Nephroid

Nephroide-definition

EpitrochoidOn2

Nephroide-kreise

Nephroide-sek-tang-prinzip

Nephroide-sek-tang

Nephroide-kaustik-prinzip

Nephroid is a type of plane curve known for its distinctive kidney-like shape. The term "nephroid" comes from the Greek word nephros, meaning kidney. It is a specific case of an epicycloid, a curve produced by tracing the path of a point on the circumference of a circle (called the rolling circle) that rolls without slipping around the outside of a fixed circle of equal radius.

Definition[edit | edit source]

A nephroid can be defined parametrically as:

x = 3a \cos(t) - a \cos(3t),

y = 3a \sin(t) - a \sin(3t),

where a is the radius of the rolling circle, and t is the parameter.

Alternatively, the nephroid can be described by the equation in Cartesian coordinates:

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

This curve is a special case of the epicycloid where the rolling circle has half the diameter of the fixed circle.

Properties[edit | edit source]

The nephroid has several interesting properties:

• It is a closed curve with a length of \(24a\), where \(a\) is the radius of the generating circle.
• The area enclosed by the nephroid is \(12\pi a^2\).
• It has two cusps, points at which the curve comes to a point.
• The nephroid is symmetric with respect to both the x-axis and the y-axis.
• It can also be constructed as the envelope of the family of circles that pass through a fixed point on the circumference of a given circle and whose centers lie on the circumference of the same circle.

History[edit | edit source]

The nephroid was first studied by the Swiss mathematician Jakob Bernoulli in 1692, who named it the "kissing circle" due to its shape. However, it was not until the 19th century that the curve was given the name "nephroid" by Richard A. Proctor, a British astronomer and mathematician, reflecting its kidney-shaped form.

Applications[edit | edit source]

While the nephroid may not have widespread applications in the practical world, it serves as an interesting example of the beauty and complexity found in mathematical curves. It is studied in the field of differential geometry and has applications in optics, particularly in the study of caustics, which are patterns of light or shadow that can be formed through reflection or refraction.

See Also[edit | edit source]

• Epicycloid
• Cycloid
• Cardioid
• Cusp (mathematics)
• Differential geometry