A second-order algebraic surface given by the general equation
 |
(1)
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Quadratic surfaces are also called quadrics, and there are 17 standard-form types. A quadratic surface intersects every plane in a (proper or degenerate) conic section. In addition, the cone consisting of all tangents from a fixed point to a quadratic surface cuts every plane in a conic section, and the points of contact of this cone with the surface form a conic section (Hilbert and Cohn-Vossen 1999, p. 12).
Examples of quadratic surfaces include the cone, cylinder, ellipsoid, elliptic cone, elliptic cylinder, elliptic hyperboloid, elliptic paraboloid, hyperbolic cylinder, hyperbolic paraboloid, paraboloid, sphere, and spheroid.
Define
 |  | ![[a h g; h b f; g f c]](/images/equations/QuadraticSurface/Inline3.svg) |
(2)
|
 |  | ![[a h g p; h b f q; g f c r; p q r d]](/images/equations/QuadraticSurface/Inline6.svg) |
(3)
|
 |  |  |
(4)
|
 |  |  |
(5)
|
 |  |  |
(6)
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and 
,
,
as 
are the roots of
 |
(7)
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Also define
 |
(8)
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Then the following table enumerates the 17 quadrics and their properties (Beyer 1987).
| surface | equation |  |  |  |  |
| coincident planes |  | 1 | 1 | ||
| ellipsoid (imaginary) |  | 3 | 4 |  | 1 |
| ellipsoid (real) |  | 3 | 4 |  | 1 |
| elliptic cone (imaginary) |  | 3 | 3 | 1 | |
| elliptic cone (real) |  | 3 | 3 | 0 | |
| elliptic cylinder (imaginary) |  | 2 | 3 | 1 | |
| elliptic cylinder (real) |  | 2 | 3 | 1 | |
| elliptic paraboloid |  | 2 | 4 |  | 1 |
| hyperbolic cylinder |  | 2 | 3 | 0 | |
| hyperbolic paraboloid |  | 2 | 4 |  | 0 |
| hyperboloid of one sheet |  | 3 | 4 |  | 0 |
| hyperboloid of two sheets |  | 3 | 4 |  | 0 |
| intersecting planes (imaginary) |  | 2 | 2 | 1 | |
| intersecting planes (real) |  | 2 | 2 | 0 | |
| parabolic cylinder |  | 1 | 3 | ||
| parallel planes (imaginary) |  | 1 | 2 | ||
| parallel planes (real) |  | 1 | 2 |
Of the non-degenerate quadratic surfaces, the elliptic (and usual) cylinder, hyperbolic cylinder, elliptic (and usual) cone are ruled surfaces, while the one-sheeted hyperboloid and hyperbolic paraboloid are doubly ruled surfaces.
A curve in which two arbitrary quadratic surfaces in arbitrary positions intersect cannot meet any plane in more than four points (Hilbert and Cohn-Vossen 1999, p. 24).
