limits

chriss · 2009-02-08 21:34:32

lim (x[sup]χ[/sup][sup]1/2[/sup] ) / 3[sup]χ[/sup],
x->+infinity
can you help me to solve this?

coffeeking · 2009-02-15 02:36:25

Bump this up since I am interested in knowing too...

Ricky · 2009-02-15 03:42:33

Have you tried L'Hospital's rule?

janetpc2008 · 2009-02-19 07:11:16

Does it help if you just look at squares of 3? This way the fraction can be combined.
Define a subset of x:

So now we have 3 to a power in the numerator and the denominator, so we can subtract them to get the fraction:

In the limit of y going to +infinity, is this easier to manage?

I'm not sure how to prove this goes to zero, but it does.

JaneFairfax · 2009-02-19 08:32:31

If you can prove that

as , then .

Ricky wrote:

Have you tried L'Hôpital's rule?

I did, and got stuck.

Last edited by JaneFairfax (2009-02-23 03:58:01)

Eigma · 2009-02-22 21:12:36

Hi. I'm really confused how to start proving sequences. Can you give me a technique, for example, how to prove that if an approaches A and bn approaches B, then an/bn approaches A/B where bn and B is not 0.

LampShade · 2009-02-23 01:16:49

Thanks for the tip about /displaystyle

Last edited by LampShade (2009-02-23 06:06:38)

JaneFairfax · 2009-02-23 03:56:59

This happens when you use $$. Use \displaystyle to restore settings.

\mbox{Let } y = \frac {x^{\sqrt{x}}}{3^x} \\
\ln{y} =\sqrt{x} \ln{x} - x \ln{3} \\
\ln{y} = x ( $$\frac {\ln{x}}{\sqrt{x}}$$ - \ln{3} ) \\
\\
\mbox{Use L'Hospital's rule to show that} \displaystyle\lim_{x \to \infty} \mbox {of the first term is zero, and so the overall limit goes to } -\infty \mbox{. Hence the limit you seek is 0.}

Math Is Fun Forum

#1 2009-02-08 21:34:32

limits

#2 2009-02-15 02:36:25

Re: limits

#3 2009-02-15 03:42:33

Re: limits

#4 2009-02-19 07:11:16

Re: limits

#5 2009-02-19 08:32:31

Re: limits

#6 2009-02-22 21:12:36

Re: limits

#7 2009-02-23 01:16:49

Re: limits

#8 2009-02-23 03:56:59

Re: limits

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