If a skew -symmetric A is order `n xx n ` , where n is odd then `A^(n)` is :

If A is a skew-symmetric matrix and n is odd positive integer, then A^n is a skew-symmetric matrix a symmetric matrix a diagonal matrix none of these

If A is a skew symmetric matrix, then show that A^n is symmetric if n is even and A^n is skew symmetric if n is odd, n in N .

Fill in the blanks: If A is a symmetric matrix of order n and B is any square matrix of the same order then B'AB is a ……….. Matrix.

If A of order n xx n and det A = k, then find det (adj A).

If A and B are skew-symmetric matrices of the same order. Show that A-B is also skew-symmetric.

the square matrix A=[a_(ij)]_mxxm given by a_(ij)=(i-j)^(n), show that A is symmetic and skew-sysmmetic matrices according as n is even or odd, repectively.

If A and B are two skew symmetric matrices of same order, then AB is symmetric matrix if ……..

Fill in the blanks: If A is a square matrix of order n and there exists a square matrix B of order n such that AB = I_n = BA, then A is an ……………. Matrix.

If A_(1), A_(3), ... , A_(2n-1) are n skew-symmetric matrices of same order, then B =sum_(r=1)^(n) (2r-1) (A_(2r-1))^(2r-1) will be