In a skew-symmetrix matrix, the diagonal elements are all

In a skew-symmetric matrix, every principal diagonal element is

If A is the n xx n matrix whose elements are all '1' and B is the n xx n matrix whose diagonal elements are all 'n' and other elements are n-r , then A^(2) is a scalar multiple of

If A and B are symmetric matrices,then ABA is (a) symmetric matric b) skew-symmetric matrix (c) diagonal matrix (d) scalar matrix

The inverse of a skew symmetric matrix of odd order is 1)a symmetric matrix 2)a skew symmetric matrix 3)a diagonal matrix 4)does not exist

If A is skew-symmetric matrix, then trace of A is

If A is a skew-symmetric matrix and n is an even natural number,write whether A^(n) is symmetric or skew-symmetric matrix or neither of the two

The matrix A=[(1, 0, 0),( 0, 2, 0),( 0, 0, 4)] is (a) identity matrix (b) symmetric matrix (c) skew-symmetric matrix (d) diagonal matrix

skew symmetric matrix: definition and examples

Prove that diagonal elements of a skew symmetric matrix are all zeroes.