Difference between revisions of "Truth table"
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'''Truth table''' is the device by which the [[truth condition]]s of a complex [[propositional formula]] can be represented. By means of truth tables it is possible to define the [[connective]]s of [[propositional logic]]. See [[conjunction]], [[disjunction]], [[negation]], [[equivalence]] and [[implication]]. | '''Truth table''' is the device by which the [[truth condition]]s of a complex [[propositional formula]] can be represented. By means of truth tables it is possible to define the [[connective]]s of [[propositional logic]]. See [[conjunction]], [[disjunction]], [[negation]], [[equivalence]] and [[implication]]. | ||
| − | + | == Links == | |
| − | + | *[http://www2.let.uu.nl/UiL-OTS/Lexicon/zoek.pl?lemma=Truth+table&lemmacode=197 Utrecht Lexicon of Linguistics] | |
| − | [http://www2.let.uu.nl/UiL-OTS/Lexicon/zoek.pl?lemma=Truth+table&lemmacode=197 Utrecht Lexicon of Linguistics] | ||
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| + | == References == | ||
* Gamut, L.T.F. 1991. ''Logic, language, and meaning,'' Univ. of Chicago Press, Chicago. | * Gamut, L.T.F. 1991. ''Logic, language, and meaning,'' Univ. of Chicago Press, Chicago. | ||
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[[Category:Semantics]] | [[Category:Semantics]] | ||
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Latest revision as of 08:04, 30 August 2014
Definition
Truth table is the device by which the truth conditions of a complex propositional formula can be represented. By means of truth tables it is possible to define the connectives of propositional logic. See conjunction, disjunction, negation, equivalence and implication.
Links
References
- Gamut, L.T.F. 1991. Logic, language, and meaning, Univ. of Chicago Press, Chicago.
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