The Paraboloid reference article from the English Wikipedia on 24-Apr-2004 (provided by Fixed Reference: snapshots of Wikipedia from wikipedia.org)

Paraboloid

In mathematics, a paraboloid is a quadric, a type of surface in three dimensions, described by the equation:

(elliptic paraboloid),

or

(hyperbolic paraboloid).

Hyperbolic paraboloid.

There are two kinds of paraboloid: elliptic and hyperbolic. The elliptic paraboloid is shaped like a cup and can have a maximum or minimum point. The hyperbolic paraboloid is shaped like a saddle and can have a critical point called a saddle point.

With a = b an elliptic paraboloid is a paraboloid of revolution: a surface obtained by revolving a parabola around its axis. It the shape used by the parabolic reflectors used in mirrors, antenna dishes, and the like. It is also called a circular paraboloid.

Paraboloid of revolution.

A point light source at the focal point produces a parallel light beam. This also works the other way around: a parallel beam of light incident on the paraboloid is concentrated at the focal point. This applies also for other waves, hence parabolic antennas.

See also: ellipsoid, hyperboloid.

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