Mar. Introduction (a) Course Content page 3 (b) Prerequisites page 3 (c) Required Materials page 3 (d) E-Learning in Canvas page 4 (e) Lecture Videos page 4 (f) Success page 4 (g) Students with Disabilities page 5 (h) Academic Honesty page 5 (i) Plagiarism page 6 2. Use OCW to guide your own life-long learning, or to teach others. 22 Q4 Section 4.5 l’Hopital’s rule. Jan. 20 Section 2.1 & 2.2 The limit of a function. Harvard has provided contact information for you to get help if you have technical difficulties with Zoom. Apr. Applications. answers to common textbook-related questions (and tips to get an inexpensive book), we will use to explore the epsilon-delta definition of the limit, for you to get help if you have technical difficulties with Zoom. Lecture
Required Text and Optional Materials:The required textbook for this course is: Calculus: Concepts and Contexts,4th ed., by James Stewart, Brooks/Cole 2010. Optional:Student Solutions Manual, Single Variable ISBN 0-495560618 by Jeffrey A. Cole, Study Guide ISBN 495560642 by Dan Clegg, Scientific Notebook software, single version, Doing Calculus with Scientific Notebook, by Daniel W. Hardy, Carol L. Walker. » [���v"Es�j���6i�+!5�9��י�;+���ϟ�����~VS�\���V�c���t[�dN�K��a. Feb. 1 Section 3.1 An introduction to the derivative. Welcome to Mathematics E-15: Calculus I ... 1 December 2020 1 Previous month Next month Today Click to view event details. Course Rationale:This course is the first course in the traditional calculus sequence for mathematics, science and engineering students. Each homework is worth 15 pts: 8(15 = 120 pts
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All section numbers refer to James Stewart, Calculus: Early Transcendentals, 8th Edition. 24 Section 4.6 & 4.7 Optimization in physical sciences, etc. The fundamental theorem of calculus. Section 012
Feb. 15 Section 3.5 The chain rule. Mar. » MATH 2413-012, 013, Calculus I Michael McCarthy, Ph.D. Fall 2012 223 3294. Sketch the graph of a function using asymptotes, critical points, and the derivative test for increasing/decreasing and concavity properties. MIT OpenCourseWare is a free & open publication of material from thousands of MIT courses, covering the entire MIT curriculum. Partially fulfills Core Mathematics requirement. course grading. Other hours by appointment . It is always the student’s responsibility for missed class assignments and/or course work during their absence. Topics include inequalities; functions; limits; continuity; the derivative; differentiation of algebraic functions and trigonometric functions; Newton's method; applications of the derivative; the integral; integration of algebraic functions and the sine and cosine functions; numerical integration; and applications of the integral. Friday, May 6, 10:30 a.m.-1:00 p.m. Derivative as a function.