Guest kelkul Posted December 7, 2004 Posted December 7, 2004 Suppose n is an integer and n>=2. Show that An is a normal subgroup of Sn and compute Sn/An. That is, find a known group to which Sn/An is isomorphic.
matt grime Posted December 7, 2004 Posted December 7, 2004 What are the orders of An and Sn? Hence what is the order of Sn/An? How many groups are there of that order?
Guest kelkul Posted December 8, 2004 Posted December 8, 2004 This is all that is given in the question. I don't know what the orders are or anything else. I need help though..haha
matt grime Posted December 8, 2004 Posted December 8, 2004 S_n is the permutation group on n objects. It has n! elements. A_n is the subgroup of even elements. If you don't know what that is then you need to learn it, from your notes and understand why it has n!/2 elements. You also should immediately see that there are two cosets of A_n in S_n and thus that A_n is normal so the quotient group exists and has order.....?
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