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

(i) If A and B are symmetric matrices of same order AB-BA is a skew symmetric matrix. (ii) [(1,-1,2),(5,7,2),(6,6,4)] is a singular matrix (iii) (AB)^(-1)=A^(-1)B^(-1) (iv) If A =((1,3),(0,1)) thus A^(3)=((1,27),(0,1)) .State which option is correct.

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

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.

If Aa n dB are symmetric matrices of the same order and X=A B+B Aa n dY=A B-B A ,t h e n(X Y)^T is equal to X Y b. Y X c. -Y X d. none of these

If A and B are matrices of the same order, then A B^T-B A^T is a/an (a) skew-symmetric matrix (b) null matrix (c) unit matrix (d) symmetric matrix

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

If A and B are square matrix of same order then (A-B)^(T) is:

If a and B are square matrices of same order such that AB+BA=O , then prove that A^(3)-B^(3)=(A+B) (A^(2)-AB-B^(2)) .