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Infinite Series

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I.e. the ratio between successive terms is a constant r. The nth partial sum can be ... Determine the divergence of Series using the nth-Term (Divergence) Test. ... – PowerPoint PPT presentation

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Title: Infinite Series


1
Lecture 3
  • Infinite Series

2
Lecture 3 Objectives
  • Find the partial sums of
  • Geometric Series
  • Telescoping Series
  • Determine the convergence (and find the sum) or
    divergence of
  • Geometric Series (or linear combinations of
    these)
  • Telescoping Series
  • Determine the divergence of Series using the
    nth-Term (Divergence) Test.

3
Example
  • Consider the following infinite series (sum) of
    real numbers
  • Question What is this infinite sum?
  • Answer 2
  • Reason The infinite sum is the limit of the
    (partial) sum of the first n terms as n ? ?.
  • Caution This series is not the same as the
    sequence

4
Picture
5
Calculation of Partial Sums
6
Notation
  • The infinite sum denotes the limit of partial
    sums. I.e.

Or using the Sigma notation
7
(No Transcript)
8
Geometric Series
  • This is a series of the form a ar ar2
    ar3
  • I.e. the ratio between successive terms is a
    constant r
  • The nth partial sum can be found to be
  • sn a ar ar2 arn?1
  • a(1 ? rn)/(1 ? r) (if r ? 1)
  • Note When r lt 1, rn ? 0, so sn ? a/(1 ? r)
  • When r 1, sn na, so sn ? ?? (if a ? 0)
  • Otherwise, rn diverges, so sn diverges.

9
Geometric Series
Thus,
10
Example For the geometric series
  • Find the nth partial sum.
  • Is this series convergent?
  • If yes, find its sum.

11
Example For the geometric series
  • Find the nth partial sum.
  • Is this series convergent?

12
Example Express the repeating decimal
911.911911as a ratio of two integers.
13
Rules for Convergent Series
Example Find the sum of the series
14
Example (Telescoping Series) For the series
  • Find the nth partial sum.
  • Is this series convergent?
  • If yes, find its sum.

15
Example (Telescoping Series) For the series
  • Find the nth partial sum.
  • Hint Use partial fraction decomposition.
  • Is this series convergent?
  • If yes, find its sum.

16
Example Check the divergence of the series 1
2 1 2 1 2 Or 1 ? 2 1 ? 2 1 ?
2
  • Note If the terms we keep adding do not become
    smaller and smaller in value, then the infinite
    sum must diverge.

17
In general
In other words
18
Example Show that the seriesis divergent.
19
Lecture 3 Objectives (revisited)
  • Find the partial sums of
  • Geometric Series
  • Telescoping Series
  • Determine the convergence (and find the sum) or
    divergence of
  • Geometric Series (or linear combinations of
    these)
  • Telescoping Series
  • Determine the divergence of Series using the
    nth-Term (Divergence) Test.

20
  • Thank you for listening.
  • Wafik
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