Suppose `A` and `B` are two non singular matrices such that `B != I, A^6 = I` and `AB^2 = BA`. Find the least value of `k` for `B^k = 1`

If A and B are non-singular matrices, then

Let A and B are two non - singular matrices such that AB=BA^(2),B^(4)=I and A^(k)=I , then k can be equal to

If A,B are two n xx n non-singular matrices, then

If A and B are two matrices such that AB=B and BA=A, then

If A and B are two square matrices such that AB=A and BA=B , then A^(2) equals

Suppose A and B are two 3xx3 non singular matrices such that tr (AB) = 7.57 then tr (BA+I_(3)) = ______

If A and B are non-singular matrices such that B^(-1)AB=A^(3), then B^(-3)AB^(3)=

A and B are two non-singular square matrices of each 3xx3 such that AB = A and BA = B and |A+B| ne 0 then

Suppose A and B be two ono-singular matrices such that AB= BA^(m), B^(n) = I and A^(p) = I , where I is an identity matrix. If m = 2 and n = 5 then p equals to