Abstract
The concept of set is basic to all of mathematics and mathematical applications, as almost all mathematical objects can be construed as sets. The set is the fundamental discrete structure upon which other discrete structures are built. A set is a many that allows itself to be thought of as a one. Our brief focus here is on naïve set theory. First some important sets and special set operations are introduced. Then some set identities and three methods of proof of identities are discussed. Finally, the cardinality of sets, multisets, and fuzzy sets and also paradoxes in set theory are briefly presented.
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