Statistics

Code	Completion	Credits	Range	Language
17BOSTA	KZ	2	1+1	Czech

Grading of the course requires grading of the following courses:

Mathematics I (17BOMA1)

Lecturer:

Vladimír Rogalewicz (gar.), Veronika Mezerová

Tutor:

Vladimír Rogalewicz (gar.), Veronika Mezerová

Supervisor:

Department of Biomedical Technology

Synopsis:

Introduction into probability theory and mathematical statistics. Classical, geometrical and Kolmogorov definitions of probability. Random variables, their distributions, characteristics, transformations. Population and sample. Parameter estimators. Statistical tests.

Requirements:

Written exam, 6 tasks, at least 50% success

Syllabus of lectures:

1. Motivation. Introduction into probability theory and mathematical statistics. Basic ideas of the mathematical model. Population and sample.

2.Classical, geometrical and Kolmogorov definitions of probability. Random variables.

3.Discrete random variables, their distributions, characteristics.

4.Continuous random variables, their distributions, characteristics.

5. Calculations with random variables.

6. Estimators. Confidence intervals for normal distribution.

7. Testing statistical hypotheses. Tests abot normal distribution parameters. Chi-square test. Non-parametric tests.

Syllabus of tutorials:

1.Classical probability theory. Combinatorial problems (coin throw, dice throw, Loto). Geometrical probability - meeting problem

2.Random phenomenon, conditional probability. Total probability. Bayesian theorem and its applications.

3.Discrete random variable. Probability function, distribution function - evaluation, graphical representation. Some discrete distributions and their characteristics - alternative, binomial. Mean and variance, quantils

4.Continuous random variable. Density, distribution function - evaluation, graphical representation. Mean and variance, quantils. Normal distribution.

5.Random vector, marginal distribution, correlation. Transformations of random variables and vectors.

6.Transformations of random variables and vectors, their distribution, means, variations, quantils - calculation training

7.Mathematical statistics - confidence intervals, testing mathematical hypotheses, t-tests, F-tests, chi-square test. Repetition.

Study Objective:

To learn basics of the mathematical model of random phenomena description. The course has two parts: (i) probability theory, obove all the notion of a random variable and its description; (ii) two basic methods of mathematical statistics - parameter estimators and testing statistical hypotheses.

Study materials:

[1] Chatfield Ch.: Statistics for Technology, 3rd ed., Chapman & Hall, London, 1992

[2] Altman D.G.: Practical Statistics for Medical Research, 2nd ed., Chapman & Hall, London, 1994

Note:

Time-table for winter semester 2011/2012:

Time-table is not available yet

Time-table for summer semester 2011/2012:

	06:00–08:0008:00–10:0010:00–12:0012:00–14:0014:00–16:0016:00–18:0018:00–20:0020:00–22:0022:00–24:00
Mon	roomKL:C-1 Rogalewicz V. 08:00–09:50 (lecture parallel1) Kladno FBMI Velký sál
Tue	roomKL:B-415 Mezerová V. 14:00–15:50 ODD WEEK (lecture parallel1 parallel nr.1) Kladno FBMI Počítačová učebnaroomKL:GDM6_20 Mezerová V. 16:00–17:50 ODD WEEK (lecture parallel1 parallel nr.2) Kladno FBMI Učebna GDM6_20
Fri
Thu	roomKL:B-616 Mezerová V. 10:00–11:50 ODD WEEK (lecture parallel1 parallel nr.3) Kladno FBMI Učebna
Fri	roomKL:B-701 Rogalewicz V. 08:00–09:50 EVEN WEEK (lecture parallel1 parallel nr.5) Kladno FBMI UčebnaroomKL:B-309 Mezerová V. 14:00–15:50 ODD WEEK (lecture parallel1 parallel nr.4) Kladno FBMI zasedačka

The course is a part of the following study plans:

Bakalářský studijní obor Optika a optometrie - prezenční (compulsory course)