A and B are square matrices and A is non-singular matrix, then `(A^(-1) BA)^n,n in I'` ,is equal to (A) `A^-nB^nA^n` (B) `A^nB^nA^-n` (C) `A^-1B^nA` (D) `A^-nBA^n`

(B) F (x 1) G (y -1) (C) G (-y) F (-x) (D) G (y 1) F (x 1) 27. Aand B are square matrices and A is non-singular matrix, then (A BA) ,n e I', is equal to (D) A n BA (C) A 1 Bn A. (A) An Bn An (B) An Bn A n al a2 a aro in H P 5, ae 4, then a4 as a 6 is equal to and a

If A,B are two n xx n non-singular matrices, then

If A and B are square matrices of the same order and A is non-singular,then for a positive integer n,(A^(-1)BA)^(n) is equal to A^(-n)B^(n)A^(n) b.A^(n)B^(n)A^(-n) c.A^(-1)B^(n)A d.n(A^(-1)BA)

If A and B are two n-rowed square matrices such that AB=O and B is non-singular. Then

Let A be an orthogonal non-singular matrix of order n, then |A-I_n| is equal to :

Let A;B;C be square matrices of the same order n. If A is a non singular matrix; then AB=AC then B=C

If A and adj A are non-singular square matrices of order n, then adj (A^(-1))=

If A is a non singular square matrix then |adj.A| is equal to (A) |A| (B) |A|^(n-2) (C) |A|^(n-1) (D) |A|^n