For definiteness, let us consider any open interval in R is $(c,d)=\{x∈R∣c<x<d\}$.

Furthermore, let $a \in (c,d)$ and $ϵ≤a−c\ and\ ϵ≤d−a$.

Now $a∈(c,d)$ and recall that the ϵ-neighborhood of $a$ is the set:

$\implies x\in V_\epsilon (a)$ so $a-\epsilon <x<a+\epsilon$ .

If we take $ϵ=min\{a−c,d−a\}$, then $\epsilon ≤a−c\ and\ \epsilon≤d−a$ .

So, $c=a−(a−c)<a−ϵ<x<a+ϵ<a+(d−a)=d$

$\implies x∈(c,d) ⟹ V_ϵ(a)⊆(c,d)$ .

Hence, every open interval in $R$ is an open set.

Now, let [c,d] is closed interval in $R$, so $[c,d]^c = (-\infin,c) \cup (d,\infin)$. In part (i), we proved every open interval is open set and also we known union of two open set is open. So complement of given closed interval is open set. So, given closed interval is closed set.