The first course in Analysis, which follows calculus, along with other courses, such as differential equations and elementary linear algebra, in the curricu lum, presents special pedagogical challenges. There is a change of stress from computational manipulation to "proof. " Indeed, the course can become more a course in Logic than one in Analysis. Many students, caught short by a weak command of the means of mathematical discourse and unsure of what is expected of them, what "the game" is, suffer bouts of a kind of mental paralysis. This text attempts to address these problems in several ways: First, we have attempted to define "the game" as that of "inquiry," by using a form of exposition that begins with a question and proceeds to analyze, ultimately to answer it, bringing in definitions, arguments, conjectures, exam ples, etc. , as they arise naturally in the course of a narrative discussion of the question. (The true, historical narrative is too convoluted to serve for first explanations, so no attempt at historical accuracy has been made; our narra tives are completely contrived. ) Second, we have kept the logic informal, especially in the course of preliminary speculative discussions, where common sense and plausibility tempered by mild skepticism-serve to energize the inquiry.
Inhaltsverzeichnis
Background Number Systems. - §1. Counting: The Natural Numbers. - §2. Measurement: The Rational Numbers. - The Axioms of Ordered Fields. - §3. Decimal Representation. Irrationals. - I ANALYSIS. - 1 Approximation: The Real Numbers. - 2 The Extreme-Value Problem. - 3 Continuous Functions. - II FOUNDATIONS OF CALCULUS. - 4 Differentiation. - 5 Integration. - 6 Infinite Series.
