If a matrix A is such that `3A^(3)+2A^(2)+5A+I=0`, then its inverse is

If a matrix A is such that 3A^(3)+2A^(2)+5A+I=0, then A^(-1) is equal to

If a matrix A is such that 3A^(3)+2A^(2)+5A+1=0 . Then A^(-1) is equal to:

If A is a square matrix of order 3 and I is an ldentity matrix of order 3 such that A^(3) - 2A^(2) - A + 2l =0, then A is equal to

If f = {(2,3) ,(3,4) , (4,5} , then its inverse is :

Let A be a 3xx3 matrix such that A^(2)-5A+7I=0 then which of the statements is true

If A is a 3xx3 matrix such that A^T = 5A + 2I , where A^T is the transpose of A and I is the 3xx3 identity matrix, then there exist a column matrix X=[[x],[y],[z]]!=[[0],[0],[0]] then AX is equal to

Let A be a square matrix satisfying A^(2)+5A+5I=0 the inverse of A+2l is equal to

Let A be a matrix of order 3 such that A^(2)=3A-2I where, I is an identify matrix of order 3. If A^(5)=alphaa+betaI , then alphabeta is equal to

Let A be a square matrix satisfying A^(2)+5A+5I=0 . The inverse of A+2I is equal to :