Cayley's sextic
In geometry, Cayley's sextic (sextic of Cayley, Cayley's sextet) is a plane curve, a member of the sinusoidal spiral family, first discussed by Colin Maclaurin in 1718. Arthur Cayley was the first to study the curve in detail and it was named after him in 1900 by Archibald.
The curve is symmetric about the x-axis (y = 0) and self-intersects at y = 0, x = −a/8. Other intercepts are at the origin, at (a, 0) and with the y-axis at ±3⁄8√3a
The curve is the pedal curve (or roulette) of a cardoid with respect to its cusp.[1]
Equations of the curve
The equation of the curve in polar coordinates is[1][2]
- r = 4a cos3(θ/3)
One form of the Cartesian equation is[1][3]
- 4(x2 + y2 − ax)3 = 27a2(x2 + y2)2 .
Cayley's sextic may be parametrised (as a periodic function, period π ℝ→ℝ2) by the equations
- x = cos3t cos 3t
- y = cos3t sin 3t.
The node is at t = ±π/3.[4]
References
- ↑ 1.0 1.1 1.2 Lawrence (1972) p.178
- ↑ Christopher G. Morris. Academic Press Dictionary of Science and Technology. p. 381.
- ↑ David Darling (28 October 2004). The Universal Book of Mathematics: From Abracadabra to Zeno's Paradoxes. John Wiley and Sons. p. 62. ISBN 9780471667001.
- ↑ C. G. Gibson (2001). Elementary Geometry of Differentiable Curves: An Undergraduate Introduction. Cambridge University Press. ISBN 9780521011075.
- Lawrence, J. Dennis (1972). A catalog of special plane curves. Dover Publications. p. 178. ISBN 0-486-60288-5.