Question

In this problem we consider an equation in differential form mdx+ndy=0. the equation (4y+(5x^4)e^(?4x))dx+(1?4y^3(e^(?4x)))dy=0 in differential form m˜dx+n˜dy=0 is not exact. indeed, we have m˜y?n˜x= for

asked Jun 3, 2019 13.4k views

In this problem we consider an equation in differential form mdx+ndy=0. the equation (4y+(5x^4)e^(?4x))dx+(1?4y^3(e^(?4x)))dy=0 in differential form m˜dx+n˜dy=0 is not exact. indeed, we have m˜y?n˜x= for this exercise we can find an integrating factor which is a function of x alone since m˜y?n˜xn˜= can be considered as a function of x alone. namely we have ?(x)= multiplying the original equation by the integrating factor we obtain a new equation mdx+ndy=0 where m= n= which is exact since my= nx= are equal. this problem is exact. therefore an implicit general solution can be written in the form f(x,y)=c where f(x,y)= finally find the value of the constant c so that the initial condition y(0)=1. c= .

Samir Shah asked

by Samir Shah

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Ashton · Answer 1 · 2019-06-09T06:50:15+0000

Taking a wild guess as to what those question marks are supposed to encode... If the ODE is

$\underbrace{(4y+5x^4e^(-4x))_(M(x,y))\,\mathrm dx+\underbrace{(1-4y^3e^(-4x))}_(N(x,y))\,\mathrm dy=0$

then the ODE will be exact if
M_y=N_x

. We have

and so indeed the equation is not exact. So we look for an integrating factor
$\mu(x,y)$ such that

$\mu M\,\mathrm dx+\mu N\,\mathrm dy=0$

is exact. In order for this to occur, we require

$(\mu M)_y=(\mu N)_x\implies\mu_yM+\mu M_y=\mu_xN+\mu N_x$

$\implies\mu_yM-\mu_xN=\mu(N_x-M_y)$

Now if
$\mu$ is a function of either

or

alone, then this PDE reduces to an ODE in either variable. Let's assume the first case, so that
$\mu_y=0$ . Then

$\mu_x N=\mu(M_y-N_x)\implies\frac{\mathrm d\mu}\mu=\frac{M_y-N_x}N\,\mathrm dx$

So in our case we might consider using

$\frac{\mathrm d\mu}\mu=(4-16y^3e^(-4x))/(1-4y^3e^(-4x))\,\mathrm dx=4\,\mathrm dx$

$\implies\displaystyle\int\frac{\mathrm d\mu}\mu=4\int\mathrm dx$

$\implies\ln|\mu|=4x$

$\implies\mu=e^(4x)$

Our new ODE is guaranteed to be exact:

$(4ye^(4x)+5x^4)\,\mathrm dx+(e^(4x)-4y^3)\,\mathrm dy=0$

so we can now look for our solution
f(x,y)=C

. By the chain rule, differentiating with respect to

yields

$(\mathrm df)/(\mathrm dx)=(\partial f)/(\partial x)(\mathrm dx)/(\mathrm dx)+(\partial f)/(\partial y)(\mathrm dy)/(\mathrm dx)=0$

$\implies(\partial f)/(\partial x)+(\partial f)/(\partial y)(\mathrm dy)/(\mathrm dx)=0$

$\implies(\partial f)/(\partial x)\,\mathrm dx+(\partial df)/(\partial y)\mathrm dy=0$

Now,

$(\partial f)/(\partial x)=\mu M=4ye^(4x)+5x^4$

$\implies f=ye^(4x)+x^5+g(y)$

Differentiating with respect to

gives

$(\partial f)/(\partial y)=\mu N$

$\implies e^(4x)+(\mathrm dg)/(\mathrm dy)=e^(4x)-4y^3$

$\implies(\mathrm dg)/(\mathrm dy)=-4y^3$

$\implies g(y)=-y^4+C$

So the general solution is

f(x,y)=ye^(4x)+x^5-y^4+C=C