Question: how does this work for this problem Suppose that $f(x) = x^ {n} + a_{n-1} x^ {n-1}+ cdots + a_{0} in mathbb{Z} [x]$. If $r$

how does this work for this problem

Suppose that $f(x) = x^ {n} + a_{n-1} x^ {n-1}+ \\cdots + a_{0} \\in \\mathbb{Z} [x]$. If $r$ is rational and $x - r$ divides $f (x)$, prove that $r$ is an integer

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