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I want to improve my counting limits. I've found some difficult examples:

  1. $\displaystyle\lim_{x \to +\infty}\left((x+1)^{1+\frac1x}-x^{1+\frac{1}{x+a}}\right)$

  2. $\displaystyle\lim_{x\to +\infty}x^2(\arctan x - \frac{\pi}{2})+x$

  3. $\displaystyle\lim_{x\to+\infty}\left( \sqrt[3]{x^3+x^2+x+1}-\sqrt{x^2+x+1}\cdot\frac{\ln(e^x+x)}{x} \right)$

  4. $\displaystyle\lim_{x\to 0} \left(\frac{a^x-x\ln a}{b^x-x\ln b} \right)^{\frac{1}{x^2}}$

and I don't know how to touch them. I know: L'Hôpital's rule, Mean value theorem, Taylor's theorem but still don't have this skill. Can anybody help me?

  • 0
    You'll find a lot of examples and URLs for other examples in the following sci.math thread: http://tinyurl.com/ccy4r5d2012-03-26

2 Answers 2

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Usually series expansions are the best way to go. L'Hospital should be avoided whenever possible.

For example in 1)

$ (x+1)^{1+1/x} = \exp\left((1+\frac1x) \ln(x+1)\right) = \exp\left((1+\frac1x)(\ln(x)+\ln(1+\frac1x))\right)$ $ = \exp\left(\ln(x) + \frac{\ln(x)}{x} + \frac1x + O(\frac{1}{x^2})\right) = x \left(1 + \frac{\ln(x)}{x} + \frac{1}{x} + O(\frac{\ln(x)^2}{x^2})\right)$ $ = x + \ln(x) + 1 + o(1)$

while

$ x^{1+1/(x+a)} = x \exp\left(\frac{\ln(x)}{x+a}\right) = x \exp\left(\frac{\ln(x)}{x} + O(\frac{\ln (x)}{x^2})\right)$ $ = x \left(1 + \frac{\ln(x)}{x} + O(\frac{\ln(x)^2}{x^2})\right)$ $ = x + \ln(x) + o(1)$

so the limit of their difference is $1$.

EDIT: for 2) note that $\arctan(t) = \frac{\pi}{2} - \arctan(1/t) = \frac{\pi}{2} - \frac{1}{t} + O(\frac{1}{t^3})$

  • 0
    Not that again... See http://math.stackexchange.com/questions/179680/lhopitals-rule-vs-lhospitals-rule2013-12-03
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(2) Rewrite it as $\lim_{x\to\infty}\frac{x\arctan x-\frac{\pi}2 x+1}{\frac1x}$ and apply l’Hospital’s rule twice, followed by a little algebraic simplification.

(4) This appears to succumb to the usual technique for such problems: let $L$ be the desired limit, take logs to get

$\ln L=\lim_{x\to 0}\frac{\ln(a^x-x\ln a)-\ln(b^x-x\ln b)}{x^2}\;,$

and beat it to death with l’Hospital’s rule.