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'''Henry's law''' is one of the [[gas laws]], formulated by the British chemist, William Henry, in 1803.  It states that:
'''Henry's law''' is one of the [[gas laws]], formulated by the British chemist, William Henry, in 1803.  It states that:


:''At a constant [[temperature]], the amount of a given [[gas]]  dissolved in a given type and volume of [[liquid]] is directly proportional to the [[partial pressure]] of that gas in equilibrium with that liquid.''   
:''At a constant [[temperature]], the amount of a given [[gas]]  dissolved in a given type and volume of [[liquid]] is directly proportional to the [[partial pressure]] of that gas in equilibrium with that liquid.''   


==Formula and Henry constant==
==Formula and Henry's law constant==


A formula for Henry's Law is:  
Henry's law is commonly expressed mathematically as:<ref>Furrina Fang Lee (2007). [http://books.google.com/books?id=EHYYy_MDXE0C&printsec=frontcover#v=onepage&q&f=false ''Comprehensive analysis, Henry's law constant determination, and photocatalytic degradation of polychlorinated biphenyls (PCBs) and/or other persistent organic pollutants (POPs]'', Ph.D. dissertation, State University of New York at Albany, pp. 199-201. Published by ProQuest.</ref><ref name=Mortimer>{{cite book|author=Robert G. Mortimer|title=[http://books.google.com/books?id=eH_1dIZr-zMC&printsec=frontcover&dq=intitle:Physical+intitle:Chemistry+inauthor:Mortimer&source=bl&ots=GTm1rPyFkJ&sig=XOrXpc7Zbil4Gjy3hBeaMqHw9-U&hl=en&sa=X&ei=y9ZgUKmPIouhyAG8toH4Cg&ved=0CC8Q6AEwAA#v=onepage&q=Henry%27s%20Law&f=false Physical Chemistry]|edition=Second Edition|publisher=Academic Press|year=2000|pages=pp. 248-250|id=ISBN 0-12-508345-9}}</ref><ref name=Perry's1>{{cite book|author=Don W. Green and Robert H. Perry|title=[[Perry's Chemical Engineers' Handbook]]|edition=6th Edition| publisher=McGraw-Hill|year=1984|id=ISBN 0-07-049479-7}} (See page 14-9)</ref><ref>[http://www.800mainstreet.com/9/0009-006-henry.html Online Introductory Chemistry: Solubility of gases in liquids]</ref>


:<math> e^{p\,} = e^{kc\,} \,</math>
:<math>p = k_{\rm H}\;c</math>


where:
where:
:<math>e\,</math> is approximately 2.7182818, the base of the [[natural logarithm]] (also called [[Euler's number]])
 
:<math>p\,</math> is the partial pressure of the [[solute]] above the [[solution]]
:<math>p\,</math> is the [[partial pressure]] of the [[solute]] above the [[solution]]
:<math>c\,</math> is the [[concentration]] of the solute in the solution (in one of its many units)
:<math>c\,</math> is the [[concentration]] of the solute in the solution (in one of its many units)
:<math>k\,</math> is the Henry's Law constant, which has units such as L·atm/mol, atm/([[mol fraction]]) or Pa·m<sup>3</sup>/mol.
:<math>k_{\rm H}\,</math> is the Henry's law constant, which has units such as L·[[atmosphere (unit)|atm]]/[[Mole (unit)|mol]], atm/[[mole fraction]] or Pa·m<sup>3</sup>/mol.


Taking the [[natural logarithm]] of the formula, gives us the more commonly used formula:<ref>[http://www.udel.edu/pchem/C443/Lectures/Lecture33.pdf University of Delaware physical chemistry lecture]</ref> <ref name=Mortimer>{{cite book|author=Robert G. Mortimer|title=Physical Chemistry|edition=Second Edition|publisher=Academic Press|year=2000|id=ISBN 0-12-508345-9}}</ref><ref name=Perry's>{{cite book|author=Green, Don W. and Perry, Robert H. (deceased)|title=[[Perry's Chemical Engineers' Handbook]]|edition=6th Edition| publisher=McGraw-Hill|year=1997|id=ISBN 0-07-049479-7}} (See page 14-9)</ref><ref>[http://www.800mainstreet.com/9/0009-006-henry.html Online Introductory Chemistry: Solubiltiy of gases in liquids]</ref>
Some values for <math>k_{\rm H}\,</math> include:  


:<math> p = kc \,</math>
:[[oxygen]] (O<sub>2</sub>) : 769.2 L·atm/mol
:[[carbon dioxide]] (CO<sub>2</sub>) : 29.4 L·atm/mol
:[[hydrogen]] (H<sub>2</sub>) : 1282.1 L·atm/mol 


Some values for ''k'' include:
when these gases are dissolved in [[water]] at 298 [[kelvin]]s.


:[[oxygen]] (O<sub>2</sub>) : 769.2 L·atm/mol &nbsp; &nbsp; &nbsp;
'''As shown in Table 1 below, there are other forms of Henry's law each of which defines the constant <math>k_{\rm H}\,</math> differently and requires different dimensional units'''.<ref name=SmithandHarvey>{{cite journal|author=Francis L. Smith and Allan H. Harvey |year=2007 |month=September |title=[http://www.chemengr.ucsb.edu/~ceweb/courses/che128/pdf/090733%20Avoid%20Common%20Pitfalls.pdf Avoid Common Pitfalls When Using Henry's Law]|journal=CEP (Chemical Engineering Progress)|volume= |issue= |pages= |issn=0360-7275}}</ref>
:[[carbon dioxide]] (CO<sub>2</sub>) : 29.4 L·atm/mol &nbsp; &nbsp; &nbsp;
:[[hydrogen]] (H<sub>2</sub>) : 1282.1 L·atm/mol &nbsp; &nbsp;
 
when these gases are dissolved in [[water]] at 298 [[kelvin]]s.


'''As shown in Table 1 below, there are other forms of Henry's Law each of which defines the constant ''k'' differently and requires different dimensional units'''.<ref name=SmithandHarvey>{{cite journal|author=Francis L. Smith and Allan H. Harvey |year=2007 |month=September |title=Avoid Common Pitfalls When Using Henry's Law |journal=CEP (Chemical Engineering Progress) |volume= |issue= |pages= |issn=0360-7275}}</ref> The form of the equation presented above is consistent with the example numerical values presented for oxygen, carbon dioxide and hydrogen and with their corresponding dimensional units.
The form of the equation presented above is consistent with the example numerical values presented for oxygen, carbon dioxide and hydrogen and with their corresponding dimensional units.


Note that the unit of concentration was chosen to be [[molarity]]. Hence the dimensional units: ''L'' is liters of solution, ''atm'' is the partial pressure of the gaseous solute  above the solution (in atmospheres of [[Pressure|absolute pressure]]), and ''mol'' is the moles of the gaseous solute in the solution. Also note that the Henry's Law constant, ''k'',  varies with the solvent and the temperature.
Note that for the above values, the unit of concentration, <math>c</math>, was chosen to be [[molarity]] (i.e., mol/L). Hence the dimensional units: ''L'' is liters of solution, ''atm'' is the partial pressure of the gaseous solute  above the solution (in atmospheres of [[Pressure|absolute pressure]]), and ''mol'' is the moles of the gaseous solute in the solution. Also note that the Henry's law constant, <math>k_{\rm H}</math>,  varies with the solvent and the temperature.


===Other forms of Henry's law===
===Forms of Henry's law===


There are various other forms Henry's Law which are discussed in the technical literature.<ref name=SmithandHarvey/><ref name=UArizona>[http://www.chem.arizona.edu/~salzmanr/103a004/nts004/l41/l41.html University of Arizona chemistry class notes]</ref><ref name="multiple">[http://www.henrys-law.org An extensive list of Henry's law constants, and a conversion tool]</ref>
There are various forms Henry's law which are discussed in the technical literature.<ref name=SmithandHarvey/><ref name=NCSU>[http://wikis.lib.ncsu.edu/index.php/CH_431/Lecture_14#Henry.27s_law North Carolina State University CH 431/Lecture 14]</ref><ref name="RolfSander">[https://www.uni-frankfurt.de/fb/fb11/iau/epos/download/EPOS/Skripte_EPOS/henry.pdf An extensive list of Henry's law constants, and a conversion tool]</ref>


{| class="wikitable"
{| class="wikitable"
|+ '''Table 1: Some forms of Henry's law and constants (gases in water at 298 K), derived from <ref name="multiple"/>
|+ '''Table 1: Some forms of Henry's law and constants (gases in water at 298 K)<ref name="RolfSander"/>
! equation: || <math> k_{H,pc} = \frac{p_{gas}}{c_{aq}}</math> || <math> k_{H,cp} = \frac{c_{aq}}{p_{gas}} </math> || <math> k_{H,px} = \frac{p_{gas}}{x_{aq}} </math> || <math> k_{H,cc} = \frac{c_{aq}}{c_{gas}} </math>
! equation: || <math> k_{\rm{H,pc}} = \frac{p_{\rm{gas}}}{c_{\rm {aq}}}</math> || <math> k_{\rm{H,cp}} = \frac{c_{\rm{aq}}}{p_{\rm{gas}}} </math> || <math> k_{\rm{H,px}} = \frac{p_{\rm{gas}}}{x_{\rm{aq}}}</math> || <math> k_{\rm{H,cc}} = \frac{c_{\rm{aq}}}{c_{\rm{gas}}} </math>
|-
|-
! dimension: || <math>\left[\frac{\mathrm{L}_{soln} \cdot \mathrm{atm}}{\mathrm{mol}_{gas}}\right]</math> || <math> \left[\frac{\mathrm{mol}_{gas}}{\mathrm{L}_{soln} \cdot \mathrm{atm}}\right] </math> || <math>\left[\frac{\mathrm{atm} \cdot (\mathrm{mol}_{water}+
! dimension: || <math>\left[\frac{\rm L_{\rm{soln}} \cdot \rm{atm}}{\rm{mol}_{gas}}\right]</math> || <math> \left[\frac{\rm{mol}_{\rm{gas}}}{\rm{L}_{\rm{soln}} \cdot \rm{atm}}\right]</math> || <math>\left[\frac{\rm{atm} \cdot \rm{mol}_{\rm{soln}}}  
\mathrm{mol}_{gas})}{\mathrm{mol}_{gas}}\right]</math> || <math>\left[ \text{dimensionless} \right]</math>
{\rm{mol}_{\rm{gas}}}\right]</math> ||dimensionless
|-
|-
|align=center| [[Oxygen|O<sub>2</sub>]] ||align=center| 769.23||align=center| 1.3 E-3 ||align=center| 4.259 E4 ||align=center| 3.180 E-2
|align=center| [[Oxygen|O<sub>2</sub>]] ||align=center| 769.23||align=center| 1.3 E-3 ||align=center| 4.259 E4 ||align=center| 3.180 E-2
Line 63: Line 61:
where:
where:


:<math>c_{aq}\,</math> = [[mole (unit)|moles]] of gas per [[liter]] of solution
:<math>c_{\rm{aq}}\,</math> = [[mole (unit)|moles]] of gas per [[liter]] of solution
:<math>\mathrm{L}_{soln}\,</math> = liters of solution
:<math>\mathrm{L}_{\rm{soln}}\,</math> = liters of solution
:<math>p_{gas}\,</math> = partial pressure of gas above the solution, in [[atmosphere (unit)|atmospheres]] of absolute pressure
:<math>p_{\rm{gas}}\,</math> = partial pressure of gas above the solution, in [[atmosphere (unit)|atmospheres]] of absolute pressure
:<math>x_{aq}\,</math> = mole fraction of gas in solution = moles of gas per total moles ≈ moles of gas per mole of water
:<math>x_{\rm{aq}}\,</math> = [[mole fraction]] of gas in solution = moles of gas per mole of solution ≈ moles of gas per mole of water
:<math>\mathrm{atm}\,</math> = atmospheres of absolute pressure
:<math>\rm{atm}\,</math> = atmospheres of absolute pressure


As can be seen by comparing the equations in the above table, the Henry's Law constant <math>k_{H,pc}</math> is simply the inverse of the constant <math>k_{H,cp}</math>. Since all <math>k_{H}</math> may be referred to as the Henry's Law constant, readers of the technical literature must be quite careful to note which version of the Henry's Law equation is being used.<ref name=SmithandHarvey/>
As can be seen by comparing the equations in the above table, the Henry's law constant <math>k_{\rm{H,pc}}</math> is simply the inverse of the constant <math>k_{\rm{H,cp}}</math>. Since all <math>k_{\rm{H}}</math> may be referred to as the Henry's Law constant, readers of the technical literature must be quite careful to note which version of the Henry's law equation is being used.<ref name=SmithandHarvey/>


It should also be noted the Henry's Law is a limiting law that only applies for ''dilute'' solutions. The range of concentrations in which it applies becomes narrower the more the system diverges from non-ideal behavior. Roughly speaking, that is the more chemically ''different'' the solute is from the solvent.  
It should also be noted the Henry's law is a limiting law that only applies for ''dilute'' solutions. The range of concentrations in which it applies becomes narrower the more the system diverges from ideal behavior. Roughly speaking, that is the more chemically ''different'' the solute is from the solvent.  


It also only applies for solutions where the solvent does not [[chemical reaction|react chemically]] with the gas being dissolved.  A common example of a gas that does react with the solvent is [[carbon dioxide]], which rapidly forms hydrated carbon dioxide and then [[carbonic acid]] (H<sub>2</sub>CO<sub>3</sub>) with water.
It also only applies for solutions where the solvent does not [[chemical reaction|react chemically]] with the gas being dissolved.  A common example of a gas that does react with the solvent is [[carbon dioxide]], which rapidly forms hydrated carbon dioxide and then [[carbonic acid]] (H<sub>2</sub>CO<sub>3</sub>) with water.


===Temperature dependence of the Henry constant===
==Temperature dependence of Henry's law constant==


When the temperature of a system changes, the Henry constant will also change.<ref name=SmithandHarvey/><ref>{{cite book|author=Green, Don W. and Perry, Robert H. (deceased)|title=Perry's Chemical Engineers' Handbook|edition=6th Edition|publisher=McGraw-Hill|year=1984|id=ISBN 0-07-049479-7}} (See pages 3-101 to 3.103 for tabulated Henry's constant values versus temperature for various gases)</ref> This is why some people prefer to name it Henry coefficient. There are multiple equations assessing the effect of temperature on the constant. This form of the [[van 't Hoff equation]] is one example:<ref name="multiple"/>  
When the temperature of a system changes, the Henry's law constant will also change.<ref name=SmithandHarvey/><ref name=Perry's2>{{cite book|author=Don W. Green and Robert H. Perry|title=[[Perry's Chemical Engineers' Handbook]]|edition=6th Edition| publisher=McGraw-Hill|year=1984|id=ISBN 0-07-049479-7}} (See pages 3-101 to 3-103 for tabulated Henry's law constant values versus temperature for various gases)</ref> This is why some people prefer to name it Henry coefficient. There are multiple equations assessing the effect of temperature on the constant. This form of the [[van 't Hoff equation]] is one example:<ref name="RolfSander"/>  


:<math> k(T) = k(T_\Theta) \cdot e^{ \left[ -C \cdot \left( \frac{1}{T}-\frac{1}{T_\Theta}\right)\right]}\, </math>
:<math> k_{\rm H,cp} = k_{\rm H,cp}^\Theta \; \exp \left[ -C \cdot \left( \frac{1}{T}-\frac{1}{T^\Theta}\right)\right]</math>


where
{|border="0" cellpadding="2"
:'''''k''''' for a given temperature is the Henry's Law constant (as defined in the first section of this article), identical with '''''k<sub>H,pc</sub>''''' defined in Table 1,
|-
:'''''T''''' is in kelvins,
|align=right|where:
:<math>\Theta</math> ([[theta]]) refers to the temperature of 298 K.
|-
|align=right|<math>T</math>
|align=left|= any given temperature, in kelvins
|-
|align=right|<font style="vertical-align:+45%;"><math>T^\Theta</math></font>
|align=left|= the [[standard state]] temperature of 298 K
|-
|align=right|<math> k_{\rm H,cp}</math>
|align=left|= the solubility form of Henry's law constant at the given temperature (in the units shown in Table 1) <ref>'''Note:''' <math> k_{\rm H,cp}</math> is the same as <math>k_H</math> which is the solubility form of Henry's law constant defined by equation (1) in reference 7</ref>
|-
|align=right|<math> k_{\rm H,cp}^\Theta</math>
|align=left|= the solubility form of Henry's law constant at <font style="vertical-align:+25%;"><math>T^\Theta</math></font>
|-
|align=right|<font style="vertical-align:-40%;"> <math>\exp</math></font>
|align=left|= the [[exponential function]]
|-
|align=right|<math>C</math>
|align=left|= a constant with dimension of kelvins
|}


The above equation is an approximation only and should be used only when no better experimentally derived formula for a given gas exists.
The above equation is an approximation only and should be used only when no better experimentally derived formula for a given gas exists.


The following table lists some values for constant ''C'' (dimension of kelvins) in the equation above:  
The following table lists some values for constant '''''C'''''
in the equation above:  
 
{|class="wikitable"
{|class="wikitable"
|+ '''Table 2: Values of ''C'' (in K)'''
|+ '''Table 2: Values of''' '''''C''''' '''(in K)'''
|'''Gas''' || align=center| [[Oxygen|O<sub>2</sub>]] || align=center| [[Hydrogen|H<sub>2</sub>]] ||  align=center| [[CO2|CO<sub>2</sub>]] || align=center| [[Nitrogen|N<sub>2</sub>]] || align=center| [[Helium|He]] || align=center| [[Neon|Ne]] || align=center| [[Argon|Ar]] || align=center| [[Carbon monoxide|CO]]
|'''''Gas''''' || align=center| [[Oxygen|O<sub>2</sub>]] || align=center| [[Hydrogen|H<sub>2</sub>]] ||  align=center| [[CO2|CO<sub>2</sub>]] || align=center| [[Nitrogen|N<sub>2</sub>]] || align=center| [[Helium|He]] || align=center| [[Neon|Ne]] || align=center| [[Argon|Ar]] || align=center| [[Carbon monoxide|CO]]
|-
|-
| '''''C''''' || align=center| 1700  ||align=center| 500 || align=center| 2400 || align=center| 1300|| align=center| 230 || align=center| 490|| align=center|  1300 || align=center| 1300
| '''''C''''' || align=center| 1700  ||align=center| 500 || align=center| 2400 || align=center| 1300|| align=center| 230 || align=center| 490|| align=center|  1300 || align=center| 1300
|}
|}
Because solubility of gases decreases with increasing temperature, the partial pressure a given gas concentration has in liquid must increase. While heating water (saturated with nitrogen) from 25 °C to 95 °C the solubility will decrease to about 43% of its initial value. Partial pressure of CO<sub>2</sub> in seawater doubles with every 16 K increase in temperature.<ref>Takahashi, T. et al (2002). ''Global sea-air CO<sub>2</sub> flux based on climatological surface ocean CO<sub>2</sub> and seasonal biological and temperature effects'', Deep-Sea Research (Part II, Topical Studies in Oceanography) '''49''', 9-10, pp. 1601-1622.</ref>
Because solubility of gases decreases with increasing temperature, the partial pressure a given gas concentration has in liquid must increase. While heating water (saturated with nitrogen) from 25 °C to 95 °C the solubility will decrease to about 43% of its initial value. Partial pressure of CO<sub>2</sub> in seawater doubles with every 16 K increase in temperature.<ref>T. Takahashi et al (2002), [http://www.sciencedirect.com/science/article/pii/S0967064502000036 "Global sea-air CO2 flux based on climatological surface ocean pCO<sub>2</sub> and seasonal biological and temperature effect"], ''Deep Sea Res. II'', 49, (9-10), pp. 1601– 1622.</ref>


The constant ''C'' may be regarded as:
The constant '''''C''''' may be regarded as:


:<math> C = \frac{\Delta_{solv}H}{R} = \frac{-d \ln\left(k(T)\right)}{d(1/T)}</math>
:<math> C = \frac{\Delta_{\rm{\,solv}}\,H}{R} = \frac{-d \ln\left(k_{\rm{H,cp}} \right)}{d(1/T)} </math>


where
:where:
:<math> \Delta_{solv}H \,</math> is the  [[enthalpy of solution]]
:{|border="0" cellpadding="2"
:<math>R</math> is the  [[universal gas constant]].
|-
|align=right|<math>\Delta_{\rm{\,solv}}\,H</math>
|align=left|is the  [[enthalpy of solution]]
|-
|align=right|<math>R</math>
|align=left|is the  [[universal gas constant]]
|}


==Henry's law in geophysics==
==Henry's law in geophysics==


In [[geophysics]] a version of Henry's law applies to the solubility of a [[noble gas]] in contact with [[silicate]] melt.  One equation used is
In [[geophysics]] a version of Henry's law applies to the solubility of a [[noble gas]] in contact with [[silicate]] melt.  One equation used is
:<math>\rho_m/\rho_g=e^{-\beta(\mu_{{\rm ex},m}-\mu_{{\rm ex},g})}\,</math>
where:
:subscript m = melt
:subscript g = gas phase
:<math>\rho</math> = the [[Density (chemistry)|densities]] of the solute gas in the melt and gas phase
:<math>\beta=1/k_BT</math> an inverse temperature scale
:<math>k_B</math> = the [[Boltzmann constant]]
:<math>\mu_{{\rm ex},m}</math> and <math>\mu_{{\rm ex},g}</math> = the excess [[chemical potential]] of the solute in the two phases.


==Raoult's law compared to Henry's Law==
:<math>\rho_{\rm melt}/\rho_{\rm gas} = \exp\left[-\beta(\mu^{\rm E}_{\rm melt} - \mu^{\rm E}_{\rm gas})\right]\,</math>


As can be seen in the mathematical expressions of the two laws, both laws state that the partial pressure of a liquid mixture component is proportional to the concentration of that component in the liquid mixture:
:{|border="0" cellpadding="2"
 
:Henry's law: &nbsp; <math> p = k \,c</math>
:Raoult's law: <math> p_i = P_i^ox_i</math>
 
{|border="0" cellpadding="2"
|-
|-
|align=right|where:
|align=right|where:
|-
|-
!align=right|<math>p</math>
|align=right|<math>\rho</math>
|align=left|= partial pressure of a solute gas above a solution
|align=left|= the [[density (chemistry)|densities]] of the solute gas in the melt and in the gas phases
|-
!align=right|<math>c</math>
|align=left|= concentration of the solute gas in the solution
|-
|-
!align=right|<math>k</math>
|align=right|<math>\beta</math>
|align=left|= Henry's law constant
|align=left|= <math>1/(k_{\rm B}\,T)\;</math>, an inverse temperature scale
|-
|-
!align=right|<math>p_i</math>
|align=right|<math>k_{\rm B}</math>
|align=left|= partial pressure of component <math>i</math> in a liquid mixture
|align=left|= the [[Boltzmann constant]]
|-
|-
!align=right|<math>P_i^o</math>
|align=right|<math>\mu^{\rm E}</math>
|align=left|= [[vapor pressure]] of the pure component <math>i</math> in the liquid mixture
|align=left|= the excess [[chemical potential]]s of the solute gas in the melt and in the gas phases
|-
!align=right|<math>x_i</math>
|align=left|= mol fraction of component <math>i</math> in the liquid mixture
|}
|}


In a dilute solution, the solute gas approximately obey's Henry's law and the solvent approximately obeys Raoult's law.<ref name=Mortimer/>
==Raoult's law compared to Henry's Law==
 
In the mathematical expressions of the two laws, both state that the partial pressure of a component in a solution is proportional to the concentration of that component in the solution. Using mole fractions, <math>x</math>, as the expression of concentration, Henry's law can be written as:
 
:<math>p = k_{\rm H}\,x</math>
 
This can be compared with [[Raoult's law]]:
 
:<math>p = p^\star\,x</math>
 
where <math>p^\star</math> is the vapor pressure of the pure component.
 
Thus, Raoult's law appears to be a special case of Henry's law where <math>k_{\rm H}</math> is equal to <math>p^\star</math>. This is true for pairs of closely related substances, such as [[benzene]] and [[toluene]], which obey Raoult's law over the entire composition range (such mixtures are called ''ideal mixtures'').
 
The general case is that both laws are limit laws, and they apply at opposite ends of the composition range. The vapor pressure of the  component with largest concentration by far, such as the solvent for a dilute solution, is proportional to the mole fraction, and the proportionality constant is the vapor pressure of the pure substance (Raoult's law).  
 
The vapor pressure of component with the smallest concentration by far, such as the solute in a dilute solution, is also proportional to the mole fraction, but the proportionality constant is the Henry's law constant which must be determined experimentally (Henry's law).
 
In mathematical terms:
 
:Raoult's law: <math>\lim_{x\to 1}\,(p/x) = p^\star</math>
 
:Henry's law: <math>\lim_{x\to 0}\,(p/x) = k_{\rm H}</math>


==References==
==References==
{{reflist}}
{{reflist}}[[Category:Suggestion Bot Tag]]
 
[[Category:CZ Live]]

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Henry's law is one of the gas laws, formulated by the British chemist, William Henry, in 1803. It states that:

At a constant temperature, the amount of a given gas dissolved in a given type and volume of liquid is directly proportional to the partial pressure of that gas in equilibrium with that liquid.

Formula and Henry's law constant

Henry's law is commonly expressed mathematically as:[1][2][3][4]

where:

is the partial pressure of the solute above the solution
is the concentration of the solute in the solution (in one of its many units)
is the Henry's law constant, which has units such as L·atm/mol, atm/mole fraction or Pa·m3/mol.

Some values for include:

oxygen (O2) : 769.2 L·atm/mol
carbon dioxide (CO2) : 29.4 L·atm/mol
hydrogen (H2) : 1282.1 L·atm/mol

when these gases are dissolved in water at 298 kelvins.

As shown in Table 1 below, there are other forms of Henry's law each of which defines the constant differently and requires different dimensional units.[5]

The form of the equation presented above is consistent with the example numerical values presented for oxygen, carbon dioxide and hydrogen and with their corresponding dimensional units.

Note that for the above values, the unit of concentration, , was chosen to be molarity (i.e., mol/L). Hence the dimensional units: L is liters of solution, atm is the partial pressure of the gaseous solute above the solution (in atmospheres of absolute pressure), and mol is the moles of the gaseous solute in the solution. Also note that the Henry's law constant, , varies with the solvent and the temperature.

Forms of Henry's law

There are various forms Henry's law which are discussed in the technical literature.[5][6][7]

Table 1: Some forms of Henry's law and constants (gases in water at 298 K)[7]
equation:
dimension: dimensionless
O2 769.23 1.3 E-3 4.259 E4 3.180 E-2
H2 1282.05 7.8 E-4 7.099 E4 1.907 E-2
CO2 29.41 3.4 E-2 0.163 E4 0.8317
N2 1639.34 6.1 E-4 9.077 E4 1.492 E-2
He 2702.7 3.7 E-4 14.97 E4 9.051 E-3
Ne 2222.22 4.5 E-4 12.30 E4 1.101 E-2
Ar 714.28 1.4 E-3 3.955 E4 3.425 E-2
CO 1052.63 9.5 E-4 5.828 E4 2.324 E-2

where:

= moles of gas per liter of solution
= liters of solution
= partial pressure of gas above the solution, in atmospheres of absolute pressure
= mole fraction of gas in solution = moles of gas per mole of solution ≈ moles of gas per mole of water
= atmospheres of absolute pressure

As can be seen by comparing the equations in the above table, the Henry's law constant is simply the inverse of the constant . Since all may be referred to as the Henry's Law constant, readers of the technical literature must be quite careful to note which version of the Henry's law equation is being used.[5]

It should also be noted the Henry's law is a limiting law that only applies for dilute solutions. The range of concentrations in which it applies becomes narrower the more the system diverges from ideal behavior. Roughly speaking, that is the more chemically different the solute is from the solvent.

It also only applies for solutions where the solvent does not react chemically with the gas being dissolved. A common example of a gas that does react with the solvent is carbon dioxide, which rapidly forms hydrated carbon dioxide and then carbonic acid (H2CO3) with water.

Temperature dependence of Henry's law constant

When the temperature of a system changes, the Henry's law constant will also change.[5][8] This is why some people prefer to name it Henry coefficient. There are multiple equations assessing the effect of temperature on the constant. This form of the van 't Hoff equation is one example:[7]

where:
= any given temperature, in kelvins
= the standard state temperature of 298 K
= the solubility form of Henry's law constant at the given temperature (in the units shown in Table 1) [9]
= the solubility form of Henry's law constant at
= the exponential function
= a constant with dimension of kelvins

The above equation is an approximation only and should be used only when no better experimentally derived formula for a given gas exists.

The following table lists some values for constant C in the equation above:

Table 2: Values of C (in K)
Gas O2 H2 CO2 N2 He Ne Ar CO
C 1700 500 2400 1300 230 490 1300 1300

Because solubility of gases decreases with increasing temperature, the partial pressure a given gas concentration has in liquid must increase. While heating water (saturated with nitrogen) from 25 °C to 95 °C the solubility will decrease to about 43% of its initial value. Partial pressure of CO2 in seawater doubles with every 16 K increase in temperature.[10]

The constant C may be regarded as:

where:
is the enthalpy of solution
is the universal gas constant

Henry's law in geophysics

In geophysics a version of Henry's law applies to the solubility of a noble gas in contact with silicate melt. One equation used is

where:
= the densities of the solute gas in the melt and in the gas phases
= , an inverse temperature scale
= the Boltzmann constant
= the excess chemical potentials of the solute gas in the melt and in the gas phases

Raoult's law compared to Henry's Law

In the mathematical expressions of the two laws, both state that the partial pressure of a component in a solution is proportional to the concentration of that component in the solution. Using mole fractions, , as the expression of concentration, Henry's law can be written as:

This can be compared with Raoult's law:

where is the vapor pressure of the pure component.

Thus, Raoult's law appears to be a special case of Henry's law where is equal to . This is true for pairs of closely related substances, such as benzene and toluene, which obey Raoult's law over the entire composition range (such mixtures are called ideal mixtures).

The general case is that both laws are limit laws, and they apply at opposite ends of the composition range. The vapor pressure of the component with largest concentration by far, such as the solvent for a dilute solution, is proportional to the mole fraction, and the proportionality constant is the vapor pressure of the pure substance (Raoult's law).

The vapor pressure of component with the smallest concentration by far, such as the solute in a dilute solution, is also proportional to the mole fraction, but the proportionality constant is the Henry's law constant which must be determined experimentally (Henry's law).

In mathematical terms:

Raoult's law:
Henry's law:

References

  1. Furrina Fang Lee (2007). Comprehensive analysis, Henry's law constant determination, and photocatalytic degradation of polychlorinated biphenyls (PCBs) and/or other persistent organic pollutants (POPs, Ph.D. dissertation, State University of New York at Albany, pp. 199-201. Published by ProQuest.
  2. Robert G. Mortimer (2000). Physical Chemistry, Second Edition. Academic Press, pp. 248-250. ISBN 0-12-508345-9. 
  3. Don W. Green and Robert H. Perry (1984). Perry's Chemical Engineers' Handbook, 6th Edition. McGraw-Hill. ISBN 0-07-049479-7.  (See page 14-9)
  4. Online Introductory Chemistry: Solubility of gases in liquids
  5. 5.0 5.1 5.2 5.3 Francis L. Smith and Allan H. Harvey (September 2007). "Avoid Common Pitfalls When Using Henry's Law". CEP (Chemical Engineering Progress). ISSN 0360-7275.
  6. North Carolina State University CH 431/Lecture 14
  7. 7.0 7.1 7.2 An extensive list of Henry's law constants, and a conversion tool
  8. Don W. Green and Robert H. Perry (1984). Perry's Chemical Engineers' Handbook, 6th Edition. McGraw-Hill. ISBN 0-07-049479-7.  (See pages 3-101 to 3-103 for tabulated Henry's law constant values versus temperature for various gases)
  9. Note: is the same as which is the solubility form of Henry's law constant defined by equation (1) in reference 7
  10. T. Takahashi et al (2002), "Global sea-air CO2 flux based on climatological surface ocean pCO2 and seasonal biological and temperature effect", Deep Sea Res. II, 49, (9-10), pp. 1601– 1622.