activities | percentages |
---|---|
Problem Sets | 0-30% |
Two In-class Quizzes | 20-35% (10-17% 10-18%) |
Class Participation | 25% |
Final Exam | 20-35% |
Online Tutor Problems and Email | 5% |
This is an introductory course in Discrete Mathematics oriented toward Computer Science and Engineering. The course divides roughly into thirds:
The goals of the course are summarized in a statement of Course Objectives and Educational Outcomes. A detailed schedule of topic coverage appears in the calendar section.
The prerequisite for the course is 18.01. You should be familiar with sequences and series, limits, and integration and differentiation of univariate functions.
Lectures will be interleaved with team problem-solving sessions and demos. TA's and lecturers will act as coach/facilitators during problem-solving sessions. Lecture/Problem-solving session attendance is mandatory. There are no separate recitations.
Reading from Class Notes and Problem Sets are generally assigned on Mondays, with Problem Sets due the following Monday, but this varies with holidays and quizzes. See the calendar section for exact schedule. There is no textbook.
These are generally assigned on Monday and due Wednesdays by 1pm.
Approximately half the class meeting time will be devoted to problem-solving in teams of 5-7 students. A TA will act as a team coach, providing hints and explanations as requested. We believe that the team problem solving activity is a key learning experience. Problem-solving participation counts for 25% of the grade and will be graded mainly on degree of active, prepared participation, rather than problem-solving success.
Problem Sets are normally due at the beginning of Monday lecture.
Doing the problem sets is, for most students, the best way to master the course material. Problem sets will count for up to 30% of the final grade. However, there is no penalty for incorrect or omitted problems: any credit you miss on problems will be reallocated to your quizzes and/or final. So problem sets enable you to lock in partial credit towards an "A", but cannot harm your grade.
Solutions to the problem sets will be provided immediately after the due date. Late problem sets will not be accepted.
The last page of each problem set has a cover page for use when you submit the problem set. Complete the information called for on the cover page and attach it as the first page of your submission. Be sure to complete the full collaboration statement on the cover page:
"I worked alone and only with course materials",
or
"I collaborated on this assignment with (students in class), got help from (people other than collaborators and course staff), and referred to (citations to sources other than the class material from this term and Fall '02)".
No problem set will be given credit until it has a collaboration statement.
Submissions which are unduly hard to follow (or illegible) will get little credit even if the solutions are "correct". If you are unhappy with the way that your homework has been graded, first see your TA. If you're still unhappy after that, feel free to contact a Lecturer.
Online Tutor Problems consist of straightforward questions about the assigned reading and should take about 20 minutes after you finish the reading. A standard question on the reading appears every week and an email answer is required.
*Required* Comments for Reading:
Cite a passage in the reading - including its page number - and explain, in at most three sentences, why you found it
Most weeks, the Tutor Problems and Reading Comments will be due by 11am before Wednesday class. We try to slant the lectures in response to student email on the reading.
We encourage you to collaborate on homework as you do on in-class problems. Study groups can be an excellent means to master course material (besides, they can be fun and a good way to make friends.) However, you must write up solutions on your own, neither copying solutions nor providing solutions to be copied. If you do collaborate on homework, you must cite, in your written solution, all of your collaborators. Also, if you use sources beyond the course materials in one of your solutions, e.g., an "expert" consultant, another text, or material other than the course text and handouts and the Fall '02 course materials published on OpenCourseWare, be sure to include a proper scholarly citation of the source.
We discourage, but do not forbid, use of materials from prior terms other than Fall '02 to which a student may have access. We repeat, however, that use of such material requires a proper scholarly citation; omission of such citation will be taken as a priori evidence of plagiarism.
Plagiarism, cheating, and similar anti-intellectual behavior are serious violations of academic ethics and will be penalized. However, we understand the pressure that students may experience while at MIT, and we try to respond to such incidents in a balanced way.
If you are concerned about a possible violation of this kind, please talk with your TA and/or a Lecturer. It is better if you take the initiative to contact us in such cases, rather than vice-versa.
There will be two in-class quizzes and a regular three-hour final exam.
Grades for the course will be based on the following weighting:
activities | percentages |
---|---|
Problem Sets | 0-30% |
Two In-class Quizzes | 20-35% (10-17% 10-18%) |
Class Participation | 25% |
Final Exam | 20-35% |
Online Tutor Problems and Email | 5% |
On completion of 6.042, students will be able to explain and apply the basic methods of discrete (noncontinuous) mathematics in Computer Science. They will be able to use these methods in subsequent courses in the design and analysis of algorithms, computability theory, software engineering, and computer systems.
In particular, students will be able to:
Students will be able to: