Problem Solving (Open Method): Solve the following problem using Newton Rhapson Method and ModifiedSecant Method. Using the format below for your answer tabulation for Newton Rhapson and Modified Secantrespectively: 1. Employ the Newton-Raphson method to determine a real root for f(x) = -2 +6x – 4x^2 + 0.5x^3, using an initial guess of (a) 4.5, (b) 4.43 B. Problem Solving (Open Method): Solve the following problem using Newton Rhapson Method and ModifiedSecant Method. Using the format below for your answer tabulation for Newton Rhapson and Modified Secantrespectively:nXif(x)f(x)EaEtXi+1Xif(x)X+oX;f(x++õx)EaEtXi+1n1. Employ the Newton-Raphson method to determine a real root for f(x) = -2 +6x – 4x? + 0.5x', using an initialguess of (a) 4.5, (b) 4.43

Let fx=-2+6x-4x2+0.5x3. Its derivative is f'x=6-8x+1.5x2. Newton Raphson's method is given by…

Answered: Problem Solving (Open Method): Solve…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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A graphing calculator is recommended. Use Newton's method to find all solutions of the equation correct to eight decimal places. Start by drawing a graph to find initial approximations. (Enter your answers as a comma-separated list.) -3x7 – 4x4 + 8x3 + 5 = 0 -1.40995018, – 0.79414103, 1.19601186 X =
PLEASE ANSWER NUMBER 1. MATH 221 USE 4 DECIMAL PLACES : PLEASE GIVE DETAILED SOLUTIONS AND CORRECT ANSWERS. I WILL REPORT TO BARTLEBY THOSE TUTORS WHO WILL GIVE INCORRECT ANSWERS.
8) Use Newton's method to derive the ancient and long standing divide and average method for finding square roots by hand. It is also known as the Babylonian method. √r can be approximated by iterating X¡ +1² (x₁+1=1) using an initial guess x₁. Because √ is the positive solution to the equation x² - r = 0, derive the iterating formula above by simplifying the Newton's method formula using f(x)=x²-r. Note that since r is a constant, d/dx(r) = 0. 9) Use the divide and average method derived in Exercise 8 and modify your code from Exercise 5 (three times) to calculate the square roots of the following numbers to within 8 decimal places (a) r = 2 (b) r = 3 (c) r = 5 You do not need to include all of the code for these problems in the HW you turn in, as most of it will just be the same as number 5. However, write down the first 5 to 8 lines (depending on the language used) that define the function used, the initial guess, and the tolerance, along with the roots found in the end.

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