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Sdonk · Answer 1 · 2023-05-10T18:20:27+0000

In logarithm

multiplication translates to addition on expansion and a fraction or basically division translates to subtraction

so the number question can be rewritten as

$\begin{gathered} \ln (x^{(1)/(2)}_{}* y^3) \\ on\text{ expansion multiplication changes to addition so we have} \\ \ln (x^{(1)/(2)})+ln(y^3) \end{gathered}$

$\begin{gathered} \text{Next, we bring out the exponents }(1)/(2)\text{ on x and 3 on y to the front of the ln} \\ \text{This too is also a law} \end{gathered}$

so, we have

$(1)/(2)\ln (x)\text{ + 3ln(y)}$
$\begin{gathered} \text{Next combine the }\frac{1}{2\text{ }}and\text{ the ln} \\ so\text{ we have} \\ (\ln(x))/(2)+3\ln (x) \end{gathered}$
$\begin{gathered} 2.\text{ log}\sqrt[4]{x^3} \\ \text{Here, first we change }\sqrt[4]{x^3}^{} \\ to\text{ a normal form using laws of indices} \end{gathered}$
$\begin{gathered} \text{According to indices }\sqrt[4]{x} \\ ^{}is\text{ the same as} \\ \\ x^{(1)/(4)} \end{gathered}$
$\begin{gathered} \text{Applying this to the question at hand} \\ \sqrt[4]{x^3} \\ is\text{ the same as} \\ x^{3*(1)/(4)} \\ =x^{(3)/(4)} \end{gathered}$

so the question now becomes

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