scholarly journals Etnomatematika Dalam Rumah Adat Panjalin

2018 ◽  
Vol 2 (2) ◽  
pp. 224
Author(s):  
Anggita Maharani ◽  
Seka Maulidia
Keyword(s):  
Problem Solving ◽  
Reference Material ◽  
Learning Outcomes ◽  
Learning Process ◽  
Mathematics Learning ◽  
Mathematical Problem ◽  
Mathematical Problem Solving ◽  
Mathematical Concepts ◽  
Learning Mathematics ◽  
Alternative Idea

This study aims to improve the learning process at school by using culture-based learning that is ethnomatematics at the Panjalin traditional house. The purpose of this study is to explore the culture of the Panjalin community as a medium for learning mathematics. Through culture-based learning, it is expected that students can improve their mathematical learning outcomes. The results showed that there were mathematical concepts and activities at the Panjalin Traditional House. Students learn theories about mathematical concepts, then know the application of these mathematical concepts. The results of the study aimed to review the benefits of ethnomatematics-based mathematics learning that can motivate students and make the results of research on ethnomatematics at Panjalin traditional house as an alternative idea of mathematics learning outside the classroom and used as reference material for the preparation of contextual mathematical problem solving questions.

scholarly journals Pengembangan Kemampuan Pemecahan Masalah Matematis melalui Habit of Thinking Interdependently

2020 ◽  
Vol 2 (1) ◽  
pp. 1
Author(s):  
Fevi Rahmadeni
Keyword(s):  
Problem Solving ◽  
Literature Review ◽  
Body Problem ◽  
Mathematics Learning ◽  
Mathematical Problem ◽  
Mathematical Problem Solving ◽  
Mathematics Problem Solving ◽  
Learning Mathematics ◽  
Mathematics Problem ◽  
Development Of Students

Like the human body, problem solving is the heart of mathematics. Problem solving ability is a capital for students to develop and explore themselves further in mathematics learning. This article aim to explain the development of students' mathematical problem solving abilities through Habit of Thinking Interdependently (HTI). This type of research is literature review where the authors analyze and draw conclusions from several relevant references related to HTI. HTI the attitude of students towards learning mathematics in the form of the habit of thinking together in groups. The conclusions obtained indicate that students' mathematical problem solving abilities can be developed through HTI.

scholarly journals PENGEMBANGAN E-MODULE AUDIOVISUAL OPERASI ARITMATIKA DASAR BERBASIS PEMAHAMAN KONSEP DAN NILAI-NILAI AKHLAK

2021 ◽  
Vol 9 (2) ◽  
pp. 237
Author(s):  
Mela Aziza
Keyword(s):  
Problem Solving ◽  
Learning Outcomes ◽  
Field Test ◽  
Empirical Test ◽  
Mathematical Problem ◽  
Moral Values ◽  
Learning Activities ◽  
Development Model ◽  
Mathematical Problem Solving ◽  
Mathematical Concepts

This study aims to determine the validity, practicality, and effectiveness of the audiovisual e-module for basic arithmetic operations based on understanding concepts and moral values. The development model used is 4D (Define, Design, Develop, and Disseminate). Data in the study were collected with validation sheets, practicality sheets, response questionnaires, and learning outcomes tests. After the define and design stages have been carried out, Draft I of the e-module is obtained. At the develop stage, a validity test was carried out on five validators, an empirical test was done to 1 teacher and 5 students, as well as a field test to a class 2A MI Humaira' Bengkulu City so that a valid, practical, and effective e-module was produced. This e-module has some advantages, namely providing interactive learning activities with clear and detailed pictures, videos and learning steps, motivating students to learn mathematics, explaining material according to mathematical concepts, containing moral values that can be imitated, giving project activities that can be done independently, as well as practicing students' mathematical problem solving skills.AbstrakPenelitian ini bertujuan untuk mengetahui kevalidan, kepraktisan, dan keefektifan e-module audiovisual operasi aritmatika dasar berbasis pemahaman konsep dan nilai-nilai akhlak. Model pengembangan yang digunakan adalah 4D (Define, Design, Develop, dan Disseminate). Data dalam penelitian dikumpul-kan dengan lembar validasi, lembar kepraktisan, angket respon, dan tes hasil belajar. Setelah dilakukan tahap define dan design dihasilkan Draf I Produk e-module. Pada tahap develop, dilakukan uji kevalidan kepada lima validator, uji empirik (terbatas) kepada 1 guru dan 5 peserta didik, serta uji lapangan kepada satu kelas 2A MI Humaira’ Kota Bengkulu sehingga dihasilkan produk akhir e-module yang valid, praktis, dan efektif. E-module ini memiliki beberapa keunggulan yaitu menyajikan kegiatan belajar yang interaktif dengan gambar, video dan langkah-langkah pembelajaran yang jelas dan rinci, memotivasi peserta didik belajar matematika, men-jelaskan materi sesuai konsep matematika, me-ngandung nilai-nilai akhlak yang bisa diteladani, menyajikan kegiatan proyek yang bisa dilakukan secara mandiri, serta melatih kemampuan pemecah-an masalah matematika peserta didik. 

scholarly journals Ethnomathematics: Mathematical Aspects of Panjalin Traditional House and Its Relation to Learning in Schools

2020 ◽  
Vol 11 (2) ◽  
pp. 247-260
Author(s):  
Herri Sulaiman ◽  
Fuad Nasir
Keyword(s):  
Learning Outcomes ◽  
Learning Process ◽  
Mathematics Learning ◽  
Mathematical Concepts ◽  
Learning Mathematics

This study was aimed to improve the learning process at school through ethnomathematics culture-based learning, namely the Panjalin traditional house. The purpose of this study was to explore the culture of Panjalin society as a medium for learning mathematics. Through culture-based learning, students were expected to improve their mathematics learning outcomes. The results showed that there were mathematical concepts and activities in the Panjalin traditional house. Students should learn the theories about mathematical concepts and know their application. The result of the study was aimed to examine the aspects of mathematics in the Panjalin traditional house and its relationship with mathematics learning at schools.

scholarly journals PENINGKATAN KEMAMPUAN PEMECAHAN MASALAH SISWA SD DALAM PEMBELAJARAN MATEMATIKA DENGAN MODEL DISKURSUS MULTY REPRESENTATION (DMR)

2017 ◽  
Vol 9 (1) ◽  
pp. 35 ◽  
Author(s):  
Deti Rostika ◽  
Herni Junita
Keyword(s):  
Problem Solving ◽  
Mathematics Learning ◽  
Mathematical Problem ◽  
Mathematical Problem Solving ◽  
Mathematics Model ◽  
Discourse Representation ◽  
Mathematical Concepts ◽  
Real Effort ◽  
Low Ability

Abstract: Mathematics is a science that is universal and able to integrate with other subjects. One of the goals of mathematics learning based on Kurikulum Tingkat Satuan Pendidikan is to understand, explain and apply mathematical concepts in the context of problem solving. But in the field, the students tend to difficulties in resolving problems related to problem solving in mathematics. This is due to the low ability students in mathematical problem solving in students' learning because not used to thinking creatively. It required a real effort to improve students' problem-solving abilities in mathematics. One of the measures taken namely through mathematics model Multy Discourse Representation (DMR). Learning with models DMR is one alternative that can be used because it exposes students to work in groups, in order to issue a power of representation held by the students.Keyword: Problem solving ability, DMR Model, Mathematic learning. Abstrak: Matematika merupakan suatu ilmu yang sifatnya universal dan mampu berintegrasi dengan mata pelajaran lain. Salah satu tujuan pembelajaran matematika berdasarkan kurikulum tingkat satuan pendidikan adalah memahami, menjelaskan dan mengaplikasikan konsep matematika dalam konteks pemecahan masalah. Namun dalam pelaksanaan di lapangan, siswa cenderung kesulitan dalam menyelesaikan persoalan terkait pemecahan masalah dalam pembelajaran matematika. Hal ini disebabkan rendahnya kemampuan siswa dalam pemecahan masalah matematis karena dalam pembelajaran siswa tidak terbiasa berpikir secara kreatif. Untuk itu diperlukan upaya nyata dalam meningkatkan kemampuan pemecahan masalah siswa dalam pembelajaran matematika. Salah satu upaya yang diambil yakni melalui pembelajaran matematika dengan model Diskursus Multy Representation (DMR). Pembelajaran dengan model DMR merupakan salah satu alternatif yang dapat digunakan karena menghadapkan siswa kepada bekerja secara berkelompok, supaya dapat mengeluarkan daya representasi yang dimiliki oleh diri siswa.Kata kunci: Kemampuan pemecahan masalah, Model DMR, Pembelajaran matematika

scholarly journals UPAYA MENINGKATKAN KEMAMPUAN PEMECAHAN MASALAH SOAL NON-RUTIN PADA MATERI PERSAMAAN DAN PERTIDAKSAMAAN LINEAR SATU VARIABEL DENGAN PENERAPAN METODE PEER TUTORING [EFFORTS IN IMPROVING MATHEMATICAL PROBLEM-SOLVING SKILLS OF NON-ROUTINE PROBLEMS OF ONE-VARIABLE LINEAR EQUATIONS AND INEQUALITIES BY IMPLEMENTING THE PEER TUTORING METHOD]

2019 ◽  
Vol 3 (1) ◽  
pp. 96
Author(s):  
Thalia Thamsir ◽  
Destya Waty Silalahi ◽  
Robert Harry Soesanto
Keyword(s):  
Problem Solving ◽  
Peer Tutoring ◽  
Learning Process ◽  
Mathematical Problem ◽  
Linear Equations ◽  
Mathematical Problem Solving ◽  
Problem Solving Skills ◽  
Mathematics Problem Solving ◽  
Learning Mathematics ◽  
Almost All

<strong></strong><p>The purpose of learning mathematics is to obtain life skills through problem solving. Problem solving skills are one of mathematics skills that must be possessed by students. The result of the pre-cycle in this research showed that 83.33% of students had not achieved the minimum predicate “B-” in solving non-routine problems. It proved that students’ abilities in mathematics problem solving in non-routine problems were still low. During the pre-cycle, the researcher also observed some students who were not brave enough yet to ask questions of the teacher directly during the learning process. Besides that, almost all the students still had high individualistic and low awareness. Based on the problems that happened in the class, the researcher offered the peer tutoring method as a solution to improve students’ mathematical problem-solving skills in non-routine problems. The research method used in this research was Classroom Action Research using the Kemmis and McTaggart model. The instruments used in this research were tests, observation sheets, students’ questionnaires, and journal reflections. Based on the data analysis, students’ mathematical problem-solving skills in non-routine problems improved to 29.17% by implementing the peer tutoring<em> </em>method with the steps (1) choosing the tutors, (2) guiding the tutors, (3) students doing the tutoring activity, and (9) evaluating the learning process</p><p class="abstrak"><strong>BAHASA INDONESIA ABSTRAK: </strong>Tujuan dari mempelajari matematika ialah untuk memperoleh kecakapan hidup salah satunya melalui pemecahan masalah. Kemampuan pemecahan masalah merupakan salah satu standar kemampuan matematika yang harus dimiliki oleh siswa. Hasil tes pra siklus pada penelitian ini menunjukkan sebanyak 83.33% siswa belum mampu mencapai predikat minimal ‘B-’ dalam menyelesaikan soal non-rutin. Ini membuktikan bahwa kemampuan pemecahan masalah matematis siswa pada soal non-rutin masih kurang. Selama pra siklus berlangsung, peneliti juga mengamati beberapa siswa belum berani untuk bertanya langsung kepada guru selama proses pembelajaran berlangsung. Selain itu, sebagian besar siswa masih memiliki sikap individualis yang tinggi dan juga rasa kepedulian antar siswa masih rendah. Berdasarkan masalah yang terjadi di dalam kelas tersebut maka peneliti menawarkan metode <em>peer tutoring </em>sebagai solusi untuk meningkatkan kemampuan pemecahan masalah matematis siswa pada soal non-rutin. Metode penelitian yang digunakan adalah Penelitian Tindakan Kelas dengan model Kemmis dan Mc. Taggart. Instrumen yang digunakan pada penelitian ini adalah tes, lembar observasi, angket siswa dan jurnal refleksi. Berdasarkan analisis data, kemampuan pemecahan masalah matematis siswa pada soal non-rutin mengalami peningkatan hingga 29,17% menggunakan metode <em>peer tutoring </em>dengan langkah-langkah penerapan yaitu (1) memilih tutor, (2) membimbing tutor, (3) siswa melakukan kegiatan tutorial, dan (4) mengevaluasi pembelajaran</p><strong></strong>

scholarly journals Students’ Errors in Mathematical Problem-Solving Ability on the Triangular and Quadrilateral Materials at Junior High Schools (SMP) Jakarta

2020 ◽  
Vol 3 (2) ◽  
pp. 125-136
Author(s):  
Rosida Yahya Asriyani ◽  
Isnaini Handayani ◽  
Windia Hadi
Keyword(s):  
Problem Solving ◽  
Learning Outcomes ◽  
Mathematics Learning ◽  
Mathematical Problem ◽  
Junior High Schools ◽  
Mathematical Problem Solving ◽  
Research Approach ◽  
Reading Errors ◽  
Observation Learning ◽  
Writing Errors

This research was aimed to analyze student's errors on triangular and quadrilateral material in terms of problem-solving ability. This research was motivated by the low problem-solving ability and errors often made by students during the mathematics learning. The research approach was descriptive-qualitative that was done by analyzing the students' difficulty in solving description problems. The techniques of data collection were observation, learning outcomes tests, and interviews. The data were analyzed qualitatively based on Newman Error Analysis. Based on the results of the research, it was found that students' reading errors were in the high, medium, and low categories. Students' comprehension errors were in the medium and low categories, students' transformation errors were in the high, medium, and low categories, students' process skills errors were in the high, low, and medium categories and students writing errors (encoding error) were in the high, medium, and low categories.

The Interplay Between Mathematical and Computational Thinking in Primary School Students’ Mathematical Problem-Solving Within a Programming Environment

2021 ◽  
pp. 073563312097993
Author(s):  
Zhihao Cui ◽  
Oi-Lam Ng
Keyword(s):  
Problem Solving ◽  
Mathematical Thinking ◽  
Mathematics Learning ◽  
Mathematical Problem ◽  
Computational Thinking ◽  
Programming Environment ◽  
Primary School Students ◽  
School Students ◽  
Mathematical Concepts ◽  
Block Based

In this paper, we explore the challenges experienced by a group of Primary 5 to 6 (age 12–14) students as they engaged in a series of problem-solving tasks through block-based programming. The challenges were analysed according to a taxonomy focusing on the presence of computational thinking (CT) elements in mathematics contexts: preparing problems, programming, create computational abstractions, as well as troubleshooting and debugging. Our results suggested that the challenges experienced by students were compounded by both having to learn the CT-based environment as well as to apply mathematical concepts and problem solving in that environment. Possible explanations for the observed challenges stemming from differences between CT and mathematical thinking are discussed in detail, along with suggestions towards improving the effectiveness of integrating CT into mathematics learning. This study provides evidence-based directions towards enriching mathematics education with computation.

scholarly journals Efektivitas Pembelajaran Matematika Realistik Terhadap Kemampuan Pemecahan Masalah Matematik Siswa Kelas VII SMP

2018 ◽  
pp. 1-9
Author(s):  
Ananda Ria Pertiwi Sinaga
Keyword(s):  
Problem Solving ◽  
Junior High School ◽  
Mathematics Learning ◽  
Mathematical Problem ◽  
Mathematical Problem Solving ◽  
Learning Approaches ◽  
Learning Attitudes ◽  
Realistic Mathematics ◽  
Quasi Experimental ◽  
Academic Year

This study aims to (1) find out whether the mathematical problem-solving abilities of students who are taught by realistic mathematics learning were higher than those students who were taught using conventional learning; (2) knowing students' learning attitudes towards realistic mathematics learning approaches. This research is a quasi-experimental study with a quantitative approach. This research was conducted in class VII of the Junior High School 28 Medan 2017/2018 Academic Year where the population of this study was all class VII. Samples from this study were class VII-G as the experimental class and class VII-F as the control class. Based on the results of the analysis of calculations, the following data are obtained: (1) the results of analysis of realistic mathematical learning on students' mathematical problem-solving abilities using the t-test found that ttable = 1.68 and tcount = 3.6821 so tcount> ttable then concluded that H0 is rejected and Ha be accepted. The mathematical problem-solving abilities of students who are taught by realistic mathematics learning was higher than conventional learning. (2) student responses were very positive towards realistic mathematics learning with an average of ≥ 86.03.

scholarly journals Inconsistency Among Beliefs, Knowledge, and Teaching Practice in Mathematical Problem Solving: A Case Study of a Primary Teacher

2017 ◽  
Vol 7 (2) ◽  
pp. 27-40
Author(s):  
Tatag Yuli Eko Siswono ◽  
Ahmad Wachidul Kohar ◽  
Ika Kurniasari ◽  
Sugi Hartono
Keyword(s):  
Problem Solving ◽  
Teaching Practice ◽  
Mathematics Learning ◽  
Mathematical Problem ◽  
Primary Teacher ◽  
Mathematical Problem Solving ◽  
Mathematics Problems ◽  
And Mathematics ◽  
Teacher's Beliefs

This is a case study investigating a primary teacher’s beliefs, knowledge, and teaching practice in mathematical problem solving. Data was collected through interview of one primary teacher regarding his beliefs on the nature of mathematics, mathematics teaching, and mathematics learning as well as knowledge about content and pedagogy of problem solving. His teaching practice was also observed which focused on the way he helped his students solve several different mathematics problems in class based on Polya’s problemsolving process: understand the problem, devising a plan, carrying out the plan, and looking back. Findings of this study point out that while the teacher’s beliefs, which are closely related to his problem solving view, are consistent with his knowledge of problem solving, there is a gap between such beliefs and knowledge around his teaching practice. The gap appeared primarily around the directive teaching which corresponds to instrumental view he held in most of Polya’s process during his teaching practice, which is not consistent with beliefs and knowledge he professed during the interview. Some possible causes related to several associate factors such as immediate classroom situation and teaching practice experience are discussed to explain such inconsistency. The results of this study are encouraging, however, further studies still need to be conducted.

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