Chapter 10.4, Problem 53E

There are different ways to approximate a function f by polynomials. If, for example, f(a), f′(a), and fʺ(a) are known, then we can construct the second-degree Taylor polynomial p₂(x) at a for f(x); p₂(x) and f(x) will have the same value at a and the same first and second derivatives at a. If on the other hand, f(x₁), f(x₂), and f(x₃) are known, then we can compute the quadratic regression polynomial q₂(x) for the points (x₁, f(x₁)), (x₂, f(x₂)), (x₃, f(x₃)); q₂(x) and f(x) will have the same values at x₁, x₂, x₃. Problems 53 and 54 concern these contrasting methods of approximation by polynomials.

53. (A)    Find the second-degree Taylor polynomial p₂(x) at 0 for f(x) = e^x, and use a graphing calculator to compute the quadratic regression polynomial q₂(x) for the points (–0.1, e^–01), (0. e⁰), and (0.1. e^0.1).

(B)    Use graphical approximation techniques to Find the maximum error for –0.1 ≤ x ≤ 0.1 in approximating f(x) = e^x by p₂(x) and by q₂(x).

(C)    Which polynomial, p₂(x) or q₂(x), gives the better approximation to

${\displaystyle {\int }_{-0.1}^{0.1}{e}^{x}dx?}$