Showing total 180 results

1. Using Paper Folding, Fraction Walls, and Number Lines to Develop Understanding of Fractions for Students from Years 5-8

Author

Pearn, Catherine Ann

Abstract

Several researchers have noted how children's whole number schemes can interfere with their efforts to learn fractions. An Australian study found that children who were successful with the solution of rational number tasks exhibited greater whole number knowledge and more flexible solution strategies. Behr and Post (1988) indicated that children needed to be competent in the four operations of whole numbers, along with an understanding of measurement, for them to understand rational numbers. This paper describes a "hands on" approach developed by researchers that focuses on the use of paper folding, fraction walls and number lines to develop an understanding of fractions using a measurement model. (Contains 8 figures.)

Published

2007

2. A Transdisciplinary Approach to Teaching Citizen Science in a Primary Classroom

Author

Haggerty, Bernadette, Paige, Kathryn, and O'Keeffe, Lisa

Abstract

This paper reports on a transdisciplinary approach to science with a Year 4/5 class incorporating citizen science through the Birds in Backyards project. This transdisciplinary approach created opportunities for student engagement through science, mathematics, design and technology, humanities and social sciences (HASS), arts and English, while also creating meaningful connections to nature and the local environment.

Published

2023

3. Second-Year Pre-Service Teachers' Responses to Proportional Reasoning Test Items

Author

Livy, Sharyn and Herbert, Sandra

Abstract

A recent international study of pre-service teachers identified that proportional reasoning was problematic for pre-service teachers. Proportional reasoning is an important topic in the middle years of schooling and therefore it is critical that teachers understand this topic and can rely on their Mathematical Content Knowledge (MCK) when teaching. The focus of this paper is second-year Australian primary pre-service teachers' MCK of real number items related to ratio, rate, proportion and proportional reasoning. This paper reports on strengths and weakness of pre-service teachers' MCK when responding to test items; including a method suitable for analysing responses to five items and ranked by three levels of difficulty. The results revealed insights into their correct methods of solutions and common incorrect responses, identifying difficulty, where multiplication and division were required. The method of coding test items by difficulty ranking may assist with developing an appropriate learning trajectory, which will assist pre-service teachers develop their MCK of this and other difficult topics. (Contains 7 tables and 4 figures.)

Published

2013

4. Identifying the Mathematics Middle Year Students Use as They Address a Community Issue

Author

Marshman, Margaret

Abstract

Middle year students often do not see the mathematics in the real world whereas the "Australian Curriculum: Mathematics" aims for students to be "confident and creative users and communicators of mathematics" (Australian Curriculum Assessment and Reporting Authority [ACARA] 2012). Using authentic and real mathematics tasks can address this situation. This paper is an account of how, working within a Knowledge Producing Schools' framework, a group of middle year students addressed a real community issue, the problem of the lack of a teenage safe space using mathematics and technology. Data were collected for this case study via journal observations and reflections, semi-structured interviews, samples of the students' work and videos of students working. The data were analysed by identifying the mathematics the students used determining the function and location of the space and focused on problem negotiation, formulation and solving through the statistical investigation cycle. The paper will identify the mathematics and statistics these students used as they addressed a real problem in their local community.

Published

2018

5. Becoming Competent, Confident and Critically Aware: Tracing Academic Numeracy Development in Nursing

Author

Galligan, Linda

Abstract

This paper describes the mathematical journey of a mature aged nursing student as she struggles to become more academically numerate. Within the paper, academic numeracy is defined around three features: competence, confidence and critical awareness of both the context of mathematics and students' own relationship with mathematics. It then uses this definition to describe a course for 1st year nursing students to develop their mathematics skills needed for their degree. A conceptual framework, based on Valsiner's Human Development Theory, is used to trace students' developing understanding of academic numeracy. Finally the paper describes one student, Sally, as she struggles to become more numerate.

Published

2013

6. Linking Theory and Practice: A Case Study of a Co-Teaching Situation between a Mathematics Teacher Educator and a Primary Classroom Teacher

Author

Downton, Ann, Muir, Tracey, and Livy, Sharyn

Abstract

In recent years there has been growing concern as to how to bridge the gap between the theory preservice teachers engage with as part of their learning in their tertiary classrooms and the profession. To enable pre-service teachers to make stronger connections with the profession, a mathematics teacher educator worked collaboratively with a practicing teacher by co-teaching one cohort of preservice teachers studying primary mathematics education. In this paper, we present two snapshots of the co-teaching experience and a framework that was used to describe how the co-teaching partnership helped the pre-service teachers to elicit mathematical thinking make connections between theory and practice, when engaged in mathematical discourse.

Published

2018

7. Becoming Information Centric: The Emergence of New Cognitive Infrastructures in Education Policy

Author

Sellar, Sam and Gulson, Kalervo N.

Abstract

New cognitive infrastructures are emerging as digital platforms and artificial intelligence enable new forms of automated thinking that shape human decision-making. This paper (a) offers a new theoretical perspective on automated thinking in education policy and (b) illustrates how automated thinking is emerging in one specific policy context. We report on a case study of a policy analysis unit ('The Centre') in an Australian state education department that has been implementing a BI strategy since 2013. The Centre is now focused on using BI to support complex decision making and improve learning outcomes, and their strategy describes this focus as becoming 'information centric'. The theoretical framework for our analysis draws on infrastructure studies and philosophy of technology, particularly Luciana Parisi's recent work on automated thinking. We analyse technical documentation and semi-structured interview data to describe the enactment of a BI strategy in The Centre, with a focus on how new approaches to data analytics are shaping decision-making. Our analysis shows that The Centre is developing a cognitive infrastructure that is already creating new conditions for education policy making, and we conclude with a call for research designs that enable pragmatic exploration of what these infrastructures can do.

Published

2021

8. Harnessing Critical Incidents for Learning

Author

Patahuddin, Sitti Maesuri and Lowrie, Tom

Abstract

A critical incident is a situation or event that holds significance for learning, both for the students and teachers. This paper presents four examples of critical incidents from a Year 7 teacher's lesson excerpts in Indonesia involving teaching of fractions, to show how they shaped classroom situation, brought forward elements of conflict, and created learning opportunities. Three examples are drawn from the lesson using a web-based applet (Examples 1, 2 and 3). The illustration of these critical incidents will be followed by a discussion on how to harness them in order to develop students' understanding or be used as a challenge as well as a learning process for teachers. This paper highlights the effectiveness of a web-based applet for displaying pictorial representations in an interactive manner.

Published

2015

9. Computer Algebra Systems: Permitted but Are They Used?

Author

Pierce, Robyn and Bardini, Caroline

Abstract

Since the 1990s, computer algebra systems (CAS) have been available in Australia as hand-held devices designed for students with the expectation that they will be used in the mathematics classroom. The data discussed in this paper was collected as part of a pilot study that investigated first year university mathematics and statistics students' understanding of functions and variables, as well as the use of technology in their last year of school (Year 12). Did their teachers discourage the use of CAS for algebra? Did the students actually learn how to use CAS to support their work in algebra or to support their learning of algebra? Did they find that, given the level of algebra, it was faster to work with pen-and-paper than to correctly enter algebraic expressions? The results reported in this paper are based on items included in a pilot survey. They raise questions rather than provide answers. The results do however tell us that, at least from these first year university students' recollection of their Year 12 experience, most or their VCE mathematics teachers made little use of CAS as a pedagogical tool in their classes, despite the institutional approval and encouragement indicated by both the State's curriculum and assessment for the past decade. A better understanding of the barriers to teachers using CAS technology to enhance their pedagogy is needed and then perhaps more effective professional learning programs can be provided for teachers.

Published

2015

10. Laying Groundwork for an Understanding of Academic Integrity in Mathematics Tasks

Author

Seaton, Katherine A.

Abstract

To date, the way that academic misconduct is manifested in undergraduate mathematics coursework has been unexamined in the literature, with the consequence that policy and preventive education can fail to address it appropriately. This paper describes the particular features of the responses expected in mathematical tasks and provides concrete examples of what lapses of integrity look like in this context. The intent is to lay groundwork for discussion and a response to this issue from within our discipline.

Published

2019

11. Modelling Transformations of Quadratic Functions: A Proposal of Inductive Inquiry

Author

Sokolowski, Andrzej

Abstract

This paper presents a study about using scientific simulations to enhance the process of mathematical modelling. The main component of the study is a lesson whose major objective is to have students mathematise a trajectory of a projected object and then apply the model to formulate other trajectories by using the properties of function transformations. It was hypothesised that situating the lesson in a modelling environment would enhance the meaning of transformations that are not often conceptualised in mathematics textbooks. The lesson is guided by inductive reasoning. As a medium of data gathering, a free simulation called "Projectile Motion" was used (available at http://phet. colorado.edu/sims/projectile-motion/projectile-motion_en.html). The inductively organised stages of the activity described in this paper were conducted with a group of (N = 22) mathematics students in a high school in Texas. The students' verbal reflections upon this type of novel learning environment supported the study hypothesis. Their perception of the process of studying function transformations has evolved into a meaningful and purposeful experience. Although, the unit was developed for high school math curriculum in the US, its objectives reflect the aims and scope of Australian math curriculum. The Victorian Certificate of Education Study Design (VCAA, 2010) states that students should model investigate and solve problems in unfamiliar situations. The proposed lesson supports this aim.

Published

2013

12. Tablet Technology to Facilitate Improved Interaction and Communication with Students Studying Mathematics at a Distance

Author

Galligan, Linda, Hobohm, Carola, and Loch, Birgit

Abstract

Teaching and learning of mathematics is challenging when lecturer and students are separated geographically. While student engagement and interaction with the course, with other students and with the lecturer is vital to mathematics learning, it is difficult to facilitate this electronically, because of the nature of mathematics. With tablet technology now becoming ubiquitous and many new and inexpensive models entering the market, it is timely to investigate how the distance student experience in mathematics can be impacted by the use of tablet technologies. This paper reports on a case study of a first year mathematics course at a regional Australian university, where distance students were provided with affordable tablet PCs. An investigation of the impact of this technology on engagement and interaction is at the centre of this study. Evidence from journals, students' assessment submissions, screen snippets, student communication and formal student evaluations is analysed. It was found that distance students acknowledged the value of tablets for communicating mathematics, particularly for assignment submission and feedback, but they also recognized the potential for easier interaction with content and the lecturer. This paper highlights the specific benefits and challenges tablet PCs present to the learning experiences in mathematics within the distance context. (Contains 10 figures.)

Published

2012

13. Repeating Patterns: Strategies to Assist Young Students to Generalise the Mathematical Structure

Author

Warren, Elizabeth, Miller, Jodie, and Cooper, Thomas

Abstract

This paper focuses on very young students' ability to engage in repeating pattern tasks and identifying strategies that assist them to ascertain the structure of the pattern. It describes results of a study which is part of the Early Years Generalising Project (EYGP) and involves Australian students in Years 1 to 4 (ages 5-10). This paper reports on the results from the early years' cohort (Year 1 and 2 students). Clinical interviews were used to collect data concerning students' ability to determine elements in different positions when two units of a repeating pattern were shown. This meant that students were required to identify the multiplicative structure of the pattern. Results indicate there are particular strategies that assist students to predict these elements, and there appears to be a hierarchy of pattern activities that help students to understand the structure of repeating patterns. (Contains 9 tables.)

Published

2012

14. Giving More Realistic Definitions of Trigonometric Ratios

Author

Bhattacharjee, Pramode Ranjan

Abstract

Trigonometry is a well known branch of Mathematics. The study of trigonometry is of great importance in surveying, astronomy, navigation, engineering, and in different branches of science. This paper reports on the discovery of flaws in the traditional definitions of trigonometric ratios of an angle, which (in most cases) make use of the most unrealistic concept of negative length (or distance). With a view to getting rid of the misleading concept of negative length (distance), the definitions of novel trigonometric ratios (falling within the purview of Year 9 to Year 10A in the "Australian Curriculum: Mathematics") have been offered first with the help of vector algebra and then subsequently employed to derive some important formulae of trigonometry. This paper first considers the traditional branch of trigonometry, examines it to see that it is very much unrealistic at its root level and finally it gives birth to the definitions of novel trigonometric ratios of an angle with the help of vector algebra so as to uproot the most unrealistic concept of negative length. It deals with a debatable issue regarding the misleading concept of negative length (distance) prevailing at the basic level of defining trigonometric ratios of an angle in the traditional literature and in fact reflects a discovery of real truth. (Contains 3 figures.)

Published

2012

15. Scoring Points: Goals for Real World Problem Solving

Author

Galbraith, Peter

Abstract

This paper is presented in two parts. Through an example the first part takes up the issue of applying mathematics to situations that form part of the life context of students--the priority expressed in three curriculum statements presented. Then, noting the particular point in time--development of a National Curriculum for Mathematics--the second part goes on to address broader curriculum issues that a purely illustrative exercise in real world problem solving might not normally engage. The chosen example relates to a real world question that is located within the domain of Australian Rules Football, and it is recognized that while this provides a familiar, and often an emotionally engaged context in the majority of states, it may not do so for all. The specific mathematical and modelling issues raised in this particular problem have no essential connection with the discussion in the final part of the paper (other than in providing illustrations), where issues regarding the place of modelling and applications in curricula are considered. For that purpose, the football example can be replaced by any authentic modelling problem. (Contains 1 figure and 2 tables.)

Published

2012

16. Writing (and Reading) Journal Articles for Professional Development: APMC--A Great Place to Start

Author

Marshall, Linda and Swan, Paul

Abstract

This article is intended to assist people who have never written for a journal, or who perhaps have never even thought about doing so. In this article, the authors provide some advice for budding Australian Primary Mathematics Classroom (APMC) authors. Information on where to start, what's already been done, what will be in the paper, who will read the paper, what happens after the paper is submitted, and the technical aspects of submitting your work is included.

Published

2011

17. 'I Know You Have to Put Down a Zero, but I'm Not Sure Why': Exploring the Link between Pre-Service Teachers' Content and Pedagogical Content Knowledge

Author

Maher, Nicole and Muir, Tracey

Abstract

This paper reports on an investigation into pre-service teachers' mathematical content knowledge and their ability to interpret students' responses to a multi-digit multiplication task and make subsequent appropriate teaching decisions. Using a combination of quantitative and qualitative methods, the researchers tested aspects of the mathematical knowledge held by a volunteer group of twenty final year preservice primary teachers. A volunteer sample of seven pre-service teachers were involved in a follow-up interview, where they were provided with hypothetical student work samples, including one using the long multiplication algorithm, and asked to analyse the student's mathematical thinking and make suggestions as to appropriate teaching approaches. The results indicated that the pre-service teachers in the study had an instrumental understanding of the long multiplication process that impacted on their ability to both recognise and address students' mathematical errors. This study provides an insight into the lack of content knowledge of a small sample of pre-service teachers with respect to multiplication of two and three digit numbers and subsequent lack of pedagogical content knowledge for teaching this topic.

Published

2013

18. Take-Home Numeracy Kits for Preschool Children

Author

Macmillan, Agnes

Abstract

This paper outlines the practical aspects of a project aimed to offer access to numerate knowledge for preschool children by providing them with take-home numeracy kits. A Koori preschool in an urban regional area of New South Wales, Australia, was involved in the project. The centre catered for 18 four- and five-year-old children. The two main resources for the project were numeracy-related activities, and interactive adult and peer support. In the first part of the paper observational transcripts of the children playing with the kits at the preschool are analysed according to Foundation and Transition Level outcomes and indicators for number (NSW Department of School Education, 1994). The second part of the paper clarifies and synthesises key aspects of culturally-situated learning: the children's mathematical language and problem-solving; the responsiveness of the teaching strategies; and the congruence between early childhood education philosophies and national numeracy policies.

Published

2004

19. Teachers' Perceptions on Declining Student Enrolments in Australian Senior Secondary Mathematics Courses

Author

Hine, Gregory

Abstract

The study of higher-level secondary mathematics is considered essential for national economic growth, competitiveness in research and innovation, and further education opportunities. Yet the reported trend within Australian secondary schools is that enrolments in higher-level mathematics are declining and have been in a state of decline for over a decade. The little available and recent literature published on this phenomenon has looked at why secondary students elect to study higher-level mathematics courses, both from the perspective of teachers and students. This research paper presents findings as to why Heads of Learning Area: Mathematics (HOLAMs) believe capable secondary students elect not to enrol in those courses. Data were collected from 50 secondary schools across the three sectors (Government, Catholic, Independent) in Western Australia. The key findings are that capable students do not enrol in higher-level mathematics courses because these courses are not required for university entrance, other courses appear to be less rigorous and more viable, and the Australian Tertiary Admissions Ranking (ATAR) score can be maximised by taking one mathematics course instead of two courses.

Published

2018

20. On the Use of History of Mathematics: An Introduction to Galileo's Study of Free Fall Motion

Author

Ponce Campuzano, Juan Carlos, Matthews, Kelly E., and Adams, Peter

Abstract

In this paper, we report on an experimental activity for discussing the concepts of speed, instantaneous speed and acceleration, generally introduced in first year university courses of calculus or physics. Rather than developing the ideas of calculus and using them to explain these basic concepts for the study of motion, we led 82 first year university students through Galileo's experiments designed to investigate the motion of falling bodies, and his geometrical explanation of his results, via simple dynamic geometric applets designed with GeoGebra. Our goal was to enhance the students' development of mathematical thinking. Through a scholarship of teaching and learning study design, we captured data from students before, during and after the activity. Findings suggest that the historical development presented to the students helped to show the growth and evolution of the ideas and made visible authentic ways of thinking mathematically. Importantly, the activity prompted students to question and rethink what they knew about speed and acceleration, and also to appreciate the novel concepts of instantaneous speed and acceleration at which Galileo arrived.

Published

2018

21. Different Disciplines, Different Transitions

Author

Wood, Leigh and Solomonides, Ian

Abstract

There is not just one mathematics taught at university level, nor is there one group of students. Mathematics is taught differently depending on the discipline and the perceived background of the student. There is engineering mathematics for the students heading towards engineering degrees, life science mathematics for those heading towards biology degrees and so on. This paper considers the phases of transitions that students experience as they embark on a course of study and then go on to professional life. We make inferences about the ways the curriculum should be designed to alleviate the difficulties of these phases as well as to take account of the capabilities that graduates will require in the workplace. It is not only where students are coming from that affects their learning but where they are heading to, in combination with their perceptions of that destination. (Contains 1 table and 1 figure.)

Published

2008

22. Towards the Modelling of Mathematical Metacognition

Author

Wilson, Jeni and Clarke, David

Abstract

Metacognition has been accorded a role in both mathematical problem solving and in the learning of mathematics. There has been consistent advocacy of the need for the promotion of metacognitive activity in both domains. Such advocacy can only be effective if the advocated process is well understood. In this paper we have four goals: to describe a "multi-method" technique developed to study student mathematical metacognition; to set out the structural elements and configuration of a coherent model of metacognition in the domain of mathematical problem solving; to report on the empirical utility (and validity) of this model; and, to report the insights into student mathematical metacognition arising from the research. Multi-Method Interview Tasks are appended. (Contains 4 figures.)

Published

2004

23. Quantitative Literacy in the Media: An Arena for Problem Solving

Author

Watson, Jane M.

Abstract

The term "quantitative literacy" is used in this article to reinforce its importance in catering for reform-based curricula in Australia. The medium chosen for the problems discussed in this paper is the newspaper. The purpose of this article is to tie together traditional views of the importance of problem solving with the current aims of numeracy and quantitative literacy. In doing this, the author considers another angle on the development of quantitative literacy. Watson (1997) suggested a hierarchy for the related field of statistical literacy, which is easily adapted in the wider milieu. The hierarchy suggests three tiers or steps in the development of the goal of quantitative literacy: (1) The terminology needs to be understood; (2) This terminology then needs to be understood within the social (or scientific) context in which it is used; and (3) There needs to be a critical awareness that prompts questioning of claims in context that are made without proper justification. (Contains 5 figures.)

Published

2004

24. The Swiss Event at the University of Canberra Maths Day

Author

Clark, David and Brooks, Malcolm

Abstract

An event based on "find the rule" problems has been part of the University of Canberra Maths Day since 1985. In this paper, the authors describe the Swiss event, its context, its aims, its logistics, and gives examples of problems used in past events. The type of problems used, how they are used in an event at the maths day, and how the event evens out the competition and stops strong schools dominating are also discussed.

Published

2004

25. The Impact of Within-School Autonomy on Students' Goal Orientations and Engagement with Mathematics

Author

Carmichael, Colin, Muir, Tracey, and Callingham, Rosemary

Abstract

School autonomy has been identified as having an impact on a school's performance, yet less has been reported about the effect this has on students' goal orientations and engagement with mathematics. In a national study conducted in schools across Australia, measures of school autonomy were collected from teachers and school leaders, along with students' perceptions of the mastery and performance goal orientations of their classrooms and personally using surveys. Schools were identified as having high or low levels of autonomy on the basis of school leaders' responses. For the study discussed in this paper, a subset of 14 schools for which matched student and teacher data were available provided students' responses to a variety of variables including goal orientations. The findings suggested students in high-autonomy schools were less likely to hold a personal performance approach and avoidance goals than their peers in low-autonomy schools. Fifty-five case studies conducted in 52 schools provided evidence of some of the practical aspects of these findings, which have implications for systems, schools and teachers.

Published

2017

26. Mathematics Engagement in an Australian Lower Secondary School

Author

Norton, Stephen

Abstract

The importance of actively engaging in mathematics discourse in order to learn mathematics is well recognized. In this paper, I use Basil Bernstein's concepts of pedagogic discourse to document and analyse academic learning time of students in Years 8 and 9 at a suburban lower secondary school: in particular, for what proportion of class time students reported being academically engaged, their explanations for this engagement and how they felt about the discourse. It was found that many students had disengaged from mathematical endeavour as a result of the failure of the instructional discourse either to engage students or to serve the purpose of developing discipline-specific content knowledge. The reasons for this relate to the overemphasis on mundane mathematics resulting in some students lacking the cognitive tools to engage with the concepts and having neither the intrinsic nor instrumental motivation to persist with secondary school esoteric mathematics. The implications for mathematics curriculum development are discussed.

Published

2017

27. Programmable Toys and Free Play in Early Childhood Classrooms

Author

Newhouse, Christopher Paul, Cooper, Martin, and Cordery, Zina

Abstract

This paper reports on a study that investigated the ways that young children interact with discrete programmable digital toys in a free play setting. One intention was to see whether this interaction would address some of the requirements of the Digital Technologies subject in the Australian Curriculum. The study was implemented in two phases in consecutive years involving teachers and students from two early childhood classes. Researchers worked with the teachers to provide the children with opportunities to use two types of digital toys--the Sphero and the Beebot. The children were observed as they interacted with these toys and their interactions analysed using a checklist of behaviours. It was found that without some explicit scaffolding the children did not tend to demonstrate any actions that could be associated with an understanding of "algorithms". However, they did demonstrate motivation, engagement, and increased proficiency and recognition with using the hardware and software of these digital systems.

Published

2017

28. How Useful Are Closed Captions for Learning Mathematics via Online Video?

Author

Tisdell, Chris and Loch, Birgit

Abstract

Closed captioning of instructional videos is a topic that has not seen much discussion despite its importance for hearing-impaired students and recent legal ramifications if videos are not appropriately captioned. In particular, it is unclear what best practice in captioning videos should be to benefit all learners in disciplines such as mathematics with a reliance on the development of visual explanation while providing audio narration. In this paper, we report on a study undertaken at an Australian university, to investigate the perceived level of usefulness of captions and their automatic translations in a mathematics course. We discovered that students broadly agreed that captions are a useful learning feature: to allow flexibility of where and when a video is watched, but also to help understand speaker accents, and clarify explanations that are difficult to hear in the recording. Due to the high levels of use and perceived educational benefits of closed captions in online video but limited literature, there is a significant need for new research in this area. An urgent discussion is needed to explore how students engage with closed captions, how they may support learning, and to investigate implications on instructional design of mathematical videos.

Published

2017

29. 'No Wonder Out-of-Field Teachers Struggle!': Unpacking the Thinking of Expert Teachers

Author

Beswick, Kim, Fraser, Sharon, and Crowley, Suzanne

Abstract

In this paper, the authors describe the initial stage of developing a framework designed to support out-of-field, less experiences or isolated mathematics and science teachers to make decisions about the use of resources in their teaching. The process highlighted the complexity and extent of the knowledge on which expert teachers draw in making such decisions and thus underscored the enormity of the task of teaching out-of-field. The eventual product, the Science, Technology, Engineering and Mathematics: Critical Appraisal for Teachers (STEMCrAfT) framework has proven useful not only for the target audience, but also as a tool for colleagues who take on a mentoring role. The authors begin with a brief description of teacher knowledge before describing the project and then presenting what they unearthed about expert teachers' thinking and knowledge.

Published

2016

30. Integrating Technologies into Mathematics: Comparing the Cases of Square Roots and Integrals

Author

Kissane, Barry

Abstract

Two decades ago, in an award-winning paper, Dan Kennedy (1995) likened learning mathematics to climbing a tree, for which there was only one way to climb: up a large and solid trunk. In the limited time that is available, many students give up the climb, impede others, fall off the trunk, or fail to climb the tree sufficiently well. In the case of integration, the solid trunk seems to be heavily laden with algebraic manipulation. Kennedy suggested that technology might provide help in the form of ladders to climb the tree in other ways. Just as the use of technology allowed us to bypass the numerical requirements to calculate square roots (and other aspects of basic mathematics), it now seems time to look carefully at the use of computer algebra to reconsider how much of the algebraic trunk is really needed to help students climb the tree, look around and start to explore the branches of the tree that look interesting to them.

Published

2016

31. Mathematics learning in the early years through nature play.

Author

Speldewinde, Chris and Campbell, Coral

Subjects

EDUCATIONAL planning, EARLY childhood educators, EARLY childhood education, CHILDREN

Abstract

In Australia, there have been a growing number of nature-based early childhood education initiatives [Alme, H., and M. A. Reime. 2021. "Nature Kindergartens: A Space for Children's Participation." Journal of Outdoor and Environmental Education 24: 113–131]. Research into early years' nature education internationally remains under-theorised particularly in STEM teaching and learning. The nature or bush kindergarten programme (often referred to as 'bush kinders' in the Australian context), is one such programme where nature play and education occur. This paper considers how children's mathematical thinking develops through their time spent in bush kinder settings. Using an ethnographic lens, this longitudinal study is the first of its type in Australia with a focus on STEM in bush kinders. In this paper, eight 'powerful mathematical ideas' are used to analyse how educators can approach teaching mathematics with only what nature provides. The paper reports one main finding, that bush kinders provide opportunities for children through educator support to build mathematical understandings through nature play. Drawing on fieldwork data and the analysis of research literature, this paper contributes to the conceptualisation of mathematics in early childhood nature play and bush kinder programmes. [ABSTRACT FROM AUTHOR]

Published

2022

32. Adding Some Perspective to de Moivre's Theorem: Visualising the 'n'-th Roots of Unity

Author

Bardell, Nicholas S.

Abstract

Traditionally, "z" is assumed to be a complex number and the roots are usually determined by using de Moivre's theorem adapted for fractional indices. The roots are represented in the Argand plane by points that lie equally pitched around a circle of unit radius. The "n"-th roots of unity always include the real number 1, and also include the real number -1 if "n" is even. The non-real "n"-th roots of unity always form complex conjugate pairs. This topic is taught to students studying a mathematics specialism (ACARA, n.d., Unit 3, Topic 1: Complex Numbers) as an application of de Moivre's theorem with the understanding that the roots occur in the complex domain. Meanwhile, in the Cartesian plane, a closely related topic deals with the solution of polynomials (ACARA, n.d., Unit 2, Topic 3: Real and Complex Numbers). The aim of this paper is to demonstrate visually the connection between the reduced polynomial "y" = "x"[superscript "n"] - 1 in the Cartesian plane and the resulting n-roots which invariably appear in the Argand plane. There is no contradiction here: the reader will find a three-dimensional surface representation of Equation (2) provides the full link between both the Cartesian and Argand planes, and illustrates not only the location of the roots in relation to the original equation but also shows why they occur with conjugate pairings. Examples will be provided for the cases "n" = 3, "n" = 5 and "n" = 8 which will be sufficient to illustrate the general pattern that emerges. The approach adopted here is a natural extension of the surface visualisation techniques first presented by Bardell (2012) for quadratic equations.

Published

2015

33. Making Connections

Author

Turner, Paul

Abstract

This article aims to illustrate a process of making connections, not between mathematics and other activities, but within mathematics itself--between diverse parts of the subject. Novel connections are still possible in previously explored mathematics when the material happens to be unfamiliar, as may be the case for a learner at any career stage. The geometrical configuration explored in this paper, now known as "Ford circles" after Lester R. Ford, Sr. (1886-1967), is related to ideas about mutually tangent circles that were studied by, among others, Apollonius of Perga in the third century BC and by René Descartes in the 17th century. This exposition is intended to conjure the thoughts of a hypothetical mathematician attempting to find and explain some connections, in the process exploring some lines that turn out to be unproductive, and making observations that are really non sequiturs, before eventually achieving some success. The author suggests that seemingly innocent mathematical fragments can have connections to many related ideas. If a teacher is in possession of a broad subject knowledge, then the likelihood seems high that it is possible to draw out useful connections in the classroom or in well-designed projects and assignments. For this reason, the author claims that an ever-widening subject knowledge is of utmost importance in a teacher's program of professional development.

Published

2015

34. Diversifying Our Perspectives on Mathematics about Space and Geometry: An Ecocultural Approach

Author

Owens, Kay

Abstract

School mathematics tends to have developed from the major cultures of Asia, the Mediterranean and Europe. However, indigenous cultures in particular may have distinctly different systematic ways of referring to space and thinking mathematically about spatial activity. Their approaches are based on the close link between the environment and cultural activity. The affinity to place strengthens the efficient, abstract, mathematical system behind the reference and its connection to the real world of place and a holistic worldview. This paper sets out to present an overview of various approaches to aspects of space and geometry by drawing on linguistic and cultural literature, my collaborative research in Papua New Guinea, and from personal communications with indigenous colleagues in Australia and elsewhere. This diversity provides a challenge by which teachers can deconstruct their thinking about mathematics and subsequently to review the content of teaching and to be more responsive to the diversity of cultural backgrounds of students. To assist with recognising ecocultural mathematics on space and geometry, 4 principles are established and discussed on language structures, reference lines and points, measures of space and worldviews and interpretations of space as place.

Published

2014

35. Visualising the Roots of Quadratic Equations with Complex Coefficients

Author

Bardell, Nicholas S.

Abstract

This paper is a natural extension of the root visualisation techniques first presented by Bardell (2012) for quadratic equations with real coefficients. Consideration is now given to the familiar quadratic equation "y = ax[superscript 2] + bx + c" in which the coefficients "a," "b," "c" are generally complex, as shown explicitly in Equation (1), which is presented in the article, with the usual notation.

Published

2014

36. On stable solutions of a weighted elliptic equation involving the fractional Laplacian.

Author

Quynh Nguyen, Thi and Tuan Duong, Anh

Subjects

*ELLIPTIC equations, *LAPLACIAN operator, *LIOUVILLE'S theorem, *MATHEMATICS

Abstract

In this paper, we study the following fractional Choquard equation with weight (−Δ)su=1|x|N−α∗h(x)|u|ph(x)|u|p−2uinℝN,$$ {\left(-\Delta \right)}&#x0005E;su&#x0003D;\left(\frac{1}{{\left&#x0007C;x\right&#x0007C;}&#x0005E;{N-\alpha }}\ast h(x){\left&#x0007C;u\right&#x0007C;}&#x0005E;p\right)h(x){\left&#x0007C;u\right&#x0007C;}&#x0005E;{p-2}u\kern0.5em \mathrm{in}\kern0.5em {\mathrm{\mathbb{R}}}&#x0005E;N, $$where 02s,p>2,α>0$$ 02s,p>2,\alpha >0 $$ and h$$ h $$ is a positive weight function satisfying h(x)≥C|x|a$$ h(x)\ge C{\left&#x0007C;x\right&#x0007C;}&#x0005E;a $$ at infinity, for some a≥0$$ a\ge 0 $$. We establish, in this paper, a Liouville type theorem saying that if maxN−4s−2a,0<α

Published

2024

37. What Is the Responsibility of Mathematics Education to the Indigenous Students That It Serves?

Author

Meaney, Tamsin and Evans, Deb

Abstract

Although refuted many times, the commonly accepted story about Indigenous communities in Australia is that they had few counting words and thus were lacking in ways to quantify amounts. In this paper, we use the case of quantifying to discuss how Indigenous mathematics can be used, not just to help Indigenous students transition into the classroom but also back into their home communities. We argue that mathematics education must take seriously its responsibility to support Indigenous students to gain school mathematics and also to help maintain the use of traditional mathematical ideas. If this does not occur, mathematics educators will contribute, intentionally or unintentionally to the loss of Indigenous knowledge that present and future generations of Indigenous people will hold them responsible for.

Published

2013

38. Developing Box Plots While Navigating the Maze of Data Representations

Author

Duncan, Bruce and Fitzallen, Noleine

Abstract

The learning sequence described in this article was developed to provide students with a demonstration of the development of box plots from authentic data as an illustration of the advantages gained from using multiple forms of data representation. The sequence follows an authentic process that starts with a problem to which data representations provide the solution. The advantage of using box plots is that they allow clear and efficient comparison of related data sets. In this case, students are given a maze on paper and timed while they complete it. This produces the first set of data. They then attempt the maze again, expecting that their time to do this will decrease. The need to compare these two data sets arises from the question, "Did the group improve their maze times on their second attempt?"

Published

2013

39. Launching Confident Numerate Learners

Author

Wade, Peter, Gervasoni, Ann, McQuade, Catharine, and Smith, Catherine

Abstract

This paper explores how a secondary school in western Sydney used educational research as an impetus to change its mathematical education culture over a three year period. Key changes occurred in four areas: leadership; pedagogy; structures for teaching and learning; and mathematical environments. These included increased professional conversations, adoption of a numeracy lesson structure, regular use of manipulatives and open ended tasks and a structured intervention program for mathematically vulnerable students. Critical to the development of these changes were partnerships with a university academic and the CEDP system leadership team as well as school leadership participation in professional learning.

Published

2013

40. Links in Learning Logarithms

Author

Kenney, Rachael and Kastberg, Signe

Abstract

Logarithms continue to play an important role in mathematics (most significantly in calculus), science, and engineering. It is therefore important for students to understand logarithms as real numbers as well as the characteristics of logarithmic functions. Exploration of challenges in understanding logarithms as real numbers and logarithmic functions as well as their graphs provides insight that can be used as the basis for instruction. This paper discusses and shares evidence of students' difficulties collected from various courses over time. The authors share concepts related to logarithms that can help students build an understanding of these functions, and present some ways that misconceptions related to these concepts are manifested to suggest what teachers can listen for as they explore logarithms with students.

Published

2013

41. The Use of Alternative Algorithms in Whole Number Computation

Author

Norton, Stephen

Abstract

Pedagogical reform in Australia over the last few decades has resulted in a reduced emphasis on the teaching of computational algorithms and a diversity of alternative mechanisms to teach students whole number computations. The effect of these changes upon student recording of whole number computations has had little empirical investigation. As reported in this paper, Years 4 to 7 students across three schools were tested for their ability to carry out written computations. A range of recording methods were documented, many of which seemed to be adaptations of mental methods of computation. Students who used alternative methods tended to be less successful than students who used traditional algorithms. The results suggest there is merit in conducting further research into the effects of using alternative written computational methods upon students' learning of mathematics. (Contains 24 figures and 3 tables.)

Published

2012

42. Integrating Technology, Pedagogy and Content in Mathematics Education

Author

Handal, Boris, Campbell, Chris, Cavanagh, Michael, Petocz, Peter, and Kelly, Nick

Abstract

The need for appraising the effective integration of technologies into teaching and learning within a disciplinary context is crucial for upholding quality teaching standards in schools and formulating professional development programs. This paper describes the development and validation of an instrument aimed at characterising the integration of technological knowledge in secondary school mathematics teachers. The Technological Pedagogical Content Knowledge (TPACK) framework is used to underpin the development and validation of the questionnaire. The questionnaire consisting of three 10-item scales was administered to a sample of 280 teachers across the state of New South Wales, Australia. The factor analysis undertaken confirms the structurally soundness of the instrument in terms of validity and reliability. (Contains 3 figures and 7 tables.)

Published

2012

43. What Number Knowledge Do Children Have When Starting Kindergarten in NSW?

Author

Gould, Peter

Abstract

At the start of the first formal year of schooling in New South Wales, teachers gather information on a number of aspects of children's numeracy to guide their teaching program. This information is essential to planning teaching activities to meet the needs of all students. This paper reports on some key aspects of number knowledge held by 65,000 children with an average age of 5.3 years when they started in NSW public schools in 2011. The data highlights the diverse yet interconnected number knowledge children possess when they start school, and suggests directions for further enquiry. (Contains 4 tables.)

Published

2012

44. A Tabular Approach to Titration Calculations

Author

Lim, Kieran F.

Abstract

Titrations are common laboratory exercises in high school and university chemistry courses, because they are easy, relatively inexpensive, and they illustrate a number of fundamental chemical principles. While students have little difficulty with calculations involving a single titration step, there is a significant leap in conceptual difficulty when "scaling-up" to more involved titration calculations with two or more steps. Currently, there is no alternative approach for students who are unable to follow the standard textbook method for titration calculations. This paper presents a new method of setting out the titration calculations, which helps these weaker students to better organize the data. The connection between the new method and current models of learning is discussed to explain why the tabular approach is successful for students who have difficulty following the standard textbook method. (Contains 1 figure and 4 tables.)

Published

2012

45. Collaborative Innovations with Rural and Regional Secondary Teachers: Enhancing Student Learning in Mathematics

Author

Pegg, John and Panizzon, Debra

Abstract

When questioned, secondary mathematics teachers in rural and regional schools in Australia refer to their limited opportunities to engage and share experiences with peers in other schools as an under-utilised and cost-effective mechanism to support their professional learning and enhance their students' learning. The paper reports on the creation and evaluation of a network of learning communities of rural secondary mathematics teachers around a common purpose--enhancement and increased engagement of student learning in mathematics. To achieve this goal, teams of teachers from six rural schools identified an issue hindering improved student learning of mathematics in their school. Working collaboratively with support from university personnel with expertise in curriculum, assessment and quality pedagogy, teachers developed and implemented strategies to address an identified issue in ways that were relevant to their teaching contexts. The research study identifies issues in mathematics of major concern to rural teachers of mathematics, the successes and challenges the teachers faced in working in learning communities on the issue they identified, and the efficacy of the professional learning model.

Published

2011

46. Accessing Students' Reasoning for Disengagement

Author

Deed, Craig

Abstract

This paper examines what students can tell us about their strategic decision to engage or disengage from learning. A means of accessing student knowledge and experience about teaching and learning is explicated, along with a discussion of student reasoning for making an investment in learning. It is argued that disengagement is a reasoned decision based on questions of relevance, usefulness and student capacity to be successful. (Contains 2 tables.)

Published

2011

47. An Instrument for Assessing Primary Students' Knowledge of Information Graphics in Mathematics

Author

Diezmann, Carmel M. and Lowrie, Tom J.

Abstract

Information graphics have become increasingly important in representing, organising and analysing information in a technological age. In classroom contexts, information graphics are typically associated with graphs, maps and number lines. However, all students need to become competent with the broad range of graphics that they will encounter in mathematical situations. This paper provides a rationale for creating a test to measure students' knowledge of graphics. This instrument can be used in mass testing and individual (in-depth) situations. Our analysis of the utility of this instrument informs policy and practice. The results provide an appreciation of the relative difficulty of different information graphics, and provide the capacity to benchmark information about students' knowledge of graphics. The implications for practice include the need to support the development of students' knowledge of graphics, the existence of gender differences, the role of cross-curriculum applications in learning about graphics, and the need to explicate the links among graphics. (Contains 8 tables and 1 figure.)

Published

2009

48. The Intersection of Vocational Interests with Employment and Course Enrolments

Author

Athanasou, James A.

Abstract

This paper examines the relationships between interests and subject choice in senior secondary schooling, and between interests and occupational choices. Career interest results (N = 7477) were obtained from the "Career Interest Test" ("Version 3.1") administered on the Federal Government's "My Future" website (http://www.myfuture.edu.au) and were then compared with the nature of high school course enrolments and structure of employment. Work-related interests were fairly evenly spread across Outdoor, Practical, Scientific, Creative, Business, Office and People Contact activities. In contrast, employment in Australia was skewed towards Business and Practical activities (48.6%). On the other hand, Mathematics courses (20.1%) and Science (17.1%) dominated senior secondary school enrolments. It is possible that the interests and preferences of Australians are not satisfied either by the curriculum offered to them or by the work opportunities available. (Contains 4 tables and 5 figures.)

Published

2009

49. Towards a Theory of Identity and Agency in Coming to Learn Mathematics

Author

Grootenboer, Peter and Jorgensen, Robyn

Abstract

In writing this paper we draw considerably on the work of Jo Boaler and Leone Burton. Boaler's studies of classrooms have been particularly poignant in alerting the mathematics education community to a number of key features of successful classrooms, and how such features can turn around the successes for students who traditionally perform poorly in school mathematics. This is supplemented by the recent work of Leone Burton who worked extensively with research mathematicians in order to understand their communities and ways of working. Collectively these two seminal works provide valuable insights into potential ways to move the field of school mathematics forward. In times when there is international recognition of the plight of school mathematics, there is a need for new teaching practices that overcome the hiatus of contemporary school mathematics. (Contains 4 figures.)

Published

2009

50. Differentiation from First Principles Using Spreadsheets

Author

Lim, Kieran F.

Abstract

In the teaching of calculus, the algebraic derivation of the derivative (gradient function) enables the student to obtain an analytic "global" gradient function. However, to the best of this author's knowledge, all current technology-based approaches require the student to obtain the derivative (gradient) at a single point by implementing differentiation using first principles. This paper shows that the ability of spreadsheets to fit a polynomial to a set of discrete (x,y) points enables students to not just evaluate a gradient at a single point, but at a whole family of points, thus generating the analytic global gradient function of secants without doing any algebraic manipulations. Students can then perform "numerical experiments" to see the effect of taking the limit as the secants tend to tangents of the original function. Finally, students can derive the rules for differentiation through exploration and experimentation, again, without doing any algebraic manipulations. This approach enables the class to focus on the concepts being taught, rather than being hindered by the mechanics of (for example) trying to factorize a cubic polynomial. (Contains 4 figures and 1 table.)

Published

2008