# Frustum

Set of pyramidal frustums | |
---|---|

Examples: Pentagonal and square frustum | |

Faces |
n trapezoids, 2 n-gons |

Edges |
3n |

Vertices |
2n |

Symmetry group |
C_{nv}, [1,n], (*nn) |

Properties | convex |

In geometry, a **frustum**^{} (plural: *frusta* or *frustums*) is the portion of a solid (normally a cone or pyramid) that lies between one or two parallel planes cutting it. A **right frustum** is a parallel truncation of a right pyramid.^{[1]}

The term is commonly used in computer graphics to describe the viewing frustum, the three-dimensional region which is visible on the screen. It is formed by a clipped pyramid; in particular, *frustum culling* is a method of hidden surface determination.

In the aerospace industry, frustum is the common term for the fairing between two stages of a multistage rocket (such as the Saturn V), which is shaped like a truncated cone.

## Elements, special cases, and related concepts

Each plane section is a floor or base of the frustum. Its axis if any, is that of the original cone or pyramid. A frustum is circular if it has circular bases; it is right if the axis is perpendicular to both bases, and oblique otherwise.

The height of a frustum is the perpendicular distance between the planes of the two bases.

Cones and pyramids can be viewed as degenerate cases of frusta, where one of the cutting planes passes through the apex (so that the corresponding base reduces to a point). The pyramidal frusta are a subclass of the prismatoids.

Two frusta joined at their bases make a bifrustum. Three frusta joined at their bases make a trifrustom

## Formulae

### Volume

The volume formula of a frustum of a square pyramid was introduced by the ancient Egyptian mathematics in what is called the Moscow Mathematical Papyrus, written in the 13th dynasty (ca. 1850 BC):

where *a* and *b* are the base and top side lengths of the truncated pyramid, and *h* is the height.
The Egyptians knew the correct formula for obtaining the volume of a truncated square pyramid, but no proof of this equation is given in the Moscow papyrus.

The volume of a conical or pyramidal frustum is the volume of the solid before slicing the apex off, minus the volume of the apex:

where *B*_{1} is the area of one base, *B*_{2} is the area of the other base, and *h*_{1}, *h*_{2} are the perpendicular heights from the apex to the planes of the two bases.

Considering that

the formula for the volume can be expressed as a product of this proportionality α/3 and a difference of cubes of heights *h*_{1} and *h*_{2} only.

By factoring the difference of two cubes ( a^{3} - b^{3} = (a-b)(a^{2} + ab + b^{2}) ) we get *h*_{1}−*h*_{2} = *h*, the height of the frustum, and α(*h*_{1}^{2} + *h*_{1}*h*_{2} + *h*_{2}^{2})/3.

Distributing α and substituting from its definition, the Heronian mean of areas *B*_{1} and *B*_{2} is obtained. The alternative formula is therefore

Heron of Alexandria is noted for deriving this formula and with it encountering the imaginary number, the square root of negative one.^{[2]}

In particular, the volume of a circular cone frustum is

where *π* is 3.14159265..., and *R*_{1}, *R*_{2} are the radii of the two bases.

The volume of a pyramidal frustum whose bases are *n*-sided regular polygons is

where *a*_{1} and *a*_{2} are the sides of the two bases.

### Surface area

For a right circular conical frustum^{[3]}

and

where *R*_{1} and *R*_{2} are the base and top radii respectively, and *s* is the slant height of the frustum.

The surface area of a right frustum whose bases are similar regular *n*-sided polygons is

where *a*_{1} and *a*_{2} are the sides of the two bases.

## Examples

- On the back (the reverse) of a United States one-dollar bill, a pyramidal frustum appears on the reverse of the Great Seal of the United States, surmounted by the Eye of Providence.
- Certain ancient Native American mounds also form the frustum of a pyramid.
- Chinese pyramids.
- The John Hancock Center in Chicago, Illinois is a frustum whose bases are rectangles.
- The Washington Monument is a narrow square-based pyramidal frustum topped by a small pyramid.
- The viewing frustum in 3D computer graphics is a virtual photographic or video camera's usable field of view modeled as a pyramidal frustum.
- In the English translation of Stanislaw Lem's short-story collection
*The Cyberiad*, the poem*Love and tensor algebra*claims that "every frustum longs to be a cone". - Buckets and typical lampshades are everyday examples of conical frustums.

## Notes

- 1.
**^**The term "frustum" comes from Latin*frustum*meaning "piece" or "crumb". The English word is often misspelled as*frustrum*, a different Latin word cognate to the English word "frustrate".^{[4]}The confusion between these two words is very old: a warning about them can be found in the*Appendix Probi*, and the works of Plautus include a pun on them.^{[5]}

## References

- ↑ William F. Kern, James R Bland,
*Solid Mensuration with proofs*, 1938, p.67 - ↑ Nahin, Paul. "An Imaginary Tale: The story of [the square root of minus one]." Princeton University Press. 1998
- ↑ "Mathwords.com: Frustum". Retrieved 17 July 2011.
- ↑ Clark, John Spencer (1895),
*Teachers' Manual: Books I-VIII.. For Prang's complete course in form-study and drawing, Books 7-8*, Prang Educational Company, p. 49. - ↑ Fontaine, Michael (2010),
*Funny Words in Plautine Comedy*, Oxford University Press, pp. 117, 154, ISBN 9780195341447.

## External links

Look up in Wiktionary, the free dictionary.frustum |

Wikimedia Commons has media related to .Frustums |

- Derivation of formula for the volume of frustums of pyramid and cone (Mathalino.com)
- Weisstein, Eric W. "Pyramidal frustum".
*MathWorld*.

- Paper models of frustums (truncated pyramids)
- Paper model of frustum (truncated cone)
- Design paper models of conical frustum (truncated cones)