adjacent point

简明释义

相邻点

英英释义

例句

1.The data from this adjacent point 相邻点 can help improve our model's accuracy.

来自这个相邻点 adjacent point的数据可以帮助提高我们模型的准确性。

2.The algorithm checks the values of all adjacent points 相邻点 for updates.

该算法检查所有相邻点 adjacent points的值以进行更新。

3.You can only move to an adjacent point 相邻点 in the maze at a time.

你在迷宫中一次只能移动到一个相邻点 adjacent point。

4.In a grid layout, each cell can be accessed from its adjacent point 相邻点.

在网格布局中，每个单元格都可以通过其相邻点 adjacent point进行访问。

5.To find the shortest path, consider moving to an adjacent point 相邻点 first.

为了找到最短路径，首先考虑移动到一个相邻点 adjacent point。

作文

In the realm of mathematics and geometry, the concept of an adjacent point plays a significant role in understanding the relationships between various shapes and figures. An adjacent point is defined as a point that is next to or adjoining another point, often sharing a common boundary or line segment. This idea is not only fundamental in geometry but also has applications in various fields such as computer graphics, physics, and even in everyday scenarios like urban planning.For instance, consider a simple geometric shape, such as a triangle. Each vertex of the triangle can be considered an adjacent point to the other two vertices. Understanding which points are adjacent to one another helps in calculating angles, lengths, and areas associated with the triangle. Without this knowledge, one might struggle to solve problems related to the triangle's properties effectively.Moreover, in the context of graph theory, the term adjacent point is frequently used to describe nodes that are connected directly by an edge. In a network of roads, for example, two intersections can be viewed as adjacent points if there is a road connecting them. This concept is vital for algorithms that seek to find the shortest path between two locations, as it allows for efficient navigation through the network.In computer graphics, the idea of adjacent points becomes crucial when rendering images or animations. When creating a 3D model, each vertex of the model is often linked to several adjacent points to form polygons. The way these points are connected determines the surface's smoothness and the overall appearance of the model. Artists and designers must pay close attention to how adjacent points are arranged to achieve the desired visual effect.Furthermore, in urban planning, the concept of adjacent points can be applied to analyze land use and zoning regulations. For instance, when planning a new neighborhood, city planners must consider how residential areas will be positioned in relation to commercial zones. The adjacent points in this context are the various plots of land that share borders. Properly planning these adjacent points can lead to more functional and aesthetically pleasing communities.In conclusion, the term adjacent point is more than just a mathematical term; it is a concept that permeates various disciplines and real-world applications. Whether in geometry, graph theory, computer graphics, or urban planning, understanding the relationships between adjacent points is essential for problem-solving and effective design. As we continue to explore the interconnectedness of different fields, the significance of adjacent points will undoubtedly remain a relevant and critical aspect of our understanding of spatial relationships.

在数学和几何的领域中，相邻点的概念在理解各种形状和图形之间的关系时起着重要作用。相邻点被定义为一个与另一个点相邻或接壤的点，通常共享一个公共边界或线段。这个概念不仅在几何学中是基础的，而且在计算机图形学、物理学，甚至在城市规划等日常场景中都有应用。例如，考虑一个简单的几何形状，如三角形。三角形的每个顶点都可以被视为与其他两个顶点的相邻点。理解哪些点彼此相邻有助于计算与三角形相关的角度、长度和面积。如果没有这个知识，人们可能会在有效解决与三角形属性相关的问题时遇到困难。此外，在图论的上下文中，相邻点这个术语常用于描述通过边直接连接的节点。在一张道路网络中，例如，如果两条交叉口之间有一条路连接，它们可以被视为相邻点。这个概念对于寻找两个位置之间最短路径的算法至关重要，因为它允许有效地导航通过网络。在计算机图形学中，相邻点的概念在渲染图像或动画时变得至关重要。当创建一个3D模型时，模型的每个顶点通常与几个相邻点相连以形成多边形。这些点的连接方式决定了表面的光滑度和模型的整体外观。艺术家和设计师必须密切关注如何安排相邻点以实现所需的视觉效果。此外，在城市规划中，相邻点的概念可以应用于分析土地使用和分区规定。例如，在规划一个新社区时，城市规划者必须考虑住宅区与商业区之间的相对位置。在这种情况下，相邻点是指共享边界的各种土地。适当地规划这些相邻点可以导致更具功能性和美观的社区。总之，相邻点这个术语不仅仅是一个数学术语；它是一个渗透于多个学科和现实世界应用的概念。无论是在几何学、图论、计算机图形学还是城市规划中，理解相邻点之间的关系对于解决问题和有效设计都是至关重要的。随着我们继续探索不同领域之间的相互联系，相邻点的重要性无疑将仍然是我们理解空间关系的一个相关且关键的方面。