General Information
This is an introductory course to probability theory and its applications. Some of the topics that will be covered include: combinatorial analysis, axioms of probability and independence, conditional probability, Bayes' theorem, random variables (discrete and continuous), joint probability distributions, properties of expectation, the central limit theorem, the law of large numbers, and Markov chains.
It is assumed that students have a good working knowledge calculus and some basic knowledge of linear algebra. In particular, it is very important to be compotent in integration, including change of variables, and integration by parts. The class will require some multivariate integration.
Please keep in mind that the material in this course is cumulative. You really need to stay up to date by reading the relevant book chapters and by solving related homework problems.
Textbook
Required: M.H. DeGroot and M.J. Schervish (2002) Probability and Statistics. Fourth Edition. Addison Wesley.
Additional References:
- Principles of Uncertainty. J. Kadane. Chapman & Hall. This book is available online at the UCSC Library.
- A First Course in Probability (sixth edition). S. Ross. Prentice Hall
Grading
There will be one midterm (35%), homework assigments (25%) and a final exam (40%). A collection of homework problems will be assigned every week but only a subset of those problems will have to be turned in and will be graded. The instructor will let you know which problems you will need to turn in as part of your graded homework assignments (homework deadlines will also be announced in class and online at least one week in advance). The exams and will be based on the weekly assigned problems.
Homework
There will be several problems assigned every week. As mentioned above, not all the problems will have to be turned in. Only a small subset of the problems will be part of the graded homework assignments. The assigned problems (all of them, not only the subset of graded problems) will give you a very close indication of the material that will be covered in the exams.
SVC students please send one PDF file with the homework problems to Annalisa.