Abstract
Presenters: Caroline Bardini, Abi Brooker, Robyn Pierce
The Merriam-Webster dictionary defines transition as: (a) the passage from one state,
stage, subject, or place to another: change; or (b) a movement, development, or evolution
from one form, stage, or style to another. The word transition can refer to an active shift of
the person in space and time or status, for example; it can also refer to developments taking
place within the person. Transitions may be anticipated by those involved, and hence
planned for, or they may result from unexpected changes in people’s lives. Transitions can
occur at various points throughout a person’s educational trajectory, and here we include
student development across primary, secondary, and tertiary sectors; also, the transitions
made between cultural contexts in schools. Beach (1999) noted that (consequential)
transitions consist of “changing relations between persons and their social activities
represented in signs, symbols, texts, and technologies†(p. 119). In this symposium, we will
be considering transitions in mathematics education affecting both students and teachers,
specifically in relation to representations in the first two papers and to values in the third.
In Transitions in Language Use in Primary School Online Mathematical Problem
Solving, Duncan Symons and Robyn Pierce adopt a Bakhtinian lens to examine upper
primary school students’ use of informal and formal language registers in CSCL
mathematical problem solving. They argue that online discussion assists in the
development of mathematical language as demonstrated by students’ use of a transitional
mathematical register combining new mathematical words with their own natural
language.
In Mathematical Writing and Writing Mathematics: The Transition from Secondary to
University Mathematics, Caroline Bardini and Robyn Pierce present a framework based on
their research on students’ use and understanding of mathematical symbols, recognised as
crucial in students’ successful transition from school to university mathematics. In
particular, the framework supports a fine-grained analysis allowing better appreciation and
understanding of the subtle differences in students’ experiences with symbolic expressions.
In The Valuing of Deep Learning Strategies in Mathematics by Immigrant, Firstgeneration,
and Australia-born Students: Transitions Between Cultural Worlds, Abi
Brooker, Marian Mahat, and Wee Tiong Seah draw on an ecological systems model of
students’ learning experiences to take an intercultural approach towards transitions in
mathematics education. Their focus is on the many school students in Australia who move
between cultures on a daily basis, particularly those who achieve well in international
assessments. They consider that the multicultural nature of many Australian classrooms
provides an opportunity for students to learn from different values and perspectives to
enhance their learning. Identifying the values that students have for deep learning (and
their preferred strategies for learning) might offer valuable insights into how students’
engagement with and abilities in mathematics can be better supported on a wider scale.
Gail FitzSimons
Transitions In Mathematics Education