Show that if G is a subgroup of Sn and |G| is odd, then G is...

Do the odd permutations of Sn form a subgroup of Sn? If so, provide a proof....

Do the odd permutations of Sn form a subgroup of Sn? If so, provide a proof. If not, provide a counterexample with justification

Please use two methods to prove that the set of odd permutations of Sn is not...

Please use two methods to prove that the set of odd permutations of Sn is not a subgroup of Sn.

Show that if G is a group, H a subgroup of G with |H| = n,...

Show that if G is a group, H a subgroup of G with |H| = n, and H is the only subgroup of G of order n, then H is a normal subgroup of G. Hint: Show that aHa-1 is a subgroup of G and is isomorphic to H for every a ∈ G.

Suppose that H is a proper subgroup of G of index n, and that G is...

Suppose that H is a proper subgroup of G of index n, and that G is a simple group, that is, G has no normal subgroups except G itself and {1}. Show thatG can be embedded in Sn.

1) Let G be a group and N be a normal subgroup. Show that if G...

1) Let G be a group and N be a normal subgroup. Show that if G is cyclic, then G/N is cyclic. Is the converse true? 2) What are the zero divisors of Z6?

Prove thatAnis a normal subgroup of Sn. Prove both that it is a subgroup AND that...

Prove thatAnis a normal subgroup of Sn. Prove both that it is a subgroup AND that it is normal

Let n ≥ 2. Show that exactly half of the permutations in Sn are even ,...

Let n ≥ 2. Show that exactly half of the permutations in Sn are even , by finding a bijection from the set of all even permutations in Sn to the set of all odd permutations in Sn.

Let N be a normal subgroup of G. Show that the order 2 element in N...

Let N be a normal subgroup of G. Show that the order 2 element in N is in the center of G if N and Z_4 are isomorphic.

For any subgroup A of a group G, and g ∈ G, show that gAg^-1 is...

For any subgroup A of a group G, and g ∈ G, show that gAg^-1 is a subgroup of G.

A subgroup H of a group G is called a normal subgroup if gH=Hg for all...

A subgroup H of a group G is called a normal subgroup if gH=Hg for all g ∈ G. Every Group contains at least two normal subgroups: the subgroup consisting of the identity element only {e}; and the entire group G. If G=S(n) show that A(n) (the subgroup of even permuations) is also a normal subgroup of G.