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Circle

*** Shopping-Tip: Circle
:''This article is about the shape and mathematical concept of circle; for other meanings, see circle (disambiguation).'' Image:CIRCLE 1.svg 250px|right|Circle illustration In Euclidean geometry, a '''circle''' is the set of all point (geometry) points in a plane at a fixed distance, called the ''radius'', from a fixed point, the ''centre''. The points can only be those that are part of a conic section; within the set of a plane (mathematics) plane bisecting a Conical surface cone. Circles are simple closed curves, dividing the plane into an interior and exterior. Sometimes the word ''circle'' is used to mean the interior, with the circle itself called the circumference(C). Usually however, the ''circumference'' means the length of the circle, and the interior of the circle is called a ''Disk (mathematics) disk''. An ''arc'' is any continuous portion of a circle.

Mathematical definitions
Image:Circle_Area.svg thumb|250px|Area of the circle = '''''Ï€''''' × area of the shaded square Image:Hexagon_Octagon.svg thumb|250px|Approximating the area of a circle by regular [[polygons]] Image:Circle_area.JPG thumb|250px|Area of a circle using [[infinitesimal area element]] In an ''x''-''y'' coordinate system, the circle with center (''a'', ''b'') and radius ''r'' is the set of all points (''x'', ''y'') such that :$\backslash left(\; x\; -\; a\; \backslash right)^2\; +\; \backslash left(\; y\; -\; b\; \backslash right)^2=r^2.$ If the circle is centred at the origin (0, 0), then this formula can be simplified to :$x^2\; +\; y^2\; =\; r^2.$ The circle centred at the origin with radius 1 is called the unit circle. Expressed in parametric equations, (''x'', ''y'') can be written as :''x'' = ''a'' + ''r'' cos(t) :''y'' = ''b'' + ''r'' sin(t). The slope of a circle at a point (''x'', ''y'') can be expressed with the following formula, assuming the centre is at the origin and (''x'', ''y'') is on the circle: :$y\text{'}\; =\; -\; \backslash frac\{x\}\{y\}.$ In the complex plane, a circle with a centre at ''c'' and radius ''r'' has the equation $|z-c|^2\; =\; r^2$. Since $|z-c|^2\; =\; z\backslash overline\{z\}-\backslash overline\{c\}z-c\backslash overline\{z\}+c\backslash overline\{c\}$, the slightly generalized equation $pz\backslash overline\{z\}\; +\; gz\; +\; \backslash overline\{gz\}\; =\; q$ for real ''p'', ''q'' and complex ''g'' is sometimes called a '''generalized circle'''. It is important to note that not all generalized circles are actually circles. All circles are similarity (mathematics) similar; as a consequence, a circle's circumference and radius are proportional, as are its area (geometry) area and the square of its radius. The mathematical constant constants of proportionality are 2pi Ï€ and π, respectively. In other words: * Length of a circle's circumference = $2\backslash pi\; \backslash times\; r.$ * Area of a circle = $\backslash pi\; \backslash times\; r^2.$ The formula for the area of a circle can be derived from the formula for the circumference and the formula for the area of a triangle (geometry) triangle, as follows. Imagine a regular hexagon (six-sided figure) divided into equal triangles, with their apices at the centre of the hexagon. The area of the hexagon may be found by the formula for triangle area by adding up the lengths of all the triangle bases (on the exterior of the hexagon), multiplying by the height of the triangles (distance from the middle of the base to the center) and dividing by two. This is an approximation of the area of a circle. Then imagine the same exercise with an octagon (eight-sided figure), and the approximation is a little closer to the area of a circle. As a regular polygon with more and more sides is divided into triangles and the area calculated from this, the area becomes closer and closer to the area of a circle. In the limit (mathematics) limit, the sum of the bases approaches the circumference 2π''r'', and the triangles' height approaches the radius ''r''. Multiplying the circumference and radius and dividing by 2, we get the area, π ''r''². The formula for the area of circle can also be derived by using an infinitesimal area element $dA$ and integrating it over the whole circle.

Properties
Image:CIRCLE LINES.svg right|280px|Chord, secant, and tangent Image:Circle slices.svg right|260px|Arc, sector, and segment

Chord properties
*Chords equidistant from the centre of a circle are equal. *Equal chords are equidistant from the centre. *A line from the centre, perpendicular to a chord, bisects the chord. *The line segment drawn from the centre to the midpoint of the chord is perpendicular to the chord. *The perpendicular bisector of a chord passes through the centre of a circle.

Tangent properties
*The line drawn perpendicular to the end point of a radius is a tangent to the circle. *A line drawn perpendicular to a tangent at the point of contact with a circle passes through the centre of the circle. *Tangents drawn from a point outside the circle are equal in length. *Two tangents can always be drawn from a point outside of the circle. *If a central angle and an inscribed angle of a circle are subtended by the same chord and on the same side of the chord, then the central angle is twice the inscribed angle. *If two angles are inscribed on the same chord and on the same side of the chord, then they are equal. *An inscribed angle subtended by a semicircle is a right angle. *For a cyclic quadrilateral, the exterior angle is equal to the interior opposite angle.

Secant, tangent, and chord properties
{{See also|Power of a point}} *The chord theorem states that if two chords, CD and EF, intersect at G, then $CG\; \backslash times\; DG\; =\; EG\; \backslash times\; FG$. (Chord theorem) *If a tangent from an external point ''D'' meets the circle at ''C'' and a secant from the external point ''D'' meets the circle at ''G'' and ''E'' respectively, then $DC^2\; =\; DG\; \backslash times\; DE$. (tangent-secant theorem) *If two secants, DG and DE, also cut the circle at H and F respectively, then $DH\; \backslash times\; DG\; =\; DF\; \backslash times\; DE$. (Corollary of the tangent-secant theorem) *The angle between a tangent and chord is equal to the subtended angle on the opposite side of the chord. (Tangent chord property) *If the angle subtended by the chord at the centre is 90 degrees then ''l'' = √(2) × ''r'', where ''l'' is the length of the chord and ''r'' is the radius of the circle.

See also
{{Commons}} * Sphere * Unit circle * Descartes' theorem * Isoperimetric theorem * List of circle topics

External links

- Clifford's Circle Chain Theorems. This is a step by step presentation of the first theorem. Clifford discovered, in the ordinary Euclidean plane, a "sequence or chain of theorems" of increasing complexity, each building on the last in a natural progression. by Antonio Gutierrez from "Geometry Step by Step from the Land of the Incas"
- Munching on Circles at cut-the-knot Category:Conic sections ar:دائرة bg:ОкръжноÑ?Ñ‚ ca:Cercle cs:Kružnice da:Cirkel de:Kreis (Geometrie) et:Ring es:Círculo eo:Cirklo fi:Ympyrä fr:Cercle ko:ì›? (기하) is:Hringur it:Cerchio he:מעגל lt:Apskritimas nl:Cirkel ja:円 (æ•°å­¦) no:Sirkel nn:Sirkel pl:OkrÄ…g pt:Círculo ru:ОкружноÑ?Ñ‚ÑŒ simple:Circle sk:Kružnica sl:Krog sr:Круг sv:Cirkel ta:வடà¯?டமà¯? uk:Коло zh:圆

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