Course Title: Apply calculus to engineering tasks
Part B: Course Detail
Teaching Period: Term2 2020
Course Code: MATH7063C
Course Title: Apply calculus to engineering tasks
School: 174T School of VE Engineering, Health & Science
Campus: City Campus
Program: C6130 - Advanced Diploma of Engineering (Mechanical)
Course Contact: Program Manager
Course Contact Phone: +61 3 9925 4468
Course Contact Email: vehs@rmit.edu.au
Name and Contact Details of All Other Relevant Staff
Teacher
Andrew Kim
Ph: +61 3 9925 4295
Email: andrew.kim@rmit.edu.au
Appointment by email
Teacher
Annabelle Lopez
Phone: +613 9925 4823
Email: annabelle.lopez@rmit.edu.au
Appointments by email
George Zouev
Program Manager
Ph: +61 3 9925 4935
E: george.zouev@rmit.edu.au
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
MEM23004A Apply technical mathematics
Course Description
This unit of competency covers the application of calculus, including differentiation and integration techniques to engineering applications. It includes the use and application of standard differentiation and integration rules, finding maximum and minimum values of curves, application to rates of change and slope, finding definite integrals, using method of substitution, using trigonometric identities and finding areas under curves.
National Codes, Titles, Elements and Performance Criteria
National Element Code & Title: |
MEM23007A Apply calculus to engineering tasks |
Element: |
1. Determine scope of calculus techniques required for an engineering application |
Performance Criteria: |
1.1 Analyse an engineering application for required calculus tasks |
Element: |
2. Apply differential techniques to engineering applications |
Performance Criteria: |
2.1 Apply standard differentiation rules to solve engineering problems |
Element: |
3. Apply integration techniques to engineering applications |
Performance Criteria: |
|
Learning Outcomes
Refer to Elements
Details of Learning Activities
Learning Activities
You will be involved in the following learning activities to meet requirements for this competency and stage 1 competencies for Engineering Associates.
- Lectures
- Tutorials
Engineers Australia Mapping Information:
This course is mapped against stage 1 competencies for Engineering Associates developed by Engineers Australia as detailed below:
EA 1. Knowledge and Skill Base
EA1.1. Descriptive, formula-based understanding of the underpinning natural and physical sciences and the engineering fundamentals applicable to the practice area.
EA 1.2. Procedural-level understanding of the mathematics, numerical analysis, statistics, and computer and information sciences which underpin the practice area.
EA 1.3. In depth practical knowledge and skills within specialist sub-disciplines of the practice area.
EA 1.4. Discernment of engineering developments within the practice area.
EA 1.5. Knowledge of contextual factors impacting the practice area.
EA 1.6. Understanding of the scope, principles, norms, accountabilities and bounds of contemporary engineering practice in the area of practice.
EA 2. Engineering Application Ability
EA 2.1. Application of established technical and practical methods to the solution of well-defined engineering problems.
EA 2.2. Application of technical and practical techniques, tools and resources to well defined engineering problems.
EA 2.3. Application of systematic synthesis and design processes to well defined engineering problems.
EA 2.4. Application of systematic project management processes.
EA 3. Professional and Personal Attributes
EA 3.1. Ethical conduct and professional accountability.
EA 3.2. Effective oral and written communication in professional and lay domains.
EA 3.3. Creative, innovative and pro-active demeanour.
EA 3.4. Professional use and management of information.
EA 3.5. Orderly management of self, and professional conduct.
EA 3.6. Effective team membership and team leadership.
Engineers Australia Stage 1 Competencies are mapped with competency MEM23007A in the Assessment Matrix.
Teaching Schedule
The proposed teaching schedule for this competency is detailed below:
Week |
Topics Delivered |
Elements/Performance Criteria |
1 |
Introduction to the course, OH&S Brief Basic Concepts, Limits, First Principles/Power Rule |
1.1 - 1.4, 2.1 - 2.4 |
2 |
First Principles/Power Rule, Differentiation by rule - Polynomials, Trigonometric, Exponential and Logarithmic |
2.1 - 2.4 |
3 |
Differentiation of functions by rule-Polynominals, Trigonometric, Expontential and Logarithmic functions Chain Rule, Product Rule and Quotient Rule Assignments issued Observation Day |
2.1 - 2.4 |
4 |
Chain Rule, Product Rule and Quotient Rule Parametric Differentiation, the concepts of implicit and explicit functions Observation Day |
2.1 - 2.4 |
5 |
Implicit Differentiation, Logarithmic Differentiation Assessment 1 – Test (Differentiation only) |
1.1 - 1.4, 2.1 - 2.4 |
6 |
Introduction to Anti-Differentiation/Integration Indefinite integral of Polynomials, Trigonometric and Exponential Functions |
2.1 - 2.4 |
7 |
Indefinite integral of Polynomials, Trigonometric and Exponential Functions Observation Day |
3.1 - 3.4 |
8 |
Indefinite integral of Polynomials, Trigonometric and Exponential Functions |
3.1 - 3.4 |
9 |
Definite integral of Polynomials, Trigonometric and Exponential Functions and hence finding the area of the given functions Observation Day |
3.1 - 3.4 |
10 |
Definite integral of Polynomials, Trigonometric and Exponential Functions and hence finding areas of curves under given functions Area between curves |
3.1 - 3.4 |
11 |
Area between Curves Integration of rectilinear motion and engineering applications, rates of change Observation Day |
1.1 - 1.4, 3.1 - 3.4 |
12 |
Integration of rectilinear motion and engineering applications Differential Calculus-Stationary points, maximum and minimum applications, rates of change Observation Day |
1.1 - 1.4, 3.1 - 3.4 |
13 |
Basic first order differential equations Differential Calculus-Stationary points, maximum and minimum applications Assessment 2 – Assignment due (online submission - through CANVAS) Observation Day |
2.1 - 2.4, 3.1 - 3.4 |
14 |
Differential equations, basic first order differential equations, basic second order differential equations
Assessment 4 – Assignment Projectile Project due (online submission - through CANVAS) Observation Day |
1.1 - 1.4, 2.1 - 2.4 |
15 |
Basic first order differential equations, Second order differential equations Observation Day |
1.1 - 1.4, 2.1 - 2.4 |
16 |
Revision Observation Day |
1.1 - 1.4, 3.1 - 3.4 |
17 |
Assessment 3 - Final Test |
1.1 - 1.4, 2.1 - 2.4, 3.1 - 3.4 |
18 |
Student feedback |
1.1 - 1.4, 2.1 - 2.4, 3.1 - 3.4 |
Student directed hours involve completing activities such as reading online resources, assignments, individual student-teacher course-related consultation. Students are required to self-study the learning materials and complete the assigned out of class activities for the scheduled non-teaching hours. The estimated time is 25 hours outside the class time.
Learning Resources
Prescribed Texts
References
Other Resources
Students will be able to access information and learning materials through myRMIT and may be provided with additional materials in class. List of relevant reference books, resources in the library and accessible Internet sites will be provided where possible. During the course, you will be directed to websites to enhance your knowledge and understanding of difficult concepts.
Overview of Assessment
The assessment is conducted in both theoretical and practical aspects of the course according to the performance criteria set in the National Training Package. 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. To successfully complete this course you will be required to demonstrate competency in each assessment task detailed under Assessment Tasks:
Assessment 1: Test
Assessment 2: Assignment
Assessment 3: Test
Assessment 4: Projectile Assignment
These tasks assess the following Course Learning Outcomes (CLOs):
Assessment Mapping Matrix
Element/Performance Criteria Covered |
Test |
Assignment |
Test |
Projectile Assignment |
1.1 |
X |
X |
X |
X |
1.2 |
X |
X |
X |
X |
1.3 |
X |
X |
X |
X |
1.4 |
|
X |
|
X |
2.1 |
X |
X |
|
X |
2.2 |
X |
X |
|
X |
2.3 |
X |
X |
|
X |
2.4 |
X |
X |
|
X |
3.1 |
|
X |
X |
X |
3.2 |
|
X |
X |
X |
3.3 |
X |
X |
X |
X |
3.4 |
X |
X |
X |
X |
Assessment Tasks
Assessment 1: Test 1, Week 5
Assessment 2: Assignment, Week 13
Assessment 3: Final Test, Week 17
Assessment 4: Assignment - Projectile Project, Week 14
This course is assessed as Competent or Not Yet Competent
Assessment Matrix
Assessment vs MEM23007A Elements & Performance Criteria
MEM23007A Elements & Performance Criteria | ||||||||||||
Assessments |
1.1 |
1.2 |
1.3 |
1.4 |
2.1 |
2.2 |
2.3 |
2.4 |
3.1 |
3.2 |
3.3 |
3.4 |
Test 1 |
x |
x |
x |
|
X |
X |
X |
X |
|
|
X |
X |
Assignment |
X |
X |
X |
X |
X |
X |
X |
X |
X |
X |
X |
X |
Final test |
X |
X |
X |
X |
X |
X |
X |
|||||
Assignment - Projectile Project |
X |
X |
X |
X |
X |
X |
X |
X |
X |
X |
X |
X |
Assessment vs Engineers Australia Stage 1 Competencies
Engineers Australia Stage 1 Competencies | ||||||||||||||||
Assessments |
EA1.1 |
EA1.2 |
EA1.3 |
EA1.4 |
EA1.5 |
EA1.6 |
EA2.1 |
EA2.2 |
EA2.3 |
EA2.4 |
EA3.1 |
EA3.2 |
EA3.3 |
EA3.4 |
EA3.5 |
EA3.6 |
Test 1 |
X |
X |
X |
|
|
|
X |
|
|
|
|
|
|
|
|
|
Assignment |
X |
X |
X |
|
|
|
X |
|
|
|
|
X |
|
|
|
|
Final Test |
X |
X |
X |
|
|
|
X |
|
|
|
|
X |
|
|
|
|
Assignment - Projectile Project | X | X | X | X | X | |||||||||||
All assessments |
3 |
3 |
3 |
0 |
0 |
0 |
3 |
0 |
0 |
0 |
0 |
2 |
0 |
0 |
0 |
0 |
0 (Blank) |
Graduate attribute is not assessed. |
|||||||||||||||
1 |
Graduate attribute is assessed in at least one but less than one-third of the Element |
|||||||||||||||
2 |
Graduate attribute is assessed in at least one third but less than two-thirds of the Element |
|||||||||||||||
3 |
Graduate attribute is assessed in more than two-thirds of the Element |
Other Information
Private study hours are approximately 25 hours for this course.
Credit Transfer and/or Recognition of Prior Learning (RPL):
You may be eligible for credit towards courses in your program if you have already met the learning/competency outcomes through previous learning and/or industry experience. To be eligible for credit towards a course, you must demonstrate that you have already completed learning and/or gained industry experience that is:
- Relevant
• Current
• Satisfies the learning/competency outcomes of the course
Please refer to http://www.rmit.edu.au/students/enrolment/credit to find more information about credit transfer and RPL.
Study and learning Support:
Study and Learning Centre (SLC) provides free learning and academic development advice to you.
Services offered by SLC to support your numeracy and literacy skills are:
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
Equitable Learning Services (ELS):
If you are suffering from long-term medical condition or disability, you should contact Equitable Learning Services (ELS) to seek advice and support to complete your studies.
Please refer to https://www.rmit.edu.au/students/support-and-facilities/student-support/equitable-learning-services to find more information about services offered by Equitable Learning Services (ELS).
Late submission:
If you require an Extension of Submittable Work (assignments, reports or project work etc.) for 7 calendar days or less (from the original due date) and have valid reasons, you 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. You will be notified within no more than 2 working days of the date of lodgment as to whether the extension has been granted.
If you seek an Extension of Submittable Work for 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.
Submittable Work (assignments, reports or project work etc.) submitted late without approval of an extension will not be accepted or marked.
Special consideration:
Please Refer http://www.rmit.edu.au/students/specialconsideration 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