Undergraduate: Level 5
Thursday 03 October 2019
Saturday 14 December 2019
01 October 2019
Requisites for this module
BSC L1G2 Economics and Mathematics (Including Placement Year),
BSC LG11 Economics and Mathematics,
BSC LG18 Economics and Mathematics (Including Foundation Year),
BSC LG1C Economics and Mathematics (Including Year Abroad),
BSC G100 Mathematics,
BSC G102 Mathematics (Including Year Abroad),
BSC G103 Mathematics (Including Placement Year),
BSC G104 Mathematics (Including Foundation Year),
BSC G1F3 Mathematics with Physics,
BSC G1F4 Mathematics with Physics (Including Placement Year),
BSC GCF3 Mathematics with Physics (Including Year Abroad)
This module covers the classical theory of vector calculus. Topics covered include gradient, divergence and curl, areas of surfaces and integrals over surfaces. Three central theorems of the subject, Green's Theorem, the Divergence Theorem, and Stokes' theorem, are developed and various examples are given including applications to electromagnetism and Maxwell's equations.
To introduce the classical theory of vector calculus, including vector differential operators and line and surface integrals, and associated applications.
On completion of the course, students should
- Be familiar with the concept of a scalar field and a vector field and how they are related.
- Know and understand how to determine gradient, divergence, and curl, and related combinations.
- Understand how and when to apply a change of coordinates in integral problems, including polar, cylindrical, and spherical coordinates.
- Be able to determine line integrals for a scalar field and for a vector field, including the use and application of Green’s Theorem.
- Be able to determine surface integrals for a scalar field and for a vector field, including the use and application of the Divergence Theorem and Stokes’ Theorem.
- Be familiar with Maxwell’s equations and applications of vector calculus in electromagnetism.
A more detailed syllabus is as follows:
Brief review of Vectors, including scalar and cross products.
Definition of gradient, divergence and curl. Examples.
Brief review of double integrals (including change of variables), triple integrals.
Path and line integrals.
Areas of surfaces, integrals over surfaces.
Green's Theorem (sketch proof included but not examinable).
Applications and examples.
This course consists of 30 contact hours consisting of 25 lectures and 5 classes. There are three revision lectures in the summer term.
- William Cox. (May 1, 1998) Vector Calculus (Modular Mathematics Ser): Butterworth-Heinemann.
- Vector Calculus, http://www.mecmath.net/
The above list is indicative of the essential reading for the course. The library makes provision for all reading list items, with digital provision where possible, and these resources are shared between students. Further reading can be obtained from this module's reading list.
Assessment items, weightings and deadlines
|Coursework / exam
||120 minutes during Summer (Main Period) (Main)
Module supervisor and teaching staff
Prof Edward Codling, email email@example.com
Professor Edward Codling (firstname.lastname@example.org)
Dr Tania Clare Dunning
The University of Kent
Reader in Applied Mathematics
Available via Moodle
Of 37 hours, 33 (89.2%) hours available to students:
4 hours not recorded due to service coverage or fault;
0 hours not recorded due to opt-out by lecturer(s).
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