Answer to Question #146439 in Abstract Algebra for J

Each cyclic group "G=\\langle a \\rangle" is Abelian. Indeed, "a^ma^n=a^{m+n}=a^{n+m}=a^na^m". Therefore, "gH=Hg" for all "g\\in G", and "H" is a normal subgroup of "G".

Let "[g]=gH" be arbitrary element of "G\/H". Since "G=\\langle a \\rangle" is cyclic, "g=a^k" for some "k\\in \\mathbb Z." By defenition of product of elements of "G\/H" , "[g]=[a^k]=[a]^k." Therefore, "G\/H=\\langle[a]\\rangle," and "G\/H"

is cyclic.