Character Table info for NRS(M24, 24+4)
-
Name:
-
NRS(M24,2^(4+4))
-
Group order:
-
9216 = 210 ⋅ 32
-
Number of classes:
-
41
-
InfoText value:
-
normalizer of a radical 2-subgroup in M24,
had been called NRS(M24,2^(2+2+4)b) in an earlier version
but this does not fit to the structure,
origin: Dixon's Algorithm
-
Group constructions in GAP:
-
TransitiveGroup( 24, 9955 ),
TransitiveGroup( 24, 9958 )
-
Stored class fusions from this table:
-
24+4.(S3 × S3).2,
He,
M24,
S3 × S3