Bezier Polynomials and its Applications with the Tenth and Twelfth Order Boundary Value Problems
Authors
Nazrul Islam
Abstract
The \u00a0aim \u00a0of \u00a0this \u00a0paper \u00a0is \u00a0to \u00a0apply \u00a0Galerkin \u00a0weighted \u00a0residual \u00a0method \u00a0for \u00a0solving \u00a0tenth \u00a0and
twelfth \u00a0order \u00a0linear \u00a0and \u00a0nonlinear \u00a0boundary \u00a0value \u00a0problems \u00a0(BVPs). \u00a0A \u00a0trial \u00a0function \u00a0is \u00a0assumed \u00a0which \u00a0is
made \u00a0to \u00a0satisfy \u00a0the \u00a0boundary \u00a0conditions \u00a0given, \u00a0and \u00a0used \u00a0to \u00a0generate \u00a0the \u00a0residual \u00a0to \u00a0be \u00a0minimized. \u00a0The
method \u00a0is \u00a0formulated \u00a0as \u00a0a rigorous matrix form. \u00a0To \u00a0investigate \u00a0the \u00a0effectiveness of \u00a0the method, \u00a0numerical
examples were considered which were compared with both the analytic solutions and the solutions obtained
by our method. It is observed that, the proposed method is very accurate, better, efficient and appropriate. All
problems are computed using the software MATLAB. \u00a0
