[PDF] [PDF] a log10 100 b log25 5 - MiraCosta College

[PDF] Log10100 (I read this as the logarithm base 10 of 100) - GCC

argument For example: Log10100 asks the question 10 to what power equals 100? Log10100 = 2 because 102 = 100 For example: log28 asks the question 2  

[PDF] Logarithmic functions and the log laws - The University of Sydney

Without a calculator we can work out the logarithms of many numbers Examples: log10 100 = log10 102 = 2 log10 0 1 = log10 10 −1 = − 

[PDF] Logarithms

16 jan 2001 · log10 100 = log10 (102) = 2 log10 10 = 2 (e) 3 loga 4 + loga(1/4) − 4 loga 2 = loga (43) + loga(1/4) − loga (24) = loga (43 × 1 4 ) − loga (24) 

[PDF] a log10 100 b log25 5 - MiraCosta College

Example 2: Write each equation in its equivalent logarithmic form a 26 = x b b4 = 81 c 2y = 128 Example 3: Evaluate each of the following a log10 100

[PDF] What is a logarithm ?

log10 100 = 2 This is read as 'log to the base 10 of 100 is 2' These alternative forms are shown in Figure 1 log10 100 = 2 100 = 102 base index, or power

[PDF] LOGARITHMS

Therefore, log3 = log331/5 = 1/5 Problem 2 Write each of the following in logarithmic form a) bn = x logbx = n b) 23 = 8 log28 = 3 c) 102 = 100 log10100 = 2

[PDF] Solving equations involving logarithms and exponentials - Mathcentre

100 = 102 can be written as log10 100 = 2 Similarly, e3 = 20 086 can be written as loge 20 086 = 3 The third law of logarithms states that, for logarithms of any 

[PDF] 2 2 x 2 x 2 x 2 x 2 = 2 2 [Y ] 5 = 32 2 [ ^ ] 5 = 32 log10 100 log10 100

So the logarithmic expression above, log10 100, can actually be thought of as asking, “What exponent must we put on 10 in order for it to become 100?” The 

[PDF] CHAPTER 15 LOGARITHMS - Amazon S3

log 343 = 3 7 Evaluate: lg 100 lg 100 = log10100 Let x = log10100 then 2 10 100 10 x = = from which, x = 2 Hence, lg 100 = log10100 = 2 8 Evaluate: lg 0 01

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Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. 12.2 Logarithmic Functions The Definition of Logarithmic Functions For x > 0 and b > 0, b ≠ 1 y =

log b x is equivalent to b y =x . The function f(x) = log b x

is the logarithmic function with base b. Example 1: Write each equation in its equivalent exponential form.

a. 4=log 2 x b. -1=log 3 x c. log 2 8=y Example 2: Write each equation in its equivalent logarithmic form. a. 2 6 =x b. b 4 =81 c. 2 y =128 Example 3: Evaluate each of the following. a. log 10 100
b. log 25
5

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. c. log

5 1 5 d. log 2 1 16

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Basic Logarithmic Properties Logarithmic Properties Involving One 1.

log b b=1 because 1 is the exponent to which b must be raised to obtain b. ( b 1 =b ) 2. log b 1=0 because 0 is the exponent to which b must be raised to obtain 1. (b 0 =1) Inverse Properties of Logarithms For b > 0 and b ≠ 1, log b b x =x The logarithm with base b of b raised to a power equals that power. b log b x =x

b raised to the logarithm with base b of a number equals that number. Example 4: Evaluate each of the following.

a. log 8 8 b. log 1.5 1.5 c. log 8 1 d. log 1.7 1 e. log 8 8 5 f. log 5 5 2.3 g. 7 log 7 8.3

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Graphs of Logarithmic Functions The logarithmic function is the inverse of the exponential function with the same base. Thus the logarithmic function reverses the coordinates of the exponential function. The graph of the logarithmic function is the reflection of the exponential function about the line y=x. Characteristics of the Graphs of Logarithmic Functions of the Form

fx =log b x

. 1. The x-intercept is 1. There is no y-intercept. 2. The y-axis is a vertical asymptote. 3. If b > 1, the function is increasing. If 0 < b < 1, the function is decreasing. 4. The graph is smooth and continuous. It has no sharp corners or gaps. Example 5: Graph

fx =3 x and gx =log 3 x on the same coordinate system.

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Example 6: Graph

fx =log 1 2 x The Domain of a Logarithmic Function In the expression y= log b x

, x is the number produced when y is used as an exponent with base b, b > 0. Since b is always positive, x must also be positive. Thus the domain of the logarithmic function is x > 0, or all positive real numbers. In general: domain of

fx =log b x+c consists of all x for which x + c > 0. Example 7: Find the domain of the logarithmic function. fx =log 5 x-7

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Common Logarithms The logarithmic function with base 10 is called the common logarithmic function. The function

fx =log 10 x is usually expressed simply as fx =logx

. Most calculators have a "log" key that can be used to perform calculations with base-10 logarithms. Logarithmic functions may be used to model some growth functions that start with rapid growth and then level off. Example 8: The percentage of adult height attained by a girl who is x years old can be modeled by

fx =62+35log(x-4)

where x represents the girl's age (from 5 to 15) and f(x) represents the percentage of adult height. What percentage of adult height has a 10-year old girl attained?

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Natural Logarithms The logarithmic function with base e is called the natural logarithmic function. The function

fx =log e x is usually expressed simply as fx =lnx

. Most calculators have an "ln" key that can be used to perform calculations with base-e logarithms. Example 9: Find the domain of the function. a.

fx =lnx+3

Example 10: Simplify each expression.

a. lne b. lne 4 c. e ln7 d. lne 1.5x e. e ln3x

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Summary of Properties of Logarithms General Properties Common Logarithms Natural Logarithms 1.

log b 1=0 log1=0 ln1=0 2. log b b=1 log10=1 lne=1 3. log b b x =x log10 x =x lne x =x 4. b log b x =x 10 logx =x e lnx =x

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Answers Section 12.2 Example 1:

a. x=2 4 b. x=3 -1 c. 2 y =8

Example 2:

a. log 2 x=6 b. log b 81=4
c. log 2 128=y

Example 3:

a. log 10 100=2
b. log 25
5= 1 2 c. log 5 1 5 =-1 d. log 2 1 16 =-4 Example 4: a. 1 b. 1 c. 0 d. 0 e. 5 f. 2.3 g. 8.3 Example 5:

Note: Portions of this document are excerpted from the textbook Introductory and Intermediate Algebra for College Students by Robert Blitzer. Example 6: Example 7: {x| x > 7} Example 8: f(10) ≅ 89.23 A 10-yr old girl has attained about 89% of adult height. Example 9: {x| x > -3} Example 10: a. 1 b. 4 c. 7 d. 1.5x e. 3x

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