|XXXVII Workshop on Geometric Methods in Physics||1-7.07.2018|
|VII School on Geometry and Physics||25-29.06.2018|
ibikunle albert idowu
Mathematical Analysis Of Simple Supported Euler-Bernoulli Beam On A Variable Elastic Foundation Under A Partially Distributed Moving Load.
The dynamic responses of an elastically supported Euler- Bernoulli beam on variable elastic foundation under partially distributed moving loads were investigated. The governing equation is fourth order partial differential equation, which was reduced to second order ordinary differential equation by using analytical method in terms of series solution and solved by numerical method using mathematical software (Maple). The numerical analysis shows that the response amplitude of the moving mass and moving force for variable pre-stressed increase as mass of the load M increases. It was found that the response displacement of the beam decrease as the value of the elastic foundation K increases. Also, the response displacement of the beam decrease as the value of the pre-stressed N increase. Comparison of moving mass and moving force shown that moving mass is greater than that of moving force
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