Cartesian coordinate system

From WikiMD's Wellness Encyclopedia

(Redirected from Cartesian coordinates)

Cartesian-coordinate-system

Cartesian coordinate system is a mathematical concept used to define a location in a two-dimensional or three-dimensional space. Named after the French mathematician René Descartes, who formalized its use in the 17th century, the Cartesian coordinate system has become a fundamental element in the fields of mathematics, physics, engineering, and many other sciences.

Overview[edit | edit source]

The Cartesian coordinate system divides the plane into four quadrants, defined by two perpendicular axes: the x-axis (horizontal) and the y-axis (vertical). The point where these axes intersect is known as the origin, typically labeled as point O. The location of any point in the plane can be determined by an ordered pair of numbers (x, y), known as coordinates. The x-coordinate (abscissa) specifies the point's horizontal distance from the origin, while the y-coordinate (ordinate) specifies the vertical distance.

In three-dimensional space, the system is extended by adding a third axis, perpendicular to both the x and y axes, known as the z-axis. This allows for the specification of any point in three-dimensional space by a set of three coordinates (x, y, z).

Applications[edit | edit source]

The Cartesian coordinate system is widely used across various disciplines. In mathematics, it is essential for graphing equations, calculating areas and volumes, and performing numerous other analytical tasks. In physics, it provides a framework for describing the motion of objects, the forces acting upon them, and other physical phenomena. Engineers and architects use the Cartesian coordinate system to design and analyze structures, machines, and systems.

History[edit | edit source]

The Cartesian coordinate system was developed by René Descartes in his work "La Géométrie" (1637), part of his larger publication "Discourse on the Method." Descartes' development of this coordinate system was a breakthrough in the linkage between algebra and geometry, enabling geometric problems to be solved algebraically and vice versa.

See Also[edit | edit source]

Contributors: Prab R. Tumpati, MD