calculus ii instructor: veasna chiek e-mail: veasna.chiek...
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Calculus II Math 1B Course #46673 Syllabus, Summer 2020
Instructor: Veasna Chiek e-mail: [email protected] Office: MTSC 119 Phone: 951.222.8328 Website: http://websites.rcc.edu/chiek Office Hours: By appointment only Class Meeting Times Monday – Thursday from 10 – 1:30pm via CANVAS and ConferZOOM. COURSE DESCRIPTION Prerequisite(s): MAT 1A: Calculus I Techniques of integration, applications of integration, improper integrals, infinite sequences and series, parametric equations, polar coordinates, and conic sections. 72 hours lecture and 18 hours laboratory. STUDENT LEARNING OUTCOMES Upon successful completion of the course, students should be able to: 1. Employ the basic concepts of convergence and divergence of infinite sequences and series. 2. Derive Taylor Series and approximate polynomials of analytic functions. 3. Graph, differentiate, and integrate functions in polar and parametric form. 4. Evaluate definite, indefinite, and improper integrals using techniques of integration. 5. Solve applications of integration problems, including those involving area, volume, work, arc length and force.
REQUIRED TEXTBOOK AND MATERIALS 1. Single Variable Calculus Early Transcendental by Stewart 8th edition or E-book 2. Scientific Calculator 3. Computer/Tablet/Smart Phone all with internet access
IMPORTANT DATES
Last Day to Add 7/02 Las Day to Drop with Refund 6/26
Last Day to Drop without a “W” 7/01 Last Day to Drop with a “W” 7/21
Class Not in Session N/A Final Exam Date, Time and Room Thurs 7/30 from 10-1:30pm
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Grading Your grade will be based on Homework and 4 exams.
Grade Break Down Percentage of Grade Grading Scale Letter Grade Homework 30% 90-100% A Exams 70% 80-89% B 70-79% C 60-69% D Below 60% F
Homework Homework will be assigned daily and due the following class period. If an assignment takes more than one sheet of paper, you are to staple it together. All homework must have the proper heading to receive any credit (see below). In addition, instructions and problems are to be written out before you begin the actual work. You should still write out the problems that you do not know how to do, but leave space so you can go back and fill it in. Focus your efforts on doing homework well and it will pay off in the future. All homework will be turned in through CANVAS by uploading a pdf. Only 1 pdf per homework assignment.
Exams There will be 4 exams and each exam will be weighted the same. All exams will be done on Zoom where you are to have a camera on you and your workspace. This is to prevent cheating. I do not drop any exams and there will be no make-up exams. Suggested Technology Scanning Apps: Scannable (iOS), CamScanner (android), and ScanBot (iOS and android).
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Classroom Policies Attendance, classroom participation and homework are expected at every class meeting. It is very important for students to attend, engage and do homework on a regular basis. Attendance will be taken daily and any student who misses more than 2 ZOOM lectures prior to the last day to drop date may be dropped from the course. However, do not rely on the instructor to drop you from the course. If you choose to drop the class, it is your responsibility to complete the appropriate procedures. If an issue shall arise, then please feel free to contact me. Do not wait till after the fact. Students are expected to observe The Standards of Student Conduct as listed in the Student Handbook. If you have a documented physical disability or learning disability requiring accommodation for this class, please contact the office of Disability Resource Center (DRC) at (951) 222-8060 located in CAK 130. Plagiarism and Cheating Plagiarism is a form of cheating. Make sure that your work is original. Any time you use someone else’s work and do not give that person credit, it is plagiarism. If you are “suspected” of plagiarism, you will bear the burden of proof. You must be able to present rough drafts or related materials and discuss the topic intelligently. This is important because I must be able to gauge what you have learned. Copying the work of another person, whether homework problems or answers during a test, is considered plagiarism. Copying the work of another person, even though some cultures consider this sharing work, is considered plagiarism at RCC, an act of academic dishonesty. The administrative officer will make note of the offense in the student’s educational records. A second instance of academic dishonesty may result in expulsion proceedings. Any tuition and applicable fees will not be refunded as a result of disciplinary action for academic misconduct. In other words, “Just don’t do it!” Communication in Class I will communicate with you outside of class through an app called Remind, CANVAS and sometimes email. Thus, text @m1bsum20 to 81010 or 951.643.4181 to be on my remind text list. Preferably, you can download the remind app, select “Join a Class” and enter the class code @m1bsum20 and instead of getting a text, you’ll receive push notifications through the app. Moreover, I encourage you to ask questions during our online discussions. Finally, please note that as the course develops, I reserve the right to modify the syllabus!
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Math 1B Summer 2020 Tentative Teaching and Testing Schedule # Due Date Sec. Topics Exercises Score
1 5.3 The Fundamental Theorem of Calculus 2,8,11,17,22,29,35,43,55,62,63,68,69
2 5.4 Indefinite integrals and the Net Change Theorem 2,10,12,16,18,27,35,38,40,46,60,61
3 5.5 The substitution rule 7,10,11,17,21,23,40,42,48,60,65,70,88,89 4 7.1 Integration by parts 3,7,10,12,16,21,27,32,36,38,40,42,57,58 5 7.2 Trigonometric integrals 3,6,10,14,17,20,23,26,31,33,36,40,44,48 6 7.3 Trigonometric substitution 4,7,12,16,19,23,26,30
7 7.4 Integration of rational functions by partial fractions 12,16,20,34,40,47
8 7.5 Strategy for integration 1,7,14,22,31,32,39,45,52,57,65,67,74,80 9 7.8 Improper integrals 1,9,10,13,16,21,24,26,29,33,36,40,50,52,54 7/2 Exam 1 10 7.6 Integration using tables 3,7,9,11,14,17,20,24,26,30 11 7.7 Approximate integration 10,11,15,18 12 6.1 Area between curves 1,4,11,12,19,25,26,29,31,50,53 & Sec 7.1 #57,58 13 6.2 Volumes 1,6,9,13,15,18,21,25,28,42,48,54,55 14 6.3 Volumes by cylindrical shells 2,4-6,9,10,12,13,15,16,18,19,25,31,38,42 & Sec 7.1 #61-64 15 6.4 Work 3,5,7,9,13,15,21,22,23 16 6.5 Average value of a function 1,3,6,9,13,15,21,22,23 17 8.1 Arc length 2,7,10,13,16,17 18 8.2 Area of a surface of revolution 5,7,9,12,14,15,16,26,28
19 8.3 Application to physics and engineering Part I 3-11,14,15
20 8.3 Application to physics and engineering Part II 21,24,25,27,29,31
21 9.3 Separable Equations 3,8,10,11,15-18,20,21 7/16 Exam 2
22 10.1 Curves defined by parametric equations 4,7,9,13,15,17,20,22
23 10.2 Calculus with parametric curves 2,4,6,8,14,16,25,29,31,33,34,37,39,41,44,48,61,63,66 24 10.3 Polar coordinates 30,32,33,36,38,40,42,46,56-64even
25 10.4 Areas and lengths in polar coordinates 2-12even, 18-42even, 46,48
7/23 Exam 3 26 11.1 Sequences 4-52eoe, 72-79 (eoe = every other even) 27 11.2 Series 6,8,15,18-48even, 52
28 11.3 The Integral test and Estimates of sums 4-32even
29 11.4 The Comparison tests 4-32even 30 11.5 Alternating series 2-20,34
31 11.6 Absolute convergence and the Ratio and Root test 2-38even, 43
32 11.7 Strategy for testing series 2-38even 33 11.8 Power series 2-28even
34 11.9 Representation of functions as power series 4,6,8,12,16,18,20,26,28
35 11.10 Taylor and Maclaurin series 5,8,12,16,22,32,36-42even, 43,56,61-65,74-80even
36 11.11 Application of Taylor polynomials TBD
7/30 Exam 4