Traducción y análisis de palabras por inteligencia artificial
En esta página puede obtener un análisis detallado de una palabra o frase, producido utilizando la mejor tecnología de inteligencia artificial hasta la fecha:
- cómo se usa la palabra
- frecuencia de uso
- se utiliza con más frecuencia en el habla oral o escrita
- opciones de traducción
- ejemplos de uso (varias frases con traducción)
- etimología
hyperbolic sphere - traducción al ruso
![The [[Pseudosphere]]. Each half of this shape is a hyperbolic 2-manifold (i.e. surface) with boundary.](https://commons.wikimedia.org/wiki/Special:FilePath/The Pseudosphere.jpg?width=200 "The [[Pseudosphere]]. Each half of this shape is a hyperbolic 2-manifold (i.e. surface) with boundary.")
математика
сфера в гиперболическом пространстве
![Roundest objects in the world created].](https://commons.wikimedia.org/wiki/Special:FilePath/Einstein gyro gravity probe b.jpg?width=200 "Roundest objects in the world created].")
![Deck of playing cards illustrating engineering instruments, England, 1702. [[King of spades]]: Spheres](https://commons.wikimedia.org/wiki/Special:FilePath/King of spades- spheres.jpg?width=200 "Deck of playing cards illustrating engineering instruments, England, 1702. [[King of spades]]: Spheres")
['sferik-{'sferik}(ə)l]
общая лексика
поплавковый
сферический
шаровидный
шаровой
шарообразный
прилагательное
общая лексика
шарообразный
сферический
небесный
относящийся к небесным телам
небесный (о знаках и т. п.; в астрологии)
сферический, шарообразный
математика
шаровой
математика
сферическая поверхность
Wikipedia
In mathematics, a hyperbolic manifold is a space where every point looks locally like hyperbolic space of some dimension. They are especially studied in dimensions 2 and 3, where they are called hyperbolic surfaces and hyperbolic 3-manifolds, respectively. In these dimensions, they are important because most manifolds can be made into a hyperbolic manifold by a homeomorphism. This is a consequence of the uniformization theorem for surfaces and the geometrization theorem for 3-manifolds proved by Perelman.
