How to you find the general solution of $dy/dx=x/y$ ?

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How to you find the general solution of $dy/dx=x/y$ ?

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Answer 1 · 2017-01-13T08:47:46

$x^2-y^2=c$

Explanation:

$dy/{dx}=x/y$

$ydy=xdx$ by exploiting the notation (separation)

$int ydy=int xdx$ further exploiting the notation

$1/2y^2=1/2x^2+d$
$y^2=x^2+2d$
$x^2-y^2=-2d$
$x^2-y^2=c$ where $c=-2d$
Depending on whether $c$ is positive, negative or zero you get a hyperbola open to the $x$ -axis, open to the $y$ =axis, or a pair of straight lines through the origin.
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How to you find the general solution of $dy/dx=x/y$ ?

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Science

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How to you find the general solution of dy/dx=x/ydy/dx=x/y?

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Explanation:

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How to you find the general solution of $dy/dx=x/y$ ?