maximum distance between centers

简明释义

最大中心距

英英释义

例句

1.The engineer calculated the maximum distance between centers for the new bridge supports.

工程师计算了新桥支撑的最大距离。

2.For optimal performance, maintain a maximum distance between centers of 5 feet in this setup.

为了最佳性能，在此设置中保持最大距离为5英尺。

3.In the layout, we cannot exceed the maximum distance between centers specified in the blueprint.

在布局中，我们不能超过蓝图中规定的最大距离。

4.The study focused on the maximum distance between centers in urban planning.

该研究集中于城市规划中的最大距离。

5.The design requires a maximum distance between centers of 10 meters to ensure stability.

该设计要求中心之间的最大距离为10米，以确保稳定性。

作文

In the study of geometry and spatial relationships, one crucial concept is the maximum distance between centers. This term refers to the greatest possible length that can be measured between the centers of two or more objects, such as circles, spheres, or any other geometric shapes. Understanding this concept is essential in various fields, including mathematics, physics, engineering, and even computer graphics. By analyzing the maximum distance between centers, we can gain insights into the relationships and interactions between different objects in space.For instance, consider two circles on a plane. The center of each circle is a point that represents its location. If we want to find the maximum distance between centers of these two circles, we need to measure the straight line connecting their centers. This distance is significant because it helps us understand how far apart the circles are from each other. If the circles overlap, the maximum distance between centers will be less than the sum of their radii, indicating that they intersect. Conversely, if the distance exceeds the sum of their radii, the circles are separate and do not touch.The concept of maximum distance between centers also applies to three-dimensional shapes. For example, when dealing with spheres, the center of each sphere is the point equidistant from all points on its surface. To determine the maximum distance between centers of two spheres, we once again measure the straight line connecting their centers. This distance is crucial in determining whether the spheres intersect or are entirely separate.In engineering, understanding the maximum distance between centers is vital for designing components that must fit together. For instance, when creating mechanical parts that interact, engineers must ensure that the distance between the centers of rotating shafts does not exceed a certain limit. If the distance is too great, the parts may not function correctly, leading to inefficiencies or failures in the system.Moreover, in computer graphics and animation, the maximum distance between centers plays a significant role in rendering scenes accurately. When animating objects, artists must consider the distances between their centers to create realistic movements and interactions. For example, if two characters are animated to walk towards each other, the maximum distance between centers will determine how quickly they approach one another and when they will collide.In conclusion, the concept of maximum distance between centers is a fundamental principle that permeates various disciplines. Whether in geometry, engineering, or computer graphics, understanding this concept allows us to analyze relationships between objects effectively. By measuring the distance between centers, we can predict interactions, ensure proper design, and create realistic animations. As we continue to explore and apply this concept in different fields, we gain a deeper appreciation for the intricate connections that exist in our world, both in theory and practice.

在几何和空间关系的研究中，一个重要的概念是中心之间的最大距离。这个术语指的是可以测量的两个或多个物体（例如圆、球体或任何其他几何形状）中心之间的最大可能长度。理解这一概念在数学、物理、工程甚至计算机图形学等多个领域都是至关重要的。通过分析中心之间的最大距离，我们可以深入了解不同物体在空间中的关系和相互作用。例如，考虑平面上的两个圆。每个圆的中心是一个代表其位置的点。如果我们想要找出这两个圆的中心之间的最大距离，我们需要测量连接它们中心的直线。这一距离是重要的，因为它帮助我们理解圆与圆之间的远近。如果圆重叠，则中心之间的最大距离将小于它们半径的总和，表明它们相交。相反，如果距离超过它们半径的总和，则圆是分开的并且不接触。中心之间的最大距离的概念同样适用于三维形状。例如，在处理球体时，每个球体的中心是与其表面上所有点等距的点。要确定两个球体的中心之间的最大距离，我们再次测量连接它们中心的直线。这一距离对于确定球体是否相交或完全分开至关重要。在工程中，理解中心之间的最大距离对于设计必须相互配合的部件至关重要。例如，在创建相互作用的机械零件时，工程师必须确保旋转轴的中心之间的距离不超过某个限制。如果距离过大，部件可能无法正常运作，从而导致系统效率低下或故障。此外，在计算机图形和动画中，中心之间的最大距离在准确渲染场景中也扮演着重要角色。在动画对象时，艺术家必须考虑它们中心之间的距离，以创建逼真的运动和相互作用。例如，如果两个角色被动画化以朝彼此走去，中心之间的最大距离将决定它们接近的速度以及何时发生碰撞。总之，中心之间的最大距离这一概念是渗透于各个学科的基本原理。无论是在几何学、工程学还是计算机图形学中，理解这一概念使我们能够有效地分析物体之间的关系。通过测量中心之间的距离，我们可以预测相互作用，确保设计的正确性，并创建逼真的动画。随着我们在不同领域继续探索和应用这一概念，我们对理论和实践中存在的复杂联系有了更深的理解。