MATH 1323 HOMEWORK POLICYHomework assigments will typically be passed out during lectures on a Tuesday or Wednesday and will be due in your discussion section the following Tuesday. Homework should be turned in to the instructor at the beginning of the section, not put in a mailbox or slipped under an office door. The assignments will involve a mixture of problems to be done with the aid of a TI-83 or Excel spreadsheet and problems to be worked out entirely by hand. Multiple pages must be stapled together; paper clips and paper folds are ineffective and lead to pages getting lost and receiving no credit. It's safest to put your name on each page. At the very least your name must appear in the top right corner of the first page.
Each week in which a homework assignment is due, the instructor will call on selected students to outline their solutions on the board. Thereafter, the solutions presented will be discussed and alternative solutions mentioned. Presenters may retrieve their handed-in papers for reference. In general, both for presentation and written submission evaluation, each homework problem will be worth one point and the typical grades on a problem will be 1 (essentially correct with perhaps a tiny error here and there), 0 (little or nothing correct), and .5 (everything in between). On occasion, a particularly lengthy or difficult problem may be worth two points. Graders will be urged not to bother to read submissions which are unusually messy or have poor penmanship.
In addition to the above-mentioned weekly assignments, there are daily recommended exercises which are not to be turned in. These are listed on the Lesson Schedule for the entire semester. You should attempt to do these exercises prior to class on the day mentioned and ask your instructor to go over any questions you may have concerning them.
General Suggestions on Recommended Exercises
It's essential that you try to do as many of the recommended problems as possible, because
Each day some of the recommended problems are routine "drill" exercises. There are certain basic techniques in calcuus that should become complely mechanical procedures for you: procedures you can do "with your spine" rather than your brain. Other problems require more thought. Sometimes you'll think that you can do a problem but get stuck if you actually try to write down the details. It's important to write out neat careful solutions for yourself.. It's good to organize these in a separate notebook or file folder. You'll appreciate having them in one place when you want to review, especially if you can read them easily and don't have to work to decipher later what you did a few weeks earlier.
- Math is not a "spectator sport", and you can't learn calculus just by watching your instructor solve problems.
- Doing problems is the best way to test whether you understand the material and to find areas where you need more work.
- Some (not all)exam questions will be very similar to assigned and recommended homework problems and textbook examples. Not understanding these problems simply guarantees that you'll throw away exam points.
After you finish and write up a solution, go back and talk to yourself (or others) about the problem. For example, ask "What are the main ideas involved?", "What's involved with this problem that puts it in this section of the book?", "Why couldn't I have done this problem last week?", "Is there some other way to solve the same problem?" You can learn much more by solving the same problem in a different way, if possible, than by solving several problems all in more or less the same way.
In the same vein: if a problem seems hard, don't give up and turn immediately to the solutions manual. You can often learn a lot more by spending hours (perhaps not all at once!) grappling with a hard problem than by working many simpler problems in the same amount of time.
The "Principles for Problem Solving" in the text (pp. 87 ff.) may be helpful. They're not magic, but they can help you organize your thoughts. At the end of each chapter, the section "Focus on Problem Solving" illustrates how to apply these principles to some harder problems.
The answers to odd-numbered problems are in the back of the textbook. The Student Solutions Manual, containing more complete solutions to odd-numbered problems, is available in the bookstore. If you're interested, consider sharing a manual with one or more friends to save money. We actually recommend against more than a casual use of the Solutions Manual: students become too dependent on it and don't develop confidence in their own work. You and your friends should usually be able to confirm solutions by comparing your work. Moreover, convincing friends that your solution is correct, or becoming convinced by their alternative solution, helps teach the skills of communicating mathematical arguments.
A schedule of Daily Reading and Homework Problems is part of the syllabus. We will try to follow it fairly closely. You will probably find the lectures more valuable if you read the assigned material and attempt some of the problems before coming to class. There may be modifications to the assignment list as the course moves along, so you might want to print out a new copy of it immediately after each exam.