Leicw that, for any grouo G, G/Z(G) is isomorphic to Inn(G)

Prove that, for any group G, G/Z(G) is isomorphic to Inn(G)

Prove that, for any group G, G/Z(G) is isomorphic to Inn(G)

Prove Inn(G) is cyclic if and only if Inn(G) is trivial if and only if G...

Prove Inn(G) is cyclic if and only if Inn(G) is trivial if and only if G is abelian. I am trying to show equivalence of this statement. 1=>2, 2=>3, 3=>1 . Or if perhaps another way is easier than those implications.

Let G=Z x Z and H={ (a, b) in Z x Z | 8 divides (a+b)...

Let G=Z x Z and H={ (a, b) in Z x Z | 8 divides (a+b) }. 1. Prove that G/H is isomorphic to Z8. 2. What is the index of [G : H]? Explain.

Prove that the ring Z[x]/(n), where n ∈ Z, is isomorphic to Zn[x].

Prove that the ring Z[x]/(n), where n ∈ Z, is isomorphic to Zn[x].

Let G and G′ be two isomorphic groups that have a unique normal subgroup of a...

Let G and G′ be two isomorphic groups that have a unique normal subgroup of a given order n, H and H′. Show that the quotient groups G/H and G′/H′ are isomorphic.

Which of the following groups of order 8 are isomorphic: D4, Q8, Z/8Z, Z/4Z × Z/2Z,...

Which of the following groups of order 8 are isomorphic: D4, Q8, Z/8Z, Z/4Z × Z/2Z, Z/2Z × Z/2Z × Z/2Z.

A graph G is self-complementary if G is isomorphic to the complement of G. suppose G...

A graph G is self-complementary if G is isomorphic to the complement of G. suppose G is a self complementary graph with n vertices. How many edges must G have? Why?

Prove that the rings, Z[x]/<2,x> is isomorphic to Z/2 and explain why this means that <2,x>...

Prove that the rings, Z[x]/<2,x> is isomorphic to Z/2 and explain why this means that <2,x> is a maximal in Z[x]

3. a) For any group G and any a∈G, prove that given any k∈Z+, C(a) ⊆...

3. a) For any group G and any a∈G, prove that given any k∈Z+, C(a) ⊆ C(ak). (HINT: You are being asked to show that C(a) is a subset of C(ak). You can prove this by proving that if x ∈ C(a), then x must also be an element of C(ak) for any positive integer k.) b) Is it necessarily true that C(a) = C(ak) for any k ∈ Z+? Either prove or disprove this claim.

In Z, let I=〈3〉and J=〈18〉. Show that the group I/J is isomorphic to the group Z6...

In Z, let I=〈3〉and J=〈18〉. Show that the group I/J is isomorphic to the group Z6 but that the ring I/J is not ring-isomorphic to the ring Z6 .