I am to assume that $K$ is a compact metric space. I must prove that there are two points $x,y$ contained in $K$ such that $d(x,y)=\text{diam}(K)$.
Recall $\text{diam}(K)= \sup \{ d(x,y) \mid x,y \in K \}$.
I'm having trouble figuring out exactly what I need to do to get started on this proof and what it is I need to prove along the way. I know the definitions, but I'm having trouble applying them to this problem.
Thanks