SafekipediaEuclidean plane
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In mathematics, a Euclidean plane is a flat, two-dimensional space. It is part of a larger idea called Euclidean space and has two dimensions. To find any point on this plane, you need two numbers, like on a map with up-down and left-right directions.
The Euclidean plane works like an affine space. This means it has rules about parallel lines — lines that stay the same distance apart and never meet. It also has special metrical properties that help us measure things. For example, we can measure distance to draw perfect circles and find the size of angles between lines.
When we add a Cartesian coordinate system to the Euclidean plane, it becomes called a Cartesian plane. This system uses pairs of numbers, written as R2, to describe every point clearly. This view of the plane is very common and is often called the Euclidean plane or the standard Euclidean plane. All Euclidean planes have the same shape and size.
History
See also: Euclidean geometry § History
Euclid's Elements looked at flat shapes and ideas like the Pythagorean theorem, equal angles, and areas in Books I through IV and VI.
Later, the plane was described with a Cartesian coordinate system. This system uses two numbers to show where a point is. These numbers are distances from two lines that cross at a central origin. This idea came from Descartes and Pierre de Fermat.
In geometry
See also: Euclidean geometry
Coordinate systems
Main articles: Rectangular coordinate system and Polar coordinate system
In math, we can describe any point on a flat surface using two numbers. Imagine two lines crossing at a center point, called the origin. These lines are called axes, usually labeled x and y. By measuring how far a point is from each axis, we can find its exact spot.
Another way to describe a point is by how far it is from the origin and the angle it makes with a horizontal line.
Embedding in three-dimensional space
Polytopes
Main article: Polygon
In two dimensions, we can draw many flat shapes called polygons. Some of the simplest are regular polygons, which have all sides and angles equal. Examples include triangles, squares, and pentagons.
Circle
Main article: Circle
A circle is a special shape in two dimensions. It is all the points that are the same distance from a center point. This distance is called the radius. The space inside a circle is called its area.
Other shapes
Main article: List of two-dimensional geometric shapes
There are also many curved shapes, such as ovals, parabolas, and hyperbolas.
| Name | Triangle (2-simplex) | Square (2-orthoplex) (2-cube) | Pentagon | Hexagon | Heptagon | Octagon | |
|---|---|---|---|---|---|---|---|
| Schläfli symbol | {3} | {4} | {5} | {6} | {7} | {8} | |
| Image |  |  |  |  |  |  | |
| Name | Nonagon | Decagon | Hendecagon | Dodecagon | Tridecagon | Tetradecagon | |
| Schläfli | {9} | {10} | {11} | {12} | {13} | {14} | |
| Image |  |  |  |  |  |  | |
| Name | Pentadecagon | Hexadecagon | Heptadecagon | Octadecagon | Enneadecagon | Icosagon | ...n-gon |
| Schläfli | {15} | {16} | {17} | {18} | {19} | {20} | {n} |
| Image |  |  |  |  |  |  |
In linear algebra
We can think about a flat space in two dimensions using linear algebra. The plane has two dimensions because the length of a rectangle does not change based on its width. Every point in the plane can be described using two directions, called vectors.
The dot product helps us understand angles and distances between vectors. It connects multiplying numbers with the geometry of arrows in space. This tool is useful for measuring how vectors relate to each other and for finding the length of a vector.
In calculus
Main article: Fundamental theorem of line integrals
Main article: Green's theorem
In calculus, we learn about changes in a flat, two-dimensional space. One key idea is the gradient. The gradient shows how a number changes in different directions on a flat surface.
We also study line integrals and double integrals. A line integral helps us add up values along a path. A double integral lets us add up values over an area. These tools help solve many real-world problems, like measuring the flow of a liquid or the amount of material in a shape.
In topology
In topology, the Euclidean plane is special because it is the only 2-manifold that is "contractible." This means you can shrink it to a point without tearing.
If you take away one point from the plane, you can still draw paths between any two points, but it is not "simply connected." This means there are loops you can make that cannot be shrunk to a point without crossing the missing spot.
In graph theory
In graph theory, a planar graph is a special kind of graph that can be embedded on a flat surface, like paper. In this drawing, the lines only cross at their ends. This special drawing is called a plane graph. Each point in the graph is placed on the flat surface, and the lines between points are drawn as smooth curves that only meet at their starting and ending points.
This article is a child-friendly adaptation of the Wikipedia article on Euclidean plane, available under CC BY-SA 4.0.
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