Given an example with full justification (a) A finite group that is not cyclic. (b) A...

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.

(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.

Let G be a cyclic group; an element g ∈ G is called a generator of...

Let G be a cyclic group; an element g ∈ G is called a generator of G if G<g>. Let φ : G → G be an endomorphism of G, and let g be a generator of G. Show that φ is an automorphism if and only if φ(g) is a generator of G. Use this to find Aut(Z).

Suppose that G is a finite Abelian group that has exactly one subroup for each divisor...

Suppose that G is a finite Abelian group that has exactly one subroup for each divisor of the order of G. Show that G is cyclic. provide explanation.

A) Prove that a group G is abelian iff (ab)^2=a^2b^2 fir any two ekemwnts a abd...

A) Prove that a group G is abelian iff (ab)^2=a^2b^2 fir any two ekemwnts a abd b in G. B) Provide an example of a finite abelian group. C) Provide an example of an infinite non-abelian group.

Let F be a field. It is a general fact that a finite subgroup G of...

Let F be a field. It is a general fact that a finite subgroup G of (F^*,X) of the multiplicative group of a field must be cyclic. Give a proof by example in the case when |G| = 100.

3. Suppose G = <a> is a cyclic group of order 15 (i.e. a has order...

3. Suppose G = <a> is a cyclic group of order 15 (i.e. a has order 15), and consider the subgroup K = <a^3>. (a) Determine the order of K. (b) Use Lagrange’s theorem to determine the index of K in G, and then list the distinct cosets of K in G explicitly. (Hint: Consider the cosets Ke and Kb for b does not ∈K

Textbook: Algebra A Graduate Course - Isaacs Prove that the group G has exactly two subgroups...

Textbook: Algebra A Graduate Course - Isaacs Prove that the group G has exactly two subgroups iff |G| is prime (and hence finite).

is it cyclic? Consider the abelian group (Z,∗) under the operation a ∗ b = a...

is it cyclic? Consider the abelian group (Z,∗) under the operation a ∗ b = a + b − 1 for all a, b ∈ Z.