Prove that the property that a group is cyclic is a structural property.

prove that a factor group of a cyclic group is cyclic. provide explanations.

prove that a factor group of a cyclic group is cyclic. provide explanations.

Prove or disprove: The group Q∗ is cyclic.

Prove or disprove: The group Q∗ is cyclic.

Suppose that G is a cyclic group, with generator a. Prove that if H is a...

Suppose that G is a cyclic group, with generator a. Prove that if H is a subgroup of G then H is cyclic.

prove that if G is a cyclic group of order n, then for all a in...

prove that if G is a cyclic group of order n, then for all a in G, a^n=e.

If n is a square-free integer, prove that an abelian group of order n is cyclic.

If n is a square-free integer, prove that an abelian group of order n is cyclic.

Let G be a group of order 4. Prove that either G is cyclic or it...

Let G be a group of order 4. Prove that either G is cyclic or it is isomorphic to the Klein 4-group V4 = {1,(12)(34),(13)(24),(14)(23)}.

(abstract alg) Let G be a cyclic group with more than two elements: a) Prove that...

(abstract alg) Let G be a cyclic group with more than two elements: a) Prove that G has at least two different generators. b) If G is finite, prove that G has an even number of generators

Let G be a cyclic group, and H be any group. (i) Prove that any homomorphism...

Let G be a cyclic group, and H be any group. (i) Prove that any homomorphism ϕ : G → H is uniquely determined by where it maps a generator of G. In other words, if G = <x> and h ∈ H, then there is at most one homomorphism ϕ : G → H such that ϕ(x) = h. (ii) Why is there ‘at most one’? Give an example where no such homomorphism can exist.

How can I classify all rings with cyclic additive group structure? Also plz prove your idea...

How can I classify all rings with cyclic additive group structure? Also plz prove your idea explicitly.

true/false and proof The direct product of a cyclic group is cyclic

true/false and proof The direct product of a cyclic group is cyclic