Presentation is loading. Please wait.

Presentation is loading. Please wait.

The Taylor Polynomial Remainder (aka: the Lagrange Error Bound)

Published byBuddy Logan Modified over 6 years ago

Similar presentations

Presentation on theme: "The Taylor Polynomial Remainder (aka: the Lagrange Error Bound)"— Presentation transcript:

1 The Taylor Polynomial Remainder (aka: the Lagrange Error Bound)

2 Taylor series are used to estimate the value of functions (at least theoretically - nowadays we can usually use the calculator or computer to calculate directly.) An estimate is only useful if we have an idea of how accurate the estimate is. When we use part of a Taylor series to estimate the value of a function, the end of the series that we do not use is called the remainder. If we know the size of the remainder, then we know how close our estimate is f(x) = Pn(x) + Rn(x)

3 Taylor’s Theorem with Remainder
If f has derivatives of all orders in an open interval I containing c, then for each positive integer n and for each x in I: Lagrange Form of the Remainder Remainder after partial sum Sn where z is between a and x.

4 This is also called the remainder of order n or
Lagrange Form of the Remainder Remainder after partial sum Sn where z is between c and x. This is also called the remainder of order n or the Lagrange error term. Note that this looks just like the next term in the series, but “a” has been replaced by the number “z” in This seems kind of vague, since we don’t know the value of z, but we can sometimes find a maximum value for

5 If M is the maximum value of on the interval between c and x, then:
Lagrange Form of the Remainder If M is the maximum value of on the interval between c and x, then: Taylor’s Inequality

6 Prove that , which is the Taylor series for sin x, converges for all real x.
ex.: Since the maximum value of sin x or any of it’s derivatives is 1, for all real x, M = 1. Taylor’s Inequality so the series converges.

7 Find the Lagrange Error Bound when is used to approximate and .
ex.: On the interval , decreases, so its maximum value occurs at the left end-point. Remainder after 2nd order term

8 Find the Lagrange Error Bound when is used to approximate and .
ex. : Taylor’s Inequality On the interval , decreases, so its maximum value occurs at the left end-point. error Error is less than error bound. Lagrange Error Bound

Download ppt "The Taylor Polynomial Remainder (aka: the Lagrange Error Bound)"

Similar presentations

Section 11.6 – Taylor’s Formula with Remainder

Section 11.6 – Taylor’s Formula with Remainder
Taylor’s Theorem Section 9.3a. While it is beautiful that certain functions can be represented exactly by infinite Taylor series, it is the inexact Taylor.

Taylor’s Theorem Section 9.3a. While it is beautiful that certain functions can be represented exactly by infinite Taylor series, it is the inexact Taylor.
Calculus I – Math 104 The end is near!. Series approximations for functions, integrals etc.. We've been associating series with functions and using them.

Calculus I – Math 104 The end is near!. Series approximations for functions, integrals etc.. We've been associating series with functions and using them.
9.7 Taylor Series. Brook Taylor 1685 - 1731 Taylor Series Brook Taylor was an accomplished musician and painter. He did research in a variety of areas,

9.7 Taylor Series. Brook Taylor Taylor Series Brook Taylor was an accomplished musician and painter. He did research in a variety of areas,
Copyright © Cengage Learning. All rights reserved.

Copyright © Cengage Learning. All rights reserved.
Infinite Sequences and Series

Infinite Sequences and Series
Part 3 Truncation Errors Second Term 05/06.

Part 3 Truncation Errors Second Term 05/06.
INFINITE SEQUENCES AND SERIES

INFINITE SEQUENCES AND SERIES
Part 3 Truncation Errors.

Part 3 Truncation Errors.
Calculus I – Math 104 The end is near!. 1. Limits: Series give a good idea of the behavior of functions in the neighborhood of 0: We know for other reasons.

Calculus I – Math 104 The end is near!. 1. Limits: Series give a good idea of the behavior of functions in the neighborhood of 0: We know for other reasons.
Taylor’s Polynomials & LaGrange Error Review

Taylor’s Polynomials & LaGrange Error Review
Consider the following: Now, use the reciprocal function and tangent line to get an approximation. Lecture 31 – Approximating Functions 1 12 3.

Consider the following: Now, use the reciprocal function and tangent line to get an approximation. Lecture 31 – Approximating Functions
9.3 Taylor’s Theorem: Error Analysis for Series

9.3 Taylor’s Theorem: Error Analysis for Series
Now that you’ve found a polynomial to approximate your function, how good is your polynomial? Find the 6 th degree Maclaurin polynomial for For what values.

Now that you’ve found a polynomial to approximate your function, how good is your polynomial? Find the 6 th degree Maclaurin polynomial for For what values.
9.7 and 9.10 Taylor Polynomials and Taylor Series.

9.7 and 9.10 Taylor Polynomials and Taylor Series.
Remainder Estimation Theorem

Remainder Estimation Theorem
Taylor’s Theorem: Error Analysis for Series. Taylor series are used to estimate the value of functions (at least theoretically - now days we can usually.

Taylor’s Theorem: Error Analysis for Series. Taylor series are used to estimate the value of functions (at least theoretically - now days we can usually.
The Convergence Problem Recall that the nth Taylor polynomial for a function f about x = x o has the property that its value and the values of its first.

The Convergence Problem Recall that the nth Taylor polynomial for a function f about x = x o has the property that its value and the values of its first.
9.3 Taylor’s Theorem: Error Analysis for Series

9.3 Taylor’s Theorem: Error Analysis for Series
Sect. 9-B LAGRANGE error or Remainder

Sect. 9-B LAGRANGE error or Remainder

Similar presentations

Ads by Google