Abstract
This study draws on data from 146 Norwegian and 161 Swedish student teachers. They were given a correct but short and unannotated solution to the linear equation x + 5 = 4x – 1. The student teachers were invited to explain the solution provided for a fictive friend, who was absent when the teacher introduced this topic. An accurate solution of this equation contains two additive and one multiplicative operation.
 There are two main strategies for solving a linear equation, ‘swap sides swap signs’ (SSSS) and ‘do the same to both sides’ (DSBS). Of the Norwegian student teachers, 2/3 explained the additive steps in the solution by SSSS, while only 1/3 of the Swedish student teachers applied SSSS. Consequently, DSBS was more frequent among the Swedish student teachers regarding the additive steps. However, in the final, multiplicative step, 3/4 of the Norwegian student teachers chose to explain by DSBS. On the contrary, among the Swedish student teachers the proportion applying DSBS for the multiplicative step of the solution decreased, and almost as many provided a deficient explanation of the final operation.
 We discuss possible reasons for differences between the nations. We also suggest how teacher educators in both countries can use the results of this study to improve student teachers’ explanations of how to solve linear equations.
Highlights
The topic of linear equations is a part of school mathematics all over the world (Andrews & Sayers, 2012)
We suggest how teacher educators in both countries can use the results of this study to improve student teachers’ explanations of how to solve linear equations
Linear equations with a single unknown can roughly be divided into equations with the unknown on one side of the equal sign only, and equations with unknown terms on both sides (Andrews, 2020)
Summary
The topic of linear equations is a part of school mathematics all over the world (Andrews & Sayers, 2012). Knowledge of teaching how to solve equations is relevant for all student teachers in mathematics. Linear equations with a single unknown can roughly be divided into equations with the unknown on one side of the equal sign only, and equations with unknown terms on both sides (Andrews, 2020). While the former can be solved by inverse arithmetic operations or informal techniques as ‘cover the unknown’, the latter tend to require a more structured approach. Explaining the procedure of solving equations is essential for student teachers
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