In mathematics, an unordered pair or pair set is a set of the form {a, b}, i.e. a set having two elements a and b with no particular relation between them, where {a, b} = {b, a}. In contrast, an ordered pair (a, b) has a as its first element and b as its second element, which means (a, b) ≠ (b, a).
While the two elements of an ordered pair (a, b) need not be distinct, modern authors only call {a, b} an unordered pair if a ≠ b.[1][2][3][4] But for a few authors a singleton is also considered an unordered pair, although today, most would say that {a, a} is a multiset. It is typical to use the term unordered pair even in the situation where the elements a and b could be equal, as long as this equality has not yet been established.
A set with precisely two elements is also called a 2-set or (rarely) a binary set.
An unordered pair is a finite set; its cardinality (number of elements) is 2 or (if the two elements are not distinct) 1.
unordered, pair, mathematics, unordered, pair, pair, form, having, elements, with, particular, relation, between, them, where, contrast, ordered, pair, first, element, second, element, which, means, while, elements, ordered, pair, need, distinct, modern, autho. In mathematics an unordered pair or pair set is a set of the form a b i e a set having two elements a and b with no particular relation between them where a b b a In contrast an ordered pair a b has a as its first element and b as its second element which means a b b a While the two elements of an ordered pair a b need not be distinct modern authors only call a b an unordered pair if a b 1 2 3 4 But for a few authors a singleton is also considered an unordered pair although today most would say that a a is a multiset It is typical to use the term unordered pair even in the situation where the elements a and b could be equal as long as this equality has not yet been established A set with precisely two elements is also called a 2 set or rarely a binary set An unordered pair is a finite set its cardinality number of elements is 2 or if the two elements are not distinct 1 In axiomatic set theory the existence of unordered pairs is required by an axiom the axiom of pairing More generally an unorderedn tuple is a set of the form a1 a2 an 5 6 7 Notes Edit Duntsch Ivo Gediga Gunther 2000 Sets Relations Functions Primers Series Methodos ISBN 978 1 903280 00 3 Fraenkel Adolf 1928 Einleitung in die Mengenlehre Berlin New York Springer Verlag Roitman Judith 1990 Introduction to modern set theory New York John Wiley amp Sons ISBN 978 0 471 63519 2 Schimmerling Ernest 2008 Undergraduate set theory Hrbacek Karel Jech Thomas 1999 Introduction to set theory 3rd ed New York Dekker ISBN 978 0 8247 7915 3 Rubin Jean E 1967 Set theory for the mathematician Holden Day Takeuti Gaisi Zaring Wilson M 1971 Introduction to axiomatic set theory Graduate Texts in Mathematics Berlin New York Springer VerlagReferences EditEnderton Herbert 1977 Elements of set theory Boston MA Academic Press ISBN 978 0 12 238440 0 Retrieved from https en wikipedia org w index php title Unordered pair amp oldid 1018652333, wikipedia, wiki, book, books, library,
