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2.1 Rates of Change and Limits

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2.1 Rates of Change and Limits Average and Instantaneous Speed A moving body s average speed during an interval of time is found by dividing the distance covered by ... – PowerPoint PPT presentation

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Title: 2.1 Rates of Change and Limits


1
2.1 Rates of Change and Limits
  • Average and Instantaneous Speed
  • A moving bodys average speed during an interval
    of time is found by dividing the distance covered
    by the elapsed time.
  • The unit of measure is length per unit time ex.
    Miles per hour, etc.

2
Finding an Average Speed
  • A rock breaks loose from the top of a tall cliff.
    What is its average speed during the first 2
    seconds of fall?
  • Experiments show that objects dropped from rest
    to free fall will fall y 16t² feet in the first
    t seconds.
  • For the first 2 seconds of, we change t 0 to t
    2.

3
Finding an Instantaneous Speed
  • Find the speed of the rock in example 1 at the
    instant t 2.
  • Since we cannot use h 0 because it will give us
    an undefined answer, evaluate the formula at
    values close to 0.
  • See the table 2.1 on p. 60 in your textbook.
  • Notice, the average speed approaches the limiting
    value of 64 ft/sec.

4
Average Speeds over Short Time Intervals Starting
at t 2
5
Finding an Instantaneous Speed
  • Confirm algebraically
  • So, we can see why the average speed has the
    limiting value of 64 16(0) 64 ft/sec as h
    approaches 0.

6
Limits
  • Most limits of interest in the real world can be
    viewed as numerical limits of values of
    functions.
  • A calculator can suggest the limits, and calculus
    can give the mathematics for confirming the
    limits analytically.

7
Properties of Limits
8
Properties of Limits
9
Using Properties of Limits
  • Use the observations and and
    the properties of limits to find the following
    limits.
  • a. b.

10
Polynomial and Rational Functions
11
Using Theorem 2
  • a.
  • b.

12
Using the Product Rule
  • Determine

13
Exploring a Nonexistent Limit
  • Use a graph to show that does not exist.
  • Notice that the denominatoris 0 when x is
    replaced by2, so we cannot usesubstitution.
  • The graph suggests that asx approaches 2 from
    eitherside, the absolute values getvery large.
    This suggests thatthe limit does not exist.

14
One-Sided and Two-Sided Limits
  • Limits can approach a function from opposite
    sides.
  • Right-hand limit limit approaches from the
    right side.
  • Left-hand limit limit approaches from the left
    side.

15
One-sided and Two-sided Limits
16
Exploring Right- and Left-Hand Limits
17
(No Transcript)
18
Sandwich Theorem
19
Using the Sandwich Theorem
  • Show that

20
Homework!!!!!
  • Textbook p. 66 67 1, 2, 5, 6, 7 14, 20 28
    even, 37, 40 44 even.
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