angle of oscillation

简明释义

摆动角

英英释义

例句

1.To optimize the performance of the engine, we adjusted the angle of oscillation 振荡角度 in the vibration analysis.

为了优化发动机的性能，我们在振动分析中调整了振荡角度 angle of oscillation。

2.The angle of oscillation 振荡角度 can be calculated using trigonometric functions in our simulation model.

在我们的仿真模型中，可以使用三角函数计算振荡角度 angle of oscillation。

3.In the physics lab, we studied the angle of oscillation 振荡角度 of a spring-mass system.

在物理实验室，我们研究了弹簧-质量系统的振荡角度 angle of oscillation。

4.The angle of oscillation 振荡角度 affects the stability of the structure during an earthquake.

在地震期间，振荡角度 angle of oscillation影响结构的稳定性。

5.The engineer measured the angle of oscillation 振荡角度 of the pendulum to ensure it was functioning correctly.

工程师测量了摆的振荡角度 angle of oscillation以确保其正常运作。

作文

The concept of the angle of oscillation is crucial in understanding various physical phenomena, especially in the fields of physics and engineering. To put it simply, the angle of oscillation refers to the angle at which an object swings back and forth around a central point or equilibrium position. This concept can be observed in numerous systems, from simple pendulums to complex mechanical structures. In a pendulum, for instance, the angle of oscillation determines the range of motion as well as the period of oscillation. When a pendulum is displaced from its resting position, it swings back towards that position due to gravitational force. The greater the angle of oscillation, the larger the arc it describes. However, it is important to note that for small angles, the motion can be approximated as simple harmonic motion, which allows for easier calculations. Understanding the angle of oscillation is not only significant in theoretical studies but also has practical applications. Engineers must consider this angle when designing structures that may be subjected to oscillatory forces, such as bridges or buildings in earthquake-prone areas. If the angle of oscillation is too great, it could lead to structural failure. Thus, incorporating knowledge about the angle of oscillation into design processes can enhance safety and durability. Moreover, the angle of oscillation plays a vital role in various technologies. For example, in the world of robotics, understanding how different joints oscillate can help in creating more efficient and effective robotic arms. By analyzing the angle of oscillation of each joint, engineers can improve the range of motion and precision of robotic movements. Similarly, in the field of acoustics, the angle of oscillation of sound waves can influence how sound travels through different mediums, affecting everything from musical instrument design to architectural acoustics. In conclusion, the angle of oscillation is a fundamental concept that spans across multiple disciplines. Its implications are far-reaching, impacting everything from basic physics to advanced engineering and technology. By thoroughly understanding the angle of oscillation, we can better predict and manipulate the behavior of oscillating systems, leading to innovations and improvements in various fields. As we continue to explore the intricacies of oscillation, the angle of oscillation will undoubtedly remain a key topic of interest and research. Overall, whether in academic studies or practical applications, the angle of oscillation serves as a bridge connecting theory with real-world phenomena, highlighting the importance of interdisciplinary knowledge in solving complex problems.

振荡角的概念在理解各种物理现象中至关重要，尤其是在物理和工程领域。简单来说，振荡角指的是一个物体围绕中心点或平衡位置来回摆动时的角度。这个概念可以在许多系统中观察到，从简单的摆到复杂的机械结构。例如，在摆的运动中，振荡角决定了运动范围以及振荡周期。当摆从静止位置偏移时，由于重力作用，它会向该位置摆动。振荡角越大，摆动的弧度就越大。然而，需要注意的是，对于小角度，运动可以近似为简谐运动，这使得计算更加简单。理解振荡角不仅在理论研究中重要，而且在实际应用中也具有重要意义。工程师在设计可能受到振荡力影响的结构（例如地震易发地区的桥梁或建筑物）时，必须考虑这个角度。如果振荡角过大，可能导致结构失效。因此，将关于振荡角的知识融入设计过程中，可以提高安全性和耐用性。此外，振荡角在各种技术中也发挥着重要作用。例如，在机器人领域，理解不同关节的振荡方式可以帮助创建更高效、更有效的机器人手臂。通过分析每个关节的振荡角，工程师可以改善机器人的运动范围和精确度。同样，在声学领域，声波的振荡角可以影响声音在不同介质中的传播，影响从乐器设计到建筑声学的方方面面。总之，振荡角是一个跨越多个学科的基本概念。它的影响范围广泛，影响从基础物理到先进工程和技术。通过深入理解振荡角，我们可以更好地预测和操控振荡系统的行为，从而在各个领域带来创新和改进。随着我们继续探索振荡的复杂性，振荡角无疑将继续成为一个关键的研究主题。总体而言，无论是在学术研究还是实际应用中，振荡角都作为连接理论与现实现象的桥梁，突显出跨学科知识在解决复杂问题中的重要性。