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 a. a skew-symmetric matrix b. a symmetric matrix c. a diagonal matrix d. none of these

If A is a skew symmetric matrix and n is a positive integer then A^(n) is

If A^(T) is a skew-symmetric matrix and n is a positive integer, then A^(n) is

If A is a skew-symmetric matrix and n is a positive even integer, then A^(n) is

If A is a skew symmetric matrix and n is an even positive integer then A^(n) is

If A is a square matrix,then AA is a (a) skew- symmetric matrix (b) symmetric matrix (c) diagonal matrix (d) none of these

If A is a square matrix, then A A is a (a) skew-symmetric matrix (b) symmetric matrix (c) diagonal matrix (d) none of these

If A is skew-symmetric matrix then A^(2) is a symmetric matrix.

If A is skew-symmetric matrix then A^(2) is a symmetric matrix.

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