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For the circuit shown below do the following: 1. Find expressions for vc(t) and i(t) for...
Problem 2: For the circuit shown below, find the following: The expression of i(t) fort > 0. The voltage vc (t) fort > 0 Calculate the peak energy stored in the capacitor Calculate the real power dissipated in the load formed by R and C. b) d) 40 UF + 0 -V-24 Ve0 400 Hz
teo 1. (28%) Answer the following questions about the circuit (t > 0). a. Find vekt) when vc(O+) - 100 V. b. Find iſt). c. Find the power consumed by the resistor, pt). d. Find the energy received by the resistor, wſt). e. Find the initial energy stored in the capacitor. it foorumi 1002 W- (16%) Answer the following questions about the circuit. a. Find B when the time constant is 0.02 sec. b. Find v(t) (t > 0) when...
Part A Find vC(0+) . Part B Find vC(∞) Part C Find τ for t>0 Part D Find i(0+). Part F Find i(t),t≥0+. Problem 7.51 MasteringEngineering MasteringCo... 5 of 5 Assume that the switch in the circuit in 40 k2 a 50 kn 2.5 k 120 V 150 kn 25 nF Tap image to zoom has been in position a for a long time and that at t0 it is moved to position b. Part E Choose the correct expression...
9. For the given circuit, if the initial voltage across the capacitor is vc(0*) = 0, find an expression for the voltrage across the capacitor as a function of time and graph voltage versus time. R= 100 k2 w v=100 V uc) C = 0.01 uF 10. If a 100-F capacitance is initially charged to 1000V and at t=0, it is connected to a 1-ka resistance, at what time has 50 percent of the initial energy stored in the capacitance...
Function Generatr Inductor Model Ra R, Figure 1 Series RLC Circuit Preliminary This laboratory will demonstrate how varying resistance changes the natural response of a series RLC circuit (Fig. 1). The function generator is modeled as an ideal voltage source v(t) 5 u() V in series with source resistance Rs-50Q. After measurements using an LCR meter, the inductor is modeled as an ideal L 90 mH inductor in series with resistance RL-20Q. The capacitance is C-0.22 μF. 1) Calculate the...
Consider the following linear circuit. The capacitor voltage is +) 1, t<0 vc(t) = let, t > 0 Determine the total energy dissipated in the resistor for 0 <t<. Tu Circuit + Eu(t)
6. In the circuit below, the voltage and current expressions are i = 64e-10t A, t 2 0 0 Find a) R. b) t(in milliseconds ms) c) L d) The initial energy stored in the inductor e) The time (in milliseconds) it takes to dissipate 60% of the initial stored energy.
For the circuit shown below, find the equation for Vc(t) for t > 0 Draw the following circuits: T =0 T = 0+ R_th 1. For the circuit shown in Figure 1 below, find the equation for vc(t) fort>0. Extra Credit: Find the time constant (T) and indicate how long it will take to fully discharge the capacitor voltage. Hint: You have to draw the following circuits at: t=0-, t=0+, RTH too 2 + W 3r - Velt) 24 9A...
(1 point) For a standard capacitor with c=116μF: If vc(t)=4.2+14.8cos2(190t) V, Find: (a) ic(t) (b) The maximum stored energy in the capacitor If ic(t)=14.8e−190t mA for t>0 and vc(0)=0, Find: (c) vc(t) for t>0 If ic(t)=14.8e−190t mA for t>0 and vc(0)=4.2 mV, Find: (d) vc(t) for t>0 If the stored energy is w(t)=26e−315tμJ for t>0t>0, Find: (e) ic(t) (a) ic(t) = mA (b) wmax = μJ (c) vc(t) = mV (d) vc(t) = mV (e) ic(t) = mA or ic(t) = mA 2013 Paul Hummel BY...
please answer and show the related work. thank you! Problem 1. Find the voltage vc(t) across a capacitor of 1 F as a function of time, if vc(t= 0) = 2 V and the current is given as follows. Also, find the energy stored in the capacitor at t 6 e(A) 2 t(s)