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Element (mathematics)

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In mathematics, the elements or members of a set (or more generally a class) are all those objects which when collected together make up the set (or class).

1 Set theory and elements
2 Notation
3 Cardinality of sets
4 Examples
5 Footnotes
6 References

Writing $A = {1,2,3,4}$ , means that the elements of the set $A$ are the numbers 1, 2, 3 and 4. Groups of elements of $A$ , for example ${1,2}$ , are subsets of $A$ .

Elements can themselves be sets. For example consider the set $B = {1,2,{3,4}}$ . The elements of $B$ are not 1, 2, 3, and 4. Rather, there are only three elements of $B$ , namely the numbers 1 and 2, and the set ${3,4}$ .

The elements of a set can be anything. For example, $C = {red, green, blue}$ , is the set whose elements are the colors red, green and blue.

The relation "is an element of", also called set membership, is denoted by $\in$ , and writing

$x \in A$

means that $x$ is an element of $A$ . Equivalently one can say or write " $x$ is a member of $A$ ", " $x$ belongs to $A$ ", " $x$ is in $A$ ", or " $A$ includes $x$ ", or " $A$ contains $x$ ". The negation of set membership is denoted by $\notin$ .

The number of elements in a particular set is a property known as cardinality, informally this is the size of a set. In the above examples the cardinality of the set $A$ is 4, while the cardinality of the sets $B$ and $C$ is 3. An infinite set is a set with an infinite number of elements, while a finite set is a set with a finite number of elements. The above examples are examples of finite sets. An example of an infinite set is the set of natural numbers, $\mathbb{N} = \{ 1, 2, 3, 4 \ldots \}$ .

Using the sets defined above as

$2 \in A.$
$\{3, 4 \} \in B.$
${3,4}$ is a member of $B .$
$\mbox{Yellow} \notin C.$
The cardinality of $D = {2,4,6,8,10,12}$ is finite and equal to 6.
The cardinality of $P = \{ 2, 3, 5, 7, 11, 13 \ldots \}$ (the prime numbers) is infinite.

Paul R. Halmos 1960, Naive Set Theory, Springer-Verlag, NY, ISBN 0-387-90092-6. "Naive" means that it is not fully axiomatized, not that it is silly or easy (Halmos's treatment is neither).

Patrick Suppes 1960, 1972, Axiomatic Set Theory, Dover Publications, Inc. NY, ISBN 0-486-61630-4. Both the notion of set (a collection of members), membership or element-hood, the axiom of extension, the axiom of separation, and the union axiom (Suppes calls it the sum axiom) are needed for a more thorough understanding of "set element".

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Logic

Main articles

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Key concepts
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Reasoning	Deduction · Induction · Abduction
Informal	Proposition · Inference · Argument · Validity · Cogency · Term logic · Critical thinking · Fallacies · Syllogism
Mathematical	Set · Element · Class · Wff · Axiom · Theorem · Interpretation · Consistency · Soundness · Completeness · Decidability · Satisfiability · Formal system · Set theory · Proof theory · Model theory · Recursion theory · Syntax · Semantics · Semantic consequence · Syntactic consequence ·
Zeroth-order	Boolean functions · Monadic predicate calculus · Propositional calculus · Logical connectives · Truth tables
Predicate	First-order · Quantifiers · Second-order
Modal	Deontic · Epistemic · Temporal · Doxastic
Other non-classical	Computability · Fuzzy · Linear · Relevance · Non-monotonic