![](/images/graphics-bg.png)
Bernstein polynomials method for solving linear volterra integral equation of the second kind
Other Title(s)
طريقة متعددة حدود برنشتن لحل معادلة فولتيرة التكاملية الخطية من النوع الثاني
Author
Source
Engineering and Technology Journal
Issue
Vol. 28, Issue 17 (31 Jan. 2010), pp.5495-5501, 7 p.
Publisher
Publication Date
2010-01-31
Country of Publication
Iraq
No. of Pages
7
Main Subjects
Abstract AR
في هذا البحث استعملت طريقة متعددة حدود برنشتن لإيجاد الحل التقريبي لمعادلة فرولتيرا التكاملية من النوع الثاني.
و إن متعددات الحدود تستعمل بشكل كبير في الطرق الرياضية و ذلك لبساطة تعريفها.
و الحل بهذه الطريقة يتقارب بسرعة و خطوات قليلة.
و المثال العددي أعد ليوضح كفاءة و دقة هذه الطريقة.
Abstract EN
In this paper, Bernstein polynomials method are used to find an approximate solution for linear Volterra integral equation of the second kind.
These polynomials are incredibly useful mathematical tools, because they are simply defined.
It has been shown that the polynomial has a fast convergences with only few steeps.
Numerical example is prepared to illustrate the efficiency and accuracy of this method.
American Psychological Association (APA)
Ali, Halimah Suwaydan. 2010. Bernstein polynomials method for solving linear volterra integral equation of the second kind. Engineering and Technology Journal،Vol. 28, no. 17, pp.5495-5501.
https://search.emarefa.net/detail/BIM-262734
Modern Language Association (MLA)
Ali, Halimah Suwaydan. Bernstein polynomials method for solving linear volterra integral equation of the second kind. Engineering and Technology Journal Vol. 28, no. 17 (2010), pp.5495-5501.
https://search.emarefa.net/detail/BIM-262734
American Medical Association (AMA)
Ali, Halimah Suwaydan. Bernstein polynomials method for solving linear volterra integral equation of the second kind. Engineering and Technology Journal. 2010. Vol. 28, no. 17, pp.5495-5501.
https://search.emarefa.net/detail/BIM-262734
Data Type
Journal Articles
Language
English
Notes
Text in English ; abstracts in Arabic and English.
Record ID
BIM-262734