Year
2024Credit points
10Campus offering
Prerequisites
NilIncompatible
NMBR143 Introduction to Mathematical Ideas
Unit rationale, description and aim
In an increasingly technological society, an understanding of mathematics is a major asset to an individual seeking to participate fully and meaningfully. An effective teacher must be able to do the work that they assign to their students and possess mathematical content knowledge which incorporates an understanding of the mathematics they teach.
Mathematical content in this unit draws from the areas of Number, Algebraic Thinking, Geometry, Measurement, Probability, Statistics and the Application of Mathematics; and ways of mathematical thinking including reasoning, problem solving and critical thinking, and a focus on conceptual understanding. There is a particular emphasis in both content and assessment on real-world applications of mathematics.
Learning outcomes
To successfully complete this unit you will be able to demonstrate you have achieved the learning outcomes (LO) detailed in the below table.
Each outcome is informed by a number of graduate capabilities (GC) to ensure your work in this, and every unit, is part of a larger goal of graduating from ACU with the attributes of insight, empathy, imagination and impact.
Explore the graduate capabilities.
| Learning Outcome Number | Learning Outcome Description | Relevant Graduate Capabilities |
|---|---|---|
| LO1 | Demonstrate understanding and application of some elementary mathematical concepts (APST 2.1; ACECQA B3) | GC1, GC2, GC3, GC11 |
| LO2 | Solve a variety of mathematical tasks (APST 2.1; ACECQA B3) | GC1, GC2, GC7, GC8 |
| LO3 | Identify the structure inherent in various mathematical situations and undertake simple mathematical modelling (APST 2.1; ACECQA B3) | GC2, GC3, GC7, GC8 |
| LO4 | Demonstrate an understanding of the interconnectedness of different mathematical topics and their application to real world contexts using a range of resources (APST 2.1; ACECQA B3) | GC1, GC2, GC3, GC7, GC9 |
| LO5 | Communicate mathematical thinking and reasoning using mathematical language including spoken, written and visual representations (APST 2.1; ACECQA A6, B3, B9, C4). | GC1, GC2, GC7, GC11, GC12 |
AUSTRALIAN PROFESSIONAL STANDARDS FOR TEACHERS - GRADUATE LEVEL
On successful completion of this unit, pre-service teachers should be able to:
2.1 Demonstrate knowledge and understanding of the concepts, substance and structure of the content and teaching strategies of the teaching area. |
ACECQA CURRICULUM SPECIFICATIONS
On successful completion of this unit, pre-service teachers should have developed the following specific knowledge:
A Child development and care A6 diversity, difference and inclusivity |
B Education and curriculum studies B3 numeracy, science and technology B9 curriculum planning, programming and evaluation |
C Teaching pedagogies C4 teaching methods and strategies |
Content
Topics will include:
- Numbers and Counting
- Place value;
- Computational strategies including mental, estimation and use of calculators
- Natural numbers, integers, fractions, factors, prime numbers, prime factorisation, divisibility tests
- Proportional reasoning, ratio
- Rational numbers and their representations as fractions and decimals, percentages, simple operations with fractions.
- Algebraic Thinking
- Figural and numeral patterns leading to generalisation
- Functions, variables and relationships
- Simplifying algebraic expressions and solving algebraic equations
- Linear and non- linear graphs
- Using technology in graphing
- Foundations of Geometry
- Classification of shapes in 2D and 3D
- Angles and angle sums of polygons
- Position
· Foundations of Measurement
- Focusing on area, length, mass, volume and time
- Metric and other measurement systems
- Relationships between units
- Foundations of Probability
- Sampling
- Fairness
- Single and multi-stage events
- Tree diagrams and two-way tables
- Representation and interpretation of data
- Population and samples
- Distribution: comparing and contrasting using measures of centre, spread and variability within the spread of data
- Summarising, analysing, presenting, interpreting data or results from empirical investigations
Embedded within each topic is the application of mathematical reasoning and problem solving
Learning and teaching strategy and rationale
This unit is offered in different formats depending on the teaching period:
- Summer or Winter term intensives
- Semester 1 or 2 comprising weekly face-to-face classes during semester or multi-mode including weekend classes.
All learning is supported by web-based learning platform, Canvas. Pre-service teachers are be expected to participate in online discussion and sharing via eLearning. Class resources will be available via eLearning as will access to relevant web links.
Duration
This unit includes 4 contact hours per week for 12 weeks, comprising 2 hours of lectures and 2 of tutorials.
This unit will normally include the equivalent of 24 hours of lectures together with 24 hours attendance mode tutorials.
150 hours in total with a normal expectation of 48 hours of directed study and the total contact hours should not exceed 48 hours.
Assessment strategy and rationale
The assessment tasks for this unit have been designed to contribute to high quality student learning by both helping students learn (assessment for learning), and by measuring explicit evidence of their learning (assessment of learning). Assessments have been developed to meet the unit learning outcomes and develop graduate attributes consistent with University assessment requirements. The assessment tasks provide multiple opportunities (presentation, problem solving and examination) in different ways (visual, verbal and written) for students to demonstrate:
- Knowledge of content
- Application of mathematics in real world contexts
- Development of and communication using appropriate mathematical language
Minimum Achievement Standards
The assessment tasks for this unit are designed to demonstrate achievement of each learning outcome. In order to pass this unit, students are required to complete all assessment tasks as per the Assessment policy and gain an overall pass mark.
Overview of assessments
| Brief Description of Kind and Purpose of Assessment Tasks | Weighting | Learning Outcomes |
|---|---|---|
Assessment Task 1 Knowledge test and development of a learning plan | 15% | LO1, LO2 |
Assessment Task 2 Two investigative tasks, one of which must be a mathematical modelling task dealing with a real-world context and the other a purely mathematical investigation with use of varied resources. The accompanying report will require a combination of written and/or oral multimedia forms of presentation and use of varied resources. | 45% | LO1, LO2, LO3, LO4, LO5 |
Assessment Task 3 Final Examination Written examination: demonstrating an understanding of key mathematical content and problem-solving skills undertaken in the unit. | 40% | LO1, LO2 |
Representative texts and references
Required text(s)
Australian Curriculum https://www.australiancurriculum.edu.au/
Australian Curriculum, Assessment and Reporting Authority (ACARA) www.acara.edu.au
McLeod, G. et al (2019). Introduction to mathematical thinking (Custom ed. eBook). Melbourne: Pearson.
Australian Curriculum Mathematics. https://www.australiancurriculum.edu.au/f-10-curriculum/mathematics/
Relevant state and territory Mathematics curriculum documents
Recommended references
Allenby, R. (1997). Numbers and proofs. Oxford, UK: Butterworth-Heinemann
Belos, A. (2010). Alex’s adventures in numberland. London, UK: Bloomsbury.
Belos, A. (2015). The grapes of math: How life reflects numbers and numbers reflect life. New York, NY: Simon & Schuster.
Boaler, J. (2019). Mathematical mindsets: Unleashing students’ potential through creative math, inspiring messages and innovative teaching. New York, NY: Jossey-Bass.
Booker, G. (2011). Building numeracy: Moving from diagnosis to intervention. South Melbourne, Vic: Oxford University Press.
Burton, D. (2011). Elementary number theory (7th ed.). Boston: McGraw-Hill Higher Education
Du Sautoy, M. (2011). The number mysteries: A mathematical odyssey through everyday life (1st Palgrave Macmillan ed.). New York, NY: Palgrave Macmillan.
Eccles, P. (1997). An introduction to mathematical reasoning: Numbers, sets and functions. New York, NY: Cambridge University Press
Goldstein, L., & Schneider, A. (2013). Brief calculus and Its applications. Pearson.
Jacobs, H. R. (2002). Mathematics: A human endeavour: A book for those who think they don’t like the subject (3rd ed.). New York, NY: W. H. Freeman.
Liebeck, M. (2011). A concise introduction to pure mathematics (3rd ed.). Boca Raton, FL: Chapman & Hall/CRC Press.
Shryock-Boyke, K (2011). Introduction to plane geometry: Explorations and explanations. Pearson