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

$\{x^2\; \backslash over\; a^2\}\; +\; \{y^2\; \backslash over\; b^2\}\; -\; \{z^2\; \backslash over\; c^2\}=1$  (hyperboloid of one sheet),

or

$-\; \{x^2\; \backslash over\; a^2\}\; -\; \{y^2\; \backslash over\; b^2\}\; +\; \{z^2\; \backslash over\; c^2\}=1$  (hyperboloid of two sheets)

If, and only if, a = b, it is a hyperboloid of revolution. A hyperboloid of one sheet can be obtained by revolving a hyperbola around its transversal axis. Alternatively, a hyperboloid of two sheets of axis AB is obtained as the set of points P such that AP−BP is a constant, AP being the distance between A and P. Points A and B are then called the foci of the hyperboloid. A hyperboloid of two sheets can be obtained by revolving a hyperbola around its focal axis.

A hyperboloid of one sheet is a doubly ruled surface; if it is a hyperboloid of revolution, it can also be obtained by revolving a line about a skew line.

A degenerate hyperboloid is of the form

$\{x^2\; \backslash over\; a^2\}\; +\; \{y^2\; \backslash over\; b^2\}\; -\; \{z^2\; \backslash over\; c^2\}=0;$

if a = b then this will give a cone, if not then it gives an elliptical cone.

See also

---

• Ellipsoid
• Paraboloid
• Hyperboloid structure

Surfaces | Quadrics

سطح زائد | Hiperboloide | Hyperboloid | Hiperboloide | Hyperboloïde | Iperboloide | Hyperboloïde | Hiperboloida | Hiperbolóide | Гиперболоид | Hyperboloidi | Hyperboloid