%0 Journal Article %T An eighth order frozen Jacobian iterative method for solving nonlinear IVPs and BVPs %A Alrehaili, Dina Abdullah %A Al-Maturi, Dalal Adnan %A Al-Aidarous, Salem %A Ahmad, Fayyaz %J Journal of Mathematics and Computer Science %D 2017 %V 17 %N 3 %@ ISSN 2008-949X %F Alrehaili2017 %X A frozen Jacobian iterative method is proposed for solving systems of nonlinear equations. In particular, we are interested in solving the systems of nonlinear equations associated with initial value problems (IVPs) and boundary value problems (BVPs). In a single instance of the proposed iterative method DEDF, we evaluate two Jacobians, one inversion of the Jacobian and four function evaluations. The direct inversion of the Jacobian is computationally expensive, so, for a moderate size, LU factorization is a good direct method to solve the linear system. We employed the LU factorization of the Jacobian to avoid the direct inversion. The convergence order of the proposed iterative method is at least eight, and it is nine for some particular classes of problems. The discretization of IVPs and BVPs is employed by using Jacobi-Gauss-Lobatto collocation (J-GL-C) method. A comparison of J-GL-C methods is presented in order to choose best collocation method. The validity, accuracy and the efficiency of our DEDF are shown by solving eleven IVPs and BVPs problems. %9 journal article %R 10.22436/jmcs.017.03.04 %U http://dx.doi.org/10.22436/jmcs.017.03.04 %P 378-399