Geodesic
Torsion of a composite beam of rectangular cross-section consisting of $n$ isotropic media with interfaces parallel to one of the sides
Applications of Mathematics, Tome 15 (1970) no. 4, pp. 245-254
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In this paper the torsion problem of a composite beam of rectangular cross-section composed of $n$ different isotropic media with interfaces parallel to one side is solved adopting a procedure based on the use of Green's function for a composite body and Fourier sine transform. An example of a composite beam formed of three media is considered and dependence of the position of occurrence of maximum stress on the ration of rigidity moduli is observed.
In this paper the torsion problem of a composite beam of rectangular cross-section composed of $n$ different isotropic media with interfaces parallel to one side is solved adopting a procedure based on the use of Green's function for a composite body and Fourier sine transform. An example of a composite beam formed of three media is considered and dependence of the position of occurrence of maximum stress on the ration of rigidity moduli is observed.
DOI : 10.21136/AM.1970.103293
Classification : 73-35
Keywords: mechanics of solids 
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Ghosh, Basudev. Torsion of a composite beam of rectangular cross-section consisting of $n$ isotropic media with interfaces parallel to one of the sides. Applications of Mathematics, Tome 15 (1970) no. 4, pp. 245-254. doi: 10.21136/AM.1970.103293

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