How do you convert $3xy=-x^2+4y^2$ into a polar equation?

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How do you convert $3xy=-x^2+4y^2$ into a polar equation?

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Answer 1 · 2016-05-13T12:18:56

$cos(theta)sin(theta)+cos(theta)^2+4sin(theta)^2=0$

Explanation:

We must be carefull with those equations. Here $4y^2-x^2-3x y = 0$ can be written as $(4y-x)(x+y) = 0$ so, the function graphic is build with two straigths: $4y-x=0$ and $x + y=0$ . This phenomenon will appear as well in polar coordinates. Making $x = r cos(theta), y = r sin(theta)$ and substituting, we get:
$r^2 cos(theta)sin(theta) = -r^2 cos(theta)^2+4 r^2 sin(theta)^2$ and after simplification, we get the condition: $cos(theta)sin(theta)+cos(theta)^2+4sin(theta)^2=0$ . Solving for $theta$ we will obtain the straigths directions.

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How do you convert $3xy=-x^2+4y^2$ into a polar equation?

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How do you convert 3xy=-x^2+4y^2 3xy=-x^2+4y^2 into a polar equation?

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How do you convert $3xy=-x^2+4y^2$ into a polar equation?