Paraboloid

In geometry, a paraboloid is a quadric surface that has exactly one axis of symmetry and no center of symmetry. The term "paraboloid" is derived from parabola, which refers to a conic section that has a similar property of symmetry.

Every plane section of a paraboloid by a plane parallel to the axis of symmetry is a parabola. The paraboloid is hyperbolic if every other plane section is either a hyperbola, or two crossing lines (in the case of a section by a tangent plane). The paraboloid is elliptic if every other nonempty plane section is either an ellipse, or a single point (in the case of a section by a tangent plane). A paraboloid is either elliptic or hyperbolic.

Equivalently, a paraboloid may be defined as a quadric surface that is not a cylinder, and has an implicit equation whose part of degree two may be factored over the complex numbers into two different linear factors. The paraboloid is hyperbolic if the factors are real; elliptic if the factors are complex conjugate.

An elliptic paraboloid is shaped like an oval cup and has a maximum or minimum point when its axis is vertical. In a suitable coordinate system with three axes $x$, $y$, and $z$, it can be represented by the equation $$z = \frac{x^2}{a^2} + \frac{y^2}{b^2}.$$ where $a$ and $b$ are constants that dictate the level of curvature in the $xz$ and $yz$ planes respectively. In this position, the elliptic paraboloid opens upward.

A hyperbolic paraboloid (not to be confused with a hyperboloid) is a doubly ruled surface shaped like a saddle. In a suitable coordinate system, a hyperbolic paraboloid can be represented by the equation $$z = \frac{y^2}{b^2} - \frac{x^2}{a^2}.$$ In this position, the hyperbolic paraboloid opens downward along the $x$-axis and upward along the $y$-axis (that is, the parabola in the plane $x = 0$ opens upward and the parabola in the plane $y = 0$ opens downward).

Any paraboloid (elliptic or hyperbolic) is a translation surface, as it can be generated by a moving parabola directed by a second parabola.

Elliptic paraboloid
In a suitable Cartesian coordinate system, an elliptic paraboloid has the equation $$z = \frac{x^2}{a^2}+\frac{y^2}{b^2}.$$

If $a = b$, an elliptic paraboloid is a circular paraboloid or paraboloid of revolution. It is a surface of revolution obtained by revolving a parabola around its axis.

A circular paraboloid contains circles. This is also true in the general case (see Circular section).

From the point of view of projective geometry, an elliptic paraboloid is an ellipsoid that is tangent to the plane at infinity.

The plane sections of an elliptic paraboloid can be:
 * Plane sections
 * a parabola, if the plane is parallel to the axis,
 * a point, if the plane is a tangent plane.
 * an ellipse or empty, otherwise.

Parabolic reflector
On the axis of a circular paraboloid, there is a point called the focus (or focal point), such that, if the paraboloid is a mirror, light (or other waves) from a point source at the focus is reflected into a parallel beam, parallel to the axis of the paraboloid. This also works the other way around: a parallel beam of light that is parallel to the axis of the paraboloid is concentrated at the focal point. For a proof, see.

Therefore, the shape of a circular paraboloid is widely used in astronomy for parabolic reflectors and parabolic antennas.

The surface of a rotating liquid is also a circular paraboloid. This is used in liquid-mirror telescopes and in making solid telescope mirrors (see rotating furnace).

Hyperbolic paraboloid


The hyperbolic paraboloid is a doubly ruled surface: it contains two families of mutually skew lines. The lines in each family are parallel to a common plane, but not to each other. Hence the hyperbolic paraboloid is a conoid.

These properties characterize hyperbolic paraboloids and are used in one of the oldest definitions of hyperbolic paraboloids: a hyperbolic paraboloid is a surface that may be generated by a moving line that is parallel to a fixed plane and crosses two fixed skew lines.

This property makes it simple to manufacture a hyperbolic paraboloid from a variety of materials and for a variety of purposes, from concrete roofs to snack foods. In particular, Pringles fried snacks resemble a truncated hyperbolic paraboloid.

A hyperbolic paraboloid is a saddle surface, as its Gauss curvature is negative at every point. Therefore, although it is a ruled surface, it is not developable.

From the point of view of projective geometry, a hyperbolic paraboloid is one-sheet hyperboloid that is tangent to the plane at infinity.

A hyperbolic paraboloid of equation $$z=axy$$ or $$z=\tfrac a 2(x^2-y^2)$$ (this is the same up to a rotation of axes) may be called a rectangular hyperbolic paraboloid, by analogy with rectangular hyperbolas.

A plane section of a hyperbolic paraboloid with equation $$z = \frac{x^2}{a^2} - \frac{y^2}{b^2}$$ can be
 * Plane sections
 * a line, if the plane is parallel to the $z$-axis, and has an equation of the form $$ bx \pm ay+b=0$$,
 * a parabola, if the plane is parallel to the $z$-axis, and the section is not a line,
 * a pair of intersecting lines, if the plane is a tangent plane,
 * a hyperbola, otherwise.

Examples in architecture
Saddle roofs are often hyperbolic paraboloids as they are easily constructed from straight sections of material. Some examples:
 * Philips Pavilion Expo '58, Brussels (1958)
 * IIT Delhi - Dogra Hall Roof
 * St. Mary's Cathedral, Tokyo, Japan (1964)
 * St Richard's Church, Ham, in Ham, London, England (1966)
 * Cathedral of Saint Mary of the Assumption, San Francisco, California, US (1971)
 * Saddledome in Calgary, Alberta, Canada (1983)
 * Scandinavium in Gothenburg, Sweden (1971)
 * L'Oceanogràfic in Valencia, Spain (2003)
 * London Velopark, England (2011)
 * Waterworld Leisure & Activity Centre, Wrexham, Wales (1970)
 * Markham Moor Service Station roof, A1(southbound), Nottinghamshire, England
 * Cafe "Kometa", Sokol district, Moscow, Russia (1960). Architect V.Volodin, engineer N.Drozdov. Demolished.

Cylinder between pencils of elliptic and hyperbolic paraboloids


The pencil of elliptic paraboloids $$z=x^2 + \frac{y^2}{b^2}, \ b>0, $$ and the pencil of hyperbolic paraboloids $$z=x^2 - \frac{y^2}{b^2}, \ b>0, $$ approach the same surface $$ z=x^2$$ for $$ b \rightarrow \infty$$, which is a parabolic cylinder (see image).

Curvature
The elliptic paraboloid, parametrized simply as $$\vec \sigma(u,v) = \left(u, v, \frac{u^2}{a^2} + \frac{v^2}{b^2}\right) $$ has Gaussian curvature $$K(u,v) = \frac{4}{a^2 b^2 \left(1 + \frac{4u^2}{a^4} + \frac{4v^2}{b^4}\right)^2}$$ and mean curvature $$H(u,v) = \frac{a^2 + b^2 + \frac{4u^2}{a^2} + \frac{4v^2}{b^2}}{a^2 b^2 \sqrt{\left(1 + \frac{4u^2}{a^4} + \frac{4v^2}{b^4}\right)^3}}$$ which are both always positive, have their maximum at the origin, become smaller as a point on the surface moves further away from the origin, and tend asymptotically to zero as the said point moves infinitely away from the origin.

The hyperbolic paraboloid, when parametrized as $$\vec \sigma (u,v) = \left(u, v, \frac{u^2}{a^2} - \frac{v^2}{b^2}\right) $$ has Gaussian curvature $$K(u,v) = \frac{-4}{a^2 b^2 \left(1 + \frac{4u^2}{a^4} + \frac{4v^2}{b^4}\right)^2} $$ and mean curvature $$H(u,v) = \frac{-a^2 + b^2 - \frac{4u^2}{a^2} + \frac{4v^2}{b^2}}{a^2 b^2 \sqrt{\left(1 + \frac{4u^2}{a^4} + \frac{4v^2}{b^4}\right)^3}}. $$

Geometric representation of multiplication table
If the hyperbolic paraboloid $$z = \frac{x^2}{a^2} - \frac{y^2}{b^2}$$ is rotated by an angle of $F$ in the $π⁄4$ direction (according to the right hand rule), the result is the surface $$z = \left(\frac{x^2 + y^2}{2}\right) \left(\frac{1}{a^2} - \frac{1}{b^2}\right) + xy \left(\frac{1}{a^2} + \frac{1}{b^2}\right)$$ and if $+z$ then this simplifies to $$z = \frac{2xy}{a^2}.$$ Finally, letting $a = b$, we see that the hyperbolic paraboloid $$z = \frac{x^2 - y^2}{2}.$$ is congruent to the surface $$z = xy$$ which can be thought of as the geometric representation (a three-dimensional nomograph, as it were) of a multiplication table.

The two paraboloidal $a = √2$ functions $$z_1 (x,y) = \frac{x^2 - y^2}{2}$$ and $$z_2 (x,y) = xy$$ are harmonic conjugates, and together form the analytic function $$f(z) = \frac{z^2}{2} = f(x + yi) = z_1 (x,y) + i z_2 (x,y)$$ which is the analytic continuation of the $R2 → R$ parabolic function $R → R$.

Dimensions of a paraboloidal dish
The dimensions of a symmetrical paraboloidal dish are related by the equation $$4FD = R^2,$$ where $f(x) = x2⁄2$ is the focal length, $F$ is the depth of the dish (measured along the axis of symmetry from the vertex to the plane of the rim), and $D$ is the radius of the rim. They must all be in the same unit of length. If two of these three lengths are known, this equation can be used to calculate the third.

A more complex calculation is needed to find the diameter of the dish measured along its surface. This is sometimes called the "linear diameter", and equals the diameter of a flat, circular sheet of material, usually metal, which is the right size to be cut and bent to make the dish. Two intermediate results are useful in the calculation: $R$ (or the equivalent: $P = 2F$) and $P = R2⁄2D$, where $Q = √P2 + R2$, $F$, and $D$ are defined as above. The diameter of the dish, measured along the surface, is then given by $$\frac{RQ}{P} + P \ln\left(\frac{R+Q}{P}\right),$$ where $R$ means the natural logarithm of $ln x$, i.e. its logarithm to base $x$.

The volume of the dish, the amount of liquid it could hold if the rim were horizontal and the vertex at the bottom (e.g. the capacity of a paraboloidal wok), is given by $$\frac{\pi}{2} R^2 D,$$ where the symbols are defined as above. This can be compared with the formulae for the volumes of a cylinder ($e$), a hemisphere ($πR2D$, where $2π⁄3R2D$), and a cone ($D = R$). $π⁄3R2D$ is the aperture area of the dish, the area enclosed by the rim, which is proportional to the amount of sunlight a reflector dish can intercept. The surface area of a parabolic dish can be found using the area formula for a surface of revolution which gives $$A = \frac{\pi R\left(\sqrt{(R^2+4D^2)^3}-R^3\right)}{6D^2}.$$