The transpose of a square matrix obtained by replacing the elements by their corresponding cofactors is called

If A' is the transpose of a square matrix A, then

If D is determinant of order 3 and D' is the determinant obtained by replacing the elements of D by their cofactors,then which one of the following is correct?

If D is determinant of order 3 and D' is the determinant obtained by replacing the elements of D by their cofactors, then which one of the following is correct ?

If D is determinant of order 3 and D' is the determinant obtained by replacing the elements of D by their cofactors, then which one of the following is correct ?

Which of the following is not correct in a given determinant of A , where A=([a_(i j)])_(3x3) (a)Order of minor is less than order of the det(A)(b) Minor of an element can never be equal to cofactor of the same element (c)Value of a determinant is obtained by multiplying elements of a row or column by corresponding cofactors (d)Order of minors and cofactors of elements of A is same

Transpose and Inverse of a Matrix

Transpose of transpose of a matrix is matrix itself.

Transpose of a column matrix is a column matrix.

If the matrix is a square matrix and it contains 36 elements then the order of the matrix is

Interchanging of elements of rows and columns of a matrix is called.