Difference between revisions of "Equation of a Circle"

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[[Image:Circle center a b radius r.svg|thumb|right|Circle of radius ''r'' = 1, centre (''a'', ''b'') = (1.2, −0.5)]]
 
[[Image:Circle center a b radius r.svg|thumb|right|Circle of radius ''r'' = 1, centre (''a'', ''b'') = (1.2, −0.5)]]
  
;Equation of a circle
 
 
In an ''x''–''y'' Cartesian coordinate system, the circle with center coordinates (''a'', ''b'') and radius ''r'' is the set of all points (''x'', ''y'') such that
 
In an ''x''–''y'' Cartesian coordinate system, the circle with center coordinates (''a'', ''b'') and radius ''r'' is the set of all points (''x'', ''y'') such that
 
: <math>(x - a)^2 + (y - b)^2 = r^2.</math>
 
: <math>(x - a)^2 + (y - b)^2 = r^2.</math>
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: <math>x = a + r\,\cos t,</math>
 
: <math>x = a + r\,\cos t,</math>
 
: <math>y = b + r\,\sin t,</math>
 
: <math>y = b + r\,\sin t,</math>
where ''t'' is a parametric variable in the range 0 to 2{{pi}}, interpreted geometrically as the angle that the ray from (''a'',&nbsp;''b'') to (''x'',&nbsp;''y'') makes with the positive ''x''&nbsp;axis.
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where ''t'' is a parametric variable in the range 0 to <math>2\pi</math>, interpreted geometrically as the angle that the ray from (''a'',&nbsp;''b'') to (''x'',&nbsp;''y'') makes with the positive ''x''&nbsp;axis.
  
 
An alternative parametrisation of the circle is
 
An alternative parametrisation of the circle is
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In this parameterisation, the ratio of ''t'' to ''r'' can be interpreted geometrically as the stereographic projection of the line passing through the centre parallel to the ''x''&nbsp;axis (see Tangent half-angle substitution). However, this parameterisation works only if ''t'' is made to range not only through all reals but also to a point at infinity; otherwise, the leftmost point of the circle would be omitted.
 
In this parameterisation, the ratio of ''t'' to ''r'' can be interpreted geometrically as the stereographic projection of the line passing through the centre parallel to the ''x''&nbsp;axis (see Tangent half-angle substitution). However, this parameterisation works only if ''t'' is made to range not only through all reals but also to a point at infinity; otherwise, the leftmost point of the circle would be omitted.
  
==Resourcs==
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==Resources==
 
* [https://www.khanacademy.org/math/geometry/xff63fac4:hs-geo-conic-sections/hs-geo-circle-expanded-equation/a/circle-equation-review Circle Equation Review], Khan Academy
 
* [https://www.khanacademy.org/math/geometry/xff63fac4:hs-geo-conic-sections/hs-geo-circle-expanded-equation/a/circle-equation-review Circle Equation Review], Khan Academy
 
* [https://www.khanacademy.org/math/geometry/xff63fac4:hs-geo-conic-sections/hs-geo-circle-standard-equation/v/radius-and-center-for-a-circle-equation-in-standard-form Standard Form of Circle Equation], Khan Academy
 
* [https://www.khanacademy.org/math/geometry/xff63fac4:hs-geo-conic-sections/hs-geo-circle-standard-equation/v/radius-and-center-for-a-circle-equation-in-standard-form Standard Form of Circle Equation], Khan Academy
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== Licensing ==
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Content obtained and/or adapted from:
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* [https://en.wikipedia.org/wiki/Circle Circle, Wikipedia] under a CC BY-SA license

Latest revision as of 12:26, 14 November 2021

Cartesian coordinates

Circle of radius r = 1, centre (ab) = (1.2, −0.5)

In an xy Cartesian coordinate system, the circle with center coordinates (a, b) and radius r is the set of all points (x, y) such that

This equation, known as the equation of the circle, follows from the Pythagorean theorem applied to any point on the circle: as shown in the adjacent diagram, the radius is the hypotenuse of a right-angled triangle whose other sides are of length |xa| and |yb|. If the circle is centred at the origin (0, 0), then the equation simplifies to

Parametric form

The equation can be written in parametric form using the trigonometric functions sine and cosine as

where t is a parametric variable in the range 0 to , interpreted geometrically as the angle that the ray from (ab) to (xy) makes with the positive x axis.

An alternative parametrisation of the circle is

In this parameterisation, the ratio of t to r can be interpreted geometrically as the stereographic projection of the line passing through the centre parallel to the x axis (see Tangent half-angle substitution). However, this parameterisation works only if t is made to range not only through all reals but also to a point at infinity; otherwise, the leftmost point of the circle would be omitted.

Resources

Licensing

Content obtained and/or adapted from: