Let A,B are square matrices of same order satisfying `AB= A` and `BA=B` then `(A^2010+ B^2010)^2011 ` equals (A) `A+B` (B) `2010(A+B)` (C) `2011(A+B)` (D) `2^2010 (A+B)`

If A and B arę square matrices of same order such that AB = A and BA = B, then

If A and B are square matrices of the same order such that AB = A and BA = B, then……

If A and B are square matrices of the same order such that AB=A and BA=B ,then (A^(2)+B^(2))=?

If A and B are two square matrices of same order satisfying AB=A and BA=B, then B^2 is equal to A (B) B (C) A^2 (D) none of these

If A and B are two square matrices of same order satisfying AB=A and BA=B, then B^2 is equal to (A) A (B) B (C) A^2 (D) none of these

Let A and B are square matrices of same order satisfying AB=A, and BA=B, then (A^(2015)+B^(2015))^(2016) is equal to 2^(2015)(A^(3)+B^(3))( b) 2^(2016)(A^(2)+B^(2))2^(2016)(A^(3)+B^(3))( d) 2^(2015)(A+B)

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

If A and Bare square matrices of same order such that AB = A and BA = B, then AB^(2)+B^(2)= : a) AB b) A+B c) 2AB d) 2BA

If A and B are two matrices of order 3xx3 satisfying AB=A and BA=B , then (A+B)^(5) is equal to