Consider matrix A of order `2 xx 2` such that `A^(2) = 0. A^(2) - (a + d) A + (ad - bc) I = `

Consider the matrix A=[[3,-2],[4,-2]] find k so that A^2=kA-2I

If A is a square matrix of order n such that ladj (AdjA)| = |A|^(9) . Then the value of n can be a)4 b)2 c)Either 4 or 2 d)None of these

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

If A = [(1,0,0),(0,1,0),(a,b,-1)] and I is the unit matrix of order 3, then A^(2) + 2A^(4) + 4A^(6) is equal to a)7 A^(8) b)7 A^(7) c)8I d)6I

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

Consider the matrix A=[[3,1],[-1,2]] Find k so that A^2=kA-7I

Matrix A such that A^(2) = 2A - I , where I is the identity matrix, then for n ge 2, A^(n) is equal to a) 2^(n - 1) A - (n - 1) I b) 2^(n - 1)A - I c) n A - (n - 1) I d) nA - I

If A is a square matrix such that A^2=A , then (I+A)^2-3A is equal to a)A b)I-A c)I d)3A

Consider the matrices A=[[2,3],[4,5]] Prove that A^2-7A-2I=0

Let A be square matrix of order 3 . If |A|=2 , then the value of |A| |adj A| is a)8 b)-8 c)-1 d)32