angular measurement

简明释义

角测量)

英英释义

例句

1.The engineer used a total station to take angular measurement 角度测量 of the building's corners.

工程师使用全站仪对建筑物的角落进行了angular measurement 角度测量。

2.In surveying, accurate angular measurement 角度测量 is crucial for determining property boundaries.

在测量中，准确的angular measurement 角度测量 对于确定财产边界至关重要。

3.Astronomers rely on angular measurement 角度测量 to calculate the positions of stars and planets.

天文学家依赖angular measurement 角度测量 来计算星星和行星的位置。

4.In robotics, precise angular measurement 角度测量 is necessary for movement accuracy.

在机器人技术中，精确的angular measurement 角度测量 对于运动的准确性是必要的。

5.Architects often need angular measurement 角度测量 to create accurate blueprints.

建筑师通常需要angular measurement 角度测量 来制作准确的蓝图。

作文

Angular measurement is a fundamental concept in various fields, including mathematics, physics, engineering, and even art. It refers to the measurement of angles, which are formed by two rays that share a common endpoint known as the vertex. Understanding angular measurement is essential for tasks ranging from constructing buildings to navigating in space. In this essay, we will explore the significance of angular measurement, its applications, and methods of measurement.Firstly, it is important to understand what constitutes an angle. An angle is typically measured in degrees or radians. A full circle comprises 360 degrees, while a radian is defined based on the radius of a circle. The relationship between these two units is crucial for anyone dealing with angular measurement. For instance, when engineers design bridges or buildings, they use angular measurement to ensure that structures can withstand various forces. In the field of physics, angular measurement plays a vital role in understanding rotational motion. For example, when studying the motion of planets, astronomers utilize angular measurement to calculate the orbits of celestial bodies. These calculations are not only fundamental for navigation but also for predicting future positions of planets and other objects in space. This shows how angular measurement extends beyond simple geometry into complex scientific applications.Moreover, angular measurement is indispensable in technology and computer graphics. When creating 3D models, designers must accurately measure angles to ensure that objects appear realistic. In animation, the movement of characters is often dictated by angular measurement, which allows for smooth transitions and lifelike actions. Without precise angular measurement, the quality of digital creations would suffer significantly.Additionally, angular measurement finds its relevance in everyday life. For instance, when driving, the angles at which vehicles turn can affect safety and efficiency. Understanding angular measurement helps drivers make better decisions when navigating sharp turns or merging onto highways. Similarly, in sports like gymnastics or diving, athletes must master angular measurement to perform their routines successfully, as the angles of their movements can determine their scores.To measure angles accurately, various tools are employed. The most common tool is the protractor, which allows users to measure angles in degrees. For more advanced applications, such as surveying land or measuring large angles, devices like the theodolite are used. These instruments provide precise angular measurement, which is crucial for construction and mapping.In conclusion, angular measurement is a critical component of numerous disciplines, influencing both theoretical and practical applications. From engineering marvels to everyday activities, the importance of angular measurement cannot be overstated. As we continue to advance in technology and science, the need for accurate angular measurement will only grow, highlighting its significance in our increasingly complex world. Understanding this concept not only enhances our knowledge but also equips us with the skills necessary to navigate various challenges effectively. Therefore, mastering angular measurement is essential for anyone looking to excel in fields that rely on precision and accuracy.

角度测量是数学、物理学、工程学甚至艺术等多个领域的基本概念。它指的是对角度的测量，角度由两条共享一个共同端点（称为顶点）的射线形成。理解角度测量对于从建筑施工到太空导航等任务至关重要。在这篇文章中，我们将探讨角度测量的重要性、应用及其测量方法。首先，了解什么构成一个角是很重要的。角通常以度或弧度来测量。一个完整的圆包含360度，而弧度是根据圆的半径定义的。这两个单位之间的关系对于任何处理角度测量的人来说都是至关重要的。例如，当工程师设计桥梁或建筑物时，他们使用角度测量来确保结构能够承受各种力量。在物理学领域，角度测量在理解旋转运动中发挥着重要作用。例如，在研究行星运动时，天文学家利用角度测量来计算天体的轨道。这些计算不仅对导航至关重要，而且对预测行星及其他天体未来的位置也至关重要。这表明角度测量超越了简单的几何学，进入了复杂的科学应用。此外，角度测量在技术和计算机图形学中不可或缺。当创建3D模型时，设计师必须准确测量角度，以确保对象看起来逼真。在动画中，角色的运动通常由角度测量决定，这使得过渡流畅且动作栩栩如生。如果没有精确的角度测量，数字创作的质量将大大降低。此外，角度测量在日常生活中的相关性也不容忽视。例如，在驾驶时，车辆转弯的角度会影响安全性和效率。理解角度测量可以帮助驾驶者在导航急转弯或并入高速公路时做出更好的决策。同样，在体操或跳水等运动中，运动员必须掌握角度测量才能成功完成他们的动作，因为他们动作的角度可以决定他们的得分。为了准确测量角度，人们使用各种工具。最常见的工具是量角器，它允许用户以度数测量角度。对于更高级的应用，例如测量土地或测量大角度，使用经纬仪等设备。这些仪器提供精确的角度测量，对于建筑和制图至关重要。总之，角度测量是多个学科的关键组成部分，影响理论和实践应用。从工程奇迹到日常活动，角度测量的重要性不容低估。随着我们在技术和科学上的不断进步，对准确角度测量的需求只会增加，突显其在我们日益复杂的世界中的重要性。理解这个概念不仅增强了我们的知识，还使我们具备有效应对各种挑战所需的技能。因此，掌握角度测量对于任何希望在依赖精确度和准确度的领域中脱颖而出的人来说都是必不可少的。