Properties of Logarithms
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- Reginald Wilson
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1 Warm Up Simplify. 1. (2 6 )(2 8 ) (3 2 )(3 5 ) (7 3 ) Write in exponential form. 6. log x x = 1 x 1 = x 7. 0 = log x 1 x 0 = 1
2 Objectives Use properties to simplify logarithmic expressions. Translate between logarithms in any base.
3 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 Remember that to multiply powers with the same base, you add exponents.
5 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. Helpful Hint Think: log j + log a + log m = log jam
6 Express log log 6 9 as a single logarithm. Simplify. log log 6 9 Example 1: Adding Logarithms log 6 (4 9) log 6 36 To add the logarithms, multiply the numbers. Simplify. 2 Think: 6? = 36.
7 Check It Out! Example 1a Express as a single logarithm. Simplify, if possible. log log 5 25 log 5 (625 25) log 5 15,625 To add the logarithms, multiply the numbers. Simplify. 6 Think: 5? = 15625
8 Check It Out! Example 1b Express as a single logarithm. Simplify, if possible. log log log (27 ) 1 3 log To add the logarithms, multiply the numbers. Simplify. 1 Think: 1 3? = 3
9 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.
10 The property above can also be used in reverse. Caution Just as a 5 b 3 cannot be simplified, logarithms must have the same base to be simplified.
11 Example 2: Subtracting Logarithms Express log log 5 4 as a single logarithm. Simplify, if possible. log log 5 4 log 5 (100 4) log 5 25 To subtract the logarithms, divide the numbers. Simplify. 2 Think: 5? = 25.
12 Check It Out! Example 2 Express log 7 49 log 7 7 as a single logarithm. Simplify, if possible. log 7 49 log 7 7 log 7 (49 7) log 7 7 To subtract the logarithms, divide the numbers Simplify. 1 Think: 7? = 7.
13 Because you can multiply logarithms, you can also take powers of logarithms.
14 Example 3: Simplifying Logarithms with Exponents Express as a product. Simplify, if possible. A. log B. log log log 8 4 6(5) = 30 Because 2 5 = 32, log 2 32 = ( ) = Because = 4, 2 log 8 4 =. 3
15 Check It Out! Example 3 Express as a product. Simplify, if possibly. a. log10 4 b. log log10 2log (1) = 4 Because 10 1 = 10, log 10 = 1. 2(2) = 4 Because 5 2 = 25, log 5 25 = 2.
16 Check It Out! Example 3 Express as a product. Simplify, if possibly. 1 2 c. log 2 ( ) 5 1 5log 2 ( 2 ) 5( 1) = 5 Because = 2, 1 log 2 = 1. 2
17 Exponential and logarithmic operations undo each other since they are inverse operations.
18 Example 4: Recognizing Inverses Simplify each expression. a. log b. log 3 81 c. 5 log 510 log log log log
19 Check It Out! Example 4 a. Simplify log b. Simplify 2 log (8x) 2 log log 2 (8x) 0.9 8x
20 Most calculators calculate logarithms only in base 10. You can change a logarithm in one base to a logarithm in another base with the following formula.
21 Example 5: Changing the Base of a Logarithm Evaluate log Method 1 Change to base 10 log 32 8 = log 8 Log Use a calculator. 0.6 Divide.
22 Evaluate log Example 5 Continued Method 2 Change to base 2, because both 32 and 8 are powers of 2. log 32 8 = log 2 8 log 2 32 = 3 5 = 0.6
23 Check It Out! Example 5a Evaluate log Method 1 Change to base 10. log 9 27 = log27 log Use a calculator. 1.5 Divide.
24 Check It Out! Example 5a Continued Evaluate log Method 2 Change to base 3, because both 27 and 9 are powers of 3. log 9 27 = log 3 27 log 3 9 = 3 2 = 1.5
25 Check It Out! Example 5b Evaluate log Method 1 Change to base 10. Log 8 16 = log16 log Use a calculator. 1.3 Divide.
26 Check It Out! Example 5b Continued Evaluate log Method 2 Change to base 4, because both 16 and 8 are powers of 2. log 8 16 = log 4 16 log 4 8 = = 1.3
27 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. Helpful Hint The Richter scale is logarithmic, so an increase of 1 corresponds to a release of 10 times as much energy.
28 Example 6: Geology Application The tsunami that devastated parts of Asia in December 2004 was spawned by an earthquake with magnitude 9.3 How many times as much energy did this earthquake release compared to the 6.9-magnitude earthquake that struck San Francisco in1989? The Richter magnitude of an earthquake, M, is related to the energy released in ergs E given by the formula. Substitute 9.3 for M.
29 Example 6 Continued 3 Multiply both sides by. 2 E = log Simplify. Apply the Quotient Property of Logarithms. Apply the Inverse Properties of Logarithms & Exponents. Given the definition of a logarithm, the logarithm is the exponent. Use a calculator to evaluate. The magnitude of the tsunami in Asia was ergs.
30 Example 6: Geology Application The tsunami that devastated parts of Asia in December 2004 was spawned by an earthquake with magnitude 9.3 How many times as much energy did this earthquake release compared to the 6.9-magnitude earthquake that struck San Francisco in1989?
31 Repeat process using the data from San Francisco. Substitute 6.9 for M. 3 Multiply both sides by. 2 Simplify. Apply the Quotient Property of Logarithms. Apply the Inverse Properties of Logarithms & Exponents. Given the definition of a logarithm, the logarithm is the exponent. Use a calculator to evaluate.
32 Put it all together The magnitude of the tsunami in Asia was ergs. The magnitude of the San Francisco earthquake was ergs. Therefore, the tsunami released = 4000 times as much energy as the earthquake in San Francisco.
33 Check It Out! Example 6 How many times as much energy is released by an earthquake with magnitude of 9.2 by an earthquake with a magnitude of 8? Substitute 9.2 for M. 3 Multiply both sides by 2. Simplify.
34 Check It Out! Example 6 Continued Apply the Quotient Property of Logarithms. Apply the Inverse Properties of Logarithms and Exponents. Given the definition of a logarithm, the logarithm is the exponent. Use a calculator to evaluate. The magnitude of the earthquake is ergs.
35 Check It Out! Example 6 Continued Substitute 8.0 for M. 3 Multiply both sides by 2. Simplify.
36 Check It Out! Example 6 Continued Apply the Quotient Property of Logarithms. Apply the Inverse Properties of Logarithms and Exponents. Given the definition of a logarithm, the logarithm is the exponent. Use a calculator to evaluate.
37 The magnitude of the second earthquake was ergs. Therefore, Check It Out! Example 6 Continued The magnitude of the first earthquake is ergs. the earthquake with a magnitude 9.2 released was times greater.
38 Lesson Quiz: Part I Express each as a single logarithm. 1. log log 6 24 log = 3 2. log log 3 4 log 3 27 = 3 Simplify. 3. log ,000 30, log 4 4 x 1 x log log
39 Lesson Quiz: Part II Use a calculator to find each logarithm to the nearest thousandth. 7. log log How many times as much energy is released by a magnitude-8.5 earthquake as a magntitude- 6.5 earthquake? 1000
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