Free Vibrations Of Beams With Elastically Mounted Masses

The present writer wishes to compliment the authors for their elegant solution to the problem of vibrating Bernoulli-Euler beams with an elastic support carrying elastically or rigidly attached masses [1]. The writer wishes to point out that free vibrations of Timoshenko beams carrying elastically

The natural frequencies and the corresponding mode shapes of a uniform cantilever beam carrying ''any number of'' elastically mounted point masses are determined by means of the analytical-and-numerical-combined method (ANCM). One of the key points for the present method is to replace each spring-ma

An exact solution of the title problem is presented. The overall situation is of great interest in many engineering applications. Three combinations of boundary conditions for the structural element are considered: simply supported, simply supported - clamped and clamped at both ends. An analysis of

The effects of a transverse open crack on the modal frequency parameters of stationary shafts carrying elastically mounted end masses are presented. Dimarogonas' crack model has been considered in the problem formulation. This is a \(2 \times 2\) local flexibility matrix with coupling terms. Most of

This study presents a novel method to analyze the vibration of an elastically mounted concentrated mass supported on the joint of symmetrically crossed beams with #exible foundation. Analytical and exact solutions of the free and forced vibration responses of the system are also derived. Herein, the