Respuesta :
The logarithmic expression [tex]\rm log_w\dfrac{(x^2-6)^4}{\sqrt[3]{x^2-8}}[/tex] can be expressed as [tex]\rm 4log_w{(x^2-6)} - {\dfrac{1}{3}}log_w(x^2-8)[/tex].
Given to us
[tex]\rm log_w\dfrac{(x^2-6)^4}{\sqrt[3]{x^2-8}}[/tex]
Which expression is equivalent to [tex]\rm log_w\dfrac{(x^2-6)^4}{\sqrt[3]{x^2-8}}[/tex] ?
To solve the problem we will use the basic logarithmic properties,
[tex]\rm log_w\dfrac{(x^2-6)^4}{\sqrt[3]{x^2-8}}[/tex]
Using the logarithmic property [tex]\rm log_a\dfrac{x}{y} = log_ax-log_ay[/tex],
[tex]=\rm log_w{(x^2-6)^4} - log_w{\sqrt[3]{x^2-8}}[/tex]
Using the exponential property [tex]\sqrt[m]{a^n} = a^{\frac{n}{m}}[/tex],
[tex]=\rm log_w{(x^2-6)^4} - log_w(x^2-8)^{\dfrac{1}{3}}[/tex]
Using the logarithmic property [tex]\rm log_aB^x = xlog_aB[/tex],
[tex]=\rm 4log_w{(x^2-6)} - {\dfrac{1}{3}}log_w(x^2-8)[/tex]
Hence, the logarithmic expression [tex]\rm log_w\dfrac{(x^2-6)^4}{\sqrt[3]{x^2-8}}[/tex] can be expressed as [tex]\rm 4log_w{(x^2-6)} - {\dfrac{1}{3}}log_w(x^2-8)[/tex].
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