MTU Courses - MATH7021 - Maths for Civil Engineering

Module Details

Module Code:	MATH7021
Title:	Maths for Civil Engineering
Long Title:	Mathematics for Civil Engineering
NFQ Level:	Intermediate
Valid From:	Semester 1 - 2019/20 ( September 2019 )

Duration:	1 Semester

Credits:	5

Field of Study:	4610 - Mathematics

Module Delivered in:	2 programme(s)

Module Description:	This module covers: linear systems; the methods of undetermined coefficients, and Laplace transforms, for the solution of linear differential equations; multiple integrals.

Learning Outcomes
On successful completion of this module the learner will be able to:
#	Learning Outcome Description
LO1	Formulate and solve linear systems using matrix methods.
LO2	Use both the methods of undetermined coefficients and of Laplace transforms to solve differential equations.
LO3	Solve systems of differential equations.
LO4	Evaluate double and triple integrals.

Dependencies
Module Recommendations This is prior learning (or a practical skill) that is strongly recommended before enrolment in this module. You may enrol in this module if you have not acquired the recommended learning but you will have considerable difficulty in passing (i.e. achieving the learning outcomes of) the module. While the prior learning is expressed as named MTU module(s) it also allows for learning (in another module or modules) which is equivalent to the learning specified in the named module(s).
10145	MATH6040	Technological Mathematics 201
Incompatible Modules These are modules which have learning outcomes that are too similar to the learning outcomes of this module. You may not earn additional credit for the same learning and therefore you may not enrol in this module if you have successfully completed any modules in the incompatible list.
No incompatible modules listed
Co-requisite Modules
No Co-requisite modules listed
Requirements This is prior learning (or a practical skill) that is mandatory before enrolment in this module is allowed. You may not enrol on this module if you have not acquired the learning specified in this section.
No requirements listed

Indicative Content
Linear Systems Linear systems including those arising from truss systems and network flows. Gaussian Elimination. Partial Pivoting. The Jacobi Method for solving heat distribution problems.
Differential Equations Solution of second order linear differential equations using the method of undetermined coefficients. Laplace transforms. The inverse Laplace transform via table look-up and partial fraction expansions. Solution of first and second order differential equations. Solution of 2x2 systems of linear differential equations.
Multiple Integrals Development and evaluation of double integrals over rectangular and circular regions. Applications to include mass of a non-homogeneous solid, centroids, and second moment of area about an axis. Development and evaluation of triple integrals over boxes and cylinders.

Assessment Breakdown	%
Module Content & Assessment
Coursework	30.00%
End of Module Formal Examination	70.00%

Assessments

Coursework

Assessment Type	Written Report	% of Total Mark	15
Timing	Week 5	Learning Outcomes	1
Assessment Description Short report utilising software such as Microsoft Excel to assist in applying Gaussian elimination to linear systems. To include truss systems.

Assessment Type	Written Report	% of Total Mark	15
Timing	Week 10	Learning Outcomes	2
Assessment Description Short written project investigating various differential equations.

End of Module Formal Examination

Assessment Type	Formal Exam	% of Total Mark	70
Timing	End-of-Semester	Learning Outcomes	1,2,3,4
Assessment Description End-of-Semester Final Examination

Reassessment Requirement
Repeat examination Reassessment of this module will consist of a repeat examination. It is possible that there will also be a requirement to be reassessed in a coursework element.

The University reserves the right to alter the nature and timings of assessment

Module Workload

Workload: Full Time
Workload Type	Contact Type	Workload Description	Frequency	Average Weekly Learner Workload	Hours
Lecture	Contact	Delivery of syllabus material	Every Week	3.00	3
Tutorial	Contact	Based on exercises	Every Week	1.00	1
Independent & Directed Learning (Non-contact)	Non Contact	Review of lecture material, completion of exercises	Every Week	3.00	3
Total Hours					7.00
Total Weekly Learner Workload					7.00
Total Weekly Contact Hours					4.00

Workload: Part Time
Workload Type	Contact Type	Workload Description	Frequency	Average Weekly Learner Workload	Hours
Lecture	Contact	Lecture	Every Week	2.00	2
Tutorial	Contact	Based on exercises	Every Second Week	1.00	2
Independent & Directed Learning (Non-contact)	Non Contact	No Description	Every Week	4.00	4
Total Hours					8.00
Total Weekly Learner Workload					7.00
Total Weekly Contact Hours					3.00

Recommended Book Resources
Module Resources
K A Stroud, Dexter J Booth. (2013), Advanced Engineering Mathematics, 7th. Palgrave Macmillan, Hampshire, [ISBN: 9781137031204].
Supplementary Book Resources
Dennis G. Zill, Warren S. Wright, Michael R. Cullen. (2011), Advanced Engineering Mathematics, 4th. Jones and Bartlett, Sudbury, Mass, [ISBN: 9780763779665]. Steven C. Chapra, Raymond P. Canale. (2010), Numerical Methods for Engineers, 6th. McGraw-Hill Higher Education, Boston, [ISBN: 9780071267595].
This module does not have any article/paper resources
This module does not have any other resources

Programme Code	Programme	Semester	Delivery
Module Delivered in
CR_CCIVL_7	Bachelor of Engineering in Civil Engineering	6	Elective
CR_CENVI_7	Bachelor of Engineering in Environmental Engineering	6	Elective