First we must understand how to write a logarithmic function:
[tex]log_{b}a=x[/tex]
In the equation above, b is the base, x is the exponent, and a is the answer. These same variables can be rearranged to be expressed as an exponential equation as followed:
[tex]b^x=a[/tex]
Next, we need to understand basic logarithm rules.
1. When a value is raised to a power, we can move the exponent to the front of the logarithm. Example:
log(a^2) = 2log(a)
2. When two variables are multiplied together, we can add the logarithms of the individual variables together. Example:
log(ab) = log(a) + log(b)
3. When a variable is divided by another variable, we can subtract the logarithms of the individual variables. Example:
log(a/b) = log(a) - log(b)
Now we can use these rules to solve the problem.
[tex]log(r)=log( \sqrt[3]{ \frac{A^2B}{C} } )[/tex]
We can rewrite the cube root as:
[tex]log(r) = log( (\frac{A^2B}{C})^ \frac{1}{3} ) [/tex]
Now we can move the one-third to the front:
[tex]log(r) = \frac{1}{3} log( \frac{A^2B}{C} )[/tex]
Now we can split up the logarithm:
[tex]log(r) = \frac{1}{3} (log(A^2)+log(B)-log(C))[/tex]
Finally, we can move the exponent to the front of the log of A:
[tex]log(r) = \frac{1}{3} (2log(A)+log(B)-log(C))[/tex]
Distribute the one-third to get the answer:
[tex]log(r) = \frac{2}{3} log(A) + \frac{1}{3} log(B) - \frac{1}{3} log(C)[/tex]
The answer is (4).
