MAT 170 - Fall 2007

MAT 170 : Calculus I

Homework Schedule	Your Grade	Basic Etiquette and Expectations
WebCT	Class Participation	Academic Honesty
Some Documents & Links	Exams	Disabilities
Course Description	Class Attendance	Questions
Class Schedule	Study Sessions
Your Professor	Computers & Maple	Some Final Thoughts
Your Textbook	Some Thoughts on Exercises

Course Description

The topic of this course is the calculus: a mathematical approach to working dynamically with the concept of change. The solutions of the seemingly disparate questions of finding tangent lines and computing areas beneath curves were united by Leibniz and Newton in the 1700's, producing powerful computational tools that fundamentally altered the sciences and our world. Calculus I is the first in a two-course sequence that provides an in-depth discussion of functions and the single-variable calculus.

We will spend most of our time in Chapters 1, 2, 3, 4, 7 of Calculus, 8th edition. We begin with the notion of "limit" (Chapter 1) which enables the transition from pre-calculus mathematics to the calculus. We then take up the study of "derivatives" and their applications (Chapters 2 and 3) including the solution of tangent line questions. We finish the course with an investigation of "integrals" and their applications (Chapters 4 and 7) including the solution of area questions. By the end of the course, you will have developed a thorough understanding of Leibniz's and Newton's insights.

The official Centre College Catalog description of MAT 170 is:
An introduction to single variable calculus reviewing the real number line, inequalities and absolute value, and discussing functions and graphing, limits, continuity, the derivative, rules of differentiation, the Mean Value Theorem, applications of the derivative, antiderivatives, Riemann sums and the definite integral, the Fundamental Theorem of Calculus, and applications of the integral.

Class Schedule

Our class meets:

Section	Meeting Time	Meeting Place
A	MWF 11:30 - 12:30	Olin 123
B	MWF 12:40 - 1:40	Olin 122

Your Professor

My name is Alex McAllister and I am teaching MAT 170 for Fall 2007. My office is Olin 117, my telephone number is 238 - 5408, and my e-mail address is: alex.mcallister@centre.edu. If you need to speak with me, we can chat before or after class, or you can stop by my office. I have an "open door - come on by" policy, although the best times are during my office hours or during individually scheduled appointments. You might also be interested in visiting my home page at http://web.centre.edu/alexmcal/.

Your Textbook

The textbook for this course is: Calculus, 8th Edition, which was written by Ron Larson, Robert Hostetler, and Bruce Edwards, is published by Houghton Mifflin Company, and has ISBN 0-618-50298-X. You will also need to access a copy of Appendix D online through the Houghton-Mifflin website: click here.

Your Grade

Your grade in Calculus I is determined by:

Class Participation	150 points	25%
Midterm Exams (3)	300 points	50%
Final Exam	150 points	25%

My usual grading scale is A: 100-85, B: 84 - 75, C: 74 - 65, D: 64 - 55, and U: 54 - 0. In addition, your final letter grade is influenced by class attendance; see Class Attendance below for more details.

This grading scale is a result of two elements of my practices in testing and grading. First, I often include at least one question on your exams that requires some original thought and creativity. You deserve to be asked such questions and I hope you will enjoy the challenge and the opportunity these questions present. Second, I expect you to articulately express focused and complete solutions to the questions you are answering. When grading, I carefully consider your responses and provide the feedback you deserve in light of the effort you will take to craft your answers. In my experience, this combination of challenging questions and thorough responses helps students learn a lot of mathematics really well.

As the term progresses, I will provide a summary of your grades and announce a grading scale after each exam -- this should enable you to have a clear idea of your standing in the course throughout the term. For further details concerning grades, see pages 23 - 25 of the Centre College 2007 - 2008 Student Handbook.

Class Participation

Class participation is an essential part of the course -- mathematics is not a spectator sport! For this course, class participation consists of class discussion, papers, homework exercises, and reading assignments. The 150 points for class participation is split up: 60 points for class discussion and papers; and 90 points for daily quizzes, homework exercises, reading questions, and Maple assignments.

There are several components to class discussion. You are expected to attend every class; unexcused absences result in the lowering of a grade as detailed under Class Attendance. If you are running late, come to class as soon as you can -- we will live by the adage: "Better late than never!" During class, you are encouraged to make comments, ask questions, and hop in any time during the conversation. Finally, there are the intangibles: positive attitude, general interest and attentiveness, and a willingness to give every question some good solid effort.

During the term, you will write a response paper What can I do with Mathematics? and a couple of group projects -- Graphs and Limits of Trig Functions and Demonstrating the Fundamental Theorem. These papers provide you an opportunity to reflect on some questions relevant to your study of mathematics in general and of the calculus in particular. You will submit hard copies of these papers to me and electronic copies to turnitin.com, the standard service used by the college for assessing the originality of student papers. More details about these papers are available on the Homework Schedule webpage.

Quizzes are taken every day at the end of class; there are no make-up quizzes. The quizzes will cover the material we studied the previous class. While taking the quiz you are free to consult the homework you will submit with your quiz that day. On the other hand, you may not consult the textbook nor your in-class notes. If you do your homework every day and look over your notes a bit before class, then you should do fine on the quizzes, and they should ultimately help you succeed on the midterm exams.

Homework is an essential daily aspect of this course -- you must do math to learn math! In this sense, homework is assigned for your benefit; to provide important practice with the ideas and techniques we study, enabling you to achieve mastery of the calculus. Homework assignments are found on the Homework Schedule webpage.

The first part of your homework consists of various exercises assigned from the section we are currently studying. The solutions you present must be complete, coherent, and well-organized. The second part of your homework consists of a reading assignment and reading questions. You should read the appropriate section of your book before coming to class and submit your answers to the reading questions with your homework exercises. For some of my thoughts on reading mathematics texts click here.

Homework is assigned daily and collected at the end of the following class period; late homework is not accepted. For excused absences, you should arrange to have your homework submitted by the end of the class period in which the assignment is due. When your quiz/exercise/reading paper is returned, you will find the grade reported on a 7 point scale - 5 for quizzes, 1 for exercises, and 1 for reading. In addition, each Maple assignment will be graded on a 2 point scale. At the end of the term, the 2 lowest grades are dropped, the remaining grades summed, and the result normed to the 90 points of your Class Participation for the daily quizzes, homework exercises and reading assignments.

Exams

As mentioned above, there are three Midterm Exams and a Final Exam in Calculus I. These exams are intended to provide both of us some measure of your knowledge and understanding of the ideas of Calculus I -- we are both hoping for great success on these exams! The Midterm Exams are one hour in length and are given during class. The exam schedule has already been established and is given below. If you have an excused absence for a college activity, please let me know at the beginning of the term; in addition, you must make arrangements with me for a make-up exam at least one week in advance of the actual exam. The exams will take place on the following dates and times:

Exam	Date	Time
Midterm Exam 1	September 19th	one hour in-class
Midterm Exam 2	October 17th	one hour in-class
Midterm Exam 3	November 14th	one hour in-class
Final Exam for Section A	December 6th	8:30 - 11:30
Final Exam for Section B	December 3rd	1:30 - 4:30

Class Attendance

You are expected to attend every class. The time we share together in class is an essential aspect of the learning process and experience of MAT 170.

The college has made provisions for excused absences for official college-sponsored activities and for verified medical illness. If you will miss class for these reason, you must follow the procedures established by the college. I would also appreciate personal contact from you, especially when we must make arrangements for submitting work. For further details concerning class attendance and absence policies, see pages 19 - 20 of the Centre College 2007 - 2008 Student Handbook.

In the past, some of my students have chosen to take unexcused absences from class. My observation is that this has a detrimental impact on the learning process. In order to help highlight this impact and to emphasize the importance of class attendance: after three unexcused absences, every additional absence will result in a one-third letter grade reduction of your final course grade.

Study Sessions

Mathematics study session information is available on the mathematics homepage: click here. Study sessions for both sections of MAT 170 are from 8 - 9 PM on Sunday, Tuesday, and Thursday nights in Olin 122. A tutor will be available during this time to discuss ideas and work through exercises (see the section on Academic Honesty below). You can also just come by the tutoring room with some friends and use the time and space to work on your homework together -- with a local expert on hand to help you think through any rough spots.

Computers and Maple

Computers are absolutely wonderful tools that enable us to do many things that would otherwise be impossible. Working with them can also be incredibly frustrating and difficult. During this term, I expect that we will experience both the euphoria and the despair of computers as we use these machines to facilitate our study of the calculus.

At Centre, we use the computer algebra system Maple 11 in our calculus courses. This program is loaded with a plethora of calculus commands and algorithms. A basic tutorial introducing Maple 11 is available in the Help menu for this program. Maple 11 is available in the following labs:

Olin 023 with 18 machines open 24/7,
Olin 107 with 28 machines open 8-5 M-F,
Olin 110 with 4 machines open 24/7,
Yerkes with 8 machines open 24/7,
Young 113 with 6 machines open 8-5, M-F,
Young 137 with 22 machines open 24/7.

We should also keep in mind that, although calculators and computers are wonderful tools, proficiency in their use is no replacement for genuine understanding of the ideas of calculus. As you continue your study of mathematics and other areas of inquiry, you will learn the software packages that are particularly suited to the culture of your chosen field -- but the calculus, the mathematics, underlying these packages is the same in all these areas. Mastering the ideas of calculus will enable your success in whatever area you study and work.

Some Thoughts on Exercises

I really enjoy thinking about why various mathematical statements are true. Most of the time I start by looking at some examples that seem to be related. Sometimes these examples will have some common property and by looking at how that property develops in the examples, I can understand a reason why a statement is true. Such a reason will often be a main idea in an exercise or an argument for why the mathematical statement is true.

Looking at examples, crafting proofs, and solving exercises takes a lot of time. In contrast to many activities in our fast-paced society, solving the types of exercises we will consider and writing complete solutions requires focus, attention, perseverance, and effort every day. Students do not successfully cram for an exam in this class! Learning math is a lot like being a part of a sports team -- players must practice every day. Most students say that studying at least ten hours a week is a minimal requirement. You should explicitly think about your schedule and when you can make the study time you need to succeed in this course.

As with most things that require great effort, the rewards are tremendous. I am confident that you will see your computational and theoretical abilities in calculus improve each week of this term. And more importantly, you will experience a positive change in how you think, and explore ideas, and express your insights into our world.

Basic Etiquette and Expections

I want to highlight a few basic points of class etiquette and expectations. I hesitate to mention them, but they are also noted in response to real life experiences. You should aspire to not motivate an addition to the following list.

attend every class,
prepare for class (this includes completing your homework and taking a few minutes to glance through your notes before coming to class),
wear proper classroom attire (proper dress is a reflection of our respect for our educational endeavor),
arrive and get settled into your seat before the bell rings so that we may begin class on time,
if late, come to class as soon as possible; better late than never,
if late, take a seat near the door,
if leaving early for an excused absence, please let me know and sit near the door,
stay awake and alert during class (naps are best taken in a bed or on a couch, which are not standard classroom furniture),
eating and drinking should be taken care of before or after class, or at least done discreetly (many chip bags make loud crinkly noises that can be distracting),
turn off (or choose not to bring) cell phones and other noisy electronic devices to class; we'd both prefer not to have class interrupted by beeps and/or songs,
ask questions during class and do not let too many moments of confusion and uncertainty drift past you; class is a time to learn and your questions will be of interest to others,
talking during class is encouraged, provided that it is primarily devoted to mathematics (making weekend plans and insulting fellow classmates are not mathematics),
writing during class is encouraged, provided that it is primarily devoted to mathematics (completing homework and papers for other classes and organizing calendars are not mathematics),
reading during class is encouraged, provided that it is primarily devoted to mathematics (most newspapers and humanities textbooks do not contain mathematics),
feel free to use the restroom during class (although daily visits to the restroom 15 minutes into class are discouraged),
come to class and to office hours with a list of questions about specific exercises or topics; occassionally "I have no idea what is going on" is an appropriate opening statement, but most often you should take the time to identify your points of confusion to help us make the best use of our time together.

Academic Honesty

The guiding principles are: honesty, trust, fairness, respect, and responsibility. Work on all exams must be your own. Collaboration on homework is encouraged and expected. You should spend some time in individual concentration to gain the full benefit of the homework and, in fact, a small handful of people do well in this course working on their own. However, most benefit from talking with their classmates about the material being studied. On the other hand, copying homework is discouraged. You should not leave a study group with your paper or your homework ready to be turned in; write up your homework by yourself. For further details concerning academic honesty, see pages 21 - 23 of the Centre College 2007 - 2008 Student Handbook.

Disabilities

I encourage students with disabilities, including but not limited to disabilities such as chronic diseases, learning disabilities, and psychiatric disabilities, and students dealing with other exceptional circumstances to speak with Centre College's Assistant Dean for Student Advising, Mary Gulley, to obtain support services. I will happily abide by Dean Gulley's recommendations.

You should be reassured that Centre College is committed to making its programs accessible to all. In the higher education setting, the student is responsible for informing the college of disabilities that require accommodations and the student must initiate the process for obtaining appropriate accommodations immediately -- accomodations for disabilities cannot always be granted at the last minute and will not be granted after the fact. For further details concerning the academic aspects of disability services, see page 61 of the Centre College 2007 - 2008 Student Handbook.

Questions

If you have any questions about this syllabus or about the material we study during this course, ask me during class or stop by my office to talk with me. Although I enjoy mathematics, I am not here just to have fun. My primary goal is to help you learn and understand the calculus. Your questions are an esssential part of your learning process and I can help you find your answers.

In addition, I expect that you will spend time talking with your classmates about the ideas we are studying. Often mathematics is pursued as a solitary endeavor and there are many times when focused, individual effort is essential. But just as important is the time you spend working with your colleagues to find answers to your questions. Before you leave the first class, you should know how to be in touch with at least one of your classmates.

In many ways, mathematics is really about asking questions and then searching for, and hopefuly finding, truths in answer to our questions.

Some Final Thoughts

The science of Pure Mathematics, in its modern developments, may claim to be the most original creation of the human spirit.

Alfred North Whitehead

Whatever is true, whatever is honorable, whatever is just, whatever is pure, whatever is lovely, whatever is gracious, if there is any excellence and if there is any thing worthy praise, think about these things.
Phillipians 4:8

Here's another reason to study calculus: because calculus is among our species' deepest, richest, farthest-reaching, and most beautiful intellectual achievements.
Arnold Ostebee & Paul Zorn