What is the limit of $ln(2x)-ln(1+x)$ as x goes to infinity?

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What is the limit of $ln(2x)-ln(1+x)$ as x goes to infinity?

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Answer 1 · 2015-10-06T13:58:50

I found $ln(2)$

Explanation:

Let us use a rule of the logs:
$lim_(x->oo)[ln(2x)-ln(1+x)]=$
$lim_(x->oo)[ln((2x)/(1+x))]=$ collect $x$ :
$lim_(x->oo)[ln((2cancel(x))/(cancel(x)(1/x+1)))]=$
as $x->oo$ then $1/x->0$
$=ln(2)$

Answer 2 · 2015-10-06T14:06:52

Use the properties of $ln$ to rewrite as a single $ln$ then use continuity of $ln$ .

Explanation:

Rewrite as $lnu$ , tghen use the following.

Because $ln$ is continuous on $(0,oo)$ , we have

if $lim_(xrarroo)u = L$ for some number $L$ , then

$lim_(xrarroo) lnu = ln(lim_(xrarroo)u)$ .

If you just want the answer it is $ln2$ .

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What is the limit of $ln(2x)-ln(1+x)$ as x goes to infinity?

2 Answers

Explanation:

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What is the limit of ln(2x)-ln(1+x)ln(2x)-ln(1+x) as x goes to infinity?

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What is the limit of $ln(2x)-ln(1+x)$ as x goes to infinity?