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我们如何以及为何进行数学证明

How and why we do mathematical proofs
课程网址: http://unow.nottingham.ac.uk/resources/resource.aspx?hid=9ceaa739...  
主讲教师: Joel Feinstein
开课单位: 诺丁汉大学
开课时间: 信息不详。欢迎您在右侧留言补充。
课程语种: 英语
中文简介:
这是一个模块框架。它可以在线查看或作为zip文件下载。正如2009/10秋季学期所教导的,这个简短单元的目的是激励学生理解为什么我们可能想要做证明(为什么证明是重要的,它们如何能帮助我们),并帮助学生在做证明的一些相对常规的方面。特别地,学生将学习以下内容:*证明可以帮助你真正看到为什么一个结果是真的;*容易陈述的问题可能很难解决(例如,费马的最后一个定理);*有时,看似直觉上明显的陈述可能会被证明是错误的(如辛普森悖论);一个问题的答案往往关键取决于你正在处理的定义;*如何开始校样;*如何以及何时使用定义和已知结果。该模块分为三个部分:为什么;如何(第一部分);如何(第二部分)通过实践,使学生能够熟练掌握这些日常的写作证明,从而使他们能够将注意力集中在更有创造性和更有趣的证明构建方面。学生完成所有三个部分后,将会有一份练习表。每个部分适合不同层次的观众,如下所述:适用于:基础、本科一年级和本科二年级学生。第1部分:原因:任何具有初级代数和素数知识的人,可以通过学习一级数学来获得。(基础)第2节:如何(第一部分)–适合具有初等代数知识(包括奇数、8的倍数和(a+b)的展开幂的二项式定理),以及从实数集到自身的函数(奇函数、偶函数、函数的乘法和复合)的任何人。(本科一年级)第三部分:How (Part II) –要求对实数级数的收敛性和发散性有一定的背景知识。可以获得修订表。乔尔·范斯坦博士是诺丁汉大学纯数学副教授。在剑桥大学读完数学之后,他在利兹大学攻读博士学位。他在利兹做了一年的博士后,然后在梅努斯(爱尔兰)做了两年的讲师,然后在诺丁汉找到了一个固定的职位。他的主要研究方向是泛函分析,尤其是交换巴拿赫代数。范斯坦博士发表了两篇关于他在本科生数学教学中使用信息技术的案例研究。2009年,范斯坦博士因在这一领域的成功创新而获得诺丁汉大学迪林勋爵教学奖
课程简介: This is a module framework. It can be viewed online or downloaded as a zip file. As taught in Autumn Semester 2009/10 The aim of this short unit is to motivate students to understand why we might want to do proofs (why proofs are important and how they can help us) and to help students with some of the relatively routine aspects of doing proofs. In particular, the student will learn the following: * proofs can help you to really see why a result is true; * problems that are easy to state can be hard to solve (e.g. Fermat's Last Theorem); * sometimes statements which appear to be intuitively obvious may turn out to be false (e.g. Simpson's paradox); * the answer to a question will often depend crucially on the definitions you are working with; * how to start proofs; * how and when to use definitions and known results. The module is organised into three sections: Why; How (Part I); How (Part II) With practice, students should become fluent in these routine aspects of writing proofs, and this will allow them to focus instead on the more creative and interesting aspects of constructing proofs. A practice sheet is included after students have completed all three sections. Each section is suitable for a different level of audience, as described below: Suitable for: Foundation, undergraduate year one and undergraduate year two students Section 1: Why: Anyone with a knowledge of elementary algebra and prime numbers, as may be obtained by studying A level mathematics. (Foundation) Section 2: How (Part I) – Suitable for anyone with a knowledge of elementary algebra (including odd numbers, multiples of eight and the binomial theorem for expanding powers of (a+b)), and functions from the set of real numbers to itself (odd functions, even functions, multiplication and composition of functions). (Undergraduate year one) Section 3: How (Part II) – Requires some background knowledge of convergence and divergence of series of real numbers. A revision sheet is available. (Undergraduate year two) Dr Joel Feinstein, School of Mathematical Sciences Dr Joel Feinstein is an Associate Professor in Pure Mathematics at the University of Nottingham. After reading mathematics at Cambridge, he carried out research for his doctorate at Leeds. He held a postdoctoral position in Leeds for one year, and then spent two years as a lecturer at Maynooth (Ireland) before taking up a permanent position at Nottingham. His main research interest is in functional analysis, especially commutative Banach algebras. Dr Feinstein has published two case studies on his use of IT in the teaching of mathematics to undergraduates. In 2009, Dr Feinstein was awarded a University of Nottingham Lord Dearing teaching award for his popular and successful innovations in this area
关 键 词: 模块框架; zip文件; 信息技术
课程来源: 信息不详。欢迎您在右侧留言补充。
最后编审: 2018-12-16:wrq
阅读次数: 30

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