minimum distance

简明释义

最小距离最小距离

英英释义

例句

1.The pilot was instructed to maintain a minimum distance 最小距离 from other aircraft during landing.

飞行员被指示在着陆时与其他飞机保持最小距离。

2.To ensure safety, there is a minimum distance 最小距离 requirement for all construction sites.

为了确保安全，所有建筑工地都有一个最小距离的要求。

3.In this race, participants must maintain a minimum distance 最小距离 of 10 meters from each other.

在这场比赛中，参与者必须保持相互之间的最小距离为10米。

4.The GPS system calculates the minimum distance 最小距离 between your current location and the destination.

GPS系统计算您当前位置和目的地之间的最小距离。

5.The drone's flight path is designed to ensure a minimum distance 最小距离 from residential areas.

无人机的飞行路径设计确保与住宅区保持最小距离。

作文

In the field of mathematics and computer science, the concept of minimum distance plays a crucial role, especially in areas such as coding theory and geometry. The term minimum distance refers to the smallest possible distance between two points in a given space. This can be applied in various contexts, such as determining the efficiency of error-correcting codes or analyzing the geometric properties of shapes. Understanding the minimum distance is essential for optimizing algorithms and improving performance in computational tasks.When it comes to error correction in coding theory, the minimum distance of a code is defined as the smallest number of positions in which any two codewords differ. A larger minimum distance indicates better error detection and correction capabilities. For example, if a code has a minimum distance of three, it can detect up to two errors and correct one error. This property is invaluable in communication systems where data integrity is paramount.Moreover, in geometry, the minimum distance can be used to analyze the proximity of points within a geometric figure. For instance, consider a scenario where we need to find the minimum distance between a point and a line. This involves calculating the perpendicular distance from the point to the line, which is often the shortest path between them. By understanding how to compute the minimum distance, we can solve complex problems related to spatial relationships effectively.In real-world applications, the concept of minimum distance extends beyond theoretical frameworks. In urban planning, for example, city planners often consider the minimum distance between residential areas and essential services such as schools, hospitals, and parks. By maintaining an optimal minimum distance, planners can ensure that residents have easy access to these services, thus enhancing the quality of life.Furthermore, in robotics and artificial intelligence, the minimum distance is critical for navigation and pathfinding algorithms. Robots must calculate the minimum distance to obstacles to navigate safely and efficiently within their environment. This involves using sensors and algorithms to determine the shortest path while avoiding collisions, which is essential for autonomous vehicles and robotic systems.In summary, the concept of minimum distance is a fundamental principle that permeates various fields, from mathematics and computer science to urban planning and robotics. By grasping the significance of minimum distance, we can enhance our problem-solving abilities and apply this knowledge to real-world challenges. As technology continues to advance, the importance of understanding and utilizing minimum distance will only grow, making it a vital area of study for future innovations.

在数学和计算机科学领域，minimum distance（最小距离）这一概念起着至关重要的作用，尤其是在编码理论和几何学等领域。术语minimum distance指的是在给定空间中两个点之间的最小可能距离。这可以应用于各种上下文，例如确定纠错代码的效率或分析形状的几何特性。理解minimum distance对于优化算法和提高计算任务的性能至关重要。在编码理论中的错误更正方面，代码的minimum distance定义为任何两个码字之间不同的位置的最小数量。较大的minimum distance表示更好的错误检测和更正能力。例如，如果一个代码的minimum distance为三，则它可以检测到最多两个错误并纠正一个错误。这一特性在数据完整性至关重要的通信系统中是无价的。此外，在几何学中，minimum distance可用于分析几何图形内点的接近程度。例如，考虑一个需要找出某一点与一条线之间的minimum distance的场景。这涉及到从该点到直线的垂直距离的计算，通常这是它们之间的最短路径。通过理解如何计算minimum distance，我们可以有效地解决与空间关系相关的复杂问题。在现实世界应用中，minimum distance的概念超越了理论框架。在城市规划中，例如，城市规划者通常会考虑住宅区与学校、医院和公园等基本服务之间的minimum distance。通过保持最佳的minimum distance，规划者可以确保居民能够轻松访问这些服务，从而提高生活质量。此外，在机器人技术和人工智能中，minimum distance对导航和路径寻找算法至关重要。机器人必须计算与障碍物的minimum distance以安全高效地在其环境中导航。这涉及使用传感器和算法来确定最短路径，同时避免碰撞，这对于自主车辆和机器人系统至关重要。总之，minimum distance的概念是一个基本原理，渗透到各个领域，从数学和计算机科学到城市规划和机器人技术。通过掌握minimum distance的重要性，我们可以增强我们的解决问题的能力，并将这一知识应用于现实世界的挑战。随着技术的不断进步，理解和利用minimum distance的重要性只会增加，使其成为未来创新研究的一个重要领域。