Devil's curve

Template:Short description Template:Dark mode invert Template:Dark mode invert In geometry, a Devil's curve, also known as the Devil on Two Sticks, is a curve defined in the Cartesian plane by an equation of the form^[1]

$${\displaystyle y^2(y^2-b^2)=x^2(x^2-a^2)}$$

The polar equation of this curve is of the form

$${\displaystyle r=\sqrt{\frac{b^2{\sin }^2\theta -a^2{\cos }^2\theta }{{\sin }^2\theta -{\cos }^2\theta }}=\sqrt{\frac{b^2-a^2{\cot }^2\theta }{1-{\cot }^2\theta }}}$$

Devil's curves were discovered in 1750 by Gabriel Cramer, who studied them extensively.^[2]

The name comes from the shape its central lemniscate takes when graphed. The shape is named after the juggling game diabolo, which was named after the Devil^[3] and which involves two sticks, a string, and a spinning prop in the likeness of the lemniscate.^[4]

For ${\displaystyle |b|>|a|}$, the central lemniscate, often called hourglass, is horizontal. For ${\displaystyle |b|<|a|}$ it is vertical. If ${\displaystyle |b|=|a|}$, the shape becomes a circle. The vertical hourglass intersects the y-axis at ${\displaystyle b,-b,0}$ . The horizontal hourglass intersects the x-axis at ${\displaystyle a,-a,0}$.

A special case of the Devil's curve occurs at ${\displaystyle \frac{a^2}{b^2}=\frac{25}{24}}$, where the curve is called the electric motor curve.^[5] It is defined by an equation of the form

$${\displaystyle y^2(y^2-96)=x^2(x^2-100)}$$

The name of the special case comes from the middle shape's resemblance to the coils of wire, which rotate from forces exerted by magnets surrounding it.

Template:Reflist

• Template:Mathworld
• The MacTutor History of Mathematics (University of St. Andrews) – Devil's curve