How do you solve $e^{2 x} = ln (4 + e)$ $e^(2x) = ln(4 + e)$ ?

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How do you solve $e^{2 x} = ln (4 + e)$ $e^(2x) = ln(4 + e)$ ?

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Answer 1 · 2016-05-27T19:14:37

I found: $x = \frac{ln (ln (4 + e))}{2} = 0.322197$ $x=(ln(ln(4+e)))/2=0.322197$

Explanation:

We could call the constant $ln (4 + e)$ $ln(4+e)$ , say, $k$ $k$ and write:
$e (^2 x) = k$ $e(^2x)=k$
take the natural log of both sides:
$ln (e^{2 x}) = ln (k)$ $ln(e^(2x))=ln(k)$
and:
$2 x = ln (k)$ $2x=ln(k)$ where $ln$ $ln$ and $e$ $e$ eleiminated one another;
finally:
$x = \frac{ln (k)}{2}$ $x=ln(k)/2$
Now:
if we can use a calculator we have that:
$k = ln (4 + e) = 1.90483$ $k=ln(4+e)=1.90483$
so that $x$ $x$ becomes:
$x = \frac{ln (ln (4 + e))}{2} = 0.322197$ $x=(ln(ln(4+e)))/2=0.322197$

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How do you solve $e^{2 x} = ln (4 + e)$ $e^(2x) = ln(4 + e)$ ?

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How do you solve e2x=ln(4+e)e^(2x) = ln(4 + e)?

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How do you solve $e^{2 x} = ln (4 + e)$ $e^(2x) = ln(4 + e)$ ?