Question: (attention) use Matlab program 1.(30 pts) (Computer) On this work you will see the application of one of the techniques you have learned in this
(attention) use Matlab program
1.(30 pts) (Computer) On this work you will see the application of one of the techniques you have learned in this class, that is the Newton's method. This shows the importance of computational methods in research. Use Newton's method to solve the nonlinear equation {-+ + 30. w*) + (0-1o. - lovos - Bermur) --*=- for p Parameters are as fi = 0.4, M3 = 0.3, Q1 = 0.2, 03 = 1.5, 05 = 2, 0 = 30, and m=0.7 This is how you achieve this a) Use Newton's method to solve for p for each of f =0:0.1: 100 and plot. You should have a plot with f on horizontal axis and p on vertical axis. b) Repeat (a) for 11 = 4, 15, 25 and have three graphs together c) Repeat (a) for H3 = 2,5, 15 and have three graphs together d) Repeat (a) for m= 4, 15, 25 and have three graphs together Use at least 10-8 tolerance for Newton's method, that is when stop when two consecutive iterations are less than this tolerance. See figures 14-18 of the attached paper. For f when you have multiple values of p, you need to change the initial (starting) value in Newton's method. Try to get the clean plots. 1.(30 pts) (Computer) On this work you will see the application of one of the techniques you have learned in this class, that is the Newton's method. This shows the importance of computational methods in research. Use Newton's method to solve the nonlinear equation {-+ + 30. w*) + (0-1o. - lovos - Bermur) --*=- for p Parameters are as fi = 0.4, M3 = 0.3, Q1 = 0.2, 03 = 1.5, 05 = 2, 0 = 30, and m=0.7 This is how you achieve this a) Use Newton's method to solve for p for each of f =0:0.1: 100 and plot. You should have a plot with f on horizontal axis and p on vertical axis. b) Repeat (a) for 11 = 4, 15, 25 and have three graphs together c) Repeat (a) for H3 = 2,5, 15 and have three graphs together d) Repeat (a) for m= 4, 15, 25 and have three graphs together Use at least 10-8 tolerance for Newton's method, that is when stop when two consecutive iterations are less than this tolerance. See figures 14-18 of the attached paper. For f when you have multiple values of p, you need to change the initial (starting) value in Newton's method. Try to get the clean plots
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