sor ma 6mH 3 Com H t 2.23MF sor vo (RUS I No initial stored energy,...
Find vo(t) for t > 0 Q#3 and
Q#4
3. Find vo(t) for t0 4 H 2Ω 4Ω 4 A Answer: vo(t)4e2t [At 0 4. Find i(t) for t> 0 5 mA 1 mH Answer: it) -5e7.5*10°1 [mA] t20
problem:
The initial energy stored in the circuit in is zero. Find vy(t) for 120. 250 mH 80 mA 2002 0,00) +16 4F
The voltage of the capacitor vo(t) for t> 0 is known to be vo(t) = 9e-20 V. i1(0) = 5mA. (a) Find i(t) for t 20. (b) How much energy was initially stored in the inductor and capacitor? (c) How much energy was stored at t= in the inductor and capacitor? it) (0) i20 1110 H V.0) 10 kΩ Black box -T gmF
igar. 150 3. There is no energy stored in the circuit initially. At t-0, the switch is closed a) Find io for t20. b) Find vo for t20. c) Find i for t20. d) Find i for t20. 18H t0t 30H3 12H 180 V ,42-M2 h2-2M Note: Leg
A current i(t) = 220 sin (20pi t) mA is applied to a capacitor of C = 20000/pi mu F, as shown in the figure below: a) Knowing that i(t) = C dv/dt, integrate both sides of the equation to determine the voltage v(t). You may assume that the initial voltage is v(0) = 0.55 Volts. b) Plot one cycle of the voltage v(f) found in part a) and clearly indicate the amplitude, frequency, and period on the plot. Also,...
For the circuit shown in Fig. 4.1, there is no initial energy storage. Draw and label the circuit in the s domain and use it to determine H(s)=Vo(s)/Vsrc(s). Using H(s) and given: (a) vsrc(t)= e'u(t) V, find vo(t) using the inverse Laplace Transforms. (b) vsrc(t)=2 cos 2t V, determine the steady state output vo(t). + 0.50, 1H 192 w + + + USRC 1 F V, 212 vo
Calculate vo(t) in the circuit shown in the figure below if i(t) is 200 cos(105t+ 60°) mA, i2(t) is 100 sin(105t90°) mA, and vst) 10 sin(105t) v uci) + 250 nF o(r) 52 Ohm
Calculate vo(t) in the circuit shown in the figure below if i(t) is 200 cos(105t+ 60°) mA, i2(t) is 100 sin(105t90°) mA, and vst) 10 sin(105t) v uci) + 250 nF o(r) 52 Ohm
The initial energy stored in the circuit in Fig is zero At r-O, a de current source of 3 A is applied to the circuit. The value of the resistor is 40 ohm. i R .25F 25H 40 ?? a) What is the initial value of i b) What is the initial value of dij /dt c) What are the roots of the characteristic equation? d) What is the numerical expression for i (t) when t 0?
-25€ V=72e U to + i= 4 e 2st mA, tot T a) Find R and C. b) What Find T (in milliseconds) energy () Find the initial energy stored in the capacitor (Wo=?) d) Find the that has been dissiputed by the resistor 60ms after the wol begins to decay. (W diss,=?! voltage
8. 3 Q Find steady-state response for vo(t), if i,()-3cos(5) A. i,(t) 4 2 0.05FVolt) 0.4 H