What the is the polar form of $y^2 = 1/y-1/x+x^2/y$ ?

Question

1331 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-02-26T01:17:17

$r^3 sin^3 theta cos theta -r^2 cos^3 theta = cos theta -sin theta$

Using the relation $x = r cos theta , quad y= r sin theta$ between Cartesian and polar coordinates, we have

$r^2 sin^2 theta = 1/{r sin theta}-1/{r cos theta}+{r^2 cos ^2 theta}/{r sin theta}$

Multiplying both sides by $r sin theta cos theta$ lets us simplify this a bit to

$r^3 sin^3 theta cos theta = cos theta -sin theta +r^2 cos^3 theta$
or
$r^3 sin^3 theta cos theta -r^2 cos^3 theta = cos theta -sin theta$

What the is the polar form of y^2 = 1/y-1/x+x^2/y y^2 = 1/y-1/x+x^2/y ?