M mCibs4 New member Joined Nov 17, 2008 Messages 1 Nov 17, 2008 #1 Let G be a finite group. Show that if for each positive integer m the number of solutions x of the equation x^m=e in G is at most m, then G is cyclic.
Let G be a finite group. Show that if for each positive integer m the number of solutions x of the equation x^m=e in G is at most m, then G is cyclic.
