boundary angle

简明释义

界边角钢

英英释义

例句

1.The surveyor marked the boundary angle 边界角 to delineate the property boundaries accurately.

测量员标记了boundary angle 边界角以准确划定财产边界。

2.When drafting the plans, the engineer paid close attention to the boundary angle 边界角 to avoid any legal issues.

在起草计划时，工程师密切关注boundary angle 边界角以避免任何法律问题。

3.In the design of the park, the boundary angle 边界角 was crucial for maximizing space usage.

在公园设计中，boundary angle 边界角对于最大化空间使用至关重要。

4.The architect calculated the boundary angle 边界角 to ensure the building fit within the property lines.

建筑师计算了boundary angle 边界角以确保建筑物符合地块边界。

5.Understanding the boundary angle 边界角 helps in creating effective landscape designs.

理解boundary angle 边界角有助于创建有效的景观设计。

作文

In the study of geometry, the concept of angles is fundamental. Angles are formed by two rays that share a common endpoint, and they can be classified in various ways. One particular type of angle that often comes up in discussions about shapes and their properties is the boundary angle. The term boundary angle refers to the angles formed at the edges of a geometric figure, specifically where two sides meet. Understanding this concept is crucial for anyone studying geometry or engaging in fields that require spatial reasoning.To illustrate the importance of boundary angle, consider a simple shape like a triangle. A triangle has three sides and three vertices. At each vertex, there is a boundary angle created by the intersection of two sides. The sum of these boundary angles in a triangle always equals 180 degrees. This property is not only essential for solving problems related to triangles but also serves as a foundation for more complex geometric concepts.In practical applications, boundary angles can be observed in various real-world contexts. For instance, in architecture, the design of buildings often involves calculating boundary angles to ensure stability and aesthetic appeal. An architect must understand how different boundary angles interact to create structures that are both functional and visually pleasing. Similarly, in engineering, the analysis of boundary angles is vital when designing components that fit together precisely, such as in machinery or vehicles.Moreover, the significance of boundary angles extends beyond just triangles. In polygons, each vertex contributes a boundary angle, and the total of these angles can be calculated using the formula (n-2) × 180 degrees, where n represents the number of sides. This relationship helps mathematicians and students alike to deduce unknown angles within various shapes, fostering a deeper understanding of geometric principles.Art also utilizes the concept of boundary angles. Artists often consider the angles formed by the edges of their canvases or sculptures to create balance and harmony in their work. By manipulating boundary angles, artists can guide the viewer's eye and evoke specific emotions through their compositions.In conclusion, the term boundary angle encompasses a critical aspect of geometry that finds relevance in numerous disciplines, from mathematics to architecture and art. Understanding boundary angles allows individuals to engage with the physical world in a more informed manner, enhancing their ability to analyze and create. As we continue to explore the intricate relationships between shapes and their angles, the concept of boundary angle will undoubtedly remain a cornerstone of geometric study and application. It is essential for students and professionals alike to grasp this concept fully, as it opens doors to a myriad of possibilities in both theoretical and practical realms.

在几何学的研究中，角的概念是基础。角是由两个共享一个共同端点的射线形成的，可以以多种方式分类。一种在讨论形状及其属性时经常出现的特定类型的角是边界角。术语边界角指的是在几何图形的边缘形成的角，尤其是在两条边相交的地方。理解这个概念对于任何学习几何或参与需要空间推理的领域的人来说都是至关重要的。为了说明边界角的重要性，考虑一个简单的形状，比如三角形。三角形有三条边和三个顶点。在每个顶点处，由两条边的交汇产生一个边界角。在三角形中，这些边界角的总和始终等于180度。这个性质不仅对解决与三角形相关的问题至关重要，还为更复杂的几何概念奠定了基础。在实际应用中，边界角可以在各种现实世界的背景中观察到。例如，在建筑学中，建筑物的设计通常涉及计算边界角以确保稳定性和美观性。建筑师必须了解不同的边界角如何相互作用，以创建既实用又视觉上令人愉悦的结构。同样，在工程学中，分析边界角在设计精确契合的组件时至关重要，例如机械或车辆。此外，边界角的重要性不仅限于三角形。在多边形中，每个顶点都贡献一个边界角，这些角的总和可以使用公式(n-2) × 180度来计算，其中n代表边的数量。这个关系帮助数学家和学生推导出各种形状中的未知角，从而促进对几何原理的更深入理解。艺术也利用了边界角的概念。艺术家们常常考虑画布或雕塑边缘形成的角度，以创造作品的平衡和和谐。通过操控边界角，艺术家可以引导观众的视线，并通过他们的构图唤起特定的情感。总之，术语边界角涵盖了几何学的一个关键方面，在数学、建筑和艺术等多个学科中都有相关性。理解边界角使个人能够以更具信息化的方式与物理世界互动，增强他们分析和创造的能力。随着我们继续探索形状及其角之间复杂的关系，边界角的概念无疑将继续成为几何研究和应用的基石。学生和专业人士都必须充分掌握这一概念，因为它为理论和实践领域的无数可能性打开了大门。