angular oscillation

简明释义

1. 角摆动; 2. 角振荡;

英英释义

例句

1.In a mechanical system, angular oscillation 角振荡 can lead to resonance if not properly damped.

在机械系统中，如果没有适当的阻尼，角振荡 angular oscillation 可能会导致共振。

2.The researchers measured the angular oscillation 角振荡 of the rotor using a high-speed camera.

研究人员使用高速摄像机测量了转子的角振荡 angular oscillation。

3.An increase in the angular oscillation 角振荡 frequency indicates a change in the system's energy state.

频率的增加表示系统能量状态的变化，角振荡 angular oscillation 的频率也是如此。

4.The design of the bridge must account for angular oscillation 角振荡 caused by wind and traffic.

桥梁的设计必须考虑风和交通引起的角振荡 angular oscillation。

5.The pendulum exhibits a regular angular oscillation 角振荡 as it swings back and forth.

这个摆钟展示了规律的角振荡 angular oscillation，它来回摆动。

作文

In the world of physics, various concepts help us understand the behavior of different systems. One such concept is angular oscillation, which refers to the repetitive movement of an object around a central point or axis. This phenomenon is crucial in many fields, including engineering, mechanics, and even in the study of natural systems. To grasp the significance of angular oscillation, we must first explore its underlying principles and applications.Angular oscillation occurs when an object moves back and forth around a pivot point. A classic example of this is a pendulum swinging from side to side. The motion of the pendulum can be described as an angular oscillation because it rotates around a fixed point while continuously changing its angle. The key characteristics of this movement include the amplitude, period, and frequency. Amplitude refers to the maximum angle the pendulum reaches from its resting position, while the period is the time it takes to complete one full swing. Frequency, on the other hand, is the number of oscillations per unit of time.Understanding angular oscillation is essential for designing various mechanical systems. For instance, engineers often use this concept when creating gears and levers, ensuring that they operate smoothly and efficiently. By applying the principles of angular oscillation, they can predict how these components will behave under different conditions, leading to safer and more reliable machines.Moreover, angular oscillation is not limited to mechanical systems; it also plays a significant role in nature. For example, the Earth’s rotation around its axis can be seen as a form of angular oscillation. This rotation affects various phenomena, including day and night cycles, weather patterns, and even the migration of animals. By studying these oscillations, scientists can gain valuable insights into the dynamics of our planet and its ecosystems.In addition to its practical applications, angular oscillation also has theoretical implications. In the realm of quantum mechanics, particles exhibit behaviors that can be described by oscillatory functions. These functions help scientists understand the probability of finding a particle in a particular state. The concept of angular oscillation thus extends beyond classical mechanics, influencing our comprehension of the fundamental aspects of the universe.In conclusion, angular oscillation is a vital concept that permeates various fields of study. Its importance lies not only in its practical applications in engineering and mechanics but also in its relevance to natural phenomena and theoretical physics. By understanding the principles of angular oscillation, we can better appreciate the intricacies of both man-made systems and the natural world. As we continue to explore and innovate, the knowledge of angular oscillation will undoubtedly play a pivotal role in shaping our future advancements.

角振荡是物理学中的一个重要概念，指的是物体围绕中心点或轴线的重复运动。这种现象在许多领域中都是至关重要的，包括工程、机械，甚至自然系统的研究。为了更好地理解角振荡的意义，我们必须首先探讨其基本原理和应用。角振荡发生在物体围绕一个支点前后移动时。一个经典的例子就是摆锤从一侧摆动到另一侧。摆锤的运动可以描述为一种角振荡，因为它围绕一个固定点旋转，同时不断改变其角度。该运动的关键特征包括振幅、周期和频率。振幅是指摆锤从静止位置达到的最大角度，而周期是完成一个完整摆动所需的时间。频率则是单位时间内的振荡次数。理解角振荡对于设计各种机械系统至关重要。例如，工程师在创建齿轮和杠杆时，经常运用这一概念，以确保它们的平稳和高效运作。通过应用角振荡的原理，他们可以预测这些组件在不同条件下的表现，从而使机器更加安全可靠。此外，角振荡不仅限于机械系统；它在自然界中也发挥着重要作用。例如，地球围绕其轴线的旋转可以视为一种角振荡。这种旋转影响着昼夜循环、天气模式，甚至动物的迁徙。通过研究这些振荡，科学家能够获得关于我们星球及其生态系统动态的宝贵见解。除了实际应用外，角振荡还具有理论意义。在量子力学领域，粒子表现出可以用振荡函数描述的行为。这些函数帮助科学家理解在特定状态下找到粒子的概率。因此，角振荡的概念超越了经典力学，影响了我们对宇宙基本方面的理解。总之，角振荡是一个渗透于各个研究领域的重要概念。它的重要性不仅体现在工程和机械的实际应用中，还体现在其对自然现象和理论物理的相关性上。通过理解角振荡的原理，我们可以更好地欣赏人造系统和自然世界的复杂性。随着我们继续探索和创新，角振荡的知识无疑将在塑造未来的进步中发挥关键作用。