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Prove that for any positive integer n, there exists a polynomial P(x) with real coefficients such that P(n) = n^n.
Prove that for any positive integer n, there exists a polynomial P(x) with real coefficients such that P(n) = n^n.
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Discrete and Combinatorial Mathematics An Applied Introduction
Authors: Ralph P. Grimaldi
5th edition
201726343, 978-0201726343
