Lemniscate: Difference between revisions

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imported>Paul Wormer
(New page: {{subpages}} {{Image|Lemniscate.png|right|350px|Blue: lemniscate of Bernoulli (''a''<nowiki>=</nowiki>1); red: lemniscate of Gerono (''a''<sup>2</sup><nowiki>=</nowiki>2)}}. A '''lemniscat...)
 
imported>Paul Wormer
 
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The figure shows the case ''a'' = &radic;2
The figure shows the case ''a'' = &radic;2
==Lemniscate of Bernoulli==
==Lemniscate of Bernoulli==
This form is named for [[Jakob Bernoulli|James Bernoulli]], who coined the name lemniscata (feminine form of lemniscatus) and  published its form in an article in ''Acta Eruditorum'' in 1694. Basically, Bernoulli's lemniscate is the locus of points that have a distance ''r''<sub>1</sub> to a focus ''F''<sub>1</sub> and a distance ''r''<sub>2</sub> to a focus ''F''<sub>2</sub>, while ''r''<sub>1</sub>''r''<sub>2</sub> is constant. In the figure the foci are on the ''x''-axis at &plusmn;1. The product of the distances is constant and equal to half the distance 2''a''  between the foci squared. For foci on the ''x''-axis at &plusmn;''a'' the equation is,
This form was discovered by [[Jakob Bernoulli|James Bernoulli]], who coined the term ''Curva Lemniscata'', comparing the curve to a ''noeud de ruban'' (a ribbon knot) in an article in ''Acta Eruditorum'' of September 1694 (p. 336). Basically, Bernoulli's lemniscate is the locus of points that have a distance ''r''<sub>1</sub> to a focus ''F''<sub>1</sub> and a distance ''r''<sub>2</sub> to a focus ''F''<sub>2</sub>, while the product ''r''<sub>1</sub>&times;''r''<sub>2</sub> is constant. In the figure the foci are on the ''x''-axis at &plusmn;1. The product of the distances is constant and equal to half the distance 2''a''  between the foci squared. For foci on the ''x''-axis at &plusmn;''a'' the equation is,
:<math>
:<math>
r_1\,r_2 = a^2 = \left[ \big((x-a)^2 + y^2\big) \big((x+a)^2 + y^2\big)\right]^{\frac{1}{2}}.
r_1\,r_2 = a^2 = \left[ (x-a)^2 + y^2\right]^{\frac{1}{2}} \left[(x+a)^2 + y^2\right]^{\frac{1}{2}}.
</math>
</math>
Expanding and simplfying gives
Expanding and simplifying gives
:<math>
:<math>
(x^2 + y^2)^2 = 2a^2 (x^2 - y^2).\;
(x^2 + y^2)^2 = 2a^2 (x^2 - y^2).\;
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r^4 = 2 a^2 r^2 (\cos^2\theta - \sin^2\theta) \Longrightarrow r^2 = 2 a^2 \cos2\theta.
r^4 = 2 a^2 r^2 (\cos^2\theta - \sin^2\theta) \Longrightarrow r^2 = 2 a^2 \cos2\theta.
</math>
</math>
Bernoulli's lemniscate belongs to the more general class of the [[Cassini ovals]].

Latest revision as of 10:44, 28 December 2009

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Blue: lemniscate of Bernoulli (a=1); red: lemniscate of Gerono (a2=2)

.

A lemniscate is a geometric curve in the form of the digit 8, usually drawn such that the digit is lying on its side, as the infinity symbol . The name derives from the Greek λημνισκος (lemniskos, woolen band).

Two forms are common.

Lemniscate of Gerono

This form is named for the French mathematician Camille Christophe Gerono (1799-1891). Its equation in Cartesian coordinates is

.

The figure shows the case a = √2

Lemniscate of Bernoulli

This form was discovered by James Bernoulli, who coined the term Curva Lemniscata, comparing the curve to a noeud de ruban (a ribbon knot) in an article in Acta Eruditorum of September 1694 (p. 336). Basically, Bernoulli's lemniscate is the locus of points that have a distance r1 to a focus F1 and a distance r2 to a focus F2, while the product r1×r2 is constant. In the figure the foci are on the x-axis at ±1. The product of the distances is constant and equal to half the distance 2a between the foci squared. For foci on the x-axis at ±a the equation is,

Expanding and simplifying gives

The latter equation gives upon substitution of

the following polar equation

Bernoulli's lemniscate belongs to the more general class of the Cassini ovals.