Four beautiful quadrature rules
Abstract
A framework is presented to compute approximations of an integral from a pair of companion rules and its associate rule. We show that an associate rule is a weighted mean of two companion rules. In particular, the trapezoidal (T) and Simpson (S) rules are weighted means of the companion pairs (L,R) and (T,M) respectively, with L the left rectangle, R the right rectangle and M the midpoint rules. As L,R,T and M reproduce exactly the number , we named them the four "{beautiful}" \ rules. For this example the geometrical interpretation of the rules suggest possible applications of the transcendental number in architectural design, justifying the attribute beautiful given to the mentioned rules. As a complement we consider other appropriate integrand functions , applying composite rules in order to obtain good approximations of , as shown in the worked numerical examples.
Keywords
Cite
@article{arxiv.1906.06124,
title = {Four beautiful quadrature rules},
author = {Mário M. Graça},
journal= {arXiv preprint arXiv:1906.06124},
year = {2019}
}
Comments
15 pages