Why : $1^{+\infty}$ is not $1 $ however $1^{+\infty}=\lim _{x\to 0+}(\frac{\sin x}{x})^{1/x}=1$?

Question

It is well known that :$1^{+\infty}$ is indeterminate case ,I have accrossed the following problem which let me to say that :$1^{+\infty}=1$ .

$1^{+\infty}$ can be written as : $1^{+\infty}=\lim _{x\to 0+}(\frac{\sin x}{x})^{1/x}$ which is $ 1$ ,then $1^{+\infty}=1$ and it's not I.case , i don't know where i'm wrong !!!! ? and wolfram alpha says that :$\lim _{x\to 0+}(\frac{\sin x}{x})^{1/x}=1$ which mixed me .

Edit: I have edited the question to show what's mixed me in the side of limit calculation and i don't changed my question

If $a_n\to 1$ and $b_n\to\infty$ then $a_n^{b_n}$ may tend to $1$, or may tend to another positive number, or may diverge... — Angina Seng, Jan 14 '18 at 17:54
"indeterminate" means can not be consistently determined. Determining something in one particular way is not determining it consistently in all possible possible ways. So one interpretation does not contradict indeterminacy. — fleablood, Jan 14 '18 at 18:38
But honestly, I'm not seeing why $1^{\infty}$ which I would define as $\lim_{x\to \infty} 1^x$ should be indeterminate at all. So what if $\lim_{y\to 1;x\to \infty} y^x$ is indeterminate. We don't claim $f(a)$ is indeterminate if $f$ is discontinuous at $a$ if it's perfectly well defined. We don't claim $f(a)$ must always equal $\lim_{x\to a} f(x)$ so why should we care about any limits as $y\to 1$? Am I mistaken that $f(\infty)$ should be defined as $\lim_{x\to \infty} f(x)$? — fleablood, Jan 14 '18 at 19:30
If you are ok, you can accept the answer and set as solved. Thanks! — user, Jan 20 '18 at 00:04
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score 2 · Accepted Answer · answered Jan 14 '18 at 17:54

If you think that $$\lim _{x\to 0^+}\bigg(\frac{\sin x}{x}\bigg)^{1/x} = \bigg(\lim_{x \to 0^+}\frac{\sin x}{x}\bigg)^{\lim_{x \to 0^+}1/x}$$ that is not correct. Here, you can find your answer I think: Why is $1^{\infty}$ considered to be an indeterminate form

score 2 · Answer 2 · answered Jan 14 '18 at 17:55

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What do you think of $$\lim\limits_{x \to \infty} \left(1+\frac{1}{x}\right)^x?$$

answered Jan 14 '18 at 17:55

mathcounterexamples.net

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Mohammad Riazi-Kermani · Answer 3 · 2018-01-14T18:54:51.760

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Indeterminate means we can not assign a single real number to it without causing contradiction

In your question, different examples provide different answers such as $1$ or $e$ , hence the determination is not possible without contradiction.

edited Jan 14 '18 at 18:54

answered Jan 14 '18 at 18:11

Mohammad Riazi-Kermani

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$1^x=1$ for any $x\in R$ so $\lim 1^x=1$ as $x$ tends to $\infty$. But if $lim f(x)^{g(x)}=1^{\infty}$ as $x$ tends to $\infty$($f(x)$ is not constant) is an indeterminate case. – M.R. Yegan Jan 14 '18 at 18:34
Good point for the case of base =1. – Mohammad Riazi-Kermani Jan 14 '18 at 18:55

Why : $1^{+\infty}$ is not $1 $ however $1^{+\infty}=\lim _{x\to 0+}(\frac{\sin x}{x})^{1/x}=1$?

3 Answers3