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Syamsuri Syamsuri

Universitas Sultan Ageng Tirtayasa

Author-ID : 2394578

Religion Aerospace Engineering Agriculture, Biological Sciences & Forestry Arts Humanities Astronomy Automotive Engineering Biochemistry, Genetics & Molecular Biology Chemical Engineering, Chemistry & Bioengineering Chemistry Civil Engineering, Building, Construction & Architecture Computer Science & IT Control & Systems Engineering Decision Sciences, Operations Research & Management Dentistry Earth & Planetary Sciences Economics, Econometrics & Finance Education Electrical & Electronics Engineering Energy Engineering Environmental Science Health Professions Immunology & microbiology Industrial & Manufacturing Engineering Languange, Linguistic, Communication & Media Law, Crime, Criminology & Criminal Justice Library & Information Science Materials Science & Nanotechnology Mathematics Mechanical Engineering Medicine & Pharmacology Neuroscience Nursing Physics Public Health Social Sciences Transportation Veterinary Other

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ANALISIS KEBUTUHAN BAHAN AJAR MATEMATIKA BERBASIS HOTS TERINTEGRASI AGAMA UNTUK SISWA MTS KELAS VII Maretha Septiani Dwi Astutik; Syamsuri Syamsuri; Hepsi Nindiasari; Sukirwan Sukirwan
Jurnal Kajian Pembelajaran Matematika Vol 5, No 1 (2021): JURNAL KAJIAN PEMBELAJARAN MATEMATIKA
Publisher : FMIPA UNIVERSITAS NEGERI MALANG

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.17977/um076v5i12021p13-20

The purpose of this research is to analyze the need for developing HOTS-based mathematics teaching materials that are integrated with religion in MTs. The results of this research will later become the basis for developing religious-integrated HOTS teaching materials. The analysis stage refers to the Analyze stage in the ADDIE development model. The data collection technique was carried out by distributing questionnaires to 16 MTs mathematics teachers. This research shows that the majority of MTs mathematics teachers complain that the teaching materials are monotonous, less varied and not HOTS-based. The majority of mathematics learning that has been applied is with a scientific approach and applies 21st century learning. So far, when teaching mathematics, teachers use books, worksheets, modules, props and learning videos. Not all learning resources have been used by HOTS-based teachers. The majority of learning resources used by teachers have not been integrated with religion. The advantages of existing learning resources are that the material is complete, contextual, structured and uses a scientific approach. However, there are still shortcomings, including not being integrated with religious subjects due to the limitations of teachers regarding the knowledge of integrating mathematics subjects with material on religion, not implementing HOTS much and not being able to make students learn independently actively. From these results, it can be concluded that it is necessary to develop religious integrated HOTS- based mathematics teaching materials for MTs students.

Students’ Semantic-Proof Production in Proving a Mathematical Proposition Syamsuri Syamsuri; Purwanto Purwanto; Subanji Subanji; Santi Irawati
Journal of Education and Learning (EduLearn) Vol 12, No 3: August 2018
Publisher : Intelektual Pustaka Media Utama

Proving a proposition is emphasized in undergraduate mathematics learning. There are three strategies in proving or proof-production, i.e.: procedural-proof, syntactic-proof, and semantic-proof production. Students’ difficulties in proving can occur in constructing a proof. In this article, we focused on students’ thinking when proving using semantic-proof production. This research is qualitative research that conducted on students majored in mathematics education in public university in Banten province, Indonesia. Data was obtained through asking students to solve proving-task using think-aloud and then following by interview based task. Results show that characterization of students’ thinking using semantic-proof production can be classified into three categories, i.e.: (1) false-semantic, (2) proof-semantic for clarification of proposition, (3) proof-semantic for remembering concept. Both category (1) and (2) occurred before students proven formally in Representation System Proof (RSP). Nevertheless, category (3) occurred when students have proven the task in RSP then step out from RSP while proving. Based on the results, some suitable learning activities should be designed to support the construction of these mental categories.

ANALYZING STUDENTS' LEARNING DIFFICULTIES IN ALGEBRA Ralivia Suci Setianingrum; Syamsuri Syamsuri; Yani Setiani
MaPan : Jurnal Matematika dan Pembelajaran Vol 8 No 1 (2020): JUNE
Publisher : Department of Mathematics Education Faculty of Tarbiyah and Teacher Training Universitas Islam Negeri Alauddin Makassar

Abstract:This study aimed to describe a type of student learning difficulties in algebra that associated with the indicator based on the dimensions of Bloom's Taxonomy Revision. The method used is descriptive qualitative. The subject research is students of class VIII B at SMPN 7 Kota Serang. Data collection techniques used is a diagnostic test and interview. The analysis technique used is collection, reduction, presentation of data, and conclusion. The results showed that some types of students' learning difficulties in algebra. Students have difficulties in identifying the variables, coefficients, constants, and rates similar, the difficulties in simplifying a form of algebra, the difficulties of using the properties of distributive multiplication and arithmetic operations of mathematics, the difficulties in making a mathematical model of a statement or everyday problems, the difficulties in determining the overall value, per unit, and in part, the difficulties of counting based on the unit value, difficulties in resolving problems using the properties of comparative worth, and the difficulties of reflective thinking, as well as difficulty experienced by students, lies in the factual, conceptual, procedural, and metacognitive knowledge.Abstrak:Penelitian ini bertujuan untuk mendeskripsikan jenis kesulitan belajar siswa pada aljabar berdasarkan dimensi Revisi Taksonomi Bloom. Metode penelitian yang digunakan adalah deskriptif kualitatif. Subjek penelitian adalah siswa kelas VIII B di SMPN 7 Kota Serang. Teknik pengumpulan data menggunakan tes diagnostik dan wawancara. Teknik analisis yang digunakan adalah pengumpulan, reduksi, penyajian data, dan penarikan kesimpulan. Hasil penelitian menunjukkan jenis kesulitan belajar siswa yaitu kesulitan dalam mengidentifikasi variabel, koefisien, konstanta, dan tingkat yang serupa, kesulitan dalam menyederhanakan bentuk aljabar, menggunakan sifat-sifat perkalian distributif dan operasi matematika aritmatika, membuat model matematika, menentukan nilai keseluruhan, per unit, dan sebagian, kesulitan penghitungan berdasarkan nilai unit, kesulitan menyelesaikan masalah menggunakan sifat-sifat nilai komparatif, dan kesulitan berpikir reflektif, serta kesulitan siswa terletak pada pengetahuan faktual, konseptual, prosedural, dan metakognitif.

THINKING STRUCTURE OF STUDENTS’ UNDERSTANDING OF PROBABILITY CONCEPT IN TERM OF APOS THEORY Syamsuri Syamsuri; Cecep AHF Santosa
MaPan : Jurnal Matematika dan Pembelajaran Vol 9 No 1 (2021): JUNE
Publisher : Department of Mathematics Education Faculty of Tarbiyah and Teacher Training Universitas Islam Negeri Alauddin Makassar

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.24252/mapan.2021v9n1a8

This study aims to analyze the mental structure experienced by students when understanding the concept of probability reviewed from APOS Theory and then suggests a lesson that accommodates the mental structure. APOS theory states that a learner forms a suitable mental structure when interpreting a mathematical concept. This study involved 106 third semester students who enrolled in Probability Theory. The students were given ACE (Activities, Classroom, Exercises) learning cycle treatment. After treatment, students were then given homework assignments that aim to reinforce the learning process. After the sixth week of learning, data were collected through a test. The results of this study are as follows: (1) the mental structure of students towards the concept of opportunity is still at the process level, not at the object-level, (2) Improving the learning of probability concept requires activities to improve verbal understanding, not only in the form of pictures and symbols. The alternative learning treatments are written in this article.

Karakteristik Pemahaman Mahasiswa dalam Mengonstruksi Bukti Matematis Syamsuri Syamsuri; Cecep Anwar Hadi Firdos Santosa
JRPM (Jurnal Review Pembelajaran Matematika) Vol. 2 No. 2 (2017)
Publisher : Department of Mathematics Education, Faculty of Tarbiyah and Teacher Training, UIN Sunan Ampel Surabaya

The teaching and learning process in the mathematics undergraduate program emphasizes on the use of an axiomatic system and formal deduction. In this process, the students learn continuously about mathematical evidence, which can be referred to as the ability to build arguments based on their mathematical understanding. This article aims at describing the characteristics of students' comprehension in constructing a mathematical evidence. A qualitative approach is applied in this study, which involves third-year students of Mathematics Education Department at the state university in Banten. Interviews are conducted to find out and clarify how the students construct and build mathematical evidence. The result shows that the students' mathematical proof of comprehension can be classified into three types: holistic-global, partial-global, and partial-local. It is expected that the result of the study can be used as a source of consideration in determining appropriate learning strategies that can overcome students' difficulties in constructing a mathematical evidence.

Pemodelan Akreditasi SMK di Provinsi Banten dengan Menggunakan Logika Fuzzy Metode Mamdani Syamsuri Syamsuri; Indiana Marethi
Jurnal Matematika MANTIK Vol. 4 No. 1 (2018): Mathematics and Applied Mathematics
Publisher : Mathematics Department, Faculty of Science and Technology, UIN Sunan Ampel Surabaya

This article aims to describe an accreditation model of vocational schools in Banten province that accredited for 2009-2011 using method of Mamdani of fuzzy logic. The data used were obtained from Banten Accreditation Board for Schools/Madrasah (BAP-S/M), 275 expertise in vocational programs are accredited by the BAP-S/M Banten during 2009-2011. In the accreditation model using fuzzy logic assumes that: (1) there are strong correlation among content standards, process standards, competency standards, and assessment standards, so that we use score of process standards in modelling, (2) Standard educators and staff, as well as management standard strongly correlated, so that we choose educators, and (3) standards of infrastructure and financing have strong correlation, so that only one representing one standard, namely : standard of infrastructure. The model can be used in predicting the outcome of a vocational accreditation by just looking scores from the process standard, educators standard, and infrastructures standard. The resulting models have about 68% accuracy rate.

Description of Mathematical Connection Ability From Student Learning Styles In Online LearningUsing Discovery-Based Worksheets Ujang Suprianto; Aan Hendrayana; Syamsuri Syamsuri
Daya Matematis: Jurnal Inovasi Pendidikan Matematika Vol 8, No 2 (2020): Juli
Publisher : Universitas Negeri Makassar

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.26858/jdm.v8i2.14110

This study aims to determine the description of the mathematical connection ability of class XI MIPA students based on the learning styles of students of convergers, divergers, accommodators, and assimilators in online learning using discovery-based worksheets. This type of research is a qualitative descriptive study. The subjects of the study were the students of class XI MIPA SMAN 17 Pandeglang. Data collection is done through learning style questionnaires, tests of mathematical connection abilities, and interviews. All students of class XI MIPA were identified by the type of learning style using the Kolb learning style questionnaire. Data about mathematical connection ability is analyzed with interview data. 8 students consisting of 2 students representing learning styles were selected to interview their mathematical connection abilities. Based on the analysis of the data obtained a description of the results of research that in general students of the type of converger, diverger, accomodator, and assimilator have good mathematical connection abilities. the assimilator type is rather weak on the indicator using the mathematical connection ability indicator. As for the type of accomodation learning style, it is rather weak in finding and understanding concepts in mathematical connection abilities. Students of the Converger learning style style and assimilator understand the material by reading and observing in the ongoing learning while students of the Diverger learning style type and the accomodator understand the concepts in general by following the learning process in progress and actively trying to try in working on the discovery-based worksheets.

Understanding on Strategies of Teaching Mathematical Proof for Undergraduate Students Syamsuri Syamsuri; Indiana Marethi; Anwar Mutaqin
Jurnal Cakrawala Pendidikan CAKRAWALA PENDIDIKAN EDISI JUNI 2018, TH.XXXVII, NO.2
Publisher : LPMPP Universitas Negeri Yogyakarta

Abstract: Many researches revealed that many students have difficulties in constructing proofs. Based on our empirical data, we develop a quadrant model to describe students’ classification of proof result. The quadrant model classifies a students’ proof construction based on the result of mathematical thinking. The aim of this article is to describe a students’ comprehension of proof based on the quadrant model in order to give appropriate suggested learning. The research is an explorative research and was conducted on 26 students majored in mathematics education in public university in Banten province, Indonesia. The main instrument in explorative research was researcher itself. The support instruments are proving-task and interview guides. These instruments were validated from two lecturers in order to guarantee the quality of instruments.Based on the results, some appropriate learning activities should be designed to support the students’ characteristics from each quadrant, i.e: a hermeneutics approach, using the two-column form method, learning using worked-example, or using structural method.Keywords:proof, proving learning, undergraduate, quadrant model Memahami Strategi Pengajaran Pembuktian Matematis di Perguruan TinggiAbstrak: Banyakpeneliti pendidikan matematika menyatakan bahwa siswa mengalami kesulitan dalam mengonstruksi bukti. Berdasarkan kajian empiris, penulis membangun suatu model kuadran untuk mendeskripsikan kategori konstruksi bukti yang dibangun siswa. Model kuadran tersebut mengklasifikasikan konstruksi bukti berdasarkan cara berpikir matematis saiwa. Adapun tujuan dari artikel ini ialah mendeskripsikan pemahaman siswa dalam mengonstruksi bukti berdasarkan model kuadran serta memberikan saran strategi pembelajarannya. Penelitian ini merupakan penelitian eksploratif yang melibatkan 26 mahasiswa Jurusan Pendidikan Matematika pada universitas negeri di Provinsi Banten. Instrumen utama dalam penelitian eksploratif adalah peneliti sendiri. Instrumen pendukungnya ialah tugas pembuktian matematis dan panduan wawancara. Kedua instrumen pendukung tersebut telah divalidasi untuk menjamin kualitas instrumen yang digunakan. Hasil penelitian ini memberikan saran terkait aktivitas pembelajaran yang seharusnya dilakukan oleh pengajar agar sesuai dengan karakteristik berpikir siswa dalam mengonstruksi bukti pada masing-masing kuadran, misalnya : pendekatan heurmenistik, menggunakan metode dua-kolom, pembelajaran worked-example ataupun menggunakan metode terstruktur.Kata Kunci: bukti, pengajaran bukti, mahasiswa, model kuadran

Karakteristik Kemampuan Menyajikan Konsep Dalam Berbagai Bentuk Representasi Matematis Pada Siswa SMP Berdasarkan Teori Pirie dan Kieren Trisnanda Lady Utami; Syamsuri Syamsuri; Ihsanudin Ihsanudin
JEMS: Jurnal Edukasi Matematika dan Sains Vol 9, No 1 (2021)
Publisher : Universitas PGRI Madiun

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.25273/jems.v9i1.8580

Penelitian ini bertujuan untuk mendeskripsikan kemampuan menyajikan konsep dalam berbagai bentuk representasi matematis pada siswa SMP berdasarkan Teori Pirie dan Kieren. Jenis penelitian ini adalah penelitian deskriptif kualitatif. Subjek penelitian ini adalah siswa kelas VIII SMP Negeri 4 Kota Serang. Data dikumpulkan dengan metode tes dan wawancara. Hasil penelitian ini menunjukkan bahwa kemampuan menyajikan konsep dalam berbagai macam bentuk representasi matematis pada siswa SMP dapat diklasifikasikan menjadi tiga tipe jawaban yaitu: 1) tipe jawaban inventising (menemukan) di mana siswa sudah memenuhi lapisan pemahaman image having, formalising, observing, dan inventising, 2) tipe jawaban observing (mengamati) di mana siswa sudah memenuhi lapisan pemahaman image having, formalising, dan observing, dan 3) tipe jawaban formalising (memfromalkan) di mana siswa sudah memenuhi lapisan pemahaman image having dan formalising. This study aims to describe the ability to present concepts in various forms of mathematical representation in junior high school students based on Pirie-Kieren’s theory. This type of research is a qualitative descriptive study. The subjects of this research is VIII grade students of SMPN 4 Kota Serang. Data collected by test and interview methods. The results of this study indicate that the ability to present concepts in various forms of mathematical representation in junior high school students can be classified into three types of answers, namely: 1) the type of answer is inventising where students have fulfilled the layer of understanding: image having, formalising, observing, and inventising, 2) the type of answer is observing where students have fulfilled the layer of understanding: image having, formalising, and observing, and 3) the type of answer is formalising where students have fulfilled the layer of understanding: image having and formalising.

KARAKTERISTIK KECEMASAN SISWA SMA DALAM PEMBELAJARAN MATEMATIKA Yusuf Ramdani; Syamsuri Syamsuri; Aan Subhan Pamungkas
JPPM (Jurnal Penelitian dan Pembelajaran Matematika) Vol 15, No 1 (2022): JPPM (Jurnal Penelitian dan Pembelajaran Matematika) Volume 15 Nomor 1 Februari
Publisher : Universitas Sultan Ageng Tirtayasa

Kecemasan matematika adalah bentuk perasaan seseorang baik gugup, takut dan takut, cemas atau takut dalam menghadapi masalah matematika atau dalam melakukan pembelajaran matematika. Perkembangan gejala kecemasan matematika sangat mengkhawatirkan, sehingga pembelajaran matematika menjadi kurang efektif. Tujuan dari penelitian ini adalah untuk mendeskripsikan karakteristik kecemasan siswa SMA dalam pembelajaran matematika. Jenis penelitian ini adalah penelitian kualitatif. Subyek penelitian adalah siswa SMA. Teknik pengumpulan data dalam penelitian ini menggunakan observasi, wawancara, dan dokumentasi. Instrumen wawancara dimodifikasi dari instrumen Abbreviated Math Anxiety Scale (AMAS) yang terdiri dari 9 item soal dan 2 aspek kecemasan matematika. Data yang telah diperoleh akan dianalisis dengan menggunakan metode perbandingan tetap. Hasil penelitian menunjukkan bahwa terdapat karakteristik kecemasan matematika siswa SMA yang dapat dibagi menjadi 3 jenis; tipe cemas, tipe cemas dalam proses belajar, dan tipe cemas dalam evaluasi. Tipe cemas merupakan kategori kelompok yang terdiri dari mata pelajaran yang perlu diperhatikan. Tipe cemas dalam proses adalah kategori kelompok yang terdiri dari mata pelajaran yang dibutuhkan untuk cemas dalam proses pembelajaran matematika. Tipe cemas dalam evaluasi adalah kategori kelompok yang terdiri dari mata pelajaran yang cemas tentang aspek evaluasi matematis. Kata kunci: Kecemasan, Matematika, Proses Pembelajaran, Evaluasi

Co-Authors A Rizal Heru Cahya Aan Hendrayana Aan Subhan Pamungkas Abdul Fatah Aidah Murdikah Anisa Amalia Annisa Annisa Anriani, Nurul Anwar Mutaqin Avianti Permata Yuniar Ayu Sri Astuti Cecep AHF Santosa Cecep Anwar Hadi Firdos Santosa Cecep Anwar HF Santosa Didi Suryadi Dilla Shafa Salsabila Dwi Rachmawati Eki Sutisna Ela Priastuti Mirlanda Ela Priastuti Mirlanda Etika Khaerunnisa, Etika Fachri Awami Gita Ayu Nengsih Heni Pujiastuti Heni Yunilda Hasibuan Hepsi Nindiasari Hepsi Nindiasari Hepsi Nindiasari Ihsanudin Ihsanudin Iir Amelia Iir Amelia Ila Hilyatul Aen Ilham Ariesandi Imam Gozali Indiana Marethi Kathrin Nur Wulandari Lia Fauzatu Solikhah Maman Fathurrohman Maretha Septiani Dwi Astutik Martin Martin Mia Aprilia Monica Sayuri Mu'minatu Fadhila Tohir Muhamad Hanafi Nanda Amelia Nissa Nivia Novaliyosi Novaliyosi Nuriah Nuriah Purwanto Purwanto Ralivia Suci Setianingrum Ramlan Rida B. Rizki Nugraha Shofiy Hanifah Siska Aitami Sri Apriatni Subanji Subanji Sufyani Prabawanto, Sufyani Sukirwan Sukirwan Sutihat Sutihat Syela Rizki Amelia Tita Puspitasari Tonnie Hari Nugraha Tony Sudaryana Trisnanda Lady Utami Ujang Suprianto Uyu Wahyudin Yani Setiani Yusuf Ramdani Yuyu Yuhana

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