Exercises
[0PQ] Topics:closure.Prerequisites:[0P6], [0PN].
Given a metric space \(X\) and a set \(A⊆ X\), show that
\[ \overline A= \overline{\left(\overline A\right)} \]either by transitioning to the complement set and using [0PJ], or by using the definition of \(\overline A\) as ”set of adherent points”.
As discussed in [0PM], this is equivalent to saying that \(\overline A\) is a closed set.