Code: | EQ0058 | Acronym: | A |
Keywords | |
---|---|
Classification | Keyword |
OFICIAL | Physical Sciences (Mathematics) |
Active? | Yes |
Responsible unit: | Department of Chemical Engineering |
Course/CS Responsible: | Master in Chemical Engineering |
Acronym | No. of Students | Study Plan | Curricular Years | Credits UCN | Credits ECTS | Contact hours | Total Time |
---|---|---|---|---|---|---|---|
MIEQ | 82 | Syllabus | 1 | - | 5 | 49 | 135 |
This course aims to endow students with fundamental knowledge on Algebra (vectors, linear spaces, matrices, determiners, systems of linear equations) as is detailed is in the program of the course.
Knowledge about basic principles of Algebra as described in the course program.
1. VECTOR ALGEBRA Operations with vectors; Linear dependence of vectors; Scalar product; Line equation; Plane equation; vector product; scalar triple product; repeated products of three or more vectors; distance from point to plane 2. LINEAR SPACES Linear spaces: examples; Sub-spaces; Base and dimension; Linear spaces with inner product 3. MATRIX ALGEBRA Linear transformations and matrices; Operations with matrices; Matrix decomposition; Linear transformations; R2 and R3 linear transformations: reflections, orthogonal projections, rotations, dilations and contractions 4. DETERMINANTS Definition; Determinants: basic properties; Determinants calculation 5. LINEAR EQUATION SYSTEMS Coefficient matrix and extended matrix; Gaussian elimination; Elementary operations; Equivalent systems; Matrix characteristics; General properties of solution of linear equation systems; Gauss-Jordan algorithm; Homogeneous systems; Linear space (Ax=0 solutions); Non-homogeneous systems; Linear dependence and characteristic; Singular matrices; Cramer’s rule; LU decomposition 6. INVERSE MATRIX AND RELATED MATRICES Inverse matrix: properties; Adjunct matrix; Inverse matrix calculation by the adjunct matrix; Inverse matrix calculation by elementary operations 7. EIGENVALUES AND EIGENVECTORS Characteristic determinant, characteristic polynomial and characteristic equation of a matrix; Determining eigenvalues and its eigenvalues; Eigenvalues: properties; algebraic multiplicity and geometric multiplicity 8. DIAGONALIZATION OF MATRICES Diagonalizing a matrix: procedures
General theoretical-practical classes are based on the presentation of the themes of the course and examples are given. The theoretical-practical classes, which are divided in groups, are intended to clarify students’ doubts about the exercises. Students are supposed to solve the exercises before class.
Designation | Weight (%) |
---|---|
Exame | 75,00 |
Teste | 25,00 |
Total: | 100,00 |
1 - Students cannot exceed ¼ of the classes previously set 2 - Students have to do at least 2-3 micro-tests 3 - Students who were only admitted on the second phase, will be assessed depending on the date that they were admitted Students who are repeating the course, and who were admitted to exams in the previous year, do not need to attend to classes.
Final Mark will be based on one of the following formulas: FM= 0.25*MT+0.375*T1+0.375*T2 Or FM= 0.25*MT + 0.75* E MT- Micro-tests T1 and T2- Test 1 and Test 2 E- Exam 1 - Nine micro-test will be done. Only the 6 best results of the micro-tests will be considered for MT calculation. As far as students who were only admitted on the second phase are concerned, it will be also considered the best results. 2 - After the results of the first test (T1) are known, students have to inform the professor, if they either want to attend to the second test (T2) or to the complete final exam (E). 3 - A minimum of 7.5/20 in the exam or tests is required. 4 - In "recurso" exam the final mark will only be based on the mark of the exam. Students who do not need to attend classes: FM= 0,5*T1 + 0,5*T2 Or FM= E
Not applicable
Exam
The marks of micro-tests will not be added to the Final Mark.
Students are not allowed to use calculators on micro-tests, tests and exams.