BBy Bot
Nov 03'24

Exercise

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Let [math]p[/math] be a polynomial in [math]x[/math] of degree [math]\leq m[/math]; i.e., the function [math]p[/math] is defined by an equation

[[math]] p(x) = a_0 + a_1x + \cdots + a_mx^m , [[/math]]

and let [math]T_n[/math] be the Taylor polynomial which approximates [math]p[/math] near an arbitrary real number [math]a[/math]. Prove, as a simple consequence of Taylor's formula with the remainder, that [math]p(x) = T_n(x)[/math], for every real number [math]x[/math] provided [math]n \geq m[/math].