What is the impulse response of the system described by the second order difference equation y(n)-3y(n-1)-4y(n-2)=x(n)+2x(n-1)?(a) [-\(\frac{1}{5}\) (-1)^n–\(\frac{6}{5}\) (4)^n]u(n)(b) [\(\frac{1}{5}\) (-1)^n–\(\frac{6}{5}\) (4)^n]u(n)(c) [\(\frac{1}{5}\) (-1)^n+\(\frac{6}{5}\) (4)^n]u(n)(d) [-\(\frac{1}{5}\) (-1)^n+\(\frac{6}{5}\) (4)^n]u(n)The question was posed to me in an interview for internship.This key question is from Discrete Time Systems Described by Difference Equations in section Discrete Time Signals and Systems of Digital Signal Processing

What is the impulse response of the system described by the second ord

1.	What is the impulse response of the system described by the second order difference equation y(n)-3y(n-1)-4y(n-2)=x(n)+2x(n-1)?(a) [-\(\frac{1}{5}\) (-1)^n–\(\frac{6}{5}\) (4)^n]u(n)(b) [\(\frac{1}{5}\) (-1)^n–\(\frac{6}{5}\) (4)^n]u(n)(c) [\(\frac{1}{5}\) (-1)^n+\(\frac{6}{5}\) (4)^n]u(n)(d) [-\(\frac{1}{5}\) (-1)^n+\(\frac{6}{5}\) (4)^n]u(n)The question was posed to me in an interview for internship.This key question is from Discrete Time Systems Described by Difference Equations in section Discrete Time Signals and Systems of Digital Signal Processing
Answer» Correct option is (d) [-\(\frac{1}{5}\) (-1)^N+\(\frac{6}{5}\) (4)^n]U(n) Easy explanation: The homogenous solution of the GIVEN equation is yh(n)=C1(-1)^n+C2(4)^n—-(1) To find the impulse response, x(n)=δ(n) now, for n=0 and n=1 we get y(0)=1 and y(1)=3+2=5 From equation (1) we get y(0)=C1+C2 and y(1)=-C1+4C2 On solving the above two set of equations we get C1=-\(\frac{1}{5}\) and C2=\(\frac{6}{5}\) =>h(n)= [-\(\frac{1}{5}\) (-1)^n + \(\frac{6}{5}\) (4)^n]u(n).

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