Surface (geometry): Difference between revisions

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A surface in mathematics has many different uses, the most common referring to a two-dimensional submanifold of three-dimensional Euclidean space, $\scriptstyle \mathbb {R} ^{2}$ .

Any set of points composed of pieces topologically equivalent to a subset of a plane is a surface: this includes curved surfaces such as a paraboloid, infinite surfaces such as a plane, surfaces of limited extent such as the interior of a polygon, and surfaces with strange topology such as an infinitely long row of squares each separated by some distance, or the set of all points with rational coordinates in a plane. The extremities of a solid are made up of surfaces.

In Euclidean geometry:

A surface has length and breadth only. A surface that is flat is called a plane.

@@ Line 5: / Line 5: @@
 Any set of points composed of pieces [[Topological_space|topologically]] equivalent to a subset of a plane is a surface:   this includes curved surfaces such as a paraboloid, infinite surfaces such as a plane, surfaces of limited extent such as the interior of a polygon, and surfaces with strange topology such as an infinitely long row of squares each separated by some distance, or the set of all points with rational coordinates in a plane.
 The extremities of a [[solid (geometry)|solid]] are made up of surfaces.
+In [[Euclidean geometry]]:
+A '''surface''' has length and breadth only. A surface that is flat is called a [[plane (geometry)|plane]].

Surface (geometry): Difference between revisions

Revision as of 11:01, 14 August 2008

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