29 videos in "Logarithms and Exponentials"
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Introduction to Logarithms
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Logarithms
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Logarithms - Change of Base Rule & Applications Part 1
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Logarithms - Change of Base Rule & Applications Part 2
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Logarithms featuring the TI-Nspire
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Exponential Functions 1
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Exponential Functions 2
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Exponential Functions 3
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Exponential Functions 4
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Logarithms 1
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Logarithms 2
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Logarithms 3
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Logarithms 4
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Logarithms 5
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Logarithms 6 - Quotient Property of Logs
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Logarithms 7 - Power Property of Logs
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Logarithms 8 - Properties of Logs
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Logarithms 9 - Properties of Logs
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Logarithms 10 - Properties of Logs
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Logarithms 11 - Common and Natural Log
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Logarithms 12 - Solve equations with log x and ln x
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Logarithms 13 - Compound Interest
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Logarithms 14 - Change of Base
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Logarithms 15 - Solving Equations
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Logarithms 10b
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Logarithms 16 - Solving Equations
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Logarithms 17 - Solving Equations
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Log Application 1 - Compound Interest
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Log Application 2 - Compound Interest
Logarithms 5
- What is the product property of logs?
- How do you write a logarithmic expression as a sum of logs?
- How do you write the sum of logs as a single log using the product property?
- How do you write log base 2 of 21 as the sum of logs?
- How do you write log base 3 of 11 + log base 3 of 8 as a single log?
- How do you write log base 4 of 5 + log base 4 of 12 as a single log?
- How do you write log base 3 of 2 + log base 3 of x + log base 3 of y^2 as a single log?
- How do you write log base 3 of (x + 2) + log base 3 of (x - 2) as a single log?
- How do you write log base 3 of 5m as a sum of logs?
- How do you write log base 2 of 7xy as a sum of logs?
- How do you derive and prove the product property of logarithms?
- Why does the log base b of xy = log base b of x + log base b of y?
- How do you simplify the log of 4 base 2 + log of 8 base 2?
This lesson explains the often-confusing product property of logarithms that allows you to take a single logarithm and split it up as the sum of logs. It also allows you to combine logarithms that are added with the same base into a single logarithm. This technique can be very useful, but often it is confusing to students. This is a must-see if you are learning about logarithms. Additionally, if you have ever been interested in the proof of why the product property of logs works, the explanation of this proof is excellent in this lesson.
