Let Laplace transform of f(t) is f̅ (s), then

1.	Let Laplace transform of f(t) is f̅ (s), then
A.	L[f(ta) u(t - a)] = e-as f̅ (s)
B.	L[f(t + a) u(t + a)] = e-as f̅ (s)
C.	L[f(t - a) u(t - a)] = e-as f̅ (s) where\(u(t-a)= \begin{cases} 0 ,~~~ta\\ \end{cases}\)
D.	L[f(t - a) / u(t - a)] = e-as f̅ (s) where\(u(t-a)= \begin{cases} 0 ,~~~ta\\ \end{cases}\)
Answer» D. L[f(t - a) / u(t - a)] = e-as f̅ (s) where\(u(t-a)= \begin{cases} 0 ,~~~ta\\ \end{cases}\)

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