# Circle

*See The Circle for the distributed file storage system, and see Ring (punctuation) for the diacritic mark.*

In Euclidean geometry, a

**circle**is the set of all points in a plane at a fixed distance, called the

**radius**, from a fixed point, called the

**centre**. 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. More usually, the

**circumference**means the length of the circle, and the interior of the circle is called a

**disk**.

In an *x*-*y* coordinate system, the circle with centre (*x*_{0}, *y*_{0}) and radius *r* is the set of all points (*x*, *y*) such that

- (
*x*−*x*_{0})^{2}+ (*y*−*y*_{0})^{2}=*r*^{2}.

*x*^{2}+*y*^{2}=*r*^{2}.

The slope (or derivate) of a circle can be expressed with the following formula:

*y´ = −x/y*

- Length of a circle's circumference = 2 × π × radius
- Area of a circle = π × (radius)
^{2}

*r*, and the triangles' height approaches the radius

*r*. Multiplying the two and dividing by 2, we get the area π

*r*².

A line cutting a circle in two places is called a secant, and a line touching the circle in one place is called a tangent. The tangent lines are necessarily perpendicular to the radii, segments connecting the centre to a point on the circle, whose length matches the definition given above. The segment of a secant bound by the circle is called a chord, and the longest chords are those that pass through the centre, called diameters and divided into two radii. The area of a circle cut off by a chord is called a circle segment.

It is possible (Circle points segments proof) to find the maximum number of unique segments generated by running chords between a number of points on the perimeter of a circle.

If only (part of) a circle is known, then the circle's center can be constructed as follows: take two non-parallel chords, construct perpendicular lines on their midpoints, and find the intersection point of those lines.

A part of the circumference bound by two radii is called an arc, and the area (i.e., the slice of the disk) within the radii and the arc is a sector. The ratio between the length of an arc and the radius defines the angle between the two radii in radians.

Every triangle gives rise to several circles: its circumcircle containing all three vertices, its incircle lying inside the triangle and touching all three sides, the three excircles lying outside the triangle and touching one side and the extensions of the other two, and its nine point circle which contains various important points of the triangle. Thales' theorem states that if the three vertices of a triangle lie on a given circle with one side of the triangle being a diameter of the circle, then the angle opposite to that side is a right angle.

Given any three points which do not lie on a line, there exists precisely one circle whose boundary contains those points (namely the circumcircle of the triangle defined by the points). Given three particular points <(*x*_{1},*y*_{1}), (x_{2},*y*_{2}), (x_{3},*y*_{3})>, the equation of this circle is given in a simple way by this equation using the matrix (math) determinant:

A circle is a kind of conic section, with eccentricity zero. In affine geometry all circles and ellipses become (affinely) isomorphic, and in projective geometry the other conic sections join them. In topology all simple closed curves are homeomorphic to circles, and the word circle is often applied to them as a result. The 3-dimensional analog of the circle is the sphere.

Squaring the circle refers to the (impossible) task of constructing, for a given circle, a square of equal area with ruler and compass alone. Tarski's circle-squaring problem, by contrast, is the task of dividing a given circle into finitely many pieces and reassembling those pieces to obtain a square of equal area. Assuming the axiom of choice, this is indeed possible.

Three-dimensional shapes whose cross-sections in some planes are circles include spheres, spheroids, cylinders, and coness.

## See also