The Gauss-Lucas Theorem
Abstract
The Gauss-Lucas theorem says that for any complex polynomial P, the roots of the derivative P' lie in the convex hull of the roots of P. In other words, the roots of P' lie inside the smallest convex subset of the complex plane containing all the roots of P. This theorem is not hard to prove, but is there an intuitive explanation? In fact there is, using physics -- or more precisely, electrostatics in 2-dimensional space
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