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This article describes some of the common coordinate systems that appear in elementary mathematics. For advanced topics, please refer to coordinate system. For more background, see Cartesian coordinate system.
The coordinates of a point are the components of a tuple of numbers used to represent the location of the point in the plane or space. A coordinate system is a plane or space where the origin and axes are defined so that coordinates can be measured.
In the two-dimentional Cartesian coordinate system, a point P in the xy-plane is represent by a tuple of two components .
For advanced topics, please refer to Cartesian coordinate system.
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.
The term polar coordinates often refered to circular coordinates (two-dimentional). Other commonly used polar coordinates are
cylindrical coordinates and spherical coordinates (both three-dimentional).
The circular coordinate system, often called simply as the polar coordinate system, is a two-dimensional polar coordinate system, defined by an origin, O, and a 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 the circular coordinate system, a point P is represent by a tuple of two components . Using terms of the Cartesian coordinate system,
The cylindrical coordinate system is a three-dimentional polar coordinate.
In the cylindrical coordinate system, a point P is represent by a tuple of three components . Using terms of the Cartesian coordinate system,
The cylindrical coordinates involves some redundancy; loses its significance if .
Cylindrical coordinates are useful in analyzing systems that are symmetrical about an axis, the infinitely long cylinder that has the Cartesian equation has the very simple equation in cylindrical coordinates. Hence the name of "cylindrical" coordinates.
The spherical coordinate system is a three-dimentional polar coordinate.
In the spherical coordinate system, a point P is represent by a tuple of three components . Using terms of the Cartesian coordinate system,
The spherical coordinate system involves some redundancy; loses its significance if , and loses its significance if or or .
To construct a point from its spherical coordinates: from the origin, go along the positive z-axis, rotate about y-axis toward the direction of the positive x-axis, and rotate about the z-axis toward the direction of the positive y-axis.
Spherical coordinates are useful in analyzing systems that are symmetrical about a point; a sphere that has the Cartesian equation has the very simple equation in spherical coordinates. Hence the name of "spherical" coordinates.
Spherical coordinates are the natural coordinates for physical situations where there is spherical symmetry. In such a situation, one can describe waves using spherical harmonics.
Another application is ergodynamic design, where is the arm length of a stationary person and the angles describe the direction of the arm as it reaches out.
Cartesian coordinates
In the three-dimentional Cartesian coordinate system, a point P in the xyz-space is represent by a tuple of three components .
Basic concept of coordinates is hard to explain in words.Polar coordinates
Circular coordinates
Cylindrical coordinates
Note: some sources use for ; there is no "right" or "wrong" convention, but the convention being used must be awared of.Spherical coordinates
Note: some sources interchange the symbols and relative to this article, or use for ; there is no widely accepted convention.Conversion between coordinate systems
Cartesian and circular
Cartesian and cylindrical
Cartesian and spherical
cylindrical and spherical
See also
