The switch was open for a long time before it is closed at t-0 s. Find...
The switch was open for a long time before it is closed at t-0 s. Find 1,0) and V, (t) for all t. C,-10 μF, G-5 μF, and V-6 V t=0s 10Ω 10Ω C2- 10 Ω .3 t>0 -20000 Xt-0 1 x(t) .2 V,(t) 15.5+6.33
The switch has been open for a long time before being closed at t = 0. Find the initial value i (0) and the time constant of the RL circuit for t>O. 212 240 Xt=0 381 0.4 H 4. The switch has been closed for a long time and is opened at t = 0. Find (a) i (0) and i (0*); 102 50 2 (b) i(t) fort >0; (c) (t) at t = 5 ms. 100 V + 3...
In the circuit below, the switch was open for a long time and then closed at t=0 s. The values of the emf, resistors, and capacitors are ε = 11.5V, R1 = 2.4 Ω, R2 = 7.4 Ω, R3 = 0.3 Ω, CA = 7.1 μF, CB = 5.0 μF.(a) Immediately after the switch is closed, what is the current through resistor R1?A long time after the switch was closed, what are the charges stored on the two capacitors?(b) on...
3. The switch has been open a long time before closing at t = 0. Find the initial and final energy stored in the inductor. Determine i(t) and v(t) fort > 0*. t = 0 1092 to i(t) 2A @ 500 FT VIC 30.4 mH 2.503 14 4. The switch has been closed a long time before opening at t = 0. Find il(t) and vc(t) fort > 0*. 2012 t = 0 vc(t) 4092 4uF 60V 3 10 mH...
The switch in (Figure 1) has been open for a very long time. The switch is closed at t=0 s. Assume ε = 100 V. At t = 0s, what is the current in the 60 Ω resistor? The switch in (Figure 1) has been open for a very long time. The switch is closed at t = 0 s. Assume ε = 100 V. At t =0s, what is the current in the 40 Ω resistor?At t = 0s, what is the...
For the following circuit the switch is open for t<0. At t=0 the switch is closed. . Assume Is=3.9 A. Find the equation iL(t)=k1+k2exp(−t/τ)for t>0 given Is=3.9 A. 20Ω 6H Switch closes at t-0 10Ω 10Ω 10() у.st. out
In the circuit of the figure below, the switch S has been open for a long time. It is then suddenly closed. Take ε = 10.0 V, R1 = 54.0 kN, R2 = 180 k 2, and C = 12.0 μF.(a) Determine the time constant before the switch is closed. (b) Determine the time constant after the switch is closed. (c) Let the switch be closed at t = 0. Determine the current in the switch as a function of time. Assume...
Consider the circuit depicted in Fig. 2. The switch SW1 has been closed for a long time before it is opened at time t = 0. The switch SW2 has been open for a long time before it is closed att = 0.1 (sec). i) Find the initial current I(0) flowing in the inductor and the initial voltage V(0) across the capacitor. ii) Find the voltage V(t) across the capacitor and the current I(t) through the inductor for 0 ≤ t ≤...
2. The switch has been closed a long time before opening att0. Find the initial and final energy stored in the capacitor. Determine i(t) and v(t) for t20 5.5k2 2.5k2 i(t) 80V v(t) 20mA 2.5k2 2k2 page 1 3. The switch has been open a long time before closing at t 0. Determine ic(t) and Vc(t) for t0 30 mA 3 k2 2 k2 3 k2 30V 10nF Velt) 30 mA 10V elt)
do not use s domain method ,use only differential equation 3. In the circuit shown, switch 1 has been closed for a long time before it is opened at t 0, and switch 2 has been opened for a long time before it is closed at t = 0. SW2 sw, 0.5Ω R2 1(2 A, 20 A i(t) 0.5 H a. Find the initial voltage v(O)- Vo across the capacitor and initial current through the inductor (0) lo at t...