Cornell University
Mathematics 111-Calculus

Section: 01
Lecture: MTWRF 8:30-9:45 a.m. in Malott Hall, room 406
 
Instructor: Michael Kozdron
Office: 112 Malott Hall
Phone: 532-9410
Email: kozdron@math.cornell.edu
Course Home Page: http://www.math.cornell.edu/~kozdron/Teaching/Cornell/111Summer03
Office Hours: After class, or by appointment

Required Materials:

Optional Materials: Course Description:
4 credits. Course topics include: functions and graphs, limits and continuity, differentiation and integration of algebraic, trigonometric, inverse trig, logarithmic, and exponential functions; applications of differentiation, including graphing, max-min problems, tangent line approximation, implicit differentiation, and applications to the sciences; the mean value theorem; and antiderivatives, definite and indefinite integrals, the fundamental theorem of calculus, substitution in integration, the area under a curve. Graphing calculators are used, and their pitfalls are discussed, as applicable to the above topics. MATH 111 can serve as a one-semester introduction to calculus or as part of a two-semester sequence in which it is followed by MATH 112 or 122.

Prerequisites:
MATH 109 or 3 years of high school mathematics, including trigonometry and logarithms.

General Policies:
The policies on this page supplement those of the Cornell Summer Session which may be found here. Note that "the responsibility for administration of faculty and university policy with respect to academic integrity is exercised by the dean of the School of Continuing Education and Summer Sessions." Students should note that "every summer registrant is considered a student and is subject to the general regulations governing student conduct that apply to all other students of the university." Further information about student conduct is available here. Although this is a summer class, it is expected that the material covered in Math 111 remains consistent from semester to semester. For that reason, we will cover the same material as during the fall and spring sessions, and have a comparable final exam.

Grading Information:
Your final grade will be determined by your performance in the course, including class participation, homework, prelims, and the final exam.

Evaluation Type Number Percentage of Final Grade
Class Participation - 5%
Homework 6 10%
Prelim Exams 2 35%
Final Exam 1 50%

Class Participation:
This catch-all category is intended to help encourage student participation in this class. There are three basic forms of "participation" which include: answering questions in class, attending office hours, and completing quizzes. I will be available for extra help after most classes, and I strongly encourage you to stay around and ask questions if something is difficult. There will also be quizzes held most days which will consist of one or two short computational questions. The purpose of the quizzes is to ensure that the students are mastering the absolute basics of the course, and are attempting to keep up with the material.

Homework:
As discussed on the Words of Wisdom handout, it is not possible to cover all of the required material in lecture. As a result, each student must take an active role in his or her own education. Mathematics is not a spectator sport. It cannot be learned passively only by watching the instructor lecture. Instead it must be learned by doing. Consequently, most of what you learn in this course will be the result of working exercises that are designed to reinforce key concepts, develop skills, and test your understanding of the material. Before you try working the exercises, however, do the reading assignment. Reading the text will help you review the important concepts before you start on the exercises. Some of the exercises are straightforward, others are very complex. After each class meeting, you should work all problems assigned from the section discussed that class. Assignments will take on the average 6-10 hours. You are encouraged to talk with your classmates about the homework; you might even want to form a study group to work together on the most difficult homework problems. However, all problems you submit must be your own work. It is dishonest, and a violation of Cornell's Code of Academic Integrity, to submit someone else's work as your own.

Prelim Exams:
There will be two major term tests, known at Cornell as Prelim Exams, that will be given during the semester. All prelims will be closed-book, and graphing calculators will be allowed, provided they cannot perform symbolic differentiation and integration, such as the TI-92. Each prelim will be a comprehensive test of all of the material covered on the syllabus before that prelim, including lectures, assigned readings, and homework assignments.

Final Exam:
As with the prelims, the final exam will be closed book and graphing calculators will be allowed, provided they cannot perform symbolic differentiation and integration, such as the TI-92. The final exam will be comprehensive and cover all of the material listed on the syllabus.

Exam Dates:
The prelims will take place during the regular class time on the dates listed below. The final exam will take place in our usual classroom at a time scheduled by the Summer Session registrar.

It is possible that these dates may include Religious Holidays for some students. NYS Education Law section 224-A mandates that faculty make available an opportunity to make up any examination missed because of religious beliefs. In order to facilitate preparation of makeup exams, I request that students intending to be absent in order to observe a religious holiday notify me by June 30, 2003.

Policy for Missed Classes, Missed Prelims, and Missed Final Exam:
Students should familiarize themselves with the section on Class Attendance, Meeting Times, and Examinations on pages 13-15 of 2002-2003 Courses of Study.

Web Site:
I have written a web site for this course. The URL is http://www.math.cornell.edu/~kozdron/Teaching/Cornell/111Summer03/. I will be updating this site throughout the term and you will be able to download any handouts that you don't get in class. I've included information about the course, the textbooks, and calculus in general.

Email:
Email will be a significant form of course related communication between both students and the instructor. Therefore, please check your email regularly for course updates and homework/prelim information. Feel free to email your questions to me. I will endeavour to respond within 24 hours. Should you not receive a reply within 24 hours, try sending the message again, or ask me in person if I received your mail.

Academic Integrity:
For a university community of scholars, academic integrity is the heart of intellectual life-both in learning and in research, to paraphrase the section on Academic Integrity in Arts and Sciences on page 411 of 2002-2003 Courses of Study. Students should read carefully Cornell's Code of Academic Integrity and not assume they understand what integrity and cheating are and are not. Academic integrity most certainly implies more at the university than it did in high school. The standards of integrity are those that prevail in professional life. Students must acknowledge and cite ideas they adopt from others (not just direct quotations), and understand the general standards and policies of academic integrity, as well as specific expectations in individual courses. When in doubt, ask!

Therefore, students are expected to abide by Cornell University policies, including the campus Code of Conduct and the Code of Academic Integrity, as described in the Policy Notebook, and should pay particular attention to section I.C of the Code of Academic Integrity.

Section 01 Home Page * Cornell Mathematics Department
Michael Kozdron
5/9/2003