How do you find the derivative of $ln (ln x)$ $ln (lnx)$ ?

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Answer 1 · 2016-05-30T19:00:09

Using the chain rule.

You have to apply the chain rule that tells us

$\frac{d}{dx}f[g(x)]=f'[g(x)]g'(x)$ .

The $f$ here is the external $ln$ , while the $g$ is the internal $ln(x)$ .
The derivative of the logarithm is

$\frac{d}{dx}ln(x)=1/x$

so the $f'[g(x)]=1/ln(x)$

and the $g'(x)=1/x$ .
The final result is

$\frac{d}{dx}ln(ln(x))=1/ln(x)1/x=1/(xln(x))$ .

How do you find the derivative of ln (lnx) ln(lnx) ln (lnx) ?