Modus Tollendo Ponens
Sequent
is a valid argument in types of logic dealing with disjunctions $\lor$ and negation $\neg$.
This includes propositional logic and predicate logic, and in particular natural deduction.
Proof Rule
- $(1): \quad$ If we can conclude $\phi \lor \psi$, and we can also conclude $\neg \phi$, then we may infer $\psi$.
- $(2): \quad$ If we can conclude $\phi \lor \psi$, and we can also conclude $\neg \psi$, then we may infer $\phi$.
Sequent Form
Case 1
| \(\ds p \lor q\) | \(\) | \(\ds \) | ||||||||||||
| \(\ds \neg p\) | \(\) | \(\ds \) | ||||||||||||
| \(\ds \vdash \ \ \) | \(\ds q\) | \(\) | \(\ds \) |
Case 2
| \(\ds p \lor q\) | \(\) | \(\ds \) | ||||||||||||
| \(\ds \neg q\) | \(\) | \(\ds \) | ||||||||||||
| \(\ds \vdash \ \ \) | \(\ds p\) | \(\) | \(\ds \) |
Variants
The following forms can be used as variants of this theorem:
Variant
Formulation 1
- $p \lor q \dashv \vdash \neg p \implies q$
Formulation 2
- $\vdash \paren {p \lor q} \iff \paren {\neg p \implies q}$
Note that the form:
- $\neg p \implies q \vdash p \lor q$
requires Law of Excluded Middle.
Therefore it is not valid in intuitionistic logic.
Explanation
The can be expressed in natural language as:
If either of two statements is true, and one of them is not to be true, it follows that the other one is true.
- Once you eliminate the impossible, whatever remains, no matter how improbable, must be the truth.
- -- Sherlock Holmes (Sir Arthur Conan Doyle, 1890: The Sign of the Four, ch. 6)
Also known as
The is also known as the Disjunctive Syllogism, abbreviated D.S.
Examples
Third World War
The following is an example of the use of a :
- The United Nations will be strengthened or there will be a third world war.
- The United Nations will not be strengthened.
- Therefore there will be a third world war.
Also see
- Definition:Disjunction
The following are related argument forms:
Linguistic Note
is Latin for mode that by denying, affirms.
Sources
- 1989: Ephraim J. Borowski and Jonathan M. Borwein: Dictionary of Mathematics ... (previous) ... (next): disjunctive syllogism
- 1998: David Nelson: The Penguin Dictionary of Mathematics (2nd ed.) ... (previous) ... (next): modus tollendo ponens
- 2008: David Nelson: The Penguin Dictionary of Mathematics (4th ed.) ... (previous) ... (next): modus tollendo ponens