8.43 The initial conditions for the circuit shown in Figure P8.43 are i(0) = 1 =...
Circuit Analysis in the s-Domain 15.3. The initial voltage across the capacitor in the circuit shown in Figure P15.3 is v(0) 1 V, and the initial current through the inductor is i(0)0 mA Find the voltage vo (t) across the capacitor for t 2 0 Figure P15.3 50 mH 1 kS2 V. Volt) T 0.1 μF The circuit in the s-domain is shown below. R2 Va 1k 0.05s 1/(sC)-1e7/s Vo R1 2k V (0-ys 5/s 1/s 1 format long; 2...
Please do the problem if you can do ALL parts.
t-0 a SW1 SW2 0.5 Ω 2 1Ω V. R3 20 A T v(t) 0.5 F 0.5 H 0 Find the initial current i(0) through the inductor and the initial voltage v(0) across the capacitor at t 0. b. Write a node equation at node a fort2 0. c. Represent v(t) as a function of i(t) on the series connection of R2 and L. Find dv(t)/dt. Derive a second-order differential...
please solve in details. i will rate you up !
Problem 3 In the circuit shown below: a. Write a node equation at node 1 by summing the currents leaving node 1. b. Write a node equation at node 2 by summing the currents leaving node 2. c. Find V, and V2 by solving the two node equations. d. Find the currents IR, IR, IR3, IR4, Is. e. Find the power absorbed by R1, R2, R3, R4, and power released...
Problem 3 In the circuit shown below: a. Write a node equation at node 1 by summing the currents leaving node 1. b. Write a node equation at node 2 by summing the currents leaving node 2. c. Find Vj and V2 by solving the two node equations. d. Find the currents Iri, IR2, IR3, IR4, Is. e. Find the power absorbed by R1, R2, R3, R1, and power released by Vs and I.. IR1 R1 w 2k IR2 V2...
1. For the circuit at right: a) Find the characteristic equation of the circuit at right. b) Find the solutions to the characteristic equation. d) The switch has been in the top position for a long time and is switched down at time t 0. Find the final and initial conditions: dt dt e) Write the full expression for iL(t), including all the constants that you find. t=0 3.6-V 5.V L:-10-mH R2:= 180,Ω
1. For the circuit at right: a)...
dx dt 1. For the circuit below determine: a) The initial conditions: iz(0+), dix(0*), v(0+), dv(0+) b) The circuit differential equation and solve for iz(t), t 2 0 (No credit for Transform techniques) ix VI 102 422 + lo 5+10u(t) 10 H 1/4 F V
part B asap
3. The differential equation describing the current in a circuit is given by: dai(t) d+2° +2-06 + 5i(t) = v(t) dt a) Find i(t) fort > 0 using Laplace transforms if v(t) = 10u(t) and given that initial conditions are i(0+) = 4 and dico*) = -2. b) write an expression for i(t) if: 3 3 sin (2nnt - tan-1(4nt)) v(t) = nv1 + 16n2t2
(1) Consider the RC circuit shown in Figure 1. For t<0 the switch is open, and the charge stored on the capacitor is 0. At t-0 the switch is closed, and the voltage source begins charging the capacitor. Let R1-R2-220 Ω , C-0.47 μ F , Vs-5 V. (a) Write the differential equation as an expression for the capacitor voltage fort> 0 (i.e. write the differential equation) and calculate the time constant (b) Calculate the steady-state capacitor voltage R2 R1...
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...
Don't use Laplace method
Don't use Laplace method
Don't use Laplace method
Don't use Laplace method
Don't use Laplace method
Consider the circuit shown in Fig. 3 22 SW1 SW2 5Ω CF 25 V 20 S 10 V 3 H BL Figure 3: The circuit of Problem3 The switch SW1 has been closed for a long time before it is opened att has been opened for a long time before it is closed att 0 0 while the switch SW2...