A catalogue of modules and programmes available from the School of Electronic and Communications Engineering.
Module Details: MATH3108
This module is used in DT008.3.
This module is not a prerequisite or corequisite for any other module.
|Code||MATH3108||The unique code for this module.|
|Name||Mathematics 4||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||MATH2108, MATH2208||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 matrix diagonalization, Lagrange multiplier techniques and more advanced applications of the Laplace transform. Line and double integrals are introduced. Discrete systems are analysed by means of the Z-transform. The module concludes by applying statistics to a selection of practical problems||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||1 hour/week||The number of hours per week of tutorials for this module.|
|LabHrs||None||The number of hours per week of practical laboratory work for this module.|
|Descriptor||MATH3108.pdf (uploaded 15 Nov 2006)||Full details of the module.|
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