Algebra I
Code: 100143 ECTS Credits: 6| Degree | Type | Year | Semester |
|---|---|---|---|
| 2500097 Physics | FB | 1 | 1 |
Contact
- Name:
- Ramon Antoine Riolobos
- Email:
- Ramon.Antoine@uab.cat
Use of Languages
- Principal working language:
- catalan (cat)
- Some groups entirely in English:
- No
- Some groups entirely in Catalan:
- Yes
- Some groups entirely in Spanish:
- No
Teachers
- Pere Ara Bertrán
- Rosa Camps Camprubí
- Ferran Cedó Giné
Prerequisites
Although this subject has no special prerequisites, it is recommended to have a clear understanding of the contents of mathematics in high school.
Objectives and Contextualisation
Competences
- Develop strategies for analysis, synthesis and communication that allow the concepts of physics to be transmitted in educational and dissemination-based contexts
- Use critical reasoning, show analytical skills, correctly use technical language and develop logical arguments
- Use mathematics to describe the physical world, selecting appropriate tools, building appropriate models, interpreting and comparing results critically with experimentation and observation
Learning Outcomes
- Analyse and solve systems of linear equations.
- Argue with logical rigor.
- Calculate and use determinants.
- Carry out with ease the introduction of coordinates through the use of vector space bases.
- Express definitions and theorems rigorously.
- Identify the structures of the group, ring, body and space vector.
- Transmit orally and in writing, in a clear manner, the logical-mathematical reasoning that leads to problem resolution.
- Use basic techniques for the factoring and calculation of polynomial roots.
- Use complex numbers with ease.
- Use critical reasoning, show analytical skills, correctly use technical language and develop logical arguments
- Use linear applications and express these via matrices.
- Use the basic language of set theory.
- Use the basic techniques of scaling matrices with ease.
Content
1.1 Sets.
1.2 Groups.
1.3 Complex numbers and polynomials.
2. Linear algebra.
2.1 Matrices. Determinants.
2.2 Vector spaces.
2.3 Linear maps.
Methodology
The objectives of the subject will be obtained indirectly in the following way:
1. Learning the language of mathematics formalized in set theory (without entering into the foundations).
2. Learning to manipulate basic algebraic structures: groups, rings, fields, vector spaces; and also homomorphisms between these structures.
3. Learning the techniques of matrix manipulation, computing determinants, the arithmetic of polynomials, the calculation of their roots, and their applications in the study of linear Algebra.
And all this accompanied by the development of logical reasoning, which is expected by teaching the demonstrations of many of the theorems of the course.
Activities
| Title | Hours | ECTS | Learning Outcomes |
|---|---|---|---|
| Type: Directed | |||
| Problem class | 21 | 0.84 | 10 |
| Theory lessons | 29 | 1.16 | 2, 5, 10 |
| Type: Autonomous | |||
| Problem handouts | 20 | 0.8 | 10, 7 |
| Problem solving | 50 | 2 | 1, 3, 4, 5, 6, 9, 13, 11, 8 |
| Study of the theory | 21 | 0.84 | 10 |
Assessment
40% of the mark of the first partial exam P1,
50% of the mark of the second partial exam P2 and
10% of the mark from problems handaouts E.
In other words that is,
Final Mark = 0.15 * E + 0.4 * P1 + 0.45 * P2
In order to pass the subject, the student must obtain a final grade of more than 5 and must have a mark of the first partial and second partial exams greater than 3 (out of 10).
In case the student does not pass the subject with the previous evaluations, or wants to improve the note (renouncing the one already obtained), he can attend a second chance examination, in which the two partials will be evaluated together.
In order to be able to submit to this exam, the student must have previously submitted to the partial tests.
A student will be considered not presented if he does not appear in any of the partial tests.
The dates of the different evaluation tests or the deadlines for the delivery of problems will be announced properly.
Assessment Activities
| Title | Weighting | Hours | ECTS | Learning Outcomes |
|---|---|---|---|---|
| First partial exam | 40% | 2 | 0.08 | 2, 5, 6, 10, 7, 9, 12, 8 |
| Problem handouts | 15% | 1 | 0.04 | 1, 4, 6, 13, 12, 11, 8 |
| Second chance examination | 85% | 3 | 0.12 | 1, 2, 3, 4, 5, 6, 10, 7, 9, 13, 11, 8 |
| Second partial exam | 45% | 3 | 0.12 | 1, 2, 3, 4, 5, 6, 10, 7, 9, 13, 11, 8 |
Bibliography
In addition to the books that are suggested below, the Faculty of Science has an exceptional bibliographical fund where students can find multiple texts that cover and complement the contents of the subject.
Main books.
F. Cedó i A. Reventós, Geometria plana i àlgebra lineal, Manuals de la UAB, 39, 2004.
J. Dorronsoro y E. Hernández, Números, grupos y anillos, Addison-Wesley/ Universidad Autónoma de Madrid, Madrid, 1996.
E. Hernández, Álgebra Lineal y Geometría, Addison-Wesley, 2012.
A. Kostrikin and Y. Manin, Linear Algebra and Geometry, Gordon and Breach Science Publishers, Amsterdam, 1989.
L. Merino y E. Santos, Álgebra Lineal con métodos elementales, Ediciones paraninfo, 2006.
E. Nart, Notes d'àlgebra lineal, Materials de la UAB, 130
Books for problem solving
F. Cedó i V. Gisin, Àlgebra Bàsica, Manuals de la UAB, 1997.
J. García Lapresta, M. Panero, J. Martínez, J. Rincón y C. Palmero, Tests de Álgebra lineal, Editorial AC, Madrid, 1992.
J. Rojo y I. Martín, Ejercicios y Problemas de Álgebra Lineal, Mc. Graw-Hill, Madrid 1994.