SQUEEZE FILM-BEARING THROUGH DIFFERENT POROUS CONSTRUCTIONS: ASSOCIATION OF CHANGED MODELS
Main Article Content
Abstract
Squeeze film geometry of truncated cone. Lower porous plate squeeze film orientation of various shapes (annular, round, elliptic, rectangular and cone) utilizing Morgan-Cameron guess. The impacts of the state of plate and porosity on the bearing execution are determined. The ferrofluid based squeeze film for round and conical orientation. The attractive field considered was the transverse way of the fluid flow. Here, they have considered Shliomis model to tackle the issue since it dealt with pivot of the fluid particles just as fluid. The subsequent overseeing conditions are nonlinear coupled conditions and is comprehended utilizing annoyance strategy regarding dimensionless Brownian unwinding time parameter. The impact of attractive fluid parameters on different bearing attributes is examined numerically. This article examined porous truncated cone squeeze film-bearing model thinking about the impacts of porosity, penetrability, squeeze speed and slanted variable attractive field. Impacts of two porousness models-globular circle and narrow gaps are additionally talked about. Articulations for pressure and burden conveying capacity are acquired. The outcomes for dimensionless burden conveying capacity are figured.
Article Details
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
References
A. Kumar, D. Garg, P. Goel, Mathematical modeling and behavioural analysis of a washing unit in paper mill, International Journal of System Assurance Engineering and Management, 1(6), (2019), 1639-1645.
Kim, Y. S. (2015) “Unsteady free-convection interaction with thermal radiation in a boundary layer flow past a vertical porous plate”, Journal of Mathematical and Physical Sciences. Vol. 30 pp. 25 – 37. 3) Fung and Yih (2015) “The Effect of Slip Condition on Unsteady MHD Oscillatory Flow of a Viscous Fluid in a Planer Channel, Romanian Journal of Physics,Vol 52, No. 1-2,pp. 85-91. 4) Marble (2016) “ MHD flow of a viscoelastic fluid past a stretching surface, Acta Mechanica, Vol. 95, pp 227-230.
A. Kumar, D. Garg, P. Goel Sensitivity Analysis of a Cold Standby System with Priority for Preventive Maintenance, Journal of Advance and Scholarly Researches in Allied Education, 16(4), (2019), 253-258. 6) Mitra and Prasad (2015) “ Influence of Temperature Dependent Viscosity on the MHD couette Flow of Dusty Fluid with Heat Transfer”, Department of Mathematics, College of Science, Mumbai 7) Shastri and Vajravelu (2016) “ MHD flow between two parallel plates with heat transfer” Acta Mechanica117, pp. 215.