Valid for: 2022/23
Faculty: Faculty of Engineering, LTH
Decided by: PLED I
Date of Decision: 2022-04-11
Main field: Technology.
Compulsory for: F2, I2, Pi2
Language of instruction: The course will be given in Swedish
The course is intended to give the student the basics in mathematical modelling of random variation and an understanding of the principles behind statistical analysis. It shall also give the students a toolbox containing the most commonly used models and methods, as well as the ability to use these in practical situations. The student shall also be able to handle dependence between observations.
The course fills two purposes, providing a fundamental knowledge of mathematical statistics, as well as giving a foundation for further studies.
The fundamental knowledge is essential for those who, in their professional lives, will not necessarily be involved in statistical analyses on a daily basis, but who, on occasion, will be expected to perform basic statistical tests and present the results for their colleagues. They will also be expected to be able to read and assess the analyses of others.
The main purpose of the course is to provide a basis for further studies. Both in stochastic modelling and analysis of random phenomena in time and/or space, and in the application areas, such as physics, environment, medicin, economics, signal processing, logistics, and process control. The focus therefore lies in probability theory and stochastic modelling of both independent and dependent data.
Knowledge and understanding
For a passing grade the student must
Competences and skills
For a passing grade the student must
Judgement and approach
For a passing grade the student must
Data analysis. Descriptive statistics. Axioms of probability. Conditional probability, independent events. Stochastic variables. Transformations, linear combinations, sums, max and min of stochastic variables. Expectation, variance, covariance, and correlation. Discrete and continuous standard distributions, such as Normal, exponential, binomial and Poisson. Law of large numbers and central limit theorem. Conditional distributions and conditional expectations. Point estimates and their properties. Maximum likelihood and Least squares. Principles of interval estimates and hypothesis testing. Methods for intervall estimation and hypothesis testing based on normally and approximately normally distributed estimates. Simulation based statistical methods. Multiple linear regression. Basic principles for model selection in regression. Examples are chosen with respect to the different programs and expected future career.
Grading scale: TH - (U,3,4,5) - (Fail, Three, Four, Five)
Assessment: Written exam, compulsory computer based ability tests, computer exercises and written project report.
The examiner, in consultation with Disability Support Services, may deviate from the regular form of examination in order to provide a permanently disabled student with a form of examination equivalent to that of a student without a disability.
Parts
Code: 0120. Name: Examination.
Credits: 4,5. Grading scale: TH. Assessment: Written exam.
Code: 0220. Name: Laboratory Work.
Credits: 1. Grading scale: UG. Assessment: Computer exercises.
Code: 0320. Name: Computational Ability Test 1.
Credits: 0,5. Grading scale: UG. Assessment: Computer based test covering probability theory
Code: 0420. Name: Computational Ability Test 2.
Credits: 1. Grading scale: UG. Assessment: Computer based test covering statistics
Code: 0520. Name: Project Work.
Credits: 2. Grading scale: UG. Assessment: Written project report.
Assumed prior knowledge: Calculus in one and several variables and Linear algebra.
The number of participants is limited to: No
The course overlaps following course/s: FMSF20, FMSF30, FMSF35, FMSF40, MASB03, FMSF50, FMSF55, FMSF70, FMSF75, MASA01, FMS012, FMS121, FMSF45, MASA02
Director of studies: Johan Lindström, studierektor@matstat.lu.se
Course homepage: http://www.ctr.maths.lu.se/course/FMSF80_IPiF/
Further information: Course replaces FMSF45. The course is also given for physicists at the faculty of science with the code MASB02.