(b) Determine the inverse Laplace transform, h(t) using result obtained in (a) corresponding to the following unilateral Laplace transform using the partial fractions method. * h(t) = -3e-*(t) + 2e-2*...

Extracted text: (b) Determine the inverse Laplace transform, h(t) using result obtained in (a) corresponding to the following unilateral Laplace transform using the partial fractions method. * h(t) = -3e-*(t) + 2e-2* (t) h(t) = 5e-tu(t) – 4e-2*u(t) Option 1 Option 2 h(t) = 8(1)(t) - 8(t) + 6e-4(t) h(t) = 3e-tu(t) – 2e-2tu(t) O Option 3 O Option 4


Extracted text: The relationship between the input, x(t) and the output, y(t) of a LTI system is described by the indicated differential equation: d? d y(t) + 2y(t) d dt2Y(E) + 3 dt x(t) + 4x(t) dt