angular plane surface

简明释义

斜平面

英英释义

例句

1.The architect designed a building with an angular plane surface that allows for better light reflection.

建筑师设计了一座具有角平面表面的建筑，以便更好地反射光线。

2.The engineer analyzed the stress distribution on the angular plane surface of the component.

工程师分析了部件的角平面表面上的应力分布。

3.When designing furniture, the angular plane surface can affect both aesthetics and functionality.

在设计家具时，角平面表面会影响美观和功能性。

4.The artist used an angular plane surface to create a unique perspective in her painting.

艺术家使用角平面表面在她的画作中创造了独特的视角。

5.In physics, the angular plane surface of the mirror determines how light is reflected.

在物理学中，镜子的角平面表面决定了光的反射方式。

作文

In the study of geometry, we often encounter various shapes and forms that exhibit different characteristics. One such characteristic is the concept of an angular plane surface, which refers to a flat surface that has distinct angles formed by the intersection of lines. Understanding this concept is crucial for students who wish to delve deeper into the realms of mathematics, architecture, and design. To illustrate the importance of an angular plane surface, let us consider its application in architecture. Architects frequently utilize angular surfaces to create visually striking buildings. For instance, the sharp angles of a modern skyscraper can be attributed to the use of angular plane surfaces. These surfaces not only enhance the aesthetic appeal of the structure but also serve functional purposes, such as directing light and managing wind flow. Moreover, the design of furniture often incorporates angular plane surfaces to maximize space and provide functionality. A coffee table with angular edges can fit snugly into a corner, making it ideal for smaller living spaces. By understanding the properties of angular plane surfaces, designers can create innovative solutions that cater to the needs of their clients while also maintaining visual harmony within a room. In mathematics, the study of angular plane surfaces is fundamental in understanding polygons and polyhedra. A polygon, for example, is defined as a two-dimensional shape with straight sides and angles. The more angles a polygon has, the more complex its angular plane surface becomes. This complexity is essential for students as they learn to calculate areas and perimeters, which are foundational skills in geometry. Furthermore, the concept of angular plane surfaces extends beyond two dimensions. In three-dimensional geometry, we encounter polyhedra, which are solid shapes with flat polygonal faces. Each face of a polyhedron is an angular plane surface, and the relationships between these surfaces determine the overall properties of the solid. For instance, the angles between the faces can affect the stability and strength of structures built from these materials. The significance of angular plane surfaces is not limited to theoretical applications; they also play a vital role in real-world scenarios. For example, in engineering, the design of components often involves creating angular plane surfaces to ensure proper fit and function. Mechanical parts must be designed with precise angles to allow for smooth movement and assembly. Engineers must understand the implications of these angles on the performance of their designs, making knowledge of angular plane surfaces essential in their field. In conclusion, the concept of an angular plane surface is a fundamental aspect of geometry that permeates various fields such as architecture, design, mathematics, and engineering. By grasping the significance of these surfaces, students and professionals alike can apply this knowledge to create innovative solutions and designs that enhance both functionality and aesthetics. Whether it is in the construction of a building, the design of furniture, or the development of mechanical components, angular plane surfaces remain an integral part of our everyday lives, demonstrating the interconnectedness of geometry with the world around us.

在几何学的研究中，我们经常遇到各种形状和形式，这些形状和形式展示了不同的特征。其中一个特征是“角平面表面”的概念，它指的是通过线的交叉形成的具有明显角度的平面。理解这个概念对希望深入数学、建筑和设计领域的学生至关重要。为了说明“角平面表面”的重要性，让我们考虑它在建筑中的应用。建筑师经常利用角度表面来创造视觉上引人注目的建筑。例如，现代摩天大楼的锐角可以归因于使用“角平面表面”。这些表面不仅增强了结构的美观性，还服务于功能目的，例如引导光线和管理风流。此外，家具的设计通常结合“角平面表面”以最大化空间并提供功能性。一个带有角边的咖啡桌可以紧贴角落，非常适合较小的居住空间。通过理解“角平面表面”的属性，设计师可以创造出创新的解决方案，既满足客户的需求，又保持房间内的视觉和谐。在数学中，“角平面表面”的研究是理解多边形和多面体的基础。例如，多边形被定义为具有直边和角的二维形状。多边形的角越多，其“角平面表面”就越复杂。这种复杂性对于学生来说至关重要，因为他们学习计算面积和周长，这些是几何学的基础技能。此外，“角平面表面”的概念不仅限于二维。在三维几何中，我们遇到了多面体，这些是具有平面多边形面的固体形状。多面体的每个面都是一个“角平面表面”，这些表面之间的关系决定了固体的整体属性。例如，面之间的角度可以影响由这些材料建造的结构的稳定性和强度。“角平面表面”的重要性不仅限于理论应用；它们在现实世界场景中也发挥着至关重要的作用。例如，在工程中，组件的设计通常涉及创建“角平面表面”以确保适当的配合和功能。机械零件必须设计成具有精确的角度，以允许平稳的运动和组装。工程师必须理解这些角度对其设计性能的影响，因此了解“角平面表面”在他们的领域中至关重要。总之，“角平面表面”的概念是几何学的一个基本方面，它渗透到建筑、设计、数学和工程等多个领域。通过掌握这些表面的重要性，学生和专业人士都可以将这一知识应用于创造创新的解决方案和设计，从而增强功能性和美感。无论是在建筑的建设、家具的设计还是机械组件的开发中，“角平面表面”始终是我们日常生活中不可或缺的一部分，展示了几何学与我们周围世界的相互联系。