angle increment

简明释义

角增量

英英释义

例句

1.The robot arm moves in precise steps, adjusting its position by an angle increment of 5 degrees.

机器人手臂以精确的步骤移动，每次调整位置的角度增量为5度。

2.The game requires players to rotate their character by a specific angle increment for precise movements.

游戏要求玩家以特定的角度增量旋转角色，以实现精确的移动。

3.For the architectural design, we used an angle increment of 10 degrees to create the roof's slope.

在建筑设计中，我们使用了10度的角度增量来创建屋顶的坡度。

4.The telescope allows for an angle increment adjustment, enabling better focus on distant stars.

望远镜允许进行角度增量调整，从而更好地聚焦于遥远的星星。

5.In the simulation software, you can set the angle increment to refine your model's accuracy.

在模拟软件中，您可以设置角度增量以提高模型的准确性。

作文

In the realm of geometry and physics, the term angle increment refers to the small change in angle measurement that can significantly affect calculations and outcomes in various applications. Understanding this concept is crucial for students and professionals alike, particularly in fields such as engineering, architecture, and robotics. An angle increment can be defined as the difference between two angles, often expressed in degrees or radians. For example, if one were to rotate a wheel from an angle of 30 degrees to an angle of 45 degrees, the angle increment would be 15 degrees. This seemingly simple calculation plays a vital role in more complex scenarios, such as determining the trajectory of a projectile or the path of a robotic arm. When designing structures, architects must consider angle increments to ensure that the angles formed by beams and supports are precise. A slight error in these angles can lead to structural weaknesses or even failures. For instance, if the angle increment between two intersecting beams is not calculated correctly, it may result in uneven weight distribution, compromising the integrity of the entire structure. Therefore, understanding how to measure and apply angle increments accurately is essential for creating safe and reliable designs.In robotics, the concept of angle increment is equally important. Robots often operate in environments where precision is critical. Engineers program robots to move in specific angles, and any deviation due to incorrect angle increments can lead to errors in tasks such as assembly or navigation. For example, a robotic arm tasked with placing components on a circuit board must adhere to precise angle increments to ensure that each piece is positioned correctly. If the arm rotates by an incorrect angle increment, it could misplace components, leading to faulty products.Moreover, in the field of astronomy, understanding angle increments is vital for tracking celestial bodies. Astronomers measure the positions of stars and planets using angular measurements. The angle increment helps them calculate the movement of these bodies over time. By knowing the angle increment between observations, astronomers can predict future positions and movements, which is essential for navigation and exploration.In conclusion, the concept of angle increment is fundamental across various disciplines. Whether in engineering, architecture, robotics, or astronomy, the ability to understand and apply angle increments effectively can lead to improved accuracy and efficiency in tasks. As technology continues to advance, the importance of mastering such concepts will only grow, highlighting the need for education and training in these areas. By recognizing the significance of angle increments, individuals can enhance their skills and contribute to innovations in their respective fields.

在几何和物理的领域中，术语角增量指的是角度测量中的小变化，这在各种应用中可能显著影响计算和结果。理解这一概念对学生和专业人士来说至关重要，特别是在工程、建筑和机器人等领域。角增量可以定义为两个角之间的差异，通常以度或弧度表示。例如，如果一个人将轮子从30度旋转到45度，则角增量为15度。这一看似简单的计算在更复杂的场景中发挥着重要作用，例如确定抛射物的轨迹或机器人手臂的路径。在设计结构时，建筑师必须考虑角增量以确保梁和支撑形成的角度是精确的。这些角度的微小错误可能导致结构的弱点甚至失败。例如，如果两根交叉梁之间的角增量没有正确计算，可能会导致不均匀的重量分布，从而危及整个结构的完整性。因此，了解如何准确测量和应用角增量对于创建安全可靠的设计至关重要。在机器人技术中，角增量的概念同样重要。机器人常常在精度至关重要的环境中操作。工程师编程机器人以特定的角度移动，任何由于不正确的角增量导致的偏差都可能导致任务中的错误。例如，负责将组件放置在电路板上的机器人手臂必须遵循精确的角增量，以确保每个部件的正确定位。如果手臂旋转了错误的角增量，可能会导致组件放错位置，从而导致产品缺陷。此外，在天文学领域，理解角增量对于追踪天体至关重要。天文学家使用角度测量来测量恒星和行星的位置。角增量帮助他们计算这些天体随时间的运动。通过了解观察之间的角增量，天文学家可以预测未来的位置和运动，这对导航和探索至关重要。总之，角增量的概念在各个学科中都是基础。无论是在工程、建筑、机器人还是天文学中，有效理解和应用角增量的能力都能提高任务的准确性和效率。随着技术的不断进步，掌握这些概念的重要性只会增加，这突显了在这些领域进行教育和培训的必要性。通过认识到角增量的重要性，个人可以提升自己的技能，为各自领域的创新做出贡献。