Dodatkowe przykłady dopasowywane są do haseł w zautomatyzowany sposób - nie gwarantujemy ich poprawności.
There are many fluxes used in the study of transport phenomena.
Diffusion is one of several transport phenomena that occur in nature.
Transport phenomena actually encompasses all agents of physical change in the universe.
Understanding the transport phenomena and surface chemistry such as dispersion is important.
However, the scope here limits the transport phenomena to its relationship to artificial engineered systems.
The ability of an energy level to contribute to transport phenomena is proportional to .
Transport phenomena are processes that lead a system from local to global thermodynamic equilibrium.
An important principle in the study of transport phenomena is analogy between phenomena.
Thus, understanding transport phenomena requires thorough understanding of mathematics.
Transport phenomena are ubiquitous throughout the engineering disciplines.
One can convert from one transfer coefficient to another in order to compare all three different transport phenomena.
This is a very concrete way of demonstrating the analogies between different forms of transport phenomena.
Diffusion is part of the transport phenomena.
Transport phenomena occur frequently in industrial problems.
Basic equations for describing the three transport phenomena in the macroscopic, microscopic and molecular levels are very similar.
Eight of the most common forms of flux from the transport phenomena literature are defined as follows:
Transport phenomena have wide application.
Another example is in biomedical engineering, where some transport phenomena of interest are thermoregulation, perfusion, and microfluidics.
Discrete Nanoscale Transport refers to a class of transport phenomena inside cells.
Dimensionless temperature in transport phenomena.
Transport phenomena.
Every aspect of transport phenomena is grounded in two primary concepts : the conservation laws, and the constitutive equations.
ISO 31-12 gives name, symbol and definition for 25 selected characteristic numbers used for the description of transport phenomena.
Both Ohm's law and Poiseuille's law illustrate transport phenomena.
The Péclet number is a dimensionless number relevant in the study of transport phenomena in fluid flows.