angular vertex

简明释义

1. 角的顶点; 2. 角顶;

英英释义

例句

1.To calculate the angles in a triangle, you need to identify each angular vertex 角顶点 first.

要计算三角形的角度，首先需要识别每个angular vertex 角顶点。

2.The architect emphasized the importance of the angular vertex 角顶点 in the design of the building's roof.

建筑师强调了在建筑屋顶设计中angular vertex 角顶点的重要性。

3.The angular vertex 角顶点 of the polygon determines its overall shape.

多边形的angular vertex 角顶点决定了其整体形状。

4.During the presentation, the teacher pointed out the angular vertex 角顶点 of the various geometric figures.

在演示中，老师指出了各种几何图形的angular vertex 角顶点。

5.In geometry, the point where two lines meet is known as an angular vertex 角顶点.

在几何学中，两条线相交的点被称为angular vertex 角顶点。

作文

In the study of geometry, one encounters various terms that describe the properties and relationships of shapes. One such term is angular vertex, which refers to a point where two or more lines or edges meet to form an angle. Understanding this concept is crucial for anyone delving into the world of geometric figures, as it serves as a foundational element in both theoretical and practical applications.An angular vertex is not just a simple point; it is a pivotal aspect of many geometric shapes, including triangles, quadrilaterals, and polygons. For instance, in a triangle, there are three angular vertices, each representing the meeting point of two sides. The angles formed at these vertices are essential for calculating the area and understanding the properties of the triangle. Similarly, in a square, there are four angular vertices, each contributing to the right angles that define its structure.The significance of angular vertices extends beyond basic geometry. In fields such as architecture and engineering, the concept plays a vital role in design and structural integrity. Architects must carefully consider the placement and angles of angular vertices when creating blueprints for buildings. A well-placed angular vertex can enhance the aesthetic appeal of a structure while ensuring stability and strength.Moreover, in computer graphics and modeling, angular vertices are crucial for rendering shapes and objects. When creating 3D models, artists and programmers must manipulate angular vertices to achieve desired forms and perspectives. Each angular vertex affects how light interacts with surfaces, influencing the overall visual output of the model.In mathematics, the study of angular vertices also leads to deeper explorations of angles, including acute, obtuse, and right angles. Each type of angle has specific characteristics tied to its angular vertices. For example, an acute angle, formed by two lines meeting at an angular vertex, measures less than 90 degrees, while an obtuse angle exceeds that measurement. Understanding these differences is essential for solving problems related to angles and their relationships.Furthermore, the concept of angular vertices can be applied in real-world situations. For instance, when navigating through city streets, one often encounters intersections where roads meet at angular vertices. Understanding the angles formed at these intersections can help drivers make better decisions regarding turns and lane changes. Additionally, in sports like basketball or soccer, players must be aware of the angular vertices created by their positioning on the court or field to optimize their strategies and movements.In conclusion, the term angular vertex encapsulates a fundamental aspect of geometry that permeates various fields, from mathematics to architecture and even everyday life. By grasping the concept of angular vertices, one gains insight into the intricate relationships between angles and shapes. This understanding not only enhances one's mathematical skills but also enriches one’s appreciation for the design and structure found in the world around us. As we continue to explore the complexities of geometry, the importance of angular vertices will undoubtedly remain a key focus, guiding our understanding of spatial relationships and the beauty of shapes.

在几何学的研究中，人们会遇到许多描述形状属性和关系的术语。其中一个术语是角顶点，它指的是两个或多个线条或边相交形成角的点。理解这个概念对于任何深入几何图形世界的人来说都是至关重要的，因为它作为理论和实际应用中的基础元素。角顶点不仅仅是一个简单的点；它是许多几何形状的重要组成部分，包括三角形、四边形和多边形。例如，在三角形中，有三个角顶点，每个代表两条边的交汇点。这些顶点处形成的角对于计算面积和理解三角形的性质至关重要。同样，在正方形中，有四个角顶点，每个都对其结构定义的直角做出了贡献。角顶点的重要性超越了基础几何。在建筑和工程等领域，这一概念在设计和结构完整性中发挥着至关重要的作用。建筑师在为建筑创建蓝图时，必须仔细考虑角顶点的放置和角度。一个恰当放置的角顶点可以增强结构的美观，同时确保稳定性和强度。此外，在计算机图形和建模中，角顶点对于渲染形状和物体至关重要。在创建3D模型时，艺术家和程序员必须操控角顶点以实现所需的形式和透视。每个角顶点都会影响光与表面的相互作用，从而影响模型的整体视觉效果。在数学中，角顶点的研究也引导我们深入探索角的类型，包括锐角、钝角和直角。每种类型的角都有其特定的特征，与其角顶点相关联。例如，由两条线在角顶点相交形成的锐角测量小于90度，而钝角则超过该测量。理解这些差异对于解决与角及其关系相关的问题至关重要。此外，角顶点的概念可以应用于现实生活中的情境。例如，当穿越城市街道时，人们常常会遇到道路在角顶点相交的交叉口。理解这些交叉口形成的角度可以帮助司机在转弯和变道时做出更好的决策。此外，在篮球或足球等运动中，球员必须意识到他们在场地上的位置所形成的角顶点，以优化他们的策略和动作。总之，术语角顶点概括了几何学的一个基本方面，它渗透到从数学到建筑甚至日常生活的各个领域。通过掌握角顶点的概念，人们可以深入了解角与形状之间的复杂关系。这种理解不仅增强了个人的数学技能，还丰富了人们对周围世界中设计和结构的欣赏。随着我们继续探索几何的复杂性，角顶点的重要性无疑将保持关键焦点，引导我们理解空间关系和形状的美。