How do you prove that $\sin(n)$ with $n=0,1,2...$ is not uniformly distributed mod 1?
(This is an exercise in Uniform Distribution of Sequences by Kuipers and Niederreiter.)
How do you prove that $\sin(n)$ with $n=0,1,2...$ is not uniformly distributed mod 1?
(This is an exercise in Uniform Distribution of Sequences by Kuipers and Niederreiter.)