Question: Please solve in MatLab application. I need solutions/code that I can run in MatLab and get the output . URGENT. !!!please answer Problem set #

Please solve in MatLab application. I need solutions/code that I can run in MatLab and get the output . URGENT. !!!please answer

Problem set # 17 (7x, +x, - x,-2x, +2x, = 2 x, - 3x, +x, - x,-x, = 1 1. Solve the linear system using Gauss'method: (2x, + 5x, +2x, +x, +x, = 4 2. Solve the system in the domain D = {-1sxS 0,0 sys 1}using Newton's method (accurate to within = 10-5). %3D %3D ((x- 2)/2 + (y+ 1)? = 6 cos(x + 0.6) y? = 0.8 3. Soive the Cauchy problem xy"-xy'+y 8x', (1) = 3, y'(1) = 4 on the interval (1,3). Plot the graphs of y(x) and y'(r). 4. Using secant method find the smaliest positive number a such that fVax' +ldx = 2( absolute error e = 0.0001). 5. Solve the system using the method of simple iteration (initial approximation x = -25, x = 29, x, =-0.5, absolute error & = 0.001). (0) (0) %3D 5x, +5x, +0.5x, =18 5x, +5.5x, +1.5x, = 32 (0.5x, +1.5x, +50.5x, 7 %3D 6. Approximate the table using a suitable approximating function: 2.3 2.8 3.3 3.8 4.3 4.8 5.3 x, 5.8 2.12 3.01 3.46 3.43 3.03 2.43 1.62 1.89 7. Suppose that the function y = y(x) approximates the table in Problem 6. Find the derivative y'(x) of the function y = y(x) and determine the extrema of the function y'(x) (the problem can be solved in case your aim is to get grade 10"). Problem set # 17 (7x, +x, - x,-2x, +2x, = 2 x, - 3x, +x, - x,-x, = 1 1. Solve the linear system using Gauss'method: (2x, + 5x, +2x, +x, +x, = 4 2. Solve the system in the domain D = {-1sxS 0,0 sys 1}using Newton's method (accurate to within = 10-5). %3D %3D ((x- 2)/2 + (y+ 1)? = 6 cos(x + 0.6) y? = 0.8 3. Soive the Cauchy problem xy"-xy'+y 8x', (1) = 3, y'(1) = 4 on the interval (1,3). Plot the graphs of y(x) and y'(r). 4. Using secant method find the smaliest positive number a such that fVax' +ldx = 2( absolute error e = 0.0001). 5. Solve the system using the method of simple iteration (initial approximation x = -25, x = 29, x, =-0.5, absolute error & = 0.001). (0) (0) %3D 5x, +5x, +0.5x, =18 5x, +5.5x, +1.5x, = 32 (0.5x, +1.5x, +50.5x, 7 %3D 6. Approximate the table using a suitable approximating function: 2.3 2.8 3.3 3.8 4.3 4.8 5.3 x, 5.8 2.12 3.01 3.46 3.43 3.03 2.43 1.62 1.89 7. Suppose that the function y = y(x) approximates the table in Problem 6. Find the derivative y'(x) of the function y = y(x) and determine the extrema of the function y'(x) (the problem can be solved in case your aim is to get grade 10")

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