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ordina

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The answer ORDINA has 0 possible clue(s) in existing crosswords.

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There are 6 letters in ORDINA ( A¹D²I¹N¹O¹R¹ )

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Definitions of ordina in various dictionaries:

ORDINA - In set theory, an ordinal number, or ordinal, is one generalization of the concept of a natural number that is used to describe a way to arrange a co...

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Geographic Matches
Ordina, Kurgan, RUSSIAN FEDERATION

Ordina might refer to
In set theory, an ordinal number, or ordinal, is one generalization of the concept of a natural number that is used to describe a way to arrange a collection of objects in order, one after another. Any finite collection of objects can be put in order just by the process of counting: labeling the objects with distinct natural numbers. Ordinal numbers are thus the "labels" needed to arrange collections of objects in order. * An ordinal number is used to describe the order type of a well ordered set (though this does not work for a well ordered proper class). A well ordered set is a set with a relation > such that* (Trichotomy) For any elements x and y, exactly one of these statements is true * x > y * y = x * y > x * (Transitivity) For any elements x, y, z, if x > y and y > z, then x > z * (Well-foundedness) Every nonempty subset has a least element, that is, it has an element x such that there is no other element y in the subset where x > yTwo well ordered sets have the same order type if and only if there is a bijection from one set to the other that converts the relation in the first set to the relation in the second set. * Whereas ordinals are useful for ordering the objects in a collection, they are distinct from cardinal numbers, which are useful for saying how many objects are in a collection. Although the distinction between ordinals and cardinals is not always apparent in finite sets (one can go from one to the other just by counting labels), different infinite ordinals can describe the same cardinal. Like other kinds of numbers, ordinals can be added, multiplied, and exponentiated, although the addition and multiplication are not commutative. * Ordinals were introduced by Georg Cantor in 1883 to accommodate infinite sequences and to classify derived sets, which he had previously introduced in 1872 while studying the uniqueness of trigonometric series.

Ordina might refer to

In set theory, an ordinal number, or ordinal, is one generalization of the concept of a natural number that is used to describe a way to arrange a collection of objects in order, one after another. Any finite collection of objects can be put in order just by the process of counting: labeling the objects with distinct natural numbers. Ordinal numbers are thus the "labels" needed to arrange collections of objects in order.
* An ordinal number is used to describe the order type of a well ordered set (though this does not work for a well ordered proper class). A well ordered set is a set with a relation > such that* (Trichotomy) For any elements x and y, exactly one of these statements is true
* x > y
* y = x
* y > x
* (Transitivity) For any elements x, y, z, if x > y and y > z, then x > z
* (Well-foundedness) Every nonempty subset has a least element, that is, it has an element x such that there is no other element y in the subset where x > yTwo well ordered sets have the same order type if and only if there is a bijection from one set to the other that converts the relation in the first set to the relation in the second set.
* Whereas ordinals are useful for ordering the objects in a collection, they are distinct from cardinal numbers, which are useful for saying how many objects are in a collection. Although the distinction between ordinals and cardinals is not always apparent in finite sets (one can go from one to the other just by counting labels), different infinite ordinals can describe the same cardinal. Like other kinds of numbers, ordinals can be added, multiplied, and exponentiated, although the addition and multiplication are not commutative.
* Ordinals were introduced by Georg Cantor in 1883 to accommodate infinite sequences and to classify derived sets, which he had previously introduced in 1872 while studying the uniqueness of trigonometric series.

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ordina

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There are 6 letters in ORDINA ( A1D2I1N1O1R1 )

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Definitions of ordina in various dictionaries:

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There are 6 letters in ORDINA ( A¹D²I¹N¹O¹R¹ )