Simulation of Transverse Standing Waves

DOI: 10.4236/wjm.2014.48026   PDF   HTML     2,706 Downloads   3,320 Views  


Solutions of a hyperbolic partial differential equation in one dimension with appropriate initial and boundary conditions are conducive to standing waves. We consider practical initial deformations not reported in literature. Utilizing a Computer Algebra System such as Mathematica we put the formulation into action simulating the standing waves.

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Sarafian, H. (2014) Simulation of Transverse Standing Waves. World Journal of Mechanics, 4, 251-259. doi: 10.4236/wjm.2014.48026.

Conflicts of Interest

The authors declare no conflicts of interest.


[1] Farlow, S.J. (1982) Partial Differential Equations for Scientists and Engineers. Dover Publications Inc., New York.
[2] Halliday, D., Resnick, R. and Walker, J. (2011) Fundamentals of Physics. 9th Edition, Wiley, New York.
[3] Tippler, P. and Mosca, G. (2008) Physics for Scientists and Engineers. 6th Edition, Freeman and Company, New York.
[6] Rainville, E.D. (1964) Elementary Differential Equations. The Macmillan Company, New York.
[7] Wallace, P.R. (1984) Mathematical Analysis of Physics Problems. Dover Publications Inc., New York.
[8] Sokolnikoff, I.S. and Redheffer, R.M. (1966) Mathematics of Physics and Modern Engineering. 2nd Edition, McGrawHill, New York.
[9] Wolfram, S. (2012) Mathematica, a Computational Software Program Based on Symbolic Mathematics, V9.0.
[10] Kythe, P.K., Puri, P. and Schaferkotter, M.R. (2003) Partial Differential equations and Boundary Value Problems with Mathematica. 2nd Edition, Chapman and Hall/CRC, New York.

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