For which positive integers $n$, $m$ does there exist a polynomial of degree $n$, all coefficients of which are powers of $m$ with integer exponents, having $n$ rational roots, counting multiplicities? Proposed by Fedor Petrov
Source: 239 Open MO, 2018, Senior League, Problem 6
Tags: algebra
For which positive integers $n$, $m$ does there exist a polynomial of degree $n$, all coefficients of which are powers of $m$ with integer exponents, having $n$ rational roots, counting multiplicities? Proposed by Fedor Petrov