A,B,C are three matrices of the same order such that any two any symmetric and the `3^(rd)` one is skew symmetric. If X = ABC + CBA and Y = ABC - CBA, then `(XY)^(T)` is

If A and B are symmetric matrices of the same order, then prove that (A+B) is also symmetric.

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

If A,B are symmetric matrices of same order then AB-BA is always a …………….

Let A and B be two symmetric matrices of same order. Then show that AB-BA is a skew-symmetric matrix.

Let A and B be 3 xx 3 matrices of real numbers, where A is symmetric , B is skew symmetric and (A + B) (A - B) = (A - B) ( A + B). If (AB)^(t) = (-1)^(k) AB , where (AB)^(t) is the transpose of the matrix AB, then k is a)any integer b)odd integer c)even integer d)cannot say anything

If A and B are symmetric matrices of the same order the X = AB + BA and Y = AB-BA, then XY^(T) is equal to a)XY b)YX c) -YX d)None of these

If A, B are symmetric matrices of same order, then AB-BA is a A) skew symmetric matrix, B) Symmetric matrix, C) Zero matrix, D) Identity matrix

The inverse of a skew symmetric matrix of odd order is a)A symmetric matrix b)A skew - symmetric c)Diagonal matrix d)Does not exist

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