Abstract Algebra Answers

Let G be a nonabelian group of order 10 having golden ratio 1+√ 5 2 as the neutral element. Then: (a) Verify class equation for G. (b) Find all elements of Inn(G). (c) Verify that G/Z(G) ∼= Inn(G). (d) For some elements x, y, z ∈ G: verify the commutator identity: [xy, z] = [x, z][x, z, y][y, z]

Let G be a nonabelian group of order 10 having golden ratio 1+√5/2 as the neutral element. Then: (a) Verify class equation for G. (b) Find all elements of Inn(G). (c) Verify that G/Z(G) ∼ = Inn(G). (d) For some elements x,y,z ∈ G: verify the commutator identity: [xy,z] = [x,z][x,z,y][y,z] 

If the following are true, give detailed proof. Otherwise, support your answer by a nontrivial example.

(i) S4 is isomorphic to D12.

(ii) H ∼ = K if and only if Aut(H) ∼ = Aut(K).

(iii) Every action of the group G gives the same orbit space.

(iv) The isomorphism class of the multiplicative group of real numbers is non-empty.

(v) The converse of Cauchy’s theorem is true.