Cissoid

In geometry, a cissoid (from grc κισσοειδής (kissoeidēs) 'ivy-shaped') is a plane curve generated from two given curves C₁, C₂ and a point O (the pole). Let L be a variable line passing through O and intersecting C₁ at P₁ and C₂ at P₂. Let P be the point on L so that ${\displaystyle \overline{OP}=\overline{P_1{P}_2}.}$ (There are actually two such points but P is chosen so that P is in the same direction from O as P₂ is from P₁.) Then the locus of such points P is defined to be the cissoid of the curves C₁, C₂ relative to O.

Slightly different but essentially equivalent definitions are used by different authors. For example, P may be defined to be the point so that ${\displaystyle \overline{OP}=\overline{O{P}_1}+\overline{O{P}_2}.}$ This is equivalent to the other definition if C₁ is replaced by its reflection through O. Or P may be defined as the midpoint of P₁ and P₂; this produces the curve generated by the previous curve scaled by a factor of 1/2.

If C₁ and C₂ are given in polar coordinates by ${\displaystyle r=f_1(\theta )}$ and ${\displaystyle r=f_2(\theta )}$ respectively, then the equation ${\displaystyle r=f_2(\theta )-f_1(\theta )}$ describes the cissoid of C₁ and C₂ relative to the origin. However, because a point may be represented in multiple ways in polar coordinates, there may be other branches of the cissoid which have a different equation. Specifically, C₁ is also given by

${\displaystyle \begin{array}{rl}& r=-f_1(\theta +\pi )\\ & r=-f_1(\theta -\pi )\\ & r=f_1(\theta +2\pi )\\ & r=f_1(\theta -2\pi )\\ & ⋮\end{array}}$

So the cissoid is actually the union of the curves given by the equations

${\displaystyle \begin{array}{rl}& r=f_2(\theta )-f_1(\theta )\\ & r=f_2(\theta )+f_1(\theta +\pi )\\ & r=f_2(\theta )+f_1(\theta -\pi )\\ & r=f_2(\theta )-f_1(\theta +2\pi )\\ & r=f_2(\theta )-f_1(\theta -2\pi )\\ & ⋮\end{array}}$

It can be determined on an individual basis depending on the periods of f₁ and f₂, which of these equations can be eliminated due to duplication.

For example, let C₁ and C₂ both be the ellipse

${\displaystyle r=\frac{1}{2-\cos \theta }.}$

The first branch of the cissoid is given by

${\displaystyle r=\frac{1}{2-\cos \theta }-\frac{1}{2-\cos \theta }=0,}$

which is simply the origin. The ellipse is also given by

${\displaystyle r=\frac{-1}{2+\cos \theta },}$

so a second branch of the cissoid is given by

${\displaystyle r=\frac{1}{2-\cos \theta }+\frac{1}{2+\cos \theta }}$

which is an oval shaped curve.

If each C₁ and C₂ are given by the parametric equations

${\displaystyle x=f_1(p),y=px}$

and

${\displaystyle x=f_2(p),y=px,}$

then the cissoid relative to the origin is given by

${\displaystyle x=f_2(p)-f_1(p),y=px.}$

When C₁ is a circle with center O then the cissoid is conchoid of C₂.

When C₁ and C₂ are parallel lines then the cissoid is a third line parallel to the given lines.

Let C₁ and C₂ be two non-parallel lines and let O be the origin. Let the polar equations of C₁ and C₂ be

${\displaystyle r=\frac{a_1}{\cos (\theta -{\alpha }_1)}}$

and

${\displaystyle r=\frac{a_2}{\cos (\theta -{\alpha }_2)}.}$

By rotation through angle ${\displaystyle \frac{{\alpha }_1-{\alpha }_2}{2},}$ we can assume that ${\displaystyle {\alpha }_1=\alpha ,{\alpha }_2=-\alpha .}$ Then the cissoid of C₁ and C₂ relative to the origin is given by

${\displaystyle \begin{array}{rl}r& =\frac{a_2}{\cos (\theta +\alpha )}-\frac{a_1}{\cos (\theta -\alpha )}\\ & =\frac{a_2\cos (\theta -\alpha )-a_1\cos (\theta +\alpha )}{\cos (\theta +\alpha )\cos (\theta -\alpha )}\\ & =\frac{(a_2\cos \alpha -a_1\cos \alpha )\cos \theta -(a_2\sin \alpha +a_1\sin \alpha )\sin \theta }{{\cos }^2\alpha {\cos }^2\theta -{\sin }^2\alpha {\sin }^2\theta }.\end{array}}$

Combining constants gives

${\displaystyle r=\frac{b\cos \theta +c\sin \theta }{{\cos }^2\theta -m^2{\sin }^2\theta }}$

which in Cartesian coordinates is

${\displaystyle x^2-m^2{y}^2=bx+cy.}$

This is a hyperbola passing through the origin. So the cissoid of two non-parallel lines is a hyperbola containing the pole. A similar derivation show that, conversely, any hyperbola is the cissoid of two non-parallel lines relative to any point on it.

A cissoid of Zahradnik (named after Karel Zahradnik) is defined as the cissoid of a conic section and a line relative to any point on the conic. This is a broad family of rational cubic curves containing several well-known examples. Specifically:

• The Trisectrix of Maclaurin given by

${\displaystyle 2x(x^2+y^2)=a(3x^2-y^2)}$

is the cissoid of the circle ${\displaystyle (x+a{)}^2+y^2=a^2}$ and the line ${\displaystyle x=-\frac{a}{2}}$ relative to the origin.

• The right strophoid

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

is the cissoid of the circle ${\displaystyle (x+a{)}^2+y^2=a^2}$ and the line ${\displaystyle x=-a}$ relative to the origin.

• The cissoid of Diocles

${\displaystyle x(x^2+y^2)+2a{y}^2=0}$

is the cissoid of the circle ${\displaystyle (x+a{)}^2+y^2=a^2}$ and the line ${\displaystyle x=-2a}$ relative to the origin. This is, in fact, the curve for which the family is named and some authors refer to this as simply as cissoid.

• The cissoid of the circle ${\displaystyle (x+a{)}^2+y^2=a^2}$ and the line ${\displaystyle x=ka,}$ where k is a parameter, is called a Conchoid of de Sluze. (These curves are not actually conchoids.) This family includes the previous examples.
• The folium of Descartes

${\displaystyle x^3+y^3=3axy}$

is the cissoid of the ellipse ${\displaystyle x^2-xy+y^2=-a(x+y)}$ and the line ${\displaystyle x+y=-a}$ relative to the origin. To see this, note that the line can be written

${\displaystyle x=-\frac{a}{1+p},y=px}$

and the ellipse can be written

${\displaystyle x=-\frac{a(1+p)}{1-p+p^2},y=px.}$

So the cissoid is given by

${\displaystyle x=-\frac{a}{1+p}+\frac{a(1+p)}{1-p+p^2}=\frac{3ap}{1+p^3},y=px}$

which is a parametric form of the folium.

• Conchoid
• Strophoid

• J. Dennis Lawrence (1972). A catalog of special plane curves. Dover Publications. pp. 53–56. ISBN 0-486-60288-5. https://archive.org/details/catalogofspecial00lawr/page/53. 
• C. A. Nelson "Note on rational plane cubics" Bull. Amer. Math. Soc. Volume 32, Number 1 (1926), 71-76.

• Hazewinkel, Michiel, ed. (2001), "Cissoid", Encyclopedia of Mathematics, Springer Science+Business Media B.V. / Kluwer Academic Publishers, ISBN 978-1-55608-010-4, https://www.encyclopediaofmath.org/index.php?title=p/c022340 
• Weisstein, Eric W.. "Cissoid". http://mathworld.wolfram.com/Cissoid.html. 
• 2D Curves

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