Difference between revisions of "Flat (geometry)"
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A flat is also called a linear [[manifold]] or linear variety. | A flat is also called a linear [[manifold]] or linear variety. | ||
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| + | A flat can be described by a system of [[Linear equation|linear equations]]. | ||
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| + | A flat can also be described by a system of linear [[Parametric equation|parametric equations]]. | ||
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| + | An [[Intersection (set theory)|intersection]] of flats is either a flat or the [[empty set]]. | ||
== See also == | == See also == | ||
Latest revision as of 13:57, 24 September 2016
In geometry, a flat is a subset of n-dimensional space that is congruent to a Euclidean space of lower dimension.
Description
The flats in two-dimensional space are points and lines, and the flats in three-dimensional space are points, lines, and planes.
In n-dimensional space, there are flats of every dimension from 0 to n − 1.
Flats of dimension n − 1 are called hyperplanes.
Flats are similar to linear subspaces, except that they need not pass through the origin.
If Euclidean space is considered as an affine space, the flats are precisely the affine subspaces.
Flats are important in linear algebra, where they provide a geometric realization of the solution set for a system of linear equations.
A flat is also called a linear manifold or linear variety.
A flat can be described by a system of linear equations.
A flat can also be described by a system of linear parametric equations.
An intersection of flats is either a flat or the empty set.
See also
External links
- Flat (geometry) @ Wikipedia
