Let A and B be any two `3xx3` matrices . If A is symmetric and B is skew -symmetric then the matrix AB-BA is :

If Ais symmetric and B is skew-symmetric matrix, then which of the following is/are CORRECT ?

If A is a skew-symmetric matrix of order 3 ,then the matrix A^(4) is

Let A and B be symmetric matrices of same order. Then A+B is a symmetric matrix, AB-BA is a skew symmetric matrix and AB+BA is a symmetric matrix

Let A and B are 3xx3 matrices with real number entries, where A is symmetric, B is skew - symmetric and (A+B)(A-B)=(A-B)(A+B) . If (AB)^(T)=(-1)^(k)AB , then the sum of all possible integral value of k in [2, 10] is equal to (where A^(T) represent transpose of matrix A)

Let A=[a_(ij)] and B=[b_(ij)] are two square matrices of order n such that A is symmetric and B is skew symmetric,then which of the following is true.-

Let A and B be symmetric matrices of the same order. Then show that : AB-BA is skew - 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

Write a matrix of order 3xx3 which is both symmetric and skew-symmetric matrix.

Which of the following statement is incorrect? Statement I: If A and B are symmetric matrices of order n, then AB+BA is symmetricand AB - BA is skew symmetric Statement Ill: |adj(adjA)|=|A|^((n-1)^(2))

Let A dn B be 3xx3 matrtices of ral numbers,where A is symmetric,B is skew- symmetric,and (A+B)(A-B)=(A-B)(A+B). If (AB)^(t)=(-1)^(k)AB, where (AB)^(t) is the transpose of the mattix AB, then find the possible values of k.