Part II: Problem Solving. Solve the following:1. Consider the linear systema.b.7x + 7 x 2 = 1Solve the system of linear equations using Jacobi method with L' norm with Tol = 0.001. Showthe complete solution for the first 2 iterations. Show your complete table of iterations using the format below.kX1X2Δ.xSolve the system of linear equations using Gauss-Seidel method with L² norm with Tol = 0.001.Show the complete solution for the first 2 iterations. Show your complete table of iterations using the formatin 1.a.

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Answered: Part II: Problem Solving. Solve the…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Use Gauss-Seidel Method
Use Relaxation method to obtain the solution of the following system of linear equation 4 DECIMAL PLACES CORRESPONDING TABLE
please comple solution!
Q.2) Given the system of equations, use Gauss elimination to solve for the x's. (25 Points) - 3x2 + 7x3 = 2 X1 + 2x2 – x3 = 3 5х — 2х2 — 2
Consider the system 3x + 7y + 13z = 76 x + 5y + 3z = 28 12x + 3y - 5z = 1 1. Use any direct method you know to solve for x,y and z. 2. For the Iterative methods, you may use Excel d. Apply the principle of diagonal dominance and solve the system again. Use Gauss-Jacobi with an error tolerance of 0.0001% Answer: Iteration x €₁₁% y €a₂% Z €a₂% 1 2 S 4 Write your observations from the results
A=2.8
Q3. Solve the following linear system by Gauss elimination. Show the intermediate steps. 6x2 + 13x3 = 137.86 6x1 8xз — 85.88 13х1 — 8x. = 178.54
Please solve the last two parts
4. Solve the system of equations by Jacobi's iteration method, do 4 iterations. (Assume Po=0) 10a - 2b - c - d 3 - 2a + 10b - c -d = 15 a -b+ 10c - 2d = 27 -a -b- 2c + 10d = -9
2. Solve the linear system of equations (any method) for I1, 12, E3: I1 + 12 + I3 2x1 + 12 4x1 + 12 I3 2
Solve the system of linear equations by iteration method (4 iteration). x - 4 y +7 z = 10 5x - 4 y + z = 0 - 4x + 6 y - 4 z = 5 1. X= * X= 1/5(3y-2z) X= 1/5(3y-z) X= 1/5(4y-z) 2. y= * y= 1/6(5+4x-4z) y= 1/6(3y-z) y= 1/5(4y-z) 3. Z= * O z= 1/7(10-x-4y) Z= 1/6(3y-x) Z= 1/5(4y-4x) 4. When first iteration * O X= 0, Y=0.833, Z=1.905 X= 0, Y=1.833, Z=1.905 X= 0, Y=0.833 ,Z=3.905 5. When third iteration * X= 1.295 , Y=0.833, Z=3.241 X= 0, Y=1.833 ,Z=1.905 X= 1.295 , Y=3.495, Z=3.241 O O O O O O O O O
3. Solve the system of linear equations, using the Gauss-Jordan elimination method. Show all steps and indicate all row operations using correct notation as shown in the lecture. State the general solution using the parameter t. Then give two particular solutions, one where t = -1 and one where t = 1. X-Z=-2 2x-y=0 3x-y-z=-2

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