polar coordinate: Definition from Answers.com

A coordinate is a number that determines the location of a point along some line or curve. A list of two, three, or more coordinates can be used to determine the location of a point on a surface, volume, or higher-dimensional domain.

For example, the longitude is a coordinate which determines the position of a point along the Earth's equator, and latitude is another coordinate that defines a poisition along a meridian. The pair of coordinates consising of a latitude and a longitude determines a point on the surface of the Earth.

A systematic method of assigning such a coordinate list to each point in the domain is called a coordinate system. There is an infinitude of coordinate systems that one could define for any domain, and many that are used in specific contexts. The usual latitude-longitude coordinate system, for example, is widely used in geography and astronomy. The Cartesian coordinate system for the Euclidean plane and Euclidean space is the basis of analytic geometry.

Coordinates are typically named after the system used to assign them; thus one says "the Cartesian coordinates of a point p" to mean "the coordinates assigned to p by a Cartesian coordinate system".

A Cartesian coordinate system for the Euclidean plane.

1 Cartesian coordinates
2 Polar coordinates
3 Transformations between coordinate systems
4 See also
- 4.1 Spherical coordinates
5 External links

Cartesian coordinates

Main article: Cartesian coordinate system

In the two-dimensional Cartesian coordinate system, a point P in the xy-plane is represented by a pair of numbers $(x, y)$ .

$x$ is the signed distance from the y-axis to the point P, and
$y$ is the signed distance from the x-axis to the point P.

In the three-dimensional Cartesian coordinate system, a point P in the xyz-space is represented by a triple of numbers $(x, y, z)$ .

$x$ is the signed distance from the yz-plane to the point P,
$y$ is the signed distance from the xz-plane to the point P, and
$z$ is the signed distance from the xy-plane to the point P.

Polar coordinates

The polar coordinate systems are coordinate systems in which a point is identified by a distance from some fixed feature in space and one or more subtended angles. They are the most common systems of curvilinear coordinates.

The term polar coordinates often refers to circular coordinates (two-dimensional). Other commonly used polar coordinates are cylindrical coordinates and spherical coordinates (both three-dimensional).

Circular coordinates

Main article: Polar coordinate system

The circular coordinate system, commonly referred to as the polar coordinate system, is a two-dimensional polar coordinate system, defined by an origin, O, and a ray (or semi-infinite line) L leading from this point. L is also called the polar axis. In terms of the Cartesian coordinate system, one usually picks O to be the origin (0,0) and L to be the positive x-axis (the right half of the x-axis).

In this picture x is L and the Cartesian coordinate axis is used for the purpose of illustration

In the circular coordinate system, a point P is represented by a pair (r, θ). Using terms of the Cartesian coordinate system,

$0\leq{r}$ (radius) is the distance from the origin to the point P, and
$0\leq\theta<360^\circ$ (azimuth) is the angle between the positive x-axis and the line from the origin to the point P.

Possible coordinate transformations from one circular coordinate system to another include:

change of zero direction (such as making north the zero direction)
changing from the angle increasing counterclockwise to increasing clockwise or conversely (as in a compass)
change of scale

and combinations. More generally, transformations of the corresponding Cartesian coordinates can be translated into transformations from one circular coordinate system to another by basically transforming to Cartesian coordinates, transforming those, and transforming back to circular coordinates. This is e.g. needed for:

change of origin
change of scale in one direction

A minor change is changing the range $0\leq\theta<360^\circ$ to e.g. $-180^\circ<\theta\leq180^\circ$

Circular coordinates can be convenient in situations where only the distance, or only the direction to a fixed point matters, rotations about a point, etc. (by taking the special point as the origin).

A complex number can be viewed as a point or a position vector on a plane, the so-called complex plane or Argand diagram. Here the circular coordinates are r = |z|, called the absolute value or modulus of z, and φ = arg(z), called the complex argument of z. These coordinates (mod-arg form) are especially convenient for complex multiplication and powers.

Cylindrical coordinates

Main article: Cylindrical coordinate system

A cylindrical coordinate system, showing radius, ρ, azimuth, φ and height, z.

The cylindrical coordinate system is a three-dimensional polar coordinate system. In the cylindrical coordinate system, a point P is represented by a triple (r, θ, h). Using terms of the Cartesian coordinate system,

$0\leq{r}$ (radius) is the distance between the z-axis and the point P,
$0\leq\theta<360^\circ$ (azimuth or longitude) is the angle between the positive x-axis and the line from the origin to the point P projected onto the xy-plane, and
$h$ (height) is the signed distance from xy-plane to the point P.

Note: some sources use

z

for

h

; there is no "right" or "wrong" convention, but it is necessary to be aware of the convention being used.

Cylindrical coordinates involve some redundancy; θ loses its significance if r = 0.

Cylindrical coordinates are useful in analyzing systems that are symmetrical about an axis. For example the infinitely long cylinder that has the Cartesian equation $x 2 + y 2 = c 2$ has the very simple equation $r = c$ in cylindrical coordinates.

Spherical coordinates

The spherical coordinate system, showing a point, P and its coordinates, ρ,θ and φ

The spherical coordinate system is a three-dimensional polar coordinate system. In this coordinate system, a point $P$ is represented by a triple (ρ,θ,φ). Using terms of the Cartesian coordinate system,

$0\leq\rho$ (radius) is the distance between the point $P$ and the origin,
$0\leq\phi\leq 180^\circ$ (zenith, colatitude or polar angle) is the angle between the $z$ -axis and the line from the origin to the point P, and
$0\leq\theta\leq 360^\circ$ (azimuth or longitude) is the angle between the positive $x$ -axis and the line from the origin to the point P projected onto the $x y$ -plane.

There are different conventions for the exact letters used for the angles (for example, physics sources typically use $φ$ for the longitude and $θ$ for the colatitude).

The concept of spherical coordinates can be extended to higher dimensional spaces and are then referred to as hyperspherical coordinates.

Transformations between coordinate systems

Main article: List of canonical coordinate transformations

Because there are many different possible coordinate systems for describing points in the plane or in space, it is important to understand how they are related. Such relations are described by coordinate transformations which give formulae for the coordinates in one system in terms of the coordinates in another system. For example, in the plane, if Cartesian coordinates (x,y) and polar coordinates (r,θ) have the same origin, and the polar axis is the positive x axis, then the coordinate transformation from polar to Cartesian coordinates is given by x = r cos θ and y = r sin θ.

External links

Frank Wattenberg has made some attractive animations illustrating spherical and cylindrical coordinate systems.
http://www.physics.oregonstate.edu/bridge/papers/spherical.pdf is a description of the different conventions in use for naming components of spherical coordinates, along with a proposal for standardizing this.
http://mathworld.wolfram.com/SphericalCoordinates.html is a very thorough review of all possible partial derivatives etc.

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polar coordinate

Contents

Cartesian coordinates

Polar coordinates

Circular coordinates

Cylindrical coordinates

Spherical coordinates

Transformations between coordinate systems

See also

Spherical coordinates

External links