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I've got a question. It pertains to a proof I'm doing. I ran into this stumbling block. If I could show this I think I could complete the proof.
G is a finite Abelian Group such that there exits more than one element of order 2 within the group.
more than one element of the form b not equal to identity
such that b^2=e
Is the product of all the elements of order 2 equal to the identity element, and why?
G is a finite Abelian Group such that there exits more than one element of order 2 within the group.
more than one element of the form b not equal to identity
such that b^2=e
Is the product of all the elements of order 2 equal to the identity element, and why?