Exploring the Prospective Mathematics Teachers Computational Thinking in Solving Pattern Geometry Problem

This research aims to describe the characteristic of mathematics prospective teacher's computational thinking (CT) in solving the geometric pattern problem. The subject consists of 65 preservice mathematics teachers in Universitas in Madiun. The instrument was used in this research are geometric pattern problem tests and interview guidelines. The result shows that are three types of mathematics prospective teachers in solving the problem. First, CT substantial, i.e. prospective mathematics teachers use the conceptual knowledge who collaborated with procedural knowledge exactly. They use mathematics iteration to find the pattern and express them to the general form easily. Second, CT Nominal, i.e. prospective mathematics teachers, use manual ways to solve the pattern problem. They count using numeric, not symbolic, of solving the pattern formed. They can understand the design but can't express it to the mathematics model. Third, CT procedural, i.e. mathematics prospective teacher using the procedural knowledge only, not an expert in concept, and following the steps who teaches from experience before. The recommendation for future research is to develop the research to find the other characters in other mathematics subjects, in other students, to develop the learning models who can embody CT.

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Comparison of prospective mathematics teachers’ problem posing abilities in paper-pencil test and on dynamic geometry environment in terms of creativity

Journal of Research in Mathematics Education ◽

10.17583/redimat.2020.3879 ◽

2020 ◽

Vol 9 (3) ◽

pp. 243

Author(s):

MEHMET FATIH ÖÇAL ◽

TUĞRUL KAR ◽

GÜRSEL GÜLER ◽

ALI SABRI İPEK

Keyword(s):

Mathematics Teachers ◽

Prospective Teachers ◽

Creative Thinking ◽

Dynamic Geometry ◽

Thinking Skills ◽

Problem Posing ◽

Dynamic Geometry Environment ◽

Mathematical Concepts ◽

Prospective Mathematics Teachers

This study aims to investigate the similarities and differences between prospective mathematics teachers’ creative thinking skills in paper-pencil test and on a Geogebra-supported environment in terms of problem-posing. This case study used purposive sampling method for determining the participants. Findings revealed that the activities carried out in the GeoGebra-supported environment were insufficient to produce creative problems, and GeoGebra’s main utility to prospective teachers was in identifying their mistakes related to mathematical concepts and discrepancies among numerical values of the problems posed. The reasons for the low achievement in posing problem were discussed: These were; (i) lack of problem-posing experience, (ii) the structure of problem-posing activity, and (iii) prospective teachers’ mathematical content knowledge.

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TIPE PEMBUKTIAN MAHASISWA CALON GURU MATEMATIKA

AKSIOMA Jurnal Program Studi Pendidikan Matematika ◽

10.24127/ajpm.v10i1.3443 ◽

2021 ◽

Vol 10 (1) ◽

pp. 351

Author(s):

Mu'jizatin Fadiana ◽

Yulaikah Yulaikah ◽

Lajianto Lajianto

Keyword(s):

Mathematics Teachers ◽

Prospective Teachers ◽

Deductive Reasoning ◽

Mathematical Proof ◽

Inductive Reasoning ◽

Tertiary Institution ◽

Simple Task ◽

Descriptive Research ◽

Prospective Mathematics Teachers ◽

Quantitative Descriptive

The ability to prove formal mathematics is an important ability that must be mastered by undergraduate prospective mathematics teachers. However, students who are prospective mathematics teachers have difficulty in constructing proof in mathematics courses. Therefore, this study aims to explore the tendency of mathematical proof methods for prospective mathematics teachers in second year lectures. The method used in this research is quantitative descriptive research. Participants in this study were 30 prospective mathematics teachers at a tertiary institution in Tuban, East Java. The research instrument is a simple task of compiling mathematical evidence. The results of the study were analyzed using the classification of types of proof by Miyazaki, namely classifying the types of deductive and inductive reasoning. The results showed that prospective mathematics teachers had a greater tendency to use deductive reasoning than using inductive reasoning. Type A proof is the most common type of proof. In addition, around 70% of prospective teachers still experience difficulties in compiling evidentiary tasks.

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The Difficulties Experienced in Teaching Proof to Prospective Mathematics Teachers: Academician Views

Higher Education Studies ◽

10.5539/hes.v6n1p145 ◽

2016 ◽

Vol 6 (1) ◽

pp. 145 ◽

Cited By ~ 5

Author(s):

Gürsel Güler

Keyword(s):

Content Analysis ◽

Mathematics Education ◽

Mathematics Teachers ◽

Prospective Teachers ◽

Professional Lives ◽

Analysis Method ◽

Structured Interviews ◽

Content Analysis Method ◽

Prospective Mathematics Teachers ◽

Experience Difficulty

<p>The aim of this study is to examine the difficulties prospective mathematics teachers experience in mathematical proving, the courses in which they have difficulties in proving, the importance of proof in mathematics education and its functions in their professional lives. The data of the study was collected via semi-structured interviews with fifteen academicians who volunteered to take part in the study. Content analysis method was used to analyze the data obtained. As a result of the study, based the views of the academicians, it was seen that prospective mathematics teachers experience four different difficulties in proving. Besides, in line with the views of the academicians the following categories were formed: the courses that prospective teachers experience difficulty, the importance of proof in mathematics education and its functions in prospective teachers’ professional lives and these categories were presented with their subcategories.</p>

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Arithmetic for Majors?

Mathematics Teacher ◽

10.5951/mt.46.8.0560 ◽

1953 ◽

Vol 46 (8) ◽

pp. 560-564

Author(s):

Jack D. Wilson

Keyword(s):

Mathematics Teachers ◽

Prospective Teachers ◽

School Administrators ◽

School Officials ◽

Prospective Mathematics Teachers

School administrators are now asking that prospective mathematics teachers be given a better preparation for teaching arithmetic and general mathematics. This paper outlines certain trends related to these requests and describes a course in arithmetic to give prospective teachers the kind of training now being demanded by school officials.

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Acessar ou Interagir? Uma Análise em Disciplinas da Licenciatura em Matemática no Cederj

EAD em FOCO ◽

10.18264/eadf.v6i3.356 ◽

2016 ◽

Vol 6 (3) ◽

Author(s):

Robson Marques De Souza ◽

Marcelo Almeida Bairral

Keyword(s):

Distance Education ◽

Virtual Environment ◽

Mathematics Teachers ◽

Prospective Teachers ◽

Rio De Janeiro ◽

Master's Degree ◽

Discrete Mathematics ◽

Undergraduate Mathematics ◽

Mathematics Courses ◽

Prospective Mathematics Teachers

Este artigo é recorte de uma pesquisa de mestrado que analisou aspectos da formação inicial em Matemática no Polo do Centro de Educação Superior a Distância do Estado do Rio de Janeiro (Cederj) em Paracambi-RJ. Exemplifica sucintamente diferentes ferramentas disponibilizadas na plataforma e reflete sobre possíveis formas de promover interação entre licenciandos em Matemática. Ilustra acessos em três disciplinas (Matemática Discreta, Pré-Cálculo e Instrumentação no Ensino de Geometria (IEG)) obtidos por meio do histórico de entradas no ambiente no período de julho a dezembro de 2013. Identifica momentos específicos nos quais os licenciandos utilizam as ferramentas comunicativas para estabelecer contato com professores, tutores e colegas de curso, seja para sanar dúvidas, realizar ou postar atividades. Esses momentos estão concentrados nos períodos de avaliação, sendo uma exceção a disciplina IEG, na qual se detectou um acesso mais regular e indícios que sugerem maior interação no ambiente virtual da disciplina.Palavras-chave: Educação a Distância, Plataforma Cederj, Licenciatura em Matemática, interação. Access or Interact? An Analysis of Undergraduate Courses of the Prospective Mathematics Teachers at CEDERJAbstract This article is part from a master's degree research that analyzed aspects of prospective mathematics teachers at the Polo Cederj in Paracambi-RJ. It briefly describes various tools available on the platform and reflects on ways to promote interaction among undergraduates students in Mathematics. It illustrates the access in three subjects (Discrete Mathematics, Pre-Calculus and Didactic of Geometry (DG)) obtained through the log access in the virtual environment in the period from July to December, 2013. It identifies specific times in which prospective teachers seek the tools and use them to make contact with teachers, tutors and fellow course, is to clarify doubt, perform or post activities. These moments are concentrated in the periods of assessment, as an exception to DG subject, in which were found more regular access and evidence to suggest more interaction within virtual environment of course.Keywords: Distance Education, Cederj platform, Undergraduate Mathematics Courses, interaction.

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Improving the Conceptual and Procedural Knowledge of Prospective Teachers through Multisensory Approach: Experience from Indonesia

JRAMathEdu (Journal of Research and Advances in Mathematics Education) ◽

10.23917/jramathedu.v3i2.6374 ◽

2018 ◽

Vol 3 (2) ◽

pp. 106 ◽

Cited By ~ 1

Author(s):

Yurniwati Yurniwati

Keyword(s):

Prospective Teachers ◽

Conceptual Knowledge ◽

Procedural Knowledge ◽

Research Study ◽

Learning Activities ◽

State University ◽

Mathematics Problems ◽

Hands On ◽

Mathematics Understanding ◽

Concrete Materials

Abstract. In mathematics, there is conceptual and procedural knowledge. Conceptual knowledge is about ideas or mathematics understanding but procedural knowledge is about procedure to solve mathematics problems. Multisensory approach involve many senses like kinaesthetic, visual and auditory to gain knowledge. This research aims to find information about how to apply multisensory approach to improve conceptual and procedural knowledge of prospective teacher in Jakarta State University. This action research study used Kemmis and Taggart model and implemented in two cycles. The data were collected through questionnaires and observation sheets. Then, the data was analyzed descriptively. The research results showed that the multisensory approach can enhance the conceptual and procedural knowledge of the prospective teachers. The Kinaesthetic approach was implemented in hands-on activity using concrete materials while the visual using images. The concrete materials and image provide different presentation but it helped to constructed concepts and abstraction. Furthermore, the auditory approach was developed along learning activities trough discussion to produce and clarify the ideas. Keywords: Conceptual knowledge, Procedural knowledge, Multisensory approach

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Enhancing the Conceptual, Procedural and Flexible Procedural Knowledge of Pre-Service Mathematics Teachers in Algebra

JRAMathEdu (Journal of Research and Advances in Mathematics Education) ◽

10.23917/jramathedu.v4i2.8363 ◽

2019 ◽

Vol 4 (2) ◽

pp. 66-78

Author(s):

Wasiu Ismaila Otun ◽

Adetunji Abiola Olaoye

Keyword(s):

Mathematics Teachers ◽

Instructional Strategy ◽

Conceptual Knowledge ◽

Procedural Knowledge ◽

Control Group ◽

Knowledge Test ◽

Knowledge For Teaching ◽

Post Test ◽

Quasi Experimental ◽

Experimental Group

The study investigated the effects of Solve-Reflect-Pose Strategy (SRP) on pre-service mathematics teachers’ algebraic knowledge for teaching in Nigeria. A pre-test-post-test quasi experimental design was employed. Intact classes were used and in all, 182 pre-service mathematics teachers’ participated in the study (92 in the experimental group taught with the SRP and 90 in the control group taught using the Modified Conventional Method (MCM). One research instrument manipulated at three levels namely: Conceptual Knowledge Test (CKT), Procedural Knowledge Test (PKT) and Flexible Procedural Knowledge Test (FPKT), was used for the quantitative data and interview protocol for qualitative data. The two research questions formulated were analysed using descriptive statistics while independent sample t-test was used to analyse the two hypotheses. Results showed that there were statistically significant differences in the mean post-test achievement scores on conceptual knowledge test, procedural knowledge test and flexible procedural knowledge test between pre-service teachers exposed to the SRP and those exposed to the MCM, all in favour of the SRP group. Based on the results, SRP should be adopted as an instructional strategy and efforts should be made to integrate the philosophy of SRP into the pre-service teachers’ curriculum at the teacher-preparation institutions.

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Prospective Mathematics Teachers Understanding of Classical and Frequentist Probability

Mathematics ◽

10.3390/math9192526 ◽

2021 ◽

Vol 9 (19) ◽

pp. 2526

Author(s):

Carmen Batanero ◽

Nuria Begué ◽

Rocío Álvarez-Arroyo ◽

Silvia M. Valenzuela-Ruiz

Keyword(s):

Content Analysis ◽

Mathematics Teachers ◽

Prospective Teachers ◽

Frequency Data ◽

Urn Model ◽

Frequentist Probability ◽

Prospective Mathematics Teachers

Strengthening the teaching of probability requires an adequate training of prospective teachers, which should be based on the prior assessment of their knowledge. Consequently, the aim of this study was to analyse how 139 prospective Spanish mathematics teachers relate the classical and frequentist approaches to probability. To achieve this goal, content analysis was used to categorize the prospective teachers’ answers to a questionnaire with open-ended tasks in which they had to estimate and justify the composition of an urn, basing their answers on the results of 1000 extractions from the urn. Most of the sample proposed an urn model consistent with the data provided; however, the percentage that adequately justified the construction was lower. Although the majority of the sample correctly calculated the probability of an event in a new extraction and chose the urn giving the highest probability, a large proportion of the sample forgot the previously constructed urn model, using only the frequency data. Difficulties, such as equiprobability bias or not perceiving independence of trials in replacement sampling, were also observed for a small part of the sample. These results should be considered in the organisation of probabilistic training for prospective teachers.

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Exploring Real Numbers as Rational Number Sequences With Prospective Mathematics Teachers

Mathematics Teacher Educator ◽

10.5951/mte.2020.9999 ◽

2020 ◽

Vol 9 (1) ◽

pp. 63-87

Author(s):

Mervenur Belin ◽

Gülseren Karagöz Akar

Keyword(s):

Mathematics Teachers ◽

Prospective Teachers ◽

Rational Number ◽

Teacher Educators ◽

Instructional Sequence ◽

Real Numbers ◽

Mathematics Teacher Educators ◽

Number Sequences ◽

Prospective Mathematics Teachers ◽

Long Division

The understandings prospective mathematics teachers develop by focusing on quantities and quantitative relationships within real numbers have the potential for enhancing their future students’ understanding of real numbers. In this article, we propose an instructional sequence that addresses quantitative relationships for the construction of real numbers as rational number sequences. We found that the instructional sequence enhanced prospective teachers’ understanding of real numbers by considering them as quantities and explaining them by using rational number sequences. In particular, results showed that prospective teachers reasoned about fractions and decimal representations of rational numbers using long division, the division algorithm, and diagrams. This further prompted their reasoning with decimal representations of rational and irrational numbers as rational number sequences, which leads to authentic construction of real numbers. Enacting the instructional sequence provides lenses for mathematics teacher educators to notice and eliminate difficulties of their students while developing relationships among multiple representations of real numbers.

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Maths concepts in teaching: Procedural and conceptual knowledge

Pythagoras ◽

10.4102/pythagoras.v0i62.115 ◽

2005 ◽

Vol 0 (62) ◽

Cited By ~ 2

Author(s):

Caroline Long

Keyword(s):

Prospective Teachers ◽

School Environment ◽

Conceptual Knowledge ◽

Procedural Knowledge ◽

Teaching Practice ◽

Teaching Of Mathematics

In teaching a general course on mathematics for prospective teachers, I have found the theoretical distinction between conceptual knowledge and procedural knowledge (Hiebert & Lefevre, 1986) a useful focus for teaching practice. The constructs provide a scaffold for the learning of mathematics by the students and for thinking about the teaching of mathematics in the school environment. These theoretical insights uncover in part the processes for acquiring knowledge and provide a tool for addressing problematic areas of learning.

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