Problem 1 Construction Functions Numerical Solvers Numerical Computations Trapezoidal Midp Q43883821
Please help me with this matlab problem. Thank you.
Problem 1: Construction of functions (numerical solvers) for numerical computations The trapezoidal or midpoint rule is often used to approximate the integral of a given function since it is the average of the left and right Riemann sums and generally provides a more accurate solution. The algorithm for the trapezoidal rule is given as follows: [f(x) + f(xk+1)] a) Based on what is learned in class about the left-Riemann sum and right-Riemann sum algorithms, create a user-defined MATLAB function that performs numerical integration using the trapezoidal rule. The numerical solver should have the following input/output structure: function I = trapf(fun, a, b,N) b) Using the trapf function created in part (a), evaluate the integral of the curve f(x) = -2×3 + 6×2 + 3 over the interval [0,3] using 10 subintervals. Calculate the percent error by using the results from the built-in function integral. c) Repeat part (b) with 5 subintervals and 20 subintervals. What can you conclude about the correlation between the number of subintervals and the relative percent error? Show transcribed image text Problem 1: Construction of functions (numerical solvers) for numerical computations The trapezoidal or midpoint rule is often used to approximate the integral of a given function since it is the average of the left and right Riemann sums and generally provides a more accurate solution. The algorithm for the trapezoidal rule is given as follows: [f(x) + f(xk+1)] a) Based on what is learned in class about the left-Riemann sum and right-Riemann sum algorithms, create a user-defined MATLAB function that performs numerical integration using the trapezoidal rule. The numerical solver should have the following input/output structure: function I = trapf(fun, a, b,N) b) Using the trapf function created in part (a), evaluate the integral of the curve f(x) = -2×3 + 6×2 + 3 over the interval [0,3] using 10 subintervals. Calculate the percent error by using the results from the built-in function integral. c) Repeat part (b) with 5 subintervals and 20 subintervals. What can you conclude about the correlation between the number of subintervals and the relative percent error?
Expert Answer
Answer to Problem 1: Construction of functions (numerical solvers) for numerical computations The trapezoidal or midpoint rule is …
OR