CloseHelpPrint
Kies de Nederlandse taal
Course module: 202001221
202001221
Calculus 2
Course info
Course module202001221
Credits (ECTS)3
Course typeStudy Unit
Language of instructionEnglish
Contact persondr. J. de Jong
E-mailj.dejong-3@utwente.nl
Lecturer(s)
Lecturer
prof.dr. J.G.E. Gardeniers
Contactperson for the course
dr. J. de Jong
Lecturer
dr. J. de Jong
Lecturer
ir. P.P. Veugelers
Academic year2020
Starting block
2B
Application procedureYou apply via OSIRIS Student
Registration using OSIRISYes
Aims
The student is able to (especially w.r.t. functions of two or three variables):
  1. work with partial derivatives and applications.
  2. define and evaluate double and triple integrals over bounded regions
Content
This course introduces the mathematics needed for disciplines such as classical mechanics, thermodynamics, fluid dynamics, and probability theory.
This course directly follows up on the courses Calculus 1A and 1B. The aim is to introduce differential calculus for functions of more than one variable. Applications of this theory include the chain rule, linearizations, differentials, and extreme values (both with and without constraints).
In the spirit of univariate functions, integrals of multivariate functions will be defined as limits of Riemann sums. In this case the domain of integration becomes, for example, a rectangle, a disc, or a spherical region. This leads to double and triple integrals which can be used to compute areas, volumes, probabilities, charges, forces, masses, and moments of inertia.
Sometimes integrals of multivariate functions are easier to compute when the usual Carte- sian coordinates are replaced by polar, cylindrical, or spherical coordinates. Determinants, which will also be topic in the course Linear Algebra, play an important role in these coordinate transformations.
The follow-up course Vector Calculus (BMT,CE,CSE,ME) will cover line and surface integrals. By parameterising the domain of integration these integrals can be reduced to single or double integrals. The theorems of Gauss, Green, and Stokes provide a deep connection between all these integrals.
 
Module
Module 4
Participating study
Bachelor Chemical Science & Engineering
Required materials
Book
Thomas’ Calculus (12th edition) ISBN 9781783991587
Recommended materials
-
Instructional modes
Lecture

Self study with assistance
Presence dutyYes

Tutorial
Presence dutyYes

Workshop
Presence dutyYes

Tests
Final exam

CloseHelpPrint
Kies de Nederlandse taal