If M and N are square matrices of order 3 where det(M) =2 and det (N) = 3, then det(3MN) is

If A is an invertible matrix of order 2, then det( A^(-1) )=

If A and B are square matrices of the same order such that A B=B A ,then prove by induction that AB^n=B^n A . Further, prove that (AB)^n = A^n B^n for all n in N .

If A,B and C are n xx n matrix and det (A) = 2, det (B)= 3, and det (C ) = 5, then find the value of the det (A^(2) BC^(-1)) .

Given A and B are square matrices of order 2 such that absA=-1 , absB=3 . Find abs(3AB) .

If A is a square matrix of order 3 such that A^2 + A + 4I =0 , where 0 is the zero matrix and I is the unit matrix of order 3, then

Matrix A has m rows and n + 5 columns, matrix B has m rows and 11 - n columns, If both AB and BA exist, then a)AB and BA are square matrix b)AB and BA are of order 8 xx 8 and 3 xx 13 respectively. c)AB = BA d)None of these

If B is a non singular matrix and A is a square matrix such that B^-1 AB exists, then det (B^-1 AB) is equal to

A=[aij]_(mxxn) is a square matrix, if a) m=n b) m>n c) m< n d) none of these

Let A be an n order square matrix and B be its adjoint, then |AB + KI_(n)| , where K is a scalar quantity. a) (|A| + K)^(n-2) b) (|A| +K)^(n) c) (|A| + K)^(n - 1) d)None of these