Year
2021Credit points
10Campus offering
No unit offerings are currently available for this unitPrerequisites
Nil
Unit rationale, description and aim
Development of participants’ mathematical content knowledge is the key foci of the Mathematics unit sequence.
This unit offers a historical overview of the development of number and deals with some aspects of number theory. Further, conjecturing, specialising, generalising, justifying, mathematising, proving together with argumentation problem posing, problem solving, investigation and mathematical modelling are key elements of mathematical thinking and working mathematically that are developed across the sequence of units. Historical and real-world situations are pivotal.
The aim of this unit is to develop the mathematical content knowledge of pre-service teachers.
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.
On successful completion of this unit, students should be able to:
LO1 - give a detailed explanation of the historical development of number and the effect this development has had on different societies and cultures (GA4, GA6, GA8; APST 2.1)
LO2 - demonstrate an understanding of algebra, including the binary operations: addition and multiplication in various number systems (GA4, GA5, GA8; APST 2.1)
LO3 - use estimates of interim values to provide checks at various stages of solutions to problems(GA5, GA8, GA10; APST 2.1)
LO4 - solve a variety of problems involving numbers (GA5, GA6, GA10; APST 2.1).
LO5 - use technology and resources to facilitate a sophisticated understanding of number, number systems and aspects of number theory (GA5, GA8, GA10; APST 2.1)
Graduate attributes
GA1 - demonstrate respect for the dignity of each individual and for human diversity
GA2 - recognise their responsibility to the common good, the environment and society
GA3 - apply ethical perspectives in informed decision making
GA4 - think critically and reflectively
GA5 - demonstrate values, knowledge, skills and attitudes appropriate to the discipline and/or profession
GA6 - solve problems in a variety of settings taking local and international perspectives into account
GA7 - work both autonomously and collaboratively
GA8 - locate, organise, analyse, synthesise and evaluate information
GA9 - demonstrate effective communication in oral and written English language and visual media
GA10 - utilise information and communication and other relevant technologies effectively.
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. |
Content
In all topics the effective use of technology will be key, allowing students to focus on the understanding, rather than the mechanics of each particular topic.
Why bother with numbers, and what are they?
· Why did we need numbers anyway? Why did all cultures develop numbers? (Note, not why do we need numbers, but why did they.)
· Types of numbers (natural, integer, rational)
· Working with numbers in the real world (revision of rationals, perceptron algorithms, etc. estimation, rounding, accuracy, number systems from other cultures, eg. Babylonians, time and angles)
Working with numbers
· Why don’t we use Roman numerals anymore? Place notation, large and small numbers. Reporting numbers (Place notation, sci not, etc, other cultures)
· Is 10 the only option? Different ways of representing numbers and conversion between them (Place value, other cultures – including geeks!)
· Field axioms — what are our choices and what are the consequences (Field axioms)
Working with whole numbers
· You can’t farm with half a sheep? Working with whole numbers and integers.
· Types of whole numbers: Primes, greatest common divisor, Euclidean algorithm
· Solving equations needing whole numbers. (Diophantine equations, incl Pythagorean triples)
Learning and teaching strategy and rationale
Teaching and learning organisation can take several forms. This could include intensive weekend classes supported by web-based tools, Intensive one week winter or summer schools supported by web-based tools or weekly face-to-face classes during semester.
Pre-service teachers may 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.
This is a 10-credit point unit and has been designed to ensure that the time needed to complete the required volume of learning to the requisite standard is approximately 150 hours in total across the semester. To achieve a passing standard in this unit, students will find it helpful to engage in the full range of learning activities and assessments utilised in this unit, as described in the learning and teaching strategy and the assessment strategy. The learning and teaching and assessment strategies include a range of approaches to support your learning such as reading, reflection, discussion, webinars, podcasts, video etc.
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, use and communication of 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 required assessment tasks as per the Assessment Policy and gain an overall pass mark.
Electronic Submission, Marking and Return
Assessment tasks are submitted electronically whenever possible. Marking will include a moderation process. Assessment returns will occur within the 3 week period as per the Assessment Policy.
Overview of assessments
Brief Description of Kind and Purpose of Assessment Tasks | Weighting | Learning Outcomes | Graduate Attributes |
---|---|---|---|
Assessment Task 1: Early Skills Assessment Skills test and development of a considered learning plan. | 20% | LO2, LO3, LO4 | GA4, GA5, GA6, GA8, GA10 |
Assessment Task 2: Learning from Others Investigate how numbers and number skills in mathematics were developed and used within an indigenous culture to solve particular problems. Critically analyse the use of this aspect of mathematics has changed over time within the chosen culture. Present your findings in a 1500 word summary. | 40% | LO1, LO2, LO4, LO5 | GA4, GA5, GA6, GA8, GA8 |
Assessment Task 3: Final Examination: Written test covering the skills and concepts from the unit | 40% | LO1, LO2, LO3, LO4, LO5 | GA4, GA5, GA6, GA8, GA10 |
Representative texts and references
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 Edition. Pearson
Australian Curriculum Mathematics. https://www.australiancurriculum.edu.au/f-10-curriculum/mathematics/
Relevant state and territory Mathematics curriculum documents
Recommended references
Bellos, A. (2010). Alex’s adventures in numberland: Dispatches from the wonderful world of mathematics. London: Bloomsbury.
Bellos, A. (2015). Alex through the looking glass: How life reflects numbers, and numbers reflect life. London: Bloomsbury.
Burton, D. (2011). Elementary number theory (7th ed.). Boston: McGraw-Hill Higher Education.
Clapham, C., & Nicholson, J. (2014). The concise Oxford dictionary of mathematics. Oxford: Oxford University Press.
Du Sautoy, M. (2011). The number mysteries: A mathematical odyssey through everyday life (1st Palgrave Macmillan ed.). New York, NY: Palgrave Macmillan.
Joseph, G. G. (2011). The crest of the peacock: Non-European roots of mathematics (3rd ed.). Princeton, NJ: Princeton University Press.
Katz, V. (2009). A history of mathematics (3rd rev. ed.). Pearson Education.
Matthews, C., Cooper, T., & Baturo, A. (2007). Creating your own symbols: Beginning algebraic thinking within Indigenous students. In Woo, J. H., Lew, H. C., Park, K. S. & D.Y. Seo (Eds.). Proceedings of the 31st Conference of the International Group for the Psychology of Mathematics Education, Vol. 3, pp. 249-256. Seoul: PME.
Nicol, C., et al. (2019). Living Culturally Responsive Mathematics Education with/in Indigenous Communities Brill|Sense.
Silverman, J.H. (2013). A friendly introduction to number theory (4th ed.). Boston, MA: Pearson.
Wells, D. G. (1987). The Penguin dictionary of curious and interesting numbers. Harmondsworth, UK: Penguin.