Application of the Complementarities of Two Theories, APOS and OSA, for the Analysis of the University Students’ Understanding on the Graph of the Function and its Derivative

Borji, Vahid; Moll, Vicenç Font; Ahadi, Hassan; Sánchez, Alicia

doi:10.29333/ejmste/89514

Cited by 38 publications

(44 citation statements)

References 32 publications

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“…If a function is not presented in equation form, and the values of the function are presented in a Table (Question 3) many students cannot estimate the value of the derivative at a point with the use of the data from that table and with the use of the limit of the sequence of difference quotients, Badillo et al, 2011;Sánchez-Matamoros, Fernández, & Llinares, 2015). Furthermore, this difficulty is seen when the function is only presented graphically (Question 4) and students had to sketch the graph of the derivative function (Borji, Font, Alamolhodaei, & Sánchez, 2018). In our case, most students of the control group had fundamental problems in sketching the graph of ′ (Ferrini-Mundy & Graham, 1994).…”

Section: Question 4mentioning

confidence: 99%

Application of the APOS-ACE Theory to improve Students’ Graphical Understanding of Derivative

Borji

Ahadi

Radmehr

2018

EURASIA J MATH SCI T

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APOS-ACE (Action, Process, Object, and Schema-Activities, Classroom discussion, and Exercises) is applied in this article to explore the teaching and learning of derivative by giving emphasis on its graphical understanding. For this purpose, a Genetic Decomposition is developed based on the outcomes of previous studies and on our personal teaching experiences. An ACE cycle is designed with the help of the Maple software and implemented on a group of freshmen Iranian students (experimental group). The outcomes of this implementation are evaluated by comparing the performance of the experimental group to the performance of another equivalent student group (control group), to which the same subject was taught in the traditional, lecture-based way. Our findings demonstrated students' who were in the experimental group shown a better understanding of the derivate compared to the control group. Therefore, such ACE cycle with Maple could be used more frequently for teaching calculus, especially derivative.

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Section: Question 4mentioning

confidence: 99%

Application of the APOS-ACE Theory to improve Students’ Graphical Understanding of Derivative

Borji

Ahadi

Radmehr

2018

EURASIA J MATH SCI T

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“…A number of students in the first year of the university have fundamental difficulties in solving graphical and numerical questions related to derivatives and integrals (Borji, Font, Alamolhodaei, & Sánchez, 2018;Baker et al, 2000;Cooley, Trigueros, & Baker, 2007). One of the reasons may be that they did not well understand these concepts in different representations during the high school.…”

Section: Discussionmentioning

confidence: 99%

“…For this reason, students in the first year of the university may have fundamental difficulties in solving non-algebraic derivatives and integrals' questions. Students in the first year of the university face difficulties in solving the calculus questions where input information is given only through graphical or numerical representations (Borji, Font, Alamolhodaei, & Sánchez, 2018;Baker et al, 2000;Cooley et al, 2007). Many research have recommended that, in order to achieve a conceptual understanding of a mathematical concept, it is better to start learning that concept in its various representations and connections between them (Baker et al, 2000;Borji, Alamolhodaei, & Radmehr, 2018;Dreher & Kuntze, 2015;Goldin & Shteingold, 2001;Kendal & Stacey, 2003;Özmantar et al, 2010;Pape & Tchoshanov, 2001;Ronda, 2015).…”

Section: Discussionmentioning

confidence: 99%

“…A number of students do not have a conceptual understanding of graphical and numerical representations of calculus concepts (Kendal & Stacey 2003). Students in the first year of the university have difficulty in understanding the relationship between different representations of a mathematical concept (Borji, Font, Alamolhodaei, & Sánchez, 2018;Dreher & Kuntze, 2015). One of the reasons for these difficulties faced by students may be that they have not learned well the relationship between different representations of a calculus concept in the last years of high school (Mao, White, Sadler, & Sonnert, 2017).…”

Section: Introductionmentioning

confidence: 99%

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An Exploratory Analysis of the Representations of Functions in the University Entrance Exam in Spain and Iran

Borji

Sánchez

2019

EURASIA J MATH SCI T

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The University Entrance Exam (UEE) has an important impact on how math instructors teach mathematics to prepare students for this exam as well as how their students learn mathematics. Since the UEE is like a bridge between high school and university, its importance becomes twofold. However, research regarding this issue is very limited in mathematics education. The purpose of this research is to conduct an exploratory analysis of mathematics questions from the UEE in Spain and Iran from the point of view of representations of functions (i.e., algebraic, graphical, numerical and explanations with words). For this, the mathematics questions related to derivatives and integrals, which are two of the most important concepts in mathematics, from the last five years of the UEE in these two countries were considered to analyze them from the point of view of different representations. The results showed that most of the derivative and integral questions in the UEE in both countries were related to the algebraic representation. However, a very small percentage of the derivative and integral questions were related to the graphical and numerical representations and the relationships between the representations. At the end, suggestions to the curriculum planners and designers of mathematics questions of the UEEs are given.

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“…Existen diversos trabajos de investigación dedicados a explorar el concepto de derivada, en su mayoría, con estudiantes de licenciatura que ya han tenido contacto con este concepto (e.g. Borji, Font, Alamolhodaei y Sánchez, 2018). En Educación Matemática, particularmente, dichas investigaciones analizan y/o promueven la comprensión del concepto a partir de distintos ámbitos según sus intereses (e.g.…”

Section: Introductionunclassified

Una introducción al concepto de derivada en estudiantes de bachillerato a través del análisis de situaciones de variación

Zambrano

Ávila

Flores-Medrano

2019

EduMate

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Application of the Complementarities of Two Theories, APOS and OSA, for the Analysis of the University Students’ Understanding on the Graph of the Function and its Derivative

Cited by 38 publications

References 32 publications

Application of the APOS-ACE Theory to improve Students’ Graphical Understanding of Derivative

Application of the APOS-ACE Theory to improve Students’ Graphical Understanding of Derivative

An Exploratory Analysis of the Representations of Functions in the University Entrance Exam in Spain and Iran

Una introducción al concepto de derivada en estudiantes de bachillerato a través del análisis de situaciones de variación

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