Mathematics for Engineers III
7.5 ECTS creditsTransform theory:
- The Laplace transform and solving differential equations,
- The Z-transform and solving difference equations,
- Fourier series of periodic functions,
- The complex form of the Fourier transform.
Probability and Statistics:
- Basic probability theory, conditional probability, independent events,
- Stochastic variables, a few discrete and a few continuous distributions,
- Expected value, variance, standard deviation,
- Point estimations and confidence intervals.
- The Laplace transform and solving differential equations,
- The Z-transform and solving difference equations,
- Fourier series of periodic functions,
- The complex form of the Fourier transform.
Probability and Statistics:
- Basic probability theory, conditional probability, independent events,
- Stochastic variables, a few discrete and a few continuous distributions,
- Expected value, variance, standard deviation,
- Point estimations and confidence intervals.
Progressive specialisation:
G1F (has less than 60 credits in first鈥恈ycle course/s as entry requirements)
Education level:
Undergraduate level
Admission requirements
Mathematics for Engineers I-II (15 ECTS credits), or the equivalent.
Selection:
Selection is usually based on your grade point average from upper secondary school or the number of credit points from previous university studies, or both.
This course is included in the following programme
- Electrical Engineering (studied during year 2)
- Mechatronic Engineering (studied during year 2)