Research Article Open Access

Hybrid Block Method for Direct Numerical Approximation of Second Order Initial Value Problems Using Taylor Series Expansions

Oluwaseun Adeyeye1 and Zurni Omar1
  • 1 Department of Mathematics, School of Quantitative Sciences, Universiti Utara Malaysia, Sintok, Kedah, Malaysia

Abstract

In this article, a hybrid block method is utilized for the numerical approximation of second order Initial Value Problems (IVPs). The rigor of reduction to a system of first order initial value problems is bypassed as the hybrid block method directly solves the second order IVPs. Likewise, the methodology utilized also avoids the cumbersome steps involved in the widely adopted interpolation approach for developing hybrid block methods as a simple and easy to implement algorithm using the knowledge from the conventional Taylor series expansions with less cumbersome steps is introduced. To further justify the usability of this hybrid block method, the basic properties which will infer convergence when adopted to solve differential equations are investigated. The hybrid block method validates its superiority over existing methods as seen in the improved accuracy when solving the considered numerical examples.

American Journal of Applied Sciences
Volume 14 No. 2, 2017, 309-315

DOI: https://doi.org/10.3844/ajassp.2017.309.315

Submitted On: 26 November 2016 Published On: 17 February 2017

How to Cite: Adeyeye, O. & Omar, Z. (2017). Hybrid Block Method for Direct Numerical Approximation of Second Order Initial Value Problems Using Taylor Series Expansions. American Journal of Applied Sciences, 14(2), 309-315. https://doi.org/10.3844/ajassp.2017.309.315

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Keywords

  • Hybrid Block Method
  • Second Order
  • Direct Methods
  • Initial Value Problems
  • Taylor Series