Euclidean plane

This article is about the geometrical figure. Not to be confused with Plane.

Euclidean plane

• Dimensionality: 2

Topology

• Equivalent Manifold: '"`UNIQ--postMath-00000001-QINU`"' ; Euclidean plane

Subfacets

• Faces: 1 Euclidean plane

The Euclidean plane is a flat, infinitely large two-dimensional space following the rules of two-dimensional Euclidean geometry. It can be formed from the Cartesian product of two copies of the Euclidean line.

A plane can be used to bisect a cell, and cells can have planes of symmetry through which they are reflected. The place at which a cell intersects a plane gives a two-dimensional shape and the change in shape as the cell passes through the plane can give information about the structure of the cell.

There is more than one way to make a 2D Cartesian plane. You could say the lines should be slightly slanted, as long as they parallel.

See Also

Dimensionality	Negative One	Zero	One	Two	Three	Four	Five	Six	Seven	Eight	Nine	Ten	...	Aleph null
Hyperbolic space ${\displaystyle \mathbb H^{n}}$	—	—	—	Hyperbolic plane ${\displaystyle \mathbb H^{2}}$	Hyperbolic realm ${\displaystyle \mathbb H^{3}}$	Hyperbolic flune ${\displaystyle \mathbb H^{4}}$	Hyperbolic pentrealm ${\displaystyle \mathbb H^{5}}$	Hyperbolic hexealm ${\displaystyle \mathbb H^{6}}$	Hyperbolic heptealm ${\displaystyle \mathbb H^{7}}$	Hyperbolic octealm ${\displaystyle \mathbb H^{8}}$	Hyperbolic ennealm ${\displaystyle \mathbb H^{9}}$	Hyperbolic decealm ${\displaystyle \mathbb H^{10}}$	...	Hyperbolic omegealm ${\displaystyle \mathbb H^{\aleph_0}}$
Euclidean space ${\displaystyle \R^n}$	Null polytope ${\displaystyle \emptyset}$	Point ${\displaystyle \mathbb R^{0}}$	Euclidean line ${\displaystyle \mathbb R^{1}}$	Euclidean plane ${\displaystyle \mathbb R^{2}}$	Euclidean realm ${\displaystyle \mathbb R^{3}}$	Euclidean flune ${\displaystyle \mathbb R^{4}}$	Euclidean pentrealm ${\displaystyle \mathbb R^{5}}$	Euclidean hexealm ${\displaystyle \mathbb R^{6}}$	Euclidean heptealm ${\displaystyle \mathbb R^{7}}$	Euclidean octealm ${\displaystyle \mathbb R^{8}}$	Euclidean ennealm ${\displaystyle \mathbb R^{9}}$	Euclidean decealm ${\displaystyle \mathbb R^{10}}$	...	Euclidean omegealm ${\displaystyle \mathbb R^{\aleph_0}}$
Hypersphere ${\displaystyle \mathbb S^{n}}$		Point pair ${\displaystyle \mathbb S^{0}}$	Circle ${\displaystyle \mathbb S^{1}}$	Sphere ${\displaystyle \mathbb S^{2}}$	Glome ${\displaystyle \mathbb S^{3}}$	Tetrasphere ${\displaystyle \mathbb S^{4}}$	Pentasphere ${\displaystyle \mathbb S^{5}}$	Hexasphere ${\displaystyle \mathbb S^{6}}$	Heptasphere ${\displaystyle \mathbb S^{7}}$	Octasphere ${\displaystyle \mathbb S^{8}}$	Enneasphere ${\displaystyle \mathbb S^{9}}$	Dekasphere ${\displaystyle \mathbb S^{10}}$	...	Omegasphere ${\displaystyle \mathbb S^{\aleph_0}}$