Math, asked by balasahebbhople8, 6 months ago

Every homomorphic image of abelian group is abelian but converse is not true

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Answered by Zayn009

0

Let G be an Abelian group and elements a,b belong to G Then f(a)f(b)=f(ab) as f is homomorphic F(ab)=f(ba)=f(b)f(a) so we can say G is abelian

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