Which of the following is the equivalent representation of the denominator of the system function of a general IIR filter?(a) \(\prod_{k=1}^N (1+p_k z^{-1})\)(b) \(\prod_{k=1}^N (1+p_k z^{-k})\)(c) \(\prod_{k=1}^N (1-p_k z^{-k})\)(d) \(\prod_{k=1}^N (1-p_k z^{-1})\)The question was asked during an interview for a job.This intriguing question originated from Quantization of Filter Coefficients topic in chapter Digital Filters Design of Digital Signal Processing

Which of the following is the equivalent representation of the denomin

1.	Which of the following is the equivalent representation of the denominator of the system function of a general IIR filter?(a) \(\prod_{k=1}^N (1+p_k z^{-1})\)(b) \(\prod_{k=1}^N (1+p_k z^{-k})\)(c) \(\prod_{k=1}^N (1-p_k z^{-k})\)(d) \(\prod_{k=1}^N (1-p_k z^{-1})\)The question was asked during an interview for a job.This intriguing question originated from Quantization of Filter Coefficients topic in chapter Digital Filters Design of Digital Signal Processing
Answer» Right answer is (d) \(\prod_{k=1}^N (1-p_k Z^{-1})\) Easiest explanation: We know that the system function of a general IIR filter is given by the equation H(z)=\(\frac{\sum_{k=0}^M b_k z^{-k}}{1+\sum_{k=1}^N a_k z^{-k}}\) The DENOMINATOR of H(z) may be expressed in the form D(z)=\(1+\sum_{k=1}^N a_k z^{-k}=\prod_{k=1}^N (1-p_k z^{-1})\) where pk are the POLES of H(z).

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