逆演算子による微分方程式の特殊解について

(1) (D^2+D-2)y=xe^{-2x} (D-1)(D+2)y=xe^{-2x} (D+2)y ={1/(D-1)}xe^{-2x} =e^x∫e^{-x}xe^{-2x}dx =e^x∫xe^{-3x}dx =e^x[-xe^{-3x}/3+∫e^{-3x}/3dx] =e^x[-xe^{-3x}/3-e^{-3x}/9+c] =-xe^{-2x}/3-e^{-2x}/9+ce^x y ={1/(D+2)}[-xe^{-2x}/3-e^{-2x}/9+ce^x] =e^{-2x}∫e^{2x}[-xe^{-2x}/3-e^{-2x}/9+ce^x]dx =e^{-2x}∫[-x/3-1/9+ce^{3x}]dx =e^{-2x}[-x^2/6-x/9+Ae^{3x}+B] =(-x^2/6-x/9)e^{-2x}+Ae^x+Be^{-2x} =(-1/18)(3x^2+2x)e^{-2x}+Ae^x+Be^{-2x} =(-1/18)(3x^2+2x)exp(-2x)+Ae^x+Be^{-2x} (2) (D^2-5D+6)y=(e^x)cos(x) (D-2)(D-3)y=(e^x)cos(x) (D-3)y ={1/(D-2)}(e^x)cos(x) =e^{2x}∫e^{-2x}(e^x)cos(x)dx =e^{2x}∫e^{-x}cos(x)dx =e^{2x}∫[e^{-x}(e^{ix}+e^{-ix})/2]dx =e^{2x}∫[(e^{(i-1)x}+e^{-(1+i)x})/2]dx =e^{2x}([e^{(i-1)x}/(i-1)-e^{-(i+1)x}/(i+1)]/2+c) =[e^{(i+1)x}/(i-1)-e^{(1-i)x}/(i+1)]/2+ce^{2x} y ={1/(D-3)}[[e^{(i+1)x}/(i-1)-e^{(1-i)x}/(i+1)]/2+ce^{2x}] =e^{3x}∫e^{-3x}[[e^{(i+1)x}/(i-1)-e^{(1-i)x}/(i+1)]/2+ce^{2x}]dx =e^{3x}∫[[e^{(i-2)x}/(i-1)-e^{-(i+2)x}/(i+1)]/2+ce^{-x}]dx =e^{3x}[[e^{(i-2)x}/{(i-1)(i-2)}+e^{-(i+2)x}/{(i+1)(i+2)}]/2+Ae^{-x}+B] =[e^{(i+1)x}/{(i-1)(i-2)}+e^{(1-i)x}/{(i+1)(i+2)}]/2+Ae^{2x}+Be^{3x} =[(i+1)(i+2)e^{(1+i)x}+(i-1)(i-2)e^{(1-i)x}]/20+Ae^{2x}+Be^{3x} =[(1+3i)e^{(1+i)x}+(1-3i)e^{(1-i)x}]/20+Ae^{2x}+Be^{3x} =[(1+3i)e^{ix}+(1-3i)e^{-ix}](e^x)/20+Ae^{2x}+Be^{3x} =[(1+3i)(cosx+isinx)+(1-3i)(cosx-isinx)](e^x)/20+Ae^{2x}+Be^{3x} =(2cosx-6sinx)(e^x)/20+Ae^{2x}+Be^{3x} =(cosx-3sinx)(e^x)/10+Ae^{2x}+Be^{3x} =(1/10)(cosx-3sinx)e^x+Ae^{2x}+Be^{3x} =(1/10)(cos(x)-3sin(x))exp(x)+Ae^{2x}+Be^{3x}