Statement -1 : Determinant of a skew-sym...

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,

A

Statement I is true and Statement II is false

B

Both Statements are true

C

Both Statements are false

D

Statement I is false and Statement II is true

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The correct Answer is:

A

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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,

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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,