Finding the effective time constant The circuit in Fig. B.48 has R_{1}=R_{2}=R_{3}=6 k \Omega \text { and } C=0.1 \mu F . Determine (a) the effective time constant τ, (b) the cutoff frequency \omega_{ O } , and (c) the bandwidth BW.
Question B.18: Finding the effective time constant The circuit in Fig. B.48...
If the source is shorted, the effective resistance seen by capacitor C is the parallel combination of R_{1}, R_{2}, \text { and } R_{3} . The effective resistance R is given by
\frac{1}{R}=\frac{1}{R_{1}}+\frac{1}{R_{2}}+\frac{1}{R_{3}} \text { or } R=\frac{R_{1}}{3}=\frac{6 k }{3}=2 k \Omega
(a) The effective time constant is
\tau=C R=2 k \Omega \times 0.1 \mu F =0.2 ms
(b) The cutoff frequency is
\omega_{ o }=\frac{1}{\tau}=\frac{1}{0.2 ms }=5000 rad / s \text {, or } 795.8 Hz
(c) At ω = 0, capacitor C is open-circuited, and the output voltage has a finite value. At a high frequency, tending to infinity (ω = ∞), capacitor C is short-circuited, and the output voltage becomes zero. This is a lowpass circuit with f1 = 0 and f2 = fo = 795.8 Hz. Thus, the bandwidth is
BW =f_{2}-f_{1}=795.8 Hz
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