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Journal of Mathematical Pedagogy (JOMP)
Published by Universitas Negeri Surabaya
ISSN : 27157466     EISSN : 27157458     DOI : https://doi.org/10.26740/jomp.v5n1
Core Subject : Education, Social,
Education Mathematics Social Sciences Other
The aim of the Journal of Mathematical Pedagogy (JOMP) is to provide an international forum for the sharing, dissemination and discussion of research, experience and perspectives across a wide range of education, teaching, development, instruction, educational projects and innovations, learning methodologies and new technologies in mathematics education. The JoMP invites authors to submit high-quality manuscripts resulted from a research project in the scope of mathematics education, which includes, but is not limited to the following topics: 1. Pedagogical issues in mathematics instruction, 2. Mathematics teacher knowledge and beliefs, 3. Assessment in mathematics education, 4. ICT in mathematics teaching/learning, 5. Social and cultural dimension of mathematics education,
Arjuna Subject : Ilmu Sosial - Pendidikan
Articles 65 Documents
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Exploring Students’ Creative Thinking Process in Solving Triangle Problems Assisted by GeoGebra Kartikawati, Wahyu; Siswono, Tatag Yuli Eko
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 1: December 2024
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n1.p1-13

Abstract

The study aims to describe student’s creative thinking process in solving triangle problems using GeoGebra. This qualitative approach involved six students selected from 28 students in grade 8 based on the case categories of student’s abilities namely high mathematical abilities (HMA), medium mathematical abilities (MMA), and low mathematical abilities (LMA). Data collection techniques were conducted through mathematical ability tests (MAT) to determine research subjects, creative thinking tests assisted by GeoGebra to determine students’ creative thinking processes, and interviews. The data analysis technique uses indicators of creative thinking stages according to Siswono, and data reduction from interviews to explore student’s creative thinking processes. The research results show that student’s creative thinking processes at the stages of synthesizing ideas, generating ideas, planning the implementation of ideas, and implementing ideas have different processes at each ability level. At the stage of synthesizing ideas, all students synthesize their ideas by combining the knowledge they have, both from everyday life and during classroom learning. All students were able to mention the information contained in the questions. LMA had difficulty relating the information in the questions to daily life and learning experiences in class, but HMA and MMA were able to relate it smoothly. At the idea-building stage, HMA and MMA can come up with two ideas for solutions using GeoGebra, while LMA can only come up with one idea. At the stage of planning to implement the idea, HMA and MMA had other ideas for solving the problem, but LMA only had one idea for solving it. At the stage of applying ideas, HMA and MMA can show two different answer ideas, while LMA can only show one answer idea. HMA was able to solve questions using GeoGebra smoothly, but MMA and LMA were less fluent, all subjects checked their answers again, HMA and MMA were confident in their answers, but LMA was less confident in their answers.
Problem Solving Process of AKM Algebra Content in Junior High School Students Reviewed from Extrovert and Introvert Personality Types Purnamasari, Dewi; Ismail
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 1: December 2024
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n1.p14-25

Abstract

This study aims to describe the problem-solving process of AKM algebra content in junior high school students with extrovert and introvert personality types. This study is a descriptive-qualitative study conducted in class VIII of junior high schools in Sidoarjo Regency. The subjects in this study consisted of 2 students with equal mathematical abilities, namely 1 extrovert student and 1 introvert student. The research instruments were in the form of MBTI personality type questionnaires, TPM AKM questions, and interview guidelines. Data analysis techniques were carried out through the stages of data reduction, data presentation, and drawing conclusions. The results of the study showed that the problem-solving process of AKM extrovert students in understanding problems was to use symbols and not write to state what was asked, while introvert students used symbols and wrote to state what was known and what was asked. In the step of making a plan, extrovert and introvert students can consider the strategies used in solving the problem. In the step of implementing the plan, extrovert and introvert students use the chosen strategy to solve the problem. In implementing the plan, introvert students check all steps repeatedly while extrovert students check only part of the steps. Then, in the review step, extroverted students only rechecked some of their solutions, while introverted students rechecked all of their solutions. Finally, the results of this study can provide information for teachers as consideration and input so that they can develop students' problem-solving processes during learning.
Collaborative Problem-Solving Skills of Heterogeneous Groups on Statistics Material Assisted by Microsoft Excel Wuri Indah Murwaningsih; Tatag Yuli Eko Siswono
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 1: December 2024
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n1.p26-36

Abstract

Collaboration is an important skill in the 21st century. This qualitative research is to describe the collaborative problem-solving ability of heterogeneous groups of statistics material assisted by Microsoft Excel. This research is a case study of 2 high and low math ability VIII grade students who were paired into one group in solving statistical problems with Microsoft Excel. The instruments used were math ability tests, problem solving tests, and interviews. Data were analyzed by data reduction, data presentation, and conclusion drawing based on collaborative problem solving ability indicators. The results showed that high mathematics ability students can provide ideas in determining the solution strategy, find Microsoft Excel-assisted solutions, and help low mathematics ability students so that they dominate in the problem solving process. However, low math ability students tend to follow the ideas of high math ability students. There were discussion activities, information sharing, and task sharing in the problem solving process. Therefore, for teachers to improve collaborative solving skills, especially for low math ability students and consider all effective strategies in solving problems.
Enhancing Higher Order Thinking Skills Among Elementary Students: A Classroom Action Research on Teaching Fractions Lucy, Lucy Asri Purwasi; Anjelina, Putri Natasya Monalisa; Haryono, Evanni Daniswara
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 1: December 2024
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n1.p37-49

Abstract

The aim of this research is to see how the implementation of HOTS-oriented learning can improve the mathematics learning outcomes of fifth grade elementary school students. The research method used was Classroom Action Research (PTK), with the research subjects being class V.b students at SD Negeri 16 Lubuklinggau, totaling 24 people, consisting of 9 men and 15 women. Data collection techniques use tests, observation and documentation. The data analysis techniques used are qualitative descriptive and quantitative descriptive. This research consists of three cycles and each cycle consists of four stages, namely planning, implementing actions, observing and reflecting. The results of this research show that the mathematics learning outcomes of class V students at SD Negeri 16 Lubuklinggau City have improved through the implementation of HOTS (Higher Order Thinking Skills) oriented learning. This is shown through the students' average scores, during the Pre-Cycle the average Pre-test score obtained by students was 42.91, Cycle 1 the Post-test average score was 53.95, Cycle 2 the Post-test average score was 69.58, Cycle 3 Post-test average score 79.58. Therefore, it can be concluded that the implementation of HOTS-oriented learning can be used as an effort to improve the quality of learning in order to form a higher level of thinking in students.
Creative Thinking Process of Prospective Teacher Students Based on Cognitive Style in Solving Contextual Problems Suprapti, Endang; Siswono, Tatag Yuli Eko; Manuharawati; Wijaya, Armeria
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 1: December 2024
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n1.p50-59

Abstract

This study aims to explore the creative thinking processes of prospective elementary school teacher students in solving contextual mathematical problems based on their cognitive styles. Using a qualitative descriptive approach, two students were selected through purposive sampling: one with a field independent (FI) cognitive style and high self-efficacy, and the other with a field dependent (FD) cognitive style and low self-efficacy. Data were collected through task-based tests and in-depth interviews, then validated and analyzed based on the stages of creative thinking: synthesizing ideas, building ideas, planning the implementation of ideas, and implementing the ideas. The results revealed notable differences in the creative thinking processes of the two subjects. The FI student exhibited fluency, flexibility, and novelty by generating multiple correct solutions through diverse strategies. In contrast, the FD student faced challenges in synthesizing ideas, relying on a single strategy, and producing only one correct solution. These findings highlight the significant impact of cognitive style on creative mathematical thinking and underscore the importance of tailored instructional approaches to support diverse cognitive profiles.
Students’ Abductive Reasoning in Solving Quadratic Pattern Generalization Problem Based on the Initial Mathematical Ability Nabilah, Istianatun; Ali Shodikin
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 2: July 2025
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n2.p72-93

Abstract

The purpose of this study was to describe students' abductive reasoning in solving quadratic pattern generalization problem based on initial mathematical ability. Abductive reasoning is a process of drawing conclusions based on certain facts where the conclusion is still an assumption that can be revised based on new information. This type of research is descriptive research with a qualitative approach. The subjects of this study were 6 junior high school students based on the category of students' initial mathematical ability, namely 2 students with high initial mathematical ability, 2 students with moderate initial mathematical ability, and 2 students with low initial mathematical ability. The data collection technique was carried out through an initial mathematical ability test to determine the research subjects, generalization problems of quadratic patterns to identify students' abductive reasoning processes, and interviews. Data analysis was carried out based on the process and indicators of abductive reasoning. The results of the study showed that in the process of (1) realizing the existence of abductive problems, all subjects had never solved generalization problems of quadratic patterns so that the problem became a surprise because it was something new that was obtained, all subjects also found differences in generalization problems of quadratic patterns with number pattern problems that had been encountered before, all subjects carried out this process as an initial process of abductive reasoning; (2) identifying solutions, all subjects explained the discrepancy between the information obtained from the facts of observations and previous knowledge, namely students with high and moderate initial mathematical abilities explained the difference in the given generalization questions on quadratic patterns only presenting the 4th pattern, while the number pattern questions that have been encountered usually contain patterns 1 to 4 in sequence, students with low initial mathematical abilities explained the difference lies in the process of working on it; all subjects mentioned alternative solution guesses that might help to solve the problem, namely all subjects made guesses about different pattern shapes and determined the fixed difference in the number of black circles in each pattern; students with high initial mathematical abilities grouped the black circles into three shapes, using the quadratic formula, the first and second level arithmetic sequence formulas, and obtained two alternative solutions; students with moderate initial mathematical abilities used the first level arithmetic sequence formula and obtained one alternative solution; while students with low initial mathematical abilities did not get an alternative solution; (3) choosing the best solution, students with high and medium initial mathematical ability choose a certain solution from the alternative solutions provided and explain the reasons for choosing this solution as the best solution, while students with low initial mathematical ability do not; students with high initial mathematical ability choose one formula from two formulas obtained because this formula is easier; students with low initial mathematical ability only get one formula and choose this formula because it is easy to use (4) assimilating the chosen solution, students with high and medium initial mathematical ability use the chosen solution to solve the problem, while students with low initial mathematical ability do not; the solution used by students with high initial mathematical ability produces the correct answer, while the solution used by students with medium initial mathematical ability can be the right solution if it is adjusted to the estimated pattern shape that has been made. Keywords: abductive reasoning, initial mathematical ability, pattern generalization, quadratic pattern generalization problem.
Students' Proportional Reasoning Level in Solving Missing Value Problems with GeoGebra Assistance Putri, Taszkia Aulia; Ekawati, Rooselyna; Sari, Yurizka Melia
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 2: July 2025
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n2.p60-71

Abstract

Proportional reasoning is the basis for understanding advanced mathematical concepts, but students in Indonesia still have difficulty in solving problems involving proportions and ratios. This study aims to describe the level of students' proportional reasoning in solving missing value problems with the help of GeoGebra. The research method used was qualitative with a case study approach, involving three students in class IX at one of the public junior high schools in Surabaya. The selection of subjects was based on mathematical ability, the same gender, and good communication skills. The research instruments included the researcher, mathematics ability test, proportional reasoning test, and interview. The results showed that students with high, medium, and low mathematics ability had reached level 2 in solving missing value problems using GeoGebra. The significant difference among the three students lies in the strategy used when solving the problem. This research has implications for students' proportional reasoning using GeoGebra. However, the results of this study do not represent the overall level of proportional reasoning of junior high school students.
The Relationship between Student Perceptions of DeepSeek Use and Mathematics Learning Effectiveness Yunita Nur Hasanah; Naisela Kurnia Ananda; Hana Ni'matul Rizky; Nonik Indrawatiningsih
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 2: July 2025
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n2.p103-112

Abstract

This research uses descriptive quantitative survey research. This study aims to determine the relationship between student perceptions of using DeepSeek on the effectiveness of mathematics learning. The sample in this study were 100 students majoring in mathematics at Surabaya State University. The sampling technique was carried out by means of probability sampling technique, namely simple random sampling. The data source of this research is the result of a survey conducted on the sample. In this survey, researchers used a questionnaire regarding students' perceptions of the use of DeepSeek on the effectiveness of mathematics learning with a Likert scale analyzed using Pearson's correlation analysis. The results showed that the correlation analysis between the independent variable (student perceptions in using DeepSeek) and the dependent variable (the effectiveness of mathematics learning) revealed a strong and positive relationship between the two variables. This means that there is a fairly strong and positive relationship between student perceptions of using DeepSeek and the effectiveness of mathematics learning.
Analysis of Artificial Intelligence Assisted Proof Process Through Principle of Mathematical Induction in Real Analysis Course Lestari, Isnawati Lujeng; Sari, Mayang; Uripno, Gusti; Suprihatiningsih, Siti; Hariyanti, Firda; Bonyah, Ebenezer
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 2: July 2025
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n2.p94-102

Abstract

The low proficiency of Mathematics Education students in constructing mathematical proofs, especially using the principle of mathematical induction, highlights the need for enhanced learning approaches. One promising method is the integration of Artificial Intelligence (AI) into the proof process within Real Analysis courses. This study aims to describe how students carry out mathematical induction proofs with the assistance of AI. Ten voluntary students enrolled in Real Analysis participated in an initial test involving divisibility problem. From this group, two students were selected through maximum variation sampling based on their answer diversity and communication skills. One student employed a modulo-based approach, while the other used the divisibility-definition concept. Overall, the results demonstrate that AI significantly supports students in understanding problems, planning proofs, implementing strategies, and revising their reasoning. AI played a critical role in concept generation, solution evaluation, and embedded reflection across each stage of Polya’s problem-solving framework, combined with the three aspects of AI-assisted proof: construction, evaluation, and revision
Pre-service Teachers’ Perception of the Benefits of Problem-solving and Strategies Used to Solve Mathematical Problems: A Case from some Colleges of Education in Ghana Gyampoh, Samuel Amoh
Journal of Mathematical Pedagogy (JoMP) Vol. 6 No. 2: July 2025
Publisher : Universitas Negeri Surabaya

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26740/jomp.v6n2.p113-125

Abstract

The quality of pre-service mathematics teacher education depends greatly on their understanding of mathematical problem-solving and its pedagogy. This study investigates pre-service teachers’ perceptions of the benefits of problem-solving in mathematics and the strategies they employ to solve problems. A qualitative design was adopted, involving 30 randomly selected participants from three Colleges of Education in Ghana. Data were collected through semi-structured interviews, transcribed, and analyzed thematically. Findings reveal that participants possess substantial knowledge of the benefits of problem-solving, including developing critical thinking and understanding, fostering intellectual challenge, enhancing real-life application skills, achieving set goals, overcoming difficulties, and selecting appropriate strategies. The study also highlights the range of strategies used by pre-service teachers, such as visual representation, logical reasoning, and varied heuristic approaches. These insights underscore the need to strengthen problem-solving pedagogy in teacher preparation programs to enhance both mathematical understanding and teaching practice.

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