eprintid: 21766 rev_number: 11 eprint_status: archive userid: 111 dir: disk0/00/02/17/66 datestamp: 2016-08-24 01:41:31 lastmod: 2016-08-24 07:32:53 status_changed: 2016-08-24 01:41:31 type: thesis metadata_visibility: show creators_name: FARIDA AMANATI, NIM. 12610050 title: MODEL MATEMATIKA PENYEBARAN PENYAKIT DEMAM CHIKUNGUNYA DENGAN DUA JENIS NYAMUK AEDES (AEDES AEGEPTY DAN AEDES ALBOPICTUS) ispublished: pub subjects: Matematika divisions: jur_mat full_text_status: restricted keywords: Chikungunya fever, mathematical model, basic reproduction ratio, equilibrium point, Rout-Hurwitz criterion note: Dr. Muhammad Wakhid Musthofa, M.Si., abstract: Chikungunya fever is a febrile disease transmitted the mosquito of infected Aedes aegypti and Aedes Albopictus. Treatment for chikungunya virus with only symptomatic treatment alone is only reducing symptoms such as fever given medicine for fever, joint pain symptoms. In this study, we study a mathematical model for Chikungunya fever in the presence of two species of mosquitoes Aedes based upon assumptions that have been made. In this model the resulting point of disease-free equilibrium and endemic, Basic reproduction ratio, the analysis of the stability of the model around the equilibrium point. The stability of the equilibrium point is explained in the analysis using Rout-Hurwitz criteria and numerically. Simulation can be given as a from of a model approach to to the parameter values are given as a form of checks. date: 2016-06-21 date_type: published pages: 100 institution: UIN SUNAN KALIJAGA YOGYAKARTA department: FAKULTAS SYARIAH DAN HUKUM thesis_type: skripsi thesis_name: other citation: FARIDA AMANATI, NIM. 12610050 (2016) MODEL MATEMATIKA PENYEBARAN PENYAKIT DEMAM CHIKUNGUNYA DENGAN DUA JENIS NYAMUK AEDES (AEDES AEGEPTY DAN AEDES ALBOPICTUS). Skripsi thesis, UIN SUNAN KALIJAGA YOGYAKARTA. document_url: https://digilib.uin-suka.ac.id/id/eprint/21766/1/12610050_BAB-I_IV-atau-V_DAFTAR-PUSTAKA.pdf document_url: https://digilib.uin-suka.ac.id/id/eprint/21766/2/12610050_BAB-II_sampai_SEBELUM-BAB-TERAKHIR.pdf