A catalogue of modules and programmes available from the School of Electronic and Communications Engineering.
Module Details: MATH3208
This module is used in DT008.3.
This module is not a prerequisite or corequisite for any other module.
|Code||MATH3208||The unique code for this module.|
|Name||Further Mathematics||The name of this module.|
|ECTS||5||The number of credits awarded for successful completion of this module.|
|School||School of Mathematical Sciences||The School responsible for this module.|
|Level||Ordinary Degree (NQAI level 7)||The level of programmes that normally use this module.|
|Stage||3||The programme stage at which this module is normally given.|
|Duration||13 weeks||The time that this module usually lasts.|
|Prerequisite||MATH2308||Codes of any modules that must be completed before this module can be started.|
|Corequisite||Codes of any modules that must be taken at the same time as this one.|
|Author||Michael Downes||The person who wrote the module descriptor.|
|Keywords||Mathematics||The areas that this module is related to.|
|Description||This module introduces the student to both the continuous and discrete Fourier transform. The methods of differential and integral calculus will be extended to vector- valued functions. Suitabletopics in numerical techniques will be considered. The module concludes with a study of functions of a complex variable.||A brief description of the module.|
|Revision||10 Sep 2007||The date of last revision of this information.|
|LectureHrs||3 hours/week||The number of hours per week of lectures for this module.|
|TutorialHrs||2 hours (lab/tutoria||The number of hours per week of tutorials for this module.|
|LabHrs||2 hours (lab/tutoria||The number of hours per week of practical laboratory work for this module.|
|Descriptor||MTHX3208.pdf (uploaded 15 Nov 2006)||Full details of the module.|
Note: Some documents are accessible only from inside the DIT.