| | d | ρ | Label | ID |
---|
C32 | Cyclic group | 32 | 1 | C32 | 32,1 |
D16 | Dihedral group | 16 | 2+ | D16 | 32,18 |
Q32 | Generalised quaternion group; = C16.C2 = Dic8 | 32 | 2- | Q32 | 32,20 |
2+ 1+4 | Extraspecial group; = D4○D4 | 8 | 4+ | ES+(2,2) | 32,49 |
SD32 | Semidihedral group; = C16⋊2C2 = QD32 | 16 | 2 | SD32 | 32,19 |
2- 1+4 | Gamma matrices = Extraspecial group; = D4○Q8 | 16 | 4- | ES-(2,2) | 32,50 |
M5(2) | Modular maximal-cyclic group; = C16⋊3C2 | 16 | 2 | M5(2) | 32,17 |
C4≀C2 | Wreath product of C4 by C2 | 8 | 2 | C4wrC2 | 32,11 |
C22≀C2 | Wreath product of C22 by C2 | 8 | | C2^2wrC2 | 32,27 |
C8○D4 | Central product of C8 and D4 | 16 | 2 | C8oD4 | 32,38 |
C4○D8 | Central product of C4 and D8 | 16 | 2 | C4oD8 | 32,42 |
C23⋊C4 | The semidirect product of C23 and C4 acting faithfully | 8 | 4+ | C2^3:C4 | 32,6 |
C8⋊C22 | The semidirect product of C8 and C22 acting faithfully; = Aut(D8) = Hol(C8) | 8 | 4+ | C8:C2^2 | 32,43 |
C4⋊D4 | The semidirect product of C4 and D4 acting via D4/C22=C2 | 16 | | C4:D4 | 32,28 |
C4⋊1D4 | The semidirect product of C4 and D4 acting via D4/C4=C2 | 16 | | C4:1D4 | 32,34 |
C22⋊C8 | The semidirect product of C22 and C8 acting via C8/C4=C2 | 16 | | C2^2:C8 | 32,5 |
C22⋊Q8 | The semidirect product of C22 and Q8 acting via Q8/C4=C2 | 16 | | C2^2:Q8 | 32,29 |
D4⋊C4 | 1st semidirect product of D4 and C4 acting via C4/C2=C2 | 16 | | D4:C4 | 32,9 |
C42⋊C2 | 1st semidirect product of C42 and C2 acting faithfully | 16 | | C4^2:C2 | 32,24 |
C42⋊2C2 | 2nd semidirect product of C42 and C2 acting faithfully | 16 | | C4^2:2C2 | 32,33 |
C4⋊C8 | The semidirect product of C4 and C8 acting via C8/C4=C2 | 32 | | C4:C8 | 32,12 |
C4⋊Q8 | The semidirect product of C4 and Q8 acting via Q8/C4=C2 | 32 | | C4:Q8 | 32,35 |
C8⋊C4 | 3rd semidirect product of C8 and C4 acting via C4/C2=C2 | 32 | | C8:C4 | 32,4 |
Q8⋊C4 | 1st semidirect product of Q8 and C4 acting via C4/C2=C2 | 32 | | Q8:C4 | 32,10 |
C4.D4 | 1st non-split extension by C4 of D4 acting via D4/C22=C2 | 8 | 4+ | C4.D4 | 32,7 |
C8.C4 | 1st non-split extension by C8 of C4 acting via C4/C2=C2 | 16 | 2 | C8.C4 | 32,15 |
C4.4D4 | 4th non-split extension by C4 of D4 acting via D4/C4=C2 | 16 | | C4.4D4 | 32,31 |
C8.C22 | The non-split extension by C8 of C22 acting faithfully | 16 | 4- | C8.C2^2 | 32,44 |
C4.10D4 | 2nd non-split extension by C4 of D4 acting via D4/C22=C2 | 16 | 4- | C4.10D4 | 32,8 |
C22.D4 | 3rd non-split extension by C22 of D4 acting via D4/C22=C2 | 16 | | C2^2.D4 | 32,30 |
C2.D8 | 2nd central extension by C2 of D8 | 32 | | C2.D8 | 32,14 |
C4.Q8 | 1st non-split extension by C4 of Q8 acting via Q8/C4=C2 | 32 | | C4.Q8 | 32,13 |
C2.C42 | 1st central stem extension by C2 of C42 | 32 | | C2.C4^2 | 32,2 |
C42.C2 | 4th non-split extension by C42 of C2 acting faithfully | 32 | | C4^2.C2 | 32,32 |
C25 | Elementary abelian group of type [2,2,2,2,2] | 32 | | C2^5 | 32,51 |
C4×C8 | Abelian group of type [4,8] | 32 | | C4xC8 | 32,3 |
C2×C16 | Abelian group of type [2,16] | 32 | | C2xC16 | 32,16 |
C2×C42 | Abelian group of type [2,4,4] | 32 | | C2xC4^2 | 32,21 |
C22×C8 | Abelian group of type [2,2,8] | 32 | | C2^2xC8 | 32,36 |
C23×C4 | Abelian group of type [2,2,2,4] | 32 | | C2^3xC4 | 32,45 |
C4×D4 | Direct product of C4 and D4 | 16 | | C4xD4 | 32,25 |
C2×D8 | Direct product of C2 and D8 | 16 | | C2xD8 | 32,39 |
C2×SD16 | Direct product of C2 and SD16 | 16 | | C2xSD16 | 32,40 |
C22×D4 | Direct product of C22 and D4 | 16 | | C2^2xD4 | 32,46 |
C2×M4(2) | Direct product of C2 and M4(2) | 16 | | C2xM4(2) | 32,37 |
C4×Q8 | Direct product of C4 and Q8 | 32 | | C4xQ8 | 32,26 |
C2×Q16 | Direct product of C2 and Q16 | 32 | | C2xQ16 | 32,41 |
C22×Q8 | Direct product of C22 and Q8 | 32 | | C2^2xQ8 | 32,47 |
C2×C4○D4 | Direct product of C2 and C4○D4 | 16 | | C2xC4oD4 | 32,48 |
C2×C22⋊C4 | Direct product of C2 and C22⋊C4 | 16 | | C2xC2^2:C4 | 32,22 |
C2×C4⋊C4 | Direct product of C2 and C4⋊C4 | 32 | | C2xC4:C4 | 32,23 |
| | d | ρ | Label | ID |
---|
C64 | Cyclic group | 64 | 1 | C64 | 64,1 |
D32 | Dihedral group | 32 | 2+ | D32 | 64,52 |
Q64 | Generalised quaternion group; = C32.C2 = Dic16 | 64 | 2- | Q64 | 64,54 |
SD64 | Semidihedral group; = C32⋊2C2 = QD64 | 32 | 2 | SD64 | 64,53 |
M6(2) | Modular maximal-cyclic group; = C32⋊3C2 | 32 | 2 | M6(2) | 64,51 |
C2≀C4 | Wreath product of C2 by C4; = AΣL1(𝔽16) | 8 | 4+ | C2wrC4 | 64,32 |
C2≀C22 | Wreath product of C2 by C22; = Hol(C2×C4) | 8 | 4+ | C2wrC2^2 | 64,138 |
C8○D8 | Central product of C8 and D8 | 16 | 2 | C8oD8 | 64,124 |
D4○D8 | Central product of D4 and D8 | 16 | 4+ | D4oD8 | 64,257 |
D4○SD16 | Central product of D4 and SD16 | 16 | 4 | D4oSD16 | 64,258 |
Q8○M4(2) | Central product of Q8 and M4(2) | 16 | 4 | Q8oM4(2) | 64,249 |
Q8○D8 | Central product of Q8 and D8 | 32 | 4- | Q8oD8 | 64,259 |
D4○C16 | Central product of D4 and C16 | 32 | 2 | D4oC16 | 64,185 |
C4○D16 | Central product of C4 and D16 | 32 | 2 | C4oD16 | 64,189 |
C8○2M4(2) | Central product of C8 and M4(2) | 32 | | C8o2M4(2) | 64,86 |
D4⋊4D4 | 3rd semidirect product of D4 and D4 acting via D4/C22=C2; = Hol(D4) | 8 | 4+ | D4:4D4 | 64,134 |
C42⋊C4 | 2nd semidirect product of C42 and C4 acting faithfully | 8 | 4+ | C4^2:C4 | 64,34 |
C23⋊C8 | The semidirect product of C23 and C8 acting via C8/C2=C4 | 16 | | C2^3:C8 | 64,4 |
C16⋊C4 | 2nd semidirect product of C16 and C4 acting faithfully | 16 | 4 | C16:C4 | 64,28 |
D8⋊2C4 | 2nd semidirect product of D8 and C4 acting via C4/C2=C2 | 16 | 4 | D8:2C4 | 64,41 |
D4⋊5D4 | 1st semidirect product of D4 and D4 acting through Inn(D4) | 16 | | D4:5D4 | 64,227 |
C16⋊C22 | The semidirect product of C16 and C22 acting faithfully | 16 | 4+ | C16:C2^2 | 64,190 |
C42⋊6C4 | 3rd semidirect product of C42 and C4 acting via C4/C2=C2 | 16 | | C4^2:6C4 | 64,20 |
C42⋊3C4 | 3rd semidirect product of C42 and C4 acting faithfully | 16 | 4 | C4^2:3C4 | 64,35 |
C24⋊3C4 | 1st semidirect product of C24 and C4 acting via C4/C2=C2 | 16 | | C2^4:3C4 | 64,60 |
C22⋊D8 | The semidirect product of C22 and D8 acting via D8/D4=C2 | 16 | | C2^2:D8 | 64,128 |
C23⋊3D4 | 2nd semidirect product of C23 and D4 acting via D4/C2=C22 | 16 | | C2^3:3D4 | 64,215 |
C23⋊2Q8 | 2nd semidirect product of C23 and Q8 acting via Q8/C2=C22 | 16 | | C2^3:2Q8 | 64,224 |
D8⋊C22 | 4th semidirect product of D8 and C22 acting via C22/C2=C2 | 16 | 4 | D8:C2^2 | 64,256 |
M4(2)⋊4C4 | 4th semidirect product of M4(2) and C4 acting via C4/C2=C2 | 16 | 4 | M4(2):4C4 | 64,25 |
M5(2)⋊C2 | 6th semidirect product of M5(2) and C2 acting faithfully | 16 | 4+ | M5(2):C2 | 64,42 |
C42⋊C22 | 1st semidirect product of C42 and C22 acting faithfully | 16 | 4 | C4^2:C2^2 | 64,102 |
C24⋊C22 | 4th semidirect product of C24 and C22 acting faithfully | 16 | | C2^4:C2^2 | 64,242 |
C22⋊SD16 | The semidirect product of C22 and SD16 acting via SD16/D4=C2 | 16 | | C2^2:SD16 | 64,131 |
D4⋊C8 | The semidirect product of D4 and C8 acting via C8/C4=C2 | 32 | | D4:C8 | 64,6 |
C8⋊9D4 | 3rd semidirect product of C8 and D4 acting via D4/C22=C2 | 32 | | C8:9D4 | 64,116 |
C8⋊6D4 | 3rd semidirect product of C8 and D4 acting via D4/C4=C2 | 32 | | C8:6D4 | 64,117 |
C4⋊D8 | The semidirect product of C4 and D8 acting via D8/D4=C2 | 32 | | C4:D8 | 64,140 |
C8⋊8D4 | 2nd semidirect product of C8 and D4 acting via D4/C22=C2 | 32 | | C8:8D4 | 64,146 |
C8⋊7D4 | 1st semidirect product of C8 and D4 acting via D4/C22=C2 | 32 | | C8:7D4 | 64,147 |
C8⋊D4 | 1st semidirect product of C8 and D4 acting via D4/C2=C22 | 32 | | C8:D4 | 64,149 |
C8⋊2D4 | 2nd semidirect product of C8 and D4 acting via D4/C2=C22 | 32 | | C8:2D4 | 64,150 |
C8⋊5D4 | 2nd semidirect product of C8 and D4 acting via D4/C4=C2 | 32 | | C8:5D4 | 64,173 |
C8⋊4D4 | 1st semidirect product of C8 and D4 acting via D4/C4=C2 | 32 | | C8:4D4 | 64,174 |
C8⋊3D4 | 3rd semidirect product of C8 and D4 acting via D4/C2=C22 | 32 | | C8:3D4 | 64,177 |
D8⋊C4 | 3rd semidirect product of D8 and C4 acting via C4/C2=C2; = Aut(SD32) | 32 | | D8:C4 | 64,123 |
D4⋊D4 | 2nd semidirect product of D4 and D4 acting via D4/C22=C2 | 32 | | D4:D4 | 64,130 |
D4⋊6D4 | 2nd semidirect product of D4 and D4 acting through Inn(D4) | 32 | | D4:6D4 | 64,228 |
C22⋊C16 | The semidirect product of C22 and C16 acting via C16/C8=C2 | 32 | | C2^2:C16 | 64,29 |
Q8⋊D4 | 1st semidirect product of Q8 and D4 acting via D4/C22=C2 | 32 | | Q8:D4 | 64,129 |
D4⋊Q8 | 1st semidirect product of D4 and Q8 acting via Q8/C4=C2 | 32 | | D4:Q8 | 64,155 |
D4⋊2Q8 | 2nd semidirect product of D4 and Q8 acting via Q8/C4=C2 | 32 | | D4:2Q8 | 64,157 |
Q8⋊5D4 | 1st semidirect product of Q8 and D4 acting through Inn(Q8) | 32 | | Q8:5D4 | 64,229 |
Q8⋊6D4 | 2nd semidirect product of Q8 and D4 acting through Inn(Q8) | 32 | | Q8:6D4 | 64,231 |
D4⋊3Q8 | The semidirect product of D4 and Q8 acting through Inn(D4) | 32 | | D4:3Q8 | 64,235 |
Q32⋊C2 | 2nd semidirect product of Q32 and C2 acting faithfully | 32 | 4- | Q32:C2 | 64,191 |
C4⋊SD16 | The semidirect product of C4 and SD16 acting via SD16/Q8=C2 | 32 | | C4:SD16 | 64,141 |
C23⋊2D4 | 1st semidirect product of C23 and D4 acting via D4/C2=C22 | 32 | | C2^3:2D4 | 64,73 |
C23⋊Q8 | 1st semidirect product of C23 and Q8 acting via Q8/C2=C22 | 32 | | C2^3:Q8 | 64,74 |
SD16⋊C4 | 1st semidirect product of SD16 and C4 acting via C4/C2=C2 | 32 | | SD16:C4 | 64,121 |
C4⋊M4(2) | The semidirect product of C4 and M4(2) acting via M4(2)/C2×C4=C2 | 32 | | C4:M4(2) | 64,104 |
C22⋊Q16 | The semidirect product of C22 and Q16 acting via Q16/Q8=C2 | 32 | | C2^2:Q16 | 64,132 |
M4(2)⋊C4 | 1st semidirect product of M4(2) and C4 acting via C4/C2=C2 | 32 | | M4(2):C4 | 64,109 |
C8⋊Q8 | The semidirect product of C8 and Q8 acting via Q8/C2=C22 | 64 | | C8:Q8 | 64,182 |
C4⋊C16 | The semidirect product of C4 and C16 acting via C16/C8=C2 | 64 | | C4:C16 | 64,44 |
Q8⋊C8 | The semidirect product of Q8 and C8 acting via C8/C4=C2 | 64 | | Q8:C8 | 64,7 |
C8⋊C8 | 3rd semidirect product of C8 and C8 acting via C8/C4=C2 | 64 | | C8:C8 | 64,3 |
C8⋊2C8 | 2nd semidirect product of C8 and C8 acting via C8/C4=C2 | 64 | | C8:2C8 | 64,15 |
C8⋊1C8 | 1st semidirect product of C8 and C8 acting via C8/C4=C2 | 64 | | C8:1C8 | 64,16 |
C8⋊4Q8 | 3rd semidirect product of C8 and Q8 acting via Q8/C4=C2 | 64 | | C8:4Q8 | 64,127 |
C8⋊3Q8 | 2nd semidirect product of C8 and Q8 acting via Q8/C4=C2 | 64 | | C8:3Q8 | 64,179 |
C8⋊2Q8 | 1st semidirect product of C8 and Q8 acting via Q8/C4=C2 | 64 | | C8:2Q8 | 64,181 |
C16⋊5C4 | 3rd semidirect product of C16 and C4 acting via C4/C2=C2 | 64 | | C16:5C4 | 64,27 |
C16⋊3C4 | 1st semidirect product of C16 and C4 acting via C4/C2=C2 | 64 | | C16:3C4 | 64,47 |
C16⋊4C4 | 2nd semidirect product of C16 and C4 acting via C4/C2=C2 | 64 | | C16:4C4 | 64,48 |
Q8⋊Q8 | 1st semidirect product of Q8 and Q8 acting via Q8/C4=C2 | 64 | | Q8:Q8 | 64,156 |
Q8⋊3Q8 | The semidirect product of Q8 and Q8 acting through Inn(Q8) | 64 | | Q8:3Q8 | 64,238 |
C4⋊2Q16 | The semidirect product of C4 and Q16 acting via Q16/Q8=C2 | 64 | | C4:2Q16 | 64,143 |
C4⋊Q16 | The semidirect product of C4 and Q16 acting via Q16/C8=C2 | 64 | | C4:Q16 | 64,175 |
C42⋊4C4 | 1st semidirect product of C42 and C4 acting via C4/C2=C2 | 64 | | C4^2:4C4 | 64,57 |
C42⋊8C4 | 5th semidirect product of C42 and C4 acting via C4/C2=C2 | 64 | | C4^2:8C4 | 64,63 |
C42⋊5C4 | 2nd semidirect product of C42 and C4 acting via C4/C2=C2 | 64 | | C4^2:5C4 | 64,64 |
C42⋊9C4 | 6th semidirect product of C42 and C4 acting via C4/C2=C2 | 64 | | C4^2:9C4 | 64,65 |
Q16⋊C4 | 3rd semidirect product of Q16 and C4 acting via C4/C2=C2 | 64 | | Q16:C4 | 64,122 |
(C22×C8)⋊C2 | 2nd semidirect product of C22×C8 and C2 acting faithfully | 32 | | (C2^2xC8):C2 | 64,89 |
C8.Q8 | The non-split extension by C8 of Q8 acting via Q8/C2=C22 | 16 | 4 | C8.Q8 | 64,46 |
C8.C8 | 1st non-split extension by C8 of C8 acting via C8/C4=C2 | 16 | 2 | C8.C8 | 64,45 |
C23.C8 | The non-split extension by C23 of C8 acting via C8/C2=C4 | 16 | 4 | C2^3.C8 | 64,30 |
D4.8D4 | 3rd non-split extension by D4 of D4 acting via D4/C22=C2 | 16 | 4 | D4.8D4 | 64,135 |
D4.9D4 | 4th non-split extension by D4 of D4 acting via D4/C22=C2 | 16 | 4 | D4.9D4 | 64,136 |
D4.3D4 | 3rd non-split extension by D4 of D4 acting via D4/C4=C2 | 16 | 4 | D4.3D4 | 64,152 |
D4.4D4 | 4th non-split extension by D4 of D4 acting via D4/C4=C2 | 16 | 4+ | D4.4D4 | 64,153 |
C8.26D4 | 13rd non-split extension by C8 of D4 acting via D4/C22=C2 | 16 | 4 | C8.26D4 | 64,125 |
D4.10D4 | 5th non-split extension by D4 of D4 acting via D4/C22=C2 | 16 | 4- | D4.10D4 | 64,137 |
C4.9C42 | 1st central stem extension by C4 of C42 | 16 | 4 | C4.9C4^2 | 64,18 |
C42.C4 | 2nd non-split extension by C42 of C4 acting faithfully | 16 | 4 | C4^2.C4 | 64,36 |
C42.3C4 | 3rd non-split extension by C42 of C4 acting faithfully | 16 | 4- | C4^2.3C4 | 64,37 |
C24.4C4 | 2nd non-split extension by C24 of C4 acting via C4/C2=C2 | 16 | | C2^4.4C4 | 64,88 |
C2.C25 | 6th central stem extension by C2 of C25 | 16 | 4 | C2.C2^5 | 64,266 |
C23.9D4 | 2nd non-split extension by C23 of D4 acting via D4/C2=C22 | 16 | | C2^3.9D4 | 64,23 |
C23.D4 | 2nd non-split extension by C23 of D4 acting faithfully | 16 | 4 | C2^3.D4 | 64,33 |
C23.7D4 | 7th non-split extension by C23 of D4 acting faithfully | 16 | 4 | C2^3.7D4 | 64,139 |
C4.10C42 | 2nd central stem extension by C4 of C42 | 16 | 4 | C4.10C4^2 | 64,19 |
C23.31D4 | 2nd non-split extension by C23 of D4 acting via D4/C22=C2 | 16 | | C2^3.31D4 | 64,9 |
C23.37D4 | 8th non-split extension by C23 of D4 acting via D4/C22=C2 | 16 | | C2^3.37D4 | 64,99 |
M4(2).C4 | 1st non-split extension by M4(2) of C4 acting via C4/C2=C2 | 16 | 4 | M4(2).C4 | 64,111 |
C23.C23 | 2nd non-split extension by C23 of C23 acting via C23/C2=C22 | 16 | 4 | C2^3.C2^3 | 64,91 |
C22.SD16 | 1st non-split extension by C22 of SD16 acting via SD16/Q8=C2 | 16 | | C2^2.SD16 | 64,8 |
C22.11C24 | 7th central extension by C22 of C24 | 16 | | C2^2.11C2^4 | 64,199 |
C22.19C24 | 5th central stem extension by C22 of C24 | 16 | | C2^2.19C2^4 | 64,206 |
C22.29C24 | 15th central stem extension by C22 of C24 | 16 | | C2^2.29C2^4 | 64,216 |
C22.32C24 | 18th central stem extension by C22 of C24 | 16 | | C2^2.32C2^4 | 64,219 |
C22.45C24 | 31st central stem extension by C22 of C24 | 16 | | C2^2.45C2^4 | 64,232 |
C22.54C24 | 40th central stem extension by C22 of C24 | 16 | | C2^2.54C2^4 | 64,241 |
M4(2).8C22 | 3rd non-split extension by M4(2) of C22 acting via C22/C2=C2 | 16 | 4 | M4(2).8C2^2 | 64,94 |
D4.C8 | The non-split extension by D4 of C8 acting via C8/C4=C2 | 32 | 2 | D4.C8 | 64,31 |
D4.Q8 | The non-split extension by D4 of Q8 acting via Q8/C4=C2 | 32 | | D4.Q8 | 64,159 |
C4.D8 | 1st non-split extension by C4 of D8 acting via D8/D4=C2 | 32 | | C4.D8 | 64,12 |
C8.D4 | 1st non-split extension by C8 of D4 acting via D4/C2=C22 | 32 | | C8.D4 | 64,151 |
C4.4D8 | 4th non-split extension by C4 of D8 acting via D8/C8=C2 | 32 | | C4.4D8 | 64,167 |
C8.2D4 | 2nd non-split extension by C8 of D4 acting via D4/C2=C22 | 32 | | C8.2D4 | 64,178 |
C8.4Q8 | 3rd non-split extension by C8 of Q8 acting via Q8/C4=C2 | 32 | 2 | C8.4Q8 | 64,49 |
D8.C4 | 1st non-split extension by D8 of C4 acting via C4/C2=C2 | 32 | 2 | D8.C4 | 64,40 |
D4.7D4 | 2nd non-split extension by D4 of D4 acting via D4/C22=C2 | 32 | | D4.7D4 | 64,133 |
D4.D4 | 1st non-split extension by D4 of D4 acting via D4/C4=C2 | 32 | | D4.D4 | 64,142 |
D4.2D4 | 2nd non-split extension by D4 of D4 acting via D4/C4=C2 | 32 | | D4.2D4 | 64,144 |
D4.5D4 | 5th non-split extension by D4 of D4 acting via D4/C4=C2 | 32 | 4- | D4.5D4 | 64,154 |
C2.D16 | 1st central extension by C2 of D16 | 32 | | C2.D16 | 64,38 |
C8.17D4 | 4th non-split extension by C8 of D4 acting via D4/C22=C2 | 32 | 4- | C8.17D4 | 64,43 |
C8.18D4 | 5th non-split extension by C8 of D4 acting via D4/C22=C2 | 32 | | C8.18D4 | 64,148 |
C8.12D4 | 8th non-split extension by C8 of D4 acting via D4/C4=C2 | 32 | | C8.12D4 | 64,176 |
Q8.D4 | 2nd non-split extension by Q8 of D4 acting via D4/C4=C2 | 32 | | Q8.D4 | 64,145 |
C4.C42 | 3rd non-split extension by C4 of C42 acting via C42/C2×C4=C2 | 32 | | C4.C4^2 | 64,22 |
C42.6C4 | 3rd non-split extension by C42 of C4 acting via C4/C2=C2 | 32 | | C4^2.6C4 | 64,113 |
C22.D8 | 3rd non-split extension by C22 of D8 acting via D8/D4=C2 | 32 | | C2^2.D8 | 64,161 |
C23.7Q8 | 2nd non-split extension by C23 of Q8 acting via Q8/C4=C2 | 32 | | C2^3.7Q8 | 64,61 |
C23.8Q8 | 3rd non-split extension by C23 of Q8 acting via Q8/C4=C2 | 32 | | C2^3.8Q8 | 64,66 |
C23.Q8 | 3rd non-split extension by C23 of Q8 acting via Q8/C2=C22 | 32 | | C2^3.Q8 | 64,77 |
C23.4Q8 | 4th non-split extension by C23 of Q8 acting via Q8/C2=C22 | 32 | | C2^3.4Q8 | 64,80 |
C42.12C4 | 9th non-split extension by C42 of C4 acting via C4/C2=C2 | 32 | | C4^2.12C4 | 64,112 |
C23.34D4 | 5th non-split extension by C23 of D4 acting via D4/C22=C2 | 32 | | C2^3.34D4 | 64,62 |
C23.23D4 | 2nd non-split extension by C23 of D4 acting via D4/C4=C2 | 32 | | C2^3.23D4 | 64,67 |
C23.10D4 | 3rd non-split extension by C23 of D4 acting via D4/C2=C22 | 32 | | C2^3.10D4 | 64,75 |
C23.11D4 | 4th non-split extension by C23 of D4 acting via D4/C2=C22 | 32 | | C2^3.11D4 | 64,78 |
C23.24D4 | 3rd non-split extension by C23 of D4 acting via D4/C4=C2 | 32 | | C2^3.24D4 | 64,97 |
C23.36D4 | 7th non-split extension by C23 of D4 acting via D4/C22=C2 | 32 | | C2^3.36D4 | 64,98 |
C23.38D4 | 9th non-split extension by C23 of D4 acting via D4/C22=C2 | 32 | | C2^3.38D4 | 64,100 |
C23.25D4 | 4th non-split extension by C23 of D4 acting via D4/C4=C2 | 32 | | C2^3.25D4 | 64,108 |
C23.46D4 | 17th non-split extension by C23 of D4 acting via D4/C22=C2 | 32 | | C2^3.46D4 | 64,162 |
C23.19D4 | 12nd non-split extension by C23 of D4 acting via D4/C2=C22 | 32 | | C2^3.19D4 | 64,163 |
C23.47D4 | 18th non-split extension by C23 of D4 acting via D4/C22=C2 | 32 | | C2^3.47D4 | 64,164 |
C23.48D4 | 19th non-split extension by C23 of D4 acting via D4/C22=C2 | 32 | | C2^3.48D4 | 64,165 |
C23.20D4 | 13rd non-split extension by C23 of D4 acting via D4/C2=C22 | 32 | | C2^3.20D4 | 64,166 |
C42.C22 | 1st non-split extension by C42 of C22 acting faithfully | 32 | | C4^2.C2^2 | 64,10 |
C22.C42 | 2nd non-split extension by C22 of C42 acting via C42/C2×C4=C2 | 32 | | C2^2.C4^2 | 64,24 |
C24.C22 | 2nd non-split extension by C24 of C22 acting faithfully | 32 | | C2^4.C2^2 | 64,69 |
C24.3C22 | 3rd non-split extension by C24 of C22 acting faithfully | 32 | | C2^4.3C2^2 | 64,71 |
C42.6C22 | 6th non-split extension by C42 of C22 acting faithfully | 32 | | C4^2.6C2^2 | 64,105 |
C42.7C22 | 7th non-split extension by C42 of C22 acting faithfully | 32 | | C4^2.7C2^2 | 64,114 |
C42.78C22 | 21st non-split extension by C42 of C22 acting via C22/C2=C2 | 32 | | C4^2.78C2^2 | 64,169 |
C42.28C22 | 28th non-split extension by C42 of C22 acting faithfully | 32 | | C4^2.28C2^2 | 64,170 |
C42.29C22 | 29th non-split extension by C42 of C22 acting faithfully | 32 | | C4^2.29C2^2 | 64,171 |
C23.32C23 | 5th non-split extension by C23 of C23 acting via C23/C22=C2 | 32 | | C2^3.32C2^3 | 64,200 |
C23.33C23 | 6th non-split extension by C23 of C23 acting via C23/C22=C2 | 32 | | C2^3.33C2^3 | 64,201 |
C23.36C23 | 9th non-split extension by C23 of C23 acting via C23/C22=C2 | 32 | | C2^3.36C2^3 | 64,210 |
C22.26C24 | 12nd central stem extension by C22 of C24 | 32 | | C2^2.26C2^4 | 64,213 |
C23.37C23 | 10th non-split extension by C23 of C23 acting via C23/C22=C2 | 32 | | C2^3.37C2^3 | 64,214 |
C23.38C23 | 11st non-split extension by C23 of C23 acting via C23/C22=C2 | 32 | | C2^3.38C2^3 | 64,217 |
C22.31C24 | 17th central stem extension by C22 of C24 | 32 | | C2^2.31C2^4 | 64,218 |
C22.33C24 | 19th central stem extension by C22 of C24 | 32 | | C2^2.33C2^4 | 64,220 |
C22.34C24 | 20th central stem extension by C22 of C24 | 32 | | C2^2.34C2^4 | 64,221 |
C22.35C24 | 21st central stem extension by C22 of C24 | 32 | | C2^2.35C2^4 | 64,222 |
C22.36C24 | 22nd central stem extension by C22 of C24 | 32 | | C2^2.36C2^4 | 64,223 |
C23.41C23 | 14th non-split extension by C23 of C23 acting via C23/C22=C2 | 32 | | C2^3.41C2^3 | 64,225 |
C22.46C24 | 32nd central stem extension by C22 of C24 | 32 | | C2^2.46C2^4 | 64,233 |
C22.47C24 | 33rd central stem extension by C22 of C24 | 32 | | C2^2.47C2^4 | 64,234 |
C22.49C24 | 35th central stem extension by C22 of C24 | 32 | | C2^2.49C2^4 | 64,236 |
C22.50C24 | 36th central stem extension by C22 of C24 | 32 | | C2^2.50C2^4 | 64,237 |
C22.53C24 | 39th central stem extension by C22 of C24 | 32 | | C2^2.53C2^4 | 64,240 |
C22.56C24 | 42nd central stem extension by C22 of C24 | 32 | | C2^2.56C2^4 | 64,243 |
C22.57C24 | 43rd central stem extension by C22 of C24 | 32 | | C2^2.57C2^4 | 64,244 |
C22.M4(2) | 2nd non-split extension by C22 of M4(2) acting via M4(2)/C2×C4=C2 | 32 | | C2^2.M4(2) | 64,5 |
Q8.Q8 | The non-split extension by Q8 of Q8 acting via Q8/C4=C2 | 64 | | Q8.Q8 | 64,160 |
C8.5Q8 | 4th non-split extension by C8 of Q8 acting via Q8/C4=C2 | 64 | | C8.5Q8 | 64,180 |
C4.10D8 | 2nd non-split extension by C4 of D8 acting via D8/D4=C2 | 64 | | C4.10D8 | 64,13 |
C4.6Q16 | 2nd non-split extension by C4 of Q16 acting via Q16/Q8=C2 | 64 | | C4.6Q16 | 64,14 |
C2.Q32 | 1st central extension by C2 of Q32 | 64 | | C2.Q32 | 64,39 |
C4.Q16 | 3rd non-split extension by C4 of Q16 acting via Q16/Q8=C2 | 64 | | C4.Q16 | 64,158 |
C4.SD16 | 4th non-split extension by C4 of SD16 acting via SD16/C8=C2 | 64 | | C4.SD16 | 64,168 |
C22.4Q16 | 1st central extension by C22 of Q16 | 64 | | C2^2.4Q16 | 64,21 |
C42.2C22 | 2nd non-split extension by C42 of C22 acting faithfully | 64 | | C4^2.2C2^2 | 64,11 |
C22.7C42 | 2nd central extension by C22 of C42 | 64 | | C2^2.7C4^2 | 64,17 |
C23.63C23 | 13rd central extension by C23 of C23 | 64 | | C2^3.63C2^3 | 64,68 |
C23.65C23 | 15th central extension by C23 of C23 | 64 | | C2^3.65C2^3 | 64,70 |
C23.67C23 | 17th central extension by C23 of C23 | 64 | | C2^3.67C2^3 | 64,72 |
C23.78C23 | 4th central stem extension by C23 of C23 | 64 | | C2^3.78C2^3 | 64,76 |
C23.81C23 | 7th central stem extension by C23 of C23 | 64 | | C2^3.81C2^3 | 64,79 |
C23.83C23 | 9th central stem extension by C23 of C23 | 64 | | C2^3.83C2^3 | 64,81 |
C23.84C23 | 10th central stem extension by C23 of C23 | 64 | | C2^3.84C2^3 | 64,82 |
C42.30C22 | 30th non-split extension by C42 of C22 acting faithfully | 64 | | C4^2.30C2^2 | 64,172 |
C22.58C24 | 44th central stem extension by C22 of C24 | 64 | | C2^2.58C2^4 | 64,245 |
C82 | Abelian group of type [8,8] | 64 | | C8^2 | 64,2 |
C43 | Abelian group of type [4,4,4] | 64 | | C4^3 | 64,55 |
C26 | Elementary abelian group of type [2,2,2,2,2,2] | 64 | | C2^6 | 64,267 |
C4×C16 | Abelian group of type [4,16] | 64 | | C4xC16 | 64,26 |
C2×C32 | Abelian group of type [2,32] | 64 | | C2xC32 | 64,50 |
C23×C8 | Abelian group of type [2,2,2,8] | 64 | | C2^3xC8 | 64,246 |
C24×C4 | Abelian group of type [2,2,2,2,4] | 64 | | C2^4xC4 | 64,260 |
C22×C16 | Abelian group of type [2,2,16] | 64 | | C2^2xC16 | 64,183 |
C22×C42 | Abelian group of type [2,2,4,4] | 64 | | C2^2xC4^2 | 64,192 |
C2×C4×C8 | Abelian group of type [2,4,8] | 64 | | C2xC4xC8 | 64,83 |
D42 | Direct product of D4 and D4 | 16 | | D4^2 | 64,226 |
C2×2+ 1+4 | Direct product of C2 and 2+ 1+4 | 16 | | C2xES+(2,2) | 64,264 |
C8×D4 | Direct product of C8 and D4 | 32 | | C8xD4 | 64,115 |
C4×D8 | Direct product of C4 and D8 | 32 | | C4xD8 | 64,118 |
D4×Q8 | Direct product of D4 and Q8 | 32 | | D4xQ8 | 64,230 |
C2×D16 | Direct product of C2 and D16 | 32 | | C2xD16 | 64,186 |
C4×SD16 | Direct product of C4 and SD16 | 32 | | C4xSD16 | 64,119 |
C2×SD32 | Direct product of C2 and SD32 | 32 | | C2xSD32 | 64,187 |
C22×D8 | Direct product of C22 and D8 | 32 | | C2^2xD8 | 64,250 |
D4×C23 | Direct product of C23 and D4 | 32 | | D4xC2^3 | 64,261 |
C4×M4(2) | Direct product of C4 and M4(2) | 32 | | C4xM4(2) | 64,85 |
C2×M5(2) | Direct product of C2 and M5(2) | 32 | | C2xM5(2) | 64,184 |
C22×SD16 | Direct product of C22 and SD16 | 32 | | C2^2xSD16 | 64,251 |
C22×M4(2) | Direct product of C22 and M4(2) | 32 | | C2^2xM4(2) | 64,247 |
C2×2- 1+4 | Direct product of C2 and 2- 1+4 | 32 | | C2xES-(2,2) | 64,265 |
Q82 | Direct product of Q8 and Q8 | 64 | | Q8^2 | 64,239 |
C8×Q8 | Direct product of C8 and Q8 | 64 | | C8xQ8 | 64,126 |
C4×Q16 | Direct product of C4 and Q16 | 64 | | C4xQ16 | 64,120 |
C2×Q32 | Direct product of C2 and Q32 | 64 | | C2xQ32 | 64,188 |
Q8×C23 | Direct product of C23 and Q8 | 64 | | Q8xC2^3 | 64,262 |
C22×Q16 | Direct product of C22 and Q16 | 64 | | C2^2xQ16 | 64,252 |
C2×C4≀C2 | Direct product of C2 and C4≀C2 | 16 | | C2xC4wrC2 | 64,101 |
C2×C23⋊C4 | Direct product of C2 and C23⋊C4 | 16 | | C2xC2^3:C4 | 64,90 |
C2×C8⋊C22 | Direct product of C2 and C8⋊C22 | 16 | | C2xC8:C2^2 | 64,254 |
C2×C4.D4 | Direct product of C2 and C4.D4 | 16 | | C2xC4.D4 | 64,92 |
C2×C22≀C2 | Direct product of C2 and C22≀C2 | 16 | | C2xC2^2wrC2 | 64,202 |
C2×C4×D4 | Direct product of C2×C4 and D4 | 32 | | C2xC4xD4 | 64,196 |
C4×C4○D4 | Direct product of C4 and C4○D4 | 32 | | C4xC4oD4 | 64,198 |
C2×C8○D4 | Direct product of C2 and C8○D4 | 32 | | C2xC8oD4 | 64,248 |
C2×C4○D8 | Direct product of C2 and C4○D8 | 32 | | C2xC4oD8 | 64,253 |
C2×C4⋊D4 | Direct product of C2 and C4⋊D4 | 32 | | C2xC4:D4 | 64,203 |
C2×D4⋊C4 | Direct product of C2 and D4⋊C4 | 32 | | C2xD4:C4 | 64,95 |
C2×C8.C4 | Direct product of C2 and C8.C4 | 32 | | C2xC8.C4 | 64,110 |
C2×C4⋊1D4 | Direct product of C2 and C4⋊1D4 | 32 | | C2xC4:1D4 | 64,211 |
C4×C22⋊C4 | Direct product of C4 and C22⋊C4 | 32 | | C4xC2^2:C4 | 64,58 |
C2×C22⋊C8 | Direct product of C2 and C22⋊C8 | 32 | | C2xC2^2:C8 | 64,87 |
C2×C22⋊Q8 | Direct product of C2 and C22⋊Q8 | 32 | | C2xC2^2:Q8 | 64,204 |
C2×C42⋊C2 | Direct product of C2 and C42⋊C2 | 32 | | C2xC4^2:C2 | 64,195 |
C2×C4.4D4 | Direct product of C2 and C4.4D4 | 32 | | C2xC4.4D4 | 64,207 |
C22×C4○D4 | Direct product of C22 and C4○D4 | 32 | | C2^2xC4oD4 | 64,263 |
C2×C8.C22 | Direct product of C2 and C8.C22 | 32 | | C2xC8.C2^2 | 64,255 |
C2×C42⋊2C2 | Direct product of C2 and C42⋊2C2 | 32 | | C2xC4^2:2C2 | 64,209 |
C2×C4.10D4 | Direct product of C2 and C4.10D4 | 32 | | C2xC4.10D4 | 64,93 |
C22×C22⋊C4 | Direct product of C22 and C22⋊C4 | 32 | | C2^2xC2^2:C4 | 64,193 |
C2×C22.D4 | Direct product of C2 and C22.D4 | 32 | | C2xC2^2.D4 | 64,205 |
C4×C4⋊C4 | Direct product of C4 and C4⋊C4 | 64 | | C4xC4:C4 | 64,59 |
C2×C4⋊C8 | Direct product of C2 and C4⋊C8 | 64 | | C2xC4:C8 | 64,103 |
C2×C4×Q8 | Direct product of C2×C4 and Q8 | 64 | | C2xC4xQ8 | 64,197 |
C2×C4⋊Q8 | Direct product of C2 and C4⋊Q8 | 64 | | C2xC4:Q8 | 64,212 |
C2×C8⋊C4 | Direct product of C2 and C8⋊C4 | 64 | | C2xC8:C4 | 64,84 |
C22×C4⋊C4 | Direct product of C22 and C4⋊C4 | 64 | | C2^2xC4:C4 | 64,194 |
C2×Q8⋊C4 | Direct product of C2 and Q8⋊C4 | 64 | | C2xQ8:C4 | 64,96 |
C2×C2.D8 | Direct product of C2 and C2.D8 | 64 | | C2xC2.D8 | 64,107 |
C2×C4.Q8 | Direct product of C2 and C4.Q8 | 64 | | C2xC4.Q8 | 64,106 |
C2×C2.C42 | Direct product of C2 and C2.C42 | 64 | | C2xC2.C4^2 | 64,56 |
C2×C42.C2 | Direct product of C2 and C42.C2 | 64 | | C2xC4^2.C2 | 64,208 |
| | d | ρ | Label | ID |
---|
C96 | Cyclic group | 96 | 1 | C96 | 96,2 |
D48 | Dihedral group | 48 | 2+ | D48 | 96,6 |
Dic24 | Dicyclic group; = C3⋊1Q32 | 96 | 2- | Dic24 | 96,8 |
D4○D12 | Central product of D4 and D12 | 24 | 4+ | D4oD12 | 96,216 |
C8○D12 | Central product of C8 and D12 | 48 | 2 | C8oD12 | 96,108 |
C4○D24 | Central product of C4 and D24 | 48 | 2 | C4oD24 | 96,111 |
Q8○D12 | Central product of Q8 and D12 | 48 | 4- | Q8oD12 | 96,217 |
C8⋊D6 | 1st semidirect product of C8 and D6 acting via D6/C3=C22 | 24 | 4+ | C8:D6 | 96,115 |
D6⋊D4 | 1st semidirect product of D6 and D4 acting via D4/C22=C2 | 24 | | D6:D4 | 96,89 |
D8⋊S3 | 2nd semidirect product of D8 and S3 acting via S3/C3=C2 | 24 | 4 | D8:S3 | 96,118 |
D4⋊D6 | 2nd semidirect product of D4 and D6 acting via D6/C6=C2 | 24 | 4+ | D4:D6 | 96,156 |
D4⋊6D6 | 2nd semidirect product of D4 and D6 acting through Inn(D4) | 24 | 4 | D4:6D6 | 96,211 |
Q8⋊3D6 | 2nd semidirect product of Q8 and D6 acting via D6/S3=C2 | 24 | 4+ | Q8:3D6 | 96,121 |
D12⋊C4 | 4th semidirect product of D12 and C4 acting via C4/C2=C2 | 24 | 4 | D12:C4 | 96,32 |
C42⋊4S3 | 3rd semidirect product of C42 and S3 acting via S3/C3=C2 | 24 | 2 | C4^2:4S3 | 96,12 |
C24⋊4S3 | 1st semidirect product of C24 and S3 acting via S3/C3=C2 | 24 | | C2^4:4S3 | 96,160 |
C23⋊2D6 | 1st semidirect product of C23 and D6 acting via D6/C3=C22 | 24 | | C2^3:2D6 | 96,144 |
Q8⋊3Dic3 | 2nd semidirect product of Q8 and Dic3 acting via Dic3/C6=C2 | 24 | 4 | Q8:3Dic3 | 96,44 |
D12⋊6C22 | 4th semidirect product of D12 and C22 acting via C22/C2=C2 | 24 | 4 | D12:6C2^2 | 96,139 |
D6⋊C8 | The semidirect product of D6 and C8 acting via C8/C4=C2 | 48 | | D6:C8 | 96,27 |
C3⋊D16 | The semidirect product of C3 and D16 acting via D16/D8=C2 | 48 | 4+ | C3:D16 | 96,33 |
C48⋊C2 | 2nd semidirect product of C48 and C2 acting faithfully | 48 | 2 | C48:C2 | 96,7 |
D8⋊3S3 | The semidirect product of D8 and S3 acting through Inn(D8) | 48 | 4- | D8:3S3 | 96,119 |
D6⋊3D4 | 3rd semidirect product of D6 and D4 acting via D4/C4=C2 | 48 | | D6:3D4 | 96,145 |
C4⋊D12 | The semidirect product of C4 and D12 acting via D12/C12=C2 | 48 | | C4:D12 | 96,81 |
C12⋊D4 | 1st semidirect product of C12 and D4 acting via D4/C2=C22 | 48 | | C12:D4 | 96,102 |
C12⋊7D4 | 1st semidirect product of C12 and D4 acting via D4/C22=C2 | 48 | | C12:7D4 | 96,137 |
C12⋊3D4 | 3rd semidirect product of C12 and D4 acting via D4/C2=C22 | 48 | | C12:3D4 | 96,147 |
D6⋊Q8 | 1st semidirect product of D6 and Q8 acting via Q8/C4=C2 | 48 | | D6:Q8 | 96,103 |
D6⋊3Q8 | 3rd semidirect product of D6 and Q8 acting via Q8/C4=C2 | 48 | | D6:3Q8 | 96,153 |
D24⋊C2 | 5th semidirect product of D24 and C2 acting faithfully | 48 | 4+ | D24:C2 | 96,126 |
C42⋊2S3 | 1st semidirect product of C42 and S3 acting via S3/C3=C2 | 48 | | C4^2:2S3 | 96,79 |
C42⋊7S3 | 6th semidirect product of C42 and S3 acting via S3/C3=C2 | 48 | | C4^2:7S3 | 96,82 |
C42⋊3S3 | 2nd semidirect product of C42 and S3 acting via S3/C3=C2 | 48 | | C4^2:3S3 | 96,83 |
Q16⋊S3 | 2nd semidirect product of Q16 and S3 acting via S3/C3=C2 | 48 | 4 | Q16:S3 | 96,125 |
D4⋊Dic3 | 1st semidirect product of D4 and Dic3 acting via Dic3/C6=C2 | 48 | | D4:Dic3 | 96,39 |
Dic3⋊4D4 | 1st semidirect product of Dic3 and D4 acting through Inn(Dic3) | 48 | | Dic3:4D4 | 96,88 |
Dic3⋊D4 | 1st semidirect product of Dic3 and D4 acting via D4/C22=C2 | 48 | | Dic3:D4 | 96,91 |
Dic3⋊5D4 | 2nd semidirect product of Dic3 and D4 acting through Inn(Dic3) | 48 | | Dic3:5D4 | 96,100 |
C3⋊C32 | The semidirect product of C3 and C32 acting via C32/C16=C2 | 96 | 2 | C3:C32 | 96,1 |
C12⋊Q8 | The semidirect product of C12 and Q8 acting via Q8/C2=C22 | 96 | | C12:Q8 | 96,95 |
C12⋊C8 | 1st semidirect product of C12 and C8 acting via C8/C4=C2 | 96 | | C12:C8 | 96,11 |
C24⋊C4 | 5th semidirect product of C24 and C4 acting via C4/C2=C2 | 96 | | C24:C4 | 96,22 |
C24⋊1C4 | 1st semidirect product of C24 and C4 acting via C4/C2=C2 | 96 | | C24:1C4 | 96,25 |
C3⋊Q32 | The semidirect product of C3 and Q32 acting via Q32/Q16=C2 | 96 | 4- | C3:Q32 | 96,36 |
Dic3⋊C8 | The semidirect product of Dic3 and C8 acting via C8/C4=C2 | 96 | | Dic3:C8 | 96,21 |
C12⋊2Q8 | 1st semidirect product of C12 and Q8 acting via Q8/C4=C2 | 96 | | C12:2Q8 | 96,76 |
C8⋊Dic3 | 2nd semidirect product of C8 and Dic3 acting via Dic3/C6=C2 | 96 | | C8:Dic3 | 96,24 |
Q8⋊2Dic3 | 1st semidirect product of Q8 and Dic3 acting via Dic3/C6=C2 | 96 | | Q8:2Dic3 | 96,42 |
Dic6⋊C4 | 5th semidirect product of Dic6 and C4 acting via C4/C2=C2 | 96 | | Dic6:C4 | 96,94 |
Dic3⋊Q8 | 2nd semidirect product of Dic3 and Q8 acting via Q8/C4=C2 | 96 | | Dic3:Q8 | 96,151 |
C4⋊C4⋊7S3 | 1st semidirect product of C4⋊C4 and S3 acting through Inn(C4⋊C4) | 48 | | C4:C4:7S3 | 96,99 |
C4⋊C4⋊S3 | 6th semidirect product of C4⋊C4 and S3 acting via S3/C3=C2 | 48 | | C4:C4:S3 | 96,105 |
C12.D4 | 8th non-split extension by C12 of D4 acting via D4/C2=C22 | 24 | 4 | C12.D4 | 96,40 |
C12.46D4 | 3rd non-split extension by C12 of D4 acting via D4/C22=C2 | 24 | 4+ | C12.46D4 | 96,30 |
C23.6D6 | 1st non-split extension by C23 of D6 acting via D6/C3=C22 | 24 | 4 | C2^3.6D6 | 96,13 |
C23.7D6 | 2nd non-split extension by C23 of D6 acting via D6/C3=C22 | 24 | 4 | C2^3.7D6 | 96,41 |
D6.C8 | The non-split extension by D6 of C8 acting via C8/C4=C2 | 48 | 2 | D6.C8 | 96,5 |
D8.S3 | The non-split extension by D8 of S3 acting via S3/C3=C2 | 48 | 4- | D8.S3 | 96,34 |
D12.C4 | The non-split extension by D12 of C4 acting via C4/C2=C2 | 48 | 4 | D12.C4 | 96,114 |
C6.D8 | 2nd non-split extension by C6 of D8 acting via D8/D4=C2 | 48 | | C6.D8 | 96,16 |
C8.6D6 | 3rd non-split extension by C8 of D6 acting via D6/S3=C2 | 48 | 4+ | C8.6D6 | 96,35 |
C8.D6 | 1st non-split extension by C8 of D6 acting via D6/C3=C22 | 48 | 4- | C8.D6 | 96,116 |
C12.C8 | 1st non-split extension by C12 of C8 acting via C8/C4=C2 | 48 | 2 | C12.C8 | 96,19 |
C24.C4 | 1st non-split extension by C24 of C4 acting via C4/C2=C2 | 48 | 2 | C24.C4 | 96,26 |
D6.D4 | 2nd non-split extension by D6 of D4 acting via D4/C22=C2 | 48 | | D6.D4 | 96,101 |
D4.D6 | 4th non-split extension by D4 of D6 acting via D6/S3=C2 | 48 | 4- | D4.D6 | 96,122 |
C2.D24 | 2nd central extension by C2 of D24 | 48 | | C2.D24 | 96,28 |
D4.Dic3 | The non-split extension by D4 of Dic3 acting through Inn(D4) | 48 | 4 | D4.Dic3 | 96,155 |
Q8.7D6 | 2nd non-split extension by Q8 of D6 acting via D6/S3=C2 | 48 | 4 | Q8.7D6 | 96,123 |
C12.53D4 | 10th non-split extension by C12 of D4 acting via D4/C22=C2 | 48 | 4 | C12.53D4 | 96,29 |
C12.47D4 | 4th non-split extension by C12 of D4 acting via D4/C22=C2 | 48 | 4- | C12.47D4 | 96,31 |
C12.55D4 | 12nd non-split extension by C12 of D4 acting via D4/C22=C2 | 48 | | C12.55D4 | 96,37 |
C12.10D4 | 10th non-split extension by C12 of D4 acting via D4/C2=C22 | 48 | 4 | C12.10D4 | 96,43 |
C4.D12 | 5th non-split extension by C4 of D12 acting via D12/D6=C2 | 48 | | C4.D12 | 96,104 |
C12.48D4 | 5th non-split extension by C12 of D4 acting via D4/C22=C2 | 48 | | C12.48D4 | 96,131 |
C12.23D4 | 23rd non-split extension by C12 of D4 acting via D4/C2=C22 | 48 | | C12.23D4 | 96,154 |
Q8.11D6 | 1st non-split extension by Q8 of D6 acting via D6/C6=C2 | 48 | 4 | Q8.11D6 | 96,149 |
Q8.13D6 | 3rd non-split extension by Q8 of D6 acting via D6/C6=C2 | 48 | 4 | Q8.13D6 | 96,157 |
Q8.14D6 | 4th non-split extension by Q8 of D6 acting via D6/C6=C2 | 48 | 4- | Q8.14D6 | 96,158 |
Q8.15D6 | 1st non-split extension by Q8 of D6 acting through Inn(Q8) | 48 | 4 | Q8.15D6 | 96,214 |
C23.8D6 | 3rd non-split extension by C23 of D6 acting via D6/C3=C22 | 48 | | C2^3.8D6 | 96,86 |
C23.9D6 | 4th non-split extension by C23 of D6 acting via D6/C3=C22 | 48 | | C2^3.9D6 | 96,90 |
Dic3.D4 | 1st non-split extension by Dic3 of D4 acting via D4/C22=C2 | 48 | | Dic3.D4 | 96,85 |
C23.16D6 | 1st non-split extension by C23 of D6 acting via D6/S3=C2 | 48 | | C2^3.16D6 | 96,84 |
C23.11D6 | 6th non-split extension by C23 of D6 acting via D6/C3=C22 | 48 | | C2^3.11D6 | 96,92 |
C23.21D6 | 6th non-split extension by C23 of D6 acting via D6/S3=C2 | 48 | | C2^3.21D6 | 96,93 |
C23.26D6 | 2nd non-split extension by C23 of D6 acting via D6/C6=C2 | 48 | | C2^3.26D6 | 96,133 |
C23.28D6 | 4th non-split extension by C23 of D6 acting via D6/C6=C2 | 48 | | C2^3.28D6 | 96,136 |
C23.23D6 | 8th non-split extension by C23 of D6 acting via D6/S3=C2 | 48 | | C2^3.23D6 | 96,142 |
C23.12D6 | 7th non-split extension by C23 of D6 acting via D6/C3=C22 | 48 | | C2^3.12D6 | 96,143 |
C23.14D6 | 9th non-split extension by C23 of D6 acting via D6/C3=C22 | 48 | | C2^3.14D6 | 96,146 |
Dic3.Q8 | The non-split extension by Dic3 of Q8 acting via Q8/C4=C2 | 96 | | Dic3.Q8 | 96,96 |
C6.Q16 | 1st non-split extension by C6 of Q16 acting via Q16/Q8=C2 | 96 | | C6.Q16 | 96,14 |
C12.Q8 | 2nd non-split extension by C12 of Q8 acting via Q8/C2=C22 | 96 | | C12.Q8 | 96,15 |
C12.6Q8 | 3rd non-split extension by C12 of Q8 acting via Q8/C4=C2 | 96 | | C12.6Q8 | 96,77 |
C42.S3 | 1st non-split extension by C42 of S3 acting via S3/C3=C2 | 96 | | C4^2.S3 | 96,10 |
C6.C42 | 5th non-split extension by C6 of C42 acting via C42/C2×C4=C2 | 96 | | C6.C4^2 | 96,38 |
C6.SD16 | 2nd non-split extension by C6 of SD16 acting via SD16/D4=C2 | 96 | | C6.SD16 | 96,17 |
C4.Dic6 | 3rd non-split extension by C4 of Dic6 acting via Dic6/Dic3=C2 | 96 | | C4.Dic6 | 96,97 |
C2.Dic12 | 1st central extension by C2 of Dic12 | 96 | | C2.Dic12 | 96,23 |
C4×C24 | Abelian group of type [4,24] | 96 | | C4xC24 | 96,46 |
C2×C48 | Abelian group of type [2,48] | 96 | | C2xC48 | 96,59 |
C24×C6 | Abelian group of type [2,2,2,2,6] | 96 | | C2^4xC6 | 96,231 |
C22×C24 | Abelian group of type [2,2,24] | 96 | | C2^2xC24 | 96,176 |
C23×C12 | Abelian group of type [2,2,2,12] | 96 | | C2^3xC12 | 96,220 |
C2×C4×C12 | Abelian group of type [2,4,12] | 96 | | C2xC4xC12 | 96,161 |
S3×D8 | Direct product of S3 and D8 | 24 | 4+ | S3xD8 | 96,117 |
S3×SD16 | Direct product of S3 and SD16 | 24 | 4 | S3xSD16 | 96,120 |
S3×M4(2) | Direct product of S3 and M4(2) | 24 | 4 | S3xM4(2) | 96,113 |
C3×2+ 1+4 | Direct product of C3 and 2+ 1+4 | 24 | 4 | C3xES+(2,2) | 96,224 |
C6×D8 | Direct product of C6 and D8 | 48 | | C6xD8 | 96,179 |
S3×C16 | Direct product of C16 and S3 | 48 | 2 | S3xC16 | 96,4 |
C3×D16 | Direct product of C3 and D16 | 48 | 2 | C3xD16 | 96,61 |
C4×D12 | Direct product of C4 and D12 | 48 | | C4xD12 | 96,80 |
C2×D24 | Direct product of C2 and D24 | 48 | | C2xD24 | 96,110 |
D4×C12 | Direct product of C12 and D4 | 48 | | D4xC12 | 96,165 |
S3×Q16 | Direct product of S3 and Q16 | 48 | 4- | S3xQ16 | 96,124 |
S3×C42 | Direct product of C42 and S3 | 48 | | S3xC4^2 | 96,78 |
S3×C24 | Direct product of C24 and S3 | 48 | | S3xC2^4 | 96,230 |
C3×SD32 | Direct product of C3 and SD32 | 48 | 2 | C3xSD32 | 96,62 |
D4×Dic3 | Direct product of D4 and Dic3 | 48 | | D4xDic3 | 96,141 |
C6×SD16 | Direct product of C6 and SD16 | 48 | | C6xSD16 | 96,180 |
C22×D12 | Direct product of C22 and D12 | 48 | | C2^2xD12 | 96,207 |
C3×M5(2) | Direct product of C3 and M5(2) | 48 | 2 | C3xM5(2) | 96,60 |
C6×M4(2) | Direct product of C6 and M4(2) | 48 | | C6xM4(2) | 96,177 |
C3×2- 1+4 | Direct product of C3 and 2- 1+4 | 48 | 4 | C3xES-(2,2) | 96,225 |
C3×Q32 | Direct product of C3 and Q32 | 96 | 2 | C3xQ32 | 96,63 |
Q8×C12 | Direct product of C12 and Q8 | 96 | | Q8xC12 | 96,166 |
C6×Q16 | Direct product of C6 and Q16 | 96 | | C6xQ16 | 96,181 |
C8×Dic3 | Direct product of C8 and Dic3 | 96 | | C8xDic3 | 96,20 |
C4×Dic6 | Direct product of C4 and Dic6 | 96 | | C4xDic6 | 96,75 |
Q8×Dic3 | Direct product of Q8 and Dic3 | 96 | | Q8xDic3 | 96,152 |
C2×Dic12 | Direct product of C2 and Dic12 | 96 | | C2xDic12 | 96,112 |
C22×Dic6 | Direct product of C22 and Dic6 | 96 | | C2^2xDic6 | 96,205 |
C23×Dic3 | Direct product of C23 and Dic3 | 96 | | C2^3xDic3 | 96,218 |
C2×S3×D4 | Direct product of C2, S3 and D4 | 24 | | C2xS3xD4 | 96,209 |
C3×C4≀C2 | Direct product of C3 and C4≀C2 | 24 | 2 | C3xC4wrC2 | 96,54 |
S3×C4○D4 | Direct product of S3 and C4○D4 | 24 | 4 | S3xC4oD4 | 96,215 |
C3×C23⋊C4 | Direct product of C3 and C23⋊C4 | 24 | 4 | C3xC2^3:C4 | 96,49 |
S3×C22⋊C4 | Direct product of S3 and C22⋊C4 | 24 | | S3xC2^2:C4 | 96,87 |
C3×C8⋊C22 | Direct product of C3 and C8⋊C22 | 24 | 4 | C3xC8:C2^2 | 96,183 |
C3×C4.D4 | Direct product of C3 and C4.D4 | 24 | 4 | C3xC4.D4 | 96,50 |
C3×C22≀C2 | Direct product of C3 and C22≀C2 | 24 | | C3xC2^2wrC2 | 96,167 |
S3×C2×C8 | Direct product of C2×C8 and S3 | 48 | | S3xC2xC8 | 96,106 |
D4×C2×C6 | Direct product of C2×C6 and D4 | 48 | | D4xC2xC6 | 96,221 |
S3×C4⋊C4 | Direct product of S3 and C4⋊C4 | 48 | | S3xC4:C4 | 96,98 |
C2×S3×Q8 | Direct product of C2, S3 and Q8 | 48 | | C2xS3xQ8 | 96,212 |
C4×C3⋊D4 | Direct product of C4 and C3⋊D4 | 48 | | C4xC3:D4 | 96,135 |
C2×C8⋊S3 | Direct product of C2 and C8⋊S3 | 48 | | C2xC8:S3 | 96,107 |
C2×D6⋊C4 | Direct product of C2 and D6⋊C4 | 48 | | C2xD6:C4 | 96,134 |
C2×D4⋊S3 | Direct product of C2 and D4⋊S3 | 48 | | C2xD4:S3 | 96,138 |
C3×C8○D4 | Direct product of C3 and C8○D4 | 48 | 2 | C3xC8oD4 | 96,178 |
C3×C4○D8 | Direct product of C3 and C4○D8 | 48 | 2 | C3xC4oD8 | 96,182 |
C6×C4○D4 | Direct product of C6 and C4○D4 | 48 | | C6xC4oD4 | 96,223 |
C3×C4⋊D4 | Direct product of C3 and C4⋊D4 | 48 | | C3xC4:D4 | 96,168 |
S3×C22×C4 | Direct product of C22×C4 and S3 | 48 | | S3xC2^2xC4 | 96,206 |
C2×C24⋊C2 | Direct product of C2 and C24⋊C2 | 48 | | C2xC24:C2 | 96,109 |
C2×C4○D12 | Direct product of C2 and C4○D12 | 48 | | C2xC4oD12 | 96,208 |
C3×D4⋊C4 | Direct product of C3 and D4⋊C4 | 48 | | C3xD4:C4 | 96,52 |
C3×C8.C4 | Direct product of C3 and C8.C4 | 48 | 2 | C3xC8.C4 | 96,58 |
C3×C4⋊1D4 | Direct product of C3 and C4⋊1D4 | 48 | | C3xC4:1D4 | 96,174 |
C3×C22⋊C8 | Direct product of C3 and C22⋊C8 | 48 | | C3xC2^2:C8 | 96,48 |
C6×C22⋊C4 | Direct product of C6 and C22⋊C4 | 48 | | C6xC2^2:C4 | 96,162 |
C2×D4.S3 | Direct product of C2 and D4.S3 | 48 | | C2xD4.S3 | 96,140 |
C2×C6.D4 | Direct product of C2 and C6.D4 | 48 | | C2xC6.D4 | 96,159 |
C22×C3⋊D4 | Direct product of C22 and C3⋊D4 | 48 | | C2^2xC3:D4 | 96,219 |
C3×C22⋊Q8 | Direct product of C3 and C22⋊Q8 | 48 | | C3xC2^2:Q8 | 96,169 |
C2×D4⋊2S3 | Direct product of C2 and D4⋊2S3 | 48 | | C2xD4:2S3 | 96,210 |
C3×C42⋊C2 | Direct product of C3 and C42⋊C2 | 48 | | C3xC4^2:C2 | 96,164 |
C2×Q8⋊2S3 | Direct product of C2 and Q8⋊2S3 | 48 | | C2xQ8:2S3 | 96,148 |
C2×Q8⋊3S3 | Direct product of C2 and Q8⋊3S3 | 48 | | C2xQ8:3S3 | 96,213 |
C3×C4.4D4 | Direct product of C3 and C4.4D4 | 48 | | C3xC4.4D4 | 96,171 |
C3×C8.C22 | Direct product of C3 and C8.C22 | 48 | 4 | C3xC8.C2^2 | 96,184 |
C2×C4.Dic3 | Direct product of C2 and C4.Dic3 | 48 | | C2xC4.Dic3 | 96,128 |
C3×C42⋊2C2 | Direct product of C3 and C42⋊2C2 | 48 | | C3xC4^2:2C2 | 96,173 |
C3×C4.10D4 | Direct product of C3 and C4.10D4 | 48 | 4 | C3xC4.10D4 | 96,51 |
C3×C22.D4 | Direct product of C3 and C22.D4 | 48 | | C3xC2^2.D4 | 96,170 |
C4×C3⋊C8 | Direct product of C4 and C3⋊C8 | 96 | | C4xC3:C8 | 96,9 |
C3×C4⋊C8 | Direct product of C3 and C4⋊C8 | 96 | | C3xC4:C8 | 96,55 |
C6×C4⋊C4 | Direct product of C6 and C4⋊C4 | 96 | | C6xC4:C4 | 96,163 |
C2×C3⋊C16 | Direct product of C2 and C3⋊C16 | 96 | | C2xC3:C16 | 96,18 |
Q8×C2×C6 | Direct product of C2×C6 and Q8 | 96 | | Q8xC2xC6 | 96,222 |
C3×C4⋊Q8 | Direct product of C3 and C4⋊Q8 | 96 | | C3xC4:Q8 | 96,175 |
C3×C8⋊C4 | Direct product of C3 and C8⋊C4 | 96 | | C3xC8:C4 | 96,47 |
C22×C3⋊C8 | Direct product of C22 and C3⋊C8 | 96 | | C2^2xC3:C8 | 96,127 |
C2×C4×Dic3 | Direct product of C2×C4 and Dic3 | 96 | | C2xC4xDic3 | 96,129 |
C2×C3⋊Q16 | Direct product of C2 and C3⋊Q16 | 96 | | C2xC3:Q16 | 96,150 |
C2×C4⋊Dic3 | Direct product of C2 and C4⋊Dic3 | 96 | | C2xC4:Dic3 | 96,132 |
C3×Q8⋊C4 | Direct product of C3 and Q8⋊C4 | 96 | | C3xQ8:C4 | 96,53 |
C3×C2.D8 | Direct product of C3 and C2.D8 | 96 | | C3xC2.D8 | 96,57 |
C3×C4.Q8 | Direct product of C3 and C4.Q8 | 96 | | C3xC4.Q8 | 96,56 |
C2×Dic3⋊C4 | Direct product of C2 and Dic3⋊C4 | 96 | | C2xDic3:C4 | 96,130 |
C3×C2.C42 | Direct product of C3 and C2.C42 | 96 | | C3xC2.C4^2 | 96,45 |
C3×C42.C2 | Direct product of C3 and C42.C2 | 96 | | C3xC4^2.C2 | 96,172 |