| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 778043 | European Journal of Mechanics - A/Solids | 2013 | 7 Pages |
Out-of-rotation plane bending vibrations of a rotating tapered beam with periodically varying speed are considered. The integro-partial differential equation of the beam is discretized via Galerkin's method and a set of ordinary differential equations with periodic coefficients (Mathieu–Hill type equations) is obtained. Dynamic stability of this parametrically excited system is studied via a monodromy matrix method, the effect of taper ratio on the stability of the system is examined and the results are presented in the form stability charts.
► The stability of out-of-plane bending vibrations of a rotating tapered beam with periodically varying speed is considered. ► The equation of motion is discretized via Galerkin's method and a set of Mathieu–Hill type equations is obtained. ► The effect of taper ratio on the stability is examined via a monodromy matrix method. ► Instability increases with increasing the taper ratio.
