Exponential Functions - PowerPoint PPT Presentation

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Exponential Functions

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Title: Exponential Functions


1
Exponential Functions
2
  • A function that can be expressed in the form
  • and is positive,
    is called an Exponential Function.

3
Vocabulary Asymptote
  • Exponential functions have a graph characteristic
    called an asymptote.
  • An asymptote is an imaginary line the graphs
    infinite behavior approaches.

4
  • Exponential Function
  • Graph Characteristics
  • The parent exponential function has a y-intercept
    at (0,1).
  • The parent exponential function has an asymptote
    at y 0.
  • The value of b determines the steepness of the
    curve.
  • There are no local extrema.

5
More Characteristics of
  • The domain is
  • The range is
  • End Behavior
  • As
  • As
  • The y-intercept is
  • The horizontal asymptote is
  • There is no x-intercept.
  • There are no vertical asymptotes.
  • This is a continuous function.
  • It is concave up.

6
  • How would you graph

Domain Range Y-intercept
Horizontal Asymptote
Inc/dec?
increasing
Concavity?
up
  • How would you graph

Domain Range Y-intercept
Horizontal Asymptote
Inc/dec?
increasing
up
Concavity?
7
  • How would you graph

Is this graph increasing or decreasing?
Decreasing.
  • Notice that the reflection is decreasing, so the
    end behavior is

8
How do a and b affect the function?
  • 4 typse of graphs
  • a and bgt1, then f is an exponential growth
  • -a and b gt1, then f is reflected down
  • 3) a and 0ltblt1, then f is an exponential decay
  • 4) a and 0ltblt1, then f is reflected down

9
Transformations
  • Exponential graphs, like other functions we have
    studied, can be dilated,
  • reflected and translated.
  • It is important to maintain the same base as you
    analyze the transformations.

Reflect _at_ x-axis Vertical stretch 3 Vertical
shift down 1
Vertical shift up 3
10
More Transformations
Reflect about the x-axis.
Vertical shrink ½ .
Horizontal shift left 2.
Horizontal shift right 1.
Vertical shift up 1.
Vertical shift down 3.
Domain
Domain
Range
Range
Horizontal Asymptote
Horizontal Asymptote
Y-intercept
Y-intercept
Inc/dec?
Inc/dec?
decreasing
increasing
Concavity?
Concavity?
down
up
11
More Transformations
  • In general, transformations of the exponential
    parent function
  • involve some combination of the following
    formula

12
The number e
  • The number e has the value 2.71828 and possesses
    special calculus properties that simplify many
    calculations and is also called the natural base
    of exponential functions.
  • The function is called the Natural
    Exponential Function

13
Domain Range Y-intercept H.A.
Continuous Increasing No vertical asymptotes
and
14
Transformations
Vertical stretch 3.
Horizontal shift left 2.
Reflect _at_ x-axis.
Vertical shift up 2
Vertical shift up 2.
Vertical shift down 1.
Domain Range Y-intercept H.A.
Domain Range Y-intercept H.A.
Domain Range Y-intercept H.A.
Inc/dec?
increasing
Inc/dec?
increasing
Inc/dec?
decreasing
Concavity?
up
Concavity?
up
Concavity?
down
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