2.6 A little topology

Let $S$ be a nonempty bounded set of real numbers, and let $M=supS.$ Prove that there exists a sequence $\left\{a_n\right\}$ of elements of $S$ such that $M=lim{a}_n.$ That is, prove that the supremum of a bounded set of real numbers is a limit point of that set. State and prove an analogous result for infs.

HINT: Use [link] , and let $ϵ$ run through the numbers $1/n.$

1. Suppose $S$ is a set of real numbers, and that $z=a+bi\in C$ with $b\ne 0.$ Show that $z$ is not a limit point of $S.$ That is, every limit point of a set of real numbers is a real number. HINT: Suppose false; write $a+bi=lim{x}_n,$ and make use of the positive number $\left|b\right|.$
2. Let $c$ be a complex number, and let $S={\overline{B}}_r\left(c\right)$ be the set of all $z\in C$ for which $|z-c|\le r.$ Show that $S$ is a closed subset of $C$ . HINT: Use part (b) of [link] .
3. Show that the open disk $B_r\left(0\right)$ is not a closed set in $C$ by finding a limit point of $B_r\left(0\right)$ that is not in $B_r\left(0\right).$
4. State and prove results analogous to parts b and c for intervals in $R.$
5. Show that every element $x$ of a set $S$ is a limit point of $S.$
6. Let $S$ be a subset of $C$ , and let $x$ be a complex number. Show that $x$ is not a limit point of $S$ if and only if there exists a positive number $ϵ$ such that if $|y-x|<ϵ,$ then $y$ is not in $S.$ That is, $S\cap B_{ϵ}\left(x\right)=\varnothing .$ HINT: To prove the “ only if” part, argue by contradiction,and use the sequence $\{1/n\}$ as $ϵ$ 's.
7. Let $\left\{a_n\right\}$ be a sequence of complex numbers, and let $S$ be the set of all the $a_n$ 's. What is the difference between a cluster point of the sequence $\left\{a_n\right\}$ and a limit point of the set $S?$
8. (h) Prove that the cluster set of a sequence is a closed set. HINT: Use parts (e) and (f).

1. Show that the set $Q$ of all rational numbers is not a closed set. Show also that the set of all irrational numbers is not a closed set.
2. Show that if $S$ is a closed subset of $R$ that contains $Q,$ then $S$ must equal all of $R.$