Simplify fully: log a + log b – log b^2

In summary, the simplified form of log a + log b – log b^2 is log(a/b). This expression cannot be further simplified. To simplify it, you can use the properties of logarithms, such as combining log a + log b to log(ab) and using log b^2 = 2log b. The base of the logarithm is not specified and can be any base. The simplified form, log(a/b), can be used in calculations involving logarithms, such as solving equations or simplifying complex expressions.
  • #1
Paulo2014
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0

Homework Statement



Simplify fully: log a + log b – log b^2



The Attempt at a Solution



I don't even know where to start...
 
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  • #2
Paulo2014 said:
I don't even know where to start...
The "properties of logarithms" section of your textbook seems like the obvious place to start.
 
  • #3
Amount of time you spent typing this, you could have found the property Hurkyl is talking about :p
 

1. What is the simplified form of log a + log b – log b^2?

The simplified form of log a + log b – log b^2 is log(a/b).

2. Can log a + log b – log b^2 be further simplified?

No, log a + log b – log b^2 is already in its simplest form.

3. How do you simplify log a + log b – log b^2?

To simplify log a + log b – log b^2, you can use the logarithmic properties of addition and subtraction. First, you can combine the first two terms using the property log a + log b = log(ab). Then, you can use the property log b^2 = 2log b to rewrite the expression as log(ab) – 2log b. Finally, you can use the property log x – log y = log(x/y) to get the simplified form of log(a/b).

4. What is the base of the logarithm in log a + log b – log b^2?

The base of the logarithm in log a + log b – log b^2 is not specified, so it can be any base. It is common to assume a base of 10, but it can also be written as ln(a/b) for a natural logarithm or log2(a/b) for a base 2 logarithm.

5. How can I use the simplified form of log a + log b – log b^2 in calculations?

The simplified form of log a + log b – log b^2, which is log(a/b), can be used in calculations involving logarithms. For example, if you have an expression like log 10 + log 100 – log 10^2, you can simplify it to log(10/10) = log 1 = 0. This can be helpful in solving equations involving logarithms or in simplifying complex expressions.

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