This article is about a broad mathematical concept. For the operation on sets, see Intersection (set theory). For intersections of planar and solid shapes, see Intersection (Euclidean geometry). For other uses, see Intersection (disambiguation).
This circle (black) intersects this line (purple) in two points

In mathematics, the intersection of two or more objects is another, usually "smaller" object. All objects are presumed to lie in a certain common space except in set theory, where the intersection of arbitrary sets is defined. The intersection is one of basic concepts of geometry. Intuitively, the intersection of two or more objects is a new object that lies in each of original objects. An intersection can have various geometric shapes, but a point is the most common in a plane geometry.

Definitions vary in different contexts: set theory formalizes the idea that a smaller object lies in a larger object with inclusion, and the intersection of sets is formed of elements that belong to all intersecting sets. It is always defined, but may be empty. Incidence geometry defines an intersection (usually, of flats) as an object of lower dimension that is incident to each of original objects. In this approach an intersection can be sometimes undefined, such as for parallel lines. In both cases the concept of intersection relies on logical conjunction.

Algebraic geometry defines intersections in its own way with the intersection theory.


There can be more than one primitive object, such as points (pictured above) that form an intersection. It can be understood ambiguously: either the intersection is all of them (i.e. the intersection operation results in a set, possibly empty), or there are several intersection objects (possibly zero).

Examples in classical geometry


Intersection is denoted by the U+2229 INTERSECTION from Unicode Mathematical Operators.

See also


Weisstein, Eric W. "Intersection". MathWorld. 

This article is issued from Wikipedia - version of the 12/4/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.