1. Splash Screen

2. Lesson Menu Five-Minute Check (over Lesson 8–2) Then/Now New Vocabulary Key Concept: Logarithm with Base b Example 1: Logarithmic to Exponential Form Example 2: Exponential to Logarithmic Form Example 3: Evaluate Logarithmic Expressions Key Concept: Parent Function of Logarithmic Functions Example 4: Graph Logarithmic Functions Key Concept: Transformations of Logarithmic Functions Example 5: Graph Logarithmic Functions Example 6: Real-World Example: Find Inverses of Exponential Functions

3. Over Lesson 8–2 A.A B.B C.C D.D 5-Minute Check 1 Solve 4 2x = 16 3x – 1. A.x = –1 B.x = C.x = 1 D.x = 2 __ 1 2

4. Over Lesson 8–2 A.A B.B C.C D.D 5-Minute Check 2 A.x = 10 B.x = 8 C.x = 6 D.x = 4 Solve 8 x – 1 = 2 x + 9.

5. Over Lesson 8–2 A.A B.B C.C D.D 5-Minute Check 3 A.x < 6 B.x < 5 C.x < 4 D.x > 3 Solve 5 2x – 7 < 125.

6. Over Lesson 8–2 A.A B.B C.C D.D 5-Minute Check 4 A.x ≥ 2 B.x ≥ 1 C.x > 0 D.x ≥ –2 Solve

7. Over Lesson 8–2 A.A B.B C.C D.D 5-Minute Check 5 A.$18,360.00 B.$15,613.98 C.$15,180.00 D.$14,544.00 A money market account pays 5.3% interest compounded quarterly. What will be the balance in the account after 5 years if $12,000 is invested?

8. Over Lesson 8–2 A.A B.B C.C D.D 5-Minute Check 6 A.$146,250 B.$271,250 C.$389,625.25 D.$393,891.35 Charlie borrowed $125,000 for his small business at a rate of 3.9% compounded annually for 30 years. At the end of the loan, how much will he have actually paid for the loan?

9. Then/Now You found the inverse of a function. (Lesson 7–2) Evaluate logarithmic expressions. Graph logarithmic functions.

10. Vocabulary logarithm logarithmic function

11. Concept

12. Example 1 Logarithmic to Exponential Form A. Write log 3 9 = 2 in exponential form. Answer: 9 = 3 2 log 3 9 = 2 → 9 = 3 2

13. Example 1 Logarithmic to Exponential Form Answer: B. Write in exponential form.

14. A.A B.B C.C D.D Example 1 A.8 3 = 2 B.2 3 = 8 C.3 2 = 8 D.2 8 = 3 A. What is log 2 8 = 3 written in exponential form?

15. A.A B.B C.C D.D Example 1 B. What is –2 written in exponential form? A. B. C. D.

16. Example 2 Exponential to Logarithmic Form A. Write 5 3 = 125 in logarithmic form. Answer: log 5 125 = 3 5 3 = 125 → log 5 125 = 3

17. Example 2 Exponential to Logarithmic Form B. Write in logarithmic form. Answer:

18. A.A B.B C.C D.D Example 2 A.log 3 81 = 4 B.log 4 81 = 3 C.log 81 3 = 4 D.log 3 4 = 81 A. What is 3 4 = 81 written in logarithmic form?

19. A.A B.B C.C D.D Example 2 B. What is written in logarithmic form? A. B. C. D.

20. Example 3 Evaluate Logarithmic Expressions Evaluate log 3 243. log 3 243= yLet the logarithm equal y. 243= 3 y Definition of logarithm 3 5 = 3 y 243 = 3 5 5= yProperty of Equality for Exponential Functions Answer: So, log 3 243 = 5.

21. A.A B.B C.C D.D Example 3 Evaluate log 10 1000. A. B.3 C.30 D.10,000

22. Concept

23. Example 4 Graph Logarithmic Functions A. Graph the function f(x) = log 3 x. Step 1Identify the base. b = 3 Step 2Determine points on the graph. Step 3Plot the points and sketch the graph. Because 3 > 1, use the points (1, 0), and (b, 1).

24. Example 4 Graph Logarithmic Functions (1, 0) (b, 1) → (3, 1) Answer:

25. Example 4 Graph Logarithmic Functions Step 1Identify the base. B. Graph the function Step 2Determine points on the graph.

26. Example 4 Graph Logarithmic Functions Step 3Sketch the graph. Answer:

27. A.A B.B C.C D.D Example 4 A. Graph the function f(x) = log 5 x. A. B. C.D.

28. A.A B.B C.C D.D Example 4 B. Graph the function. A. B. C.D.

29. Concept

30. Example 5 Graph Logarithmic Functions This represents a transformation of the graph f(x) = log 6 x. ● : The graph is compressed vertically. ● h = 0: There is no horizontal shift. ● k = –1: The graph is translated 1 unit down.

31. Example 5 Graph Logarithmic Functions Answer:

32. Example 5 Graph Logarithmic Functions ● |a| = 4: The graph expands vertically. ● h = –2: The graph is translated 2 units to the left. ● k = 0: There is no vertical shift.

33. Example 5 Graph Logarithmic Functions Answer:

34. A.A B.B C.C D.D Example 5 A. B. C.D.

35. A.A B.B C.C D.D Example 5 A. B. C.D.

36. Example 6 Find Inverses of Exponential Functions A. AIR PRESSURE At Earth’s surface, the air pressure is defined as 1 atmosphere. Pressure decreases by about 20% for each mile of altitude. Atmospheric pressure can be modeled by P = 0.8 x, where x measures altitude in miles. Find the atmospheric pressure in atmospheres at an altitude of 8 miles. P= 0.8 x Original equation = 0.8 8 Substitute 8 for x. = 0.168Use a calculator. Answer: 0.168 atmosphere

37. Example 6 Find Inverses of Exponential Functions B. AIR PRESSURE At Earth’s surface, the air pressure is defined as 1 atmosphere. Pressure decreases by about 20% for each mile of altitude. Atmospheric pressure can be modeled by P = 0.8 x, where x measures altitude in miles. Write an equation for the inverse of the function. P= 0.8 x Original equation x= 0.8 P Replace x with P, replace P with x, and solve for P. P= log 0.8 xDefinition of logarithm Answer: P = log 0.8 x

38. A.A B.B C.C D.D Example 6 A.42 B.41 C.40 D.39 A. AIR PRESSURE The air pressure of a car tire is 44 lbs/in 2. The pressure decreases gradually by about 1% for each trip of 50 miles driven. The air pressure can be modeled by P = 44(0.99 x ), where x measures the number of 50-mile trips. Find the air pressure in pounds per square inch after driving 350 miles.

39. A.A B.B C.C D.D Example 6 B. AIR PRESSURE The air pressure of a car tire is 44 lbs/in 2. The pressure decreases gradually by about 1% for each trip of 50 miles driven. The air pressure can be modeled by P = 44(0.99 x ), where x measures the number of 50-mile trips. Write an equation for the inverse of the function. A.P = 44 log 0.99 x B.P = log 0.99 x C. D.

40. End of the Lesson