You are here
Home > Applied

Applied mechanics and manufacturing technology : selected, by Ford Lumban Gaol; et al

By Ford Lumban Gaol; et al

Show description

Read Online or Download Applied mechanics and manufacturing technology : selected, peer reviewed papers of the 2011 International Conference on Applied Mechanics and Manufacturing Technology (AMMT 2011), August 4-7, 2011, Bali, Indonesia PDF

Best applied books

The Belousov-Zhabotinskii Reaction

In 1958 B. P. Belousov came across that the oxidation of citric acid via bromate within the presence of cerium ions doesn't continue to equilibrium methodically and uniformly, like so much chemical reactions, yet fairly oscillates with clocklike precision among a yellow and colorless nation. See Fig. eleven. 1, p.

The Relation of Theoretical and Applied Linguistics

The connection of theoretical and utilized linguistics has in recent times brought on numer­ ous debates. This quantity originated at one in every of them. The essence of many of the chapters, of them all other than Fraser's and Davies's, used to be really awarded on the around desk on "The Relationships of Theoretical and utilized Linguistics," prepared throughout the seventh international Congress of utilized Linguistics, held in Brus­ sels, in August 1984.

Extra resources for Applied mechanics and manufacturing technology : selected, peer reviewed papers of the 2011 International Conference on Applied Mechanics and Manufacturing Technology (AMMT 2011), August 4-7, 2011, Bali, Indonesia

Example text

The mechanical properties of NiTi-based shape memory alloys. Acta Met. 1981; 29:393-8. cn Keywords: Incompressible vulcanized rubber sealing ring; finite deformation; radial load; nonlinear periodic oscillation. Abstract. The oscillation problem is examined for a rectangular sealing ring composed of a class of transversely isotropic incompressible vulcanized rubber materials about radial direction, where the sealing ring is subjected to a suddenly applied radial load at its inner surface. A nonlinear ordinary differential equation that describes the radial motion of the sealing ring is obtained.

The principal stretches in this case are respectively given by r ( R, t ) r ( R, t ) (4) ,   , z  1 . R R In the absence of body force, the differential equation describing the radial symmetric motion of the rectangular rubber sealing ring is given by  2 r ( R, t ) ( rr (r , t )) 1 , (5)  [ rr (r , t )    (r , t )]  0 t 2 r r ( R, t ) W  p, (i  r , ) are the radial and circumferential stresses, where  0 is the material density,  ii  i i respectively, in which p represents the hydrostatic pressure of the impressible material.

06 It is obvious from the contrast between Table 2 and Table 1 that the natural frequency of α rotation mode decreases significantly, and the resonance frequency region is effectively avoided; decoupling degree of z translation mode is improved, and decoupling degree of α rotation mode decreases slightly, however it is more than 90% which meets decoupling requirement; decoupling degree of each other mode is improved either, and the purpose of optimization is achieved. 6 4 (a) 4 2 0 0 -2 -2 -4 -4 -6 -6 0 5 10 6 15 20 25 30 Frequency (Hz) 35 40 -8 2 2 0 0 -2 -2 -4 -4 -6 0 5 10 15 20 25 30 Frequency (Hz) 0 5 10 4 (c) 4 -6 (b) Pre-optimization Post-optimization 2 35 40 -8 15 20 25 30 Frequency (Hz) 35 40 (d) (a)Front mounting (b)Back mounting (c)Left mounting (d)Right mounting 0 5 10 15 20 25 30 Frequency (Hz) 35 40 Figure 4.

Download PDF sample

Rated 4.16 of 5 – based on 8 votes
Top