Find the inverse Laplace transforms of the following using the second shift theorem. Note: Write "H(t-a)" for Heaviside functions; and "Pi" for T, and hyperbolic functions if needed. (1) L-1A= s+4 (ii) L-"( = 82+4 (iii) Which of the following is L- H(t) (et-* – et-r) ,3t-T ,3t-1 2 H(t-T) (e(t-n) – e(-t+r)) H(t-n) O H(t-n) 3t

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Find the inverse Laplace transforms of the following using the second shift theorem. Note: Write "H(t-a)" for Heaviside functions; and "Pi" for T, and hyperbolic functions if needed. (1) L-" s+4 (ii) L-| 2+4 (iii) Which of the following is L- s2_9 H(t) (et- – e3t-") 2 o H(t-m) (e3(t-«) – e3(-t+#)) 6 H(t-T) ,3(t-T) 6 O H(t-m) (e³t – e)