How do you convert #x^2 - y^2 = 1# to polar form?

1 Answer
Apr 21, 2016

#r^2=sec 2theta#.

Explanation:

#x=r cos theta and y = r sin theta#. Also, use #cos^2theta-sin^2theta=cos 2theta#.

The given equations becomes #r^2 cos 2theta=1. So, r^2=sec 2theta#.

This represents a rectangular hyperbola with asymptotes along lines given by# r^2=oo=sec 2theta. So, theta = +- pi/4 and theta=+-(3pi)/4#, give the asymptotes as four half lines, from the the pole which is thw center of the hyperbola.

For a rectangular hyperbola, the semi- major axis a = semi-transverse axis b.
The eccentricity of a rectangular hyperbola = #sqrt 2#. .