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How to evaluate the limit: $\lim_{x \to 0} \Bigl(\frac{\sin{x}}{x}\Bigr)^{1/x^{3}}$

I think it goes to $1$ because $\lim\limits_{x \to 0} \frac{\sin{x}}{x} =1$ and so power of $1$ should also be $1$. Am I right?

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    @R.M. $\lim_{x\to0^+}(\frac{\sin x}{x})^{x^p}=${$e^{-\frac{1}{6}}$ if $p=-2; 0$ if p<-2; 1 if p>-2}. (It is easy to show by taking $\ln$ and use L'hopital and is obvious from graph https://www.desmos.com/calculator/xrbz1aypnp. For $\lim_{x\to^-}$, by $\frac{\sin (-x)}{-x}=\frac{\sin x}{x}$, it is easy to show your limit doesn't exist2018-05-02

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You are wrong. For example, $\lim_{x\to 0}\left(1+x\right)^{\frac{1}{x}}=e$ But by your approach it would be $1$. This is because $1^\infty$ is undefined and not $1$. The correct approach would be to use the limit I gave as example to get: $\lim_{x\to 0}\left(\frac{\sin x}{x}\right)^{\frac{1}{x^3}}=\lim_{x\to 0}\left(1+\frac{\sin x-x}{x}\right)^{\frac{x}{\sin x-x}\frac{1}{x^3}\frac{\sin x-x}{x}}=\lim_{x\to 0}\,\,\,e\,\,^{\frac{\sin x-x}{x^4}}$ You can continue from here.

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    Well you guys know I always kiss and tell... my best guess is that someone is reading something into the statement "You are wrong". It's not like Dennis was demeaning in any way; he answered the *question!!*2011-09-03
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Edit. Turns out this limit does not exist, because the one-sided limits as $x \to 0+$ and $x \to 0-$ are different. See @Américo's answer for more details.

The problem in your idea will become apparent once you take logs: Define $L$ to be the limit. Then $ \ln L = \lim_{x \to 0} \frac{\ln(\frac{\sin x}{x})}{x^3} . $

Now, it is true that the numerator approaches $0$ as $x \to 0$. But I cannot immediately conclude that the limit is $0$, since this is a $0/0$ indeterminate form. Can you spot the connection to your question here?

I presume you should be more comfortable in evaluating $0/0$ indeterminate forms. Can you take it from here? As a starting point, you might want to get rid of the $\ln$ by using some standard limit theorems. (Hint: $\ln(1+h)$ as $h$ goes to $0$.)

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Hint: Rewrite $\left( \dfrac{\sin x}{x}\right) ^{1/x^{3}}$ as $\left( \frac{\sin x}{x}\right) ^{1/x^{3}}=e^{\left( \ln \left( \frac{\sin x}{x} \right) \right) /x^{3}}$

and look at the side limits: $\lim_{x\rightarrow 0^{+}}e^{\left( \ln \left( \frac{\sin x}{x}\right) \right) /x^{3}}\neq \lim_{x\rightarrow 0^{-}}e^{\left( \ln \left( \frac{ \sin x}{x}\right) \right) /x^{3}}.$

Additional hint: show that

$\lim_{x\rightarrow 0^{+}}\left( \ln \left( \frac{\sin x}{x}\right) \right) /x^{3}=-\infty ,$

$\lim_{x\rightarrow 0^{-}}\left( \ln \left( \frac{\sin x}{x}\right) \right) /x^{3}=+\infty .$

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    @Bill Dubuque: Thanks! That's the 2nd time I leave trash (%).2011-09-03
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Hint: If allowed, I would use the Maclaurin series for $\sin(x)=x+\frac{x^3}{6}+O(x^5)$. Then, after diving by $x$, note that $\lim\limits_{x\to0}(1+x^2)^{1/x^3}=\lim\limits_{x\to0}(1+x^2)^{(1/x^2)(1/x)}=\lim\limits_{x\to0}e^{1/x}$.