Explanation To construct interpolating polynomial of degree three, consider all the four nodal points are x 0 = 1.00 , x 1 = 1.05 , x 2 = 1.10 , x 3 = 1.15 . The polynomial will now be P 3 ( x ) = L 0 ( x ) y 0 + L 1 ( x ) y 1 + L 2 ( x ) y 2 + L 3 ( x ) y 3 here L 0 = ( x − x 1 ) ( x − x 2 ) ( x − x 3 ) ( x 0 − x 1 ) ( x 0 − x 2 ) ( x 0 − x 3 ) , L 1 = ( x − x 0 ) ( x − x 2 ) ( x − x 3 ) ( x 1 − x 0 ) ( x 1 − x 2 ) ( x 1 − x 3 ) , L 2 = ( x − x 0 ) ( x − x 1 ) ( x − x 3 ) ( x 2 − x 0 ) ( x 2 − x 2 ) ( x 2 − x 3 ) and L 3 = ( x − x 0 ) ( x − x 1 ) ( x − x 2 ) ( x 3 − x 0 ) ( x 3 − x 2 ) ( x 3 − x 2 ) . First, determine the coefficient of polynomials L 0 ( x ) , L 1 ( x ) , L 2 ( x ) and L 3 ( x ) is as follows: L 0 = x 3 − 3.3 x 2 + 3.6275 x − 1.32825 0.00075 L 1 = x 3 − 3.25 x 2 + 3.515 x − 1.265 0.00025 L 2 = − x 3 − 3.2 x 2 + 3.4075 x − 1.2075 0.00025 Similarly, finding the next coefficient as below: L 3 = x 3 − 3.15 x 2 + 3.305 x − 1.155 0.00075 Substitute the value of L 0 = x 3 − 3.3 x 2 + 3.6275 x − 1.32825 0.00075 , L 1 = x 3 − 3.25 x 2 + 3.515 x − 1.265 0.00025 , L 2 = − x 3 − 3.2 x 2 + 3.4075 x − 1

10th Edition

ISBN: 9781305253667

Author: Richard L. Burden, J. Douglas Faires, Annette M. Burden

Publisher: Cengage Learning

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Chapter 3.1, Problem 11ES

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Chapter 3 Solutions

Numerical Analysis

Ch. 3.1 - For the given functions f(x), let x0 = 0, x1 =...Ch. 3.1 - Use Theorem 3.3 to find an error bound for the...Ch. 3.1 - Prob. 4ES Ch. 3.1 - The data for Exercise 6 were generated using the...Ch. 3.1 - Prob. 9ES Ch. 3.1 - Prob. 10ES Ch. 3.1 - Prob. 11ES Ch. 3.1 - Prob. 12ES Ch. 3.1 - Prob. 15ES Ch. 3.1 - Prob. 17ES

Ch. 3.1 - It is suspected that the high amounts of tannin in...Ch. 3.1 - Prob. 21ES Ch. 3.1 - Prove Taylors Theorem 1.14 by following the...Ch. 3.1 - Prob. 1DQ Ch. 3.1 - If we decide to increase the degree of the...Ch. 3.2 - Let P3(x) be the interpolating polynomial for the...Ch. 3.2 - Nevilles method is used to approximate f(0.4),...Ch. 3.2 - Nevilles method is used to approximate f(0.5),...Ch. 3.2 - Suppose xj = j, for j = 0, 1, 2, 3, and it is...Ch. 3.2 - Nevilles Algorithm is used to approximate f(0)...Ch. 3.2 - Prob. 11ES Ch. 3.2 - Prob. 13ES Ch. 3.2 - Can Nevilles method be used to obtain the...Ch. 3.3 - Use Eq. (3.10) or Algorithm 3.2 to construct...Ch. 3.3 - Use Eq. (3.10) or Algorithm 3.2 to construct...Ch. 3.3 - Use the Newton forward-difference formula to...Ch. 3.3 - Use the Newton forward-difference formula to...Ch. 3.3 - Use the Newton backward-difference formula to...Ch. 3.3 - Use the Newton backward-difference formula to...Ch. 3.3 - a. Use Algorithm 3.2 to construct the...Ch. 3.3 - a. Use Algorithm 3.2 to construct the...Ch. 3.3 - a. Approximate f(0.05) using the following data...Ch. 3.3 - The following data are given for a polynomial P(x)...Ch. 3.3 - The following data are given for a polynomial P(x)...Ch. 3.3 - The Newton forward-difference formula is used to...Ch. 3.3 - Prob. 14ES Ch. 3.3 - Prob. 16ES Ch. 3.3 - Prob. 17ES Ch. 3.3 - Show that the polynomial interpolating the...Ch. 3.3 - Prob. 20ES Ch. 3.3 - Prob. 21ES Ch. 3.3 - Prob. 22ES Ch. 3.3 - Prob. 23ES Ch. 3.3 - Compare and contrast the various...Ch. 3.3 - Is it easier to add a new data pair using...Ch. 3.3 - Prob. 3DQ Ch. 3.4 - Use Theorem 3.9 or Algorithm 3.3 to construct an...Ch. 3.4 - Use Theorem 3.9 or Algorithm 3.3 to construct an...Ch. 3.4 - The data in Exercise 1 were generated using the...Ch. 3.4 - The data in Exercise 2 were generated using the...Ch. 3.4 - Let f (x) = 3xex e2x. a. Approximate f (1.03) by...Ch. 3.4 - The following table lists data for the function...Ch. 3.4 - a. Show that H2n + 1 (x) is the unique polynomial...Ch. 3.4 - Prob. 1DQ Ch. 3.4 - Prob. 2DQ Ch. 3.4 - Prob. 3DQ Ch. 3.5 - Determine the natural cubic spline S that...Ch. 3.5 - Determine the clamped cubic spline s that...Ch. 3.5 - Construct the natural cubic spline for the...Ch. 3.5 - Construct the natural cubic spline for the...Ch. 3.5 - The data in Exercise 3 were generated using the...Ch. 3.5 - Prob. 6ES Ch. 3.5 - Prob. 8ES Ch. 3.5 - Prob. 11ES Ch. 3.5 - Prob. 12ES Ch. 3.5 - Prob. 13ES Ch. 3.5 - Prob. 14ES Ch. 3.5 - Given the partition x0 = 0, x1 = 0.05, and x2 =...Ch. 3.5 - Prob. 16ES Ch. 3.5 - Prob. 21ES Ch. 3.5 - Prob. 22ES Ch. 3.5 - Prob. 23ES Ch. 3.5 - It is suspected that the high amounts of tannin in...Ch. 3.5 - Prob. 29ES Ch. 3.5 - Prob. 30ES Ch. 3.5 - Prob. 31ES Ch. 3.5 - Prob. 32ES Ch. 3.5 - Let f C2[a, b] and let the nodes a = x0 x1 xn...Ch. 3.5 - Prob. 34ES Ch. 3.5 - Prob. 35ES Ch. 3.6 - Let (x0, y0) = (0,0) and (x1, y1) = (5, 2) be the...Ch. 3.6 - Prob. 2ES Ch. 3.6 - Prob. 5ES Ch. 3.6 - Prob. 1DQ

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The bound for the error in the approximation.

Solution Summary: The author explains how to find the bound for the error in the approximation. To construct interpolating polynomial of degree three, consider all the four nodal points are x_0

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To find: The bound for the error in the approximation.

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Chapter 3 Solutions