Can anyone provide a proof of the following inequality? If $n$ is a positive integer, $n\geq2$, then $$\cos(n) \leq 1 - 2^{-n}.$$ This is satisfied if $n$ is not within about $2^{-n/2}$ of a multiple of $2\pi$.

This inequality is sufficient for something else I am trying to prove but I and others have been unable to prove it.