If A is a square matrix, A' its transpose, then `(1)/(2)(A-A')` is …. Matrix

If A is a square matrix, then

If A is a square matrix, then

If A is a square matrix then A-A\' is a

If A is any square matrix, then (1)/(2) (A-A^(T)) is a ____matrix.

If A is a square matrix such that A^(2)=A, then (I-A)^(2)+A=

If A is square matrix, A+A^(T) is symmetric matrix, then A-A^(T) =

If A' is the transpose of a square matrix A, then

Consider the following statements 1. If A' = A, then A is a singular matrix, where A' is the transpose of A. 2. If A is a square matrix such that A^(3) = I , then A is non-singular. Which of the statements guven above is/are correct ?