degrees rotation

简明释义

旋转角

英英释义

例句

1.The robot arm can perform a full 360 degrees rotation at its joint.

机器人手臂可以在其关节处进行完整的360度旋转。

2.To adjust the camera angle, turn it by 45 degrees rotation to the left.

要调整相机角度，向左旋转45度。

3.The wheel needs a 90 degrees rotation to align properly with the axle.

这个轮子需要进行90度旋转才能与轴对齐。

4.The design requires a 30 degrees rotation for better aesthetics.

设计需要进行30度旋转以获得更好的美感。

5.For optimal airflow, the fan should be set to a 180 degrees rotation position.

为了获得最佳气流，风扇应该设置为180度旋转的位置。

作文

In the world of physics and engineering, understanding the concept of degrees rotation is essential for many applications. Degrees rotation refers to the measurement of the angle through which an object has rotated about a specific axis. This concept is not only fundamental in theoretical studies but also plays a critical role in practical scenarios such as robotics, animation, and even everyday activities like opening a door or turning a steering wheel. For instance, when a wheel rotates, it does so in a certain number of degrees rotation, which can be measured from its starting position. To put this into perspective, consider a full circle. A complete turn around a circle constitutes a rotation of 360 degrees. Therefore, if a wheel turns halfway around, it has undergone a degrees rotation of 180 degrees. This measurement allows engineers to calculate distances traveled by wheels or gears based on their rotational movement. Similarly, in robotics, understanding how far a robotic arm needs to rotate to pick up an object involves calculating the necessary degrees rotation. Moreover, the concept of degrees rotation is crucial in various fields such as computer graphics and animation. When animators create characters that move in a three-dimensional space, they must carefully consider the degrees rotation of each limb and feature to ensure realistic movement. For example, if an animated character raises its arm, the animator must specify the degrees rotation at the shoulder joint to achieve a natural-looking motion. In addition to practical applications, degrees rotation also connects to more abstract concepts in mathematics. In trigonometry, angles are often measured in degrees, and understanding how to manipulate these angles is vital in solving problems related to rotation. For example, the sine and cosine functions are used to determine the coordinates of points on a circle based on their degrees rotation. Furthermore, degrees rotation can also be applied in navigation and geography. When pilots or ships navigate, they frequently use bearings, which are often expressed in degrees. A pilot may need to adjust their course by a certain number of degrees rotation to reach their destination accurately. This application highlights the importance of understanding rotational measurements in real-world scenarios. In conclusion, the concept of degrees rotation is a fundamental aspect of various disciplines, including physics, engineering, robotics, animation, mathematics, and navigation. By grasping this concept, individuals can better understand how objects move and interact in both theoretical and practical contexts. Whether it’s calculating the distance a wheel has traveled or creating lifelike animations, the ability to measure and apply degrees rotation is invaluable. As technology continues to advance, the significance of mastering this concept will only grow, making it an essential topic for students and professionals alike.

在物理和工程的世界中，理解度数旋转这一概念对于许多应用至关重要。度数旋转是指物体围绕特定轴旋转的角度的测量。这个概念不仅在理论研究中是基础，在实际场景中也起着关键作用，例如机器人技术、动画，甚至日常活动如开门或转动方向盘。例如，当一个轮子旋转时，它以一定的度数旋转进行，这可以从它的起始位置进行测量。为了更好地理解这一点，可以考虑一个完整的圆圈。围绕一个圆圈的完整旋转构成360度的旋转。因此，如果一个轮子转了一半，它经历的度数旋转就是180度。这种测量使工程师能够根据轮子或齿轮的旋转运动计算行驶的距离。同样，在机器人技术中，理解机器人手臂需要旋转多少度以拾取物体也涉及到计算所需的度数旋转。此外，度数旋转的概念在计算机图形学和动画等各个领域也至关重要。当动画师创建在三维空间中移动的角色时，他们必须仔细考虑每个肢体和特征的度数旋转，以确保动作的真实感。例如，如果一个动画角色抬起手臂，动画师必须指定肩关节的度数旋转，以实现自然的运动。除了实际应用外，度数旋转还与数学中的一些抽象概念相关。在三角学中，角度通常以度数为单位进行测量，理解如何操作这些角度对于解决与旋转相关的问题至关重要。例如，正弦和余弦函数用于根据其度数旋转确定圆上点的坐标。此外，度数旋转还可以应用于导航和地理。当飞行员或船只导航时，他们经常使用方位角，通常以度数表示。飞行员可能需要通过一定数量的度数旋转来调整他们的航向，以准确到达目的地。这一应用强调了理解旋转测量在现实场景中的重要性。总之，度数旋转的概念是物理、工程、机器人技术、动画、数学和导航等多个学科的基础方面。通过掌握这一概念，个人可以更好地理解物体在理论和实践背景下的运动和互动。无论是计算轮子行驶的距离，还是创建逼真的动画，测量和应用度数旋转的能力都是无价的。随着科技的不断进步，掌握这一概念的重要性只会增加，使其成为学生和专业人士必不可少的主题。