Course Title: Apply advanced calculus to technology problems
Part B: Course Detail
Teaching Period: Term2 2025
Course Code: MATH5365C
Course Title: Apply advanced calculus to technology problems
Important Information:
Please note that this course may have compulsory in-person attendance requirements for some teaching activities.
School: 520T Future Technologies
Campus: City Campus
Program: C6187 - Advanced Diploma of Engineering (Aeronautical)
Course Contact: Amita Iyer
Course Contact Phone: +61 3 9925 8311
Course Contact Email: Amita.Iyer@rmit.edu.au
Name and Contact Details of All Other Relevant Staff
Nominal Hours: 40
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 of competency defines the skills and knowledge required to apply advanced calculus in an engineering or related application and includes differential and integral calculus. It includes both the application of theory in simple calculations either manually or through the use of relevant software packages for more complex situations.
It is suitable for paraprofessionals and technologists required to solve advanced mathematical problems in an engineering or related field, or for those pursuing technologist careers and qualifications.
Individuals completing this work either already have or are developing skills and experience in mathematics covering calculus and differentials.
National Codes, Titles, Elements and Performance Criteria
National Element Code & Title: |
MEM234022 Apply advanced calculus to technology problems |
Element: |
1. Identify a need for the application of calculus |
Performance Criteria: |
1.1 Identify and define a problem requiring application of calculus 1.2 Determine data currently available for analysis 1.3 Identify ways of obtaining other required data 1.4 Determine information required from outcome |
Element: |
2. Prepare to solve problem by calculus |
Performance Criteria: |
2.1 Determine appropriate calculus to be applied 2.2 Identify and gain access to appropriate computational devices 2.3 Collect required input data 2.4 Analyse collected data for suitability and completeness 2.5 Take appropriate action to address any deficiencies found |
Element: |
3. Solve problem using calculus |
Performance Criteria: |
3.1 Apply appropriate technique to collected data 3.2 Check answer to ensure it is within the expected rational results 3.3 Interpret answer to determine information required by problem definition and translate the result of the statistical analysis into a form which is useable by relevant stakeholders |
Element: |
4. Communicate outcomes |
Performance Criteria: |
4.1 Communicate outcome to relevant stakeholders by appropriate means 4.2 Explain outcome to stakeholders, as appropriate 4.3 Confirm that the result of the analysis assists in the resolution of the problem |
Learning Outcomes
On successful completion of this course, you will have developed and applied the skills and knowledge required to demonstrate competency in the elements of this unit of competency.
Details of Learning Activities
You will involve in the following learning activities to meet requirements for this competency and stage 1 competencies for Engineering Associates.
• Lectures
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
EA 1.1. 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 MEM234022 in the Assessment Matrix.
Teaching Schedule
| Week | Topic | Assessment / Learning activities |
| Week 1 |
Introduction & Review (Functions, domain/range, limits, continuity) |
|
| Week 2 |
Derivative Rules I (Power, product, quotient, chain rules) |
|
| Week 3 |
Derivative Rules II (Implicit and logarithmic differentiation, higher-order derivatives) |
|
| Week 4 |
Graphing with Derivatives (Sketching curves, concavity, inflection points) |
|
| Week 5 |
Optimisation (Maxima, minima, rates of change) |
|
| Week 6 | Related Rates & Error Approximation |
|
| Week 7 |
Partial Differentiation (Multivariable functions, first and second partial derivatives) |
|
| Week 8 | Directional Derivatives & Gradient Vectors | Assessment Task 1 – Differential Calculus |
| Week 9 |
Intro to Integration (Antiderivatives, substitution, area under curves) |
|
| Week 10 |
Integration Techniques I (Partial fractions, by parts, trig/hyperbolic substitutions) |
|
| Week 11 |
Integration Techniques II (Improper integrals, arc length, surface area) |
|
| Week 12 |
Engineering Applications -1 (Centroid, Centre of Mass, RMS, Work, Pressure, Arc Length, Surface Area) |
Assessment Task 2 – Integral Calculus |
| Week 13 |
Engineering Applications - 2 (Moments of Inertia, Mass of Non-uniform Materials, Fluid Flow and Volume Rate) |
|
| Week 14 |
Engineering Applications - 3 (Torque and Rotational Work, Heat Transfer) |
|
| Week 15 | Optimisation of aircraft wing design - 1 | Assessment Task 3 - Aircraft wing design |
| Week 16 | Optimisation of aircraft wing design - 2 | |
| Week 17 | Feedback and review | |
| Week 18 | Feedback and review |
Learning Resources
Prescribed Texts
References
Other Resources
All email communications will be sent to your RMIT email address and you must regularly check your RMIT emails.
Overview of Assessment
Assessment for this course is ongoing throughout the semester. Your knowledge and understanding of course content are assessed through participation in class exercises, oral/written presentations and through the application of learned skills and insights. Full assessment briefs will be provided and can be found on CANVAS.
Assessment Tasks
You are required to complete the following assessment tasks:
Assessment 1- Differential Calculus - Week 8
Assessment 2 - Integral Calculus - Week 12
Assessment 3 - Aircraft wing design - Week 15
Assessment Matrix
Assessment vs MEM234022 Elements & Performance Criteria
Element |
Performance criteria |
|||
|
Assessment Task 1: Differential calculus |
Assessment Task 2: Integral calculus |
Assessment Task 3: Aircraft wing design |
||
1. Identify a need for the application of calculus |
1.1 Identify and define a problem requiring application of calculus |
Q3, Q6, Q7, Q8, Q9 |
Q22, Q23, Q24, Q25, Q26 |
Part 1 |
|
1.2 Determine data currently available for analysis |
Part 1 |
|||
|
1.3 Identify ways of obtaining other required data |
Part 1 |
|||
|
1.4 Determine information required from outcome |
Part 1 |
|||
2. Prepare to solve problem by calculus |
2.1 Determine appropriate calculus to be applied |
Q1, Q2, Q3, Q4, Q5, Q6, Q7, Q8, Q9, Q10, Q11, Q12, Q13, Q14, Q15, Q16, Q17, Q18 |
Q1, Q2, Q3, Q4, Q5, Q6, Q7, Q8, Q9, Q10, Q11, Q12, Q13, Q14, Q15, Q16, Q17, Q18, Q19, Q20, Q21, Q22, Q23, Q24, Q25, Q26 |
Part 1 |
|
2.2 Identify and gain access to appropriate computational devices |
Part 1 |
|||
|
2.3 Collect required input data |
Part 1 |
|||
|
2.4 Analyse collected data for suitability and completeness |
Part 1 |
|||
|
2.5 Take appropriate action to address any deficiencies found |
Part 1 |
|||
3. Solve problem using calculus |
3.1 Apply appropriate technique to collected data |
Part 1 |
||
|
3.2 Check answer to ensure it is within the expected rational results |
Part 1 |
|||
|
3.3 Interpret answer to determine information required by problem definition and translate the result of the statistical analysis into a form which is useable by relevant stakeholders |
Part 1 |
|||
4. Communicate outcomes |
4.1 Communicate outcome to relevant stakeholders by appropriate means |
Part 1 |
||
|
4.2 Explain outcome to stakeholders, as appropriate |
Part 1 |
|||
|
4.3 Confirm that the result of the analysis assists in the resolution of the problem |
Part 1 |
Other Information
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.
Course Overview: Access Course Overview