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Research Paper | Mathematics | India | Volume 5 Issue 8, August 2016
Centroidal Mean Derivative - Based Closed Newton Cotes Quadrature
T. Ramachandran [3] | R. Parimala
Abstract: In this paper, a new scheme of the evaluation of numerical integration by using Centroidal mean derivative - based closed Newton Cotes quadrature rule (CMDCNC) is presented in which the centroidal mean is used for the computation of function derivative. The accuracy of these numerical formulas are higher than the existing closed Newton Cotes quadrature (CNC) fromula. The error terms are also obtained by using the concept of precision. Comparisions are made between the existing closed Newton Cotes formula and the centroidal mean derivative - based closed Newton Cotes quadrature formula by using the numerical examples.
Keywords: Closed Newton-Cotes formula, Error terms, Centroidal mean derivative, Numerical examples, Numerical integration
Edition: Volume 5 Issue 8, August 2016,
Pages: 338 - 343
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Pages: 1117 - 1123A Deterministic Inventory Model for Non-Instantaneous Deteriorating Items with Allowed Backorders and Quadratic Time Varying Holding Cost
Teekam Chand Meena [2] | Anil Kumar Sharma [5]
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Research Paper, Mathematics, Zambia, Volume 10 Issue 6, June 2021
Pages: 1376 - 1383Pell-Lucas Series Solution for Fredholm Integral Equations of the Second Kind
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