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How would I solve these differential equations?

$y'+2y^2=\frac{6}{x^2}$

I tried finding integral product but couldn't find its integral. And also tried to trasform into homogen equation.

and the second one is:

$xe^{2y}y'+e^{2y}=\frac{\ln x}{x}$

How can I start? Thanks.

2 Answers 2

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Well, I can figure out the second one. My guess was we could get the left side of the equation to look like

$\frac d{dx}(f(x)e^{2y})=2f(x)e^{2y}y'+f'(x)e^{2y}$

through the use of an integrating factor. So we have

$\frac{f'(x)}{2f(x)}=\frac1x$

$\ln f(x)=2\ln x$ $f(x)=x^2$

To get the equation into the proper form, multiply both sides by $2x$.

$2x^2e^{2y}y'+2xe^{2y}=\frac d{dx}(x^2e^{2y})=2\ln x$

I assume you can take this one from here?

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    can we get that "x" the integrating factor from $e^{\int\frac{M_y - N_x}{N}dx}=$$e^{\ln x}$=x ? thank you.2019-03-12
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For the first equation, take $y = \frac{A}{x}$, then $ y' + 2 y^2 = -\frac{A}{x^2} + 2 \frac{A^2}{x^2} = \frac{6}{x^2} $ Hence $ 2 A^2 - A - 6 = 0 $ and $ A = \begin{cases} \hskip.5cm 2 \\ -\tfrac{3}{2} \end{cases} $ There are two solutions $ y_1(x) = -\frac{3}{2 x} \mbox{ and } y_2(x) = \frac{2}{x} $

If you want to do a "formal" derivation of the ansat, you should note that the first equation is a Riccati equation.

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    @mehmtDemir Indeed it is. A Ricatti equation is of the form $y' = q_0(x) + q_1(x)y + \color{red}{q_2(x)y^2}.$ If it involves $y'$, $y$ and $y^2$ _linearly_ it's a Riccati type equation, and can always be linearized.2012-11-19