P.T the determinant of skew symmetric matrix of order 3 is zero.

Assertion (A) : |{:(0,p-e,e-r),(e-p,0,r-p),(r-e,p-r,0):}|=0 Reason (R) : The determinant of a skew symmetric matrix of odd order is zero.

The determinant of a skew symmetric matrix of odd order is

The determinant of a skew symmetric matrix of odd order is

. The determinant of a skew symmetric matrix of odd order is

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,

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,

Statement 1: The determinant of a matrix A=[a_(ij)]_(5xx5) where a_(ij)+a_(ji)=0 for all i and j is zero.Statement 2: The determinant of a skew-symmetric matrix of odd order is zero

"The determinant of a skew symmetric matrix of odd order is"

Show that the determinant of skew - symmetric matrix of order three is always zero.

Prove that determinant of a skew symmetric matrix of odd order is always 0.