interosculate
简明释义
英[/ˌɪntəˈrɒskjʊleɪt/]美[/ˌɪntəˈrɒskjʊleɪt/]
vi. 接合;结合;具有共同性
第 三 人 称 单 数 i n t e r o s c u l a t e s
现 在 分 词 i n t e r o s c u l a t i n g
过 去 式 i n t e r o s c u l a t e d
过 去 分 词 i n t e r o s c u l a t e d
英英释义
To intersperse or interconnect; to connect or link together in a network. | 交错或相互连接;在网络中连接或链接在一起。 |
单词用法
同义词
| 互联 | 这两个网络互联以共享资源。 | ||
| 互链 | 这些小路互链,使得在该地区导航更为便利。 | ||
| 交织 | 他们的生活在会议上相遇时交织在一起。 |
反义词
| 分离 | The two companies decided to dissociate from each other after the merger failed. | 这两家公司在合并失败后决定相互分离。 | |
| 脱离 | It's important to detach your emotions from the decision-making process. | 在决策过程中,重要的是要将情感与之脱离。 |
例句
1.The cultures of the two nations started to interosculate through trade and travel.
这两个国家的文化通过贸易和旅行开始相互交融。
2.The architects designed the buildings to interosculate seamlessly with the landscape.
建筑师设计这些建筑,使其与景观无缝交融。
3.In biology, species can interosculate when they share habitats.
在生物学中,当物种共享栖息地时,它们可以互相交融。
4.The two networks began to interosculate to enhance communication efficiency.
这两个网络开始互相交融以提高通信效率。
5.During the conference, ideas from different fields began to interosculate.
在会议期间,不同领域的想法开始相互交融。
作文
In the realm of mathematics and geometry, there are many fascinating concepts that challenge our understanding of space and relationships. One such term that may not be familiar to everyone is interosculate, which refers to the action of two curves or surfaces intersecting in such a way that they touch each other at one or more points without crossing. This concept can be particularly intriguing when we consider its applications in various fields such as physics, engineering, and even art. To illustrate the idea of interosculate, let us imagine two circles on a plane. When these circles are drawn close to each other, they may overlap at certain points. If they touch at exactly one point, we say they are interosculating. This delicate relationship between the two shapes can be seen in nature as well, such as in the way some flowers bloom, their petals just touching each other without fully overlapping. This phenomenon can also be observed in the design of certain architectural structures where different elements might meet but not fully merge, creating a unique aesthetic appeal.The mathematical implications of interosculate extend beyond simple geometry. In calculus, for instance, the concept of limits often involves examining how functions behave as they approach certain points. When two functions interosculate, it can lead to interesting results regarding their derivatives and integrals. Understanding this relationship can provide deeper insights into the behavior of complex systems, whether they are natural or man-made.Moreover, in physics, the idea of interosculate can be applied to the study of forces and motion. For example, when two objects collide, they may momentarily touch each other without merging into one. This interaction can be analyzed using principles of momentum and energy transfer, helping engineers design safer vehicles and structures. The ability to predict how objects will interosculate during an impact is crucial for developing technologies that protect lives and enhance safety.Art also benefits from the concept of interosculate. Artists often play with the idea of shapes and forms touching but not fully merging to create tension and intrigue in their work. This technique can evoke emotions and provoke thought, inviting viewers to explore the relationship between different elements within a piece. Whether in painting, sculpture, or digital media, the aesthetic of interosculate can lead to innovative artistic expressions that captivate audiences.In conclusion, the term interosculate may seem obscure at first glance, but its implications resonate across various disciplines. From mathematics and physics to art and architecture, the concept of two entities touching without fully merging opens up a world of possibilities for exploration and understanding. As we continue to study and appreciate these interactions, we gain valuable insights into the nature of relationships, whether they are geometric, physical, or artistic. Embracing the idea of interosculate allows us to appreciate the beauty of connection while recognizing the importance of individuality in every aspect of life.
在数学和几何的领域中,有许多迷人的概念挑战着我们对空间和关系的理解。其中一个可能并不为每个人所熟知的术语是interosculate,它指的是两个曲线或表面以某种方式相交,在一个或多个点上相互接触而不交叉的动作。考虑到它在物理学、工程学甚至艺术等各个领域的应用,这一概念尤其引人入胜。为了说明interosculate的概念,让我们想象一下平面上的两个圆。当这些圆绘制得靠近时,它们可能在某些点上重叠。如果它们恰好在一个点上接触,我们就说它们是相互接触的。这种形状之间微妙的关系也可以在自然界中看到,例如一些花朵的绽放,其花瓣彼此轻触而不完全重叠。这个现象也可以在某些建筑结构的设计中观察到,其中不同的元素可能会相遇但不完全融合,从而创造出独特的美感。interosculate的数学意义不仅限于简单的几何。在微积分中,例如,极限的概念通常涉及检查函数在接近某些点时的行为。当两个函数interosculate时,可能会导致关于它们的导数和积分的有趣结果。理解这种关系可以提供对复杂系统(无论是自然的还是人造的)行为的更深刻见解。此外,在物理学中,interosculate的概念可以应用于力和运动的研究。例如,当两个物体碰撞时,它们可能会短暂接触而不融合为一个。这种相互作用可以通过动量和能量转移的原理进行分析,帮助工程师设计更安全的车辆和结构。能够预测物体在碰撞过程中如何interosculate对于开发保护生命和增强安全性的技术至关重要。艺术同样受益于interosculate的概念。艺术家经常玩弄形状和形式接触但不完全融合的想法,以在他们的作品中创造紧张感和吸引力。这种技巧可以唤起情感并激发思考,邀请观众探索作品中不同元素之间的关系。无论是在绘画、雕塑还是数字媒体中,interosculate的美学都可以引领创新的艺术表现,吸引观众的目光。总之,虽然interosculate这个术语乍一看似乎很晦涩,但它的含义在各个学科中产生共鸣。从数学和物理到艺术和建筑,两个实体接触而不完全融合的概念打开了探索和理解的可能性。当我们继续研究和欣赏这些互动时,我们获得了对关系本质的宝贵洞察,无论它们是几何的、物理的还是艺术的。拥抱interosculate的理念使我们能够欣赏连接的美,同时认识到生活各个方面个体性的重要性。
