How do you find the limit of $lnx/x$ as $x->oo$ ?

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Answer 1 · 2017-01-16T11:58:48

$lim_(x->oo) lnx/x = 0$

As we have:

$lim_(x->oo) lnx = +oo$
$lim_(x->oo) x = +oo$

The limit:

$lim_(x->oo) lnx/x$

presents itself in the indeterminate form $oo/oo$ and we can use l'Hospital's rule:

$lim f(x)/g(x) = lim (f'(x))/(g'(x))$

so:

$lim_(x->oo) lnx/x = lim_(x->oo) (d/(dx)lnx)/(d/(dx)x) = lim_(x->oo) 1/x = 0$

Answer 2 · 2017-09-25T08:33:24

On request, giving a demonstration without using l'Hospital:

For $x > 1$ we have:

$ln x < x$

if we express $x$ as $x = (sqrt(x))^2$ then:

$ln x = ln (sqrt(x))^2 = 2ln sqrtx < 2sqrtx$

so:

$lnx/x < 2sqrtx/x = 2/sqrtx$

On the other hand for $x > 1$ the logarithm is positive so:

$0 < lnx/x < 2/sqrtx$

Then for $x->oo$

$lim_(x->oo) lnx/x = 0$

based on the squeeze theorem.

How do you find the limit of lnx/xlnx/x as x->oox->oo?