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<p><b>New page</b></p><div>[[File:Bijection.svg|Bijection|thumb]] [[File:Aleph0.svg|Aleph0|thumb|left]] '''Cardinal numbers''' are a fundamental part of [[mathematics]] used to denote the size of a [[set]], indicating how many elements are in the set. They are a basic concept in the field of [[mathematics]], particularly in [[set theory]], [[number theory]], and the foundations of [[mathematics]].<br />
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==Definition==<br />
In formal terms, a cardinal number is a type of [[number]] used to denote the quantity of items in a set. For example, the set {a, b, c} has a cardinal number of 3 because there are three elements in the set. Cardinal numbers are distinguished from [[ordinal numbers]], which order elements in a set; the cardinal number tells us "how many," while the ordinal number tells us "in what order."<br />
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==History==<br />
The concept of cardinality, which refers to the cardinal number of a set, can be traced back to [[Georg Cantor]], who is credited with the creation of set theory in the late 19th century. Cantor introduced the idea of comparing sets by their size and developed the concept of infinite cardinal numbers, leading to the discovery of different sizes of infinity.<br />
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==Types of Cardinal Numbers==<br />
Cardinal numbers can be categorized into two types: finite and infinite.<br />
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===Finite Cardinal Numbers===<br />
Finite cardinal numbers refer to the size of sets that contain a finite number of elements. These are the numbers typically used in everyday counting (1, 2, 3, etc.).<br />
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===Infinite Cardinal Numbers===<br />
Infinite cardinal numbers describe the size of sets that contain an infinite number of elements. Cantor's work showed that not all infinite sets are the same size; for example, the set of all [[natural numbers]] is smaller than the set of all [[real numbers]], even though both are infinite. The cardinal number of the set of natural numbers is denoted by ℵ₀ (aleph-null).<br />
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==Applications==<br />
Cardinal numbers are used across various fields of mathematics and its applications. In [[set theory]], they are essential for understanding the concept of size of sets, both finite and infinite. In [[number theory]], cardinal numbers help classify sizes of sets of numbers. Beyond pure mathematics, cardinal numbers find applications in [[computer science]], particularly in data structure and algorithm analysis, and in [[logic]] and [[philosophy]], especially in discussions about the nature of infinity.<br />
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==See Also==<br />
* [[Ordinal number]]<br />
* [[Set theory]]<br />
* [[Georg Cantor]]<br />
* [[Infinity]]<br />
* [[Aleph number]]<br />
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[[Category:Mathematics]]<br />
[[Category:Set theory]]<br />
[[Category:Number theory]]<br />
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