1 Answer

Caustic · Answer 1 · 2023-07-30T05:20:48+0000

The given differential equation

x(5x+4y)y' + y(15x+4y) = 0

is indeed homogeneous, since we can write

$\implies y' = -(y(15x+4y))/(x(5x+4y)) = -(\frac yx \left(15 + 4\frac yx\right))/(5 + 4\frac yx)$

Let
y = xv , so that
y' = xv' + v . Then
$v=\frac yx$ and the equation transforms to

xv' + v = -(v(15+4v))/(5+4v)

Rewrite a bit and separate the variables:

xv' = -(v(15+4v))/(5+4v) - v

xv' = -(v(15+4v) + v(5+4v))/(5+4v)

xv' = -(v(20+8v))/(5+4v)

$(5+4v)/(v(20+8v)) \, dv = -\frac{dx}x$

Integrate both sides. On the left, take the partial fraction decomposition,

$(5+4v)/(v(20+8v) = \frac av + \frac b{20+8v}$

$\implies 5+4v = a(20+8v) + bv = 20a + (8a+b)v$

$\implies \begin{cases}20a=5 \\ 8a+b=4 \end{cases} \implies a=4,b=-28$

Proceed with the integrals.

$\displaystyle \int \left(\frac4v - (28)/(20+8v)\right) \, dv = - \int \frac{dx}x$

$4 \ln|v| - \frac{14}4 \ln|20+8v| = -\ln|x| + C$

Get the solution back in terms of
and
.

$4 \ln\left|\frac yx\right| - \frac{14}4 \ln\left|20+8\frac yx\right| = -\ln|x| + C$

$16 \ln\left|\frac yx\right| - 14 \ln\left|20+8\frac yx\right| = -4\ln|x| + C$

$16 (\ln|y| - \ln|x|) - 14 (\ln|20x+8y| - \ln|x|) = -4\ln|x| + C$

$\boxed - 14 \ln$

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