Welcome to fletrix.com on July 6 2009.
This is an internet experiment running to monitor browsing habbits of individuals through wikipedia contents.

Hyperbolic spiral

From Wikipedia, the free encyclopedia

Jump to: navigation, search
Hyperbolic spiral for a=2

A hyperbolic spiral is a transcendental plane curve also known as a reciprocal spiral. It has the polar equation = a, and is the inverse to the Archimedean spiral.

It begins at an infinite distance from the pole in the centre (for θ starting from zero r = a/θ starts from infinity), it winds faster and faster around as it approaches the pole, the distance from any point to the pole, following the curve, is infinite. Applying the transformation from the polar coordinate system:

x = r \cos \theta, \qquad y = r \sin \theta,

leads to the following parametric representation in Cartesian coordinates:

x = a {\cos t \over t}, \qquad y = a {\sin t \over t},

where the parameter t is an equivalent of the polar coordinate θ.

The spiral has an asymptote at y = a: for t approaching zero the ordinate approaches a, while the abscissa grows to infinity:

\lim_{t\to 0}x = a\lim_{t\to 0}{\cos t \over t}=\infty,
\lim_{t\to 0}y = a\lim_{t\to 0}{\sin t \over t}=a\cdot 1=a.

[edit] External links

 This geometry-related article is a stub. You can help Wikipedia by expanding it.
Retrieved from "http://en.wikipedia.org/wiki/Hyperbolic_spiral"
Personal tools
Visit joltnews for the latest headlines
Visit bloit.com for company information
Geed Media does computer consulting on long island.
This page viewed times. See Logs