Difference between revisions of "Squeeze Theorem"

Revision as of 15:16, 1 May 2008

The Squeeze Play Theorem (also called the Squeeze Theorem or the Sandwich Theorem) is a relatively simple theorem that deals with calculus, specifically limits.

Theorem

Suppose $f(x)$ is between $g(x)$ and $h(x)$ for all $x$ in the neighborhood of $S$ . If $g$ and $h$ approach some common limit L as $x$ approaches $S$ , then $\lim_{x\to S}f(x)=L$ .

Proof

If $f(x)$ is between $g(x)$ and $h(x)$ for all $x$ in the neighborhood of $S$ , then either $g(x)<f(x)<h(x)$ or $h(x)<f(x)<g(x)$ for all $x$ in the neighborhood of $S$ . Since the second case is basically the first case, we just need to prove the first case.

If $g(x)$ increases to $L$ , then $f(x)$ goes to either $L$ or $M$ , where $M>L$ . If $h(x)$ decreases to $L$ , then $f(x)$ goes to either $L$ or $N$ , where $N<L$ . Since $f(x)$ can't go to $M$ or $N$ , then $f(x)$ must go to $L$ . Therefore, $\lim_{x\to S}f(x)=L$ .

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 The '''Squeeze Play Theorem''' (also called the '''Squeeze Theorem''' or the '''Sandwich Theorem''') is a relatively simple [[theorem]] that deals with [[calculus]], specifically [[limit]]s.
-[[Image:Squeeze theorem example.png|thumb]]
+[[Image:Squeeze theorem example.jpg|thumb]]
 ==Theorem==

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Difference between revisions of "Squeeze Theorem"

Revision as of 15:16, 1 May 2008

Theorem

Proof

See Also