PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA
Partial differential equations are differential equations containing one or more partial differential. Some differential equations may not be solved analytically. In this case, numerical solution are need. Finite element method is one of the numerical method can be used. This final project discussed...
Main Authors: | , |
---|---|
Format: | Thesis |
Published: |
[Yogyakarta] : Universitas Gadjah Mada
2014
|
Subjects: |
_version_ | 1797035695273934848 |
---|---|
author | , SITI AMINATUR RODHIYAH , Dr. Sumardi, M.Si. |
author_facet | , SITI AMINATUR RODHIYAH , Dr. Sumardi, M.Si. |
author_sort | , SITI AMINATUR RODHIYAH |
collection | UGM |
description | Partial differential equations are differential equations containing one or
more partial differential. Some differential equations may not be solved analytically.
In this case, numerical solution are need. Finite element method is one of the
numerical method can be used.
This final project discussed about second order partial differential equation
of two-dimensional elliptic type using finite element method. Its application can be
found in heat transfer problem in a steady state. Furthermore, we give the analytic
solution of second order partial differential equation of two-dimensional elliptic
type for comparing the numeric solution or approach solution with the analytic solution.
xvii |
first_indexed | 2024-03-13T23:34:46Z |
format | Thesis |
id | oai:generic.eprints.org:131977 |
institution | Universiti Gadjah Mada |
last_indexed | 2024-03-13T23:34:46Z |
publishDate | 2014 |
publisher | [Yogyakarta] : Universitas Gadjah Mada |
record_format | dspace |
spelling | oai:generic.eprints.org:1319772016-03-04T08:12:47Z https://repository.ugm.ac.id/131977/ PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA , SITI AMINATUR RODHIYAH , Dr. Sumardi, M.Si. ETD Partial differential equations are differential equations containing one or more partial differential. Some differential equations may not be solved analytically. In this case, numerical solution are need. Finite element method is one of the numerical method can be used. This final project discussed about second order partial differential equation of two-dimensional elliptic type using finite element method. Its application can be found in heat transfer problem in a steady state. Furthermore, we give the analytic solution of second order partial differential equation of two-dimensional elliptic type for comparing the numeric solution or approach solution with the analytic solution. xvii [Yogyakarta] : Universitas Gadjah Mada 2014 Thesis NonPeerReviewed , SITI AMINATUR RODHIYAH and , Dr. Sumardi, M.Si. (2014) PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA. UNSPECIFIED thesis, UNSPECIFIED. http://etd.ugm.ac.id/index.php?mod=penelitian_detail&sub=PenelitianDetail&act=view&typ=html&buku_id=72491 |
spellingShingle | ETD , SITI AMINATUR RODHIYAH , Dr. Sumardi, M.Si. PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA |
title | PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA |
title_full | PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA |
title_fullStr | PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA |
title_full_unstemmed | PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA |
title_short | PENYELESAIAN PERSAMAAN DIFERENSIAL PARSIAL ELIPTIK DIMENSI DUA MENGGUNAKAN METODE ELEMEN HINGGA |
title_sort | penyelesaian persamaan diferensial parsial eliptik dimensi dua menggunakan metode elemen hingga |
topic | ETD |
work_keys_str_mv | AT sitiaminaturrodhiyah penyelesaianpersamaandiferensialparsialeliptikdimensiduamenggunakanmetodeelemenhingga AT drsumardimsi penyelesaianpersamaandiferensialparsialeliptikdimensiduamenggunakanmetodeelemenhingga |