For each positive integer $n$ let $\tau (n)$ be the sum of divisors of $n$. Find all positive integers $k$ for which $\tau (kn - 1) \equiv 0$ (mod $k$) for all positive integers $n$.
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Tags: number theory, 6th edition
For each positive integer $n$ let $\tau (n)$ be the sum of divisors of $n$. Find all positive integers $k$ for which $\tau (kn - 1) \equiv 0$ (mod $k$) for all positive integers $n$.