Checking date: 06/05/2022


Course: 2022/2023

Calculus I
(15364)
Study: Dual Bachelor in Data Science and Engineering and Telecommunication Technologies Engineering (371)


Coordinating teacher: FERNANDEZ CABALLERO, ANTONIO

Department assigned to the subject: Department of Mathematics

Type: Basic Core
ECTS Credits: 6.0 ECTS

Course:
Semester:

Branch of knowledge: Engineering and Architecture



Requirements (Subjects that are assumed to be known)
None
Objectives
Study of the fundamental Mathematical Analysis of one variable.
Skills and learning outcomes
Description of contents: programme
1. REAL VARIABLE FUNCTIONS 1.1 The real line: sets of numbers, properties, absolute values 1.2 Elementary functions and curves 1.3 Polar coordinates 2. LIMITS AND CONTINUITY 2.1 Limits of functions. Properties and fundamental theorems 2.2 Continuity of functions 2.3 Fundamental theorems 3. DERIVATIVES AND THEIR APPLICATIONS 3.1 Definition, properties, and derivatives of elementary functions. 3.2 Meaning of the derivative. Extrema. 4 LOCAL STUDY OF A FUNCTION 4.1 Graphic representation 4.2 Taylor polynomial and its applications 5. SEQUENCES AND SERIES OF REAL NUMBERS 5.1 Sequences of numbers 5.2 Series of positive numbers 5.3 Absolute and conditional convergence 6. SEQUENCES AND SERIES OF FUNCTIONS 6.1 Sequences and series of functions. 6.2 Taylor series 7. INTEGRATION IN ONE VARIABLE 7.1 Calculus of primitives 7.2 Fundamental Theorem of Calculus 7.3 Applications
Learning activities and methodology
THEORETICAL-PRACTICAL CLASSES. [44 hours with 100% classroom instruction, 1.76 ECTS] Knowledge and concepts students must acquire. They receive course notes and will have basic reference texts to facilitate the follow-up of the classes and the development of subsequent work. Exercises will be solved, they will be practised with problems by the student and there will be workshops and tests of evaluation to acquire the necessary skills. TUTORING SESSIONS. [4 hours of tutoring with 100% on-site attendance, 0.16 ECTS] Individualized attendance (individual tutoring) or in-group (group tutoring) for students with a teacher. STUDENT INDIVIDUAL WORK OR GROUP WORK [98 hours with 0 % on-site, 3.92 ECTS] FINAL EXAM. [4 hours with 100% on-site, 0.16 ECTS] Global assessment of knowledge, skills and capacities acquired throughout the course. METHODOLOGIES THEORY CLASS. Classroom presentations by the teacher with IT and audiovisual support in which the subject`s main concepts are developed while providing material and bibliography to complement student learning. PRACTICAL CLASS. Resolution of practical cases and problems, posed by the teacher, and carried out individually or in a group. TUTORING SESSIONS. Individualized attendance (individual tutoring sessions) or in-group (group tutoring sessions) for students with a teacher as a tutor.
Assessment System
  • % end-of-term-examination 60
  • % of continuous assessment (assigments, laboratory, practicals...) 40
Calendar of Continuous assessment
Basic Bibliography
  • D. PESTANA, J.M. RODRÍGUEZ, E. ROMERA, E. TOURÍS, V. ÁLVAREZ, A. PORTILLA. Curso práctico de Cálculo y Precálculo. Ariel (Planeta). 2019
  • S.L. SALAS, E. HILLE & G.J. Etgen . Calculus: One and Several Variables. Wiley. 2006
Additional Bibliography
  • B.P. DEMMIDOVICH. Problemas y ejercicios de Anlálisis Matemático. Paraninfo. 1980
  • G.L. BRADLEY, K.J. SMITH. Calculus. Pearson. 2012
  • M. SPIVAK. Calculus. Cambridge University Press. Fourth edition, 2008
  • T.M. APOSTOL. Calculus vol. 1. Wiley. 1991

The course syllabus may change due academic events or other reasons.