CQUniversity Unit Profile
MATH11247 Foundation Mathematics
Foundation Mathematics
All details in this unit profile for MATH11247 have been officially approved by CQUniversity and represent a learning partnership between the University and you (our student).
The information will not be changed unless absolutely necessary and any change will be clearly indicated by an approved correction included in the profile.
General Information

Overview

Foundation Mathematics is designed to provide you with foundation concepts, rules and methods of elementary mathematics. The main aim of this unit is to provide the foundations of mathematics, which are necessary to develop a unified body of knowledge. You will learn algebraic fundamentals and equation solving. Exponents and logarithms will be introduced together with linear systems, quadratic functions and graphs. You will also study introductory trigonometry, geometry and ratios. You will use mathematics foundation concepts to solve problems.

Details

Career Level: Undergraduate
Unit Level: Level 1
Credit Points: 6
Student Contribution Band: 7
Fraction of Full-Time Student Load: 0.125

Pre-requisites or Co-requisites

There are no requisites for this unit.

Important note: Students enrolled in a subsequent unit who failed their pre-requisite unit, should drop the subsequent unit before the census date or within 10 working days of Fail grade notification. Students who do not drop the unit in this timeframe cannot later drop the unit without academic and financial liability. See details in the Assessment Policy and Procedure (Higher Education Coursework).

Offerings For Term 1 - 2022

Bundaberg
Cairns
Gladstone
Mackay
Online
Rockhampton

Attendance Requirements

All on-campus students are expected to attend scheduled classes – in some units, these classes are identified as a mandatory (pass/fail) component and attendance is compulsory. International students, on a student visa, must maintain a full time study load and meet both attendance and academic progress requirements in each study period (satisfactory attendance for International students is defined as maintaining at least an 80% attendance record).

Class and Assessment Overview

Recommended Student Time Commitment

Each 6-credit Undergraduate unit at CQUniversity requires an overall time commitment of an average of 12.5 hours of study per week, making a total of 150 hours for the unit.

Class Timetable

Bundaberg, Cairns, Emerald, Gladstone, Mackay, Rockhampton, Townsville
Adelaide, Brisbane, Melbourne, Perth, Sydney

Assessment Overview

1. Written Assessment
Weighting: Pass/Fail
2. Portfolio
Weighting: Pass/Fail
3. Examination
Weighting: Pass/Fail

Assessment Grading

This is a pass/fail (non-graded) unit. To pass the unit, you must pass all of the individual assessment tasks shown in the table above.

Previous Student Feedback

Feedback, Recommendations and Responses

Every unit is reviewed for enhancement each year. At the most recent review, the following staff and student feedback items were identified and recommendations were made.

Feedback from Unit coordinator reflection

Feedback

Ensure students are using the most up to date learning materials.

Recommendation

Update the unit to use the recently released edition of the prescribed unit textbook.

Feedback from Unit coordinator reflection

Feedback

Students need to maintain an ethical practice in assignment preparation.

Recommendation

Continue to reinforce to students the need for ethical practice in all aspects of study and embed several short academic integrity scenarios in the assignment specifications to demonstrate appropriate behaviours.

Feedback from Student Unit and Teaching Evaluation

Feedback

There is a high student satisfaction with the unit content, approach and level of support offered.

Recommendation

Continue to foster the current learning and teaching environment.

Unit Learning Outcomes
On successful completion of this unit, you will be able to:
  1. Apply number and algebra concepts to solve problems
  2. Analyse and solve problems using trigonometry
  3. Develop solutions to problems through the application of area and volume equations
  4. Formulate and apply mathematical functions and graphs in solving equations
  5. Select appropriate mathematical methods, use them to investigate and solve problems, and interpret the results
  6. Use mathematics as a language to communicate results, concepts and ideas in context
  7. Document the solutions to problems in a way that demonstrates a clear, logical and precise approach.

The Learning Outcomes for this unit are linked with the Engineers Australia Stage 1 Competency Standards for Professional Engineers in the areas of 1. Knowledge and Skill Base, 2. Engineering Application Ability and 3. Professional and Personal Attributes at the following levels:

Introductory
1.2 Conceptual understanding of the mathematics, numerical analysis, statistics, and computer and information sciences which underpin the engineering discipline. (LO: 1N 2N 3N 4N 5N 6N 7N)
2.1 Application of established engineering methods to complex engineering problem solving. (LO: 1N 2N 3N 4N 5N)
2.2 Fluent application of engineering techniques, tools and resources. (LO: 1N 2N 3N 4N 5N)
3.2 Effective oral and written communication in professional and lay domains. (LO: 6N 7N)
3.3 Creative, innovative and pro-active demeanour. (LO: 1N 2N 3N 4N 5N)
3.4 Professional use and management of information. (LO: 6N 7N)

Note: LO refers to the Learning Outcome number(s) which link to the competency and the levels: N – Introductory, I – Intermediate and A - Advanced.
Refer to the Engineering Undergraduate Course Moodle site for further information on the Engineers Australia's Stage 1 Competency Standard for Professional Engineers and course level mapping information https://moodle.cqu.edu.au/course/view.php?id=1511

Alignment of Learning Outcomes, Assessment and Graduate Attributes
N/A Level
Introductory Level
Intermediate Level
Graduate Level
Professional Level
Advanced Level

Alignment of Assessment Tasks to Learning Outcomes

Assessment Tasks Learning Outcomes
1 2 3 4 5 6 7
1 - Written Assessment - 0%
2 - Portfolio - 0%
3 - Examination - 0%

Alignment of Graduate Attributes to Learning Outcomes

Graduate Attributes Learning Outcomes
1 2 3 4 5 6 7
1 - Communication
2 - Problem Solving
3 - Critical Thinking
4 - Information Literacy
5 - Team Work
6 - Information Technology Competence
7 - Cross Cultural Competence
8 - Ethical practice
9 - Social Innovation
10 - Aboriginal and Torres Strait Islander Cultures
Textbooks and Resources

Textbooks

Prescribed

Engineering Mathematics

Ninth Edition (2021)
Authors: John Bird
Routledge
New York New York , New York , USA
ISBN: 978-0-367-64378-2
Binding: Paperback

Additional Textbook Information

Both the paper and eBook text can be purchased at the CQUni Bookshop. Click on the Check for eBook link to be directed to Vitalsource. Search on the unit code here:http://bookshop.cqu.edu.au

IT Resources

You will need access to the following IT resources:
  • CQUniversity Student Email
  • Internet
  • Unit Website (Moodle)
  • Access to a document scanner and/or pdf converter (all assessment submitted electronically as pdf file)
  • Access to a printer (for printing assessment and tutorial materials)
  • Access to a webcam, speakers and microphone or a headset (for participating in Zoom lectures and tutorials)
Referencing Style

All submissions for this unit must use the referencing style: Harvard (author-date)

For further information, see the Assessment Tasks.

Teaching Contacts
Roland Dodd Unit Coordinator
r.dodd@cqu.edu.au
Schedule
Week 1 Begin Date: 07 Mar 2022

Module/Topic

Textbook Sections 1.1 to 1.4 and 2.1 to 2.3

Chapter

Chapter 1: Revision of fractions, decimals and percentages; and

Chapter 2: Indices, engineering notation and metric conversions

Events and Submissions/Topic

Textbook Practice Exercises 1 to 9 and Week 1 Tutorial Exercises

Week 2 Begin Date: 14 Mar 2022

Module/Topic

Textbook Sections 5.1 to 5.5 and 6.1 to 6.3

Chapter

Chapter 5: Algebra; and

Chapter 6: Further algebra

Events and Submissions/Topic

Textbook Practice Exercises 27 to 36 and Week 2 Tutorial Exercises

Week 3 Begin Date: 21 Mar 2022

Module/Topic

Textbook Sections 7.1 to 7.4 and 8.1 to 8.5

Chapter

Chapter 7: Partial fractions; and

Chapter 8: Solving simple equations

Events and Submissions/Topic

Textbook Practice Exercises 37 to 44 and Week 3 Tutorial Exercises

Week 4 Begin Date: 28 Mar 2022

Module/Topic

Textbook Sections 9.1 to 9.4 and 10.1 to 10.5

Chapter

Chapter 9: Transposition of formulae; and

Chapter 10: Solving simultaneous equations

Events and Submissions/Topic

Textbook Practice Exercises 45 to 53 and Week 4 Tutorial Exercises

Week 5 Begin Date: 04 Apr 2022

Module/Topic

Textbook Sections 11.1 to 11.6 and 12.1 to 12.6

Chapter

Chapter 11: Solving quadratic equations; and

Chapter 12: Inequalities

Events and Submissions/Topic

Textbook Practice Exercises 54 to 65 and Week 5 Tutorial Exercises

Vacation Week Begin Date: 11 Apr 2022

Module/Topic

Chapter

Events and Submissions/Topic

Week 6 Begin Date: 18 Apr 2022

Module/Topic

Textbook Sections 13.1 to 13.4 and 14.1 to 14.5

Chapter

Chapter 13: Logarithms; and

Chapter 14: Exponential functions

Events and Submissions/Topic

Textbook Practice Exercises 66 to 75 and Week 6 Tutorial Exercises

Week 7 Begin Date: 25 Apr 2022

Module/Topic

Textbook Sections 23.1 to 23.7 and 24.1 to 24.6

Chapter

Chapter 23: Areas of common shapes; and

Chapter 24: The circle and its properties

Events and Submissions/Topic

Textbook Practice Exercises 118 to 127 and Week 7 Tutorial Exercises

Week 8 Begin Date: 02 May 2022

Module/Topic

Textbook Sections 25.1 to 25.8 and 26.1 to 26.3

Chapter

Chapter 25: Volumes and surface areas of common solids; and

Chapter 26: Irregular areas and volumes and mean values of waveforms

Events and Submissions/Topic

Textbook Practice Exercises 128 to 138 and Week 8 Tutorial Exercises

Week 9 Begin Date: 09 May 2022

Module/Topic

Textbook Sections 17.1 to 17.8 and 18.1 to 18.6

Chapter

Chapter 17: Introduction to trigonometry; and

Chapter 18: Trigonometric waveforms

Events and Submissions/Topic

Textbook Practice Exercises 87 to 97 and Week 9 Tutorial Exercises

Week 10 Begin Date: 16 May 2022

Module/Topic

Textbook Sections 20.1 to 20.6 and 21.1 to 21.7

Chapter

Chapter 20: Triangles and some practical applications; and

Chapter 21: Trigonometric identities and equations

Events and Submissions/Topic

Textbook Practice Exercises 101 to 111 and Week 10 Tutorial Exercises

Week 11 Begin Date: 23 May 2022

Module/Topic

Textbook Sections 27.1 to 27.3 and 30.1 to 30.4

Chapter

Chapter 27: Straight line equations; and

Chapter 30: Graphical solution of equations

Events and Submissions/Topic

Textbook Practice Exercises 139 to 141, 149 to 153 and Week 11 Tutorial Exercises

Week 12 Begin Date: 30 May 2022

Module/Topic

Textbook Sections 31.1 to 31.6

Chapter

Chapter 31: Functions and their curves

Events and Submissions/Topic

Textbook Practice Exercises 154 to 157 and Week 12 Tutorial Exercises

Review/Exam Week Begin Date: 06 Jun 2022

Module/Topic

Chapter

Events and Submissions/Topic

Exam Week Begin Date: 13 Jun 2022

Module/Topic

Chapter

Events and Submissions/Topic

Term Specific Information

Unit Coordinator: Dr Roland Dodd

Email: r.dodd@cqu.edu.au

Phone: (07) 4923 2877

Office location: CQUniversity, North Rockhampton Campus, Building 30, Floor 1, Room 1.18

If you have any individual queries, please do not hesitate to email me and I will get back to you within two working days.

Assessment Tasks

1 Written Assessment

Assessment Title
Weekly Competency Tests

Task Description

Students will progress through a series of weekly Competency Tests linked to the textbook, Engineering Mathematics. Upon completion of the prescribed weekly course work, students are required to complete the corresponding Competency Test. The test is then submitted for marking and feedback. A result of 80% or more is required for each Competency Test. If a result of less than 80% occurs on a submission, students are required to review the course work and then complete, and pass, an additional Competency Test.


Assessment Due Date

The competency test will be due by Thursday 5:00PM AEST in the week following the associated prescribed course work. Due dates will be as advised on the MATH11247 Moodle site.


Return Date to Students

It is envisaged that feedback and solutions will be available within two weeks, or as soon as the marking process is completed.


Weighting
Pass/Fail

Minimum mark or grade
Students are required to score at least 80% of the available marks on the weekly competency test to Pass the weekly competency test. Students need to receive a Pass for each weekly competency test to be eligible for a Pass grade in the unit.

Assessment Criteria

Questions are from course content covered in the week associated with the competency test. Solutions are awarded full marks if they are error-free, partial marks if there are some errors, and no marks if not attempted or contain so many errors as to render the attempt to be without value.

Solutions to all questions should be neatly and clearly presented. Full working is required to obtain maximum credit for solutions.


Referencing Style

Submission
Online

Submission Instructions
The Competency Test is uploaded as a single PDF document at the MATH11247 unit Moodle site. Full details are provided on the unit Moodle site.

Learning Outcomes Assessed
  • Apply number and algebra concepts to solve problems
  • Analyse and solve problems using trigonometry
  • Develop solutions to problems through the application of area and volume equations
  • Formulate and apply mathematical functions and graphs in solving equations
  • Select appropriate mathematical methods, use them to investigate and solve problems, and interpret the results

2 Portfolio

Assessment Title
Portfolio

Task Description

Students will develop and submit a portfolio. This task aims to reward all students in the unit for their continuing efforts in the unit and their focus on progressing the prescribed weekly course work.

The portfolio submission is the workbook of solutions that the student personally develops for the prescribed weekly course work. This task is split into three components; Workbook (Part 1), Workbook (Part 2) and Workbook (Part 3).

Students submit their personally developed solutions to the questions from the practice exercises relating to the unit textbook. Completion of these exercises is prescribed as the minimal weekly level of required effort to grasp the essentials of MATH11247 Foundation Mathematics.

The workbooks will capture and formalise the portfolio of work that students are engaged with as they progress through the unit.

Each workbook, contributing to the portfolio, will be graded as either Pass or Fail. If a Fail is awarded, students are given the opportunity to review their feedback and then submit a revised workbook submission that addresses the feedback.


Assessment Due Date

Due dates will be as advised on the MATH11247 Moodle site.


Return Date to Students

It is envisaged that feedback will be available within two weeks, or as soon as the marking process is completed.


Weighting
Pass/Fail

Minimum mark or grade
Students need to receive a Pass for each workbook submission in the portfolio to be eligible for a Pass grade in the unit.

Assessment Criteria

The portfolio consists of a series of workbooks. Each workbook is to contain:

1) numbered pages;

2) student signature on each page of the workbook of solutions;

3) solutions, personally developed by the student, to each problem in the prescribed weekly course work;

4) each solution identified by its associated practice exercise and question number;

5) a workbook index linking the developed solutions with the prescribed weekly course work; and

6) a university standard of presentation.


Referencing Style

Submission
Online

Submission Instructions
Each workbook is uploaded as a single PDF document at the MATH11247 unit Moodle site. Full details are provided on the unit Moodle site.

Learning Outcomes Assessed
  • Use mathematics as a language to communicate results, concepts and ideas in context
  • Document the solutions to problems in a way that demonstrates a clear, logical and precise approach.

Examination

Outline
Complete an invigilated examination

Date
During the examination period at a CQUniversity examination centre

Weighting
0%

Length
180 minutes

Minimum mark or grade
Students must score a minimum of 50% of the marks available on the final examination.

Exam Conditions
Open Book

Materials
Dictionary - non-electronic, concise, direct translation only (dictionary must not contain any notes or comments).
Calculator - all non-communicable calculators, including scientific, programmable and graphics calculators are authorised
Academic Integrity Statement

As a CQUniversity student you are expected to act honestly in all aspects of your academic work.

Any assessable work undertaken or submitted for review or assessment must be your own work. Assessable work is any type of work you do to meet the assessment requirements in the unit, including draft work submitted for review and feedback and final work to be assessed.

When you use the ideas, words or data of others in your assessment, you must thoroughly and clearly acknowledge the source of this information by using the correct referencing style for your unit. Using others’ work without proper acknowledgement may be considered a form of intellectual dishonesty.

Participating honestly, respectfully, responsibly, and fairly in your university study ensures the CQUniversity qualification you earn will be valued as a true indication of your individual academic achievement and will continue to receive the respect and recognition it deserves.

As a student, you are responsible for reading and following CQUniversity’s policies, including the Student Academic Integrity Policy and Procedure. This policy sets out CQUniversity’s expectations of you to act with integrity, examples of academic integrity breaches to avoid, the processes used to address alleged breaches of academic integrity, and potential penalties.

What is a breach of academic integrity?

A breach of academic integrity includes but is not limited to plagiarism, self-plagiarism, collusion, cheating, contract cheating, and academic misconduct. The Student Academic Integrity Policy and Procedure defines what these terms mean and gives examples.

Why is academic integrity important?

A breach of academic integrity may result in one or more penalties, including suspension or even expulsion from the University. It can also have negative implications for student visas and future enrolment at CQUniversity or elsewhere. Students who engage in contract cheating also risk being blackmailed by contract cheating services.

Where can I get assistance?

For academic advice and guidance, the Academic Learning Centre (ALC) can support you in becoming confident in completing assessments with integrity and of high standard.

What can you do to act with integrity?