The course syllabus contains changes
See changesCourse syllabus adopted 2021-02-26 by Head of Programme (or corresponding).
Overview
- Swedish nameFlervariabelanalys
- CodeMVE600
- Credits7.5 Credits
- OwnerTKTEM
- Education cycleFirst-cycle
- Main field of studyMathematics, Engineering Physics
- DepartmentMATHEMATICAL SCIENCES
- GradingTH - Pass with distinction (5), Pass with credit (4), Pass (3), Fail
Course round 1
- Teaching language Swedish
- Application code 59118
- Maximum participants50
- Open for exchange studentsNo
- Only students with the course round in the programme overview.
Credit distribution
Module | Sp1 | Sp2 | Sp3 | Sp4 | Summer | Not Sp | Examination dates |
---|---|---|---|---|---|---|---|
0119 Examination 6 c Grading: TH | 6 c |
| |||||
0219 Intermediate test 1.5 c Grading: UG | 1.5 c |
|
In programmes
Examiner
- Thomas Bäckdahl
- Associate Professor, Analysis and Probability Theory, Mathematical Sciences
Eligibility
General entry requirements for bachelor's level (first cycle)Applicants enrolled in a programme at Chalmers where the course is included in the study programme are exempted from fulfilling the requirements above.
Specific entry requirements
The same as for the programme that owns the course.Applicants enrolled in a programme at Chalmers where the course is included in the study programme are exempted from fulfilling the requirements above.
Course specific prerequisites
Linjär algebra och geometri motsvarande kursen TMA660 och Matematisk analys fortsättning (envariabelanalys) motsvarande kursen TMA976.Aim
The course provides basic knowledge of the fundamental theories within mathematical analysis.Learning outcomes (after completion of the course the student should be able to)
The goal is to provide the students with the necessary mathematical tools in multivariable calculus and 3-dimensional vector analysis for subsequent courses in the Engineering Physics and Technical Mathematics programs. Among the most important learning outcomes are the following:- To understand the basic concepts of multivariable differential calculus, such as: partial derivative, differentiability, linearization, gradient, implicit and inverse function theorems
- To be able to apply the chain rule to changes of variables in PDE
- To be able to find and classify the stationary points of a multivariable function and apply this knowledge to the solution of optimization problems
- To understand the definition of Riemann integral in arbitrary dimension
- To be able to apply some basic techniques when computing multiple integrals, such as: inspection/symmetry, Fubini's theorem, change of variables, level surfaces
- To be able to handle different parametrizations of curves and surfaces in 3-space, and understand the meaning of and be able to compute line and surface integrals
- To understand Green's theorem in the plane, plus Gauss' and Stokes' theorems in 3-space and apply these to the computation of line and flux integrals
- To acquire some basic knowledge of how the concepts of the course arise in physics, especially in mechanics and electromagnetism
- To be able to differentiate under the integral sign
Content
Functions of several variables. Partial derivatives, differentiability, the chain rule, directional derivative, gradient, level sets, tangent planes. General orthonormal coordinate systems. Taylor's formula for functions of several variables, characterization of stationary points. Double integrals, iterated integration, change of variables, triple integrals, generalized integrals. Space curves. Line integrals, Green's formula in the plane, potentials and exact differential forms. Sufaces in R3, surface area, surface integrals, divergence and curl, Gauss' and Stokes' theorems. Some physical problems leading to partial differential equations. Partial differential equations of the first order. Differentiating through the integral. Functional determinants, inverse functions theorem, implicit functions. Extremal problems for functions of several variables, Lagrange's multiplier rule. Singular fields, delta functions, vector potentials.Organisation
Lectures and exercises. Computer exercises with Matlab and Mathematica.Literature
A. Persson, L.-C. Böiers: Analys i flera variabler, Studentlitteratur, Lund. Övningar till Analys i flera variabler, Institutionen för matematik, Lunds tekniska högskola. OTHER LITERATURE L. Råde, B. Westergren: BETA - Mathematics Handbook, Studentlitteratur, Lund. E. Pärt-Enander, A. Sjöberg: Användarhandledning för Matlab, Uppsala universitet.Examination including compulsory elements
A written 5 hour examination. bonuspoint-rewarding tests bonuspoint-rewarding Matlab-problemsThe course examiner may assess individual students in other ways than what is stated above if there are special reasons for doing so, for example if a student has a decision from Chalmers on educational support due to disability.
The course syllabus contains changes
- Changes to examination:
- 2022-02-14: Examination length Examination length 1,5 hours added by examinator
[2022-06-10 1,5 hec, 0219] - 2022-02-14: Examination datetime Examination datetime 2022-06-10 Afternoon added by examinator
[1,5 hec, 0219] - 2022-02-14: Exam by department No longer exam by department by examinator
[2022-06-10 1,5 hec, 0219] Not given by dept - 2022-02-14: Examination datetime Examination datetime 2022-08-25 Afternoon added by examinator
[1,5 hec, 0219] - 2022-02-14: Exam by department No longer exam by department by examinator
[1,5 hec, 0219] Not given by dept
- 2022-02-14: Examination length Examination length 1,5 hours added by examinator
- Changes to course rounds:
- 2021-11-19: Examinator Examinator changed from Peter Hegarty (hegarty) to Thomas Bäckdahl (thobac) by Viceprefekt
[Course round 1]
- 2021-11-19: Examinator Examinator changed from Peter Hegarty (hegarty) to Thomas Bäckdahl (thobac) by Viceprefekt