For this case we have that by definition of properties logarithm is met:
[tex]log_ {b} (x) -log_ {b} (y) = log_ {b} (\frac {x} {y})[/tex]
So, rewriting the expression we have:
[tex]log (\frac {9x} {2 ^ 3}) = 3\\log (\frac {9x} {8}) = 3[/tex]
By definition of logarithm we have to:
[tex]log_ {b} (x) = y[/tex]is equivalent to[tex]b ^ y = x[/tex]
So:
[tex]10 ^ 3 = \frac {9x} {8}\\9x = 8 * 10 ^ 3\\9x = 8 * 1000\\9x = 8000\\x = \frac {8000} {9}[/tex]
ANswer:
[tex]x = \frac {8000} {9}[/tex]
Answer:
Step-by-step explanation: i got it right on edg
