(x+2)sin(y) + xcos(y)y' = 0
Let M = (x+2)sin(y), N = xcos(y)
My = $\frac{d((x+2)sin(y))}{dy}$ = (x+2)cos(y)
Nx = $\frac{d(xcos(y))}{dx}$ = cos(y)
Since My ≠ Nx, hence not exact, and thus we need to find the integrating factor.
Let $\frac{My - Nx}{N}$. we can derive $\frac{(x+2)cos(y)-cos(y)}{cos(y)}$ = $\frac{x+1}{x}$, which is a function of x only.
μ = e∫$\frac{x+1}{x}$dx = xex, which is the integrating factor.
Multiply μ on both sides of the original equation,
xex(x+2)sin(y) + x2cos(y)exy' = 0
Now let M' = xex(x+2)sin(y), N' = x2cos(y)ex,
M'y = $\frac{d(M')}{dy}$ = (x+2)xexcos(y),
N'x = $\frac{d(N')}{dx}$ = (x+2)xexcos(y),
M'y = N'x, hence exact now.
There exist φ(x,y) s.t. φx = M', φy = N'
φ(x,y) = ∫M'dx =x2exsin(y) + h(y)
φy = φ'(x,y) = x2excos(y)+h'(y) = N'
x2excos(y) + h'(y) = x2excos(y)
Thus h'(y)=0, h(y) is a constant.
Therefore, φ(x,y) = x2exsin(y) = C
