Find the general solution of this ODE: d²y dy +2- +y=12e-t dt² dt The solution will be of the form: y(t) = Cy₁(t) + Dy₂(t) + yp(t)

Please explain each step in detail, so I may understand properly. 

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### General Solution of a Second-Order Ordinary Differential Equation (ODE) **Problem Statement:** Find the general solution of this ODE: \[ \frac{d^2 y}{dt^2} + 2 \frac{dy}{dt} + y = 12e^{-t} \] **Solution Approach:** The solution will be of the form: \[ y(t) = C y_1(t) + D y_2(t) + y_p(t) \] where \( C \) and \( D \) are arbitrary constants. **Instructions:** To solve this equation, follow these steps: 1. Find the complementary solution \( y_c(t) \) by solving the homogeneous equation. 2. Determine particular solution \( y_p(t) \) using an appropriate method such as undetermined coefficients or variation of parameters. 3. Combine these results to express the general solution. The final general solution in the form: \[ y(t) = \] In this context, the arbitrary constants \( C \) and \( D \) will adjust based on initial or boundary conditions provided in a specific problem scenario.