length between perpendiculars

简明释义

垂线间长度

英英释义

例句

1.The engineer calculated the length between perpendiculars to determine the stability of the structure.

工程师计算了垂直间距以确定结构的稳定性。

2.In naval architecture, the length between perpendiculars is crucial for assessing ship performance.

在船舶设计中，垂直间距对评估船舶性能至关重要。

3.The length between perpendiculars affects the vessel's turning radius and maneuverability.

垂直间距影响船只的转弯半径和机动性。

4.To find the length between perpendiculars, we measured from the forward to the aft perpendiculars on the hull.

为了找到垂直间距，我们从船体的前垂直线测量到后垂直线。

5.For accurate calculations, the length between perpendiculars must be measured carefully.

为了准确计算，垂直间距必须仔细测量。

作文

The concept of geometry is fundamental in various fields such as architecture, engineering, and even art. One of the important terms in geometry is the length between perpendiculars, which refers to the distance measured between two lines that are perpendicular to a given reference line or plane. This measurement is crucial when determining the dimensions and layout of structures, as it helps ensure accuracy and stability. Understanding the length between perpendiculars can also aid in visualizing shapes and their properties, making it easier to work with complex designs.In practical applications, the length between perpendiculars can be seen in the construction of buildings. Architects often use this measurement when designing floor plans, as it allows them to create spaces that are both functional and aesthetically pleasing. For instance, when designing a room, an architect must consider the length between perpendiculars to ensure that the walls are straight and aligned correctly. This attention to detail ensures that the final structure is not only visually appealing but also structurally sound.Moreover, the length between perpendiculars is essential in engineering, particularly in fields like civil and mechanical engineering. Engineers often need to calculate this length when designing bridges, roads, and other infrastructure projects. By accurately measuring the length between perpendiculars, engineers can determine the best materials and methods to use, ultimately leading to safer and more efficient designs.In addition to its practical applications, the length between perpendiculars also has theoretical significance in mathematics. It is often used in proofs and theorems related to triangles and other geometric shapes. For example, the Pythagorean theorem, which relates the lengths of the sides of a right triangle, can be better understood through the concept of length between perpendiculars. By visualizing the relationships between different lines and angles, students can develop a deeper understanding of geometric principles.Art also benefits from the understanding of the length between perpendiculars. Artists often use geometric principles to create balanced and harmonious compositions. By considering the length between perpendiculars, they can arrange elements within their artwork in a way that draws the viewer's eye and creates a sense of movement and flow. This application of geometry in art highlights the interconnectedness of these disciplines, showing that concepts like the length between perpendiculars are not only useful in technical fields but also in creative endeavors.In conclusion, the length between perpendiculars is a vital concept in geometry that has far-reaching implications in various fields. From architecture and engineering to mathematics and art, understanding this measurement allows for greater precision and creativity. As we continue to explore the world around us, the importance of the length between perpendiculars will remain evident, serving as a reminder of the beauty and complexity of geometry in our everyday lives.

几何学的概念在建筑、工程甚至艺术等多个领域中都是基础的。几何学中的一个重要术语是垂线之间的长度，它指的是测量与给定参考线或平面垂直的两条线之间的距离。这一测量在确定结构的尺寸和布局时至关重要，因为它有助于确保准确性和稳定性。理解垂线之间的长度也可以帮助可视化形状及其特性，使得处理复杂设计变得更加容易。在实际应用中，垂线之间的长度可以在建筑物的建造中看到。建筑师在设计平面图时经常使用这一测量，因为它使他们能够创建既实用又美观的空间。例如，在设计一个房间时，建筑师必须考虑垂线之间的长度以确保墙壁是直的并且正确对齐。这种对细节的关注确保了最终结构不仅在视觉上令人满意，而且在结构上也是安全的。此外，垂线之间的长度在工程学中也是必不可少的，特别是在土木和机械工程等领域。工程师在设计桥梁、道路和其他基础设施项目时，通常需要计算这一长度。通过准确测量垂线之间的长度，工程师可以确定最佳的材料和方法，从而最终导致更安全、更高效的设计。除了其实际应用外，垂线之间的长度在数学中也具有理论意义。它常常用于与三角形和其他几何形状相关的证明和定理中。例如，毕达哥拉斯定理，它涉及直角三角形边长之间的关系，可以通过垂线之间的长度的概念得到更好的理解。通过可视化不同线条和角度之间的关系，学生可以更深入地理解几何原理。艺术同样受益于对垂线之间的长度的理解。艺术家常常利用几何原理来创造平衡和谐的构图。通过考虑垂线之间的长度，他们可以以一种吸引观众目光并创造运动感和流动感的方式排列作品中的元素。这种几何在艺术中的应用突显了这些学科之间的相互关联，显示出像垂线之间的长度这样的概念不仅在技术领域有用，也在创造性工作中发挥作用。总之，垂线之间的长度是几何学中的一个重要概念，在各个领域都有深远的影响。从建筑和工程到数学和艺术，理解这一测量可以带来更大的精确性和创造力。随着我们继续探索周围的世界，垂线之间的长度的重要性将依然显而易见，提醒我们几何在日常生活中的美丽与复杂。