A square non-singular matrix A satisfies `A^2-A+2I=0," then "A^(-1)`=

Select the correct option from the given alternatives.If A is a non-singular matrix such that A^2-A+1 = 0 , then A^-1 =

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

If A is an 3 x3 non-singular matrix such that A A^(prime)=A^(prime)A and B=A^(-1)A^(prime), then B B ' equals:

Select the correct option from the given alternatives. From the matrix equation AB = AC we can conclude that B=C , provided. i] A is a singular matrix ii] A is a non-singular matrix iii] A is a symmetric matrix iv] A is a square matrix

If a matrix A is such that 4A^(3)+2A^(2)+7A+I=0 , then A^(-1) equals: a) 4A^(2)+2A+7I b) -(4A^(2)+2A+7I) c) -(4A^(2)-2A+7I) d) 4A^(2)+2A-7I

If A is a square matrix such that |A| ne 0 and m, n (ne 0) are scalars such that A^(2)+mA+nI=0 , then A^(-1)=

If A = [[x,0,0],[0,y,0],[0,0,z]] , is a non-singular matrix then find A^-1 by elementary transformations, Hence, find the inverse of [[2,0,0],[0,1,0],[0,0,-1]]