Search results
Results from the WOW.Com Content Network
A Venn diagram, also called a set diagram or logic diagram, shows all possible logical relations between a finite collection of different sets. These diagrams depict elements as points in the plane, and sets as regions inside closed curves. A Venn diagram consists of multiple overlapping closed curves, usually circles, each representing a set.
Vennův diagram; Usage on de.wikipedia.org Mengendiagramm; Usage on fi.wikipedia.org Venn-diagrammi; Usage on fr.wikipedia.org Diagramme de Venn; Usage on hu.wikipedia.org Venn-diagram; Usage on ja.wikipedia.org ベン図; 像; Usage on pt.wikipedia.org Diagrama de Venn; Wikipédia:Escolha do artigo em destaque/Diagrama de Venn; Usage on ta ...
Mathe für Nicht-Freaks: Mengendiagramme: Euler- und Venn-Diagramm; Usage on en.wikibooks.org Mathematical Proof/Print version; Mathematical Proof/Introduction to Set Theory; Usage on fi.wikipedia.org Venn-diagrammi; Usage on fr.wikipedia.org Diagramme de Venn; Usage on hu.wikipedia.org Venn-diagram; Usage on pt.wikipedia.org Diagrama de Venn
Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version 1.2 or any later version published by the Free Software Foundation; with no Invariant Sections, no Front-Cover Texts, and no Back-Cover Texts.
The commonly-used diagram for the Borromean rings consists of three equal circles centered at the points of an equilateral triangle, close enough together that their interiors have a common intersection (such as in a Venn diagram or the three circles used to define the Reuleaux triangle).
A Venn diagram is a representation of mathematical sets: a mathematical diagram representing sets as circles, with their relationships to each other expressed through their overlapping positions, so that all possible relationships between the sets are shown. [4]
Composite of two pages from Venn (1881a), pp. 115–116 showing his example of how to convert a syllogism of three parts into his type of diagram; Venn calls the circles "Eulerian circles" [10] But nevertheless, he contended, "the inapplicability of this scheme for the purposes of a really general logic" [ 9 ] (p 100) and then noted that,
Venn diagram of information theoretic measures for three variables x, y, and z. Each circle represents an individual entropy : H ( x ) {\displaystyle H(x)} is the lower left circle, H ( y ) {\displaystyle H(y)} the lower right, and H ( z ) {\displaystyle H(z)} is the upper circle.