base tangent length

简明释义

公法线长度;

英英释义

例句

1.To optimize the layout, we need to measure the base tangent length 基切线长度 of the circular track.

为了优化布局，我们需要测量圆形跑道的基切线长度 base tangent length。

2.The engineer calculated the base tangent length 基切线长度 to determine the curvature of the road.

工程师计算了基切线长度 base tangent length以确定道路的曲率。

3.The architect specified the base tangent length 基切线长度 in the blueprints for the new sports complex.

建筑师在新体育综合体的蓝图中指定了基切线长度 base tangent length。

4.During the survey, we found that the base tangent length 基切线长度 varied significantly across different sections.

在测量过程中，我们发现不同部分的基切线长度 base tangent length差异显著。

5.In the design of the bridge, the base tangent length 基切线长度 was crucial for ensuring stability.

在桥梁设计中，基切线长度 base tangent length对于确保稳定性至关重要。

作文

In the world of geometry, understanding various concepts and terms is crucial for students and professionals alike. One such term that often comes up in discussions about shapes and their properties is base tangent length. The base tangent length refers to the distance from a point on the base of a shape, typically a circle or an ellipse, to the point where a tangent line touches the shape. This concept is not only fundamental in theoretical mathematics but also has practical applications in fields like engineering, architecture, and physics.To illustrate the importance of base tangent length, let’s consider a simple example involving a circle. Imagine a circle with a radius of 5 units. If we draw a horizontal line that intersects the circle at two points, we can determine the base tangent length from one of these intersection points to the point where a tangent line meets the circle. This distance is essential for calculating angles, areas, and other properties of the circle.Understanding base tangent length is particularly useful when designing structures. Engineers must ensure that the forces acting on a building or bridge are balanced, and this often requires precise calculations involving tangents. For instance, when constructing an arch, the base tangent length helps determine the angle at which the arch should rise to support the weight above it. Without a clear grasp of this concept, engineers might miscalculate and lead to structural failures.Moreover, in the realm of computer graphics, the concept of base tangent length plays a vital role in rendering curves and surfaces accurately. When creating 3D models, developers must consider how light interacts with surfaces, which often involves calculations related to tangents. By understanding the base tangent length, they can create more realistic representations of objects, enhancing the visual experience for users.Another interesting application of base tangent length can be found in navigation systems. GPS technology relies on geometric principles to calculate distances and angles between points. Knowing the base tangent length can help improve the accuracy of these calculations, ensuring that users receive reliable information about their location and directions.In conclusion, the term base tangent length is more than just a mathematical phrase; it encapsulates a variety of applications across different fields. From architecture to computer graphics, the implications of this concept are significant. As students and professionals delve deeper into geometry, mastering terms like base tangent length will undoubtedly enhance their understanding and ability to apply these principles in real-world scenarios. Embracing the intricacies of geometry not only enriches one’s knowledge but also opens doors to innovative solutions in various industries. Therefore, it is essential to appreciate and comprehend the significance of the base tangent length in both theoretical and practical contexts.

在几何学的世界里，理解各种概念和术语对学生和专业人士来说至关重要。其中一个在讨论形状及其属性时常常出现的术语是基切线长度。基切线长度指的是从形状的基底上的某一点到切线与形状相接触的点之间的距离。这个概念不仅在理论数学中是基础，而且在工程、建筑和物理等领域也有实际应用。为了说明基切线长度的重要性，让我们考虑一个简单的例子，涉及一个圆。想象一个半径为5个单位的圆。如果我们画一条水平线，与圆相交于两个点，我们可以确定从其中一个交点到切线与圆相接触的点的基切线长度。这个距离对于计算角度、面积和圆的其他属性至关重要。理解基切线长度在设计结构时尤其有用。工程师必须确保施加在建筑物或桥梁上的力量是平衡的，这通常需要涉及切线的精确计算。例如，在建造拱门时，基切线长度有助于确定拱门应以什么角度上升以支撑其上方的重量。如果没有清晰地掌握这一概念，工程师可能会计算错误，从而导致结构失败。此外，在计算机图形学领域，基切线长度的概念在准确渲染曲线和表面方面发挥着至关重要的作用。当创建3D模型时，开发人员必须考虑光如何与表面相互作用，这通常涉及与切线相关的计算。通过理解基切线长度，他们可以创建更逼真的物体表现，增强用户的视觉体验。基切线长度的另一个有趣应用可以在导航系统中找到。GPS技术依赖于几何原理来计算点之间的距离和角度。了解基切线长度可以帮助提高这些计算的准确性，确保用户获得可靠的位置信息和方向。总之，术语基切线长度不仅仅是一个数学短语；它涵盖了各个领域的多种应用。从建筑到计算机图形学，这一概念的影响是显著的。随着学生和专业人士深入研究几何学，掌握像基切线长度这样的术语无疑会增强他们的理解能力，并在现实世界场景中应用这些原理。因此，欣赏和理解基切线长度在理论和实践背景下的重要性是至关重要的。