What the is the polar form of #y^2 = (x-3y)^2 #?

1 Answer
Apr 8, 2016

#tan theta = 1/2 and tan theta = 1/4#, representing radial lines #theta=tan^(-1)(1/2)#. its opposite #theta=pi+tan^(-1)(1/2), theta=tan^(-1)(1/4)# and its opposite #theta=pi+tan^(-1)(1/4)#.

Explanation:

If #a^2=b^2, a=+-b#.
In rectangular form, this represents the pair of straight lines
#y = +-(3x-y)#.

Substitute #x=r cos theta and y = r sin theta#.
The result is the pair of equations
#tan theta = 1/2 and tan theta = 1/4#.

#tan theta# is positive in both the 1st and the 3rd quadrants. These bifurcate into four equations for two pairs of opposite radial lines, as given in the answer.
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