I have proved that for each positive real number we can find an $n \times n$ diagonal matrix with each diagonal entries $r^{1/n}$ such $\det A=r.$ But how to prove for negative real numbers?
2026-04-26 03:27:02.1777174022
Prove that for each real number $r$ we can find an $n \times n$ square matrix $A$ with real entries such that determinant of $A$ is $r$.
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