Posted by **Hannah** on Thursday, April 25, 2013 at 12:01am.

Find the limit as x approaches infinity of (lnx)^(1/x). This unit is on L'Hopital's rule. I know that the answer is 1, I just don't know how to get there. I tried taking the ln of everything so that you have ln(the whole limit) = limx-->infinity (1/x)ln(lnx) but I don't know if that's the right step to take or not. Can someone point me in the right direction?

## Answer this Question

## Related Questions

- calculus, limits, l'hopital - Using l'hopital's rule, find the limit as x ...
- calculus, limits, l'hopital - Using l'hopital's rule, find the limit as x ...
- Calculus - Find the limit as x approaches infinity of sin(2x)/x The answer is 0...
- calculus - This is a question related to L'hopital's rule. lim x -> -infinity...
- Calculus - This is a question related to L'hopital's rule. lim x -> -infinity...
- Calculus - I am maybe overthinking this, but what is the lim as n-> infinity ...
- Calculus - How do I find the limit of (1+sin(pi times x))^(1/x) as x approaches ...
- calculus - The limit as x approaches infinity of (e^x+x)^(1/x). I got that it ...
- Calculus - So I'm trying to do my homework on L'Hopital's rule. There's this one...
- Calculus - Another one I'm not sure about is the limit as x approaches infinity ...

More Related Questions