Abstract Algebra Proof (Cyclic cycles & order)

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rtw528
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Prove that if G is a group and aεG, then o(a-1)=o(a)

This is all I have so far:
Assume G is a group and aεG. Because G is a group a has an inverse in the group, a-1 s.t. aa-1=e, which is also in G.
<a>={an|nεZ}. |<a>| is the number of elements in <a> before it cycles back.

Basically all I've done is write what I know about what is given. I have tried to find <a> and <a-1> from a previous problem to see if there is a pattern but I don't see one.
 
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Can you prove ##<a> = <a^{-1}>##?