Spiral of Archimedes

Polar equation:
r =


Click below to see one of the Associated curves.

Definitions of the Associated curves Evolute
Involute 1 Involute 2
Inverse curve wrt origin Inverse wrt another circle
Pedal curve wrt origin Pedal wrt another point
Negative pedal curve wrt origin Negative pedal wrt another point
Caustic wrt horizontal rays Caustic curve wrt another point


If your browser can handle JAVA code, click HERE to experiment interactively with this curve and its associated curves.

This spiral was studied by Archimedes in about 225 BC in a work On Spirals. It had already been considered by his friend Conon.

Archimedes was able to work out the lengths of various tangents to the spiral. It can be used to trisect an angle and square the circle.

The curve can be used as a cam to convert uniform angular motion into uniform linear motion. The cam consists of one arch of the spiral above the x-axis together with its reflection in the x-axis. Rotating this with uniform angular velocity about its centre will result in uniform linear motion of the point where it crosses the y-axis.

Taking the pole as the centre of inversion, the spiral of Archimedes r = inverts to the hyperbolic spiral r = a/θ.


Main index Famous curves index
Previous curve Next curve
Biographical Index Timelines
History Topics Index Birthplace Maps
Mathematicians of the day Anniversaries for the year
Societies, honours, etc Search Form

JOC/EFR/BS January 1997

The URL of this page is:
http://www-history.mcs.st-andrews.ac.uk/Curves/Spiral.html