| Articolul precedent |
| Articolul urmator |
 |
 449 0 |
 SM ISO690:2012SHTATSKAYA, Natalia, KHADZHI, Peter. Geometric nonlinearity of the spring pendulum. In: Materials Science and Condensed Matter Physics, Ed. 8-th Edition, 12-16 septembrie 2016, Chişinău. Chişinău: Institutul de Fizică Aplicată, 2016, Editia 8, p. 80. ISBN 978-9975-9787-1-2. |
| EXPORT metadate: Google Scholar Crossref CERIF DataCite Dublin Core |
| Materials Science and Condensed Matter Physics Editia 8, 2016 |
||||||
|
Conferința "International Conference on Materials Science and Condensed Matter Physics" 8-th Edition, Chişinău, Moldova, 12-16 septembrie 2016 | ||||||
|
||||||
| Pag. 80-80 | ||||||
|
||||||
 Descarcă PDF |
||||||
| Rezumat | ||||||
It is well known that the linear spring pendulum can oscillate with the constant frequency, which is determined by the mass m of the body and the linear characteristic k of the spring. The oscillations are observed along the spring axes. The period of oscillations does not depend on the initial displacement and velocity of body. The displacement and velocity of the spring pendulum depend on the initial conditions. These peculiarities take place only in the case of longitudinal displacements. |
||||||
|
|
|
|
