A first-year university course in Ordinary Differential Equations is an introduction to the basic ideas and methods used to solve differential equations involving one variable.
At this level, the focus is on building foundations:
- Students learn what differential equations are and how they describe change (e.g., growth, decay, motion).
- The course mainly covers first-order equations, including simple solving methods like separation of variables and linear equations.
- It introduces basic second-order equations.
Overall, the goal is to help students develop problem-solving skills and understand how mathematical models describe real-world processes
- Teacher: Hachemi DADDIOUAISSA
This course provides a rigorous introduction to the Riemann integral, one of the fundamental concepts of calculus. It begins with the geometric problem of calculating areas under curves and progressively builds the theoretical foundation of integration. The chapter then transitions to practical techniques for computing primitives (antiderivatives) for various classes of functions, including polynomials, rational functions, trigonometric functions, exponential functions, and hyperbolic functions. Each section is accompanied by solved exercises to reinforce understanding.
- Teacher: Hachemi DADDIOUAISSA
This course provides a rigorous introduction to the Riemann integral, one of the fundamental concepts of calculus. It begins with the geometric problem of calculating areas under curves and progressively builds the theoretical foundation of integration. The chapter then transitions to practical techniques for computing primitives (antiderivatives) for various classes of functions, including polynomials, rational functions, trigonometric functions, exponential functions, and hyperbolic functions. Each section is accompanied by solved exercises to reinforce understanding.
- Teacher: Hachemi DADDIOUAISSA