Point -- from Wolfram MathWorld
- ️Weisstein, Eric W.
A point is a 0-dimensional mathematical object which can be specified in -dimensional
space using an n-tuple (
,
,
...,
) consisting of
coordinates. In dimensions greater than or equal to two, points
are sometimes considered synonymous with vectors and so
points in n-dimensional space are sometimes called
n-vectors. Although the notion of a point is
intuitively rather clear, the mathematical machinery used to deal with points and
point-like objects can be surprisingly slippery. This difficulty was encountered
by none other than Euclid himself who, in his Elements,
gave the vague definition of a point as "that which has no part."
The basic geometric structures of higher dimensional geometry--the line, plane, space, and hyperspace--are all built up of infinite numbers of points arranged in particular ways.
These facts lead to the mathematical pun, "without geometry, life is pointless."
The decimal point in a decimal expansion is voiced as "point" in the United States, e.g., 3.1415 is voiced "three point one four one five," whereas a comma is used for this purpose in continental Europe.
See also
Accumulation Point, Boundary Point, Branch Point, Cartesian Coordinates, Comma, Concur, Concurrent, Critical Point, Double Point, Endpoint, Euclidean Space, Fixed Point, Isolated Point, Limit Point, Line Line Picking, Midpoint, n-Tuple, n-Vector, Ordinary Point, Point-Line Distance--2-Dimensional, Point-Line Distance--3-Dimensional, Point-Point Distance--2-Dimensional, Point-Point Distance--3-Dimensional, Point Set, Singular Point Explore this topic in the MathWorld classroom
Portions of this entry contributed by Christopher Stover
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References
Casey, J. "The Point." Ch. 1 in A Treatise on the Analytical Geometry of the Point, Line, Circle, and Conic Sections, Containing an Account of Its Most Recent Extensions, with Numerous Examples, 2nd ed., rev. enl. Dublin: Hodges, Figgis, & Co., pp. 1-29, 1893.Lachlan, R. "Special Points Connected with a Triangle." §112-117 in An Elementary Treatise on Modern Pure Geometry. London: Macmillian, pp. 62-66, 1893.
Referenced on Wolfram|Alpha
Cite this as:
Stover, Christopher and Weisstein, Eric W. "Point." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/Point.html