Checking date: 24/04/2024


Course: 2024/2025

Statistics I
(14227)
Dual Bachelor in International Estudies and Econmics (Study Plan 2018) (Plan: 417 - Estudio: 328)


Coordinating teacher: VELILLA CERDAN, SANTIAGO

Department assigned to the subject: Statistics Department

Type: Basic Core
ECTS Credits: 6.0 ECTS

Course:
Semester:

Branch of knowledge: Social Sciences and Law



Objectives
SPECIFIC COMPETENCES: Develop the capacity of students to: 1. Carry out statistical analyses of univariate and bivariate data. 2. Formulate and solve basic probability problems. 3. Formulate, apply and solve basic probabilistic models. 4. Obtain point estimators for the parameters of some probability distributions. 5. Estimate by confidence intervals the mean of a population. 6. Apply statistical methods through software. TRANSVERSAL COMPETENCES: 1. Capacity of analysis and synthesis. 2. Use of statistical software. 3. Problem solving. 4. Teamwork. 5. Critical thinking. 6. Oral and written communication.
Skills and learning outcomes
Description of contents: programme
PROGRAMME: 1. Introduction. 1.1. Concept and use of Statistics. 1.2. Statistical terms: populations, subpopulations, individuals and samples. 1.3. Types of variables. 2. Analysis of univariate data. 2.1. Representations and graphics of qualitative variables. 2.2. Representations and graphics of quantitative variables. 2.3. Numerical summaries. 3. Analysis of bivariate data. 3.1. Representations and graphics of qualitative and discrete data. 3.2. Representations and numerical summaries of quantitative data: covariance and correlation. 4. Probability. 4.1. Random experiments, sample space, elementary and composite events. 4.2. Probability: definition and properties. Conditional Probability and the multiplication Law. Independence. 4.3. The law of total probability and Bayes' theorem. 5. Probability models. 5.1. Random variables. Discrete random variables: Probability function and distribution function. Mean and variance. 5.2. Continuous random variables: Density function and distribution function. Mean and variance. 5.3. Probability models. Discrete probability models: Bernoulli, Binomial and Poisson. 5.4. Continuous probability models: Uniform, exponential and normal. 5.5. Central limit theorem. 6. Introduction to Statistical Inference. 6.1. Point estimation of population parameters. 6.2. Goodness-of-fit of a statistical model. Graphical methods. 6.3. Introduction to confidence interval estimation.
Learning activities and methodology
14 theoretical classes with supporting material available on the Web, and 14 practical classes involving problem-solving and computing labs. No group tutorials are foreseen except possibly during the final class recovery week.
Assessment System
  • % end-of-term-examination 40
  • % of continuous assessment (assigments, laboratory, practicals...) 60

Calendar of Continuous assessment


Extraordinary call: regulations
Basic Bibliography
  • Newbold, P. et al.. Statistics for Business and Economics. Prentice-Hall.. 2012
  • Triola, M.F.. Essentials of Statistics. Pearson. 2015
Recursos electrónicosElectronic Resources *
(*) Access to some electronic resources may be restricted to members of the university community and require validation through Campus Global. If you try to connect from outside of the University you will need to set up a VPN


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