Let M be a column vector (not null vector) and `A=(MM^T)/(M^TM)` the matrix A is : (where `M^T` is transpose matrix of M)

Let M be a column vector (not null vector) and A=(MM^(T))/(M^(T)M) the matrix A is : (where M^(T) is transpose matrix of M)

If the order of matrix A is m xx n, then the order of the transpose of matrix A is :

Let A and B be two matrices such that the order of A is 5xx7 . If A^(T)B and BA^(T) are both defined, then (where A^(T) is the transpose of matrix A)

Define a symmetric matrix.Prove that for A=[2456],A+A^(T) is a symmetric matrix where A^(T) is the transpose of A

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 A=[[3,-47,8]], show that A-A^(T) is a skew symmetric matrix where A^(T)1 s the transpose of matrix A

Let M be a 2xx2 symmetric matrix with integer entries. Then M is invertible if The first column of M is the transpose of the second row of M The second row of M is the transpose of the first column of M M is a diagonal matrix with non-zero entries in the main diagonal The product of entries in the main diagonal of M is not the square of an integer

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.