Question: Consider the difference equation 5 y(n) - -y(n-1) + y(n 2) = x(n-1) If y(0) = y(1) = 1. (a) What is the general

Consider the difference equation 5 y(n)-y(n 1) + y(n 2) = x(n-1) If y(0) = y(1) = 1. (a) What is the

Consider the difference equation 5 y(n) - -y(n-1) + y(n 2) = x(n-1) If y(0) = y(1) = 1. (a) What is the general form of the homogeneous solution of the difference equation? (b) What is the particular solution of this equation if x(n) = 8(n)?

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The given difference equation is yn 56 yn1 16 yn2 13 xn1 With initial conditions y0 y1 1 a To find the general form of the homogeneous solution of the ... View full answer

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