Classify or characterize the following systems as to homogeneity, additivity, linearity, time-invariance, BIBO stability, causality, invertibility, and memory. y(t) = x^3(t – 2) y(t) = x(sin(t)) y[n] = x[n]x[n -2] y(t) = t^2x(t – 1) y(t) = Od{x(t)} y(t) = x{t – 2) + x(2 – t) y{t) = [cos(3t)]x(t) y(t) = x(t/3)

40 2 - Classify or characterize the following systems as to homogeneity, additivity, linearity, time-invariance, BIBO stability, causality, invertibility, and memory. y(t) = x^3(t - 2) y(t) = x(sin(t)) y[n] = x[n]x[n -2] y(t) = t^2x(t - 1) y(t) = Od{x(t)} y(t) = x{t - 2) + x(2 - t) y{t) = [cos(3t)]x(t) y(t) = x(t/3)

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images - Classify or characterize the following systems as to homogeneity, additivity, linearity, time-invariance, BIBO stability, causality, invertibility, and memory. y(t) = x^3(t - 2) y(t) = x(sin(t)) y[n] = x[n]x[n -2] y(t) = t^2x(t - 1) y(t) = Od{x(t)} y(t) = x{t - 2) + x(2 - t) y{t) = [cos(3t)]x(t) y(t) = x(t/3)

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