If `A=[(x,1),(1,0)]` and `A^(2)` is the identity matrix, then `x` is equal to

If A=[(1,0),(-1,7)] and l is an identity matrix of order 2, then the value of k, if A^(2)=8A+kI , is :

If e^(A) is defined as e^(A)=I+A+A^(2)/(2!)+A^(3)/(3!)+...=1/2 [(f(x),g(x)),(g(x),f(x))] , where A=[(x,x),(x,x)], 0 lt x lt 1 and I is identity matrix, then find the functions f(x) and g(x).

If A= [[1,2],[-3,-4]] and l is the identity matrix of order 2 then A^(2) equals "

Consider a matrix A=[(0,1,2),(0,-3,0),(1,1,1)]. If 6A^(-1)=aA^(2)+bA+cI , where a, b, c in and I is an identity matrix, then a+2b+3c is equal to

If X = [{:(1,-2),(0,3):}] , and I is a 2 xx 2 identity matrix, then X^(2)-2X + 3I equals to which one of the following ?

If A = [(1,0,2),(5,1,x),(1,1,1)] is a singular matrix then x is equal to

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

(C) equal to In1f for a matrix A, A? +| =0 where I is the identity matrix, then A equale1 0(A) o 1© @ :?-1 01(C)1 1c1 27[o -1