Difference between revisions of "Cardioid"

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====Properties of Cardioids====
====Properties of Cardioids====
'''The evolute of a cardioid is equal to itself.'''
'''The evolute of a cardioid is equal to itself.'''

Revision as of 12:49, 28 June 2010

Field: Geometry
Image Created By: The Math Book


A cardioid is a curve which resembles a heart. Its name is derived from Greek where kardia means heart and eidos means shape, though it is actually shaped more like the outline of the cross section of an apple.

Basic Description

Cardioid 1.gif

In geometry, a cardioid is the curve traced by a point on the circumference of a circle that rolls around the circumference of another equal circle.

A More Mathematical Explanation

Generating a Cardioid

When a is the radius of the moving circ [...]

Generating a Cardioid

When a is the radius of the moving circle, the Cardioid curve is given by:

  • Cartesian equation ({x^2} + {y^2} - 2ax)^2 = 4{a^2}({x^2} + {y^2}).
  • Polar equation r = a (1 - {\cos} {\theta})
  • Parametric equation

x = a  {\cos}  t (1 - {\cos t})

y = a  {\sin}  t (1 - {\cos t})

Properties of Cardioids

The evolute of a cardioid is equal to itself.


Cardioid is the pedal of a circle with respect to a fixed point on the circle.

Cardioid is the catacaustic of a circle with light source on the circle.

Cardioid is also the envelope of circles with centers on a fixed base circle C and each circle passing through a fixed point P on the base circle C.

Cardioid is the inverse of parabola with respect to its focus.

Why It's Interesting

====Cardioid Microphone====

The cardioid microphone...

Cardioid's in the Mandelbrot Set

Show image

Fibonacci and Cardioids




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