Revision as of 11:51, 26 September 2004 edit Charles Matthews (talk \| contribs) Autopatrolled, Administrators 367,921 edits named theorem ← Previous edit		Revision as of 14:03, 23 August 2006 edit undo Smmurphy (talk \| contribs) Autopatrolled, Extended confirmed users, Pending changes reviewers 14,833 edits m Weierstrass theorem note Next edit →
Line 1: The attribution of the results to theorems is somewhat questionable.▼ [[User:Charles Matthews\|Charles Matthews]] 11:51, 26 Sep 2004 (UTC)▼ ==The Weierstrass theorem== The Weierstrass theorem is: "Let X and Y be topological spaces. If f : X -> Y is continuous and X is compact, then Y is compact." Line 5 ⟶ 10: --[[User:Clausen\|Clausen]] 05:52, 26 Sep 2004 (UTC) The Weierstrass theorem is refering to the (Weierstrass) [[Extreme value theorem]] which states that a continuous function on a compact space attains a maximum and a minimum (see [http://cepa.newschool.edu/het/essays/math/contin.htm#weierstrass]). [[User:Smmurphy\|Smmurphy]]<sup>([[User talk:Smmurphy\|Talk]])</sup> 14:03, 23 August 2006 (UTC) ▲The attribution of the results to theorems is somewhat questionable. ▲[[User:Charles Matthews\|Charles Matthews]] 11:51, 26 Sep 2004 (UTC)

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