7. Find the inverse Laplace transform for the F(s): (s - 2)e-2s s²4s +3 Check the denominator also. F(S) = Hint: You may need unit step functions.

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### Exercise: Inverse Laplace Transform **Problem 7:** Find the inverse Laplace transform for the function \( F(s) \): \[ F(s) = \frac{(s - 2) e^{-2s}}{s^2 - 4s + 3} \] **Hint:** You may need unit step functions. Check the denominator also. ### Explanation To solve this problem, you'll need to: 1. Analyze the given Laplace transform function \( F(s) \). 2. Decompose the expression if necessary, focusing on the denominator \( s^2 - 4s + 3 \). 3. Apply inverse Laplace transform rules, considering the exponential term \( e^{-2s} \) which suggests the use of a unit step function \( u(t) \). 4. Verify the solution by ensuring all conditions of the problem are met, referencing known inverse Laplace transformations. This exercise is fundamental in understanding how to convert Laplace-transformed equations back into time-domain functions, which is crucial in fields like control systems and differential equations.