List the elements of U(9), and prove that U(9) is a group.

Hurry pls. Let W denote the set of English words. for u,v are elements of W...

Hurry pls. Let W denote the set of English words. for u,v are elements of W (u~v have the same first letter and same last letter same length) a) prove ~ is an equivalence relation b)list all elements of the equivalence class[a] c)list all elements of [ox] d) list all elements of[are] e) list all elements of [five] find all three letter words x such that [x]has 5 elements

Prove that the nonzero elements of a field form an abelian group under multiplication

Prove that the nonzero elements of a field form an abelian group under multiplication

Prove that every group which has three or four elements us abelian.

Prove that every group which has three or four elements us abelian.

In the group Z12, let H = 〈6〉 and N = 〈8〉. (a) List the elements...

In the group Z12, let H = 〈6〉 and N = 〈8〉. (a) List the elements of HN/N. (b) List the elements of H/(H ∩ N). (c) Define an ismorphism between HN/N and H/(H ∩ N)

In the group Z12, let H = 〈6〉 and N = 〈8〉. (a) List the elements...

In the group Z12, let H = 〈6〉 and N = 〈8〉. (a) List the elements of HN/N. (b) List the elements of H/(H ∩ N). (c) Define an ismorphism between HN/N and H/(H ∩ N).

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

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

Let a,b be any two elements of a group. Prove that' (ab)-1 = b-1a-1

Let a,b be any two elements of a group. Prove that' (ab)-1 = b-1a-1

(abstract alg) Let G be a cyclic group with more than two elements: a) Prove that...

(abstract alg) Let G be a cyclic group with more than two elements: a) Prove that G has at least two different generators. b) If G is finite, prove that G has an even number of generators

Prove that any group of order 9 is abelian.

Prove that any group of order 9 is abelian.

let G be a group of order 18. x, y, and z are elements of G....

let G be a group of order 18. x, y, and z are elements of G. if | < x, y >| = 9 and o(z) = order of z = 9, prove that G = < x, y, z >