Given the series
$$\sum_{n=1}^{\infty}(-1)^n\sin\left(\frac{n}{\pi}\right)$$
I need to test for convergence/divergence. I think the divergent test might work here. I could see that the $\lim_{n\rightarrow\infty}(-1)^n\sin(\frac{n}{\pi})$ might not exist, so the series is divergent. But I still need a solid proof here.
Any help is appreciated. Thanks.
I guess the standard argument should work. If $S_n=\sum_{k=0}^na_k$ converges then $a_k\rightarrow 0$. The necessary condition is not satisfied.
Apply $n^{th}$ test, which states, if $\lim_{\ n\to\infty} a_n\neq0$ then $\sum_{n=0}^{\infty}a_n$ diverges.
First, you want to think about $$\sin{\left(\frac{n}{\pi}\right)}.$$ This is similar to $\sin{(n)}$ except the period (of ocsillation) is different. We know that the limit of $\sin{(n)}$, as $n\rightarrow \infty$, does not exist since it oscillates indefinitely. Can you apply a similar argument to $\sin{(n/\pi)}$?
You are working modulo $2\pi$, so you need to think of $\frac{n}{\pi}$ modulo $2\pi \mathbb{Z}.$
Since $1/\pi^2$ is irrational, there are sequences of natural numbers $n_k$ such that the fractional part of $\frac{n_k}{2\pi^2}$ tends, for instance, to $1/3$ (any number such that $sin\ a\neq 0$ will do). This means that $|sin(n_k/\pi)|$ tends to a nonzero number as $k\to \infty$.
See this question (or look up Weyl equidistribution for a better result) for the density result used: Multiples of an irrational number forming a dense subset
