Prove that there exists a unique polynomial function f with positive integer coefficients such that $f(1) = 6$ and $f(2) = 2016$.
Source: Flanders Math Olympiad 2016 p4
Tags: algebra, polynomial, Integer Polynomial
Prove that there exists a unique polynomial function f with positive integer coefficients such that $f(1) = 6$ and $f(2) = 2016$.