Question

The solution of the differential equation $e^x(x+1)dx+(y{e}^y-x{e}^x)dy=0$ with initial condition $y\left(0\right)=0,$ is

• A. $x{e}^x+2y^2{e}^y=0$
• B. $2x{e}^x+y^2{e}^y=0$
• C. $x{e}^x-2y^2{e}^y=0$
• D. $2x{e}^x-y^2{e}^y=0$

Answer 1

The correct option is B $2x{e}^x+y^2{e}^y=0$

$e^x(x+1)dx+(y{e}^y-x{e}^x)dy=0$
$\Rightarrow e^x(x+1)\frac{dx}{dy}+y{e}^y-x{e}^x=0$
Put $x{e}^x=t$
$\Rightarrow e^x(x+1)\frac{dx}{dy}=\frac{dt}{dy}$
$\Rightarrow \frac{dt}{dy}-t=-y{e}^y,$ which is a linear differential equation in $y.$
I.F. $=e^{-y}$
General solution is
$t\cdot e^{-y}=-\int ydy+C$
$\Rightarrow x{e}^{x-y}=-\frac{y^2}{2}+C$
Since $y\left(0\right)=0,$
$\therefore C=0$
$\therefore 2x{e}^x+y^2{e}^y=0$