BACHELOR OF SCIENCE IN MATHEMATICS

Explore the programs and courses offered by BACHELOR OF SCIENCE IN MATHEMATICS

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Program Overview

The Bachelor of Science in Mathematics is designed to provide students with a solid foundation in mathematical theory and methods, preparing them for careers in education, research, finance, computer science, and engineering or for further academic studies in Master’s or Doctoral programs.

The curriculum emphasizes logical reasoning, problem-solving skills, and rigorous analysis, incorporating both pure and applied mathematics, with an introduction to computing tools and scientific communication.


Teaching Language : The Bachelor’s Degree in Mathematics is predominantly taught in French; however, in recent years, certain subjects or parts of them have been offered in English.

Curriculum Highlights

Core Courses

Program Duration and Structure:

Duration: 3 years (6 semesters)

Total Credits: 180 ECTS

Semester Breakdown:

Core Courses (UEF – Fundamental Units)

Methodological Courses (UEM)

Discovery Courses (UED)

Transversal Skills (UET – e.g., English, Scientific Communication)


Advanced Topics

Core Subjects (Examples):

Year 1:

Mathematical Analysis I & II

Algebra I & II

Introduction to Algorithms and Programming

Introduction to Probability and Statistics

Structure of Machines (Computer Architecture)

Physics (Mechanics, Electricity)

Scientific Communication and Office Tools

English Language

 

Specialized Subjects:

Year 2:

Algebra III & IV: Linear transformations, eigenvalues, bilinear forms, quadratics

Mathematical Analysis III & IV: Series, improper integrals, multivariable functions, partial derivatives

Topology: Open/closed sets, continuity, compactness, metric spaces

Numerical Analysis I & II: Interpolation, numerical integration, solving equations, systems of equations

Logic and Programming Tools

Geometry: Curves, surfaces, affine and Euclidean geometry

Probability: Random variables, probability laws, expectations, Bayes' theorem

Mathematics Applications to Sciences

History of Mathematics

 

Year 3:

Measure and Integration: Lebesgue measure and integration, convergence theorems

Hilbert Spaces and Functional Analysis

Differential Equations: ODEs, stability, mathematical physics equations

Optimization Techniques

Specialty Courses (Electives):

Group Theory

Field Theory

Differential Geometry

Partial Differential Equations

Numerical Methods for PDEs

Mathematical Modeling

Probability and Statistics

Didactics of Mathematics

Capstone Projects and Scientific Report Writing

Ethics in Teaching and Research


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Admissions Information

Prerequisites: High school diploma (Baccalaureate) in Mathematics or Science track.

Admission Procedure: Based on academic performance, particularly in mathematics and physics.


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