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Math 101

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Properties of Logarithms. 1. ln(xy) = ln x ln y. 2. ln = ln x - ln y. 3. ln xn = n ln x ... Use the properties of logarithms to rewrite each expression as a ... – PowerPoint PPT presentation

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Title: Math 101


1
Math 101
  • Mathematics for Management Students

2
Exponential and Logarithmic Functions
  • Lectures15-16

3
Lecture 16
  • Logarithmic Functions

4
Logarithmic Functions
  • The Logarithm Function loga x is defined as
  • loga x y if and only if ay x.
  • a is called the base of the logarithm.

5
  • In calculus the most useful base for logarithms
    is the number e

6
The Natural Logarithm Function
  • The natural logarithm function, denoted by ln x,
    is defined as
  • ln x y if and only if ey x.
  • where ln x is loge x,
  • that is the base is e

7
The natural logarithmic function and the natural
exponential function are inverse functions
  • For Example
  • ln 1 0 and e0 1
  • ln e 1 and e1 e

8
The graph of y lnx
9
Inverse properties of Logarithms and Exponents
  • For Example,
  • ln e3 3
  • eln 5 5

10
Properties of Logarithms
  • 1. ln(xy) ln x ln y
  • 2. ln ln x - ln y
  • 3. ln xn n ln x

11
Example
  • Use the properties of logarithms to rewrite each
    expression as a sum, difference, or multiple of
    logarithms.

12
Solution
13
Example
  • Use the properties of logarithms to rewrite each
    expression as the logarithm of single quantity

14
Solution
15
Solving Exponential and Logarithmic Equations
  • Solve the following equations

16
Solving Exponential and Logarithmic Equations
  • Solution (a)
  • Moving 10 to the right side, we get,
  • e0.1x 14 - 10 4
  • Take ln for each side, we get
  • ln e0.1x ln 4
  • From the property ln ex x , we get ,
  • 0.1x ln 4
  • x ln 4 10 ln 4

17
Solving Exponential and Logarithmic Equations
  • Solution (b)
  • Moving 3 to the right side, we get
  • 2 ln x 4
  • ln x 2
  • Exponentiate each side, we get
  • eln x e2
  • x e2

18
Derivatives of Logarithmic Functions
19
Example
  • Find the derivative of

20
Solution
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