1 Answer

Lance Weber · Answer 1 · 2023-01-13T15:44:34+0000

First, we can see in the alternatives that the base of the logarithm is not changed, so we don't need to bother with that.

Now, a multiplication inside a logarithm has the following property:

$\log _b(a\cdot c)=\log _b(a)+\log _b(c)$

Applying that to the given expression, we have:

$\log _3(\sqrt[5]{x}\cdot y)=\log _3(\sqrt[5]{x})+\log _3y$

Now, we can rewrite the root in the radical form:

$\sqrt[5]{x}=x^{(1)/(5)}$

To get:

$\log _3(x^{(1)/(5)})+\log _3y$

We did that so we can use the following property:

$\log _b(a^c)=c\cdot\log _ba$

Let's do that:

$(1)/(5)\log _3x+\log _3y$

And that is the answer.

Your comment on this question: