How do you find the derivative of $ln x$ $ln x$ ?

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Answer 1 · 2015-04-18T16:20:02

$\frac{1}{x}$ $1/x$

Consider f(x) = lnx and using the first principles work out $f '(x)= lim h->0 {f(x+h)-f(x)}/h$

= $lim h->0 {ln(x+h) -lnx}/h$

= $limh->0{ln((x+h)/x)}/h$

= $lim h->0{ln(1+h/x)}/h$

= $limh->0 1/x {ln(1+h/x)}/ (h/x)$

= $1/x$ $limh->0 {ln(1+h/x)}/(h/x)$

= $1/x$ , because $[limh->0{ln(1+h/x)}/(h/x) =1]$

Answer 2 · 2015-04-18T17:21:38

The "how" depends on the definition you are using for $lnx$ .

I like: $lnx = int_1^x 1/t dt$ and the result is immediate useing the Fundamental Theorem of Calculus.

If you start with a definition of $e^x$ and find its derivative, then you probably defined $lnx$ by:

$y = lnx$ $iff$ $x = e^y$

Differentiate implicitely:

$d/(dx)(x) = d/(dx)(e^y)$

$1 = e^y dy/dx$

So
$dy/dx = 1/ e^y = 1/x$

How do you find the derivative of ln xlnxln x?