Question: Could someone please help me with this question DEFINITION A set S is said to be compact if whenever it is contained in the union

Could someone please help me with this question

DEFINITION A set S is said to be compact if whenever it is contained in the union of a pact iff cover of Sinsof open sets, it is contained in the union of some finite number of the sets in ". If is a family of open sets whose union contains S, then Fis .re Subearer called an open cover of S. If & C F and & is also an open cover of S, then is called a subcover of S. Thus S is compact iff every open cover of S contains a finite subcover. If S is a compact subset of RR and T is a closed subset of S, Then T is compact Prove This using the definition of compactress above

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