Answer:
(2)
Step-by-step explanation:
Our logarithmic expression is: [tex]ln(\frac{\sqrt{e} }{y^3} )[/tex].
Remember the logarithmic property that ln(a/b) = lna - lnb. So, we can write this as:
[tex]ln(\frac{\sqrt{e} }{y^3} )=ln(\sqrt{e} )-ln(y^3)[/tex]
Also, we can write square roots as powers of one-half, so √e = [tex]e^{1/2}[/tex]. There's another log property that: [tex]ln(a^b)=b*ln(a)[/tex]. We can apply that here for both the √e and the y³:
[tex]ln(\sqrt{e} )-ln(y^3)=\frac{1}{2} ln(e)-3ln(y)[/tex]
Finally, note that ln(e) is just 1, so we have:
[tex]\frac{1}{2} ln(e)-3ln(y)=\frac{1}{2} -3ln(y)=\frac{1-6ln(y)}{2}[/tex]
The answer is thus (2).
~ an aesthetics lover
