Circumference

mathematical constant $π$
Part of a series of articles on the

Uses
Area of a circle Circumference Use in other formulae
Properties
Irrationality Transcendence
Value
Less than 22/7 Approximations Memorization
People
Archimedes Liu Hui Zu Chongzhi Aryabhata Madhava Ludolph van Ceulen Seki Takakazu Takebe Kenko William Jones John Machin William Shanks John Wrench Chudnovsky brothers Yasumasa Kanada
History
Chronology Book
In culture
Legislation Holiday
Related topics
Squaring the circle Basel problem Six nines in $π$ Other topics related to $π$

The circumference (from Latin circumferentia, meaning "carrying around") of a closed curve or circular object is the linear distance around its edge.^[1] The circumference of a circle is of special importance in geometry and trigonometry. Informally "circumference" may also refer to the edge itself rather than to the length of the edge. Circumference is a special case of perimeter: the perimeter is the length around any closed figure, but conventionally "perimeter" is typically used in reference to a polygon while "circumference" typically refers to a continuously differentiable curve.

Circumference of a circle

Circle illustration with circumference (C) in black, diameter (D) in cyan, radius (R) in red, and centre or origin (O) in magenta. Circumference =

π

× diameter = 2 ×

π

× radius.

The circumference of a circle is the distance around it. The term is used when measuring physical objects, as well as when considering abstract geometric forms.

When a circle's diameter is 1, its circumference is

π

When a circle's radius is 1—called a unit circle—its circumference is 2

π

Relationship with Pi

The circumference of a circle relates to one of the most important mathematical constants in all of mathematics. This constant, pi, is represented by the Greek letter $π$ . The numerical value of $π$ is 3.14159 26535 89793 ... (see A000796). Pi is defined as the ratio of a circle's circumference $C$ to its diameter $d$ :

\pi ={\frac {C}{d}}

Or, equivalently, as the ratio of the circumference to twice the radius. The above formula can be rearranged to solve for the circumference:

{C}=\pi\cdot{d}=2\pi\cdot{r}.\!

The use of the mathematical constant $π$ is ubiquitous in mathematics, engineering, and science. The constant ratio of circumference to radius ${C}/{r} = 2\pi$ also has many uses in mathematics, engineering, and science. These uses include but are not limited to radians, computer programming, and physical constants. The Greek letter $τ$ (tau) is sometimes used to represent this constant, but is not generally accepted as proper notation.

Circumference of an ellipse

The circumference of an ellipse can be expressed in terms of the complete elliptic integral of the second kind.

Circumference of a graph

In graph theory the circumference of a graph refers to the longest cycle contained in that graph.

References

↑ San Diego State University (2004). "Perimeter, Area and Circumference" (PDF). Addison-Wesley.

External links

The Wikibook Geometry has a page on the topic of: Arcs

Look up circumference in Wiktionary, the free dictionary.

Numericana - Circumference of an ellipse
Circumference of a circle With interactive applet and animation

This article is issued from Wikipedia - version of the 11/30/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.