Section 1 - Radford
Section 1.4: Exponential and Logarithmic Functions
In this section, we review the basics of exponential and logarithmic functions. We first give a brief review of the laws of exponents.
Properties of Exponents
Let a > 0 and b > 0. Then the following properties hold
1. [pic] 5. [pic]
2. [pic] 6. [pic]
3. [pic] 7. [pic]
4. [pic]
Example 1: Use the properties of exponents to simplify the following expressions.
a. [pic]
b. [pic]
c. [pic]
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Fractional Exponents
Recall that [pic] and [pic].
Note: [pic]
Example 2: Simplify the following.
a. [pic]
b. [pic]
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Exponential Functions
The exponential function with base a is denoted by
[pic]
where a > 0, [pic], and x is any real number.
Graphs of Exponential Functions
Example 3: Graph [pic] and [pic].
Solution:
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Example 4: Graph [pic] and [pic].
Solution: Using the following point plot tables, we produce the graphs to the right.
|x |[pic] |
|-2 |[pic] |
|-1 |[pic] |
|0 |[pic] |
|1 |[pic] |
| 2 |[pic] |
|x |[pic] |
|-2 |[pic] |
|-1 |[pic] |
|0 |[pic] |
|1 |[pic] |
|2 |[pic] |
[pic]
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In general,
[pic]
[pic]
The Number e
The number e is an irrational number approximated by
[pic]
The function [pic] is called the exponential function of base e.
Example 5: Determine the number e, [pic], and [pic] on a calculator.
Solution:
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Example 6: Graph [pic] and [pic] on the same graph.
Solution: The following displays the graphs of these two functions on the same graph:
[pic]
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Solving Exponential Equations with Like Bases
Uses fact that if
[pic], then [pic].
Example 7: Solve [pic] for x.
Solution:
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Example 8: Solve [pic] for x.
Solution: If we note that [pic], then the [pic] becomes [pic]. Since the bases are the same (the base e) on both sides of the equation, we can equate the exponents and solve for x. That is,
[pic]
[pic]
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Natural Logarithm Function
Given by
[pic]
Note: [pic] means [pic].
Example 9: Write the equation [pic] as an exponential equation.
Solution: Using the fact that [pic] means [pic], we convert as follows:
[pic]
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Example 10: Write the equation [pic] as an logarithmic equation.
Solution:
█
Calculating The Natural Logarithm on a Calculator
Example 11: Determine [pic], [pic], [pic], and [pic] on a calculator.
Solution:
Properties of Natural Logarithms
1. [pic]
2. [pic]
3. [pic] if x > 1.
4. [pic] if 0 < x < 1.
5. [pic] is undefined if [pic].
6. [pic] (Inverse Properties)
Example 12: Apply the inverse properties of [pic] and [pic] to simplify [pic]and [pic].
Solution:
█
Additional Logarithmic Properties – Natural Logarithm of a product, Quotient, and Exponent Laws
7. [pic]
8. [pic]
9. [pic]
Example 13: Use the properties of logarithms to simplify [pic].
Solution: On this, we perform the following steps:
[pic]
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Example 14: Use the properties of logarithms to expand the expression [pic].
Solution:
█
Example 15: Write the expression[pic] as the logarithm of a single quantity.
Solution:
█
Graph of the Natural Logarithm Function
Example 16: Graph [pic]
Solution:
█
Solving Equations with Natural Logarithms
Idea is to isolate the natural logarithm by itself on one side of the equation and use the definition of the natural logarithm to convert to an exponential equation.
Example 15: Solve [pic] for x.
Solution: We solve this equation using the following steps:
[pic]
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Solving Exponential Equations with Unlike Bases using Logarithms
Steps
1. Isolate the exponential term by itself on one side of the equation.
2. Take the natural logarithm of both sides and use the property of logarithms [pic]
to simplify.
3. Solve the resulting equation for x.
Example 17: Solve [pic] for x.
Solution:
█
Example 18: Solve [pic] for x.
Solution: Before taking the natural logarithm of both sides, the exponential e needs to be isolated on one side of the equation. We solve using the following steps:
[pic]
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