Inverse (logic)
In logic, an inverse is a type of conditional sentence which is an immediate inference made from another conditional sentence. More specifically, given a conditional sentence of the form , the inverse refers to the sentence .[1] Since an inverse is the contrapositive of the converse, inverse and converse are logically equivalent to each other.[2]
For example, substituting propositions in natural language for logical variables, the inverse of the following conditional proposition
- "If it's raining, then Sam will meet Jack at the movies."
would be
- "If it's not raining, then Sam will not meet Jack at the movies."
The inverse of the inverse, that is, the inverse of , is , and since the double negation of any statement is equivalent to the original statement in classical logic, the inverse of the inverse is logically equivalent to the original conditional . Thus it is permissible to say that and are inverses of each other. Likewise, and are inverses of each other.
The inverse and the converse of a conditional are logically equivalent to each other, just as the conditional and its contrapositive are logically equivalent to each other.[2] But the inverse of a conditional cannot be inferred from the conditional itself (e.g., the conditional might be true while its inverse might be false[3]). For example, the sentence
- "If it's not raining, Sam will not meet Jack at the movies"
cannot be inferred from the sentence
- "If it's raining, Sam will meet Jack at the movies"
because in the case where it's not raining, additional conditions may still prompt Sam and Jack to meet at the movies, such as:
- "If it's not raining and Jack is craving popcorn, Sam will meet Jack at the movies."
In traditional logic, where there are four named types of categorical propositions, only forms A (i.e., "All S are P") and E ("All S are not P") have an inverse. To find the inverse of these categorical propositions, one must: replace the subject and the predicate of the inverted by their respective contradictories, and change the quantity from universal to particular.[4] That is:
- "All S are P" (A form) becomes "Some non-S are non-P".
- "All S are not P" (E form) becomes "Some non-S are not non-P".
Notes
- "The Definitive Glossary of Higher Mathematical Jargon — Inverse vs. Converse". Math Vault. 2019-08-01. Retrieved 2019-11-27.
- Taylor, Courtney K. "What Are the Converse, Contrapositive, and Inverse?". ThoughtCo. Retrieved 2019-11-27.
- "Mathwords: Inverse of a Conditional". www.mathwords.com. Retrieved 2019-11-27.
- Toohey, John Joseph. An Elementary Handbook of Logic. Schwartz, Kirwin and Fauss, 1918