4. Find an expression for VL(s). Switch is closing at time zero, has been open for...
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 the circuit shown has been closed for a long time and is opened at t = 0. Find a) The initial value of v(t), b) The time constant for t>0. c) The numerical expression for v(t) after the switch has been opened, d) The initial energy stored in the capacitor, and e) The length of time required to dissipate 75% of the initially stored energy.
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)
5. The switch has been open for a long time before closing at t0. Find v(t) and 1802 t 0 Wi 10 mH
For the circuit shown in the figure, the switch S is initially open and the capacitor is uncharged. The switch is then dosed at time t = 0. How many seconds after closing the switch will the energy stored in live capacitor be equal to 50.2 mJ?
Assume that you wait for a very long time after closing the switch in the circuit from problem 1 (a basic RC circuit with a battery, switch, resistor, and capacitor) and the capacitor is fully charged. Write an expression for the following in terms of R, C, and ε : a. The total energy supplied by the battery as the capacitor is being charged b. The total energy dissipated by the resistor as the capacitor is being fully charged c....
for t20. switch in the cireuit has been open for a long time before closing at co, rind iC) 3K (30 points) ISV
Question 21 No Initial energy in Inductor. V 480 Volts. Switch S has been open for long. R1 R2 R3- R4 R5 80 Ohms. Inductance L-4 H enries. Switch S closed at timet-0. .a) What are values of current Is through Switch, and current lIL current IR1 through R1, and voltage VL across inductance atto-, just before the switch is closed? R1 R3 It Is R2 . at (t0- Is... IL R. Vu .b) What are the values of IS,...
For the circuit shown in the figure, the switch S is initially open and the capacitor is uncharged.
The switch is then closed at time t = 0. How many seconds after closing the switch will the
energy stored in the capacitor be equal to 50.2 mJ?
Q3: The switch in the has been open a long time before closing at t=0. Find il(t) for t> 0. 2k92 t = 0 Som 113 362.5H 12V 6k92 2.5 UF 9 mA English (United States)