Comments on “A power series solution for vibration of a rotating Timoshenko beam”

Equations of motion for a rotating beam are developed based on the Timoshenko beam theory which includes the effects of rotary inertia and shear deformation. This leads to two variable-coefficient differential equations, for which only approximate solutions have been used in previous analyses. This

The governing equations for linear vibration of a rotating Timoshenko beam are derived by the d&Alembert principle and the virtual work principle. In order to capture all inertia e!ect and coupling between extensional and #exural deformation, the consistent linearization of the fully geometrically n

A power series solution is presented for the non-linear free vibration of beams with restrained ends. The analysis is based on transforming the time variable into an oscillating time which allows the motion of the beam, assumed to be periodic, to be expressed as a double power series that is converg