Objectives of Programme's Learning Outcomes

• Understand the fundamentals
• Demonstrate knowledge and understanding of mathematics suitable for the study of physics, and be able to use this mathematics in applications in the field of physics
• Undertake further study having already acquired and enhanced the necessary learning skills
• Provide clear and accurate information
• Communicate complex information to a qualified scientific partner
• Have a rigorous scientific approach
• Solve simple problems in the context of physics by identifying their basic aspects and by using both appropriate theoretical and experimental methods

Learning Outcomes of UE

At the end of this course, students will be able to
- define mathematically basic objects and concepts addressed in the courses;
- state and demonstrate propositions and therorems addressed in the courses;
- illustrate definitions, propositions and theorems thanks to examples and counter-examples;
- carry out simple reasoning and proves about various mathematical objects and concepts.

Content of UE

Introduction to mathematical analysis:
- Study of real properties;
- Numerical sequences;
- Limit of functions and continuity ;
- Derivation, Primitivation, Integration;
- Differential equations ;
- Multiple integration and integral theorems.
 

Prior Experience

Elementary mathematics

Type of Assessment for UE in Q2

• Written examination
• Graded tests

Q2 UE Assessment Comments

The off-session examination counts for 1/3 of the note of the continuous evaluation during the semester.
The examination during the June session counts for 2/3 of the note of the continuous evaluation during the semester.
The UE final note is the maximum between the note of the June examination and the note of the continuous evaluation during the semester.

Type of Assessment for UE in Q3

• Written examination

Q3 UE Assessment Comments

Not applicable