The sum of the idempotent matrices A and B is idempotent if :

If B is an idempotent matrix, and A=I-B , then

If A is an idempotent matrix and I is an identify matrix of the Same order, then the value of n, such that (A+I)^n =I+127A is

If A is the sum of the odd terms and B is the sum of even terms in the expansion of (x+a)^(n) then A^(2)-B^(2) =

Let A and b are two square idempotent matrices such that ABpm BA is a null matrix, the value of det (A - B) cannot be equal

If A and B are symmetric matrices of the same order.then show that AB is symmetric if and only if AB=BA.

Let omega != 1 be a cube root of unity and S be the ste of all non - singular matrices of the form : [ (1,a,b),(omega,1,c),(omega^(2),omega,1)] where each of a , b and c is either 1 or 2 . Then the number of distinct matrices in the set S is :

Show that the characteristic roots of an idempotent matrix are either zero or unity.

Statement -1 (Assertion) and Statement - 2 (Reason) Each of these examples also has four alternative choices, ONLY ONE of which is the correct answer. You have to select the correct choice as given below Statement-1 If A and B are two matrices such that AB = B, BA = A, then A^(2) + B^(2) = A+B. Statement-2 A and B are idempotent motrices, then A^(2) = A, B^(2) = B .

If A and P are the square matrices of the same order and if P be invertible, show that the matrices A and P^(-1) have the same characteristic roots.