Let $x_n$ be a sequence in a Hilbert space such that $\left\Vert x_n \right\Vert=1$ and $ \langle x_n,\ x_m \rangle =0 $, for all $n \neq m$.
Let $ K= \{ x_n/ n : n \in \mathbb{N} \} \cup \{0\} $.
I need to show that $K$ is compact, $\operatorname{co}(K)$ is bounded, but not closed and finally find all the extreme points of $ \overline{\operatorname{co}(K)} $ .