Show that the commutator subgroup of GL (n,F) is SL(n ,F).

If TL (n ,F) and STL(n,F) denote the (upper) triangular and special (upper) triangular groups of...

If TL (n ,F) and STL(n,F) denote the (upper) triangular and special (upper) triangular groups of degree n over G respectively , show that the commutator subgroup of TL(n ,F) is a subgroup of STL (n , F) while STL (n,F) is nilpotent of class n-1.

Show that S n is isomorphic to a subgroup of A n + 2.

Show that S n is isomorphic to a subgroup of A n + 2.

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.

Show that A-n is a normal subgroup of S-n. Hint: what is the index of A-n...

Show that A-n is a normal subgroup of S-n. Hint: what is the index of A-n in S-n?

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.

the order of GL(n,Z3) under multiplication is 8*6=48 what's the order of GL(n,Z2019) under multiplication and...

the order of GL(n,Z3) under multiplication is 8*6=48 what's the order of GL(n,Z2019) under multiplication and GL(n,Z2020) under multiplication

Determine if H is subgroup of G, if so prove it, if not explain 1. H...

Determine if H is subgroup of G, if so prove it, if not explain 1. H = {A in GL(2,c): det(A)3 =1}, G = GL(2,c) with matrix multiplication 2. H = {A belongs to GL(n,IR): get(A)=-1}, G=GL(n,IR) with matrix multiplication 3. H = {A belongs to GL(2,IR): AAT=I}, G=GL(2,IR) with matrix multiplication

the order of GL(n,Z3) under multiplication is 8*6=48 what's the order of GL(n,Z2019) under multiplication

the order of GL(n,Z3) under multiplication is 8*6=48 what's the order of GL(n,Z2019) under multiplication

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?

Suppose N is a normal subgroup of G such that |G/N|= p is a prime. Let...

Suppose N is a normal subgroup of G such that |G/N|= p is a prime. Let K be any subgroup of G. Show that either (a) K is a subgroup of N or (b) both G=KN and |K/(K intersect N)| = p.