1 Answer

JivanAmara · Answer 1 · 2020-08-01T06:52:21+0000

ANSWER

$c. \ln( \frac{2 {x}^(3) }{3y})$

Step-by-step explanation

We want to write

ln(2x) + 2 ln(x) - ln(3y)

as a single logarithm.

Use the power rule to rewrite the middle term:

$n \: ln(a) = ln( {a}^(n) )$

$ln(2x) + ln( {x}^(2) ) - ln(3y)$

Use the product rule to obtain:

ln(a) + ln(b) = ln(ab)

$ln(2x * {x}^(2) )- ln(3y)$

$ln(2{x}^(3) )- ln(3y)$

Apply the quotient rule:

ln(a) - ln(b) = ln( (a)/(b))

$ln(2{x}^(3) )- ln(3y) =\ln(\frac{2 {x}^(3) }{3y})$

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