AP Calculus - PowerPoint PPT Presentation

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AP Calculus

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To approximate area, we use rectangles. More rectangles means more accuracy. Area ... Regardless of the number of rectangles or types of inputs used, the method is ... – PowerPoint PPT presentation

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Title: AP Calculus


1
AP Calculus
  • Area

2
Area of a Plane Region
  • Calculus was built around two problems
  • Tangent line
  • Area

3
Area
  • To approximate area, we use rectangles
  • More rectangles means more accuracy

4
Area
  • Can over approximate with an upper sum
  • Or under approximate with a lower sum

5
Area
  • Variables include
  • Number of rectangles used
  • Endpoints used

6
Area
  • Regardless of the number of rectangles or types
    of inputs used, the method is basically the same.
  • Multiply width times height and add.

7
Upper and Lower Sums
  • An upper sum is defined as the area of
    circumscribed rectangles
  • A lower sum is defined as the area of inscribed
    rectangles
  • The actual area under a curve is always between
    these two sums or equal to one or both of them.

8
Area Approximation
  • We wish to approximate the area under a curve f
    from a to b.
  • We begin by subdividing the interval a, b into
    n subintervals.
  • Each subinterval is of width .

9
Area Approximation
10
Area Approximation
  • We wish to approximate the area under a curve f
    from a to b.
  • We begin by subdividing the interval a, b into
    n
  • subintervals of width .

Minimum value of f in the ith subinterval
Maximum value of f in the ith subinterval
11
Area Approximation
12
Area Approximation
  • So the width of each rectangle is

13
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14
Area Approximation
  • So the width of each rectangle is
  • The height of each rectangle is either

or
15
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16
Area Approximation
  • So the width of each rectangle is
  • The height of each rectangle is either

or
  • So the upper and lower sums can be defined as

Lower sum Upper sum
17
Area Approximation
  • It is important to note that
  • Neither approximation will give you the actual
    area
  • Either approximation can be found to such a
    degree that it is accurate enough by taking the
    limit as n goes to infinity
  • In other words
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