Question
(a) Prove that x is an accumulation point of a set S iff there exists a sequence (s n ) of points in S{x} such
(a) Prove that x is an accumulation point of a set S iff there exists a sequence (sn) of points in S\{x} such that (sn) converges to x.
(b) Prove that a set S is closed iff, whenever (sn) is a convergent sequence of points in S, it follows that lim sn is in S.
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An Introduction to Analysis
Authors: William R. Wade
4th edition
132296381, 978-0132296380
