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Get Full Access to Numerical Analysis - 10 Edition - Chapter 1.1 - Problem 14
Get Full Access to Numerical Analysis - 10 Edition - Chapter 1.1 - Problem 14

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# Let fix) 2x cos(2x) (x 2)2 and xy = 0. a. Find the third Taylor polynomial #3(x) and use ISBN: 9781305253667 457

## Solution for problem 14 Chapter 1.1

Numerical Analysis | 10th Edition

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Problem 14

Let fix) 2x cos(2x) (x 2)2 and xy = 0. a. Find the third Taylor polynomial #3(x) and use itto approximate /(0.4).b. Use the error formula in Taylor's Theorem to find an upper bound forthe error |/(0.4) P3(0.4)|. Compute the actual error. c. Find the fourth Taylor polynomial P^x) and use it to approximate /(0.4). d. Use the error formula in Taylor's Theorem to find an upper bound forthe error | /(0.4) ^4(0.4)|. Compute the actual error

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L21 - 8 ex. The demand function for a certain product is given by the equation x p+24p =2 0,hedmand x is measured in hundreds of units. At what rate is the demand for the product changing when the current weekly demand is 400 units and the price is decreasing at the rate of 25 cents weekly

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##### ISBN: 9781305253667

This full solution covers the following key subjects: . This expansive textbook survival guide covers 76 chapters, and 1204 solutions. Since the solution to 14 from 1.1 chapter was answered, more than 250 students have viewed the full step-by-step answer. This textbook survival guide was created for the textbook: Numerical Analysis, edition: 10. The full step-by-step solution to problem: 14 from chapter: 1.1 was answered by , our top Math solution expert on 03/16/18, 03:24PM. Numerical Analysis was written by and is associated to the ISBN: 9781305253667. The answer to “Let fix) 2x cos(2x) (x 2)2 and xy = 0. a. Find the third Taylor polynomial #3(x) and use itto approximate /(0.4).b. Use the error formula in Taylor's Theorem to find an upper bound forthe error |/(0.4) P3(0.4)|. Compute the actual error. c. Find the fourth Taylor polynomial P^x) and use it to approximate /(0.4). d. Use the error formula in Taylor's Theorem to find an upper bound forthe error | /(0.4) ^4(0.4)|. Compute the actual error” is broken down into a number of easy to follow steps, and 77 words.

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