THE NATURAL FREQUENCIES AND MODE SHAPES OF A UNIFORM CANTILEVER BEAM WITH MULTIPLE TWO-DOF SPRING–MASS SYSTEMS

For a beam carrying n spring}mass systems, if the left side and right side of each attaching point and each end of the beam are regarded as nodes, then considering the compatibility of deformations and the equilibrium of forces between the two adjacent beam segments at each attaching point and incor

An analytical solution is presented for the natural frequencies, mode shapes and orthogonality condition, of a free}free beam with large o!-set masses connected to the beam by torsion springs. Results are given for a range of masses with various "xed orientations and the validity of the method is co

The eigenvalues of a uniform cantilever beam carrying any number of spring}damper}mass systems with arbitrary magnitudes and locations were determined by means of the analytical-and-numerical-combined method (ANCM). First of all, each spring}damper}mass system was replaced by a massless e!ective spr

This paper deals with the derivation of the frequency equation of a special combined dynamic system. It consists of a clamped-free Bernoulli-Euler beam with a tip mass where a spring-mass system is attached to it. The derivation of the frequency equation is essentially carried out by means of the La

This paper deals with the approximate determination of the fundamental vibration frequency of a uniform cantilever beam with any number of mounted masses and restraining springs at various locations along the length of the beam. Numerical results are obtained by using a finite element technique. The