Difference between revisions of "Squeeze Theorem"
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− | The '''Squeeze | + | The '''Squeeze Theorem''' (also called the '''Sandwich Theorem''' or the '''Squeeze Play Theorem''') is a relatively simple [[theorem]] that deals with [[calculus]], specifically [[limit]]s. |
[[Image:Squeeze theorem example.jpg|thumb|Squeeze Theorem]] | [[Image:Squeeze theorem example.jpg|thumb|Squeeze Theorem]] |
Revision as of 19:07, 4 May 2008
This is an AoPSWiki Word of the Week for May 4-11 |
The Squeeze Theorem (also called the Sandwich Theorem or the Squeeze Play Theorem) is a relatively simple theorem that deals with calculus, specifically limits.
Theorem
Suppose is between and for all in the neighborhood of . If and approach some common limit L as approaches , then .
Proof
If is between and for all in the neighborhood of , then either or for all in the neighborhood of . Since the second case is basically the first case, we just need to prove the first case.
If increases to , then goes to either or , where . If decreases to , then goes to either or , where . Since can't go to or , then must go to . Therefore, .