Study programme 2021-2022 | Français | ||
Engineering Mathematics 2 | |||
Programme component of Bachelor's in Engineering: Architectural Engineering à la Faculty of Engineering |
Code | Type | Head of UE | Department’s contact details | Teacher(s) |
---|---|---|---|---|
UI-B1-IRCIVA-004-M | Compulsory UE | SIEBERT Xavier | F151 - Mathématique et Recherche opérationnelle |
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Language of instruction | Language of assessment | HT(*) | HTPE(*) | HTPS(*) | HR(*) | HD(*) | Credits | Weighting | Term |
---|---|---|---|---|---|---|---|---|---|
| Français | 32 | 32 | 0 | 8 | 0 | 6 | 6.00 | 2nd term |
AA Code | Teaching Activity (AA) | HT(*) | HTPE(*) | HTPS(*) | HR(*) | HD(*) | Term | Weighting |
---|---|---|---|---|---|---|---|---|
I-MARO-022 | Algebra 2 | 10 | 10 | 0 | 4 | 0 | Q2 | 35.00% |
I-MARO-023 | Analysis 2 | 22 | 22 | 0 | 4 | 0 | Q2 | 65.00% |
Programme component |
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Objectives of Programme's Learning Outcomes
Learning Outcomes of UE
Recall, interpret and apply all the studied definitions and properties; recall, explain, justify and formalize demonstrations; manipulate the concepts of logic; exploit theoretical results;
In Algebra: solve systems of linear equations; calculate a distance, a norm, a scalar product; orthogonalize a matrix; calculate the eigenvalues and eigenvectors of a matrix;
In Analysis: integrate functions from Rn to Rm (with or without change of variables); compute line and surface integrals (including the use of vector analysis theorems); analytically solve simple differential equations.
Content of UE
In Algebra: distances, norms and scalar products, orthogonal projections; eigenvalues and eigenvectors; properties of particular square matrices.
In Analysis: introduction to measure theory; multiple integrals (Fubini theorem, change of variables); line and surface integrals; vector analysis theorems (Green, Stokes and Ostrogradski); conservative fields; constrained optimization; numerical sequences and series; power series; differential equations.
Prior Experience
Sans objet
Type of Assessment for UE in Q2
Q2 UE Assessment Comments
algèbre : Written examination covering both parts (Exercices : 45 % - Theory : 45 %).This examination is organized
out of session. Continuous evaluation (written interrogation) : 10 % analyse : A written exam, 50% for theory and 50% for exercises
Type of Assessment for UE in Q3
Q3 UE Assessment Comments
algèbre : Written examination covering both parts (Exercices : 50 % - Theory : 50 %).This examination is organized
the same hal-day as Analysis 2. analyse : Written examination covering both parts (theory - 50% and exercises - 50%), organized during the same half-day as the oral exam of Algèbre 2
Type of Teaching Activity/Activities
AA | Type of Teaching Activity/Activities |
---|---|
I-MARO-022 |
|
I-MARO-023 |
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Mode of delivery
AA | Mode of delivery |
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I-MARO-022 |
|
I-MARO-023 |
|
Required Reading
AA | Required Reading |
---|---|
I-MARO-022 | Notes d'exercices - Partie 3 - Exercices d'Algèbre - Espaces métriques et réduction de matrices - D. Tuyttens, G. Lacroix |
I-MARO-023 |
Required Learning Resources/Tools
AA | Required Learning Resources/Tools |
---|---|
I-MARO-022 | Not applicable |
I-MARO-023 | Not applicable |
Recommended Reading
AA | |
---|---|
I-MARO-022 | |
I-MARO-023 |
Recommended Learning Resources/Tools
AA | Recommended Learning Resources/Tools |
---|---|
I-MARO-022 | Sans objet |
I-MARO-023 | Not applicable |
Other Recommended Reading
AA | Other Recommended Reading |
---|---|
I-MARO-022 | Not applicable |
I-MARO-023 | Not applicable |
Grade Deferrals of AAs from one year to the next
AA | Grade Deferrals of AAs from one year to the next |
---|---|
I-MARO-022 | Unauthorized |
I-MARO-023 | Unauthorized |