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All Journal Pythagoras: Jurnal Matematika dan Pendidikan Matematika JURNAL MATEMATIKA STATISTIKA DAN KOMPUTASI Jurnal Edukasi Universitas Jember KADIKMA CAUCHY: Jurnal Matematika Murni dan Aplikasi Saintifika Jurnal Riset Pendidikan Matematika Jurnal Daya Matematis Prosiding Seminar Matematika dan Pendidikan Matematik AdMathEduSt: Jurnal Ilmiah Mahasiswa Pendidikan Matematika Desimal: Jurnal Matematika BAREKENG: Jurnal Ilmu Matematika dan Terapan Al-Khwarizmi: Jurnal Pendidikan Matematika dan Ilmu Pengetahuan Alam Jurnal Matematika UNAND Jurnal Riset Pendidikan dan Inovasi Pembelajaran Matematika (JRPIPM) JURNAL AXIOMA : Jurnal Matematika dan Pembelajaran JPKMI (Jurnal Pengabdian Kepada Masyarakat Indonesia) Alifmatika: Jurnal Pendidikan dan Pembelajaran Matematika Majalah Ilmiah Matematika dan Statistika (MIMS) Jurnal Diferensial SCIENCE : Jurnal Inovasi Pendidikan Matematika dan IPA Pattimura Proceeding : Conference of Science and Technology CGANT JOURNAL OF MATHEMATICS AND APPLICATIONS Edumatica: Jurnal Pendidikan Matematika Pancaran Pendidikan SAINTIFIKA Engagement: Jurnal Pengabdian Kepada Masyarakat Limits: Journal of Mathematics and Its Applications International Journal of Computing Science and Applied Mathematics-IJCSAM
Susi Setiawani
Universitas Jember
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NILAI KETAKTERATURAN TOTAL SISI DARI GRAF TUNAS KELAPA A, Moch. Zaenal; Slamin, S; Setiawani, Susi
Kadikma Vol 5 No 3 (2014): Desember 2014
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v5i3.1370

Abstract

Abstract. A total edge irregular labeling on a graph G which has |E| edges and |V| vertices is an assignment of positive integer number as labels to both vertices and edges so that the weights calculated at every edges are distinct. The weight of an edge xy in G is defined as the sum of the label of xy and the labels of two vertices x and y, that is w(xy) = (x)+ (xy)+ (y). The total edge irregularity strength of G, denoted by tes(G), is the smallest positive integer k for which G has an edge-irregular total k-labelling. In this paper, we determine the exact value of the total edge (vertex) irregularity strength of Coconut Sprout Graph (CRn,m) and the union of isomorphic and non-isomorphic Coconut Sprout Graph. Key Words : total edge irregular labeling, total edge irregularity strength, coconut sprout graph.
PROSES BERPIKIR SISWA AUTIS DALAM MENYELESAIKAN SOAL KONTEKTUAL MATEMATIKA DILIHAT DARI TEORI SURYABRATA Setiawani, Susi; Hobri, Hobri; Wibowo, Hendrik Cahyo
Kadikma Vol 8 No 2 (2017): Agustus 2017
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v8i2.6072

Abstract

Abstract: The purpose of this research is to descripbe about autistic students’ thinking process in solving contextual problem standards based on Suryabrata teory’. The data by giving test contextual mathematic problem which integers operations subject. Problem given to autistic students of class VIII SMPLB TPA Jember, amounting to four students. Problem given first validated by 2 doses of mathematics education and 1 math teacher SMPLB TPA Jember. . Data analysis can be observed from students’ work sheet. Student’s answers analyzed according to the components of Suryabrata Teory’. Suryabrata teory’ consists of three components which are (1) forming understanding; (2) forming opinion; (3) drawing conclusion. The results of this study is, autistic students tend to meet the second component of the theory Suryabrata. This is directly proportional to the theory that autistic students have exceptional ideas in solving a problem. Autistic students have difficulty in fulfilling the first and third components of the Suryabrata theory. This is directly proportional to the theory that autism students have difficulties in communication Keywords : Thinking Processes, Autistic students, Integers Operations
PENGEMBANGAN E-COMIC BERBANTUAN PIXTON PADA MATERI PROGRAM LINEAR DUA VARIABEL Hermawan, Lendi Ike; Hobri, H; Murtikusuma, Randi Pratama; Setiawani, Susi; Yudianto, Erfan
Kadikma Vol 9 No 2 (2018): Agustus 2018
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v9i2.9748

Abstract

Abstract. Learning media is a tool to deliver the materials to students during teaching and learning process. This study aims to develop e-comic learning media on linear program of two variable. The process of developing this learning media refers to the Thiagarajan model known as the 4-D model which consists of four stages, namely define, design, develop and disseminate. The results of the comic media validation included in the valid criteria with a correlation coefficient value was 0.91. Based on the trials that have been conducted in Class X-MIPA 4 MAN 1 Jember with a total of 24 students, the results of the use of instructional media including the level of practicality are categorized as good with a percentage was 91.2%. Then the effectiveness results of comic media based on cognitive, psychomoto, and affective aspects obtained effectiveness level of "Good" in all aspects. Cognitive aspects show a percentage of students who scored above the standard score was 75%. The percentage on the student observation sheet was 87% in the psychomotor aspect. The last aspect is affective with a percentage was 93.75%. Keywords: E-Comic, Learning media, Linear Program of Two Variable, Thiagarajan model
PENGEMBANGAN PERANGKAT PEMBELAJARAN MATEMATIKA BILINGUAL MELALUI MODEL PEMBELAJARAN BERBASIS MASALAH (PROBLEM BASED INSTRUCTION) PADA SUB POKOK BAHASAN PERSEGI PANJANG DAN PERSEGIKELAS VII Rahmawati, Evi; Hobri, H; Setiawani, Susi
Kadikma Vol 4 No 3 (2013): Desember 2013
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v4i3.1135

Abstract

Abstract.Problem Based Instruction is kind of learning model which introducing students to a real and meaningful problems. The phases of PBI are (1) orientating the students to a problem, (2) organizing the students to learn, (3) guiding the individual or group research, (4) developing and presenting the result, (5) analyzing and evaluating problem solving process. This research aims to develop the set of learning, such as syllabus, lesson plan, student book, student worksheet, and evaluation test by using Thiagarajan Model which consist of four steps such as define, design,develop, and disseminate. But this research just use the three of them, without disseminate step. SMP Negeri 3 Jember is elected as the research place. The coefficient validities of syllabus, lesson plan, student book, student worksheet, and evaluation test respectively are 0,975; 0,982; 0,984; 0,980; and 0,992. Since all of those coefficient more than 0,6, so we can conclude that the set of learning is valid and proper to be used. The reliability coefficient of evaluation test is 0,612717. Besides, the each item validity of evaluation test also showed a high number. There are five item problems where the coefficient validities of each number are 0,819533; 0,98036; 0,958226; 0,894288; and 0,960059. Key Words :Problem Based Instruction Learning Model, Thiagarajan, The Set of Learning, Validity, and Reliability.
PEMODELAN MATEMATIKA ALIRAN UDARA PADA BRONKUS AKIBAT PENYAKIT BRONKITIS KRONIS Permatasari, Devi; Fatahillah, Arif; Setiawani, Susi
Kadikma Vol 11 No 1 (2020): April 2020
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v11i1.17914

Abstract

Chronic bronchitis is a disease that attacks the respiratory tract and is one of the dangerous diseases that can cause death in the world. This study builds a mathematical model of airflow velocity in the bronchi due to chronic bronchitis which is influenced by mucus thickness and initial velocity. The type of research used is simulation research to find a picture of a simple system that will be manipulated or controlled to get an effect similar to the actual situation. The mathematical model is built on the reduction of the momentum equation and the mass continuity equation which is solved using the finite volume method and the QUICK discretization technique. The volume method is used because the fluid flow studied is O2 gas which is classified as unstructured. So by using the volume method, it will be easier to discretize to determine the values ​​that will be sought in the discretization process.
PEMODELAN MATEMATIKA ALIRAN UDARA PADA BRONKUS AKIBAT PENYAKIT ASMA BRONKIAL Madinda, Diah Putri; Fatahillah, Arif; Setiawani, Susi
Kadikma Vol 10 No 2 (2019): Agustus 2019
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v10i2.17397

Abstract

Bronchial asthma is a disease of the narrowing of the airways located in the human bronchi. One of the factors causing this narrowing is Particulate Matter 2.5. Particulate Matter 2.5 is a kind of particle with dust that can cause narrowing of the airways. These particles are very small, ie less than 2.5 micrometer and can enter the lungs. Mathematical modeling is a way of solving problems that describe a mathematical solution in the real world. Mathematical modeling can form a mathematical model that describes the flow of air on the bronchi due to bronchial asthma according to actual conditions and important influences in them. In this study formed a mathematical model of bronchial air flow due to bronchial asthma. Mathematical models are obtained from the momentum and mass equations which are solved using the finite volume method. Keywords: Asthma, Mathematical modeling, Finite volume
ANALISIS PROSES BERPIKIR KOMBINATORIK SISWA DALAM MENYELESAIKAN SOAL BARISAN DAN DERET PADA SISWA KELAS XI Setiawani, Susi; Wahyuni, Sri; Oktavianingtyas, Ervin
Kadikma Vol 9 No 1 (2018): April 2018
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v9i1.8421

Abstract

The process of combinatorial thinking is one type of thought process that learners must possess. The combinatorical thinking process provides systematic steps in problem solving. This study aims to determine the process of combining student thinking in solving the sequence and series problem. This research is descriptive research with qualitative research. The method used in this research is test and interview. The subject of this study consisted of four students from one classes. Four students represent each level in the combinatorial thinking process. The indicator of the combinatorial thinking process used Students are able to express the concepts of sequence and series, Students are able to explain what is known in the sequence and sequence. Students are able to change the sequence and series into the mathematical sentence. Students are able to write down what is asked in the matter of the line and series, Students are able to solve the problem of sequence and series until the solution or answer, Students are able to answer about the sequence of sequence and series using the concept of sequence and series, Students are able to describe the reason or cause of the answer. Level one students tend to be able to write down what is known and asked questions correctly, second-level students tend to be able to change the known and asked questions at level one with mathematical sentences. Students with level three tend to be able to do the matter with the calculations and concepts correctly, and Students with level four tend to be able to describe and explain the conclusions of the workmanship Keywords: thinking process, combinatorial thinking, sequence and series.
ANALISIS KEMAMPUAN KOMUNIKASI MATEMATIS DALAM MENYELESAIKAN MASALAH POKOK BAHASAN BANGUN DATAR SEGI EMPAT DITINJAU DARI KECERDASAN EMOSIONAL SISWA KELAS VIII-D SMP NEGERI 1 SUMBERMALANG Laksananti, Putri Meilinda; Setiawan, Toto' Bara; Setiawani, Susi
Kadikma Vol 8 No 1 (2017): April 2017
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v8i1.5268

Abstract

Abstract. Mathematical communication is the ability to reflect the understanding of mathematics in various forms whether it is oral, in the form of pictures, graphs and others. The indicators of mathematical communication ability used in this research are to understand the mathematical idea of ​​the problem given in written and oral form, to change the given problem into visual form, to reveal the strategy in solving the problem, to solve the problem using the strategy, to interpret the mathematical information in the different math representation. This study aims to analyze the ability of mathematical communication in solving the problem of quadrilateral topic in terms of students’ emotional intelligence of VIII-D in SMP Negeri 1 Sumbermalang. The type of this research is descriptive qualitative research with the subject of 6 students from VIII-D of SMP Negeri 1 Sumbermalang selected based on students' emotional intelligence. Methods of data collection in this study were questionnaires, written tests and oral tests. The results of analysis of student's mathematical communication ability based on emotional intelligence are found that students with higher emotional intelligence have better communication skill of math. Keywords: Mathematical communication, emotional intelligence, quadrilaterals.
PENGEMBANGAN PERANGKAT PEMBELAJARAN MATEMATIKA METODE GENIUS LEARNING DENGAN PENDEKATAN OPEN ENDED POKOK BAHASAN SISTEM PERSAMAAN LINIER DUA VARIABEL DI SEKOLAH MENENGAH PERTAMA (SMP) KELAS VIII SEMESTER GASAL Noviliya, Ira Noviliya; Setiawan, Toto Bara; Setiawani, Susi
Kadikma Vol 4 No 2 (2013): Agustus 2013
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v4i2.1041

Abstract

Abstract.Genius Learning method of Open Ended approach is a learning that creates a positive and conducive in learning process. So, the student can improve their logical thinking and creative thinking.The research aims to know the process and resultof Development ofMathematics Learning MaterialsBased on Genius Learning Method with Open Ended Approach for Linier Equation System in Two Variable of Junior High School at Eight Grade of Odd Semester.The development of learning materials refers toThiagarajan, Semmel and Semmel Model ( 4-D Model). The product of the research are lesson plan, student book, worksheet, and evaluation test. This product has been implemented in learning of Genius Learning Method with Open Ended in all of learning sets. Based on validation process and tryout the learning sets can be concluded that the learning sets had been appropriate with validate, practice, and effective criteria. Key Words: Genius Learning Method, Open Ended Approach,Linier Equation System in Two Variable, 4-D Model.
PROFIL SISWA MEMAHAMI KONSEP BARISAN DAN DERET BERDASARKAN TAHAP BELAJAR DIENES DI KELAS IX-C SMP NURIS JEMBER Nurfadilah, Nurfadilah; Suharto, Suharto; Setiawani, Susi
Kadikma Vol 7 No 1 (2016): April 2016
Publisher : Department of Mathematics Education , University of Jember

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.19184/kdma.v7i1.5466

Abstract

Abstract. This study aims to describe the students understanding in concept of sequence and series based on the Dienes learning stage in class IX-C SMP Nuris Jember. Type of this research is descriptive research with qualitative approach. The subjects in this study were 35 students of class IX-C who have completed the question oftest understanding, then selected 8 students as representatives of each category to be interviewed that is 2 students with an understanding of the concept of high, 3 students with an understanding of the concept of medium, and 3 students with an understanding of the concept of low. Data analysis based on test and interview. Students with an understanding of the concept of high tend to fulfill all stages on arithmetic and geometry sequence. But on the arithmetic and geometry series tend to fulfill 5 stages. Students with an understanding of the concept of medium tend to fulfill 4 stages and only 1 indicator for fifth stage. Students with an understanding of the concept of low tend to fulfill 4 stages in sequence and series arithmetic, and fulfill 2 stages of the sequence and series geometry. Keywords : Sequence and Series, Understanding The Concept, Dienes Learning Stage.
Co-Authors Abdurrahman Salim Afifah, Ngizatul Agnes Ika Nurvitaningrum, Agnes Ika Agustin, Nurul wahyu Ambarwati, Reza Anggraini, Azza Liarista Angrenani, Arin Berliana Arianda, Tarisa Arif Fatahillah Arif Wicaksono Arika Indah Kristiana Arin Berliana Angrenani ArRuhimat, QurrotaA’yuniArRuhimat A’yuni Azza Liarista Anggraini CahyaPrihandoko, Antonius D. Dafik Devi Permatasari Dewi ANGGRAENI Dewy, Elitta P Dian Kurniati Dinawati Trapsilasiwi Dody Dwi Aprianto Edy Wihardjo Eka, Rizqi Erfan Yudianto Ervin Oktavianingtyas Evi Rahmawati Falih Hemi Wibisono Putra Fauziyah, Faridah Feri Widyawati, Yuli Ferry Kurnia Putra Firda, Jazilatul Hasan, Ayu Zulfiah Hendra Laksana, Priyo Dwi Hermawan, Lendi Ike Hidayatullah, Arfan Hobri Hossiyatur Robbah, Hossiyatur Ikram, Risnul Lailatul Indiyawati, Wiwik Ira Noviliya Noviliya Irma Khoirul Ummah, Irma Khoirul Kholifatur Rosyidah Kuswanti, Yayuk Laksananti, Putri Meilinda Lestari, Nurcholif Diah Sri Lioni Anka Monalisa, Lioni Anka Lusia Dewi Minarti Lusia Dewi Minarti M Daenasty Caezar Zahra Madinda, Diah Putri Manohara, Nalayuswasti Yatna Marie Afiani Mauhibatul Khoroid Maylisa, Ika Nur Megahnia Prihandini, Rafiantika Miftahul Jannah Moch. Zaenal A Mochammad Ulin Nuha Mochammad Ulin Nuha Mukharomah, Umi Latifah NAJIB, MOCHAMMAD IDFANI WAHIB Ngizatul Afifah Ni'mah, Anis Fitriatun Novian Nur Fatihah Nurfadilah Nurfadilah Nuroeni, Ilmiatun Nurul Hidayati Arifani, Nurul Hidayati Orel Revo Sackhi Usdelivian Pradista, Vyke Triawilly Pratiwi, Alfiani Dyah Pratiwi, Putri Indah Prisma Brilliana Putri, Inge Wiliandani Setya QurrotaA’yuniArRuhimat A’yuni ArRuhimat Rafiantika Megahnia Prihandini Rahayu, Diah Pujining Randi Pratama Murtikusuma Reza Mega Ardhilia Robiatul Adawiyah Robiatul Adawiyah Rohadatul Aisy, Fairuz Aufa S Slamin S Suharto S Sunardi Saddam Hussen Sandy, Perdana Arief Saranta, Nira Nityasa Selly Minalasari Septiyani Setyo Wulandari Setiawan, Totp' Bara Solly Aryza Sri Wahyuni Suci Rohmatul Hidayah, Suci Rohmatul Suharto Suharto Sunardi Sunardi Suryandari, Nurlayli Dewi Susanto Susanto Syafitriyah, Dini Theriq Azis Al Husein Topa, Siti Il Toto Bara Setiawan Ulfa Amalia Febriyanti, Ulfa Amalia Ulul Azmi umul husna Wardani, Putu Liana Wibowo, Hendrik Cahyo Widhaning, U'ul Ulinuha Rahajeng WIHARDJO, EDY Yunta, Girlyas Rasta