Let `A ,B` be two matrices such that they commute. Show that for any positive integer `n ,` `A B^n=B^n A` (ii) `(A B)^n=A^nB^n`

Let A ,\ B be two matrices such that they commute. Show that for any positive integer n , (A B)^n=A^n B^n

Let A ,B be two matrices such that they commute. Show that for any positive integer n , (i) A B^n=B^n A (ii) (A B)^n=A^nB^n

Let A,B be two matrices such that they commute.Show that for any positive integer n,AB^(n)=B^(n)A

Let A,B be two matrices such that they commute.Show that for any positive integer n,AB^(n)=B^(n)A( ii) (AB)^(n)=A^(n)B^(n)

Let A,B be two matrices such that they commute.Show that for any positive integer n,(AB)^(n)=A^(n)B^(n)

Let A ,B be two matrices such that they commute, then for any positive integer n , (i) A B^n=B^n A (ii) (A B)^n =A^n B^n

Let A ,B be two matrices such that they commute, then for any positive integer n , (i) A B^n=B^n A (ii) (A B)^n =A^n B^n

Let A,B be two matrices such that they commute for any positive integer n.(i) AB^(n) = B^(n)A (ii) (AB)^(n) = A^(n) B^(n) A)Only (i) is correct B)Both (i) and (ii) are correct C)Only (ii) is correct D)None of (i) and (ii) is correct

Let A,B be two matrices such that they commute,then for any positive integer nAB^(n)=B^(n)A(AB)^(n)A^(n)B^(n) only (i) and (ii) correct both (i) and (ii) correct only (ii) is correct none of (i) and (ii) is correct

Let A and B are two matrices such that AB = BA, then for every n in N