Bicorn

In 1864, James Joseph Sylvester studied the curve $${\displaystyle y^{4}-xy^{3}-8xy^{2}+36x^{2}y+16x^{2}-27x^{3}=0}$$  in connection with the classification of quintic equations; he named the curve a bicorn because it has two cusps. This curve was further studied by Arthur Cayley in 1867.^[3]

The bicorn is a plane algebraic curve of degree four and genus zero. It has two cusp singularities in the real plane, and a double point in the complex projective plane at ${\displaystyle (x=0,z=0)}$ . If we move ${\displaystyle x=0}$  and ${\displaystyle z=0}$  to the origin and perform an imaginary rotation on ${\displaystyle x}$  by substituting ${\displaystyle ix/z}$  for ${\displaystyle x}$  and ${\displaystyle 1/z}$  for ${\displaystyle y}$  in the bicorn curve, we obtain $${\displaystyle \left(x^{2}-2az+a^{2}z^{2}\right)^{2}=x^{2}+a^{2}z^{2}.}$$  This curve, a limaçon, has an ordinary double point at the origin, and two nodes in the complex plane, at ${\displaystyle x=\pm i}$  and ${\displaystyle z=1}$ .^[4]

The parametric equations of a bicorn curve are $${\displaystyle {\begin{aligned}x&=a\sin \theta \\y&=a\,{\frac {(2+\cos \theta )\cos ^{2}\theta }{3+\sin ^{2}\theta }}\end{aligned}}}$$  with ${\displaystyle -\pi \leq \theta \leq \pi .}$ 

• List of curves

• Weisstein, Eric W. "Bicorn". MathWorld.