Circle (mathematics): Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Alex LeDonne
(New stub, from scratch.)
 
mNo edit summary
 
(10 intermediate revisions by 7 users not shown)
Line 1: Line 1:
A circle is most commonly a [[locus]] of [[Point (geometry)|points]] in a [[Plane (geometry)|plane]] equidistant from a single point, the center.
{{subpages}}
{{ dambigbox| Circle (mathematics) | Circle }}


The term may also refer to similarly defined loci on other two-dimensional [[Manifold (geometry)|manifolds]].
{{Image|A4circle.jpg|right|300px|Image of a circle showing the key labels}}
A '''circle''' is a [[curve]], consisting of those [[point (geometry)|point]]s in a [[Plane (geometry)|plane]] that are a given distance away from a single point, the centre. The term may also refer to similarly defined curves on other two-dimensional [[Manifold (geometry)|manifolds]].
 
The circle has been of incredible interest to mathematicians since [[mathematics|mathematics']] foundation. The circle serves as the starting point for much of mathematics, for example '''[[pi|π]]''' was first encountered as the ratio of a circle's diameter to its circumference.
 
The circle also serves as the starting point for the [[trigonometric function]]s sine, cosine and tangent. The functions are derived from the unit circle. As shown below, at any point on the circle's circumference the ''x''-coordinate is given by <math>\cos \theta \,</math>, the ''y''-coordinate is given by <math>\sin \theta \,</math> and the gradient of the radius from the centre (0,0) to the point (''x'',''y'') is given by <math>\tan \theta \,</math> where <math>\theta\,</math> is the angle between the radius and the ''x''-axis.{{Image|unit_circle.jpg|left|200px|The relation of the sine and cosine and the unit circle.}}
 
The circle is also one of the 4 [[conic section|conic sections]]. It is represented algebraically as <math>(x - a)^2 + (y - b)^2 = r^2</math> where the circle's centre is the point (''a'',''b'') and it has radius ''r''.
 
In the complex plane a circle is represented by the locus that satisfies the equation <math>|z - a| = r</math>; in this case the circle would have centre ''a'' and radius ''r''.
 
A given circle of radius ''r'' has diameter 2''r'', circumference 2π''r'', and area π''r''<sup>2</sup>.[[Category:Suggestion Bot Tag]]

Latest revision as of 06:00, 29 July 2024

This article is developing and not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.
This article is about Circle (mathematics). For other uses of the term Circle , please see Circle (disambiguation).
Image of a circle showing the key labels

A circle is a curve, consisting of those points in a plane that are a given distance away from a single point, the centre. The term may also refer to similarly defined curves on other two-dimensional manifolds.

The circle has been of incredible interest to mathematicians since mathematics' foundation. The circle serves as the starting point for much of mathematics, for example π was first encountered as the ratio of a circle's diameter to its circumference.

The circle also serves as the starting point for the trigonometric functions sine, cosine and tangent. The functions are derived from the unit circle. As shown below, at any point on the circle's circumference the x-coordinate is given by , the y-coordinate is given by and the gradient of the radius from the centre (0,0) to the point (x,y) is given by where is the angle between the radius and the x-axis.

(CC) Image: Donal O'Hara
The relation of the sine and cosine and the unit circle.

The circle is also one of the 4 conic sections. It is represented algebraically as where the circle's centre is the point (a,b) and it has radius r.

In the complex plane a circle is represented by the locus that satisfies the equation ; in this case the circle would have centre a and radius r.

A given circle of radius r has diameter 2r, circumference 2πr, and area πr2.