If A and B are two square matrices such that B = - `A^(-1)` BA then `(A + B)^(2)` is equal to

Let A and B are two square matrices such that AB = A and BA = B , then A ^(2) equals to : a)B b)A c)I d)O

If A and B are square matrices of the order and if A=A^(T),B=B^(T) , then (ABA)^(T) is equal to a) BAB b) ABA c)ABAB d) AB^(T)

If B is a non singular matrix and A is a square matrix such that B^-1 AB exists, then det (B^-1 AB) is equal to

A and B are two non - singular matrices such that A^(6) = I and AB^(2) = BA( B != I) . A value of k so that B^(k) = I is a)31 b)32 c)64 d)63

If A and B are square matrices of the same order such that A^(2)= A, B^(2) = B, AB = BA = O , then a) (A - B)^(2) = B - A b) (A- B)^(2) = A - B c) (A + B)^(2) = A + B d)None of these

Suppose A and B are two symmetric matrices. Prove that (AB)^T = BA

If A and B are square matrices of the same order such that A B=B A ,then prove by induction that AB^n=B^n A . Further, prove that (AB)^n = A^n B^n for all n in N .

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