Hand calculations please !Homework Answers
Solution:
f1=y-c=0→(1)
f2=9y2-4b+36=0→(2)
Here total variable is 3(b,c,y), but total equation is 2, so
solution is not possible
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Hand calculations please !
Given the two non-linear equations: fi(x, y) = y - x and...
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MATLAB please Simulink Use Newton-Raphson Method & to solve the following Non-linear equations b) x3_3u²-2011 Sina-820...
MATLAB please
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Given the non-homogeneous linear system of differential equations Xi' = -2x1 – 7x2 + 3t xz' = -X1 + 4x2 + e-6 a. Find its homogeneous solution using the eigenvalue-eigenvector approach b. Use the variation-of-parameters method to find its particular solution
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1. This question concerns finding the roots of the scalar non-linear function f(x) = r2-1-sinx (1 mark) (b) Apply two iterations of the bisection method to f(x) 0 to find the positive root. (3 marks) (c) Apply two iterations of the Newton-Raphson method to find the positive root. Choose (3 marks) (d) Use the Newton-Raphson method and Matlab to find the positive root to 15 significant (3 marks) (a) Use Matlab to obtain a graph of the function that shows...
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MATLAB please
Simulink Use Newton-Raphson Method & to solve the following Non-linear equations b) x3_3u²-2011 Sina-820 3 2 = x² + ax²+batc Q=1, b=5, C=6
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Q2. Determine the positive roots of...
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Given the non-homogeneous linear system of differential equations Xi' = -2x1 – 7x2 + 3t xz' = -X1 + 4x2 + e-6 a. Find its homogeneous solution using the eigenvalue-eigenvector approach b. Use the variation-of-parameters method to find its particular solution
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Problem Two: (Based on Chapra, Problems 12.9 Consider the simultaneous nonlinear equations: 2-5-y y+i- 1. Plot the equations and identify the solution graphically. Page 1 of 2 2. Solve the system of equations using successive substitution, starting with the initial guess xo-y-1.5. Show two complete iterations. Evaluate &s for the second iteration. 3. Redo Part 2 using Newton-Raphson method . Automate the solutions in Parts 2 and 3 using MATLAB scripts 5. Solve the system of nonlinear equations by calling...
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