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Math 71B 9.3 – Logarithmic Functions 1. One-to-one functions have inverses. Let’s define the inverse of the exponential function. 2.

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Presentation on theme: "Math 71B 9.3 – Logarithmic Functions 1. One-to-one functions have inverses. Let’s define the inverse of the exponential function. 2."— Presentation transcript:

1 Math 71B 9.3 – Logarithmic Functions 1

2 One-to-one functions have inverses. Let’s define the inverse of the exponential function. 2

3 3 Logarithmic Function

4 4 logarithmic function

5 5

6 Ex 1. Write each equation in the other form. 6 Exponential FormLogarithmic Form

7 Ex 1. Write each equation in the other form. 7 Exponential FormLogarithmic Form

8 Ex 1. Write each equation in the other form. 8 Exponential FormLogarithmic Form

9 Ex 1. Write each equation in the other form. 9 Exponential FormLogarithmic Form

10 Ex 1. Write each equation in the other form. 10 Exponential FormLogarithmic Form

11 11

12 12

13 13 1

14 14 10

15 15 10

16 16 10

17 17

18 18

19 19

20 20 Graph of Logarithmic Function

21 21 Graph of Logarithmic Function

22 22 Graph of Logarithmic Function

23 23 Graph of Logarithmic Function

24 24 Graph of Logarithmic Function

25 25 Graph of Logarithmic Function

26 26 Graph of Logarithmic Function What is the vertical asymptote? _________ What is the domain? _________ What is the range? _________

27 27 Graph of Logarithmic Function What is the vertical asymptote? _________ What is the domain? _________ What is the range? _________

28 28 Graph of Logarithmic Function What is the vertical asymptote? _________ What is the domain? _________ What is the range? _________

29 29 Graph of Logarithmic Function What is the vertical asymptote? _________ What is the domain? _________ What is the range? _________

30 30

31 31

32 32

33 33

34 34

35 35

36 36

37 37

38 38

39 39 common

40 40 common natural

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