A cycle group of order 742 must be isomorphic to Z742

In Z, let I=〈3〉and J=〈18〉. Show that the group I/J is isomorphic to the group Z6...

In Z, let I=〈3〉and J=〈18〉. Show that the group I/J is isomorphic to the group Z6 but that the ring I/J is not ring-isomorphic to the ring Z6 .

Prove that the quotient group GLn(R)/SLn(R) is isomorphic to the group R∗ (under multiplication).

Prove that the quotient group GLn(R)/SLn(R) is isomorphic to the group R∗ (under multiplication).

LetG be a group (not necessarily an Abelian group) of order 425. Prove that G must...

LetG be a group (not necessarily an Abelian group) of order 425. Prove that G must have an element of order 5.

Give an example of two non-isomorphic regular tournaments of the same order.

Give an example of two non-isomorphic regular tournaments of the same order.

Prove that, for any group G, G/Z(G) is isomorphic to Inn(G)

Prove that, for any group G, G/Z(G) is isomorphic to Inn(G)

Let G be a group of order 4. Prove that either G is cyclic or it...

Let G be a group of order 4. Prove that either G is cyclic or it is isomorphic to the Klein 4-group V4 = {1,(12)(34),(13)(24),(14)(23)}.

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

Find four groups of order 12 and show that no two are isomorphic to each other.

Find four groups of order 12 and show that no two are isomorphic to each other.

Please answer this two questions a) What group is A3 Isomorphic to? b) Consider the group...

Please answer this two questions a) What group is A3 Isomorphic to? b) Consider the group D3 . Find all the left cosets for H = hsi. Are they the same as the right cosets? Are they the same as the subgroup H and its clones that we can see in the Cayley graph for D3 with generating set {r, s}?

Show that any dihedral group is isomorphic to a subgroup of GLn(R). (Be as precise as...

Show that any dihedral group is isomorphic to a subgroup of GLn(R). (Be as precise as possible, giving an explicit map between generators r, s of D2n and certain 2 × 2 matrices.)