Drag Coefficient The drag coefficient quantifies the drag or resistance of an object in a fluid environment. Thermal properties of water at different temperatures like density, freezing temperature, boiling temperature, latent heat of melting, latent heat of evaporation, critical temperature and more. Viscosity at 20C/68F and 50C/122F for more than 120 crudes is shown as function of specific gravity15C/60F. Introduction and definition of the dimensionless Reynolds Number - online calculators. Temperature and Pressureįigures and tables with Prandtl Number of liquid and gaseous propane at varying temperarure and pressure, SI and Imperial units. Temperature and Pressureįigures and tables showing Prandtl number of nitrogen at varying temperarure and pressure, SI and Imperial units. Thermodynamic properties of dry air - specific heat, ratio of specific heats, dynamic viscosity, thermal conductivity, Prandtl number, density and kinematic viscosity at temperatures ranging 175 - 1900 K.įigures and table showing changes in Prandtl number for methane with changes in temperature and pressure. Physical and chemical dimensionless quantities - Reynolds number, Euler, Nusselt, and Prandtl number - and many more.ĭry Air - Thermodynamic and Physical Properties Properties of saturated liquid Carbon Dioxide - CO 2 - density, specific heat, kinematic viscosity, thermal conductivity and Prandtl number. Temperature and Pressureįigures and table with changes in Prandtl number for ammonia with changes in temperature and pressure. Ideal gas properties of air at low pressure - SI units.Īmmonia - Prandtl Number vs. Thermodynamic properties of air at low pressures - imperial units. Involving velocity, pressure, density and temperature as functions of space and time. The Prandtl Number is often used in heat transfer and free and forced convection calculations. It depends on the fluid properties.Įxample - Calculation of a Prandtl Numberĭynamic viscosity can be converted from cP to lb m /(ft h) as ![]() K = thermal conductivity (W/m K, Btu/(h ft 2 o F/ft)) Μ = absolute or dynamic viscosity (kg/m s, lb m /(ft h) )Ĭ p = specific heat (J/kg K, Btu/(lb m o F)) The Prandtl number can alternatively be expressed as ![]() The Prandtl Number is a dimensionless number approximating the ratio of momentum diffusivity (kinematic viscosity) to thermal diffusivity - and can be expressed as
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