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Design a wideband band-pass active filter that has a gain of 17dB in the passbandand has corner frequencies at the lower and higher frequency limits of human hearing (i.e. 20Hz to 20kHz).
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Design a wideband band-pass active filter that has a gain of 17dB in the passbandand has corner frequencies at the lower and higher frequency limits of human hearing (i.e. 20Hz to 20kHz).

User Fmonegaglia
by
4.9k points

1 Answer

11 votes

Solution :

A wide band pass filter has (Q < 10)

Gain in dB of overall filter = 17 dB


$F_L = 20 \ Hz $


$F_H = 20 \ kHz$


$17 = 10 \log A_0$


$1.7 = \log A_0 $


$A_0 = 5.47 $


$F_L = 20 \ Hz $


$F_L = (1)/(2 \pi R_1C_1)$

Let
$C_1 = 0.1 \mu F$


20 = (1)/(2 \pi * R_1 * 0.1 * 10^(-6))$


$R_1 = (10^6)/(4 \pi * 0.1) $


$R_1 = 79.6 \ k \Omega$


$F_H = 20 \ kHz$


$F_H = (1)/(2 \pi R_2C_2)$


$20 * 10^3 = (1)/(2 \pi R_2 * 0.1 * 10^(-6))$


$R_2 = (10^3)/(4 \pi * 10^3) $


$R_2 = 79.6 \ \Omega$

Since the overall gain off filter is 5.47


$A_0 = 5.47$


$A_0 = A_(01) * A_(02)$


$A_0 = 3.4 * 1.6$


$A_0 \sim 5.47$


$A_(01) = 1+ (R_F_1)/(R_i_1)$


$3.4 = 1+ (R_F_1)/(R_i_1)$


$2.4 = (10 k)/(R_i_1)$


$R_i_1 = 4166 \ \Omega$


$R_i_1 = 4.1 \ k \Omega $


$A_(02) = 1+ (R_F_2)/(R_i_2) $


$1.6 = 1+ (R_F_2)/(R_i_2)$


$0.6 = (R_F_2)/(R_i_1)$


$R_i_2 = (0.1 k)/(0.6)$


$R_i_2 = 166 \ \Omega $

User Suneet Bansal
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