Solve the following second order nonhomogeneous linear differential

Dumaen80p3

Dumaen80p3

Answered question

2022-03-24

Solve the following second order nonhomogeneous linear differential equations (where no initial values are given, find the general solution).
y2y+y=8cos(x)+8sin(x)

Answer & Explanation

Drake Huang

Drake Huang

Beginner2022-03-25Added 15 answers

Given differential equation is
y2y+y=8cosx+sinx
We have to find the general solution then the homogeneous equation
y2y+y=0
The auxiliary equation is
m22m+1=0
(m)22m1+(1)2=0
(m1)2=0
(m1)(m1)=0
(m1)=0, m1=0
m=1,1
So the complementary solution is
yc(x)=(c1+c2x)cmx
yc(x)=(c1+c2x)e1x
yc(x)=(c1+c2x)ex
the particular solution is
yp(1)=1D22D+1(8cosx+8sinx)
=1d22D+1(8cosx)+1D22D+18sinx
=8cosx122D+1+8122D+1sinx
=812D+1cosx+812D+1sinx
=82Dcosx+82Dsinx
=4cosxdx4sinxdx
=4sinx+4cosx
yp(x)=4sinx+4cosx
So, the genera solution is
y(x)=yc(x)+yp(x)
y(x)=(c1+c2x)ex+4sinx+4cosx
Jeffrey Jordon

Jeffrey Jordon

Expert2022-03-31Added 2605 answers

Answer is given below (on video)

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