Ahmad Fadly Nurullah RasedeeMohammad Hasan Abdul SatharSiti Raihana HamzahNorizarina IshakTze Jin WongLee Feng KooSiti Nur Iqmal Ibrahim2024-05-292024-05-292021-03Rasedee, Ahmad & Abdul Sathar, Mohammad & Hamzah, Siti Raihana & Ishak, Norizarina & Wong, Tze Jin & Feng, Koo & Ibrahim, Siti Nur Iqmal. (2021). Two-Point Block variable order step size Multistep Method for Solving Higher Order Ordinary Differential Equations Directly. Journal of King Saud University - Science. 33. 101376. 10.1016/j.jksus.2021.101376.1018-364710.1016/j.jksus.2021.101376https://www.sciencedirect.com/science/article/pii/S1018364721000379https://www.scopus.com/record/display.uri?eid=2-s2.0-85102282614&origin=resultslist&sort=plf-f&src=s&sid=5dd71140b122bdd25de94ff4f05bf0b7&sot=b&sdt=b&s=TITLE-ABS-KEY%28Two-point+block+variable+order+step+size+multistep+method+for+solving+higher+order+ordinary+differential+equations+directly%29&sl=126&sessionSearchId=5dd71140b122bdd25de94ff4f05bf0b7https://oarep.usim.edu.my/handle/123456789/12265Volume 33, Issue 3The current research aims to provide a viable numerical method for solving difficult engineering and science problems which are in the form of higher order ordinary differential equations. The proposed method approximates these ordinary differential equations using Newton-Gregory backward difference polynomial in predictor–corrector mode. The predictor–corrector algorithm is then fitted with a variable order step size algorithm to reduce computational cost. The variable order stepsize algorithm allows the method to predetermine the preferred level of accuracy with the added advantage of less computational cost. The method is subsequently programmed with a two-point block formulation which can be altered for parallel programming. This research also discusses order and stepsize strategies of the variable order stepsize algorithm. Stability and convergence estimations of the method are also established. Numerical results obtained will validate the accuracy and efficiency of the method using various types of linear and nonlinear higher order ordinary differential equationsen-USOrdinary differential equations, Block, Multistep method, Variable order step sizeTwo-Point Block Variable Order Step Size Multistep Method for Solving Higher Order Ordinary Differential Equations DirectlyArticle111333