Cauchy's Theorem Problem (Abstract Algebra question)

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Cauchy's Theorem Problem (Abstract Algebra question)

Homework Statement


I've been thinking about this problem for a couple days now, and I don't even know how to approach it. The problem is:
Let G be a group of order (p^n)*m, where p is a prime and p does not divide m. Suppose that G has a normal subgroup P of order p^n. Prove that f(P)=P for every automorphism 'A' of G.

I can't even convince myself that the question is true, then alone a method on how to show it. Any point in the right direction would help me a ton. Thanks.


Homework Equations





The Attempt at a Solution

 
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Prove that for g in G, the order of g divides p^n iff g is an element of P. One direction is easy, for the other direction take g not in P. Then gP is an element of the quotient group G/P which has order n. Can you finish? Once you have that, automorphisms preserve the order of elements.
 
I have no problem showing the orders of G and G/P, but I don't understand why an automorphism automatically preserve the order of elements.
 
Automorphisms are isomorphisms. Do you believe that isomorphisms preserve the order of elements? You should.

Edit: Hopefully you realize that when I said that 'automorphisms are isomorphisms' I was not implying that they are the same thing. Automorphisms are isomorphisms that map the group back onto the same group. The order of the automorphism group gives a sense of symmetry that the group has.
 
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