How do you solve $3.5^(5x) = 2650$ ?

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How do you solve $3.5^(5x) = 2650$ ?

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Answer 1 · 2016-05-16T21:26:40

I found: $x=1.2584$

Explanation:

We could first take the natural log of both sides:
$ln(3.5)^(5x)=ln(2650)$
then get rid of the exponent in the first using a property of logs to write:
$5xln(3.5)=ln(2650)$
rearrange:
$x=ln(2650)/(5ln(3.5))=1.2584$

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How do you solve $3.5^(5x) = 2650$ ?

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