Conjunction introduction (often abbreviated simply as conjunction and also called and introduction or adjunction)[1][2][3] is a validrule of inference of propositional logic. The rule makes it possible to introduce a conjunction into a logical proof. It is the inference that if the proposition is true, and the proposition is true, then the logical conjunction of the two propositions and is true. For example, if it is true that "it is raining", and it is true that "the cat is inside", then it is true that "it is raining and the cat is inside". The rule can be stated:
^Hurley, Patrick (1991). A Concise Introduction to Logic 4th edition. Wadsworth Publishing. pp. 346–51.
^Copi, Irving M.; Cohen, Carl; McMahon, Kenneth (2014). Introduction to Logic (14th ed.). Pearson. pp. 370, 620. ISBN978-1-292-02482-0.
^Moore, Brooke Noel; Parker, Richard (2015). "Deductive Arguments II Truth-Functional Logic". Critical Thinking (11th ed.). New York: McGraw Hill. p. 311. ISBN978-0-07-811914-9.
January 14, 2023
conjunction, introduction, often, abbreviated, simply, conjunction, also, called, introduction, adjunction, valid, rule, inference, propositional, logic, rule, makes, possible, introduce, conjunction, into, logical, proof, inference, that, proposition, display. Conjunction introduction often abbreviated simply as conjunction and also called and introduction or adjunction 1 2 3 is a valid rule of inference of propositional logic The rule makes it possible to introduce a conjunction into a logical proof It is the inference that if the proposition P displaystyle P is true and the proposition Q displaystyle Q is true then the logical conjunction of the two propositions P displaystyle P and Q displaystyle Q is true For example if it is true that it is raining and it is true that the cat is inside then it is true that it is raining and the cat is inside The rule can be stated Conjunction introductionTypeRule of inferenceFieldPropositional calculusStatementIf the proposition P displaystyle P is true and the proposition Q displaystyle Q is true then the logical conjunction of the two propositions P displaystyle P and Q displaystyle Q is true Symbolic statementP Q P Q displaystyle frac P Q therefore P land Q P Q P Q displaystyle frac P Q therefore P land Q where the rule is that wherever an instance of P displaystyle P and Q displaystyle Q appear on lines of a proof a P Q displaystyle P land Q can be placed on a subsequent line Formal notation EditThe conjunction introduction rule may be written in sequent notation P Q P Q displaystyle P Q vdash P land Q where P displaystyle P and Q displaystyle Q are propositions expressed in some formal system and displaystyle vdash is a metalogical symbol meaning that P Q displaystyle P land Q is a syntactic consequence if P displaystyle P and Q displaystyle Q are each on lines of a proof in some logical system References Edit Hurley Patrick 1991 A Concise Introduction to Logic 4th edition Wadsworth Publishing pp 346 51 Copi Irving M Cohen Carl McMahon Kenneth 2014 Introduction to Logic 14th ed Pearson pp 370 620 ISBN 978 1 292 02482 0 Moore Brooke Noel Parker Richard 2015 Deductive Arguments II Truth Functional Logic Critical Thinking 11th ed New York McGraw Hill p 311 ISBN 978 0 07 811914 9 Retrieved from https en wikipedia org w index php title Conjunction introduction amp oldid 1092951011, wikipedia, wiki, book, books, library,
