Code | Lecturer(s) | Associate Lecturer(s) | Subsitute Lecturer(s) et other(s) |
---|---|---|---|
S-PHYS-806 |
|
Language of instruction | Language of assessment | HT(*) | HE(*) | HTP(*) | HR(*) | HD(*) | Term |
---|---|---|---|---|---|---|---|
Français | Français | 30.00 | 30.00 | 2nd term |
Contents
An introduction to analysis coming in complement to a course based more on calculus.
Aspects of real numbers are adressed by assuming the least upper bound axiom.
Sequences are studied, then limits and usual theorems about functions of one and more real
variables. The series and integer series are seen as well as an intruduction to differential equations.
Required Learning Resources/Tools
An introduction to analysis,
G. Bilodeau, P. Thie and G. Keough.
International series in mathematics,
Jones and Bartlett Publishes
Recommended Learning Resources/Tools
Sans objet
Other Recommended Reading
Analyse : notes provisoires
Y. Brihaye, Mons 2014
Mode of delivery
- Face to face
Type of Teaching Activity/Activities
- Course
- Exercices
Term 1 Assessment - type
- Written examination
Term 1 Assessment - comments
Not applicable
Term 2 Assessment - type
- Written examination
Term 2 Assessment - comments
Not applicable
Term 3 Assessment - type
- Written examination
Term 3 Assessment - comments
Not applicable
Resit Assessment - Term 1 (B1BA1) - type
- Practical test
- Quoted exercices
Resit Assessment - Term 1 (B1BA1) - Comments
Not applicable