Prove that D_4 is also isomorphic to a subgroup H of S_8. Explicitly list all elements...

Let G1 and G2 be isomorphic groups. Prove that if G1 has a subgroup of order...

Let G1 and G2 be isomorphic groups. Prove that if G1 has a subgroup of order n, then G2 has a subgroup of order n

Let H be a subgroup of G, and N be the normalizer of H in G...

Let H be a subgroup of G, and N be the normalizer of H in G and C be the centralizer of H in G. Prove that C is normal in N and the group N/C is isomorphic to a subgroup of Aut(H).

Prove that if A is a subgroup of G and B is a subgroup of H,...

Prove that if A is a subgroup of G and B is a subgroup of H, then the direct product A × B is a subgroup of G × H. Show all steps. Note that AXB is nonempty since the identity e is a part of A X B. Remains only to show that A X B is closed under multiplication and inverses.

a) Let H be a subgroup of a group G satisfying [G ∶ H] = 2....

a) Let H be a subgroup of a group G satisfying [G ∶ H] = 2. If there are elements a, b ∈ G such that ab ∈/ H, then prove that either a ∈ H or b ∈ H. (b) List the left and right cosets of H = {(1), (23)} in S3. Are they the same collection?

Suppose H is a subgroup of G such that ϕ(H)=H for all ϕ is an element...

Suppose H is a subgroup of G such that ϕ(H)=H for all ϕ is an element in Aut(G). Prove H is a normal subgroup of G.

If N is a normal subgroup of G and H is any subgroup of G, prove...

If N is a normal subgroup of G and H is any subgroup of G, prove that NH is a subgroup of G.

Let H be a normal subgroup of G. Assume the quotient group G/H is abelian. Prove...

Let H be a normal subgroup of G. Assume the quotient group G/H is abelian. Prove that, for any two elements x, y ∈ G, we have x^ (-1) y ^(-1)xy ∈ H

Prove that A_4 (a group of order 4!//2 = 24/2 = 12) has no subgroup H...

Prove that A_4 (a group of order 4!//2 = 24/2 = 12) has no subgroup H of order 6 by showing: 1) all squares of elements A_4 must be H since (A_4:H) =2 2) All eight 3 -cycles are squares and hence must be in H.

If H is a normal subgroup of G and |H| = 2, prove that H is...

If H is a normal subgroup of G and |H| = 2, prove that H is contained in the center of G.

Let G be a finite group and H be a subgroup of G. Prove that if...

Let G be a finite group and H be a subgroup of G. Prove that if H is only subgroup of G of size |H|, then H is normal in G.