If `A` is a skew symmetric matrix, then `B=(I-A)(I+A)^(-1)` is (where `I` is an identity matrix of same order as of `A`)

If A is skew symmetric matrix, then I - A is (where I is identity matrix of the order equal to that of A)

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

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

If A is an idempotent matrix satisfying (I-0.4A)^(-1)=I-alphaA where I is the unit matrix of the same order as that of A then the value of alpha is

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

If A is symmetric as well as skew-symmetric matrix, then A is

If A is symmetric as well as skew-symmetric matrix, then A is

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 .

For a matrix A, if A^(2)=A and B=I-A then AB+BA +I-(I-A)^(2) is equal to (where, I is the identity matrix of the same order of matrix A)