How do you use the Squeeze Theorem to find $lim xcos(1/x)$ as x approaches zero?

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How do you use the Squeeze Theorem to find $lim xcos(1/x)$ as x approaches zero?

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Answer 1 · 2015-11-13T04:34:12

Use the fact that the cosine function is always between $-1$ and $1$ , implying that the given function is always between $-|x|$ and $|x|$ , which both go to zero as $x$ goes to zero.

Explanation:

Let $f(x)=x cos(1/x)$ , $g(x)=-|x|$ , and $h(x)=|x|$ . Since $-1 leq cos(1/x) leq 1$ for all $x !=0$ , it follows that $g(x) leq f(x) leq h(x)$ for all $x !=0$ .

But $lim_{x->0}g(x)=lim_{x->0}h(x)=0$ . Therefore, the Squeeze Theorem can be use to conclude that $lim_{x->0}f(x)=lim_{x->0}x cos(1/x)=0$ .

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How do you use the Squeeze Theorem to find $lim xcos(1/x)$ as x approaches zero?

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How do you use the Squeeze Theorem to find lim xcos(1/x)lim xcos(1/x) as x approaches zero?

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How do you use the Squeeze Theorem to find $lim xcos(1/x)$ as x approaches zero?