Exact and approximate analytic solutions of the nonlinear convective fin problem with temperature-dependent thermal conductivity

Lazhar Bougoffa; Samy Mziou; Randolph C. Rach

doi:10.1080/15502287.2016.1268219

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Exact and approximate analytic solutions of the nonlinear convective fin problem with temperature-dependent thermal conductivity

Journal article

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Exact and approximate analytic solutions of the nonlinear convective fin problem with temperature-dependent thermal conductivity

Lazhar Bougoffa, Samy Mziou and Randolph C. Rach

International journal of computational methods in engineering science and mechanics, Vol.18(2-3), pp.128-134

04/05/2017

DOI: https://doi.org/10.1080/15502287.2016.1268219

Abstract

Adomian decomposition method

exact solution

straight fin

temperature distribution

This article shows that the well-known nonlinear boundary value problem of the differential equation for temperature distribution of convective straight fins with temperature-dependent thermal conductivity is exactly solvable in an implicit form. Furthermore, an exact solution in an explicit form is derived. Also, an accurate analytic solution (series solution) is obtained by a new variation of the Adomian decomposition method.

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Title: Exact and approximate analytic solutions of the nonlinear convective fin problem with temperature-dependent thermal conductivity
Creators - without role: Lazhar Bougoffa - Imam Mohammad ibn Saud Islamic University
Samy Mziou - Imam Mohammad ibn Saud Islamic University
Randolph C. Rach - Applied Mathematics
Publication Details: International journal of computational methods in engineering science and mechanics, Vol.18(2-3), pp.128-134
Publisher: Taylor & Francis
Identifiers: 9916299408331
Academic Unit: Imam Mohammad Ibn Saud Islamic University (IMSIU)
Language: English
Resource Type: Journal article