First, it is important that you know the rules of logs
So that is blog(a)=log(ab)
So you will get ln(z^(1/2))-ln(5-x)-ln(y^4)
You can also do it this way, applying another rule of logs
og(a)−log(b)=log(ab)
Then substitute it to the given, you get:
ln(z1/2)−ln(5+x)−ln(y4)
ln[z1/2(5+x)y4]
Answer:
The answer is:
[tex]ln(\frac{z^\frac{1}{2}}{(5+x)*(y^4)} )[/tex]
Step-by-step explanation:
In order to determine the answer, we have to know about the properties of the logarithmic.
For this case, we need three properties. It is very important that these properties assume that the base of the logarithmic is the same. In this case we have the base "e" (euler number).
Applying these properties:
[tex]\frac{1}{2}ln(z)=ln(z^\frac{1}{2})\\\\4ln(y)=ln(y^4)\\\\ln(z^\frac{1}{2})-ln(5+x)-ln(y^4)\\ln(z^\frac{1}{2})-(ln(5+x)+ln(y^4))\\ln(z^\frac{1}{2})-(ln((5+x)*(y^4)))\\ln(\frac{z^\frac{1}{2}}{(5+x)*(y^4)} )[/tex]
Finally, the expression is:
[tex]ln(\frac{z^\frac{1}{2}}{(5+x)*(y^4)} )[/tex]
