funicular polygon

简明释义

肃边形

英英释义

例句

1.In structural design, a funicular polygon helps visualize the load distribution.

在结构设计中，拉索多边形有助于可视化荷载分布。

2.A funicular polygon can be used to optimize the design of a cable-stayed structure.

可以使用拉索多边形来优化斜拉结构的设计。

3.The architect drew a funicular polygon to illustrate the tension in the cables.

建筑师绘制了一个拉索多边形以说明电缆中的张力。

4.The engineer used the funicular polygon to analyze the forces acting on the bridge.

工程师使用了拉索多边形来分析作用在桥梁上的力。

5.Understanding the concept of a funicular polygon is essential for civil engineers.

理解拉索多边形的概念对土木工程师至关重要。

作文

In the realm of mathematics and physics, the concept of a funicular polygon plays a crucial role in understanding forces and their equilibrium. A funicular polygon is essentially a geometric representation that helps visualize the relationship between various forces acting on a body. It is constructed by connecting the endpoints of force vectors in a sequential manner, creating a closed shape that represents the equilibrium of those forces. This method is particularly useful in engineering and structural analysis, where it aids in determining how different forces interact with one another.To delve deeper into the significance of a funicular polygon, let's consider a practical example. Imagine an architect designing a bridge. The architect must account for various forces such as tension, compression, and gravity. By utilizing a funicular polygon, the architect can effectively visualize these forces at play. Each vector representing a force is drawn to scale, and by connecting these vectors, the architect can ascertain whether the structure will remain stable under the applied loads.Moreover, the funicular polygon serves as a powerful tool in the analysis of trusses, which are commonly used in construction. Trusses are composed of triangular units that distribute weight efficiently. When forces are applied to a truss, engineers can use the funicular polygon to determine the internal forces within each member of the truss. This analysis is essential for ensuring safety and stability in engineering designs.The process of drawing a funicular polygon involves several steps. First, one must identify all the forces acting on the object in question. These forces can include applied loads, reactions at supports, and any other relevant forces. Next, each force is represented as a vector, with its length corresponding to the magnitude of the force and its direction indicating the line of action. After plotting these vectors, they are connected head-to-tail to form the funicular polygon. If the polygon closes back on itself, it indicates that the system is in equilibrium, meaning that the sum of the forces acting on the object is zero.In conclusion, the funicular polygon is not just a theoretical construct but a practical tool that has real-world applications in engineering and physics. Its ability to visually represent the equilibrium of forces makes it indispensable for architects and engineers alike. Understanding how to construct and interpret a funicular polygon is essential for anyone involved in fields that require an analysis of forces and structural integrity. As we continue to push the boundaries of architecture and engineering, the principles underlying the funicular polygon will remain a fundamental aspect of ensuring safe and effective designs.

在数学和物理的领域中，funicular polygon（索状多边形）的概念在理解力和它们的平衡方面起着至关重要的作用。funicular polygon 本质上是一个几何表示，帮助可视化作用于物体的各种力之间的关系。它通过顺序连接力矢量的端点来构造，形成一个闭合形状，表示这些力的平衡。这种方法在工程和结构分析中尤其有用，有助于确定不同力如何相互作用。为了更深入地探讨funicular polygon的重要性，我们来考虑一个实际的例子。想象一下，一个建筑师正在设计一座桥梁。建筑师必须考虑各种力，例如拉力、压力和重力。通过利用funicular polygon，建筑师可以有效地可视化这些作用中的力量。每个代表力的矢量按比例绘制，通过连接这些矢量，建筑师可以确定结构在施加负载下是否会保持稳定。此外，funicular polygon在分析桁架方面也作为一种强大的工具，桁架在建筑中被广泛使用。桁架由三角形单元组成，能够高效地分配重量。当力施加到桁架上时，工程师可以使用funicular polygon来确定桁架每个构件内部的力。这种分析对于确保工程设计的安全性和稳定性至关重要。绘制funicular polygon的过程包括几个步骤。首先，必须识别作用于相关物体的所有力。这些力可以包括施加的负载、支撑处的反应力以及任何其他相关的力。接下来，每个力都用矢量表示，其长度对应于力的大小，方向指示作用线。在绘制这些矢量之后，它们以头尾相连的方式连接起来，形成funicular polygon。如果多边形闭合，这表明系统处于平衡状态，即作用于物体的力的总和为零。总之，funicular polygon不仅是一个理论构造，而且是一个在工程和物理中具有实际应用的工具。它能够可视化表示力的平衡，使其对建筑师和工程师来说不可或缺。了解如何构建和解释funicular polygon对于任何涉及力和结构完整性分析的领域的人来说都是至关重要的。随着我们不断推动建筑和工程的边界，支撑funicular polygon的原则将始终是确保安全和有效设计的基本方面。