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Use the properties of logarithms to expand [tex]$\log \left(y^4 x\right)$[/tex].

Each logarithm should involve only one variable and should not have any exponents or fractions. Assume that all variables are positive.

[tex]\log \left(y^4 x\right) = \log(y^4) + \log(x) = 4\log(y) + \log(x)[/tex]

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GinnyAnsweridn
Sure! Let's start from the logarithmic expression [tex]\(\log \left(y^4 x\right)\)[/tex] and use the properties of logarithms to expand it.

First, recall that the logarithm of a product can be expressed as the sum of the logarithms of the factors:
[tex]\[ \log(A \cdot B) = \log(A) + \log(B) \][/tex]
In our case, we can treat [tex]\(y^4\)[/tex] and [tex]\(x\)[/tex] as the factors:
[tex]\[ \log \left(y^4 x\right) = \log(y^4) + \log(x) \][/tex]

Next, use the property of logarithms that states that the logarithm of a power can be expressed as the exponent times the logarithm of the base:
[tex]\[ \log(A^B) = B \cdot \log(A) \][/tex]
Applying this property to [tex]\(\log(y^4)\)[/tex], we get:
[tex]\[ \log(y^4) = 4 \cdot \log(y) \][/tex]

Combining these results together, we can write the expanded form of the original expression:
[tex]\[ \log \left(y^4 x\right) = 4 \cdot \log(y) + \log(x) \][/tex]

Thus, the expansion of [tex]\(\log \left(y^4 x\right)\)[/tex] is:
[tex]\[ 4 \cdot \log(y) + \log(x) \][/tex]
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