Prove that there are four groups of order 28 up to isomorphism.

Prove there are exactly two groups of order 285 up to isomorphism. Determine their structure in...

Prove there are exactly two groups of order 285 up to isomorphism. Determine their structure in terms of semi-direct products of simple groups.

a)how many abelian groups are there up to isomorphism of order 55, 56, 5500? b)List ones...

a)how many abelian groups are there up to isomorphism of order 55, 56, 5500? b)List ones of order 55 in invariant form please

Let p be a prime number. Prove that there are exactly two groups of order p^2...

Let p be a prime number. Prove that there are exactly two groups of order p^2 up to isomorphism, and both are abelian. (Abstract Algebra)

What are all the factor groups of the quaternion group Q8 up to isomorphism?

What are all the factor groups of the quaternion group Q8 up to isomorphism?

Find all isomorphism classes for albelian groups of order p2q3r4, where p,q, and r are prime.

Find all isomorphism classes for albelian groups of order p2q3r4, where p,q, and r are prime.

Let f : Z → Z be a ring isomorphism. Prove that f must be the...

Let f : Z → Z be a ring isomorphism. Prove that f must be the identity map. Must this still hold true if we only assume f : Z → Z is a group isomorphism? Prove your answer.

note that D4xZ3 and Z4xS3 are both nonabelian groups of order 24. Determine whether these groups...

note that D4xZ3 and Z4xS3 are both nonabelian groups of order 24. Determine whether these groups are isomorphic. Either determine a specific isomorphism between these groups or demonstrate a specific property showing that the groups are not isomorphic

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 there is an isomorphism between Lie superalgebras sl(2|1) and sl(1|2) ?

Prove that there is an isomorphism between Lie superalgebras sl(2|1) and sl(1|2) ?

Suppose φ : G → G′ is an isomorphism. (a) Prove that φ(Z(G)) = Z(G′). (b)...

Suppose φ : G → G′ is an isomorphism. (a) Prove that φ(Z(G)) = Z(G′). (b) Prove that |g| = |φ(g)| for all g ∈ G