1 Answer

FarthVader · Answer 1 · 2023-02-26T00:33:43+0000

Solve the corresponding homogeneous equation:

y'' = 0

Integrate twice to get the characteristic solution:

$\displaystyle \int (d^2y)/(dt^2) \, dt = \int 0 \, dt \implies (dy)/(dt) = C_1$

$\displaystyle \int (dy)/(dt) \, dt = \int C_1 \, dt \implies y = C_1 t + C_2$

For the particular solution, consider the ansatz

y = a e^(-2t) + b e^(4t)

with second derivative

y'' = 4a e^(-2t) + 16 be^(4t)

Substitute this into the differential equation and solve for the unknown coefficients.

4a e^(-2t) + 16 be^(4t) = e^(-2t) + 10e^(4t)

$\implies \begin{cases}4a = 1 \\ 16b = 10\end{cases} \implies a = \frac14, b = \frac58$

The general solution is then

$y = C_1 t + C_2 + \frac14 e^(-2t) + \frac58 e^(4t)$

with first derivative

$y' = C_1 - \frac12 e^(-2t) + \frac52 e^(4t)$

Use the initial conditions to solve for the remaining constants.

$y(0) = 1 \implies 1 = C_2 + \frac14 + \frac58 \implies C_2 = \frac18$

$y'(0) = 0 \implies 0 = C_1 - \frac12 + \frac52 \implies C_1 = -2$

Then the particular solution to the initial value problem is

$\boxed{y = -2t + \frac18 + \frac14 e^(-2t) + \frac58 e^(4t)}$

(A)

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