Course Title: Use advanced computational processes to provide solutions to engineering problems

Part B: Course Detail

Teaching Period: Term1 2012

Course Code: EEET6769C

Course Title: Use advanced computational processes to provide solutions to engineering problems

School: 130T Vocational Engineering

Campus: City Campus

Program: C6110 - Advanced Diploma of Computer Systems Engineering

Course Contact: Program Manager

Course Contact Phone: +61 3 9925 4468

Course Contact Email: geoengineering-tafe@rmit.edu.au


Name and Contact Details of All Other Relevant Staff

Dr Elmas Aliu
elmas.aliu@rmit.edu.au
Phone: +61 3 9925 4360

Nominal Hours: 80

Regardless of the mode of delivery, represent a guide to the relative teaching time and student effort required to successfully achieve a particular competency/module. This may include not only scheduled classes or workplace visits but also the amount of effort required to undertake, evaluate and complete all assessment requirements, including any non-classroom activities.

Pre-requisites and Co-requisites

Nil.

Course Description

This unit covers the application of advanced computational processes to solve engineering problems. It encompasses working safely, applying problem solving techniques, using a range of advanced mathematical processes, providing solutions to electrical/electronics engineering problems and justifying such solutions.
Note. Typical engineering problems are those encountered in meeting requirements in a design brief, meeting performance requirements and compliance standards, revising systems operating parameters and dealing with system malfunctions.


National Codes, Titles, Elements and Performance Criteria

National Element Code & Title:

UEENEEE027B Use advanced computational processes to provide solutions to engineering problems

Element:

1. Provide computational solutions to engineering problems.

Performance Criteria:

1.1 OHS procedures for a given work area are
identified, obtained and understood.

1.2 The nature of the problems are obtained from
documentation or work supervisor to establish the
scope of work to be undertaken.

1.3 Problems are clearly stated in writing and/or
diagrammatic form to ensure they are understood
and appropriate methods used to resolve them.

1.4 Known constants and variable related to the
problem are obtained from measured values or
problem documentation.

1.5 Alternative methods for resolving the problem are
considered and where necessary discussed with
appropriate person(s).

1.6 Problems are solved using advanced mathematical
processes and within the realistic accuracy.

Element:

2. Complete work and document problem solving activities.

Performance Criteria:

2.1 Justification for solutions used to solve engineering
problems is documented for inclusion in
work/project development records in accordance
with professional standards.
2.2 Work completion is documented and appropriate
person(s) notified


Learning Outcomes



Details of Learning Activities

Students will participate face to face in

Classroom tutorial activities to consolidate the core essential mathematical concepts for engineering study, which may include:
• Linear algebra, including matrices, determinants, linear mappings, solving systems of linear equations
• Vector algebra and applications
• Function of multiple variables (partial derivatives)
• Sequences and series
• Differential equations, partial differential equations,
• Number theory,
• Statistics and probability

Work simulation activities focus in technical leadership activities, which include: team building, identify team member’s work task, clear and concise dissemination of ideas and information, planning and organising activities to meet requested standards. Demonstrate leadership characteristic, such as: problem solving, keeping records and documenting tasks.


Teaching Schedule

Week NumberTopic DeliveredAssessment Task
1

Introduction to the competency of EEET6769C

Provide computational solutions to engineering problems using

Linear Algebra:
Matrix Algebra

UEENEEE027B:

PC (elements):

1.1-1.3, and
2.1

 
2

• Matrices and the inverse of a matrix
• Linear mappings

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 

 
3

• Determinants
• Solutions of linear equations

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
4

Provide computational solutions to engineering problems using
Vectors
• Introduction
• Geometrical representation
• Addition and scalar multiplication
• Dot and cross product

Lines and Planes
• Equations of lines and planes

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
5

Functions of multiple Variables
• Graphs, level curves and surfaces
• Partial derivatives, chain rule; directional derivative
• Maxima and minima

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

Assignment  handed out (worth 20% of total mark) due date end of week 16.
6

Provide computational solutions to engineering problems using
Sequences and series
• Algebraic and Fourier series, convergence

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 

 
7

 

Complete work and document problem solving activities using

Sequences and series (cont)

• Taylor’s Theorem. Taylor’s Polynomials
• Power series, addition, composition and multiplication

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
8

Practice test and revision

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

Practice test and revision
9Closed book Test Test  (worth 30% of total mark)
10

 

Provide computational solutions to engineering problems using

Differential Equations:

• Introduction and definition
• First order separable and linear equations

Complete work and document problem solving activities using Applications of first order differential equations

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
11

 

• Second Order linear Differential Equations

Complete work and document problem solving activities using

Applications of second order differential equations

Provide computational solutions to engineering problems using
Partial Differential equations

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
12

 Partial Differential equations

Provide computational solutions to engineering problems using
Numerical Techniques for solving partial differential equations
Complete work and document problem solving activities
• Applications of partial differential equations to engineering problems

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
13

Provide computational solutions to engineering problems using
Number Theory

• Integer, irrational and complex numbers
• Number systems
• Arithmetic operations
• Accuracy and stability

UEENEEE027B:

PC (elements):

1.1-1.4, and
2.1 

 
14

Provide computational solutions to engineering problems using
Statistics

• Assembly, representation and analysis of distributions to data
• Fitting distributions to data

UEENEEE027B:

PC (elements):

1.1-1.4, and
2.1

 
15

• Non-parametric statistics
• Tests of significance for means, variance and extreme values
• Correlation

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
16

• Revision

• Practice Exam 

UEENEEE027B:

PC (elements):

1.1-1.6, and
2.1 - 2.2

 
17 /18Closed book Exam Final Exam (worth 50% of total mark) in either Week 17 or 18
   
 


Learning Resources

Prescribed Texts

Glyn James, Modern Engineering Mathematics, fourth edition, Pearson Education Australia

9780132391443


References

Croft A, Davidson R, Mathematics for Engineers, third edition, Pearson Education Australia

9780132051569


Other Resources


Overview of Assessment

Assessment may incorporate a variety of methods including written/oral activities and demonstration of practical skills to the relevant industry standards. Participants are advised that they are likely to be asked to personally demonstrate their assessment activities to their teacher/assessor. Feedback will be provided throughout the course.


Assessment Tasks

Assessment task 1 (assignment ): 20%
Written assignment to demonstrate an understanding with applications of linear algebra, including matrices, determinants, linear mappings, solving systems of linear equations, vectors, lines and planes, function of multiple variables (partial derivatives) and sequences and series.. Also will include: applications of differential equations, partial differential equations, number theory, statistics and probability . Assessment allows students to work as a group which will help to revise and prepare for the next assessment (Test which will cover similar topics up to week 9, and Final exam which will cover all topics).

Assessment task 2 (test ): 30%
This assessment demonstrates an understanding with applications of linear algebra, including matrices, determinants, linear mappings, systems of linear equations, vectors, lines and planes, function of multiple variables (partial derivatives)  and sequences and series, which are covered from week 1 to week 8. The time allowed for this Exam is no more that 2 hours.

Assessment task 3 (Final Exam): 50%
This assessment demonstrates an understanding with applications of of linear algebra, including matrices, determinants, linear mappings, systems of linear equations, vectors, lines and planes, function of multiple variables (partial derivatives) ,sequences and series, differential equations, partial differential equations, number theory, statistics and probability which is covered from week 10 to week 16. The time allowed for this test is no more that 2.5 hours.

 

This course is graded using the following course grades-

CHD- Competent with High Distinction
CDI- Competent with Distinction
CC- Competent with Credit
CAG- Competency Achieved - Graded
NYC- Not Yet Competent
DNS- Did Not Submit for Assessment

Make sure you understand the special consideration policy available at -

http://www.rmit.edu.au/browse;ID=qkssnx1c5r0y 

 


Assessment Matrix

Element CoveredAssessment TaskProportion of Final AssessmentSubmission Time
1 and 2Test 130% Week 9
1 and 2Assignment 
Final Exam
20%
50%
Week 16
Week 17 or 18

Other Information

• Minimum student directed hours are 16 in addition to 64 scheduled teaching hours.
• Student directed hours involve completing activities such as reading online resources, assignments, preparation for test and exam and individual student-teacher course-related consultation.
assignment writing, thesis writing and study skills advice
maths and science developmental support and advice
English language development

Please Refer http://www.rmit.edu.au/studyandlearningcentre to find more information about Study and learning Support

Disability Liaison Unit:

Students with disability or long-term medical condition should contact Disability Liaison Unit to seek advice and support to
complete their studies.

Please Refer http://www.rmit.edu.au/disability to find more information about services offered by Disability Liaison Unit

Late submission:

Students requiring extensions for 7 calendar days or less (from the original due date) must complete and lodge an Application
for Extension of Submittable Work (7 Calendar Days or less) form and lodge it with the Senior Educator/ Program Manager.
The application must be lodged no later than one working day before the official due date. The student will be notified within
no more than 2 working days of the date of lodgment as to whether the extension has been granted.

Students seeking an extension of more than 7 calendar days (from the original due date) must lodge an Application for Special
Consideration form under the provisions of the Special Consideration Policy, preferably prior to, but no later than 2 working days
after the official due date.

Assignments submitted late without approval of an extension will not be accepted or marked.


Special consideration:

Please Refer http://www.rmit.edu.au/browse;ID=riderwtscifm to find more information about special consideration

Plagiarism:

Plagiarism is a form of cheating and it is very serious academic offence that may lead to expulsion from the University.

Please Refer: www.rmit.edu.au/academicintegrity to find more information about plagiarism.

Other Information:

All email communications will be sent to your RMIT email address and you must regularly check your RMIT emails.



Course Overview: Access Course Overview