Metabelian group mathematics , a metabelian group is a group whose commutator subgroup is abelian . Equivalently, a group G is metabelian if and only if there is an abelian normal subgroup A such that the quotient group G/A is abelian.group homomorphisms .solvable . In fact, they are precisely the solvable groups of derived length at most 2.Examples In contrast to this last example, the symmetric group S 4 of order 24 is not metabelian, as its commutator subgroup is the non-abelian alternating group A 4 .
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