The inverse Laplace transform of
$X (s) = \frac{2 + 2 s e^{- 2 s} + 4 e^{- 4 s}}{(s^{2} + 4 s + 3)}, R e (s) > - 1$ is of the form

$x (t) = (e^{- t} + e^{- 3 t} u (t) + [- e^{- t - a} - 3 e^{- 3 (t - a)}] u (t - a) + 2 [e^{- t - 2 a} - e^{- 3 (t - 2 a)}] u (t - 2 a)$
value of a is ______

2

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Solution

The correct option is A 2
X(s) is a sum of $X_{1} (s) + X_{2} (s) e^{- 2 s} + X_{3} (s) e^{- 4 s}$

Where, $X_{1} (s) = \frac{2}{s^{2} + 4 s + 3}$

$X_{2} (s) = \frac{2 s}{s^{2} + 4 s + 3}$

$X_{3} (s) = \frac{4}{s^{2} + 4 s + 3}$

If $x_{1} (t) ⟷ X_{1} (s)$

$x_{2} (t) ⟷ X_{2} (s)$

$x_{3} (t) ⟷ X_{3} (s)$

Then by using linearity and time shifting property we obtain

$x (t) = x_{1} (t) + x_{2} (t - 2) + x_{3} (t - 4)$

Comparing this x(t) with the expression given in question

$a = 2$

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