Consider the following ODEs modeling causal LTI systems at initial rest, with input x(t) and output y(t). System 1: y(t) +6¾y(t) + 13y(t) = ±x(t) + 2x(t). System 2: y(t) +6% y(t) + 13y(t) = ₫x(t) − 2x(t). (a) Is System 1 stable? Is it invertible with a causal stable inverse? (b) Is System 2 stable? Is it invertible with a causal stable inverse? (c) Find an explicit time domain expression for the response of System 1 to the input x(t) 5 sin(2t+1). (d) Repeat (c) for System 2. How do the two responses differ? =

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Consider the following ODEs modeling causal LTI systems at initial rest, with input x(t) and output y(t). System 1: y(t) +6dy(t) + 13y(t) = d² System 2: y(t)+6y(t) + 13y(t) = x(t) + 2x(t). x(t) — 2x(t). (a) Is System 1 stable? Is it invertible with a causal stable inverse? (b) Is System 2 stable? Is it invertible with a causal stable inverse? (c) Find an explicit time domain expression for the response of System 1 to the input x(t) 5 sin(2t+1). (d) Repeat (c) for System 2. How do the two responses differ? =