1-17 The switch in Figure P7-17 has been in position A for a long time and...
The switch in figure 2 has been in position A for a long time
and is moved to position B at t=0. Find the following values for
t>=0, vC(t), iC(t), and v0(t).
Figure 2 . 4 B aoko? 5u 30633 vo 91-0 5v vt ltic 10.05uF
3. UMF 5.33 5.33 After having been in position 1 for a long time, the switch in the circuit of Fig. P5.33 was moved to position 2 at t = 0. Given that Vo = 12 V, Ri = 30 k2, R2 = 120 KS2. R3 = 60 k-2, and C = 100 F, determine: (a) ic(0) and uc(0) (b) ic(O) and vc(0) (c) cic() and uc(0) (d) vci) for 10 (e) ic(t) for 1 > 0 i o e...
The switch has been in position A for a long time and is moved
to position B at t = 0. Find iL(t) and vc(t) fort < 0 and t > 0.
In the circuit shown in Figure-2, the switch was in position-a for a long time. At time t-0, the switch is moved to position-b. ) Att-0, calculate Vc(+). Q2: 151 1101 Solve Ve () at t20 Find Vc at t 2 sec. switch 25 Figure-2
(a) In the circuit shown in Figure-6, the switch was on position-a for a long time. Q6: At t 0, the switch is moved to position-b. Calculate Vc(0*) and i(0). 4] b) Draw the Laplace Transformed circuit at t20. (c) Solve Vc(t) 1 5 Ohms 1E1 2 H E2 10V Vc 1/4 F Figure-6
The switch in the circuit of Figure 1 has been in position A for a long time. At t-0, it is moved to position B The resulting step response of the series RLC circuit is described by the r differential equation (1). Figure 1 dt L dt LC LC The solution to equation (1) has two components the transient response vt(t) and the steady state response, Vss(t) v(t)v(t)+ Vss(t) The transient response v(t) is the same as that for the...
QUESTION 1 The switch in the circuit seen in Figure has been in a position @ for a long time. At t= 0 ,the switch moves instantaneously to position b AVM 10 kg 12.5 kg 120 (*) 150 kn ? 50 kn volt) = 40 nF ms Fill in the following values: Whent < 0: initial value Vc(0-) = When t = 0: Vo = When t > 0, time constant T = When t= 00, VF =D The final...
Circuit 1. Assume that the switch has been in position 1 for a long time, and then at time t=0 the switch is moved to position 2. Calculate i(t) fort > 0. Circuit 1: Find v(0), i.e. the capacitor voltage at time 0 (in Volts). 2.4Circuit 1: What is v(t), approximately, for extremely larget, for example, for t= 10000000 s.
2 First-Order RC Circuit: Natural Response The switch in the circuit in Figure 2 has been in position for a long time. At t = 0, the switch moves to position (the switch opens) and stays there. Assuming that V. > O for the constant voltage source, (a) find vc(0-), vc(0+), ic(0-), and ic(0+); (b) find vc(t) when t 20 (if you want, you can write vo(t) by circuit inspection; you don't need to show the differential equation); and (c)...
5. In the following circuit, the switch has been in current position for a long time. At t-0 s switch is moved to the second position. What is i(t) for all t>10 s? +12 V 3kn 30 V (+ 2 HF