The equation that illustrates the product rule of logarithm is: [tex]\log_2(4x) = \log_2(4) + \log_2(x)[/tex]
What are equivalent expressions?
Equivalent expressions are expressions that have equal values
The logarithmic equation is given as:
[tex]\log_2{4x}[/tex]
Rewrite the above equation as:
[tex]\log_2(4x)[/tex]
The product rule of logarithm states that:
[tex]\log(ab) - \log(a) + \log(b)[/tex]
So, we have:
[tex]\log_2(4x) = \log_2(4) + \log_2(x)[/tex]
Hence, the equation that illustrates the product rule of logarithm is: [tex]\log_2(4x) = \log_2(4) + \log_2(x)[/tex]
Read more about equivalent expression at:
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