Answer to Question #301848 in Differential Equations for Jonathan Musao

The auxiliary equation is "m^2+m=0."

The roots of the equation are "m(m+1)=0\\implies m =0,-1".

The complementary function is "C.F = f_1(y)+f_2(y-x)."

The particular integral is

"\\begin{aligned}\nP.I &= \\dfrac{1}{D^2+DD'}\\sin(x+y)\\\\\n&=\\dfrac{1}{-1-1}\\sin(x+y)~~(\\text{Replacing $D^2=-1^2, DD'=-1$})\\\\\n&=-\\dfrac{1}{2}\\sin(x+y)\n\\end{aligned}"

The solution is "z = f_1(y)+f_2(y-x)-\\dfrac{\\sin(x+y)}{2}"