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

Suppose that a cyclic group G has exactly three subgroups: G itself, e, and a subgroup...

Suppose that a cyclic group G has exactly three subgroups: G itself, e, and a subgroup of order p, where p is a prime greater than 2. Determine |G|

3. Suppose G = <a> is a cyclic group of order 15 (i.e. a has order...

3. Suppose G = <a> is a cyclic group of order 15 (i.e. a has order 15), and consider the subgroup K = <a^3>. (a) Determine the order of K. (b) Use Lagrange’s theorem to determine the index of K in G, and then list the distinct cosets of K in G explicitly. (Hint: Consider the cosets Ke and Kb for b does not ∈K

Let H=<(2 3)> be the cyclic subgroup of G=S3 generated by the transposition (2 3). Write...

Let H=<(2 3)> be the cyclic subgroup of G=S3 generated by the transposition (2 3). Write (as sets) the right-cosets and left-cosets of H in 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 n be an integer greater than 2. Prove that every subgroup of Dn with odd...

Let n be an integer greater than 2. Prove that every subgroup of Dn with odd order is cyclic.

Suppose that G is a cyclic group, with generator a. Prove that if H is a...

Suppose that G is a cyclic group, with generator a. Prove that if H is a subgroup of G then H is cyclic.

Find all pairwise non isomorphic abelian groups of order 2000, as direct product of cyclic groups.

Find all pairwise non isomorphic abelian groups of order 2000, as direct product of cyclic groups.

What is a subset of pentagon D5 that is a subgroup? Why?, then give an example...

What is a subset of pentagon D5 that is a subgroup? Why?, then give an example of a cyclic subgroup of pentagon D5

Prove that A5 has no subgroup of order 15.

Prove that A5 has no subgroup of order 15.

Prove that A5 has no subgroup of order 20.

Prove that A5 has no subgroup of order 20.