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

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

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Answer 1 · 2018-05-23T04:52:21

$y = Axe^x$ , where $A$ is a constant.

Explanation:

We do a little bit of algebra before integrating to separate the variables:

$x(dy/dx) = y(x +1)$

$dy/(y dx) = (x +1)/x$

$(dy)/y = (x + 1)/x dx$

$lny = int 1 + 1/xdx$

$lny = x + lnx + C$

$y = Ae^(x + lnx)$

$y = Ae^xe^(lnx)$

$y = Axe^x$

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

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