annulus space

简明释义

1. 环形空间; 2. 环空;

英英释义

例句

1.The annulus space 环形空间 plays an important role in heat transfer applications.

在热传递应用中，annulus space 环形空间 起着重要作用。

2.In a wellbore, the annulus space 环形空间 is crucial for cementing operations.

在井眼中，annulus space 环形空间 对于水泥作业至关重要。

3.The engineer measured the annulus space 环形空间 to ensure proper insulation.

工程师测量了annulus space 环形空间 以确保适当的绝缘。

4.During the inspection, we found that the annulus space 环形空间 was blocked by debris.

在检查过程中，我们发现annulus space 环形空间 被碎片堵塞。

5.The annulus space 环形空间 between the two pipes allows for fluid flow during the heating process.

两根管道之间的annulus space 环形空间 允许在加热过程中流体流动。

作文

The concept of annulus space is fundamental in various fields of mathematics and physics. An annulus space can be defined as a region in a plane bounded by two concentric circles. This intriguing geometric shape not only serves as a basic example in topology but also finds applications in real-world scenarios such as engineering, architecture, and even computer graphics. Understanding the properties of annulus space allows us to explore more complex structures and their behaviors.In mathematics, particularly in topology, an annulus space is often used to illustrate the idea of continuity and connectedness. The inner and outer circles form boundaries that define the space between them, which can be visualized as a 'ring'. This ring-like structure is essential when discussing homeomorphisms, which are mappings that preserve the topological properties of spaces. For instance, one can demonstrate that an annulus space is homeomorphic to a cylinder, further emphasizing its significance in understanding different shapes and forms in topology.Moreover, in the realm of physics, annulus space can describe various phenomena. For example, when studying fluid dynamics, the flow of liquids through annular spaces, such as pipes with varying diameters, can reveal important insights into pressure changes and velocity distributions. Engineers often utilize the principles of annulus space when designing systems that involve cylindrical components, ensuring efficient flow and minimizing turbulence.In the field of computer graphics, the representation of annulus space is crucial for rendering objects that have a circular cross-section. For instance, when creating a 3D model of a torus, understanding the annulus space helps in accurately depicting its surface and volume. This representation is vital for simulations and animations, where realistic portrayals of physical objects are necessary.Furthermore, in the context of art and design, the aesthetic appeal of annulus space can be observed in various forms. Artists often incorporate circular patterns and designs that resemble annuli, creating visually striking compositions. The interplay of light and shadow within an annulus space can lead to captivating visual effects that draw the viewer's attention.In conclusion, the annulus space is more than just a simple geometric figure; it is a versatile concept that bridges multiple disciplines. From its mathematical properties to its practical applications in engineering and computer graphics, understanding annulus space enhances our comprehension of both abstract theories and tangible realities. As we continue to explore the intricacies of this fascinating shape, we uncover new layers of knowledge that enrich our understanding of the world around us.

‘环形空间’这一概念在数学和物理的多个领域中都是基础性的。‘环形空间’可以定义为一个由两个同心圆界定的平面区域。这种引人入胜的几何形状不仅在拓扑学中作为基础示例，而且在工程、建筑甚至计算机图形学等现实世界场景中也有应用。理解‘环形空间’的性质使我们能够探索更复杂的结构及其行为。在数学，特别是拓扑学中，‘环形空间’常用于说明连续性和连通性的概念。内外圆形成的边界定义了它们之间的空间，可以想象成一个“环”。这种环状结构在讨论同胚映射时至关重要，同胚映射是保持空间拓扑性质的映射。例如，可以证明‘环形空间’与一个圆柱体是同胚的，这进一步强调了它在理解不同形状和形式中的重要性。此外，在物理学领域，‘环形空间’可以描述各种现象。例如，在研究流体动力学时，液体通过环形空间（如直径变化的管道）的流动可以揭示关于压力变化和速度分布的重要见解。工程师在设计涉及圆柱形组件的系统时，通常利用‘环形空间’的原理，以确保高效流动并最小化湍流。在计算机图形学领域，‘环形空间’的表示对于渲染具有圆形截面的物体至关重要。例如，在创建一个圆环的3D模型时，理解‘环形空间’有助于准确描绘其表面和体积。这种表示对于模拟和动画至关重要，因为现实物体的真实表现是必要的。此外，在艺术和设计的背景下，‘环形空间’的美学吸引力可以在多种形式中观察到。艺术家常常结合圆形图案和设计，形成类似环形的视觉作品。‘环形空间’中的光影交错可以产生迷人的视觉效果，吸引观众的注意。总之，‘环形空间’不仅仅是一个简单的几何图形；它是一个多功能的概念，连接着多个学科。从其数学性质到在工程和计算机图形学中的实际应用，理解‘环形空间’增强了我们对抽象理论和具体现实的理解。随着我们继续探索这一迷人形状的复杂性，我们发现了新的知识层次，丰富了我们对周围世界的理解。