please help Problem 2 (10 pts.) following circuit, please find the transfer function G(s)-Vo(sV(s). + Vo(t)-...
Find the Transfer Function Vo(s)/(s) for this circuit, where s-jo. 4. 10Ω 2Ω vo(t) t 0.1 F 2 H
Q1. For the filter circuit shown below, (5 marks) Vo(s) a) Find the transfer function, G(s) and the type of the filter. (4 marks) Vi(s)' b) Find the initial and final values of vo(t) if vi(t) = 2u(t). (1 marks) 10 k12 w 6 тн 0000 v;(1) 5 k92 2 mF
Problem 2 (20 pts) Find the transfer function of the following Bode plots a) G(s)- 10 102 10 105 10 10 10 radrsec
please write clearly b.) Find the transfer function, Vo(s)/V(s), for the circuit in the figure below. 10000 0000 (8)
Q2. Employ Laplace transform to determine the transfer function of the following circuit h(t)=vo(t)/io(t) 12 2s V(s) 2 + to, 40
Find the transfer function Av(S)-Vo(s)/Vs(s) for the following circuit KR, 1 KR
Find the transfer function H(s) = Vo/Vs for the circuit in Fig. 1,2 and 3. Describe the filter characteristics. Fig. 1. An active filter Fig. 2. Another active filter. Fig. 3. Yet another active filter. R2 R1
Find the transfer function Vo(s)/V(s) for the circuit shown in the figure. 1. IH OO00 H w 0000 TH IF IF
Problem 2 An RC circuit ( with an active component) has the following transfer function (where R and Care positive) H(s) - Vout(8) _R|| R/10k12 Vin(8) 10KN 1 + $RC Where s = jw Find the value of the resistor and the value of the capacitor so that: for w = 0 rad/s, H(jw)lde = +12dB at f = 1kHz, |H(jw)lab = +9dB Problem 3 The transfer function of a circuit is given by H(S) = Vout(s) Vin(s) Where s...
PROBLEM #2: In the circuit shown, suppose that R and C are given. The transfer function of the circuit is G(s)== RCs +1 The impulse response of the circuit is g(t)== Let/RC ·u,(t). RC CV.CO Given that the input voltage is v;(t)=u,(t), determine the zero-state response v.(t) for t20 in two equivalent ways: (a) Use convolution. That is, compute the integral vo(t) = [ 8(t – T )v;()dt. (b) Use Laplace transforms. That is, compute vo(t) = ('{G(s)V;(s)}.