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Problem 2

Exercise 4.2 (Squeeze theorem for compact Euclidean sets)   Suppose $K$ is a compact set contained in an open set $U$. Find an open set $V$ whose closure is compact and

$\displaystyle K\subseteq V \subseteq \overline{V} \subseteq U$ (4.6)

Proof. See Exercise [*]. $\qedsymbol$