Q7(a) (i) use Laplace transform to determine the transfer function H(s). y'(t) – y(t) – 2y(t) = x'(t) – x(t) i) Evaluate different possible impulse responses h(t) from the transfer function in Q7(a)i). considering the stability and causality of the system. Sketch the region of convergencefor each possible impulse response outcome.

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TABLE 11: LAPLACE TRANSFORM PROPERTIES Property Signal x(t) Laplace Transform ROC X(s) R x1(t) X,(s) R1 X2(t) аx (t) + bxz(t) x(t - to) e Sotx(t) X2(s) aX,(s) + bX2(s) R2 Linearity Time shifting At least R, n R2 e-sto X (s) R Shifting in the s- X(s – so) Shifted version of R (i.e., s is in the ROC if s - So is in R) Scaled ROC (i.e., s is in the Domain Time scaling x(at) ROC if s/a is in R) Conjugation x'(t) x,(t) * x2(t) (,s).x X, (s) X2(s) R Convolution At least R, n R2 Differentiation in the d sX(s) At least R x(t) Time Domain dt Differentiation in the -tx(t) d a X(s) s-Domain Integration in the Time Domain At least Rn {Re(s) > 0} [ x(?)dr Initial- and Final- Value Theorems If x (t) = 0 for t<0 and x(t) contains no impulses or higher order singularities at t = 0, then x(0+) = lim sX(s) S-00 If x(t) = 0 fort< 0 and has a finite limit as t → o, then lim x(t) = lim sX(s) 5-00

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Q7(a) (i) use Laplace transform to determine the transfer function H(s). y'(t) – y'(t) – 2y(t) = x'(t) – x(t) i) Evaluate different possible impulse responses h(t) from the transfer function in Q7(a)). considering the stability and causality of the system. Sketch the region of convergencefor each possible impulse response outcome.