Prove that A5 has no subgroup of order 20.

Prove that A5 has no subgroup of order 15.

Prove that A5 has no subgroup of order 15.

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

Prove that a group G of order 210 has a subgroup of order 14 using Sylow's...

Prove that a group G of order 210 has a subgroup of order 14 using Sylow's theorem, and please be detailed in your proof. I have tried this multiple times but I keep getting stuck.

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.

Prove thatAnis a normal subgroup of Sn. Prove both that it is a subgroup AND that...

Prove thatAnis a normal subgroup of Sn. Prove both that it is a subgroup AND that it is normal

Prove that ∀a ∈ Z, a5 ≡ a (mod 5).

Prove that ∀a ∈ Z, a5 ≡ a (mod 5).

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.

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.

Find a cyclic subgroup of A8 of order 4. Find a noncyclic subgroup of order 4.

Find a cyclic subgroup of A8 of order 4. Find a noncyclic subgroup of order 4.

Let p,q be prime numbers, not necessarily distinct. If a group G has order pq, prove...

Let p,q be prime numbers, not necessarily distinct. If a group G has order pq, prove that any proper subgroup (meaning a subgroup not equal to G itself) must be cyclic. Hint: what are the possible sizes of the subgroups?