Let $f: (mathbb{Z}_{24}, +) rightarrow (mathbb{Z}_{36}, +)$
be a group homomorphism. If the image of $f$ contains exactly $2$ elements, how many elements are there in the kernel of $f$?

Question

Let  $f: (mathbb{Z}_{24}, +) rightarrow (mathbb{Z}_{36}, +)$
be a group homomorphism. If the image of $f$ contains exactly $2$ elements, how many elements are there in the kernel of $f$?
What I know:
Let $f : G to H$ be a group homomorphism between two finite groups. Then we
have $$|G| = |ker(f )| times |{rm im}(f )|$$
$$|G|= |ker(f )|  times  2$$
However I don't know how to work out $|G|$ for my question.

Mike · Accepted Answer

Chris Custer · Answer

By the first isomorphism theorem, $G/rm{ker}fcongrm{im}f$.  So, $24/|rm{ker}f|=2$.  Thus $|rm{ker}f|=12$.

Let $f: (mathbb{Z}_{24}, +) rightarrow (mathbb{Z}_{36}, +)$ be a group homomorphism. How many elements are there in the kernel of $f$?

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