Cognitive construction of the solution set of a system of linear equations with two unknowns

Cognitive construction of the solution set of a system of linear equations with two unknowns

In this research, we propose a genetic decomposition for the solution set of a system of linear equations with two unknowns, by means of a transit from a homogeneous to a non-homogeneous linear system, in a Cartesian geometric context. To validate our genetic decomposition, we designed instruments t...

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Bibliographic Details
Main Authors: Miguel Alejandro Rodríguez Jara, Arturo Mena Lorca, Jaime Mena Lorca, Patricia Vásquez Saldias, María Elsa Del Valle Leo
Format: Article
Language:Spanish
Published: Universitat Autonoma de Barcelona 2019-03-01
Series:Enseñanza de las Ciencias
Subjects:
sistemas de ecuaciones lineales
futuros profesores
educación secundaria
teoría apoe
Online Access:https://ensciencias.uab.es/article/view/2194
Description
Summary:In this research, we propose a genetic decomposition for the solution set of a system of linear equations with two unknowns, by means of a transit from a homogeneous to a non-homogeneous linear system, in a Cartesian geometric context. To validate our genetic decomposition, we designed instruments that we applied to students from a secondary school mathematics teacher training program. Thus, and by using implicative statistics, we were able to confirm the mental constructions and mechanisms considered in our genetic decomposition. The results show lack of understanding of what a solution for a system is, difficulties in articulating the geometrical and algebraic aspects, and the convenience of using an alternative strategy in the case of systems of three or more linear equations.
ISSN:0212-4521
2174-6486

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