How do you solve $2* 3^x = 7* 5^x$ ?

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How do you solve $2* 3^x = 7* 5^x$ ?

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Answer 1 · 2015-07-19T19:06:54

I found: $x=-7.0421$

Explanation:

Try rearranging it: as:
$3^x/5^x=7/2$
write it as:
$(3/5)^x=7/2$
use the definition of logarithm to write:
$log_(3/5)(7/2)=x$
We can now use the change of base formula to transform our log into a quocient of natural logs (these can be evaluated using a pocket calculator) as:
$x=(ln(7/2))/(ln(3/5))=-7.0421$

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How do you solve $2* 3^x = 7* 5^x$ ?

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