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Holt McDougal Algebra 2 4-4 Properties of Logarithms Warm Up 2. (3 –2 )(3 5 ) 1. (2 6 )(2 8 ) 3. 4. 5. (7 3 ) 5 Simplify. Write in exponential form. 6.

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Presentation on theme: "Holt McDougal Algebra 2 4-4 Properties of Logarithms Warm Up 2. (3 –2 )(3 5 ) 1. (2 6 )(2 8 ) 3. 4. 5. (7 3 ) 5 Simplify. Write in exponential form. 6."— Presentation transcript:

1 Holt McDougal Algebra 2 4-4 Properties of Logarithms Warm Up 2. (3 –2 )(3 5 ) 1. (2 6 )(2 8 ) 3. 4. 5. (7 3 ) 5 Simplify. Write in exponential form. 6. log x x = 1 7. 0 = log x 1

2 Holt McDougal Algebra 2 4-4 Properties of Logarithms Use properties to simplify logarithmic expressions. Translate between logarithms in any base. Objectives

3 Holt McDougal Algebra 2 4-4 Properties of Logarithms The logarithmic function for pH that you saw in the previous lessons, pH =–log[H + ], can also be expressed in exponential form, as 10 – pH = [H + ]. Because logarithms are exponents, you can derive the properties of logarithms from the properties of exponents

4 Holt McDougal Algebra 2 4-4 Properties of Logarithms Remember that to multiply powers with the same base, you add exponents.

5 Holt McDougal Algebra 2 4-4 Properties of Logarithms The property in the previous slide can be used in reverse to write a sum of logarithms (exponents) as a single logarithm, which can often be simplified. Think: log j + log a + log m = log j a m Helpful Hint

6 Holt McDougal Algebra 2 4-4 Properties of Logarithms Express as a single logarithm. Simplify, if possible. log 5 625 + log 5 25 Check It Out! Example 1a

7 Holt McDougal Algebra 2 4-4 Properties of Logarithms Express as a single logarithm. Simplify, if possible. Check It Out! Example 1b log 27 + log 1 3 1 3 1 9

8 Holt McDougal Algebra 2 4-4 Properties of Logarithms Remember that to divide powers with the same base, you subtract exponents Because logarithms are exponents, subtracting logarithms with the same base is the same as finding the logarithms of the quotient with that base.

9 Holt McDougal Algebra 2 4-4 Properties of Logarithms The property above can also be used in reverse. Just as a 5 b 3 cannot be simplified, logarithms must have the same base to be simplified. Caution

10 Holt McDougal Algebra 2 4-4 Properties of Logarithms Express log 7 49 – log 7 7 as a single logarithm. Simplify, if possible. log 7 49 – log 7 7 Check It Out! Example 2

11 Holt McDougal Algebra 2 4-4 Properties of Logarithms Because you can multiply logarithms, you can also take powers of logarithms.

12 Holt McDougal Algebra 2 4-4 Properties of Logarithms Express as a product. Simplify, if possibly. a. log10 4 b. log 5 25 2 Check It Out! Example 3

13 Holt McDougal Algebra 2 4-4 Properties of Logarithms Express as a product. Simplify, if possibly. c. log 2 ( ) 5 1 2 Check It Out! Example 3

14 Holt McDougal Algebra 2 4-4 Properties of Logarithms Exponential and logarithmic operations undo each other since they are inverse operations.

15 Holt McDougal Algebra 2 4-4 Properties of Logarithms b. Simplify 2 log 2 (8x) a. Simplify log10 0.9 Check It Out! Example 4

16 Holt McDougal Algebra 2 4-4 Properties of Logarithms Most calculators calculate logarithms only in base 10 or base e (see Lesson 7-6). You can change a logarithm in one base to a logarithm in another base with the following formula.

17 Holt McDougal Algebra 2 4-4 Properties of Logarithms Evaluate log 9 27. Method 1 Change to base 10. log 9 27 = Check It Out! Example 5a

18 Holt McDougal Algebra 2 4-4 Properties of Logarithms Evaluate log 9 27. Method 2 Change to base 3, because both 27 and 9 are powers of 3. Check It Out! Example 5a Continued

19 Holt McDougal Algebra 2 4-4 Properties of Logarithms Evaluate log 8 16. Method 1 Change to base 10. Check It Out! Example 5b

20 Holt McDougal Algebra 2 4-4 Properties of Logarithms Evaluate log 8 16. Method 2 Change to base 4, because both 16 and 8 are powers of 2. Check It Out! Example 5b Continued

21 Holt McDougal Algebra 2 4-4 Properties of Logarithms Logarithmic scales are useful for measuring quantities that have a very wide range of values, such as the intensity (loudness) of a sound or the energy released by an earthquake. The Richter scale is logarithmic, so an increase of 1 corresponds to a release of 10 times as much energy. Helpful Hint

22 Holt McDougal Algebra 2 4-4 Properties of Logarithms How many times as much energy is released by an earthquake with magnitude of 9.2 by an earthquake with a magnitude of 8? Check It Out! Example 6

23 Holt McDougal Algebra 2 4-4 Properties of Logarithms Check It Out! Example 6 Continued


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