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All Journal Epsilon: Jurnal Matematika Murni dan Terapan Desimal: Jurnal Matematika MEDIA BINA ILMIAH BAREKENG: Jurnal Ilmu Matematika dan Terapan JTAM (Jurnal Teori dan Aplikasi Matematika) Bubungan Tinggi: Jurnal Pengabdian Masyarakat Jurnal Abdimas Prakasa Dakara
Muhammad Ahsar Karim
Program Studi Matematika FMIPA Universitas Lambung Mangkurat
Arts Humanities Computer Science & IT Control & Systems Engineering Decision Sciences, Operations Research & Management Economics, Econometrics & Finance Education Energy Engineering Mathematics Mechanical Engineering Physics Social Sciences Transportation Other

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PREDIKSI JUMLAH PENDUDUK KALIMANTAN SELATAN MENGGUNAKAN METODE NONLINEAR LEAST-SQUARES Karim, Muhammad Ahsar; Yulida, Yuni
MEDIA BINA ILMIAH Vol 14, No 5: Desember 2019
Publisher : BINA PATRIA

Show Abstract | Download Original | Original Source | Check in Google Scholar | Full PDF (403.868 KB) | DOI: 10.33758/mbi.v14i5.390

Abstract

Dalam tulisan ini disajikan prediksi jumlah penduduk Kalimantan Selatan menggunakan model pertumbuhan logistik. Untuk memprediksi jumlah penduduk Kalimantan Selatan tersebut digunakan Metode Nonlinear Least-Squares untuk mengestimasi parameter-parameter yang mempengaruhi model. Pada model pertumbuhan logistik terdapat dua parameter yang mempengaruhi yaitu tingkat pertumbuhan dan daya tampung (Carrying Capacity). Penelitian ini dilakukan dalam tiga tahapan metode. Pertama, menentukan solusi model, kedua mengestimasi parameter tingkat pertumbuhan penduduk dan daya tampung penduduk Kalimantan Selatan dengan cara meminimumkan fungsi error yaitu antara data jumlah penduduk dan solusi model menggunakan Metode Nonlinear Least Squares. Ketiga melakukan prediksi jumlah penduduk Kalimantan Selatan untuk tahun-tahun mendatang. Berdasarkan hasil penelitian ini diperoleh  parameter hasil estimasi yaitu tingkat pertumbuhan penduduk Kalimantan Selatan sebesar 0,14055 per tahun dan daya tampung penduduk Kalimantan Selatan adalah 8.521.817 jiwa. Selanjutnya, disajikan prediksi jumlah penduduk Kalimantan Selatan untuk tahun-tahun mendatang menggunakan hasil estimasi parameter-parameter yang telah diperoleh. Hasil prediksi menunjukkan setiap tahun terjadi peningkatan jumlah penduduk dan peningkatan tersebut dari waktu kewaktu mendekati  daya tampung penduduk Kalimantan Selatan.
ESTIMASI PARAMETER PADA PERSAMAAN OSILATOR HARMONIK FUZZY: PERBANDINGAN SOLUSI HUKUHARA DIFERENSIAL DAN INKLUSI DIFERENSIAL FUZZY DENGAN MENGGUNAKAN METODE RUNGE-KUTTA DIPERLUAS Karim, Muhammad Ahsar
MEDIA BINA ILMIAH Vol 14, No 9: April 2020
Publisher : BINA PATRIA

Show Abstract | Download Original | Original Source | Check in Google Scholar | Full PDF (382.189 KB) | DOI: 10.33758/mbi.v14i9.503

Abstract

Most of the real systems in the world may contain uncertainties, which are possibly due to the limitations of available data, complexity of the network of systems, and environmental or demographic changes at the time of observation. One of the system behaviors that often appears in mathematical modeling is periodic behavior, which often shows complex dynamic behavior, depending on initial values and parameters. By accommodating the uncertainties in the model, in-depth studies are needed to describe mathematical structure, methodology for determining solution, and procedure for estimating parameters. Among the mathematical models that describe periodic behavior is harmonic oscillator equation. In this paper, the model is assumed to have uncertainty in the initial values in the form of fuzzy numbers, which is then called by fuzzy harmonic oscillator equation. The model is examined by comparing three fuzzy differential approaches, namely Hukuhara differential, generalized Hukuhara differential and fuzzy differential inclusions. Applications of fuzzy arithmetic concepts to the models lead to a deterministic alpha-cut systems, which are solved using extended Runge-Kutta method. In contrast to the standard Runge-Kutta method, the extended Runge-Kutta method using the first derivative approximation of the evaluation function to increase the accuracy of the solution. Among the three fuzzy approaches, the fuzzy differential inclusion type is the most appropriate approach to capture the periodic behavior of the equation. Next, it is shown how to estimate the parameters of solution of the fuzzy differential inclusion type and simulation of fuzzy data using lsqnonlin method.
MODEL MATEMATIKA SEIRD (SUSCEPTIBLE, EXPOSED, INFECTED, RECOVERED, DAN DEATH) UNTUK PENYEBARAN PENYAKIT ISPA Yulida, Yuni; Karim, Muhammad Ahsar
MEDIA BINA ILMIAH Vol 15, No 7: Februari 2021
Publisher : BINA PATRIA

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.33758/mbi.v15i7.1037

Abstract

In the last few decades, the Upper Respiratory Tract Infection has become one of the three leading causes of death and disability in the world, both in developing countries and in developed countries. In Indonesia, the trend of this disease continues to increase throughout 2016 - 2019 and in children it has caused 1 - 4 children under five to die every hour. In this study, the spread of this disease was modeled mathematically by using the SEIRD Model (Susceptible, Exposed, Infected, Recovered, and Death). Then, the equilibrium points of the model are determined, stability analysis is performed, and the model solution is determined using the Runge Kutta Method
ANALISIS KESTABILAN DAN SENSITIVITAS PADA MODEL MATEMATIKA SEIRD DARI PENYEBARAN COVID-19: STUDI KASUS DI KALIMANTAN SELATAN Karim, Muhammad Ahsar; Yulida, Yuni
MEDIA BINA ILMIAH Vol 16, No 5: Desember 2021
Publisher : BINA PATRIA

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.33758/mbi.v16i5.1478

Abstract

The cases of Covid-19 that occurred in South Kalimantan were classified into 5 groups, namely suspected, treated, recovered, deaths, and healthy population who were susceptible for being infected with Covid-19. The dynamics of changes in the number of cases in each group can be studied mathematically through epidemiological mathematical modeling. In this study, the SEIRD Model (Susceptible, Exposed, Infected, Recovered, and Deaths) was formed to describe the dynamics of changing the number of Covid-19 cases in South Kalimantan. In this model, stability analysis and formulation of indicators for the controllability of the spread of Covid-19 are given, known as the Basic Reproduction Number. Furthermore, a sensitivity analysis of the parameters contained in the Basic Reproduction Number is given to determine the priority efforts that can be made to suppress the spread of Covid-19 in South Kalimantan.
Analisa Kestabilan dan Solusi Pendekatan Pada Persamaan Van der Pol Yuni Yulida; Muhammad Ahsar Karim
JTAM (Jurnal Teori dan Aplikasi Matematika) Vol 3, No 2 (2019): October
Publisher : Universitas Muhammadiyah Mataram

Show Abstract | Download Original | Original Source | Check in Google Scholar | Full PDF (2719.307 KB) | DOI: 10.31764/jtam.v3i2.1084

Abstract

Abstrak: Di dalam tulisan ini disajikan analisa kestabilan, diselidiki eksistensi dan kestabilan limit cycle, dan ditentukan solusi pendekatan dengan menggunakan metode multiple scale dari persamaan Van der Pol. Penelitian ini dilakukan dalam tiga tahapan metode. Pertama, menganalisa perilaku dinamik persamaan Van der Pol di sekitar ekuilibrium, meliputi transformasi persamaan ke sistem persamaan, analisa kestabilan persamaan melalui linearisasi, dan analisa kemungkinan terjadinya bifukasi pada persamaan. Kedua, membuktikan eksistensi dan kestabilan limit cycle dari persamaan Van der Pol dengan menggunakan teorema Lienard. Ketiga, menentukan solusi pendekatan dari persamaan Van der Pol dengan menggunakan metode multiple scale. Hasil penelitian adalah, berdasarkan variasi nilai parameter kekuatan redaman, daerah kestabilan dari persamaan Van der Pol terbagi menjadi tiga. Untuk parameter kekuatan redaman bernilai positif mengakibatkan ekuilibrium tidak stabil, dan sebaliknya, untuk parameter kekuatan redaman bernilai negatif mengakibatkan ekuilibrium stabil asimtotik, serta tanpa kekuatan redaman mengakibatkan ekuilibrium stabil. Pada kondisi tanpa kekuatan redaman, persamaan Van der Pol memiliki solusi periodik dan mengalami bifurkasi hopf. Selain itu, dengan menggunakan teorema Lienard dapat dibuktikan bahwa solusi periodik dari persamaan Van der Pol berupa limit cycle yang stabil. Pada akhirnya, dengan menggunakan metode multiple scale dan memberikan variasi nilai amplitudo awal dapat ditunjukkan bahwa solusi persamaan Van der Pol konvergen ke solusi periodik dengan periode dua. Abstract: In this paper, the stability analysis is given, the existence and stability of the limit cycle are investigated, and the approach solution is determined using the multiple scale method of the Van der Pol equation. This research was conducted in three stages of method. First, analyzing the dynamic behavior of the equation around the equilibrium, including the transformation of equations into a system of equations, analysis of the stability of equations through linearization, and analysis of the possibility of bifurcation of the equations. Second, the existence and stability of the limit cycle of the equation are proved using the Lienard theorem. Third, the approach solution of the Van der Pol equation is determined using the multiple scale method. Our results, based on variations in the values of the damping strength parameters, the stability region of the Van der Pol equation is divided into three types. For the positive value, it is resulting in unstable equilibrium, and contrary, for the negative value, it is resulting in asymptotic stable equilibrium, and without the damping force, it is resulting in stable equilibrium. In conditions without damping force, the Van der Pol equation has a periodic solution and has hopf bifurcation. In addition, by using the Lienard theorem, it is proven that the periodic solution is a stable limit cycle. Finally, by using the multiple scale method with varying the initial amplitude values, it is shown that the solution of the Van der Pol equation is converge to a periodic solution with a period of two.
Belajar dari Rumah: Pelatihan Kompetisi Sains Nasional Tingkat SMP Bidang Matematika di Masa Pandemi Muhammad Ahsar Karim; Yuni Yulida; Muhammad Mahfuzh Shiddiq; Miftahul Jannah; Gian Septiansyah
Bubungan Tinggi: Jurnal Pengabdian Masyarakat Vol 4, No 1 (2022)
Publisher : Universitas Lambung Mangkurat

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.20527/btjpm.v4i1.4712

Abstract

Kegiatan Pengabdian pada Masyarakat ini berbentuk pelatihan online dan bertujuan untuk berbagi pengetahuan tentang teknis pelaksanaan, silabus, serta tips dan trik di dalam menyelesaikan soal-soal pada Kompetisi Sains Nasional (KSN) tingkat SMP di bidang Matematika. Kegiatan ini dilakukan selama dua hari pada bulan Juli tahun 2021. Peserta kegiatan ini adalah para guru matematika dan siswa-siswi di SMP IT Qardhan Hasana, Kota Banjarbaru, Provinsi Kalimantan Selatan, yang terdiri dari 3 orang guru matematika dan 74 orang siswa. Pelatihan ini berjalan lancar dan dapat menjadi solusi bagi sulitnya pelaksanaan kegiatan pelatihan KSN di sekolah di masa pandemi Covid-19. Metode yang digunakan diantaranya adalah ceramah, diskusi, dan latihan soal. Hasil kegiatan ini, pemateri memberikan teknik-teknik dalam menyelesaikan soal-soal KSN diantaranya adalah mencari pola, menggunakan variabel, melangkah mundur, dan menggunakan ilustrasi. Dari kegiatan ini, panitia mengidentifikasi 10 dari 74 orang siswa yang berbakat dan merekomendasikan ke pihak sekolah untuk dibina lebih lanjut untuk mengikuti KSN Bidang Matematika. Hal ini sesuai dengan ketentuan KSN tahun 2021, yaitu setiap sekolah diwakili maksimal 9 (sembilan) peserta. Setiap peserta hanya diperbolehkan mengikuti 1 (satu) bidang lomba dan setiap bidang lomba maksimal 3 (tiga) peserta. Selanjutnya, kegiatan ini dapat dimanfaatkan dan dikembangkan oleh para guru matematika di sekolah tersebut untuk melakukan pembinaan kepada para siswa di dalam menghadapi KSN bidang Matematika. Pihak SMP IT Qardhan Hasana mengharapkan agar kegiatan ini dapat dilaksanakan secara rutin setiap tahun dalam bentuk kerja sama antara pihak sekolah dengan pihak Program Studi Matematika FMIPA ULM. This Community Service activity is in the form of online training. It aims to share knowledge about technical implementation, syllabus, and tips and tricks in solving problems in the National Science Competition (NCS) for junior high school mathematics. This activity was carried out for two days in July 2021. Participants in this activity were mathematics teachers and students at SMP IT Qardhan Hasana, Banjarbaru City, Province of South Kalimantan, which consisted of 3 mathematics teachers and 74 students. This training ran smoothly and could be a solution to the difficulty of implementing KSN training activities in schools during the Covid-19 pandemic. The methods used include lectures, discussions, and practice questions. The results of this activity show that the presenters provide techniques for solving KSN questions, including looking for patterns, using variables, stepping back, and using illustrations. The committee identified 10 out of 74 gifted students from this activity and recommended the school be further nurtured to participate in KSN in Mathematics. This is following the provisions of the 2021 KSN, which is that each school is represented by a maximum of 9 (nine) participants. Each participant is only allowed to participate in 1 (one) competition field, and each competition field is a maximum of 3 (three) participants. Furthermore, this activity can be utilized and developed by mathematics teachers at the school to guide students in facing KSN in the field of Mathematics. The SMP IT Qardhan Hasana hopes that this activity can be carried out regularly every year in collaboration between the school and the Study Program of Mathematics, FMIPA ULM. 
ANALISA PELAKSANAAN NEW NORMAL DI KALIMANTAN SELATAN MELALUI MODEL MATEMATIKA SIRD Muhammad Ahsar Karim; Yuni Yulida
MEDIA BINA ILMIAH Vol 14, No 12: Juli 2020
Publisher : BINA PATRIA

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.33758/mbi.v14i12.666

Abstract

Mathematical models of epidemiology are very useful in studying the interrelationships among various epidemiological cases, conducting evaluations of efforts to deal with these cases, and preparing preventive actions and control of health problems in a population. One of the most popular models is SIR Model (Susceptible, Infectious, Recovered). Along with the rapid development in the field of epidemiology, the SIR Model has also undergone many modifications, one of which is the SIRD Model. The SIRD Model is modified for cases that explicitly separate Recovered and Deaths subpopulations. Since the positive case of Coronavirus Disease (Covid-19) was first confirmed in the Province of South Borneo on March 22, 2020, this outbreak has continued to increase significantly until the end of May 2020, exactly where the Large-scale Social Restrictions simultaneously ended throughout the region. The end of this restriction is the starting point for the start of 'New Normal' in South Kalimantan, which is called the New Life Order in the midst of the Covid-19 outbreak. In this study, an analysis was conducted to measure the implementation of the New Normal in South Borneo, as part of the evaluation material for the community and the local government on the implementation of the New Normal. Analysis was conducted using the SIRD Model and the data of Covid-19 in South Borneo in the period June 16 to July 17, 2020. The data showed an increase in the Attack Rate, which illustrates that the positive cases of Covid-19 in South Borneo are still experiencing an increase. The data also shows an increase in the Case Recovery Rate and a decrease in the Case Fatality Rate, which indicates that efforts to accelerate the handling of Covid-19 cases in South Borneo have given positive results. On the other hand, the parameter estimation process of the SIRD Model produces a Basic Reproduction Number of 2 and an Effective Reproductive Number of 1.82. Both of these numbers indicate that the transmission of Covid-19 in South Borneo is still out of control and it is estimated that the high transmission will still occur until the end of August 2020
PEMODELAN MATEMATIKA PENYEBARAN COVID-19 DI PROVINSI KALIMANTAN SELATAN Yuni Yulida; Muhammad Ahsar Karim
MEDIA BINA ILMIAH Vol 14, No 10: Mei 2020
Publisher : BINA PATRIA

Show Abstract | Download Original | Original Source | Check in Google Scholar | Full PDF (374.648 KB) | DOI: 10.33758/mbi.v14i10.572

Abstract

Mathematical modeling in epidemiology has a very important role in the study of the dynamics of an epidemic. The outbreak of Covid-19, which is currently being spread widely in the world requires in-depth study, starting from the search for sources, prediction of spread patterns, to strategies for handling this virus outbreak. Mathematical modeling can be applied to support various fields of the study. In this paper, we discuss mathematical modeling of the spread of Covid-19 by providing analysis and predictions based on data from the case of Covid-19 in South Kalimantan Province. This study was conducted by estimating parameters of the SIR Model, which is accommodates the death cases in the data, supported by several methods, namely Runge Kutta Method and Nonlinear Least Squares Method. Our analysis to the data and the model yields a Basic Reproduction Number , which means that one individual infected by Covid-19 can produce three new infected individuals. Whereas our prediction shows that infected cases can reach to 37.82% and cases of death can reach to 0.49% of the population who remained in normal activities during the PSBB. The peaks of this case are estimated to occur in the 2nd week of August to the 1st week of October 2020. The fewer people who have normal activities, then the spread of Covid-19 is predicted to pass faster with smaller cases of infection and death. Conversely, the more people who have normal activities, then the spread of Covid-19 in South Kalimantan can take longer and take a higher number of victims.
Analysis of stability and bifurcation in logistics models with harvesting in the form of the holling type III functional response Yuni Yulida; Firman Nurrobi; Faisal Faisal; Muhammad Ahsar Karim
Desimal: Jurnal Matematika Vol 5, No 1 (2022): Desimal: Jurnal Matematika
Publisher : Universitas Islam Negeri Raden Intan Lampung

Show Abstract | Download Original | Original Source | Check in Google Scholar | Full PDF (403.496 KB) | DOI: 10.24042/djm.v5i1.11828

Abstract

The logistic model can be applied in the field of biological studies to investigate population growth problems and some important aspects of the ecological situation. This model is a growth model with a limited population growth rate, and ecologists describe this rate as carrying capacity. Carrying capacity can be interpreted as the ideal population size, where individuals in the population can live properly in their environment. The growth rate of a population can be influenced by the harvesting factor, in this case, it is assumed that harvesting is not constant. The effect of the harvest on the growth rate can be analyzed mathematically by using the Holling type III functional response. In this paper, describe the formation of a logistic model taking into account the effects of harvesting, using the Holling type III functional response. Then,  perform a nondimensional process in the model, namely simplifying a model that has four parameters to a model that only has two parameters. Next, determine the equilibrium point of the model, perform a stability analysis at that equilibrium point, and investigate the possibility of bifurcation. As result, first obtained a logistic model which has two non-dimensional parameters, where one of the equilibrium points is zero and is unstable. Next, determine another equilibrium point through an implicit equation and investigate its stability through simulation. Finally, obtained two equilibrium points, which are fold bifurcation.
APLIKASI PERSAMAAN GELOMBANG UNTUK MENENTUKAN KARAKTERISTIK GELOMBANG SENAR GITAR YANG DIPETIK Yuni Yulida; Haidir Ahsana; Muhammad Mahfuzh Shiddiq; Muhammad Ahsar Karim
EPSILON: JURNAL MATEMATIKA MURNI DAN TERAPAN Vol. 15(2), 2021
Publisher : Mathematics Study Program, Faculty of Mathematics and Natural Sciences, Lambung Mangkurat

Show Abstract | Download Original | Original Source | Check in Google Scholar | Full PDF (746.422 KB) | DOI: 10.20527/epsilon.v15i2.4735

Abstract

Partial differential equations are often used to explain physical phenomena, one of which is the wave equation. One application of the wave equation is in plucked strings. This study describes the formation of a wave equation from guitar strings, determines the solution to the wave equation by using the variable separation method and certain boundary conditions and initial conditions, determines the amplitude of the wave, and simulates the movement of the wave based on the initial position of the plucked string. The result obtained is the wave equation of the guitar strings. When the string is plucked, the string will vibrate and produce a wave that can be formulated as a wave equation in the form of a homogeneous second order partial differential equation. The solution to this equation is in the form of a series. If given the initial conditions of plucking in the form of a function, then the amplitude of the wave is obtained. Simulations are given to see the movement of the amplitude and wave on the strings through three cases of the initial position of plucking the strings, namely: less than half, half, and more than half the length of the strings. The behavior of these amplitudes and waves is a characteristic or characteristic of the waves produced from a plucked guitar string
Co-Authors Alya Hanifah Arif Audinta Sakti Firmansyah Azkia Khairal Jamil Dewi Sri Susanti Faisal Faisal Faisal Faisal Farohatin Na'imah Firman Nurrobi Fitri Nor Annisa Gabriel Henokh Gultom Gian Septiansyah Gian Septiansyah Gita Sari Adriani Gusti Muhammad Rosyadi Haidir Ahsana mariyati mariyati Miftahul Jannah Miftahul Jannah Muhammad Mahfuzh Shiddiq Muhammad Mahfuzh Shiddiq Muhammad Mefta Eryshady Nor Hidayati Nurul huda Oni Soesanto Oni Soesanto Pardi Affandi Raihan Nooriman Riska Fitria Rizky Purnama Wulandari Yuni Yulida