If `A=[[2,5],[1,3]],B=[[4,-2],[-1,3]]` and `I` is the identity matrix of the same order and `A^T` is transpose of matrix `A` then find `A^(T)B+BI`

If A=[{:(,2,5),(,1,3):}], B=[{:(,4,-2),(,-1,3):}] and I is the identify matric of the same order and A^(t) is the transpose of matrix A, find A^(t) B+BI .

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

If A=[[3m,-4],[1,-1]] , show that (A-A^T) is skew symmetric matrix, where A^T is the transpose of matrix A.

If "AA"^T=I where A^T is transpose of matrix A then, 1/2A[(A+A^T)^2+(A-A^T)^2]=?

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

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=[[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,-47,8]], show that A-A^(T) is a skew symmetric matrix where A^(T)1 s 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