
Using kcl find the values of I1, I2, I3


Using kcl find the values of I1, I2, I3 Q1: Form a linear system of cquations...
Measure I1, I2, I3, I tot and V. Next calculate Req
you can find the equation in the lab manual. Then add together
I1+I2+I3, next calculate Icalc.
4) Now Make this circuit, it is the same as Figure 7 in the lab manual; I tot 1.11 12 13 (Al- +2 +3 Figure 7: Schematic of three resistors in parallel. I used 11, 12, 13 and I tot this is the same as A1, A2, A3 and A1+2+3. Measure 11, 12,...
Find currents I1 I2 I3 I4 I5
using loop (mesh) analysis, pleases use the directions indicated
for the currents. Please show work. Thanks in advance
2KC2 2mA 12V KC2 I, 2 1KS2 5 2K2 2KQ 4 1K(2
Test II. ITERATIVE SOLUTION OF SYSTEMS OF LINEAR EQUATIONS Solve the following linear system using Gauss-Seidel iterative method. Use x = x; = x; =0 as initial guesses. Perform two iterations of the method to find xị, xį and xſ and fill the following table. Show all the calculation steps. 10x, + 2x2 - X3 = 27 -3x, - 6x2 + 2xz = -61.5 X1 + x2 + 5x3 = -21.5
Consider the linear system 5x1 - 21 + X1 - 22 + x3 = 1 5.22 - 23 = 2 22 5 5x3 = 3 (a) Discuss the convergence of the iterative solutions of this system generated by the Jacobi and Gauss-Seidel methods, by considering their iterative matrices. (b) If both methods converge, which one of them converges faster to the exact solution of this system? (c) Starting with the initial approximation x(0) = [0,0,0], find the number of iterations...
3 Linear systems 18. Solve the linear system of equations using the Naive Gauss elimination method x,+x: + x) = 1 +2x, +4x1 x 19. Solve the linear system of equations using the Gauss elimination method with partial pivoting 12x1 +10x2-7x3=15 6x, + 5x2 + 3x3 =14 24x,-x2 + 5x, = 28 20. Find the LU decomposition for the following system of linear equations 6x, +2x, +2, 2 21. Find an approximate solution for the following linear system of equations...
1. Using iterative solution, find the first eight output signal sample values for the following linear difference equation: with initial condition yl-18 and causal input nnun 2. Using iterative solution, find the first eight output signal sample values for the following linear difference equation: with initial condition yf-2 2, y-11 and causal input n- (n + 1)ufn
Homework4 Solve the following problems in form of report using Microsoft word format. Three students per report. The names and student no. are to be declared. Due date Mo. 26.03.2020 12:00 PM Solve the following system of linear equations: [ 0.8 -0.4 011 (41 -0.4 0.8 -0.41*2} = 25 0 -0.4 0.8 |(x3) (105) (1) Using the Gauss-Seidel iterative method until the percent relative error falls below Ea < 5% (2) With Gauss-Seidel using overrelaxation (1 = 1.2)until En 5%...
I don't understand how the answer for I1=7.99, I2=1.75, &
I3=6.24 as theoretical current. Use the number provided in the data
table not the diagram! Thank you
34 LABORATORY 3 4 Kirchhoff's Rules LABORATORY REPORT Data Table 1 Power Supply Voltages V 5.00 V & =_10.00 Calculations Table 1 Kirchhoffs rules for the circuit (1) KCR- (2) KVR1- (3) KVR2- E2 Theoretical Current (mA) % Error Experimental to Theoretical Current Resistor Values (9) Ri= 462 R2= 750 R3 = 1008...
Find the solution of Problem 2.8 using Newton-Raphson method
with the starting value of
as 90 degrees and
=0.001
Please upload the program using VBA or Matlab
w a stress of o; = 55 x 103 psi, when M = 5 lb-in and d = 0.1 in. 2.8. The angular position of the output link (04) of a four-bar linkage corresponding to any specified angular position of the input link (02) can be computed using the Freudenstein's equation [2.6] kı...
Consider the linear system 11 0.5.01 21 + 12 0.5.22 + 13 0.25.13 13 0.2 -1.425 2 whose solution is (0.9,-0.8, 0.7). (b) Approximate the solution of the system by performing two iterations of the Gauss-Seidel algorithm, using (10) (0) = (0,0,0)' as the initial guess. (c) Approximate the solution of the system using one iteration of the SOR scheme, with w = 0.7 and (5) x() = (0,0,0)