Exercises
[0VS] Let \((X,d)\) be a metric space and let \(Dβ X\), show that these clauses are equivalent:
\(D\) is not totally bounded;
there exists \(\varepsilon {\gt}0\) and there is a sequence \((x_ n)_ nβ D\) for which
\[ β n,mββ, ~ d(x_ n,x_ m)β₯ \varepsilon \quad . \]