If D is the determinant of a square matrix A of order n, then the determinant of its adjoint is

If A is a square matrix of order n then |kA|=

Adjoint OF square matrix

If I is a unit matrix of order 10, then the determinant of I is equal to

If I is a unit matrix of order 10, then the determinant of I is equal to

If A is an invertible matrix of order n then determinant of adj(A) is equal to

If A is a square matrix of order 3 having a row of zeros, then the determinant of A is

If A is a square matrix of order 3 having a row of zeros,then the determinant of A is

If A is a square matrix of order 3 having a row of zeros,then the determinant of A is

If A is a square matrix of order 3 having a row of zeros,then the determinant of A is

Let B be a skew symmetric matrix of order 3times3 with real entries. Given I-B and I+B are non-singular matrices. If A=(I+B)(I-B)^(-1), where det (A)>0 ,then find the value of det(2A)-det(adj(A)) [Note: det(P) denotes determinant of square matrix P and det(adj (P)) denotes determinant of adjoint of square matrix P respectively.]