The determinant of a skew symmetric matrix of odd order is 

The trace of a skew symmetric matrix of odd order is equal to its A.Determinant value C. Order B.Transpose D.Index

The inverse of a skew symmetric matrix of odd order is 1)a symmetric matrix 2)a skew symmetric matrix 3)a diagonal matrix 4)does not exist

Statement -1 : Determinant of a skew-symmetric matrix of order 3 is zero. Statement -2 : For any matrix A, Det (A) = "Det"(A^(T)) and "Det" (-A) = - "Det" (A) where Det (B) denotes the determinant of matrix B. Then,

The inverse of a skew-symmetric matrix of odd order a.is a symmetric matrix b.is a skew- symmetric c.is a diagonal matrix d.does not exist

The inverse of a skew symmetric matrix is

The diagonal elements of a skew-symmetric matrix are:

If A is a skew-symmetric matrix of odd order n, then |A|=0

Show that every skew-symmetric matrix of odd order is singular.

Which of the following is incorrect? 1. Determinant of Nilpotent matrix is 0 2. Determinant of an Orthogonal matrix = 1 or -1 3. Determinant of a Skew - symmetric matrix is 0. 4. Determinant of Hermitian matrix is purely real.