User:Vinkmar

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m363a4q7

${\displaystyle p^{q-1}+q^{p-1}\equiv 1(\mathrm{mod}pq)}$

But ${\displaystyle p}$ and ${\displaystyle q}$ are distinct primes, so for the above to be valid, the following two equations must hold:

${\displaystyle p^{q-1}+q^{p-1}\equiv 1(\mathrm{mod}p)}$ and ${\displaystyle p^{q-1}+q^{p-1}\equiv 1(\mathrm{mod}q)}$

Considering only the first of the two equations (the latter case is, for lack of a better term, symmetrical), we have:

${\displaystyle p^{q-1}\equiv 0(\mathrm{mod}p)}$ and ${\displaystyle q^{p-1}\equiv 1(\mathrm{mod}p)}$.

The former is obviously true. The latter is proven using Fermat's Little Theorem, QED