This is a practice problem from the Signals and Systems course in my Electrical Engineering program.

Could you please walk me through the steps of solving it so that I can solve more complicated ones in the future?

Thank you for your assistance.

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9.36. In this problem, we consider the construction of various types of block diagram representations for a causal LTI system S with input x(t), output y(t), and system function 2s²+4s-6 H(s) = s² + 3s + 2 To derive the direct-form block diagram representation of S, we first consider a causal LTI system S₁ that has the same input x(t) as S, but whose system function is H₁(s) = 1 s² + 3s + 2* With the output of S₁ denoted by y₁(t), the direct-form block diagram representation of S₁ is shown in Figure P9.36. The signals e(t) and f(t) indicated in the figure represent respective inputs into the two integrators. (a) Express y(t) (the output of S) as a linear combination of y₁(t), dy₁(t)/dt, and d² y₁(t)/dt². (b) How is dy₁(t)/dt related to f(t)? (c) How is d²y₁(t)/dt² related to e(t)? (d) Express y(t) as a linear combination of e(t), ƒ(t), and y₁(t). e(t) + -S 1 x(t) f(t) - 3 + 1 -S -2 y₁(t) Figure P9.36 (e) Use the result from the previous part to extend the direct-form block diagram representation of S₁ and create a block diagram representation of S. (f) Observing that 2(s – 1) - H(s) ==== S+3 5+2 s + 1 draw a block diagram representation for S as a cascade combination of two subsystems. (g) Observing that 6 8 H(s) = 2+ S+2 s + 1' draw a block-diagram representation for S as a parallel combination of three subsystems.