Fibre Reinforced Concrete (FRC) can give us the ample, practical as well as parsimonious technique for defeating cracking in the concrete and comparable kind of inadequacies. The concrete is frail in tension so a few stages must be taken to be received to conquer this insufficiency. The strength of Human Hair fibre is more in tension consequently may be utilized very finely as a fibrous stuff in concrete to furnish it with the rigidity which it needs. Hair Fibre (HF) a substitute non-biodegradable material is accessible in plenitude and at an exceptionally modest expense. It likewise makes ecological issues for its decay, present examination has been embraced to ponder its impact on plain cement concrete taking the following into account;flexural strength, crushing strength, compressive strength and micro-cracking control for making the cement concrete more financial and also to lessen natural issues.
This paper focuses on the application of Radial Basis Functiongenerated Finite Difference method (RBF-FD) to solve Magnetohydrodynamic (MHD) flow equation in a rectangular duct in the presence of transverse external oblique magnetic field. Multiquadric (MQ) Radial Basis Functionis used to obtain the numerical solution of the MHD flow problem. Accuracy of the solution can be improved by varying the shape parameter in MQ function. The solution obtained from RBF-FD method is compared with analytical solution and classical Finite Differencesolution. Contours are presented for various Hartmann numbers with different grid sizes and directions of the applied magnetic field. The behavior of velocity and the magnetic field of the MHD flow has been studied using the contours.
This paper focuses on the application of Radial Basis Functiongenerated Finite Difference method (RBF-FD) to solve Magnetohydrodynamic (MHD) flow equation in a rectangular duct in the presence of transverse external oblique magnetic field. Multiquadric (MQ) Radial Basis Functionis used to obtain the numerical solution of the MHD flow problem. Accuracy of the solution can be improved by varying the shape parameter in MQ function. The solution obtained from RBF-FD method is compared with analytical solution and classical Finite Differencesolution. Contours are presented for various Hartmann numbers with different grid sizes and directions of the applied magnetic field. The behavior of velocity and the magnetic field of the MHD flow has been studied using the contours.