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

Define a skew-symmetric matrix.

If A is a symmetric matrix, B is a skew-symmetric matrix, A+B is nonsingular and C=(A+B)^(-1) (A-B) , then prove that (i) C^(T) (A+B) C=A+B (ii) C^(T) (A-B)C=A-B (iii) C^(T)AC=A

If A is a symmetric matrix, B is a skew-symmetric matrix, A+B is nonsingular and C=(A+B)^(-1) (A-B) , then prove that (i) C^(T) (A+B) C=A+B (ii) C^(T) (A-B)C=A-B (iii) C^(T)AC=A

If the matrix [(2,3),(5,-1)]=A +B , where A is symmetric and B is skew symmetric, then B=

Define a symmetric matrix.

If A= B+C such that B is a symmetric matrix and C is a skew - symmetric matrix , then B is given by :

Express A as the sum of a symmetric and a skew-symmetric matrix, where A=[(3,5),(-1,2)]

If a matrix A is both symmetric and skew symmetric, then

If A and B are square matrices of same order and B is a skew symmetric matrix, then A'BA is Skew symmetric matrix