Köhler theory describes the process in which water vapor condenses and forms liquid cloud drops, and is based on equilibrium thermodynamics. It combines the Kelvin effect, which describes the change in saturation vapor pressure due to a curved surface, and Raoult's Law, which relates the saturation vapor pressure to the solute.[1] It is an important process in the field of cloud physics. It was initially published in 1936 by Hilding Köhler, Professor of Meteorology in the Uppsala University.
Kohler curves showing how the critical diameter and supersaturation are dependent upon the amount of solute. It's assumed here that the solute is a perfect sphere of sodium chloride.
Köhler equation:
where is the droplet water vapor pressure, is the corresponding saturation vapor pressure over a flat surface, is the droplet surface tension, is the density of pure water, is the moles of solute, is the molecular weight of water, and is the cloud drop diameter.
Köhler curveedit
The Köhler curve is the visual representation of the Köhler equation. It shows the supersaturation at which the cloud drop is in equilibrium with the environment over a range of droplet diameters. The exact shape of the curve is dependent upon the amount and composition of the solutes present in the atmosphere. The Köhler curves where the solute is sodium chloride are different from when the solute is sodium nitrate or ammonium sulfate.
The figure above shows three Köhler curves of sodium chloride. Consider (for droplets containing solute with diameter equal to 0.05 micrometers) a point on the graph where the wet diameter is 0.1 micrometers and the supersaturation is 0.35%. Since the relative humidity is above 100%, the droplet will grow until it is in thermodynamic equilibrium. As the droplet grows, it never encounters equilibrium, and thus grows without bound. However, if the supersaturation is only 0.3%, the drop will only grow until about 0.5 micrometers. The supersaturation at which the drop will grow without bound is called the critical supersaturation. The diameter at which the curve peaks is called the critical diameter.
See alsoedit
Kelvin equation – Equation describing the change in vapour pressure due to a curved liquid–vapor interface
köhler, theory, describes, process, which, water, vapor, condenses, forms, liquid, cloud, drops, based, equilibrium, thermodynamics, combines, kelvin, effect, which, describes, change, saturation, vapor, pressure, curved, surface, raoult, which, relates, satur. Kohler theory describes the process in which water vapor condenses and forms liquid cloud drops and is based on equilibrium thermodynamics It combines the Kelvin effect which describes the change in saturation vapor pressure due to a curved surface and Raoult s Law which relates the saturation vapor pressure to the solute 1 It is an important process in the field of cloud physics It was initially published in 1936 by Hilding Kohler Professor of Meteorology in the Uppsala University Kohler curves showing how the critical diameter and supersaturation are dependent upon the amount of solute It s assumed here that the solute is a perfect sphere of sodium chloride Kohler equation ln pw Dp p0 4MwswRTrwDp 6nsMwprwDp3 displaystyle ln left frac p w D p p 0 right frac 4M w sigma w RT rho w D p frac 6n s M w pi rho w D p 3 where pw displaystyle p w is the droplet water vapor pressure p0 displaystyle p 0 is the corresponding saturation vapor pressure over a flat surface sw displaystyle sigma w is the droplet surface tension rw displaystyle rho w is the density of pure water ns displaystyle n s is the moles of solute Mw displaystyle M w is the molecular weight of water and Dp displaystyle D p is the cloud drop diameter Kohler curve editThe Kohler curve is the visual representation of the Kohler equation It shows the supersaturation at which the cloud drop is in equilibrium with the environment over a range of droplet diameters The exact shape of the curve is dependent upon the amount and composition of the solutes present in the atmosphere The Kohler curves where the solute is sodium chloride are different from when the solute is sodium nitrate or ammonium sulfate The figure above shows three Kohler curves of sodium chloride Consider for droplets containing solute with diameter equal to 0 05 micrometers a point on the graph where the wet diameter is 0 1 micrometers and the supersaturation is 0 35 Since the relative humidity is above 100 the droplet will grow until it is in thermodynamic equilibrium As the droplet grows it never encounters equilibrium and thus grows without bound However if the supersaturation is only 0 3 the drop will only grow until about 0 5 micrometers The supersaturation at which the drop will grow without bound is called the critical supersaturation The diameter at which the curve peaks is called the critical diameter See also editKelvin equation Equation describing the change in vapour pressure due to a curved liquid vapor interface Ostwald Freundlich equation Equation describing a phase boundaryReferences edit Kohler Theory 101 Retrieved 2012 06 26 Kohler H 1936 The nucleus in and the growth of hygroscopic droplets Trans Faraday Soc 32 1152 1161 Rogers R R M K Yau 1989 A Short Course in Cloud Physics 3rd Ed Pergamon Press 293 pp Young K C 1993 Microphysical Processes in Clouds Oxford Press 427 pp Wallace J M P V Hobbs 1977 Atmospheric Science An Introductory Survey Academic Press 467 pp nbsp This cloud related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Kohler theory amp oldid 1185707878, wikipedia, wiki, book, books, library,
