Quadric
In mathematics a quadric, or quadric surface, is any D-dimensional (hyper-)surface represented by a second-order equation in spatial variables (coordinates). If the space coordinates are  , then the general quadric in such a space is defined by the algebraic equation
for a specific choice of Q, P and R.
The normalized equation for a three-dimensional (D=3) quadric centred at the origin (0,0,0) is:
Via translations and rotations every quadric can be transformed to one of several "normalized" forms. In three-dimensional Euclidean space, there are 16 such normalized forms, and the most interesting are following:
In real projective space, the ellipsoid, the elliptic hyperboloid, and the elliptic paraboloid are not different from each other; the two hyperbolic paraboloids are not different from each other (these are ruled surfaces); the cone and the cylinder are not different from each other (these are "degenerate" quadrics, since their Gaussian curvature is zero). In complex projective space all of the nondegenerate quadrics become indistinguishable from each other.
External links:
- http://www.geom.uiuc.edu/docs/reference/CRC-formulas/node61.html, 16 Quadrics in Geometry Formulas and Facts by Silvio Levy, excerpted from 30th Edition of the CRC Standard Mathematical Tables and Formulas (CRC Press).
Referenced By
List of algebraic geometry topics | List of geometry topics | List of mathematical topics (P-R) | Quadrics
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