Essential Question: What are the properties of logarithms?
Name
Class
Date
16.1 Properties of Logarithms
Essential Question: What are the properties of logarithms?
Explore 1 Investigating the Properties of Logarithms
You can use a scientific calculator to evaluate a logarithmic expression.
A Evaluate the expressions in each set using a scientific calculator.
Set A
Set B
log_ 1e0 ln10 loge 1 0 log10e
_ lo1ge 1 + loge 1 - loge 10loge
Resource Locker
B Match the expressions in Set A to the equivalent expressions in Set B.
log_ 1e0= ln10 = loge 10 =
log10e =
Reflect
1. How can you check the results of evaluating the logarithmic expressions in Set A? Use this method to check each.
? Houghton Mifflin Harcourt Publishing Company
Module 16
783
Lesson 1
2. Discussion How do you know that loge and ln10 are reciprocals? Given that the expressions are reciprocals, show another way to represent each expression.
Explore 2 Proving the Properties of Logarithms
A logarithm is the exponent to which a base must be raised in order to obtain a given number. So logb bm= m. It follows that log b b0 = 0, so logb 1 = 0. Also, logb b1 = 1, so logb b = 1. Additional properties of logarithms are the Product Property of Logarithms, the Quotient Property of Logarithms, the Power Property of Logarithms, and the Change of Base Property of Logarithms.
Properties of Logarithms
For any positive numbers a, m, n, b (b 1), and c ( c 1), the following properties hold.
Definition-Based Properties
logb bm= mlogb 1 = 0logb b = 1
Product Property of Logarithms Quotient Property of Logarithms Power Property of Logarithms Change of Base Property of Logarithms
logb mn = logb m + logb n logb _ mn= logb m - logb n
logbmn = nlogb m logc a = _ llooggbb ac
Given positive numbers m, n, and b ( b 1), prove the Product Property of Logarithms.
A Let x = logb m and y = logb n. Rewrite the expressions in exponential form.
m = n =
B Substitute for m and n.
( logb mn = logb
)
C Use the Product of Powers Property of Exponents to simplify.
logb ( bx by )= logb b
D Use the definition of a logarithm logb bm= m to simplify further.
logb bx + y=
E Substitute for x and y.
x + y =
Module 16
784
Lesson 1
? Houghton Mifflin Harcourt Publishing Company
Reflect
3. Prove the Power Property of Logarithms. Justify each step of your proof.
Explain 1 Using the Properties of Logarithms
Logarithmic expressions can be rewritten using one or more of the properties of logarithms.
Example 1 Express each expression as a single logarithm. Simplify if possible. Then check your results by converting to exponential form and evaluating.
A log3 27 - log3 81
( ) log3
27
-
log3
81
=
log 3
_ 27 81
( ) =
log3
_ 1 3
= log3 3?1
= -1log3 3
= -1
Check:
( ) log3
_ 1 3
= -1
_ 1 3
=
3 -1
_ 1 3
=
_ 1 3
Quotient Property of Logarithms
Simplify. Write using base 3. Power Property of Logarithms Simplify.
? Houghton Mifflin Harcourt Publishing Company
Module 16
785
Lesson 1
B ( ) log5 _ 215 + log5 625
( ) ( log5 _ 215 + log5 625 = log5 _ 215
= log5
)625
= log5
=
log55
=
Check: log5 25 =
25 = 5 25 =
Property of Logarithms Simplify. Write using base 5. Power Property of Logarithms Simplify
Your Turn
Express each expression as a single logarithm. Simplify if possible.
4. log4 643
5. log8 18 - log8 2
? Houghton Mifflin Harcourt Publishing Company
Explain 2 Rewriting a Logarithmic Model
There are standard formulas that involve logarithms, such as the formula for measuring the loudness of sounds.
( ) The loudness of a sound L( I),
in watts per square meter and
in decibels, is given I0is the intensity of
by the function L( I) = 10log _II_0 , where a barely audible sound. It's also possible
I is the sound's intensity to develop logarithmic
models from exponential growth or decay models of the form f( t)= a( 1 + r)tor f( t)= a( 1 - r)tby finding the
inverse.
Module 16
786
Lesson 1
Example 2 Solve the problems using logarithmic models.
A During a concert, an orchestra plays a piece of music in which its volume
increases from one measure to the next, tripling the sound's intensity. Find how many decibels the loudness of the sound increases between the two measures.
Let I be the intensity in the first measure. So 3I is the intensity in the second measure.
? Houghton Mifflin Harcourt Publishing Company ? Image Credits: ?Ocean/ Corbis
Increase in loudness = L(3I) - L(I)
( ) ( ) =
10 log
_3I I 0
-
10 log
_ I I 0
( ( ) ( )) =
10
log
_3I I 0
- log
_ I I 0
( ( ) ( )) =
10
log3
+
log
_ I I 0
- log
_ I I 0
= 10 log3
4.77
So the loudness of sound increases by about 4.77 decibels.
Write the expression. Substitute.
Distributive Property
Product Property of Logarithms Simplify. Evaluate the logarithm.
B The population of the United States in 2012 was 313.9 million. If the population increases
exponentially at an average rate of 1% each year, how long will it take for the population to double?
The exponential growth model is P = P0(1+ r)t, where P is the population in millions after t years, P0 is the population in 2012, and r is the average growth rate.
P 0 = 313.9 P = 2P0 = r = 0.01
Find the inverse model of P = P0(1 + r)t.
P = P0(1 + r)t
_ P P 0
=
(1
+
r) t
( ) log1 + r
_ P P 0
= log
(1 + r)t
Exponential model Divide both sides by P0. Take the log of both sides.
Module 16
787
Lesson 1
................
................
In order to avoid copyright disputes, this page is only a partial summary.
To fulfill the demand for quickly locating and searching documents.
It is intelligent file search solution for home and business.
Related download
- section 4 4 logarithmic properties opentextbookstore
- meaning of logarithms kuta software
- exponent and logarithm practice problems for precalculus and calculus
- properties of logarithms
- evaluating logarithms kuta software
- in this section we will be working with properties of logarithms in an
- logarithms expand condense properties equations the q
- doc 07 03 17 15 16 02
- worksheet logarithmic function department of mathematics
- properties of logarithms fayetteville state university
Related searches
- what are the characteristics of living things
- what are the benefits of credit
- what are the characteristics of living thi
- what are the benefits of homework
- what are the types of personalities
- what are the goals of public education
- what are the benefits of strategic management
- what are the concepts of culture
- what are the benefits of marriage
- what are the purposes of citations
- what are the roles of the president
- what are the powers of the president