The role of algebraic thinking in dealing with negative numbers

• Published in: ZDM Vol. 54; no. 6; pp. 1243 - 1255
• Main Authors: Vlassis, Joëlle, Demonty, Isabelle
• Format: Journal Article Web Resource
• Language: English
• Published: Berlin/Heidelberg Springer Berlin Heidelberg 01.11.2022; Springer; Springer Nature B.V
• Subjects: Algebra; Arithmetic; Compensation; Correlation; Difficulty Level; Education; Education & enseignement; Education & instruction; Grade 6; Integers; Learning; Learning Processes; Mathematics; Mathematics Education; Mathematics Instruction; Mathematics Tests; Mental Computation; Numbers; Original Paper; Questions; Sciences sociales & comportementales, psychologie; Secondary Education; Secondary school students; Skill Development; Social & behavioral sciences, psychology; Students; Subtraction; Thinking Skills; Transformation; Compensation strategy in subtraction; Subtractive number; Early algebraic thinking; Negative numbers; Relational thinking
• ISSN: 1863-9690; 1863-9704; 1863-9704
• DOI: 10.1007/s11858-022-01402-1

To date, of the many studies on early algebraic thinking, none, to our knowledge, has examined the relationships between algebraic thinking and negative numbers. Students encounter persistent difficulties in dealing with these numbers, and we believe that these could be addressed through the development of algebraic thinking. We are particularly interested in relational thinking, a form of algebraic thinking involved in generalised arithmetic, characterised by the ability to identify the structure of an expression as well as the relationships between numbers. The idea of the ‘subtractive number’ has been highlighted in this context. The aim of the study was to investigate the role of relational thinking in dealing with negative numbers. We submitted a paper-and-pencil test to 166 grade 6 students in order to analyse their skills in operations with integers, as well as their relational thinking in questions relating to the compensation strategy in subtraction. We then examined the extent to which the students who answered the compensation questions correctly performed the operations with integers better than those who answered them incorrectly. Our results showed that students’ ability to see the subtraction operation as a ‘transformation’ involving a unary use of the minus sign appears to be a factor in their success in operations with negatives. Few students demonstrated this ability, yet it can be seen as an essential stage on which to base the progressive development of relational thinking.