Astroid

Cartesian equation:
x^2/3 + y^2/3 = a^2/3
or parametrically:
x = a cos³(t), y = a sin³(t)

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

The astroid only acquired its present name in 1836 in a book published in Vienna. It has been known by various names in the literature, even after 1836, including cubocycloid and paracycle.

The length of the astroid is 6a and its area is 3πa²/8.

The gradient of the tangent T from the point with parameter p is -tan(p). The equation of this tangent T is

x sin(p) + y cos(p) = a sin(2p)/2

Let T cut the x-axis and the y-axis at X and Y respectively. Then the length XY is a constant and is equal to a.

It can be formed by rolling a circle of radius a/4 on the inside of a circle of radius a.
It can also be formed as the envelope produced when a line segment is moved with each end on one of a pair of perpendicular axes. It is therefore a glissette.

Other Web site:

Xah Lee

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