Question: For finite groups each group element (a) must give the identity (e) when raised to some finite power: (a^{p}=e). The integer (p) is called the

For finite groups each group element $a$ must give the identity $e$ when raised to some finite power: $a^{p}=e$. The integer $p$ is called the order of the element $a$. Show that two elements in the same conjugacy class have the same order $p$.

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