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Friday, 5 October 2012

True anomaly of Hyperbola

In the section above it is shown that using the coordinate system in which the equation of the hyperbola takes its canonical form

\frac{{x}^{2}}{a^{2}} - \frac{{y}^{2}}{b^{2}} = 1
the distance r from a point  (x\ ,\ y) on the left branch of the hyperbola to the left focal point  ( -e a\ ,\ 0) is
 r = -e x - a\,\!.
Introducing polar coordinates  ( r\ ,\ \theta) with origin at the left focal point the coordinates relative the canonical coordinate system are
 x\ =\ -ae+r \cos \theta
 y\ =r \sin \theta
and the equation above takes the form
 r = -e (-ae+r \cos \theta) - a\,\!
from which follows that
r = \frac{a(e^2-1)}{1+e\cos \theta}
This is the representation of the near branch of a hyperbola in polar coordinates with respect to a focal point.
The polar angle \theta of a point on a hyperbola relative the near focal point as described above is called the true anomaly of the point.

File:Hyperbola polar coordinates.svg

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