If A is a skew-symmetric matrix of odd order `n ,` then `|A|=0`

If A is a skew-symmetric matrix of odd order n , then |A|=O .

STATEMENT -1 All positive odd integral powers of a skew - symmetric matrix are symmetric. STATEMENT-2 : All positive even integral powers of a skew - symmetric matrix are symmetric. STATEMENT-3 If A is a skew - symmetric matrix of even order then |A| is perfect square

Let A be a skew-symmetric matrix of even order, then absA

The inverse of skew - symmetric matrix of odd order

If A = [a_(ij)] is a skew-symmetric matrix of order n, then a_(ij)=

If A is a skew-symmetric matrix of order 3, then prove that det A = 0 .

If matric A is skew-symmetric matric of odd order, then show that tr. A = det. A.

If A is skew-symmetric matrix, then trace of A 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 and n is odd positive integer, then A^n is