Text: Differential Equations, 2nd Edition by Paul Blanchard, Robert L. Devaney, and Glen R. Hall.
Grading: The grade will be calculated based on 5 components:
Homework assignments Guidelines for submitting your homework |
10% of the final grade |
Projects (Two) Writing guidelines |
Each is 10% of the final grade |
Quizzes | 10% of the final grade |
Tests (Three) | Each is 15% of the final grade |
Final examination | 15% of the final grade |
In addition, regular class attendance and class participation are expected. Due to the nature of the course, a failure to fulfill these expectations will result in a lower course grade.
Homework Assignments: For every section that we cover, I will suggest quite a few practice problems for you to work on. The only way to truly learn mathematics is by doing mathematics. For this reason, the suggested problems are probably the most important aspect of the course. Of the suggested problems, a few will be designated "homework problems" and will turned in and graded. Your homework grade will be based on these. However, let me emphasize that the problems you turn in will not provide sufficient practice to make you proficient in the ideas; it is expected that you will work all of the suggested problems as we cover the appropriate sections in the text. At times you may feel the need to work even more problems; if so, I invite you to do that. I encourage you to come to my office hours to discuss any questions that you have regarding the problems.
Beyond just providing practice, the problems are meant to be extend and deepen
the understanding you have gained from the reading and the class period. The problems are not always easy, but
the thought that goes into them always pays off in the long run. All of this means that much of the learning you
do will be done outside of the classroom, but it doesn't mean that when class is dismissed you are on your own.
I strongly recommend that you discuss concepts and solution techniques with your fellow classmates. Furthermore,
I hope that you do not consider office hours to be a last resort. Office hours are an important part of any class,
and I plan to make myself available to you whenever possible. There is much that can be done to explain material
on a one-on-one basis that is just not possible in large group setting.
Guidelines for submitting your homework:
Note: Suggested problems that are not turned in as homework problems may show up on weekly quizzes or exams.
Projects: Expressing your ideas in writing is essential in any discipline, including mathematics. There will be two class projects this semester, both of which require the submission of a mathematical paper. The process of writing a paper has two major components. The first is to work out the mathematical details of the problem that you were assigned. The second is to make sense of those mathematical details and to organize them into a coherent narrative. The paper may very well include symbols, computation and graphs; however, these will need to be accompanied by generous verbal explanations that explain the mathematical ideas. You will be expected to write clearly and coherently, using correct mathematical and English grammar. You will be working with one or two partners on each project, and your group will turn in a single paper. Assignments are not considered submitted until physically in the possession of the instructor. One point will be deducted for each hour a project is late.
Writing math papers: Write as if your intended audience was a fellow student in the course who has not considered the question you have been asked to write on. In other words, the instructor is not your intended reader; you are writing to a first-time student of calculus who knows only what you knew when you began to work out the details of the topic on which you are writing. The essay must not assume your reader has access to a statement that defines the problem. You thus need to provide introductory material and diagrams that set up the problem as well as explaining the solution to it.
Quizzes: Weekly quizzes will be given in this course after the first week, except
on weeks when you have an exam. In addition, the instructor reserves the right to give a pop quiz at any time during
the course. No makeup quizzes will be given. Quizzes will be reflective of examples done in class and suggested
problems. The lowest quiz grade will be dropped.
Tests: You will have three major tests during the semester. The second will cover mostly the material which has been covered since the first test; likewise, the third will cover mostly what has been covered since the second. However, you will be responsible for all the material covered in the course in as much as it relates to the topics being tested.
First Test | Monday, February 9, 2004 | |
Second Test | Wednesday, March 31, 2004 | |
Third Test | Wednesday, April 28, 2004 | * |
Final Examination | Wednesday, May 12, 2004 | From 6:30-9:30 p.m. |
Note the timing of the third test. Do not plan to leave early for Thanksgiving break. If you are accepting a ride from someone else make sure they understand that you will be busy until 3 p.m. on that day. If you plan to fly home make your reservations early so that flights won't get booked up. (The same goes for travel plans at the end of the semester.) If you cannot attend the final exam due to illness or another unforseen emergency, permission to take the final at another time must be granted by the dean's office. See the student handbook for details.
Academic honesty: Though you are encouraged to work with other students on outside
assignments, it is understood that every piece of written or computer-generated work that you submit must finally
be your own. In any case, if you work with a fellow student or students, you should make a note of this on your
paper. (There is no penalty for this! It is merely a matter of academic honesty.) If the assignment is a
group assignment, the members of the group should contribute equally to writing the final product---in other words,
don't put your name on a paper written by others. For further information, consult the student handbook or ask
your instructor.
Resources for help: Prof. Schumacher is the primary source for help with the course. Do not hesitate to ask questions in or out of class.
Other students in your class can also be a source of help. It is well-documented that having a classmate with whom to work and talk regularly about classwork improves performance in mathematics courses. You need not look for a student who "knows more" than you do. This arrangement works best for both partners if the students who are working together are well matched in ability and background.
Disabilities: If you have a physical, psychological, medical or learning disability that may impact your ability to carry out assigned course work, feel free to discuss your concerns in private with me, but you should also consult the Office of Disability Services at 5453. The Coordinator of Disability Services, Erin Salva (salvae@kenyon.edu), will review your concerns and determine, with you, what accommodations are appropriate. (All information and documentation of disability is confidential.) It is Ms. Salva that has the authority and the expertise to decide on the accommodations that are proper for your disability. Though I am happy to help you in any way I can, I cannot make any special accommodations without proper authorization from Ms. Salva.