Course guide of Mathematics (2261111)

Curso 2024/2025
Approval date: 20/06/2024

Grado (bachelor's degree)

Bachelor'S Degree in Economics

Branch

Social and Legal Sciences

Module

Formación Básica

Subject

Matemáticas

Year of study

1

Semester

1

ECTS Credits

6

Course type

Core course

Teaching staff

Theory

Julia García Cabello. Grupo: A

Practice

Julia García Cabello Grupos: 1 y 2

Timetable for tutorials

Julia García Cabello

Email
  • First semester
    • Monday
      • 08:00 a 08:30 (Petición de Tutoría Presencial por Email)
      • 12:30 a 14:30 (Petición de Tutoría Presencial por Email)
    • Tuesday
      • 08:00 a 08:30 (Petición de Tutoría Presencial por Email)
      • 12:30 a 14:30 (Petición de Tutoría Presencial por Email)
    • Wednesday de 08:00 a 08:30 (Petición de Tutoría Presencial por Email)
    • Thursday de 08:00 a 08:30 (Petición de Tutoría Presencial por Email)
  • Second semester
    • Monday de 08:00 a 13:00 (Petición de Tutoría Presencial por Email)
    • Tuesday de 08:00 a 08:30 (Petición de Tutoría Presencial por Email)
    • Wednesday de 08:00 a 08:30 (Petición de Tutoría Presencial por Email)

Prerequisites of recommendations

Pre-university level of mathematics

Brief description of content (According to official validation report)

The contents developed in the program are mathematical calculation and Linear Algebra:
• Basic concepts of real functions of one variable.
• Differential and integral calculus of real functions of one variable.
• Optimisation of functions of one variable.
• Basics of vectors and matrices.
• Solving systems of linear equations.
• Matrix diagonalisation.
• Numerical sequences and series

General and specific competences

General competences

  • CG02. Cognitive comprehension skills.
  • CG03. Ability to analyse and summarise.
  • CG04. Ability to organise and plan.
  • CG08. Problem-solving skills.
  • CG09. Ability to make decisions.
  • CG16. Ability to engage in critical and self-critical reasoning.
  • CG17. Ability to learn and work autonomously.
  • CG24. Ability to apply knowledge to practice.

Specific competences

  • CE11. Know and apply the basic concepts of Mathematics.
  • CE12. Use the appropriate tools of Linear Algebra and Differential Calculus in economic analysis.
  • CE13. Learn integration methods and their application to the economic and business field.
  • CE14. Know about numerical series and learn how to calculate the sum in geometrical series.

Objectives (Expressed as expected learning outcomes)

1. Acquisition of the basic techniques of mathematics.
2. Gain the ability to lay out economic and business problems with mathematical language.
3. Relate the knowledge acquired with the typical concepts of other subjects of the
degree (Statistics, Economic Theory, Accounting ...).
4. Solve problems in the economic and business environment using the most
appropriate mathematical techniques.
5. Analyse the economic and business reality quantitatively.
6. Calculate the value of the sums in geometric series.
7. Adequately interpret graphs of functions of one variable.
8. Calculate derivatives and primitives of elementary functions.
9. Solve optimisation of functions of one variable.
10. Solve symbolically abstract matrix equations.
11. Calculate the determinants of low dimensional square matrices.
12. Calculate the inverse matrices of regular low dimensional matrices.
13. Calculate and interpret the eigenvalues and eigenvectors of square matrices.
14. Apply abstract knowledge to problems formulated with economic terminology.

Detailed syllabus

Theory

1. Basic notions on single-variable functions

  • Intervals. Domain and range of a function.
  • Elementary functions. Properties.
  • Functions in Economics: supply, demand, incomes, costs, benefits, utility.
  • Limit of a function. Continuity.
  • Bolzano’s theorem. Applications.

2. Differential and Integral Calculus of single-variable functions

  • Derivatives: geometric interpretation and applications.
  • Antiderivatives (primitive functions).
  • Definite integrals. Barrow’s rule.
  • Optimization of single-variable functions

3. Optimization of single-variable functions

  • Increase and decrease intervals. Concave and convex functions.
  • Local and global extrema. Weierstrass theorem.

4. Basic notions on matrices

  • General knowledge about matrices: notation, operations and properties.
  • Computing determinants.
  • Computing the inverse of a matrix.

5. System of linear equations

  • Row reduction. Rank of a matrix.
  • Gaussian elimination.
  • Rouché- Fröbenius theorem (Rouché–Capelli theorem). Cramer’s rule.
  • Homogeneous systems.

6. Matrix diagonalisation

  • Computing eigenvalues and eigenvectors
  • Equivalent matrices. Diagonalisation: the diagonal and the invertible matrices.
  • Economic applications.

7. Sequences and series of real numbers

  • Sequences of real numbers, operators on sequences, arithmetic and geometric sequences.
  • Series of real numbers. Convergence and series convergence tests.
  • Sum of a geometric series.

Practice

Seminars / Workshops (This is non-scoring activity)
At least a one seminar will be performed, whose contents will be selected amongst the following
ones:

  • Seminar 1: Demand and supply equations. Surplus and shortages.
  • Seminar 2: Taylor series approximation.
  • Seminar 3: Optimization of basic functions in Economics and Business.

Computer-based practices:

  • Practice 1. Representation of single-variable functions. Derivatives and antiderivatives.
  • Practice 2. Operating with matrices. Solving systems of linear equations. Matrix diagonalization.

Bibliography

Basic reading list

  • García Cabello J., Matemáticas imprescindibles en la Administración de empresas: Ejemplos prácticos y aplicaciones. Ed. Fleming, (2016).
  • Haeussler J.R y Paul R.S. Matemáticas para Administración, Economía, Ciencias Sociales y
    de la Vida. Ed. Prentice Hall.
  • Larson, R B., R P. Hostetler y B. H. Edwards. Cálculo y geometría analítica. Vol. I (9 Ed.) Mc-
    Graw-Hill, Madrid, (2011).
  • Merino, L. M. y E. Santos. Algebra Lineal con métodos elementales. Ed. Thomson, (2006).
    Stewart J. Cálculo Diferencial e integral. Ed. Thomson.
  • Sydsaeter, K., Hammond, P.J., Matemáticas para el Análisis Económico. Ed. Prentice Hall.
  • Zill, D. y Wright, W. Cálculo de una variable. Mc Graw Hill, (2011)

Complementary reading

  • Alegre P. y otros. Matemáticas Empresariales. Ed. AC.
  • Balbás A. y otros. Análisis Matemático para la Economía (I y II). Ed. AC.
  • Caballero R. y otros. Matemáticas Aplicadas a la Economía y la Empresa. Ed. Pirámide.

Recommended links

Department of Applied Mathematics: http://www.ugr.es/~mateapli

Teaching methods

  • MD01. Docencia presencial en el aula 
  • MD02. Estudio individualizado del alumno, búsqueda, consulta y tratamiento de información, resolución de problemas y casos prácticos, y realización de trabajos y exposiciones. 
  • MD03. Tutorías individuales y/o colectivas y evaluación  

Assessment methods (Instruments, criteria and percentages)

Ordinary assessment session

1. In the continuous assessment, that attendance to the corresponding assessment
activities is obligatory. Lack of attendance to the assessment activities on the dates and
the places specified for it will be understood as a waiver of the right of performance of
these activities.
2. In order to pass the course under this option, a final mark equal o bigger than 5 is
required. Otherwise, the course is considered to be failed. Dates and places for
assessment activities will be made public sufficiently in advance.
3. In the continuous assessment option, the total score is the sum of all scores
corresponding to assessment activities. These are the following:

Two test-type controls throughout the semester corresponding to units 1,2,3 and 4, 5, 6
respectively. They are non-eliminatory while containing both theory and practical
questions (including those of seminars and computer practicals) related to the matter of
study. Each of these scored a maximum of 3 points.These shall be carried out either face-to-
face or throughout the Prado platform, depending on the current sanitary situation.

Two additional exams on computer practicals which score 0.5 points each.These shall be carried out either face-to-face or throughout the Prado platform, depending on the
current sanitary situation.


A final written exam which scores a maximum of 3 points (30% weight versus 70% weight corresponding to all other assessment activities). Date and place for the final
written exam will be made public by the Faculty of Economic and Business Sciences. These shall be carried out either face-to-face or throughout the Prado
platform, depending on the current sanitary situation.

All these assessment activities could be complemented with personal interviews lectures-students,
if required by lectures.The explanations given by students in such interviews therein will be binding when scoring
these activities. These shall be carried out either face-to-face or throughout Google Meet sessions, depending on
the current sanitary situation.

Students with no attendance to either the 2 partial tests or a partial and the final exam (that is, 2
of the 3 written exams) will have the final mark “Not Having Been Submitted” (“No Presentado”).

Extraordinary assessment session

It will consist of a single written exam which will be graded on a 0-10 scale (scoring a maximum
of 10 points). In order to pass the course under this option, a final mark equal o bigger than 5 is
required. Otherwise, the course is considered to be failed.


Date and place for the final written exam will be made public by the Faculty of Economic and
Business Sciences. These shall be carried out throughout the Prado platform in case that face-toface
assessments are not allowed for the Sanitary Authorities’ s dictations.


Students with no attendance to such final written exam (that scores a maximum of 10 points) will
have the final mark “Not Having Been Submitted” (“No Presentado”).

Single final assessment

According to the Rules for Assessment and grading of the students of the University of Granada
(latest changes approved by the Governing Board of 26th October 2016,
http://secretariageneral.ugr.es/bougr/pages/bougr112/_doc/examenes%21) the assessment of
students’ academic performance will reflect public, objective and impartial criteria, and will
preferably be continuous.


Nevertheless, the students may apply for a single final assessment (article 8 of the current Rules
for Assessment, which provides for the taking of a single final assessment). Students may apply
for either in the first two weeks of teaching of the subject or two weeks following change of
matriculation. Application is to be made through the electronic system (https://sede.ugr.es/sede/catalogo-de-procedimientos/solicitud-evaluacion-unica-final.html),
citing and accrediting the reasons for not being able to undergo the system of continuous
assessment (reasons of employment, health, disability or any other correctly justified cause),
with the understanding that this assessment is undertaken in a single academic act in order to
accredit that the student has acquired in full the competencies described.
On one hand, lack of application for a single final assessment will be understood as a waiver of
the right of such assessment. On the other hand, those students who have been granted a single
final assessment are not eligible to apply for a continuous assessment.

Single Final Assessment shall consist of a single written exam which will be graded on a 0-10
scale (scoring a maximum of 10 points). In order to pass the course under this option, a final
mark equal o bigger than 5 is required. Otherwise, the course is considered to be failed.

Date and place for the final written exam will be made public by the Faculty of Economic and Business
Sciences. These shall be carried out throughout the Prado platform in case that face-to-face
assessments are not allowed for the Sanitary Authorities’ s dictations.


Students with no attendance to such final written exam (that scores a maximum of 10 points) will
have the final mark “Not Having Been Submitted” (“No Presentado”).

Additional information

PRADO online platform
Student Guides, where schedules, methodologies, timetables are fully described
https://fccee.ugr.es/pages/docencia/guias_titulaciones


Rules for Assessment and grading of the students of the University of Granada (article 8)
http://secretariageneral.ugr.es/bougr/pages/bougr112/_doc/examenes%21

Información de interés para estudiantado con discapacidad y/o Necesidades Específicas de Apoyo Educativo (NEAE): Gestión de servicios y apoyos (https://ve.ugr.es/servicios/atencion-social/estudiantes-con-discapacidad).