MA210-5-AU-CO:
Vector Calculus

The details
2024/25
Mathematics, Statistics and Actuarial Science (School of)
Colchester Campus
Autumn
Undergraduate: Level 5
Current
Thursday 03 October 2024
Friday 13 December 2024
15
04 January 2024

 

Requisites for this module
(none)
(none)
(none)
(none)

 

MA222, MA225, MA323

Key module for

BSC G100 Mathematics,
BSC G102 Mathematics (Including Year Abroad),
BSC G103 Mathematics (Including Placement Year),
BSC G104 Mathematics (Including Foundation Year),
MMATG198 Mathematics,
BSC G1F3 Mathematics with Physics,
BSC G1F4 Mathematics with Physics (Including Placement Year),
BSC G1F5 Mathematics with Physics (Including Foundation Year),
BSC GCF3 Mathematics with Physics (Including Year Abroad),
MSCIG199 Mathematics and Data Science

Module description

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.

Module aims

The aims of this module are:



  • To introduce the classical theory of vector calculus, including vector differential operators and line and surface integrals, and associated applications.

Module learning outcomes

By the end of the module, students will be expected to:



  1. Be familiar with the concept of a scalar field and a vector field and how they are related.

  2. Know and understand how to determine gradient, divergence, and curl, and related combinations.

  3. Understand how and when to apply a change of coordinates in integral problems, including polar, cylindrical, and spherical coordinates.

  4. Be able to determine line integrals for a scalar field and for a vector field, including the use and application of Green’s Theorem.

  5. 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.

  6. Be familiar with Maxwell’s equations and applications of vector calculus in electromagnetism.

Module information

Indicative syllabus:


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).
Divergence Theorem.
Stokes Theorem.
Applications and examples.
Maxwell's equations.

Learning and teaching methods

Teaching in the School will be delivered using a range of face-to-face lectures, classes, and lab sessions as appropriate for each module. Modules may also include online only sessions where it is advantageous, for example for pedagogical reasons, to do so.

Bibliography

This module does not appear to have a published bibliography for this year.

Assessment items, weightings and deadlines

Coursework / exam Description Deadline Coursework weighting
Coursework   Test      
Exam  Main exam: In-Person, Closed Book, 120 minutes during Summer (Main Period) 
Exam  Reassessment Main exam: In-Person, Closed Book, 120 minutes during September (Reassessment Period) 

Additional coursework information

Reassessment strategy:

  • If a student fails the test and the exam they will only take the resit exam which will be worth 100%;
  • If a student fails the exam but passes the test they will only take the resit exam, the mark for which will be re-aggregated with the test mark;
  • If a student fails the test but passes the exam they will take the resit test, the mark for which will be re-aggregated with the exam mark.

Exam format definitions

  • Remote, open book: Your exam will take place remotely via an online learning platform. You may refer to any physical or electronic materials during the exam.
  • In-person, open book: Your exam will take place on campus under invigilation. You may refer to any physical materials such as paper study notes or a textbook during the exam. Electronic devices may not be used in the exam.
  • In-person, open book (restricted): The exam will take place on campus under invigilation. You may refer only to specific physical materials such as a named textbook during the exam. Permitted materials will be specified by your department. Electronic devices may not be used in the exam.
  • In-person, closed book: The exam will take place on campus under invigilation. You may not refer to any physical materials or electronic devices during the exam. There may be times when a paper dictionary, for example, may be permitted in an otherwise closed book exam. Any exceptions will be specified by your department.

Your department will provide further guidance before your exams.

Overall assessment

Coursework Exam
20% 80%

Reassessment

Coursework Exam
20% 80%
Module supervisor and teaching staff
Dr Georgi Grahovski, email: gggrah@essex.ac.uk.
Dr Georgi Grahovski
maths@essex.ac.uk

 

Availability
Yes
Yes
No

External examiner

Prof Stephen Langdon
Brunel University London
Professor
Resources
Available via Moodle
Of 14 hours, 14 (100%) hours available to students:
0 hours not recorded due to service coverage or fault;
0 hours not recorded due to opt-out by lecturer(s), module, or event type.

 

Further information

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