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Suppose φ:G→G is a group homomorphism, φ is not the trivial map, and |G|=p,where p is...

Suppose φ:G→G is a group homomorphism, φ is not the trivial map, and |G|=p,where p is a prime number. Prove that G∼=Im(φ), where Im(φ) is the image of φ.

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Sel: diote is a group homomorphism, & is not the trivial map, and 101=P Where pis Prime number. Them Im(Q) is a subgroup of G

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