THE FREE VIBRATION OF THIN RECTANGULAR PLANFORM SHALLOW SHELLS WITH SLITS

The Ritz method with algebraic polynomials is used to present the first known natural frequencies for cantilevered shallow shells having triangular and trapezoidal planforms. Detailed convergence studies showed that relatively accurate results can be obtained. Comparisons with experimental and analy

A finite element method for free vibration analysis of generalized shallow shells is described. Results for natural frequencies of corner-supported hyperbolic paraboloidal, cylindrical and spherical shells are presented and compared with those of other investigators to establish the correctness of t

A "nite element analysis for free vibration behaviour of doubly curved sti!ened shallow shells is presented. The sti!ened shell element is obtained by the appropriate combinations of the eight-/nine-node doubly curved isoparametric thin shallow shell element with the three-node curved isoparametric

The writer wishes to compliment Professor Qatu on his interesting and useful paper [1]. In his summary it is suggested that the results presented are ''the first known natural frequencies for cantilevered shallow shells having triangular and trapezoidal planforms''. At the time of submission of the

In this paper, the non-linear vibration and dynamic instability of thin shallow spherical and conical shells subjected to periodic transverse and in-plane loads are investigated. The Marguerre type dynamic equations used for the analysis of shallow shells, when treated by the Galerkin method, will r

An analytical method is presented for the #exural vibration of rectangular thin plates with free boundary conditions. Based on the apparent elasticity method, the #exural vibration of a rectangular thin plate is reduced to two one-dimensional #exural vibrations of slender rods. Then the two-dimensio