polygonal point

简明释义

导线点

英英释义

例句

1.The software can accurately determine the polygonal point 多边形点 of intersection between two shapes.

该软件可以准确确定两个形状之间的 多边形点 polygonal point 的交集。

2.When modeling terrain, it's crucial to identify each polygonal point 多边形点 for accurate representation.

在建模地形时，识别每个 多边形点 polygonal point 对于准确表示至关重要。

3.The algorithm calculates the distance between polygonal points 多边形点 to optimize the mesh.

该算法计算 多边形点 polygonal points 之间的距离，以优化网格。

4.The artist used a series of polygonal points 多边形点 to create a digital sculpture.

艺术家使用一系列 多边形点 polygonal point 来创建数字雕塑。

5.In computer graphics, a polygonal point 多边形点 is essential for defining the vertices of polygons.

在计算机图形学中，多边形点 polygonal point 对于定义多边形的顶点至关重要。

作文

In the realm of mathematics and computer graphics, the term polygonal point refers to a specific type of point that exists within a polygon. A polygon, as we know, is a two-dimensional geometric figure with straight sides that are fully closed. The vertices of the polygon are the points where two sides meet, and these vertices can be described as polygonal points. Understanding the significance of polygonal points is essential for various applications, including computer-aided design (CAD), animation, and even video game development.When we consider a simple polygon, such as a triangle or a rectangle, the polygonal points are the corners of the shape. For instance, in a triangle, there are three polygonal points, while a rectangle has four. Each of these points plays a crucial role in defining the shape's geometry and properties. In more complex polygons, such as pentagons or hexagons, the number of polygonal points increases, leading to more intricate designs and structures.In computer graphics, the concept of polygonal points is vital when creating models and animations. 3D models are often constructed using polygons, and the polygonal points serve as the foundation for rendering these shapes on screen. By manipulating the polygonal points, artists and designers can create realistic representations of objects and characters, giving them depth and dimension. Moreover, the position of each polygonal point can affect how light interacts with the surface of the polygon, thereby influencing shading and texture. This relationship between polygonal points and visual representation is fundamental in achieving realism in digital art and simulations.Beyond aesthetics, polygonal points also play a significant role in computational geometry, which deals with the study of geometric objects and their properties. Algorithms that involve calculating distances, intersections, or areas often rely on the precise definition of polygonal points. For example, determining whether a point lies inside a polygon requires an understanding of the polygonal points that define the shape’s boundaries.Additionally, in the field of robotics and navigation, polygonal points can be used to create maps and paths. Robots often operate in environments represented by polygons, and the polygonal points help define obstacles and navigable areas. By analyzing the polygonal points, robots can make informed decisions about movement and pathfinding, ensuring they traverse safely and efficiently through their surroundings.In conclusion, the concept of polygonal points extends beyond mere mathematics; it is a fundamental element in various fields, including computer graphics, robotics, and computational geometry. By understanding and manipulating polygonal points, we unlock the ability to create complex shapes, realistic models, and efficient algorithms. As technology continues to advance, the importance of polygonal points will only grow, making it a key area of study for anyone interested in the intersection of mathematics and practical applications.

在数学和计算机图形学的领域中，术语多边形点指的是存在于多边形内的一种特定类型的点。我们知道，多边形是一个具有直边并且完全封闭的二维几何图形。多边形的顶点是两条边相交的地方，这些顶点可以被描述为多边形点。理解多边形点的重要性对于各种应用至关重要，包括计算机辅助设计（CAD）、动画甚至视频游戏开发。当我们考虑一个简单的多边形，例如三角形或矩形时，多边形点就是形状的角落。例如，在一个三角形中，有三个多边形点，而矩形有四个。每一个这些点在定义形状的几何和属性方面都发挥着至关重要的作用。在更复杂的多边形中，例如五边形或六边形，多边形点的数量会增加，从而导致更复杂的设计和结构。在计算机图形学中，多边形点的概念在创建模型和动画时至关重要。3D模型通常是由多边形构成的，而多边形点作为在屏幕上渲染这些形状的基础。通过操纵多边形点，艺术家和设计师可以创建物体和角色的真实表现，使它们具有深度和维度。此外，每个多边形点的位置可以影响光线如何与多边形的表面相互作用，从而影响阴影和纹理。这种多边形点与视觉表现之间的关系对于在数字艺术和模拟中实现现实主义是至关重要的。除了美学之外，多边形点在计算几何领域也发挥着重要作用，该领域涉及几何对象及其属性的研究。涉及计算距离、交集或面积的算法往往依赖于对多边形点的精确定义。例如，确定一个点是否位于多边形内部需要理解定义形状边界的多边形点。此外，在机器人和导航领域，多边形点可以用于创建地图和路径。机器人通常在由多边形表示的环境中操作，而多边形点有助于定义障碍物和可导航区域。通过分析多边形点，机器人可以做出关于移动和路径规划的明智决策，确保它们安全高效地穿越周围环境。总之，多边形点的概念不仅仅局限于数学；它是多个领域的基本元素，包括计算机图形学、机器人技术和计算几何。通过理解和操纵多边形点，我们解锁了创建复杂形状、真实模型和高效算法的能力。随着技术的不断进步，多边形点的重要性只会增加，使其成为任何对数学与实际应用交汇处感兴趣的人的关键研究领域。