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UI MATH 5400 - Lecture Note

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Slide 1Slide 2Slide 3From: http://math.etsu.edu/multicalc/Chap2/Chap2-2/index.htmMotivati on:To begin with, let us define any connected open set that contains a point p to be a neighborhood of p. For example, an open ball of radius d > 0 about p, which is the set of all x such that || x-p || < d, is a neighborhood of p. Any open rectangle containing p is also a neighborhood of p.Extreme Value Thm: If f: [a, b]  R is continuous, then $ c, d  [a, b] s.t. f(c) ≤ f(x) ≤ f(d)  x  [a, b]. What is the minimum hypothesis such that the Extreme Value Theorem holds: Suppose f: X  Y…__________________________________________________________________Some common symbols:$ = there exists  = unique $ = there exists a unique = for all  = s.t. = such thathttp://www.sparknotes.com/math/calcab/applicationsofthederivative/section3.rhtmly  Y  Y : lower case = element Upper case = setCaligraphy {\cal Y} = collection of sets._________________________ _ _ __________________________ ________________________________ _ _ __________________________ ______Want to learn more about point-set topology:Do a MathSciNet search: http://www.ams.org/mathscinet/Use MSC Primary: 54 for general topologyTo find other MSC numbers: http://www.ams.org/mathscinet/searchMSC.htmlIf you are off-campus, you will need to log into MathSciNet via the Math Library website: http://www.lib.uiowa.edu/math/index.htmlNote most articles found by MathSciNet are research articles. Unfortunately, this class will not prepare you to read most of these articles—but don’t let that stop you if you have an interest in


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UI MATH 5400 - Lecture Note

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