Let $\mu (n)$ be the Möbius function. I want to prove the following formula: $$\mu (n)=\sum_{\substack{1\leq k \leq n\\ (k,n)=1}}\cos \frac{2k\pi}{n}.$$ Let $F(n)$ be the right hand side, then by Möbius Inversion, it suffices to show that $(F*1)(n)=\delta(n)$, where $*$ is the dirichlet convoluti...