For any two matrices A and B of the same order; `(A+B)^T = A^T + B^T`

If A and B are any two square matrices of the same order then (A) (AB)^T=A^TB^T (B) (AB)^T=B^TA^T (C) Adj(AB)=adj(A)adj(B) (D) AB=0rarrA=0 or B=0

If A and B are any two square matrices of the same order then (A) (AB)^T=A^TB^T (B) (AB)^T=B^TA^T (C) Adj(AB)=adj(A)adj(B) (D) AB=0rarrA=0 or B=0

If two matrices A and B are of the same order, then 2A+B=B+2A .

If A and B are any two matrices of the same order, then (AB)=A'B'

If A and B are any two matrices of the same order, then (AB)=A'B'

For two matrices A and B , verify that (A B)^T=B^T\ A^T , where A=[[1 ,3 ] , [2 ,4]] , B=[[1 , 4 ] , [ 2 ,5] ]

If A and B are symmetrices matrices of the same order, then A B^T B A^T is a (a) skew-symmetric matrix (b) null matrix (c) symmetric matrix (d) none of these

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

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

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