Answer to Question #302582 in Differential Equations for haru

Question #302582

Find the general solution of the following differential equations using method of undetermined coefficients:, (v) y''+2y'+2y =e^x cos2x.

Expert's answer

Corresponding homogeneous differential equation

"y''+2y'+2y =0"

Characteristic (auxiliary) equation

"r^2+2r+2=0"

"r_1=-1-i,r_2=-1+i"

The general solution of the homogeneous differential equation is

"y_h=c_1e^{-x}\\cos x+c_2e^{-x}\\sin x"

Find the particular solution of the non homogeneous differential equation

"y_p=Ae^x\\cos 2x+Be^x\\sin 2x"

"y_p'=Ae^x\\cos 2x-2Ae^x\\sin 2x"

"+Be^x\\sin 2x+2Be^x\\cos 2x"

"y_p''=Ae^x\\cos 2x-2Ae^x\\sin 2x"

"-2Ae^x\\sin 2x-4Ae^x\\cos 2x"

"+Be^x\\sin 2x+2Be^x\\cos 2x"

"+2Be^x\\cos 2x-4Be^x\\sin 2x"

Substitute

"-3Ae^x\\cos 2x-4Ae^x\\sin 2x-3Be^x\\sin 2x"

"+4Be^x\\cos 2x+2Ae^x\\cos 2x-4Ae^x\\sin 2x"

"+2Be^x\\sin 2x+4Be^x\\cos 2x+2Ae^x\\cos 2x"

"+2Be^x\\sin 2x=e^x\\cos 2x"

"A+8B=1"

"-8A+B=0"

"A=1\/65, B=8\/65"

The general solution of the non homogeneous differential equation is

"y=c_1e^{-x}\\cos x+c_2e^{-x}\\sin x""+\\dfrac{1}{65}e^x\\cos 2x+\\dfrac{8}{65}e^x\\sin 2x"

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