Computing limits - logs vs powers

[wombat4000]

Homework Statement

\frac{log (x^{2} + e^{2x})}{x + 3} find the limit as x_> infinty

Homework Equations

powers beat logs

The Attempt at a Solution

going by the powers beat logs idea - simply, the limit as n-> infinity is 0.

is this correct? can you simply say that powers beat logs always?

 

[GSpeight]

No it's not that simple. Intuitively e^2x is going to dominate the bracket in the numerator and log(e^2x) can be easily simplified. Can you sandwich x^2+e^2x between multiples of e^2x (at least for large x)? Try the sandwich theorem.

 

[wombat4000]

ok - it will go to 2 then?

\frac{log (e^{2x})}{x + 3} \leq \frac{log (x^{2} + e^{2x})}{x + 3}<br /> \leq ?
\frac{log (e^{2x})}{x + 3} = \frac{2x}{x + 3} which tends to 2 as x tends to infinity is this correct - what should i use for thew upper bound?

 

[GSpeight]

Fine so far. How would you compare x^2 and e^2x? (at least for large x).

 

[wombat4000]

e^2x is considerably larger than x^2 ?

if x^2 divereges - so must e^2x?

cant say I am 100% sure what your ginting towards.

 

[GSpeight]

Sorry if I'm being too vague.

x^2<e^2x so x^2+e^2x<2e^2x which gives you another useful bound :)

 

[wombat4000]

brilliant! - thanks

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