麻省理工开放课程：单变量微积分 Single Variable Calculus 共39课更新完毕[MP4]

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资源信息： 中文名: 麻省理工开放课程：单变量微积分 英文名: Single Variable Calculus 资源格式: MP4 课程类型: 数学 学校: 麻省理工 MIT 主讲人: Prof. David Jerison 版本: 共39课更新完毕 发行日期: 2006年 地区: 美国 对白语言: 英语 概述:

课程介绍： 本微积分课程内容包括介绍单变量函数的分化，整合与应用。 网友评论： --教授也忘了三角函数和差化积公式,上课很风趣. --不是忘了，我相信他，也许是授课的艺术，故做不知让学生回忆。 --喜欢美国的教学方式~ 导师介绍

David Jerison received the A.B. from Harvard in 1975, and the Ph.D. from Princeton in 1980 under the direction of Elias Stein. Following an NSF postdoctoral fellowship at the University of Chicago, Professor Jerison joined the MIT mathematics faculty in 1981. His research is focussed on PDEs and Fourier analysis. He served as Chair of the Undergraduate Mathematics Committee, 1988-91, Chair of the Pure Mathematics Committee, 2002-04, and co-Chair of the Graduate Student Committee 2007-09. He is currently Chair of the Pure Mathematics Committee and directs SPUR, the mathematics department's summer undergraduate research program as well as the mathematics component of RSI (Research Science Institute) a summer science and engineering research program for high school students. A prior Sloan research fellow and Presidential Young Investigator, Professor Jerison was elected Fellow of the American Academy of Arts & Sciences in 1999. In 2004, he was selected for a Margaret MacVicar Faculty Fellowship for a ten-year period. 截图：

注： 1.我会把麻省所有的微积分课程发出来，大约200个视频，有需要的同学请关注。 2.课件：http://ocw.mit.edu/courses/mathematics/18-...e-notes/，因为官网速度下载较快，这里暂不提供。 3.2003秋季课程：单变量微积分汉化网页，仅供参考，因为我发的是06年的，内容不一样：http://www.myoops.org/cocw/mit/Mathematics...ndex.htm 目录: Lecture 01: Derivatives, slope, velocity, rate of change Lecture 02: Limits, continuity. Trigonometric limits. Lecture 04: Chain rule. Higher derivatives. Lecture 03: Derivatives of products, quotients, sine, cosine. Lecture 05: Implicit differentiation, inverses. Lecture 06: Exponential and log. Logarithmic differentiation; hyperbolic functions. Lecture 07: Continuation and Review Lecture 09: Linear and quadratic approximations Lecture 10: Curve sketching Lecture 11: Max-min problems Lecture 12: Related rates Lecture 13: Newton's method and other applications Lecture 14: Mean value theorem; Inequalities Lecture 15: Differentials, antiderivatives Lecture 16: Differential equations, separation of variables Lecture 18: Definite integrals Lecture 19: First fundamental theorem of calculus Lecture 20: Second fundamental theorem Lecture 21: Applications to logarithms and geometry Lecture 22: Volumes by disks and shells Lecture 23: Work, average value, probability Lecture 24: Numerical integration Lecture 25: Exam 3 review Lecture 27: Trigonometric integrals and substitution Lecture 28: Integration by inverse substitution; completing the square use Lecture 29: Partial fractions Lecture 30: Integration by parts, reduction formulae Lecture 31: Parametric equations, arclength, surface area Lecture 32: Polar coordinates; area in polar coordinates Lecture 33: Exam 4 review Lecture 35: Indeterminate forms - L'Hôspital's rule Lecture 36: Improper integrals Lecture 37: Infinite series and convergence tests Lecture 38: Taylor's series Lecture 39: Final review