Examining early algebraic thinking: insights from empirical data

The aim of this study is to better understand the notion of early algebraic thinking by describing differences in grade 4–7 students’ thinking about basic algebraic concepts. To achieve this goal, one test that involved generalized arithmetic, functional thinking, and modeling tasks, was administered to 684 students from these grades. Quantitative analysis of the data yielded four distinct groups of students demonstrating a wide range of performance in these tasks. Qualitative analysis of students’ solutions provided further insight into their understanding of basic algebraic concepts, and the nature of the processes and forms of reasoning they utilized. The results showed that students in each group were able to solve different number and types of tasks, using different strategies. Results also indicated that students from all grades were present in each group. These findings suggest the presence of a consistent trend in the difficulty level across early algebraic tasks which may support the existence of a specific developmental trend from more intuitive types of early algebraic thinking to more sophisticated ones.

[1]  L. Radford Gestures, Speech, and the Sprouting of Signs: A Semiotic-Cultural Approach to Students' Types of Generalization , 2003 .

[2]  M. Patton Two Decades of Developments in Qualitative Inquiry , 2002 .

[3]  M. Blanton,et al.  Characterizing a Classroom Practice that Promotes Algebraic Reasoning. , 2005 .

[4]  Mark J. Driscoll,et al.  Fostering Algebraic Thinking: A Guide for Teachers, Grades 6-10 , 1999 .

[5]  L. Radford The Progressive Development of Early Embodied Algebraic Thinking , 2013, Mathematics Education Research Journal.

[6]  L. Radford Iconicity and contraction: a semiotic investigation of forms of algebraic generalizations of patterns in different contexts , 2008 .

[7]  J. Fauvel Platonic Rhetoric in Distance Learning: How Robert Record Taught the Home Learner. , 1989 .

[8]  Andreas J. Stylianides,et al.  Proof in School Mathematics: Insights from Psychological Research into Students' Ability for Deductive Reasoning , 2008 .

[9]  M. Blanton,et al.  A progression in first-grade children’s thinking about variable and variable notation in functional relationships , 2017, Educational Studies in Mathematics.

[10]  Carolyn Kieran,et al.  A conceptual model of mathematical reasoning for school mathematics , 2017 .

[11]  A. Graham,et al.  Developing Thinking in Algebra , 2005 .

[12]  Introduction: The development of students' algebraic thinking in earlier grades from curricular, instructional and learning perspectives , 2005 .

[13]  Percival G. Matthews,et al.  Measure for Measure: what Combining Diverse Measures Reveals About Children's Understanding of the Equal Sign as an Indicator of Mathematical Equality , 2012 .

[14]  David W. Carraher,et al.  Early Algebra Teaching and Learning , 2020, Encyclopedia of Mathematics Education.

[15]  Amy B. Ellis Connections Between Generalizing and Justifying: Students' Reasoning with Linear Relationships , 2007 .

[16]  Secondary Education.,et al.  Release of Spring 2012 MCAS Test Items , 2010 .

[17]  Alka Arora,et al.  TIMSS 2011 User Guide for the International Database. , 2013 .

[18]  M. Mitchelmore,et al.  Awareness of pattern and structure in early mathematical development , 2009 .

[19]  Carolyn Kieran,et al.  Research on the Learning and Teaching of Algebra: A Broadening of Sources of Meaning , 2018 .

[20]  David W. Carraher,et al.  Arithmetic and Algebra in Early Mathematics Education , 2006 .

[21]  T. Cooper,et al.  Generalising the pattern rule for visual growth patterns: Actions that support 8 year olds’ thinking , 2008 .

[22]  A. Su,et al.  The National Council of Teachers of Mathematics , 1932, The Mathematical Gazette.

[23]  F. Rivera,et al.  Abduction–induction (generalization) processes of elementary majors on figural patterns in algebra , 2007 .

[24]  D. Schifter,et al.  Classroom Stories: Examples of Elementary Students Engaged in Early Algebra , 2017 .

[25]  M. Blanton,et al.  A Learning Trajectory in 6-Year-Olds' Thinking about Generalizing Functional Relationships. , 2015 .

[26]  R. W. Grove,et al.  An analysis of the constant comparative method , 1988 .

[27]  L. Radford Signs and meanings in students' emergent algebraic thinking: A semiotic analysis , 2000 .

[28]  Barbara J. Dougherty,et al.  Developing Essential Understanding of Algebraic Thinking for Teaching Mathematics in Grades 3-5 , 2011 .

[29]  L. Radford On the development of early algebraic thinking , 2012, PNA. Revista de Investigación en Didáctica de la Matemática.