If matric A is skew-symmetric matric of odd order, then show that tr. A = det. A.

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

If A and B are symmetric matrices of same order than AB-BA is a:

If A is a skew symmetric matrix of order n and C is a column matrix of order nxx1 ,then C^(T)AC is

If A and B are symmetric matrices of order n,where (A ne B) ,then:

If A and B are symmetric matrices of same order, prove that AB + BA is a symmetric matrix.

If A and B are symmetric matrices of same order, prove that AB+BA is a symmetric matrix.

Let Aa n dB be two nonsinular square matrices, A^T a n dB^T are the transpose matrices of Aa n dB , respectively, then which of the following are correct? B^T A B is symmetric matrix if A is symmetric B^T A B is symmetric matrix if B is symmetric B^T A B is skew-symmetric matrix for every matrix A B^T A B is skew-symmetric matrix if A is skew-symmetric

If matrix A=[(0,1,-1),(4,-3,4),(3,-3,4)]=B+C , where B is symmetric matrix and C is skew-symmetric matrix, then find matrices B and C.

If A and B are symmetric matrices of same order, prove that AB-BA is a skew -symmetric matrix.