Hypotrochoid: Difference between revisions

A hypotrochoid is a roulette traced by a point attached to a circle of radius r rolling around the inside of a fixed circle of radius R, where the point is a distance d from the center of the interior circle.

The red curve is a hypotrochoid drawn as the smaller black circle rolls around inside the larger blue circle (parameters are R = 5.0, r = 3, d = 5).

The parametric equations for a hypotrochoid are:

${\displaystyle x(\theta )=(R-r)\cos \theta +d\cos \left({R-r \over r}\theta \right),}$

${\displaystyle y(\theta )=(R-r)\sin \theta -d\sin \left({R-r \over r}\theta \right).}$

Special cases include the hypocycloid with d = r and the ellipse with R = 2r.

The ellipse (drawn in red) may be expressed as a special case of the hypotrochoid, with R = 2r; here R = 10, r = 5, d = 1.

The classic Spirograph toy traces out hypotrochoid and epitrochoid curves.

See also

• Epitrochoid
• Cycloid
• Hypocycloid
• Epicycloid
• Spirograph

References

• J. Dennis Lawrence (1972). A catalog of special plane curves. Dover Publications. pp. 165–168. ISBN 0-486-60288-5.

External links

• Flash Animation of Hypocycloid
• Hypotrochoid from Visual Dictionary of Special Plane Curves, Xah Lee.