Modus tollens

*Modus tollens*
Type	Deductive argument form; Rule of inference;
Field	Classical logic; Propositional calculus;
Statement	implies . is false. Therefore, must also be false.
Symbolic statement

In propositional logic, modus tollens (/ˈmoʊdəs ˈtɒlɛnz/) (MT), also known as modus tollendo tollens (Latin for "method of removing by taking away")^[2] and denying the consequent,^[3] is a deductive argument form and a rule of inference. Modus tollens is a mixed hypothetical syllogism that takes the form of "If P, then Q. Not Q. Therefore, not P." It is an application of the general truth that if a statement is true, then so is its contrapositive. The form shows that inference from P implies Q to the negation of Q implies the negation of P is a valid argument.

The history of the inference rule modus tollens goes back to antiquity.^[4] The first to explicitly describe the argument form modus tollens was Theophrastus.^[5]

Modus tollens is closely related to modus ponens. There are two similar, but invalid, forms of argument: affirming the consequent and denying the antecedent. See also contraposition and proof by contrapositive.

^ Matthew C. Harris. "Denying the antecedent". Khan academy.
^ Stone, Jon R. (1996). Latin for the Illiterati: Exorcizing the Ghosts of a Dead Language. London: Routledge. p. 60. ISBN 978-0-415-91775-9.
^ Sanford, David Hawley (2003). If P, Then Q: Conditionals and the Foundations of Reasoning (2nd ed.). London: Routledge. p. 39. ISBN 978-0-415-28368-7. [Modus] tollens is always an abbreviation for modus tollendo tollens, the mood that by denying denies.
^ Susanne Bobzien (2002). "The Development of Modus Ponens in Antiquity", Phronesis 47.
^ "Ancient Logic: Forerunners of Modus Ponens and Modus Tollens". Stanford Encyclopedia of Philosophy.

[KA-1] Matthew C. Harris. "Denying the antecedent". Khan academy.

[2] Stone, Jon R. (1996). Latin for the Illiterati: Exorcizing the Ghosts of a Dead Language. London: Routledge. p. 60. ISBN 978-0-415-91775-9.

[3] Sanford, David Hawley (2003). If P, Then Q: Conditionals and the Foundations of Reasoning (2nd ed.). London: Routledge. p. 39. ISBN 978-0-415-28368-7. [Modus] tollens is always an abbreviation for modus tollendo tollens, the mood that by denying denies.

[4] Susanne Bobzien (2002). "The Development of Modus Ponens in Antiquity", Phronesis 47.

[5] "Ancient Logic: Forerunners of Modus Ponens and Modus Tollens". Stanford Encyclopedia of Philosophy.

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Type	Deductive argument form Rule of inference
Field	Classical logic Propositional calculus
Statement	$P$ implies $Q$ . $Q$ is false. Therefore, $P$ must also be false.
Symbolic statement	$P\rightarrow Q,\neg Q$ $\therefore \neg P$ ^[1]