)(5 34)(6 35)(7 36)(8 37)(9 38)(10 39)(11 40)(12 41)(13 42)(14 43)(15 44)(16 45)(17 46)(18 47)(19 48)(20 49)(21 50)(22 51)(23 52)(24 53)(25 54)(26 55)(27 56)(28 57)(29 58)

(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 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58)

(2 17 25 8 26 24 21)(3 4 20 15 22 18 12)(5 7 10 29 14 6 23)(9 13 19 28 27 11 16)(31 46 54 37 55 53 50)(32 33 49 44 51 47 41)(34 36 39 58 43 35 52)(38 42 48 57 56 40 45)

G:=sub<Sym(58)| (1,30)(2,31)(3,32)(4,33)(5,34)(6,35)(7,36)(8,37)(9,38)(10,39)(11,40)(12,41)(13,42)(14,43)(15,44)(16,45)(17,46)(18,47)(19,48)(20,49)(21,50)(22,51)(23,52)(24,53)(25,54)(26,55)(27,56)(28,57)(29,58), (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)(30,31,32,33,34,35,36,37,38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53,54,55,56,57,58), (2,17,25,8,26,24,21)(3,4,20,15,22,18,12)(5,7,10,29,14,6,23)(9,13,19,28,27,11,16)(31,46,54,37,55,53,50)(32,33,49,44,51,47,41)(34,36,39,58,43,35,52)(38,42,48,57,56,40,45)>;

G:=Group( (1,30)(2,31)(3,32)(4,33)(5,34)(6,35)(7,36)(8,37)(9,38)(10,39)(11,40)(12,41)(13,42)(14,43)(15,44)(16,45)(17,46)(18,47)(19,48)(20,49)(21,50)(22,51)(23,52)(24,53)(25,54)(26,55)(27,56)(28,57)(29,58), (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)(30,31,32,33,34,35,36,37,38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53,54,55,56,57,58), (2,17,25,8,26,24,21)(3,4,20,15,22,18,12)(5,7,10,29,14,6,23)(9,13,19,28,27,11,16)(31,46,54,37,55,53,50)(32,33,49,44,51,47,41)(34,36,39,58,43,35,52)(38,42,48,57,56,40,45) );

G=PermutationGroup([[(1,30),(2,31),(3,32),(4,33),(5,34),(6,35),(7,36),(8,37),(9,38),(10,39),(11,40),(12,41),(13,42),(14,43),(15,44),(16,45),(17,46),(18,47),(19,48),(20,49),(21,50),(22,51),(23,52),(24,53),(25,54),(26,55),(27,56),(28,57),(29,58)], [(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),(30,31,32,33,34,35,36,37,38,39,40,41,42,43,44,45,46,47,48,49,50,51,52,53,54,55,56,57,58)], [(2,17,25,8,26,24,21),(3,4,20,15,22,18,12),(5,7,10,29,14,6,23),(9,13,19,28,27,11,16),(31,46,54,37,55,53,50),(32,33,49,44,51,47,41),(34,36,39,58,43,35,52),(38,42,48,57,56,40,45)]])

Matrix representation of C₂×C₂₉⋊C₇ ►in GL₈(𝔽₂₄₃₇)

2436	0	0	0	0	0	0	0
0	1	0	0	0	0	0	0
0	0	1	0	0	0	0	0
0	0	0	1	0	0	0	0
0	0	0	0	1	0	0	0
0	0	0	0	0	1	0	0
0	0	0	0	0	0	1	0
0	0	0	0	0	0	0	1

1	0	0	0	0	0	0	0
0	485	744	1424	1281	1950	2174	1
0	486	744	1424	1281	1950	2174	1
0	485	745	1424	1281	1950	2174	1
0	485	744	1425	1281	1950	2174	1
0	485	744	1424	1282	1950	2174	1
0	485	744	1424	1281	1951	2174	1
0	485	744	1424	1281	1950	2175	1

492	0	0	0	0	0	0	0
0	231	2091	870	491	139	1134	2210
0	2133	2405	382	74	2330	1191	1909
0	0	1	0	0	0	0	0
0	1981	36	949	783	1279	1794	411
0	232	1126	1493	2330	2392	1386	2026
0	0	0	0	1	0	0	0
0	151	414	591	1996	1312	1570	1500

G:=sub<GL(8,GF(2437))| [2436,0,0,0,0,0,0,0,0,1,0,0,0,0,0,0,0,0,1,0,0,0,0,0,0,0,0,1,0,0,0,0,0,0,0,0,1,0,0,0,0,0,0,0,0,1,0,0,0,0,0,0,0,0,1,0,0,0,0,0,0,0,0,1],[1,0,0,0,0,0,0,0,0,485,486,485,485,485,485,485,0,744,744,745,744,744,744,744,0,1424,1424,1424,1425,1424,1424,1424,0,1281,1281,1281,1281,1282,1281,1281,0,1950,1950,1950,1950,1950,1951,1950,0,2174,2174,2174,2174,2174,2174,2175,0,1,1,1,1,1,1,1],[492,0,0,0,0,0,0,0,0,231,2133,0,1981,232,0,151,0,2091,2405,1,36,1126,0,414,0,870,382,0,949,1493,0,591,0,491,74,0,783,2330,1,1996,0,139,2330,0,1279,2392,0,1312,0,1134,1191,0,1794,1386,0,1570,0,2210,1909,0,411,2026,0,1500] >;

C₂×C₂₉⋊C₇ in GAP, Magma, Sage, TeX

C_2\times C_{29}\rtimes C_7

% in TeX

G:=Group("C2xC29:C7");

// GroupNames label

G:=SmallGroup(406,2);

// by ID

G=gap.SmallGroup(406,2);

# by ID

G:=PCGroup([3,-2,-7,-29,1013]);

// Polycyclic

G:=Group<a,b,c|a^2=b^29=c^7=1,a*b=b*a,a*c=c*a,c*b*c^-1=b^20>;

// generators/relations

Export

Subgroup lattice of C₂×C₂₉⋊C₇ in TeX
Character table of C₂×C₂₉⋊C₇ in TeX

G = C2×C29⋊C7 order 406 = 2·7·29

Direct product of C2 and C29⋊C7

G = C₂×C₂₉⋊C₇ order 406 = 2·7·29

Direct product of C₂ and C₂₉⋊C₇