Section 4.5: Indeterminate Forms and? L - PowerPoint PPT Presentation

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Section 4.5: Indeterminate Forms and? L

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Title: Section 2.2: The Limit of a Function Author: ITR Last modified by: ITR Created Date: 9/18/2005 4:14:20 PM Document presentation format: On-screen Show – PowerPoint PPT presentation

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Title: Section 4.5: Indeterminate Forms and? L


1
Section 4.5 Indeterminate Forms and?
LHospitals Rule
  • Practice HW from Stewart Textbook
  • (not to hand in)
  • p. 303 5-39 odd

2
  • In this section, we want to be able to calculate
    limits
  • that give us indeterminate forms such as and
    .
  • In Section 2.5, we learned techniques for
    evaluating
  • these types of limit which we review in the
    following
  • examples.

3
  • Example 1 Evaluate
  • Solution

4
  • Example 2 Evaluate
  • Solution

5
  • However, the techniques of Examples 1 and 2 do
    not
  • work well if we evaluate a limit such as
  • For limits of this type, LHopitals rule is
    useful.

6
LHopitals Rule
  • Let f and g be differentiable functions where
  • near x a (except possible at x a). If
  • produces the indeterminate forms , ,
    or , ,
  • then
  • provided the limit exists.

7
  • Note LHopitals rule, along as the required
  • indeterminate form is produced, can be applied as
  • many times as necessary to find the limit.

8
  • Example 3 Use LHopitals rule to evaluate
  • Solution

9
  • Example 4 Use LHopitals rule to evaluate
  • Solution

10
  • Example 5 Evaluate
  • Solution

11
  • Note! We cannot apply LHopitals rule if the
    limit
  • does not produce an indeterminant form ,
    , ,
  • or .

12
  • Example 6 Evaluate
  • Solution

13
  • Helpful Fact An expression of the form ,
    where
  • , is infinite, that is, evaluates
    to or .

14
  • Example 7 Evaluate .
  • Solution In typewritten notes

15
Other Types of Indeterminant Forms
  • Note For some functions where the limit does not
  • initially appear to as an indeterminant , ,
    , or
  • . It may be possible to use algebraic
    techniques to
  • convert the function one of the indeterminants
    ,
  • , , or before using LHopitals
    rule.

16
Indeterminant Products
  • Given the product of two functions , an
  • indeterminant of the type or
    results
  • (this is not necessarily zero!). To solve this
    problem,
  • either write the product as or
    and evaluate
  • the limit.

17
  • Example 8 Evaluate
  • Solution

18
  • Example 9 Evaluate
  • Solution In typewritten notes

19
Indeterminate Differences
  • Get an indeterminate of the form
    (this is not
  • necessarily zero!). Usually, it is best to find a
    common
  • factor or find a common denominator to convert it
    into
  • a form where LHopitals rule can be used.

20
  • Example 10 Evaluate
  • Solution

21

22
Indeterminate Powers
  • Result in indeterminate , , or
    . The natural
  • logarithm is a useful too to write a limit of
    this type in
  • a form that LHopitals rule can be used.

23
  • Example 11 Evaluate
  • Solution (In typewritten notes)
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