# Probability and Statistics Title ΠΙΘΑΝΟΤΗΤΕΣ ΚΑΙ ΣΤΑΤΙΣΤΙΚΗ / Probability and Statistics Code ΜΑΕ201 Faculty Sciences School Physics Cycle / Level 1st / Undergraduate Teaching Period Spring Coordinator Kosmas Kosmidis Common No Status Active Course ID 40003045

### Programme of Study: UPS of School of Physics (2012-today)

Registered students: 72
OrientationAttendance TypeSemesterYearECTS
CoreGeneral Electives844

 Academic Year 2018 – 2019 Class Period Spring Instructors from Other Categories Kosmas Kosmidis 26hrs Foteini Zervaki-Tsaroucha 13hrs Weekly Hours 3 Class ID 600137481

### Class Schedule

 Building Σχ. Θετικών Επιστημών - νέο κτίριο - Ανατολ. πτέρυγα Floor Υπόγειο 1 Hall ΑΙΘΟΥΣΑ Α13 (187) Calendar Τρίτη 14:00 έως 16:00 Building Σχ. Θετικών Επιστημών - νέο κτίριο - Ανατολ. πτέρυγα Floor Ισόγειο Hall ΑΙΘΟΥΣΑ Α21 (192) Calendar Πέμπτη 14:00 έως 15:00
Type of the Course
• General Knowledge
Course Category
General Foundation
Mode of Delivery
• Face to face
Language of Instruction
• Greek (Instruction, Examination)
Prerequisites
General Prerequisites
Knowledge of Mathematics at the level of Lyceum
Learning Outcomes
Students should be able to solve problems in Probabilitiy and Statistics as well as analyze experimental results.
General Competences
• Apply knowledge in practice
• Make decisions
Course Content (Syllabus)
A. PROBABILITY Theory of sets and probability,(events, axioms of probability, conditional probability, Bayes' theorem, combinatorial analysis, tree diagrams) - random variables - probability distributions (discrete and continuous probability distributions, joint distributions, independent random variables, change of variables, convolutions) - mathematical expectation - variance and standard deviation - functions of random variables - standardised random variables - covariance - correlation coefficient - Chebyshev's inequality and the law of large numbers - specific probability distributions (binomial, normal, Poisson, uniform, Cauchy, gamma, chi-square and Student's distributions, relations between distributions, central limit theorem). B. STATISTICS Sampling theory (population and sample, random samples, sampling distributions, population parameters (means, proportions, differences, sums), sample statistics (sample mean, sample variance) - estimation theory (confidence intervals for means, proportions, differences, sums, variances) - tests of hypotheses and significance (statistical hypotheses, type I and type II errors, level of significance, one- and two-sided tests, special tests of significance, fitting of theoretical to sample frequency distributions, chi-square test, contigency tables) - curve fitting (regression, least squares method, standard error of estimate, multiple regression, linear and generalised correlation coefficient, sampling theory of regression and correlation).
Keywords
Probability, Statistics, Experimental data analysisy
Educational Material Types
• Book
Use of Information and Communication Technologies
Use of ICT
• Use of ICT in Communication with Students
Description
Return of homework via E-Mail Information on the progress of the course
Course Organization
Lectures782.6
Tutorial391.3
Exams30.1
Total1204
Student Assessment
Description
Homework Final exams
Student Assessment methods
• Written Assignment (Summative)
Bibliography
Course Bibliography (Eudoxus)
Πιθανότητες και Στατιστική, Murray R. Spiegel, Μετάφραση Σ.Κ. Περσίδης, ΕΣΠΙ ΘΕΩΡΙΑ ΠΙΘΑΝΟΤΗΤΩΝ 1, ΚΛΑΣΙΚΗ ΠΙΘΑΝΟΤΗΤΑ, ΜΟΝΟΔΙΑΣΤΑΤΕΣ ΚΑΤΑΝΟΜΕΣ,ΣΤ. ΚΟΥΝΙΑΣ, ΧΡ. ΜΩΥΣΙΑΔΗΣ, ΖΗΤΗ