"Solve the following second order nonhomogeneous linear differential..." was answered by our community

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).

y^{″} - 2 y^{'} + y = - 8 \cos (x) + 8 \sin (x)

Drake Huang

Beginner2022-03-25Added 15 answers

Given differential equation is

y^{″} - 2 y^{'} + y = - 8 \cos x + \sin x

We have to find the general solution then the homogeneous equation

y^{″} - 2 y^{'} + y = 0

The auxiliary equation is

m^{2} - 2 m + 1 = 0

\Rightarrow {(m)}^{2} - 2 m \cdot 1 + {(1)}^{2} = 0

\Rightarrow {(m - 1)}^{2} = 0

\Rightarrow (m - 1) (m - 1) = 0

\Rightarrow (m - 1) = 0, m - 1 = 0

\Rightarrow m = 1, 1

So the complementary solution is

y_{c} (x) = (c_{1} + c_{2} x) c^{m x}

y_{c} (x) = (c_{1} + c_{2} x) e^{1 x}

y_{c} (x) = (c_{1} + c_{2} x) e^{x}

the particular solution is

y_{p} (1) = \frac{1}{D^{2} - 2 D + 1} (- 8 \cos x + 8 \sin x)

= \frac{1}{d^{2} - 2 D + 1} (- 8 \cos x) + \frac{1}{D^{2} - 2 D + 1} 8 \sin x

= \frac{- 8 \cos x}{- 1^{2} - 2 D + 1} + \frac{8}{- 1^{2} - 2 D + 1} \sin x

= - \frac{8}{- 1 - 2 D + 1} \cos x + \frac{8}{- 1 - 2 D + 1} \sin x

= - \frac{8}{- 2 D} \cos x + \frac{8}{- 2 D} \sin x

= 4 \int \cos x d x - 4 \int \sin x d x

= 4 \sin x + 4 \cos x

y_{p} (x) = 4 \sin x + 4 \cos x

So, the genera solution is

y (x) = y_{c} (x) + y_{p} (x)

y (x) = (c_{1} + c_{2} x) e^{x} + 4 \sin x + 4 \cos x

Jeffrey Jordon

Expert2022-03-31Added 2605 answers

Answer is given below (on video)

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