Let G = U (8) ⊕ U (5). Is G cyclic? Justify your answer.

2.6.22. Let G be a cyclic group of order n. Let m ≤ n be a...

2.6.22. Let G be a cyclic group of order n. Let m ≤ n be a positive integer. How many subgroups of order m does G have? Prove your assertion.

Let G be a cyclic group, and let x1, x2 be two elements that generate G...

Let G be a cyclic group, and let x1, x2 be two elements that generate G . Show that f : G → G by the assignment f(x1) = x2 is an isomorphism.

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).

Let G be the group Z3 + Z4 and let H = h(1, 2)i be the...

Let G be the group Z3 + Z4 and let H = h(1, 2)i be the cyclic subgroup generated by (1, 2). (a) Find the index [G : H] of H in G. (b) Is H a normal subgroup of G? Justify your answer.

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)}.

Let G = <a> be a cyclic group of order 12. Describe explicitly all elements of...

Let G = <a> be a cyclic group of order 12. Describe explicitly all elements of Aut(G), the group of automorphisms of G. Indicate how you know that these are elements of Aut(G) and that these are the only elements of Aut(G).

(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 x(t) = t (u(t) − u(t − 2) ) . Is this a power signal...

Let x(t) = t (u(t) − u(t − 2) ) . Is this a power signal or an energy signal? (Justify your answer.)

Let A be any 2 by 2 stochastic matrix. Is A always diagonalizable? Justify your answer.

Let A be any 2 by 2 stochastic matrix. Is A always diagonalizable? Justify your answer.

Let H=<(2 3)> be the cyclic subgroup of G=S3 generated by the transposition (2 3). Write...

Let H=<(2 3)> be the cyclic subgroup of G=S3 generated by the transposition (2 3). Write (as sets) the right-cosets and left-cosets of H in G