angle of rotation

简明释义

转动角

英英释义

例句

1.To align the gears properly, ensure the angle of rotation 旋转角度 is set to 90 degrees.

为了正确对齐齿轮，请确保旋转角度设置为90度。

2.The artist adjusted the angle of rotation 旋转角度 of the canvas to achieve a better perspective.

艺术家调整了画布的旋转角度以获得更好的视角。

3.The robot arm can move to any position by adjusting the angle of rotation 旋转角度.

机器人手臂可以通过调整旋转角度来移动到任何位置。

4.In this simulation, we will change the angle of rotation 旋转角度 to see how it affects the object's trajectory.

在这个模拟中，我们将改变旋转角度来观察它如何影响物体的轨迹。

5.When designing the fan, we had to calculate the optimal angle of rotation 旋转角度 for maximum airflow.

在设计风扇时，我们必须计算最佳的旋转角度以获得最大气流。

作文

In the realm of geometry and physics, the concept of angle of rotation plays a crucial role in understanding how objects move and interact in space. The angle of rotation refers to the measure of the degree to which an object has rotated around a specific point or axis. It is typically measured in degrees or radians, providing a quantitative way to describe rotational motion. This concept not only applies to simple shapes but also extends to complex systems such as gears, wheels, and celestial bodies.To illustrate the importance of the angle of rotation, consider a spinning wheel. When the wheel rotates, each point on its circumference moves through a certain angle of rotation relative to the center of the wheel. If the wheel makes a complete turn, it has rotated through an angle of rotation of 360 degrees or 2π radians. Understanding this angle of rotation helps engineers design better vehicles, as they can calculate how far the wheel will travel based on its rotation.In robotics, the angle of rotation is essential for programming movements. For instance, if a robotic arm needs to pick up an object, the programmer must specify the angle of rotation required for the arm to reach the object's position accurately. By controlling the angle of rotation, the robot can perform tasks with precision, enhancing efficiency in various applications from manufacturing to surgery.Furthermore, in the field of animation, the angle of rotation is vital for creating realistic movements. Animators manipulate the angle of rotation of characters and objects to simulate lifelike actions. For example, when a character turns their head, the animator must adjust the angle of rotation to reflect the natural movement of the neck and shoulders. This attention to detail ensures that animations are believable and engaging for the audience.In mathematics, particularly in trigonometry, the angle of rotation is used to define the relationship between angles and the coordinates of points in a plane. By applying the concept of angle of rotation, one can determine the new coordinates of a point after it has been rotated around a given origin. This application is fundamental in fields such as computer graphics, where manipulation of shapes and images relies heavily on understanding rotations and transformations.Moreover, the angle of rotation is not limited to two-dimensional spaces; it also extends into three dimensions. In 3D modeling and animation, the angle of rotation around different axes (x, y, and z) allows for the creation of complex movements and orientations. This capability is crucial in virtual reality environments, where users can interact with objects in a fully immersive space.In conclusion, the angle of rotation is a fundamental concept that permeates various disciplines including geometry, physics, robotics, animation, and mathematics. Its significance lies in its ability to describe and quantify rotational motion, enabling advancements in technology and creativity. By mastering the angle of rotation, individuals can enhance their understanding of the physical world and apply this knowledge in practical and innovative ways. Whether designing a vehicle, programming a robot, or creating an animated film, the angle of rotation remains an essential element in the toolkit of modern science and art.

在几何和物理的领域中，角度旋转的概念在理解物体如何在空间中移动和相互作用方面发挥着至关重要的作用。角度旋转指的是物体围绕特定点或轴旋转的程度的测量。它通常以度或弧度为单位进行测量，提供了一种定量描述旋转运动的方式。这个概念不仅适用于简单的形状，还扩展到复杂的系统，如齿轮、轮子和天体。为了说明角度旋转的重要性，考虑一个旋转的轮子。当轮子旋转时，其周长上的每个点相对于轮子的中心移动通过某个角度旋转。如果轮子完成一整圈，它已经旋转了360度或2π弧度的角度旋转。理解这个角度旋转有助于工程师设计更好的车辆，因为他们可以根据轮子的旋转计算出轮子将行驶多远。在机器人技术中，角度旋转对于编程运动至关重要。例如，如果一个机器人手臂需要拾取一个物体，程序员必须指定手臂所需的角度旋转以准确到达物体的位置。通过控制角度旋转，机器人可以精确地执行任务，提高各种应用中的效率，从制造到外科手术。此外，在动画领域，角度旋转对创建现实的动作至关重要。动画师操纵角色和物体的角度旋转以模拟逼真的动作。例如，当一个角色转动头部时，动画师必须调整角度旋转以反映颈部和肩膀的自然运动。这种对细节的关注确保了动画对观众的可信度和吸引力。在数学中，尤其是在三角学中，角度旋转用于定义角度与平面中点的坐标之间的关系。通过应用角度旋转的概念，可以确定点在围绕给定原点旋转后新的坐标。这个应用在计算机图形学等领域是基础，其中形状和图像的操作在很大程度上依赖于理解旋转和变换。此外，角度旋转不仅限于二维空间；它还扩展到三维空间。在3D建模和动画中，围绕不同轴（x、y和z）的角度旋转允许创建复杂的运动和方向。这种能力在虚拟现实环境中至关重要，用户可以在完全沉浸的空间中与物体互动。总之，角度旋转是一个基本概念，渗透到几何、物理、机器人、动画和数学等多个学科中。它的重要性在于能够描述和量化旋转运动，使科技和创造力得以进步。通过掌握角度旋转，个人可以增强对物理世界的理解，并以实用和创新的方式应用这些知识。无论是设计车辆、编程机器人，还是制作动画电影，角度旋转始终是现代科学和艺术工具箱中的一个重要元素。