At t = 0, a series-connected capacitor and inductor are placed across the terminals of a black box as shown in (Figure 1). For t > 0, it is known that in = 1.5e-16,000t – 0.5e-4000t A, where t is in seconds. Figure < 1 of 1 25 mH + + t=0 uc 625 nF Black box If ve(0) = -50 V, choose the correct expression for vo for t > 0. Ο υο 450e-16,000€ + 150e 4000t V Ο...
(1 point) If V (t) = 93e-660 mV and i (0) = 85 mA, find is (t) for t>0 <8 mF VS 8 20 mH + 24 mF iz(t) = -107.283e^(-36t)+19 mA
Solve for Iz(t) in the circuit shown for t>O as the switch is closed for t>0. t=0 R3=2000 Rz=2000 Ix V. 24V R; 2009 R2 1000 30 mH
Find v for t>O if the circuit is under de condition at t=0-. t = 0 w 16 Ω 82 + 242 1/36 F + + 20V 8V Annor.
find Vc(t) t<0
Quesuon 2 Find V (t), t20. 4Ω 8 Ω 15 Ω 1= 0 + + 2 Ω ξ3Ω 3Ω 1F 100 V b
The circuit shown has been in opera neration for a long time. At t=0, the source voltage suddenly jumps to s to 250V. Find vo(t) for t >0. 8KO 160 mH 50 V 10 nF ()
Find i(t) for t> 0 in the given circuit. Assume v;= 34 V. t=0 10 22 6022 [i(t) 1 mF Vi + 40 Ω 2.5 H O (0) = –10.88te-20+ (0) A i(t) = -27.20 te-20tu(t) A i(t) = 13.60te-20tu() A O i(t) = –17.00 te-20t4() A
Solve for I.(t) fort >0 as the switch moves from 20 V voltage source to 150 mA current source for t>0. t=0 R=2000 IL R2 Vs1 20V 10uF 100 L (1/4.1) H 150 mA
(a) In the network in the accompanying figure,
find i(t) for t > 0.
(b) If
vC1(0–) = – 13 V, calculate
vC2(0–).
Please round all numbers to 3 significant digits.
(a) In the network in the accompanying figure, find i(t) fort > 0. (b) If Vc1(0-) = - 13 V, calculate vc2(0-). + °C (t) HE 0.8 F + 13e-5łu(t) v 0.2Fvc2(t) Please round all numbers to 3 significant digits. (a) i(t) = *e Edit A (b) Vc2(0-) =...
1. Find v(t) fort> 0 in the circuit in below: t=0 222 w 622 w + 10V 2 F +1 50 V Assume the switch has been open for a long time and is closed at t=0.