Given;
[tex]\log \text{ }\frac{z^3y^2}{x}[/tex]We are going to apply the properties of logarithm to dissolve this;
[tex]\begin{gathered} \log \text{ (ab)=log a + log b} \\ \text{ log (}\frac{a}{b})=\text{ log a - log b} \\ \log a^b=b\text{ log a} \end{gathered}[/tex][tex]\begin{gathered} \log \frac{z^3y^2}{x}=\log z^3+\log y^2-\log x \\ \log \frac{z^3y^2}{x}=3\log z+2\log y-\log x \end{gathered}[/tex]ANSWER: 3 log z + 2 log y - log x