ground constants

简明释义

大地常数

英英释义

例句

1.In physics, we often refer to ground constants as 基础常数 that define the fundamental properties of matter.

在物理学中，我们常常将ground constants称为基础常数，它们定义了物质的基本属性。

2.Engineers must take into account the ground constants 基础常数 when designing structures to ensure stability.

工程师在设计结构时必须考虑ground constants 基础常数以确保稳定性。

3.The ground constants 基础常数 of gravity play a vital role in astrophysics.

重力的ground constants 基础常数在天体物理学中起着至关重要的作用。

4.In chemistry, understanding the ground constants 基础常数 helps predict reaction outcomes.

在化学中，理解ground constants 基础常数有助于预测反应结果。

5.The calculation of ground constants 基础常数 is crucial for accurate scientific experiments.

计算ground constants 基础常数对于准确的科学实验至关重要。

作文

In the realm of physics and engineering, the term ground constants refers to fundamental parameters that remain unchanged under specific conditions. These constants play a crucial role in various calculations and models, providing a stable foundation upon which theories can be built. For instance, the acceleration due to gravity on Earth is considered a ground constant, as it is approximately 9.81 m/s² regardless of the location on the planet's surface. This constancy allows engineers and scientists to predict the behavior of objects in free fall with remarkable accuracy.Understanding ground constants is essential for anyone involved in scientific research or practical applications, such as construction, aerospace, and environmental studies. These constants enable professionals to create reliable models that can simulate real-world scenarios. For example, when designing a bridge, engineers must account for the ground constants related to material strength, load distribution, and gravitational forces to ensure safety and durability.Moreover, ground constants are not limited to physical sciences. In mathematics, certain values serve as constants that provide a basis for equations and formulas. The number pi (π), which represents the ratio of a circle's circumference to its diameter, is a prime example of a mathematical ground constant. Its value remains the same, allowing mathematicians to solve problems involving circles consistently.In the field of environmental science, understanding ground constants related to atmospheric pressure and temperature can help predict weather patterns and climate changes. These constants are vital for developing accurate climate models that inform policy decisions and conservation efforts. Without a grasp of these fundamental values, it would be nearly impossible to address complex issues like global warming or natural resource management.Furthermore, the concept of ground constants extends into social sciences as well. In economics, certain principles act as constants that guide market behaviors. For example, the law of supply and demand serves as a ground constant in economic theory, helping economists forecast market trends and consumer behavior. By recognizing these underlying constants, policymakers can make informed decisions that promote economic stability.In conclusion, ground constants are essential across various fields of study and practical applications. They provide a reliable framework that supports theories, models, and predictions. Whether in physics, mathematics, environmental science, or economics, understanding and utilizing these constants is crucial for advancing knowledge and addressing real-world challenges. As we continue to explore the complexities of our world, recognizing the importance of ground constants will undoubtedly enhance our ability to innovate and solve problems effectively.

在物理和工程领域，术语ground constants指的是在特定条件下保持不变的基本参数。这些常数在各种计算和模型中发挥着至关重要的作用，为理论构建提供了稳定的基础。例如，地球上的重力加速度被视为一个ground constant，因为它在地球表面的任何地点大约为9.81米/秒²。这种恒定性使工程师和科学家能够以惊人的准确性预测自由落体物体的行为。理解ground constants对于任何参与科学研究或实际应用的人来说都是至关重要的，如建筑、航空航天和环境研究。这些常数使专业人士能够创建可靠的模型，模拟现实世界的场景。例如，在设计桥梁时，工程师必须考虑与材料强度、载荷分布和重力相关的ground constants，以确保安全和耐用性。此外，ground constants不仅限于物理科学。在数学中，某些值作为常数提供了方程和公式的基础。圆周率（π）是一个数学ground constant的典型例子，它代表圆的周长与直径的比值。它的值保持不变，使数学家能够一致地解决涉及圆的问题。在环境科学领域，理解与大气压力和温度相关的ground constants可以帮助预测天气模式和气候变化。这些常数对开发准确的气候模型至关重要，这些模型为政策决策和保护工作提供信息。如果没有对这些基本值的掌握，几乎不可能解决全球变暖或自然资源管理等复杂问题。此外，ground constants的概念也延伸到社会科学。在经济学中，某些原则充当常数，指导市场行为。例如，供需法则在经济理论中作为ground constant，帮助经济学家预测市场趋势和消费者行为。通过认识到这些基本常数，政策制定者可以做出促进经济稳定的明智决策。总之，ground constants在各个研究领域和实际应用中都是必不可少的。它们提供了支持理论、模型和预测的可靠框架。无论是在物理学、数学、环境科学还是经济学中，理解和利用这些常数对于推动知识进步和解决现实世界挑战至关重要。随着我们继续探索世界的复杂性，认识到ground constants的重要性无疑将增强我们有效创新和解决问题的能力。