Consider a system with input x(t) and output y(t). For each of the following relationships, determine whether the system is linear, causal, time-invariant, and/or stable: y(t) = (t + 1) sin(x(t – 1)) y(t) = integral^t_-infinity tau^2 x(tau) d tau y(t) = x(t + 1) + 2x(t – 1)

75 2 - Consider a system with input x(t) and output y(t). For each of the following relationships, determine whether the system is linear, causal, time-invariant, and/or stable: y(t) = (t + 1) sin(x(t - 1)) y(t) = integral^t_-infinity tau^2 x(tau) d tau y(t) = x(t + 1) + 2x(t - 1)

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images - Consider a system with input x(t) and output y(t). For each of the following relationships, determine whether the system is linear, causal, time-invariant, and/or stable: y(t) = (t + 1) sin(x(t - 1)) y(t) = integral^t_-infinity tau^2 x(tau) d tau y(t) = x(t + 1) + 2x(t - 1)

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