In Euclidean geometry, the McCay cubic (also called M'Cay cubic[1] or Griffiths cubic[2]) is a cubic plane curve in the plane of a reference triangle and associated with it. It is the third cubic curve in Bernard Gilbert's Catalogue of Triangle Cubics and it is assigned the identification number K003.[2]
Definition
editThe McCay cubic can be defined by locus properties in several ways.[2] For example, the McCay cubic is the locus of a point P such that the pedal circle of P is tangent to the nine-point circle of the reference triangle △ABC.[3] The McCay cubic can also be defined as the locus of point P such that the circumcevian triangle of P and △ABC are orthologic.
Equation of the McCay cubic
editThe equation of the McCay cubic in barycentric coordinates is
The equation in trilinear coordinates is
McCay cubic as a stelloid
editA stelloid is a cubic that has three real concurring asymptotes making 60° angles with one another. McCay cubic is a stelloid in which the three asymptotes concur at the centroid of triangle ABC.[2] A circum-stelloid having the same asymptotic directions as those of McCay cubic and concurring at a certain (finite) is called McCay stelloid. The point where the asymptoptes concur is called the "radial center" of the stelloid.[4] Given a finite point X there is one and only one McCay stelloid with X as the radial center.
References
edit- ^ Weisstein, Eric W. "M'Cay Cubic". MathWorld-A Wolfram Web Resource. Wolfram Research, Inc. Retrieved 5 December 2021.
- ^ a b c d Bernard Gilbert. "K003 McCay Cubic = Griffiths Cubic". Cubics in the Triangle Plane. Bernard Gilbert. Retrieved 5 December 2021.
- ^ John Griffiths. Mathematical Questions and Solutions from the Educational Times 2 (1902) 109, and 3 (1903) 29.
- ^ Bernard Gilbert. "McCay Stelloids" (PDF). Catalogue of Triangle Cubics. Bernard Gilbert. Retrieved 25 December 2021.