Square of opposition: Difference between revisions
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== Square of opposition == | |||
<gallery> | |||
File:Square_of_opposition,_set_diagrams.svg|Square of opposition, set diagrams | |||
File:Johannesmagistris-square.jpg|Johannes Magistris square | |||
File:Frege-gegensätze.png|Frege gegensätze | |||
</gallery> | |||
Latest revision as of 00:54, 27 February 2025
The Square of Opposition is a conceptual diagram that illustrates the different ways in which propositions can be related to each other, based on their logical form. This diagram is a tool used in classical logic, philosophy, and linguistics to understand the relationships between categorical statements. The Square of Opposition dates back to Aristotle's work in ancient Greece and has been a fundamental element in the study of logic for centuries.
The square itself consists of four corners, each representing a type of categorical statement: - A (Universal Affirmative): All S are P. - E (Universal Negative): No S are P. - I (Particular Affirmative): Some S are P. - O (Particular Negative): Some S are not P.
These statements are related to each other in various ways, represented by the lines connecting the corners of the square: - Contraries: The top two corners (A and E) cannot both be true at the same time, but they can both be false. - Subcontraries: The bottom two corners (I and O) cannot both be false at the same time, but they can both be true. - Contradictories: Each corner is connected to another corner diagonally across the square (A with O, and E with I). Contradictory propositions cannot both be true and cannot both be false. - Subalternation: The vertical relationships between A and I, and between E and O. The truth of the universal proposition (A or E) implies the truth of its corresponding particular proposition (I or O), but not vice versa.
The Square of Opposition is not only a historical artifact but also continues to be relevant in contemporary discussions in logic and semantics. It has been extended and modified in various ways to accommodate different logical systems and interpretations, such as the introduction of modal logic and deontic logic.
The study of the Square of Opposition and its applications across different fields highlights the importance of understanding logical relationships and the structure of arguments. It serves as a foundational tool in the analysis of language, thought, and reasoning.
Square of opposition[edit]
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Square of opposition, set diagrams -
Johannes Magistris square -
Frege gegensätze
