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| + | === Mathematics 1A === | ||
| + | ** General information ** | ||
| + | * Course name in French: Mathématiques 1A | ||
| + | * ECTS credits: 5 | ||
| + | * Level : Undergraduate (Bachelor 3rd year) | ||
| + | * Teaching hours: 96 hours (Lectures = 36 hours, Tutorials = 36 hours, Self-study = 24 hours) | ||
| + | * Language of instruction: | ||
| + | * Coordinator: | ||
| + | * Instructor(s): | ||
| + | * Last update 18/02/2022 by C. Pouet | ||
| + | |||
| + | ** <color red> This course unit is offered twice a year. </ | ||
| + | * Fall-Winter Semester: from early September until end of January/ | ||
| + | * Spring Semester: from early February until end of June | ||
| + | |||
| + | ==== Brief description ==== | ||
| + | |||
| + | This course is a basic course in Mathematics for any student in engineering. | ||
| + | * Mathematical analysis (Analyse théorique in French) | ||
| + | * Numerical analysis (Analyse numérique in French) | ||
| + | * Probability and statistics (Probabilités et statistique in French) | ||
| + | |||
| + | ==== Learning outcomes ==== | ||
| + | |||
| + | * tba | ||
| + | |||
| + | ==== Prerequisites ==== | ||
| + | * Undergraduate level in | ||
| + | * Mathematical analysis: Riemann integral, change of variable, derivatives, | ||
| + | * Linear algebra: vector, matrix, vector space, scalar product, determinant, | ||
| + | |||
| + | ==== Assessment ==== | ||
| + | * Final exam: 50% | ||
| + | * Continuous assessment: 50% (project, quiz, lab report) | ||
| + | |||
| + | ==== Course content ==== | ||
| + | - Mathematical analysis | ||
| + | * Differential calculus | ||
| + | * Optimization | ||
| + | * Lebesgue integral | ||
| + | * Fourier transform and Fourier series | ||
| + | * Hilbert spaces | ||
| + | - Numerical analysis | ||
| + | * tba | ||
| + | - Probability and Statistics | ||
| + | * Sigma-algebra, | ||
| + | * Real random variables (discrete and continuous) | ||
| + | * Expectation, | ||
| + | * Random vector, covariance, variance matrix | ||
| + | * Independence | ||
| + | * Strong and weak law of large numbers | ||
| + | * Central Limit Theorem | ||
| + | * Introduction to statistics: statistical experiment, quadratic risk, bias, pointwise estimation, Maximum Likelihood Method, confidence interval | ||
| + | ==== Bibliography ==== | ||