Open AccessHigher-Order Solutions of Coupled Systems Using the Parameter Expansion Method
Author(s) -
S. S. Ganji,
M. G. Sfahani,
S. M. Modares Tonekaboni,
Amin Moosavi,
D.D. Ganji
Publication year - 2009
Publication title -
mathematical problems in engineering
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.262
H-Index - 62
eISSN - 1026-7077
pISSN - 1024-123X
DOI - 10.1155/2009/327462
Subject(s) - oscillation (cell signaling) , nonlinear system , exact solutions in general relativity , approximation error , mathematics , order (exchange) , differential equation , linear approximation , orders of approximation , mathematical analysis , physics , genetics , finance , quantum mechanics , economics , biology
We consider periodic solution for coupled systems of mass-spring. Three practical cases of these systems are explained and introduced. An analytical technique called Parameter Expansion Method (PEM) was applied to calculate approximations to the achieved nonlinear differential oscillation equations. Comparing with exact solutions, the first approximation to the frequency of oscillation produces tolerable error 3.14% as the maximum. By the second iteration the respective error became 1/5th, as it is 0.064%. So we conclude that the first approximation of PEM is so benefit when a quick answer is required, but the higher order approximation gives a convergent precise solution when an exact solution is required
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