In this problem you will need to use complex number arithmetic. Assume that the equation f(x) = 0 has a unique solution in an interval [a, b], and that ƒ € C³[a, b]. (a) Let h> 0 be a small number. Using appropriate Taylor expansion show that f'(ro) = Im(f(xo +ih))/h+h²f"" (xo)/6+0(hª), (b) Where i is the imaginary unit such that i² = −1. Since f'(ro) Im(f(xo + ih))/h, consider the following modification of Newton's method with complex step.

Could you please do the Python coding with the correct indentations and answer for question 5a, 5b, 5c?  The questions are in the image. 

Transcribed Image Text:

5. In this problem you will need to use complex number arithmetic. Assume that the equation f(x) = 0 has a unique solution in an interval [a, b], and that fe C³ [a, b]. (a) Let h> 0 be a small number. Using appropriate Taylor expansion show that f'(ro) = Im(f(xo +ih))/h + h²f" (xo)/6+0(hª), (b) Where i is the imaginary unit such that i2= -1. Since f'(ro) Im(f(xo + ih))/h, consider the following modification of Newton's method with complex step. f(xk) Im(f(xk+ih)) Tk+1=kh- k = 0, 1, 2,... with given ro. Modify your code with Newton's method of problem 4 so as the default value of the derivative df to be the new approximation Im(f(ro+ih))/h. Assume that |æk+1=x*| kx|kx* |r where 2* is such that f(r*) = 0. This means that the convergence rate of the new method is r. Estimate the convergence rate r using the equation r(e/2 + 1) = 0 and ro = 2.5. Study the influence of the parameter h in the convergence rate. lim = C > 0,