Finite Difference Solution of Elastic-Plastic Thin Rotating Annular Disk with Exponentially Variable Thickness and Exponentially Variable Density | Zendy

Sanjeev Sharma | Zendy; Sanehlata Yadav | Zendy

Open Access

Finite Difference Solution of Elastic-Plastic Thin Rotating Annular Disk with Exponentially Variable Thickness and Exponentially Variable Density

Author(s) -

Sanjeev Sharma,

Sanehlata Yadav

Publication year - 2013

Publication title -

journal of materials

Language(s) - English

Resource type - Journals

eISSN - 2314-4874

pISSN - 2314-4866

DOI - 10.1155/2013/809205

Subject(s) - von mises yield criterion , exponential growth , materials science , mechanics , variable (mathematics) , mathematics , composite material , mathematical analysis , finite element method , physics , thermodynamics

Elastic-plastic stresses, strains, and displacements have been obtained for a thin rotating annular disk with exponentially variable thickness and exponentially variable density with nonlinear strain hardening material by finite difference method using Von-Mises' yield criterion. Results have been computed numerically and depicted graphically. From the numerical results, it can be concluded that disk whose thickness decreases radially and density increases radially is on the safer side of design as compared to the disk with exponentially varying thickness and exponentially varying density as well as to flat disk

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