Code: | EQ0059 | Acronym: | AM I |
Keywords | |
---|---|
Classification | Keyword |
OFICIAL | Physical Sciences (Mathematics) |
Active? | Yes |
Responsible unit: | Department of Chemical and Biological 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 | 94 | Syllabus | 1 | - | 6 | 63 | 162 |
This course aims to endow students with fundamental knowledge on mathematics. It also aims to complete students’ education on IR defined functions, and develop the problem of primitives and function integration and study its representation
Objectives
- Understand, manipulate and apply the concepts of integration of functions of one variable and series.
- Provide a base set of mathematical fundamental to the proper functioning of other courses of integrated Masters.
- Develop scientific and mathematical reasoning and ability to apply mathematical concepts acquired.
Ability to describe the main results in the field of differential and integral calculus, the series of real numbers and the polynomial approximation of functions of one variable by use of Taylor polynomials.
Ability to identify and properly apply the techniques to use in solving problems.
Obtaining a set of fundamental mathematical tools with direct application in other courses of the integrated MSc.
1. Functions, limits and derivatives
Revision of concepts studied in Secondary School about functions, limits, continuity and differentiation.
2. Complements on functions and differential calculus
New functions and their derivatives. Inverse functions and their derivatives. Local linear approximation and differentials. Relative extrema. Abolute extrema. Indeterminate forms and L’Hôpital’s rule.
3. Antiderivative of a function
Antiderivative of an elementary function. Integration by parts. Integation by substitution. Integration of rational functions. Rational substitution. Trigonometric antiderivatives. Trigonometric substitutions.
4. Integral Calculus
Approximate calculation of areas. Riemann sum. Definite Integral. Basic properties of definite integrals; Assessment of integrals of continuous functions. Mean value of f in (a,b). Mean value theorem. Integration of discontinuous functions. Geometric applications of integrals. Deduction of integral formulas. Functions defined by integrals. Improper integrals.
5. Series of real numbers
Series of real numbers. Study of series by its definition. Series of non-negative terms. Series of non-positive terms. Alternating series. Series of positive and negative terms.
6. Taylor and Maclaurian series
Function approximation by polynomials. Estimative of the nth remainder for a Taylor polynomial. Taylor’s theorem and Taylor's formula with remainder. Taylor series (or Maclaurian series) for a function. Power series.
General practical classes are based on the presentation of the themes of the course, where examples are given. The theoretical-practical classes are based on problem solving and application of the themes that have been taught during theoretical classes.
Designation | Weight (%) |
---|---|
Teste | 100,00 |
Total: | 100,00 |
Designation | Time (hours) |
---|---|
Estudo autónomo | 84,00 |
Frequência das aulas | 54,00 |
Total: | 138,00 |
Obtaining frequency for regular students depends on:
Students with frequency from previous years do not need to attend classes. Students who wish to attend must obey the above rules.
Final mark (FM) will be based on the following formula:
FM = max(0,1MT + 0,4T1 + 0,5T2; 0,45T1 + 0,55T2)wherein:
MT = average of 3 minitests
T1 = Test 1
T2 = Test 2
Second Call:
FM = max(0,1MT + 0,9ER; ER)
wherein:
ER = Second call exam
IMPORTANT NOTES:
An exam at the corresponding seasons.
Students cannot use calculators on tests and exams.