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

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.

Let p be a prime. (a) Prove that Z/pZ ⊕ Z/pZ has exactly p + 1...

Let p be a prime. (a) Prove that Z/pZ ⊕ Z/pZ has exactly p + 1 subgroups of order p. (b) How many subgroups of order p does Z/pZ ⊕ Z/pZ ⊕ Z/pZ have? Can you generalize further? Explain.

12.29 Let p be a prime. Show that a cyclic group of order p has exactly...

12.29 Let p be a prime. Show that a cyclic group of order p has exactly p−1 automorphisms

Let G be a group of order p^3. Prove that either G is abelian or its...

Let G be a group of order p^3. Prove that either G is abelian or its center has exactly p elements.

Let G be a non-abelian group of order p^3 with p prime. (a) Show that |Z(G)|...

Let G be a non-abelian group of order p^3 with p prime. (a) Show that |Z(G)| = p. (b) Suppose a /∈ Z(G). Show that |NG(a)| = p^2 . (c) Show that G has exactly p 2 +p−1 conjugacy classes (don’t forget to count the classes of the elements of Z(G)).

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 G1 and G2 be groups. Prove that G1 × G2 is isomorphic to G2 ×...

Let G1 and G2 be groups. Prove that G1 × G2 is isomorphic to G2 × G1 (abstract algebra)

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

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

An element [a] of Zn is said to be idempotent if [a]^2 = [a]. Prove that...

An element [a] of Zn is said to be idempotent if [a]^2 = [a]. Prove that if p is a prime number, then [0] and [1] are the only idempotents in Zp. (abstract algebra)

An element [a] of Zn is said to be idempotent if [a]^2 = [a]. Prove that...

An element [a] of Zn is said to be idempotent if [a]^2 = [a]. Prove that if p is a prime number, then [0] and [1] are the only idempotents in Zp. (abstract algebra)