Analysis of Steady Impact Vibration in Continuous System Having an Attached Mass (The Case Where Both Ends Supported Beam Collides to an Unsymmtric Face)

Abstract

This paper deals with impact vibration in continuous system excited by periodic displacement with arbitrary functions. The analytical model is steady impact vibration in both ends supported beam having an attached mass, which collides elastically to an unsymmetric faces. In order to clarify the main resonance of the system subjected to excitation by displacement, the resulting vibrations are analyzed by applying the Fourier series method to this system. Following these theoretical analyses, numerical calculations are performed, and the resonance curves are made by using the resulting vibrations. The numerical results are in a fairly good agreement with the experimental ones.