If B, C are square matrices of same order such that `C^(2)=BC-CB` and `B^(2)=-I`, where I is an identity matrix, then the inverse of matrix `(C-B)` is

If A , B are two square matrices of same order such that A+B=AB and I is identity matrix of order same as that of A , B , then

Let A and B be square matrices of the same order such that A^(2)=I and B^(2)=I , then which of the following is CORRECT ?

If A is a square matrix such that A^2 = A , then write the value of 7A-(I + A)^3 , where I is an identity matrix.

if for a matrix A, A^2+I=O , where I is the identity matrix, then A equals

If A, B, and C are three square matrices of the same order, then AB=AC implies B=C . Then

If A, B, and C are three square matrices of the same order, then AB=AC implies B=C . Then

If A, B and C are square matrices of same order and I is an identity matrix of the same order, such that C^(2)=CB+AC and AB=I , then (C-A)^(-1) is equal to

A is a square matrix and I is an identity matrix of the same order. If A^(3)=O , then inverse of matrix (I-A) is

If A is a square matrix such that A(a d j\ A)=5I , where I denotes the identity matrix of the same order. Then, find the value of |A| .

If A is a square matrix such that A^2=A , then write the value of 7A-(I+A)^3, where I is the identity matrix.