Answer to Question #242447 in Abstract Algebra for Eshetie

Let "A=\\{a\\in G : O(a)|n\\}\\\\"

We shall show that A is a subgroup of G using two steps subgroup test.\\

Let "a,b \\in A \\implies a,b\\in G: O(a)|n \\text{ and } O(b)|n" \\

"\\implies ab \\in G\\\\\nO(ab)=lcm(O(a),O(b)) \\{\\text{Since G is an Abelian group}\\}\\\\\n\\implies O(ab)|n\\\\\n\\implies ab\\in A"

Also,

"a^{-1}\\in G \\text{ since } a \\in G\\\\\nO(a^{-1})=O(a) \\{\\text{Element of a group and its inverse have same order}\\}\\\\\n\\implies O(a^{-1})|n"

This shows that A is a subgroup of G.