Here is a similar example: Suppose you want to find $x$ where ( $0 ≦ x ≦ 100$ ) and $17^{13} \equiv x mod 101$ . As $17^{13}$ is too large for most calculators to show exactly we start with $17^{6} = 24137569$ and, first dividing this by 101, we find that $17^{6} = (238985) (101) + 84$ so we now know that $17^{6} \equiv 84 mod 101 .$

The next step is to use this to tackle $17^{13}$ .

$\begin{matrix} 17^{13} & = (17^{6})^{2} \times 17 \\ \equiv 84^{2} \times 17 \equiv 119952 mod 101 \\ 119952 & = 1187 \times 101 + 65 \\ \equiv 65 mod 101 . \end{matrix}$

Hence $x = 65$ .