Odd Determinant: Explaining a Strange Phenomenon

TTob · Sep 20, 2008

I don't understand this :

let A is n x n matrix whose entries are precisely the numbers 1, 2, . . . , n^2.
Put odd numbers into the diagonal of A, only even numbers above the diagonal and arrange the entries under the diagonal arbitrarily. Then det(A) is odd.

What is the explanation ?

HallsofIvy · Sep 20, 2008

What have you tried? In particular, have you tried seeing what happens for n= 2 and 3?

TTob · Sep 22, 2008

for n=2 we have det(A) = -5. so what ?

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