ART

In geometry, a nephroid (from the Greek ὁ νεφρός ho nephros) is a specific plane curve whose name means 'kidney-shaped' (compare nephrology). Although the term nephroid was used to describe other curves, it was applied to the curve in this article by Proctor in 1878.[1]

A nephroid is an algebraic curve of degree 6. It can be generated by rolling a circle with radius a on the outside of a fixed circle with radius 2a. Hence, a nephroid is an epicycloid.

EpitrochoidOn2

generation of a nephroid by a rolling circle

Equations

Nephroide-definition

Nephroid: definition

If the small circle has radius a, the fixed circle has midpoint (0,0) and radius 2a, the rolling angle of the small circle is 2 φ {\displaystyle 2\varphi } {\displaystyle 2\varphi } and point \( {\displaystyle (2a,0)} \) the starting point (see diagram) then one gets the

parametric representation

\( {\displaystyle x(\varphi )=3a\cos \varphi -a\cos 3\varphi =6a\cos \varphi -4a\cos ^{3}\varphi \ ,} \)
\( {\displaystyle y(\varphi )=3a\sin \varphi -a\sin 3\varphi =4a\sin ^{3}\varphi \ ,\qquad 0\leq \varphi <2\pi } \)

Inserting \( {\displaystyle x(\varphi )} \) and \) {\displaystyle y(\varphi )} \) into the equation

\( {\displaystyle (x^{2}+y^{2}-4a^{2})^{3}=108a^{4}y^{2}} \)

shows that this equation is an implicit representation of the curve.

proof of the parametric representation

The proof of the parametric representation is easily done by using complex numbers and their representation as complex plane. The movement of the small circle can be split into two rotations. In the complex plane a rotation of a point z {\displaystyle z} z around point 0 {\displaystyle 0} {\displaystyle 0} (origin) by an angle φ {\displaystyle \varphi } \varphi can be performed by the multiplication of point z {\displaystyle z} z (complex number) by e i φ {\displaystyle e^{i\varphi }} {\displaystyle e^{i\varphi }}.

Hence the

rotation \( \Phi _{3} \) around point \( {\displaystyle 3a} \) by angle \( {\displaystyle 2\varphi } \) is : \( {\displaystyle :z\mapsto 3a+(z-3a)e^{i2\varphi }} \) ,
rotation \( \Phi_0 \) around point \( {\displaystyle 0} \) by angle \( \varphi \) is : \( {\displaystyle :\quad z\mapsto ze^{i\varphi }} \).

A point \( {\displaystyle p(\varphi )} \) of the nephroid is generated by the rotation of point 2a by \( \Phi _{3} \) and the subsequent rotation with \( \Phi_0 \):

\( {\displaystyle p(\varphi )=\Phi _{0}(\Phi _{3}(2a))=\Phi _{0}(3a-ae^{i2\varphi })=(3a-ae^{i2\varphi })e^{i\varphi }=3ae^{i\varphi }-ae^{i3\varphi }}. \)

Herefrom one gets

\( {\displaystyle {\begin{array}{cclcccc}x(\varphi )&=&3a\cos \varphi -a\cos 3\varphi &=&6a\cos \varphi -4a\cos ^{3}\varphi \ ,&&\\y(\varphi )&=&3a\sin \varphi -a\sin 3\varphi &=&4a\sin ^{3}\varphi &.&\end{array}}} \)

(The formulae \( {\displaystyle e^{i\varphi }=\cos \varphi +i\sin \varphi ,\ \cos ^{2}\varphi +\sin ^{2}\varphi =1,\ \cos 3\varphi =4\cos ^{3}\varphi -3\cos \varphi ,\;\sin 3\varphi =3\sin \varphi -4\sin ^{3}\varphi } \) were used. See trigonometric functions.)

proof of the implicit representation

With

\( {\displaystyle x^{2}+y^{2}-4a^{2}=(3a\cos \varphi -a\cos 3\varphi )^{2}+(3a\sin \varphi -a\sin 3\varphi )^{2}-4a^{2}=\cdots =6a^{2}(1-\cos 2\varphi )=12a^{2}\sin ^{2}\varphi } \)

one gets

\( {\displaystyle (x^{2}+y^{2}-4a^{2})^{3}=(12a^{2})^{3}\sin ^{6}\varphi =108a^{4}(4a\sin ^{3}\varphi )^{2}=108a^{4}y^{2}\ .} \)

other orientation

If the cusps are on the y-axis the parametric representation is

\( {\displaystyle x=3a\cos \varphi +a\cos 3\varphi ,\quad y=3a\sin \varphi +a\sin 3\varphi ).} \)

and the implicit one:

\( (x^2+y^2-4a^2)^3=108a^4x^2. \)

Metric properties

For the nephroid above the

arclength is \( {\displaystyle L=24a,} \)
area \( {\displaystyle A=12\pi a^{2}\ } \) and
radius of curvature is \( {\displaystyle \rho =|3a\sin \varphi |.} \)

The proofs of these statements use suitable formulae on curves (arc length, area and radius of curvature) and the parametric representation above

\( {\displaystyle x(\varphi )=6a\cos \varphi -4a\cos ^{3}\varphi \ ,} \)
\( {\displaystyle y(\varphi )=4a\sin ^{3}\varphi } \)

and their derivatives

\( {\displaystyle {\dot {x}}=-6a\sin \varphi (1-2\cos ^{2}\varphi )\ ,\quad \ {\ddot {x}}=-6a\cos \varphi (5-6\cos ^{2}\varphi )\ ,} \)
\( {\displaystyle {\dot {y}}=12a\sin ^{2}\varphi \cos \varphi \quad ,\quad \quad \quad \quad {\ddot {y}}=12a\sin \varphi (3\cos ^{2}\varphi -1)\ .} \)

proof for the arc length
\( {\displaystyle L=2\int _{0}^{\pi }{\sqrt {{\dot {x}}^{2}+{\dot {y}}^{2}}}\;d\varphi =\cdots =12a\int _{0}^{\pi }\sin \varphi \;d\varphi =24a} . \)

proof for the area
\( {\displaystyle A=2\cdot {\tfrac {1}{2}}|\int _{0}^{\pi }[x{\dot {y}}-y{\dot {x}}]\;d\varphi |=\cdots =24a^{2}\int _{0}^{\pi }\sin ^{2}\varphi \;d\varphi =12\pi a^{2}} . \)

proof for the radius of curvature
\( {\displaystyle \rho =\left|{\frac {\left({{\dot {x}}^{2}+{\dot {y}}^{2}}\right)^{\frac {3}{2}}}{{\dot {x}}{\ddot {y}}-{\dot {y}}{\ddot {x}}}}\right|=\cdots =|3a\sin \varphi |.} \)

Nephroid as envelope of a pencil of circles

Nephroide-kreise

Nephroid as envelope of a pencil of circles

Let be \( c_{0} \) a circle and \( {\displaystyle D_{1},D_{2}} \) points of a diameter \( {\displaystyle d_{12}} \), then the envelope of the pencil of circles, which have midpoints on \( c_{0} \) and are touching \( {\displaystyle d_{12}} \) is a nephroid with cusps \( {\displaystyle D_{1},D_{2}}. \)

proof

Let \( c_{0} \) be the circle \( {\displaystyle (2a\cos \varphi ,2a\sin \varphi )} \) with midpoint (0,0) and radius 2a. The diameter may lie on the x-axis (see diagram). The pencil of circles has equations:

\( {\displaystyle f(x,y,\varphi )=(x-2a\cos \varphi )^{2}+(y-2a\sin \varphi )^{2}-(2a\sin \varphi )^{2}=0\ .} \)

The envelope condition is

\( {\displaystyle f_{\varphi }(x,y,\varphi )=2a(x\sin \varphi -y\cos \varphi -2a\cos \varphi \sin \varphi )=0\ .} \)

One can easily check that the point of the nephroid \( {\displaystyle p(\varphi )=(6a\cos \varphi -4a\cos ^{3}\varphi \;,\;4a\sin ^{3}\varphi )} \) is a solution of the system \( {\displaystyle f(x,y,\varphi )=0,\;f_{\varphi }(x,y,\varphi )=0} \) and hence a point of the envelope of the pencil of circles.
Nephroid as envelope of a pencil of lines

Nephroide-sek-tang-prinzip

nephroid: tangents as chords of a circle, principle

Nephroide-sek-tang

nephroid: tangents as chords of a circle

Similar to the generation of a cardioid as envelope of a pencil of lines the following procedure holds:

Draw a circle, divide its perimeter into equal spaced parts with 3N points (see diagram) and number them consecutively.
Draw the chords: \( {\displaystyle (1,3),(2,6),....,(n,3n),....,(N,3N),(N+1,3),(N+2,6),....,} \). (i.e.: The second point is moved by threefold velocity.)
The envelope of these chords is a nephroid.

proof

The following consideration uses trigonometric formulae for \( {\displaystyle \cos \alpha +\cos \beta ,\ \sin \alpha +\sin \beta ,\ \cos(\alpha +\beta ),\ \cos 2\alpha } \). In order to keep the calculations simple, the proof is given for the nephroid with cusps on the y-axis.

equation of the tangent
for the nephroid with parametric representation
\( {\displaystyle x=3\cos \varphi +\cos 3\varphi ,\;y=3\sin \varphi +\sin 3\varphi }: \)

Herefrom one determines the normal vector \( {\displaystyle {\vec {n}}=({\dot {y}},-{\dot {x}})^{T}} \), at first.
The equation of the tangent \( {\displaystyle {\dot {y}}(\varphi )\cdot (x-x(\varphi ))-{\dot {x}}(\varphi )\cdot (y-y(\varphi ))=0} \) is:

\( {\displaystyle (\cos 2\varphi \cdot x\ +\ \sin 2\varphi \cdot y)\cos \varphi =4\cos ^{2}\varphi \ .} \)

For \( {\displaystyle \varphi ={\tfrac {\pi }{2}},{\tfrac {3\pi }{2}}} \) one gets the cusps of the nephroid, where there is no tangent. For \( {\displaystyle \varphi \neq {\tfrac {\pi }{2}},{\tfrac {3\pi }{2}}} \) one can divide by cos ⁡ φ {\displaystyle \cos \varphi } \cos\varphi to obtain

\( {\displaystyle \cos 2\varphi \cdot x+\sin 2\varphi \cdot y=4\cos \varphi \ .} \)

equation of the chord
to the circle with midpoint (0,0) and radius 4: The equation of the chord containing the two points \( {\displaystyle (4\cos \theta ,4\sin \theta ),\ (4\cos {\color {red}3}\theta ,4\sin {\color {red}3}\theta ))} \) is:
\( {\displaystyle (\cos 2\theta \cdot x+\sin 2\theta \cdot y)\sin \theta =4\cos \theta \sin \theta \ .} \)

For \( {\displaystyle \theta =0,\pi } \) the chord degenerates to a point. For \( {\displaystyle \theta \neq 0,\pi } \) one can divide by \( \sin \theta \) and gets the equation of the chord:

\( {\displaystyle \cos 2\theta \cdot x+\sin 2\theta \cdot y=4\cos \theta \ .} \)

The two angles \( {\displaystyle \varphi ,\theta } \) are defined differently ( \( \varphi \) is one half of the rolling angle, \( \theta \) is the parameter of the circle, whose chords are determined), for \( {\displaystyle \varphi =\theta } \) one gets the same line. Hence any chord from the circle above is tangent to the nephroid and

the nephroid is the envelope of the chords of the circle.

Nephroid as caustic of one half of a circle

Nephroide-kaustik-prinzip

nephroid as caustic of a circle: principle
nephroide as caustic of one half of a circle

The considerations made in the previous section give a proof for the fact, that the caustic of one half of a circle is a nephroid.

If in the plane parallel light rays meet a reflecting half of a circle (see diagram), then the reflected rays are tangent to a nephroid.

proof

The circle may have the origin as midpoint (as in the previous section) and its radius is 4 {\displaystyle 4} 4. The circle has the parametric representation

\( {\displaystyle k(\varphi )=4(\cos \varphi ,\sin \varphi )\ .} \)

The tangent at the circle point \( {\displaystyle K:\ k(\varphi )} \) has normal vector \( {\displaystyle {\vec {n}}_{t}=(\cos \varphi ,\sin \varphi )^{T}} \). The reflected ray has the normal vector (see diagram) \( {\displaystyle {\vec {n}}_{r}=(\cos {\color {red}2}\varphi ,\sin {\color {red}2}\varphi )^{T}} \) and containing circle point \( {\displaystyle K:\ 4(\cos \varphi ,\sin \varphi )}. \) Hence the reflected ray is part of the line with equation

\( {\displaystyle \cos {\color {red}2}\varphi \cdot x\ +\ \sin {\color {red}2}\varphi \cdot y=4\cos \varphi \ ,} \)

which is tangent to the nephroid of the previous section at point

\( {\displaystyle P:\ (3\cos \varphi +\cos 3\varphi ,3\sin \varphi +\sin 3\varphi )} (see above).

Nephroid caustic at bottom of tea cup

The evolute and involute of a nephroid

Nephroide-evol

nephroid and its evolute
magenta: point with osculating circle and center of curvature
Evolute

The evolute of a curve is the locus of centers of curvature. In detail: For a curve \( {\displaystyle {\vec {x}}={\vec {c}}(s)} \) with radius of curvature \( {\displaystyle \rho (s)} \) the evolute has the representation

\( {\displaystyle {\vec {x}}={\vec {c}}(s)+\rho (s){\vec {n}}(s).} \)

with \( {\displaystyle {\vec {n}}(s)} \) the suitably oriented unit normal.

For a nephroid one gets:

The evolute of a nephroid is another nephroid half as large and rotated 90 degrees (see diagram).

proof

The nephroid as shown in the picture has the parametric representation

\( {\displaystyle x=3\cos \varphi +\cos 3\varphi ,\quad y=3\sin \varphi +\sin 3\varphi \ ,} \)

the unit normal vector pointing to the center of curvature

\( {\displaystyle {\vec {n}}(\varphi )=(-\cos 2\varphi ,-\sin 2\varphi )^{T}} \) (see section above)

and the radius of curvature 3 cos ⁡ φ {\displaystyle 3\cos \varphi } {\displaystyle 3\cos \varphi } (s. section on metric properties). Hence the evolute has the representation:

\( {\displaystyle x=3\cos \varphi +\cos 3\varphi -3\cos \varphi \cdot \cos 2\varphi =\cdots =3\cos \varphi -2\cos ^{3}\varphi ,} \)
\( {\displaystyle y=3\sin \varphi +\sin 3\varphi -3\cos \varphi \cdot \sin 2\varphi \ =\cdots =2\sin ^{3}\varphi \ ,} \)

which is a nephroid half as large and rotated 90 degrees (see diagram and section #Equations above)
Involute

Because the evolute of a nephroid is another nephroid, the involute of the nephroid is also another nephroid. The original nephroid in the image is the involute of the smaller nephroid.

Nephroide-inv

inversion (green) of a nephroid (red) across the blue circle
Inversion of a nephroid

The inversion
\)
\( {\displaystyle x\mapsto {\frac {4a^{2}x}{x^{2}+y^{2}}},\quad y\mapsto {\frac {4a^{2}y}{x^{2}+y^{2}}}}

across the circle with midpoint (0,0) and radius 2a maps the nephroid with equation

\( {\displaystyle (x^{2}+y^{2}-4a^{2})^{3}=108a^{4}y^{2}} \)

onto the curve of degree 6 with equation

\( {\displaystyle (4a^{2}-(x^{2}+y^{2}))^{3}=27a^{2}(x^{2}+y^{2})y^{2}} \) (see diagram) .

A nephroid in daily life: a caustic of the reflection of light off the inside of a cylinder.
References

Weisstein, Eric W. "Nephroid". MathWorld.

Arganbright, D., Practical Handbook of Spreadsheet Curves and Geometric Constructions, CRC Press, 1939, ISBN 0-8493-8938-0, p. 54.
Borceux, F., A Differential Approach to Geometry: Geometric Trilogy III, Springer, 2014, ISBN 978-3-319-01735-8, p. 148.
Lockwood, E. H., A Book of Curves, Cambridge University Press, 1961, ISBN 978-0-521-0-5585-7, p. 7.

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