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Show that if $G$ is a finite nonsolvable group then $G$ contains a nontrivial subgroup $H$ such that $\left[H,H\right]=H$.

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    I assume that $H$ should be nontrivial, since $1$ holds this property in every group.2012-10-07
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    Is $G$ assumed to be *finite*?2012-10-07
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    Yes, $G$ be finite2012-10-07

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