Course detail
Probability and Statistics I
FSI-S1PAcad. year: 2013/2014
The course makes students familiar with descriptive statistics, random events, probability, random variables and vectors, probability distributions, random sample, parameter estimation, tests of hypotheses and statistical software Statistica. Seminars include solving problems and applications related to mechanical engineering.
Language of instruction
Czech
Number of ECTS credits
5
Mode of study
Not applicable.
Guarantor
Department
Learning outcomes of the course unit
Students obtain needed knowledge from the probability theory, descriptive statistics and mathematical statistics, which will enable them to understand and apply stochastic models of technical phenomena and processes based upon these methods.
Prerequisites
Rudiments of the differential and integral calculus.
Co-requisites
Not applicable.
Planned learning activities and teaching methods
The course is taught through lectures explaining the basic principles and theory of the discipline. Exercises are focused on practical topics presented in lectures.
Assesment methods and criteria linked to learning outcomes
Course-unit credit requirements: active participation in seminars, mastering the subject matter, passing both written exams and semester assignment acceptance. Examination (written form) consists of two parts: a practical part (2 tasks from the theory of probability: probability and its properties, random variable, distribution Bi, H, Po, N and discrete random vector; 2 tasks from mathematical statistics: point and interval estimates of parameters, tests of hypotheses of distribution and parameters); a theoretical part (4 tasks related to basic notions, their properties, sense and practical use,and proofs of two theorems); evaluation: each task 0 to 20 points and each theoretical question 0 to 5 points; evaluation according to the total number of points (scoring 0 points for any theoretical part task means failing the exam): excellent (90 - 100 points), very good (80 - 89 points), good (70 - 79 points), satisfactory (60 - 69 points), sufficient (50 - 59 points), failed (0 - 49 points).
Course curriculum
Not applicable.
Work placements
Not applicable.
Aims
The course objective is to make students majoring in Mathematical Engineering acquainted with methods of probability theory, descriptive and mathematical statistics, and with statistical software Statistica as well as to encourage students` stochastic way of thinking for developing mathematical models with the emphasis on engineering branches.
Specification of controlled education, way of implementation and compensation for absences
Attendance at seminars is controlled and the teacher decides on the compensation for absences.
Recommended optional programme components
Not applicable.
Prerequisites and corequisites
Not applicable.
Basic literature
Hogg R.V., McKean J., Craig, A.T.: Introduction to Mathematical Statistics. Pearson, Cloth. 2013. (EN)
Montgomery, D. C. - Runger, G.: Applied Statistics and Probability for Engineers, John Wiley & Sons, New York. 1994. (EN)
Zvára, K., Štěpán, J.: Pravděpodobnost a matematická statistika. Praha : Matfyzpress, 2002. (CS)
Montgomery, D. C. - Runger, G.: Applied Statistics and Probability for Engineers, John Wiley & Sons, New York. 1994. (EN)
Zvára, K., Štěpán, J.: Pravděpodobnost a matematická statistika. Praha : Matfyzpress, 2002. (CS)
Recommended reading
Karpíšek, Z.: Matematika IV. Statistika a pravděpodobnost. Brno : FSI VUT v CERM, 2003.
Lamoš, F. - Potocký, R.: Pravdepodobnosť a matematická štatistika. Bratislava : Alfa, 1989.
Meloun, M. - Militký, J.: Statistické zpracování experimentálních dat. Praha : PLUS, 1994.
Lamoš, F. - Potocký, R.: Pravdepodobnosť a matematická štatistika. Bratislava : Alfa, 1989.
Meloun, M. - Militký, J.: Statistické zpracování experimentálních dat. Praha : PLUS, 1994.
Classification of course in study plans
Type of course unit
Lecture
26 hod., optionally
Teacher / Lecturer
Syllabus
Random events, field of events, and probability (properties).
Conditioned probability and independent events(properties).
Reliability of systems. Random variable (types, distribution function).
Functional characteristics of discrete and continuous random variables.
Numerical characteristics of discrete and continuous random variables.
Basic discrete distributions K, Bi, H, Po (properties and use).
Basic continuous distributions R, N, E (properties and use).
Random vector, types, functional and numerical characteristics.
Distribution of transformed random variables.
Random sample, sample characteristics (properties, sample from N).
Parameter estimation (point and interval estimates of parameters Bi and N).
Testing statistical hypotheses.
Testing hypotheses of parameters of Bi and N.
Conditioned probability and independent events(properties).
Reliability of systems. Random variable (types, distribution function).
Functional characteristics of discrete and continuous random variables.
Numerical characteristics of discrete and continuous random variables.
Basic discrete distributions K, Bi, H, Po (properties and use).
Basic continuous distributions R, N, E (properties and use).
Random vector, types, functional and numerical characteristics.
Distribution of transformed random variables.
Random sample, sample characteristics (properties, sample from N).
Parameter estimation (point and interval estimates of parameters Bi and N).
Testing statistical hypotheses.
Testing hypotheses of parameters of Bi and N.
Computer-assisted exercise
26 hod., compulsory
Teacher / Lecturer
Syllabus
Descriptive statistics (one-dimensional sample with a quantitative variable). Software Statistica.
Descriptive statistics (two-dimensional sample with a quantitative variables). Combinatorics.
Probability (properties and calculating). Semester work assignment.
Conditioned probability. Independent events.
Written exam (3 examples). Functional and numerical characteristics of random variable.
Functional and numerical characteristics of random variable - achievement.
Probability distributions (Bi, H, Po, N), approximation.
Random vector, functional and numerical characteristics.
Written exam (3 examples).
Point and interval estimates of parameters Bi and N.
Testing hypotheses of parameters Bi and N.
Testing hypotheses of parameters Bi and N - achievement. Tests of fit.
Regression line, estimates, tests, and plots. Assignment evaluation.
Descriptive statistics (two-dimensional sample with a quantitative variables). Combinatorics.
Probability (properties and calculating). Semester work assignment.
Conditioned probability. Independent events.
Written exam (3 examples). Functional and numerical characteristics of random variable.
Functional and numerical characteristics of random variable - achievement.
Probability distributions (Bi, H, Po, N), approximation.
Random vector, functional and numerical characteristics.
Written exam (3 examples).
Point and interval estimates of parameters Bi and N.
Testing hypotheses of parameters Bi and N.
Testing hypotheses of parameters Bi and N - achievement. Tests of fit.
Regression line, estimates, tests, and plots. Assignment evaluation.