Extensional and intensional definitions: Difference between revisions

Browse history interactively

← Previous edit

Content deleted Content added

VisualWikitext

Revision as of 05:31, 22 June 2024 edit Conovaloff (talk \| contribs) Extended confirmed users 3,199 edits →Extensional definition Tags: Mobile edit Mobile web edit ← Previous edit		Latest revision as of 22:20, 11 May 2025 edit undo Oneequalsequalsone (talk \| contribs) Extended confirmed users 1,397 edits add example in the lead Tag: Visual edit
(6 intermediate revisions by 5 users not shown)
Line 2: In [[logic]], '''extensional and intensional definitions''' are two key ways in which the [[Object (philosophy)\|objects]], [[concept]]s, or [[referent]]s a [[terminology\|term]] refers to can be [[definition\|defined]]. They give [[Meaning (linguistic)\|meaning]] or denotation to a term. An intensional definition gives meaning to a term by specifying necessary and sufficient conditions for when the term should be used. An extensional definition gives meaning to a term by specifying every [[object (philosophy)\|object]] that falls under the definition of the term in question. For example, in set theory one would extensionally define the set of [[Square number\|square numbers]] as {0, 1, 4, 9, 16, <math>\dots</math>}, while an intensional definition of the set of the square numbers could be {<math>x \mid x</math> is the square of an integer}. ==Intensional definition== Line 23 ⟶ 27: An extensional definition gives meaning to a term by specifying its [[Extension (semantics)\|extension]], that is, every [[object (philosophy)\|object]] that falls under the definition of the term in question. For example, an extensional definition of the term "nation of the world" might be given by [[List of sovereign states\|listing all of the nations of the world]], or by giving some other means of recognizing the members of the corresponding class. An explicit listing of the extension, which is only possible for [[finite sets]] and only practical for relatively [[Small set (category theory)\|small sets]], is a type of ''[[enumerative definition]]''. Extensional definitions are used when listing examples would give more applicable information than other types of definition, and where listing the members of a [[set (mathematics)\|set]] tells the questioner enough about the nature of that set. Line 29 ⟶ 33: An extensional definition possesses similarity to an [[ostensive definition]], in which one or more members of a set (but not necessarily all) are pointed to as examples, but contrasts clearly with an [[intensional definition]], which defines by listing properties that a thing must have in order to be part of the set captured by the definition. ==~~History~~Etymology== The terms "[[intension]]" and "[[Extension (semantics)\|extension]]" were introduced before 1911 by [[Constance Jones]]<ref>{{cite web \| title =Emily Elizabeth Constance Jones: Observations on Intension and Extension Line 38 ⟶ 42: == See also == * [[{{annotated link\|Comprehension (logic)]]}} * [[{{annotated link\|Extension (predicate logic)]]}} * [[{{annotated link\|Extension (semantics)]]}} * [[{{annotated link\|Extensional context]]}} * [[{{annotated link\|Extensionalism]]}} * [[{{annotated link\|Extensionality]]}} * [[{{annotated link\|Intension]]}} * [[{{annotated link\|Intensional logic]]}} * [[{{annotated link\|Ostensive definition]]}} == References ==