proportionality band

简明释义

比例频带

英英释义

例句

1.In the new software update, the developers adjusted the proportionality band to enhance user experience.

在新的软件更新中，开发者调整了比例带以提升用户体验。

2.The engineer explained how the proportionality band affects the system's response time.

工程师解释了比例带如何影响系统的响应时间。

3.To ensure accuracy, we need to calibrate the proportionality band before running the tests.

为了确保准确性，我们需要在进行测试之前校准比例带。

4.The proportionality band in the control system helps maintain stability during fluctuations.

控制系统中的比例带有助于在波动期间保持稳定性。

5.Adjusting the proportionality band can significantly improve the performance of the device.

调整比例带可以显著改善设备的性能。

作文

In the realm of mathematics and physics, concepts often find their application in various fields, allowing for a better understanding of complex systems. One such concept is the proportionality band, which refers to a range or interval within which two quantities maintain a consistent ratio. This idea can be particularly useful in fields like economics, engineering, and environmental science, where relationships between variables are crucial. Understanding the proportionality band can lead to more accurate predictions and analyses, fostering innovation and efficiency.To illustrate the significance of the proportionality band, let’s consider a practical example in the context of economics. When analyzing supply and demand, economists often observe that there is a certain range of prices where the quantity supplied and the quantity demanded are in balance. This range can be described as the proportionality band of the market. If the price remains within this band, the market operates efficiently. However, if the price moves outside this range, it can lead to either surplus or shortage, disrupting the equilibrium.Similarly, in the field of engineering, the proportionality band plays a critical role in design and safety assessments. Engineers must ensure that structures can withstand forces such as wind or earthquakes. By understanding the proportionality band of stress and strain on materials, engineers can determine safe limits for construction. This knowledge helps prevent catastrophic failures and ensures the longevity of structures.Moreover, in environmental science, the proportionality band can be applied to understand the relationship between pollution levels and public health outcomes. Researchers can identify a proportionality band where pollution levels remain manageable without significantly affecting health. This information is vital for policymakers aiming to create regulations that protect the environment while considering economic impacts.The concept of the proportionality band also extends to statistical analysis, where it aids in identifying correlations between variables. For instance, when conducting regression analysis, researchers look for ranges where the dependent and independent variables exhibit a linear relationship. Identifying the proportionality band allows researchers to make valid inferences and predictions based on their data.In conclusion, the proportionality band is a fundamental concept that finds applications across various disciplines. Whether in economics, engineering, environmental science, or statistics, understanding this concept enables professionals to analyze relationships between variables effectively. As we continue to face complex challenges in our world, the ability to identify and utilize the proportionality band will be increasingly important. It not only helps us make informed decisions but also drives innovation and contributes to sustainable development. By mastering the idea of the proportionality band, we equip ourselves with a powerful tool for navigating the intricacies of our interconnected world.

在数学和物理的领域中，概念常常在各个领域中找到其应用，从而使我们更好地理解复杂的系统。其中一个这样的概念是比例带，它指的是两个量之间保持一致比例的范围或区间。这个想法在经济学、工程学和环境科学等领域尤为有用，因为变量之间的关系至关重要。理解比例带可以导致更准确的预测和分析，促进创新和效率。为了说明比例带的重要性，我们以经济学中的实际例子来进行阐述。当分析供求关系时，经济学家常常观察到在某个价格范围内，供给量和需求量保持平衡。这个范围可以被描述为市场的比例带。如果价格保持在这个带内，市场就能高效运作。然而，如果价格超出这个范围，就可能导致过剩或短缺，破坏均衡。同样，在工程领域，比例带在设计和安全评估中扮演着关键角色。工程师必须确保结构能够承受风力或地震等力量。通过理解材料的应力和应变的比例带，工程师可以确定建筑的安全极限。这一知识有助于防止灾难性的失败，并确保结构的耐久性。此外，在环境科学中，比例带可以用于理解污染水平与公共健康结果之间的关系。研究人员可以识别一个比例带，在此范围内污染水平保持可控而不会显著影响健康。这一信息对于希望制定保护环境的法规的决策者至关重要，同时也考虑到经济影响。比例带的概念还扩展到统计分析中，帮助识别变量之间的相关性。例如，在进行回归分析时，研究人员寻找因变量和自变量之间表现线性关系的范围。识别比例带使研究人员能够根据数据做出有效的推论和预测。总之，比例带是一个基本概念，在各个学科中都有应用。无论是在经济学、工程学、环境科学还是统计学中，理解这一概念使专业人士能够有效地分析变量之间的关系。随着我们继续面临复杂的挑战，识别和利用比例带的能力将变得越来越重要。它不仅帮助我们做出明智的决策，还推动了创新并有助于可持续发展。通过掌握比例带的概念，我们为自己提供了一种强大的工具，以应对我们相互关联的世界的复杂性。