Fallacy of division
Fallacy / From Wikipedia, the free encyclopedia
This article is about reasoning that draws a conclusion by parting an inseparably unified total. For reasoning that draws a conclusion by parting a separable total, see deductive reasoning.
The fallacy of division[1] is an informal fallacy that occurs when one reasons that something that is true for a whole must also be true of all or some of its parts.
An example:
- The second grade in Jefferson Elementary eats a lot of ice cream
- Carlos is a second-grader in Jefferson Elementary
- Therefore, Carlos eats a lot of ice cream
The converse of this fallacy is called fallacy of composition, which arises when one fallaciously attributes a property of some part of a thing to the thing as a whole.
If a system as a whole has some property that none of its constituents has (or perhaps, it has it but not as a result of some constituent's having that property), this is sometimes called an emergent property of the system.
The term mereological fallacy refers to approximately the same incorrect inference that properties of a whole are also properties of its parts.[2][3][4]