If `A=[[2,4],[5,6]]`, show that `(A-A^T)` is a skew symmetric matrix, where `A^T` is the transpose of matrix A.

If A=[[3,4],[5,1]] , show that A-A^T is a skew symmetric matrix, where A^T denotes the transpose of matrix A

If A=[[3,-4], [1,-1]] , show that A-A^T is a skew symmetric matrix.

If A=[[4,1],[5,8]] , show that A+A^T is symmetric matrix, where A^T denotes the transpose of matrix A

If A=[[2, 3], [4, 5]] , prove that A-A^T is a skew-symmetric matrix.

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

If the matrix A=((2,3),(4,5)) , then show that A-A^(T) is a skew-symmetric matrix.

Define a symmetric matrix. Prove that for A=[2 4 5 6] , A+A^T is a symmetric matrix where A^T is the transpose of Adot

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

It A is a symmetric matrix, write whether A^T is symmetric or skew - symmetric matrix.

If A is a symmetric matrix, write whether A^T is symmetric or skew-symmetric.