How do you solve lnx=5-ln2x ?

1 Answer
A08
Apr 11, 2016

x=8.614, rounded to three decimal places.

Explanation:

To solve lnx=5-ln2x, for x

Rearranging to bring all terms containing x to left hand side of the equation we obtain
lnx+ln2x=5
Using the property of logarithms that log (axxb)=loga+log b we obtain
ln(x xx 2x)=5
or ln2 x^2=5

Using the definition of log functions we obtain

e^5=2x^2, solving for x
x=+-sqrt(e^5/2), ignoring the -ve sign as logarithms of a negative number is not defined.

x=sqrt(e^5/2), with a calculator

or x=8.614, rounded to three decimal places.

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