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The logarithmic expression is read
the logarithm of with baseHere, the base is clearly written in the expression. There are two cases in which the base does not need to be written, which will be discussed in this lesson.
Catch-Up and Review
Here are a few recommended readings before getting started with this lesson.
Explore
Mathematical Operations
The root of a real number expresses another real number that, when multiplied by itself times, will result in Aside from the radical symbol, the notation is made up of the radicand and the index
However, in the case of a square root, the index can be omitted. Therefore, if in the root there is no index written, it is implied that the index is
Something similar happens with the exponent of a number. An exponent is a number or expression written above a number, indicating that it is being multiplied by itself. The notation is made up of a base — the number being multiplied — and an exponent, which gives the number of times the base appears in the multiplication.
The resulting number is commonly called a power. In this example, the base is multiplied by itself times.
However, if the exponent of a number or expression is it does not need to be written.
In the case of logarithms, there are two bases that do not need to be written. Take a look at a calculator and try to identify them. 
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Discussion
Common Logarithm
A common logarithm is a logarithm of base For example, is called the common logarithm of
It is equal to because is
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Since common logarithms are used so often, the base does not need to be written.
In the identity above, is a positive number. Recalling the definition of a logarithm, the common logarithm of can be defined for positive values of
Common logarithms can be evaluated using a calculator. For example, to evaluate push enter and then hit
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The common logarithm of is about
Pop Quiz
Evaluating Common Logarithms
Use a calculator to evaluate the common logarithms. Round the answer to two decimal places.
Example
Earthquakes and Logarithms
A well-known logarithmic scale that is used to express the amount of energy released by an earthquake is the Richter scale. 
On this scale, each integer number increase indicates an intensity ten times stronger than the previous whole number. For example, an earthquake of magnitude on the Richter scale is times stronger than an earthquake of magnitude An earthquake of magnitude is or times stronger than an earthquake of magnitude The intensity of an earthquake is determined by a seismograph.
In the city of San Francisco was jolted by an earthquake of magnitude on the Richter scale. In nearly years prior, the city had suffered a more powerful earthquake that is estimated to have measured magnitude on the same scale. Vincenzo wants to know how many times more intense the earthquake was than to the earthquake.
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Hint
Substitute and for and respectively, in the given formula. Then, use the definition of a common logarithm.
Solution
To calculate how many times more intense the earthquake was compared to the one in the value of needs to be found. To do so, and can be substituted for and respectively, in the given formula.
This equation can be rewritten by following the definition of a common logarithm.
Finally, use a calculator to evaluate
The earthquake was about times more intense than the earthquake.
Example
Using the Properties of Common Logarithms
After studying the relationship between earthquakes and logarithms, Vincenzo became more interested in this fascinating math topic.
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Hint
Use the properties of logarithms and the definition of a common logarithm.
Solution
First, simplify the expressions on the left. They can then be paired with their corresponding expressions on the right.
Expression
To simplify this expression, the Quotient Property of Logarithms and the definition of a common logarithm will be used. The expression should be paired withExpression
To simplify this expression, the Power Property of Logarithms, the Product Property of Logarithms, and the definition of a common logarithm will be used. The expression should be paired withExpression
To simplify the third expression, the Product Property of Logarithms, the Quotient Property of Logarithms, a logarithm identity, and the definition of a common logarithm will be used. The expression should be paired withExpression
To simplify the second to last expression, the Quotient Property of Logarithms, the Power Property of Logarithms, and the definition of a common logarithm will be used. The expression should be paired withExpression
Finally, to simplify the last expression, the Product Property of Logarithms and the Power Property of Logarithms will be used. The expression should be paired withExplore
Calculating the Value of an Expression for Bigger Values of
Consider the following algebraic expression.
This expression can be evaluated for different values of Pay close attention to the value of the expression as increases.
What conclusion can be made?
Discussion
The Natural Base
Logarithms and exponents are closely related. This part of the lesson will explore a particular type of exponential expression. Recall the formula for compound interest.
Here, is the interest rate in decimal form. If the interest rate is which is extremely profitable, the value of equals
The number is the amount of times the interest is compounded each year. This is how often the accrued interest is added to the balance. The more often the interest is compounded, the higher the profit will be each year. What happens as increases? To examine this, the formula will be rewritten using the the Power of a Power Property.
In the revised formula, the expression in the outer parentheses is a constant that depends only on To analyze what happens as increases, larger and larger values will be substituted into this expression.
As the values of increase higher and higher, the expression seems to approach a value of about In fact, as goes to infinity, the value of the expression approaches a constant that is called the natural base, or
Euler's number appears in several areas of mathematics and has multiple uses. For example, it is often used as the base of exponential and logarithmic functions.
Concept
The Number
The number — commonly called the natural base — is an irrational mathematical constant named by the mathematician Leonhard Euler.
Discussion
The Natural Logarithm
A natural logarithm is a logarithm with base .
Although it is correct to write the natural logarithm is more commonly written as
This means that equals the exponent to which must be raised to equal
Natural logarithms can be evaluated using a calculator. For example, to evaluate push input and then hit
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Pop Quiz
Evaluating Natural Logarithms
Use a calculator to evaluate the natural logarithms. Round the answer to two decimal places.
Example
Using the Properties of Natural Logarithms
Vincenzo already knows how to use the properties of logarithms when dealing with common logarithms. Now he wants to use the properties when natural logarithms are involved.
To do so, Vincenzo asked his math teacher for some extra practice. She asked him to identify the only expression that is not equivalent to the others. Help him do this!
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Hint
Simplify all the expressions using the properties of logarithms.
Solution
Simplify the expressions so that the expression that is not equivalent with the others can be easily identified.
Expression
To simplify this expression, the Product Property of Logarithms, the Quotient Property of Logarithms, and the Power Property of Logarithms will be used. The expression is equivalent toExpression
To simplify the second expression, the Product Property of Logarithms, the Power Property of Logarithms, and the definition of a natural logarithm will be used. The expression is also equivalent toExpression
To simplify the third expression, the Quotient Property of Logarithms and the definition of a natural logarithm will be used. The expression is also equivalent toExpression
To simplify the second to last expression, the Product Property of Logarithms and the Quotient Property of Logarithms will be used. The expression is equivalent to Therefore, this expression is not equivalent to the previous expressions.Expression
The last expression will be simplified by using the Power Property of Logarithms and the Product Property of Logarithms. The last expression, is also equivalent to Therefore, the expression that is not equivalent to the others is the fourth expression.Discussion
Change of Base Formula
Most calculators only calculate common and natural logarithms. These are logarithms with base or Luckily, there is a formula that allows any logarithm to be written in terms of common or natural logarithms.
Rule
Change of Base Formula
A logarithm of arbitrary base can be rewritten as the quotient of two logarithms with the same base by using the change of base formula.
This rule is valid for positive values of and where and are different than
Proof
Let Therefore, by the definition of a logarithm, it is known that
By the Reflexive Property of Equality, is equal to itself.
RearrangeEqn
Rearrange equation
\(\log_c a=\dfrac{\log_b a}{\log_b c}\ {\color{#009600}{\bm{\Large{\checkmark }}}}\)
Note that this formula is helpful to calculate any logarithm using a calculator, since the new base can be any positive number different than This means that the new base can be or
Example
Using the Change of Base Formula
Vincenzo has discovered that he can use the Change of Base Formula to calculate the value of any logarithm.
Help him answer the following questions!
a Use common logarithms and a calculator to find the value of Round the answer to two decimal places.
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b Use natural logarithms and a calculator to find the value of Round the answer to two decimal places.
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Hint
a By the Change of Base Formula,
b By the Change of Base Formula,
Solution
a Recall the Change of Base Formula.
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Therefore, the value of rounded to the nearest hundredth is
b Once again, recall the Change of Base Formula, this time with natural logarithms.
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Therefore, the value of rounded to the nearest hundredth is
Closure
Leonhard Euler and His Contributions
In this lesson, the Swiss mathematician Leonhard Euler was mentioned. Euler was also a physicist, astronomer, geographer, logician, and engineer. During his life, Euler came up with principles that set the foundations for most of the mathematics used nowadays. He was a revolutionary thinker in the fields of geometry, calculus, trigonometry, differential equations, and number theory.
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