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Teaching Spring 2017 Math1232

Basic Information

Course: Math 1232 Single-Variable Calculus II

Semester: Spring 2017;

Time: 01/17/2017-05/01/2017, Tue&Thu 02:20pm-03:35pm;

Location: Phillips B156

Instructor: Yanxiang Zhao, Phillips Hall 709

Phone: 202-994-0606

Email: yxzhao at email dot gwu dot edu

Office Hour: Tue&Thu 05:00pm--06:30pm or by appointment

TA: Trang Ha,

TA's Office: 724A  Phillips Hall,

TA's Office Hour: Mon&Wed 2:30-3:30pm

Course Description

This course introduces the calculus of exponential and logarithmic functions. L'Hopital's rule, techniques of integration, infinite series and Taylor series and polar coordinates.

Prerequisites

  • Math 1221 or Math 1231.

Textbook

  • Calulus by Stewart (with WebAssign & Smart Guide), 8th edition.

WebAssign

Students must use the class key listed below to enroll in the class: (a quick start guide [link])

class key: gwu 2291 0827

Learning Outcomes

As a result of completing this course, the students will be able to:

  • solve problems involving calculus of exponential and logrithmic functions;
  • Apply L'Hopital's rule to find certain type of limit problems;
  • Use techniques of integration to solve complex integrals;
  • analyze the convergence or divergence of a given infinite series.

Average minimum amount of independent, out-of-class, learning expected per week

More than 2/3 of the time you devote to this class should take place outside the classroom (lecture and recitation). Even the best students in the class should plan on spending an average of at least 6 hours a week on homework and other studying. Students who struggle with the material may need to spend more time in order to earn a grade they will find acceptable.

Calendar

Week Mon Tue Wed Thu Fri
01 Jan16 No class Jan17 Sec6.1:Inverse functions Jan18

Jan19 Sec6.2 Exponential functions

hw01

Jan20 Inauguration Day
02 Jan23 Quiz01 Jan24 Sec6.3 log functions Jan25

Jan26 Sec6.4 Derivatives of log functions

hw02

Jan27
03 Jan30 Quiz02 Jan31 Sec6.6 Inverse trig functions Feb01

Feb02 Sec6.8 L'Hospital's rule

hw03

Feb03
04 Feb06 Quiz03 Feb07 Sec7.1 Integ by part Feb08

Feb09 Sec7.2 Trig integrals

hw04

Feb10
05 Feb13 Quiz04 Feb14 Sec7.3 Trig substitution Feb15 Feb16 Sec7.4 Partial fraction hw05 Feb17
06 Feb20 President's day Feb21 Sec7.5 Strategy for integration Feb22 Feb23 Sec7.8 Improper integrals hw06 Feb24
07 Feb27 Quiz05 Feb28 Sec11.1 Sequences Mar01 Mar02 in-class midterm Mar03
08 Mar06 Quiz06 Mar07 Sec11.2 Series Mar08 Mar09 Sec11.3 Integral test hw07 Mar10 Last day to withdrawal
09 Mar13 Spring break Mar14 Spring break Mar15 Spring break Mar16 Spring break Mar17 Spring break
10 Mar20 Quiz07 Mar21 Sec11.4 Comparison tests Mar22 Mar23 Sec11.5 Alternating series hw08 Mar24
11 Mar27 Quiz08 Mar28 Sec11.6 Abslute convergence Mar29 Mar30 Sec11.7 Strategy for testing series hw09 Mar31
12 Apr03 Quiz09 Apr04 Sec11.8 Power series Apr05 Apr06 Sec11.9 Functions in power series hw10 Apr07
13 Apr10 Quiz10 Apr11 Talor series Apr12 Apr13 Sec8.1 Arc length hw11 Apr14
14 Apr17 Quiz11 Apr18 Sec8.2 Area of surface of revolution Apr19 Apr20 Sec10.1 Parametrized curve hw12 Apr21
15 Apr24 Quiz12 Apr25 Se10.2 Calculus with parametric curves Apr26 Apr27 Sec10.3 Polar coordinates hw13 Apr28
16 May01 Quiz13 May02 May03 May04 Reading day May05 Reading day
16 May08 May09 May10 May11 3-5pm Phillips B156 May12

NOTE: In accordance with university policy, the final exam will be given during the final exam period and not the last week of the semester.

Homework

Homeworks are assigned through WebAssign.

  • Solutions to sample questions in HW05 [pdf];
  • Solutions to sample questions in HW07 [pdf];
  • Matlab examples for Section 10.1 [Ex01],[Ex02],[Ex03];
  • Matlab examples for Section 10.3 [Ex01],[Ex02],[Ex03],[Ex04],[Ex05];

Quizzes

There are 13 15-minute quizzes, each out of 2 points, in recitation classes on Thursday. 10 highest quizzes counts for the final grade. NO MAKEUP QUIZZES for any excuses.

Exams

There will be one in-class midterm exam on March 02, and a final exam in the 16-17th weeks (May 08-16).

  • No makeup midterm exam for any excuse.
  • The final exam is cumulative and is scheduled by the Registrar's Office. The Spring 2017 final exam period is May 08-16. It is your responsibility to ensure that you do not have a schedule conflict involving the final exam.
  • Assistance of any type (notes in any form, books, etc.) is strictly banned during exams. Using the work of others on exams is strictly prohibited.
  • Sample midterm exam (PDF); Sample midterm exam solution (PDF); Formula Sheet (PDF); Midterm exam (PDF);
  • Sample final exam (PDF); Sample final exam formula sheet (PDF); Sample final exam solution (PDF);
  • Challenging sample final exam (PDF); Challenging sample final exam solution (PDF);

Grading

Your course grade will be determined by your cumulative average at the end of the term and will be based on the following scale:

A A- B+ B B- C+ C C- D+ D D-
95% 90% 87% 83% 80% 77% 73% 70% 67% 63% 60%

Your cumulative average will be the following weighted average:

homework quiz Midterm Final
Scheme 10% 20% 30% 40%

If you missed the midterm exam due to personal emergence (with offical supported document), the final exam will weight 70% in the cumulative average.

Class Policies

University policy on Religious Holidays:

  • Students should notify faculty during the first week of the semester of their intention to be absent from class on their day(s) of religious observance;
  • Faculty should extend to these students the courtesy of absence without penalty on such occasions, including permision to make up examinations;
  • Faculty who intend to observe a religious holiday should arrange at the beginning of the semester to reschedule missed classes or to make other provisions for their course-related activities.

Academic Integrity

Academic dishonesty is defined as cheating of any kind, including misrepresenting one's own work, taking credit for the work of other without crediting them and without appropriate authorization, and the fabrication of information. For the remainder of the code, see: http://www.gwu.edu/~ntegrity/code.html.

Support for Students Outside the Classroom

  • Disability Support Services (DSS): Any student who may need an accommodation based on the potential impact of a disability should contact the DSS office at 202-994-8250 in the Rome Hall, Suite 102, to establish eligibility and to coordinate reasonable accommodations. For additional information please refer to: http://gwired.gwu.edu/dss/.
  • University Counseling Center (UCC): The UCC (202-994-5300) offers 24/7 assistance and referral to address students' personal, social, career, and study skills problems. Services for students include: crisis and emergency mental health consultations; confidential assessment, counseling services (individual and small group), and referrals. For additional information please refer to: http://counselingcenter.gwu.edu/.

Security

In the case of an emergence, if at all possible, the class should shelter in place. If the buliding that the class is in is affected, follow the evacuation procedures for the building. After evacuation, see shelter at a predetermined rendezvous location.

Student Responsibilities and Classroom Courtesy:

  • You are responsible for knowing about all announcements made in class related to homeworks, exams etc., and for all material covered in class.
  • Be aware of the University's Code of Academic Integrity, see http://www.gwu.edu/~ntegrity for details. If cases of academic dishonesty arise, whether on homeworks, quizzes or exams, they will be pursued to their conclusion.
  • Each student must conduct him or herself in a manner that promotes a positive atmosphere, conveys mutual respect, and creates no distractions, thereby allowing all students to focus on our goal: learning NUMERICAL ANALYSIS. In particular:
  • cell phones, texting devices, laptops, and all other potentially distracting must be turned off during class;
    • cell phones, texting devices, laptops, and all other potentially distracting must be turned off during class;
    • everyone should make a serious effort to arrive promptly for the start of class;
    • except for serious reasons, once in class everyone should remain in class until the class is over;
    • apart from the lecture, students asking the instructor questions, and students responding to the instructor's questions, the class should be silent.

Questions

Everyone is strongly encouraged to ask questions during class, and during office hours! Should you need further assistance, you may consider hiring a tutor (the department keeps a list of tutors; copies are available outside Phillips Hall 739).

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