Jump to content

Conchoid (mathematics)

From Wikipedia, the free encyclopedia

This is an old revision of this page, as edited by Deacon Vorbis (talk | contribs) at 13:25, 23 September 2017 (Undid revision 796131361 by Robert FERREOL (talk) rv linkspam). The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.

Conchoids of line with common center.
The fixed point O is the red dot, the black line is the given curve, and each pair of coloured curves is length d from the intersection with the line that a ray through O makes. In the blue case d is greater than O's distance from the line, so the upper blue curve loops back on itself. In the green case d is the same, and in the red case it's less.
Conchoid of Nicomedes drawn by an apparatus illustrated in Eutocius' Commentaries on the works of Archimedes

A conchoid is a curve derived from a fixed point O, another curve, and a length d. It was invented by the ancient Greek mathematician Nicomedes.[1]

Description

For every line through O that intersects the given curve at A the two points on the line which are d from A are on the conchoid. The conchoid is, therefore, the cissoid of the given curve and a circle of radius d and center O. They are called conchoids because the shape of their outer branches resembles conch shells.

The simplest expression uses polar coordinates with O at the origin. If

expresses the given curve, then

expresses the conchoid.

If the curve is a line, then the conchoid is the conchoid of Nicomedes.

For instance, if the curve is the line , then the line's polar form is and therefore the conchoid can be expressed parametrically as

A limaçon is a conchoid with a circle as the given curve.

The so-called conchoid of de Sluze and conchoid of Dürer are not actually conchoids. The former is a strict cissoid and the latter a construction more general yet.

See also

References

  1. ^ Chisholm, Hugh, ed. (1911). "Conchoid" . Encyclopædia Britannica. Vol. 6 (11th ed.). Cambridge University Press. pp. 826–827.
  • J. Dennis Lawrence (1972). A catalog of special plane curves. Dover Publications. pp. 36, 49–51, 113, 137. ISBN 0-486-60288-5.

Media related to Conchoid at Wikimedia Commons