dimensionless quantity
无量纲量
dimensionless parameter
无量纲参数
dimensionless number
无因次数;无量纲数
Based on the theory of light wave propagation in turbulent media, the scaling exponents could be given by the method of determining dimensionless interzone.
根据光在湍流介质中的传输理论确定无标度区间得到边界层各高度处的标度指数。
The concept of dimensionless quantity is commonly used in physics.
无量纲量的概念在物理学中常被使用。
Dimensionless numbers are important in fluid mechanics.
无量纲数在流体力学中很重要。
It is necessary to use dimensionless parameters in certain mathematical models.
在某些数学模型中,使用无量纲参数是必要的。
Dimensionless analysis simplifies complex problems in engineering.
无量纲分析简化了工程中的复杂问题。
The dimensionless form of a physical equation can reveal important relationships.
物理方程的无量纲形式可以揭示重要的关系。
Dimensionless scaling is commonly used in experimental studies.
无量纲缩放常被用于实验研究中。
Understanding dimensionless quantities is essential in certain scientific fields.
理解无量纲量在某些科学领域中是至关重要的。
Dimensionless analysis helps in comparing different systems.
无量纲分析有助于比较不同系统。
Dimensionless groups play a crucial role in heat transfer calculations.
无量纲组在热传递计算中起着至关重要的作用。
Dimensionless parameters allow for normalization of data in various applications.
无量纲参数允许在各种应用中对数据进行归一化。
dimensionless quantity
无量纲量
dimensionless parameter
无量纲参数
dimensionless number
无因次数;无量纲数
Based on the theory of light wave propagation in turbulent media, the scaling exponents could be given by the method of determining dimensionless interzone.
根据光在湍流介质中的传输理论确定无标度区间得到边界层各高度处的标度指数。
The concept of dimensionless quantity is commonly used in physics.
无量纲量的概念在物理学中常被使用。
Dimensionless numbers are important in fluid mechanics.
无量纲数在流体力学中很重要。
It is necessary to use dimensionless parameters in certain mathematical models.
在某些数学模型中,使用无量纲参数是必要的。
Dimensionless analysis simplifies complex problems in engineering.
无量纲分析简化了工程中的复杂问题。
The dimensionless form of a physical equation can reveal important relationships.
物理方程的无量纲形式可以揭示重要的关系。
Dimensionless scaling is commonly used in experimental studies.
无量纲缩放常被用于实验研究中。
Understanding dimensionless quantities is essential in certain scientific fields.
理解无量纲量在某些科学领域中是至关重要的。
Dimensionless analysis helps in comparing different systems.
无量纲分析有助于比较不同系统。
Dimensionless groups play a crucial role in heat transfer calculations.
无量纲组在热传递计算中起着至关重要的作用。
Dimensionless parameters allow for normalization of data in various applications.
无量纲参数允许在各种应用中对数据进行归一化。
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