What the is the polar form of $y = y^3-xy+x^2/y$ ?

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Answer 1 · 2018-07-23T09:16:46

See graph and details.

Using $( x, y ) = r ( cos theta, sin theta )$ . conversion gives

$r = 0$ and

$r^2sin^4theta - rsin^2thetacos theta+ cos^2theta - sin^2theta =0$ So,

$r^2 -r csc theta cot theta +csc^2theta ( cot^2 theta - 1 )$ .

And so,

$0 <= r = 1/2 csc theta ( cot theta +- sqrt( 4 - 3 cot^2 theta ))$
.
graph{(y*4-xy^2+x^2-y^2)=0[-10 10-10.10]}

Slide the graph $uarr larr darr rarr$ to see more of the graph.

What the is the polar form of y = y^3-xy+x^2/y y = y^3-xy+x^2/y ?