Introduction to Probability (MAY331): Διαφορά μεταξύ των αναθεωρήσεων

School of Science

Department of Mathematics

Undergraduate

ΜΑΥ331

Introduction to Probability

Lectures (Weekly Teaching Hours: 5, Credits: 7.5)

General Background

Greek

Yes (in English, reading Course)

http://users.uoi.gr/kzograf/SyllabousProbabilityEnglish.pdf

The aim of this course is to provide with a comprehensive understanding of the basic definitions of probability and the basic principles and laws of probability theory. Further, the introduction to the concepts of the random variable and the distribution function, as well as, their characteristics, such as the mean, variance, moments, moment generating function, etc., is included in the main aims of the course. Special distributions, such as binomial, geometric, Pascal, Poisson, uniform, exponential, gamma, normal distribution, etc. are studied and their use and application is indicated. The course is compulsory, it is of an entry-level and it aims to develop skills that help the students to understand, design and exploit stochastic models to describe real problems. At the end of the course the students is expected to be able to:

• Exploit and apply the classical and empirical definition of probability in order to calculate probabilities, by using combinatorial analysis.
• Utilize the axiomatic foundation of the concept of probability and use it in order to derive and prove probabilistic laws and properties.
• Understand and utilize classical probabilistic laws as the multiplicative theorem, the total probability theorem, Bayes’ formula, and independence for modeling respective problems. Emphasis is given to the use of interdisciplinary problems which are modeled by the application of the above probabilistic rules.
• Understand the necessity of introducing and studying the concept of random variable, its characteristics (mean, variance, etc.) and the corresponding probability distribution. Special discrete and continuous distributions are defined and utilized for the description, analysis and study real problems from different areas (lifetime distributions, reliability etc.).

• Working independently
• Decision-making
• Production of free, creative and inductive thinking
• Criticism and self-criticism

Classroom (face-to-face)

Use of ICT in communication with students

Final written exam in Greek (in case of Erasmus students in English) which concentrates on the solution of problems which are motivated by the main themes of the course.