what is determinet of skew symmetric matrix
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It turns out that the determinant of A for n even can be written as the square of a polynomial in the entries of A, which was first proved by Cayley: det(A) = Pf(A)2. This polynomial is called the Pfaffian of A and is denoted Pf(A). Thus the determinant of a real skew-symmetric matrix is always non-negative.
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It turns out that the determinant of A for n even can be written as the square of a polynomial in the entries of A, which was first proved by Cayley: det(A) = Pf(A)2. This polynomial is called the Pfaffian of A and is denoted Pf(A). Thus the determinant of a real skew-symmetric matrix is always non-negative.
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Answer:
determinet of skew symmetric matrix is equal to the determinant of matrix A.......
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