17th Edition

ISBN: 9781938168062

Author: Gilbert Strang, Edwin Jed Herman

Publisher: OpenStax

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Chapter 6.3, Problem 5SP

In this project. we use the Macburin polynomials for e^xto prove that e is irrational. The proof relies on supposing that e is rational and arriving a a contradiction. Therefore, in the following steps, we suppose e = r/s for some integers r and s where s ≠ 0.

5. Use Taylor’s theorem to write down an explicit formula for R_n(1). Conclude that R_n(1) ? 0, and therefore. sn!R_n(l) ?0.

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Chapter 6.3, Problem 4SP

Chapter 6.3, Problem 6SP

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In this project, we use the Maclaurin polynomials for f(x) = e x to proved that e is irrational. The proof relies on supposing that e is rational and arriving at a contradiction. Therefore, in the following steps, we suppose e = r/s for some integers r and s where s 6= 0. The work needs to be typed up neatly and submitted via Canvas as either a Word document or as a PDF. If you want to include pictures of your work, make sure it is neat and legible. I would prefer you use the equation editor to try to make the work as neat as possible (1) Write the Maclaurin polynomials p0(x), p1(x), p2(x), p3(x), and p4(x) for e x . Evaluate p0(1), p1(1), p2(1), p3(1), and p4(1) to estimate e. (2) Let Rn(x) denote the remainder when using pn(x) to estimate e x . Therefore, Rn(x) = e x − pn(x) and, in particular, Rn(1) = e − pn(1). Assuming that e = r s for integers r and s 6= 0, evaluate R0(1), R1(1), R2(1), R3(1), and R4(1). (3) Using the results from (2), show that for each remainder R0(1), R1(1),…

find the first four nonzero terms of the Taylor se-ries generated by ƒ at x = ƒ(x) = 1/x at x =a>0

1. If f(x) is an nth-degree polynomial and Pn(x) is the nth Taylor polynomial for f at x 0, what is the nth remainder Rn(x)? What is Rn+1(x)? 2. What is Taylor’s Theorem?

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