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In thermodynamics, the Gibbs free energy (IUPAC recommended name: Gibbs energy or Gibbs function; also known as free enthalpy^{[1]} to distinguish it from Helmholtz free energy) is a thermodynamic potential that measures the "usefulness" or processinitiating work obtainable from a thermodynamic system at a constant temperature and pressure (isothermal, isobaric). Just as in mechanics, where potential energy is defined as capacity to do work, similarly different potentials have different meanings. The Gibbs free energy (SI units kJ/mol) is the maximum amount of nonexpansion work that can be extracted from a thermodynamically closed system (one that can exchange heat and work with its surroundings, but not matter); this maximum can be attained only in a completely reversible process. When a system changes from a welldefined initial state to a welldefined final state, the Gibbs free energy change ΔG equals the work exchanged by the system with its surroundings, minus the work of the pressure forces, during a reversible transformation of the system from the initial state to the final state.^{[2]}
Gibbs energy (also referred to as ∆G) is also the chemical potential that is minimized when a system reaches equilibrium at constant pressure and temperature. Its derivative with respect to the reaction coordinate of the system vanishes at the equilibrium point. As such, it is a convenient criterion for the spontaneity of processes with constant pressure and temperature.
The Gibbs free energy, originally called available energy, was developed in the 1870s by the American mathematician Josiah Willard Gibbs. In 1873, Gibbs described this "available energy" as
the greatest amount of mechanical work which can be obtained from a given quantity of a certain substance in a given initial state, without increasing its total volume or allowing heat to pass to or from external bodies, except such as at the close of the processes are left in their initial condition.^{[3]}
The initial state of the body, according to Gibbs, is supposed to be such that "the body can be made to pass from it to states of dissipated energy by reversible processes." In his 1876 magnum opus On the Equilibrium of Heterogeneous Substances, a graphical analysis of multiphase chemical systems, he engaged his thoughts on chemical free energy in full.
Contents
Overview
For systems reacting at STP (or any other fixed temperature and pressure), there is a general natural tendency to achieve a minimum of the free energy.
A quantitative measure of the favorability of a given reaction is the difference ΔG in Gibbs free energy that is (or would be) effected by proceeding with the reaction. When the calculated energetics of the process indicate that ΔG is negative, it means that the reaction will be favoured and will release energy. The energy released equals the maximum amount of work that can be performed as a result of the chemical reaction. In contrast, if conditions indicated a positive ΔG, then energy—in the form of work—would have to be added to the reacting system for the reaction to occur.
The equation can be also seen from the perspective of the system taken together with its surroundings (the rest of the universe). First assume that the given reaction is the only one that is occurring. Then the entropy released or absorbed by the system equals the entropy that the environment must absorb or release, respectively. The reaction will only be allowed if the total entropy change of the universe is zero or positive. This is reflected in a negative ΔG, and the reaction is called exergonic.
If we allow other reactions to occur on the side, then an otherwise endergonic chemical reaction (one with positive ΔG) can be made to happen. The input of heat into an inherently endergonic reaction, such as the elimination of cyclohexanol to cyclohexene, can be seen as coupling an unfavourable reaction (elimination) to a favourable one (burning of coal or other provision of heat) such that the total entropy change of the universe is greater than or equal to zero, making the total Gibbs free energy difference of the coupled reactions negative.
In traditional use, the term "free" was included in "Gibbs free energy" to mean "available in the form of useful work."^{[2]} The characterization becomes more precise if we add the qualification that it is the energy available for nonvolume work.^{[4]} (A analogous, but slightly different, meaning of "free" applies in conjunction with the Helmholtz free energy, for systems at constant temperature). However, an increasing number of books and journal articles do not include the attachment "free", referring to G as simply "Gibbs energy". This is the result of a 1988 IUPAC meeting to set unified terminologies for the international scientific community, in which the adjective ‘free’ was supposedly banished.^{[5]}^{[6]}^{[7]} This standard, however, has not yet been universally adopted.
History
The quantity called "free energy" is a more advanced and accurate replacement for the outdated term affinity, which was used by chemists in previous years^{[when?]} to describe the force that caused chemical reactions.
In 1873, Willard Gibbs published A Method of Geometrical Representation of the Thermodynamic Properties of Substances by Means of Surfaces, in which he sketched the principles of his new equation that was able to predict or estimate the tendencies of various natural processes to ensue when bodies or systems are brought into contact. By studying the interactions of homogeneous substances in contact, i.e., bodies composed of part solid, part liquid, and part vapor, and by using a threedimensional volumeentropyinternal energy graph, Gibbs was able to determine three states of equilibrium, i.e., "necessarily stable", "neutral", and "unstable", and whether or not changes would ensue.
Thereafter, in 1882, the German scientist Hermann von Helmholtz characterized the affinity as the largest quantity of work which can be gained when the reaction is carried out in a reversible manner, e.g., electrical work in a reversible cell. The maximum work is thus regarded as the diminution of the free, or available, energy of the system (Gibbs free energy G at T = constant, P = constant or Helmholtz free energy F at T = constant, V = constant), whilst the heat given out is usually a measure of the diminution of the total energy of the system (internal energy). Thus, G or F is the amount of energy "free" for work under the given conditions.
Until this point, the general view had been such that: "all chemical reactions drive the system to a state of equilibrium in which the affinities of the reactions vanish". Over the next 60 years, the term affinity came to be replaced with the term free energy. According to chemistry historian Henry Leicester, the influential 1923 textbook Thermodynamics and the Free Energy of Chemical Substances by Gilbert N. Lewis and Merle Randall led to the replacement of the term "affinity" by the term "free energy" in much of the Englishspeaking world.
Graphical interpretation
Gibbs free energy was originally defined graphically. In 1873, American engineer Willard Gibbs published his first thermodynamics paper, "Graphical Methods in the Thermodynamics of Fluids", in which Gibbs used the two coordinates of the entropy and volume to represent the state of the body. In his second followup paper, "A Method of Geometrical Representation of the Thermodynamic Properties of Substances by Means of Surfaces", published later that year, Gibbs added in the third coordinate of the energy of the body, defined on three figures. In 1874, Scottish physicist James Clerk Maxwell used Gibbs' figures to make a 3D energyentropyvolume thermodynamic surface of a fictitious waterlike substance.^{[8]} Thus, in order to understand the very difficult concept of Gibbs free energy one must be able to understand its interpretation as Gibbs defined originally by section AB on his figure 3 and as Maxwell sculpted that section on his 3D surface figure.
Definitions
The Gibbs free energy is defined as:
 <math>G(p,T) = U + pV  TS </math>
which is the same as:
 <math>G(p,T) = H  TS </math>
where:
 U is the internal energy (SI unit: joule)
 p is pressure (SI unit: pascal)
 V is volume (SI unit: m^{3})
 T is the temperature (SI unit: kelvin)
 S is the entropy (SI unit: joule per kelvin)
 H is the enthalpy (SI unit: joule)
The expression for the infinitesimal reversible change in the Gibbs free energy as a function of its 'natural variables' p and T, for an open system, subjected to the operation of external forces (for instance electrical or magnetical) X_{i}, which cause the external parameters of the system a_{i} to change by an amount da_{i}, can be derived as follows from the First Law for reversible processes:
 <math>T\mathrm{d}S= \mathrm{d}U + p\mathrm{d}V\sum_{i=1}^k \mu_i \,\mathrm{d}N_i + \sum_{i=1}^n X_i \,\mathrm{d}a_i + \cdots</math>
 <math>\mathrm{d}(TS)  S\mathrm{d}T= \mathrm{d}U + \mathrm{d}(pV)  V\mathrm{d}p\sum_{i=1}^k \mu_i \,\mathrm{d}N_i + \sum_{i=1}^n X_i \,\mathrm{d}a_i + \cdots</math>
 <math>\mathrm{d}(UTS+pV)=V\mathrm{d}pS\mathrm{d}T+\sum_{i=1}^k \mu_i \,\mathrm{d}N_i  \sum_{i=1}^n X_i \,\mathrm{d}a_i + \cdots</math>
 <math>\mathrm{d}G =V\mathrm{d}pS\mathrm{d}T+\sum_{i=1}^k \mu_i \,\mathrm{d}N_i  \sum_{i=1}^n X_i \,\mathrm{d}a_i + \cdots</math>
where:
 μ_{i} is the chemical potential of the ith chemical component. (SI unit: joules per particle^{[9]} or joules per mole^{[2]})
 N_{i} is the number of particles (or number of moles) composing the ith chemical component.
This is one form of Gibbs fundamental equation.^{[10]} In the infinitesimal expression, the term involving the chemical potential accounts for changes in Gibbs free energy resulting from an influx or outflux of particles. In other words, it holds for an open system. For a closed system, this term may be dropped.
Any number of extra terms may be added, depending on the particular system being considered. Aside from mechanical work, a system may, in addition, perform numerous other types of work. For example, in the infinitesimal expression, the contractile work energy associated with a thermodynamic system that is a contractile fiber that shortens by an amount −dl under a force f would result in a term f dl being added. If a quantity of charge −de is acquired by a system at an electrical potential Ψ, the electrical work associated with this is −Ψde, which would be included in the infinitesimal expression. Other work terms are added on per system requirements.^{[11]}
Each quantity in the equations above can be divided by the amount of substance, measured in moles, to form molar Gibbs free energy. The Gibbs free energy is one of the most important thermodynamic functions for the characterization of a system. It is a factor in determining outcomes such as the voltage of an electrochemical cell, and the equilibrium constant for a reversible reaction. In isothermal, isobaric systems, Gibbs free energy can be thought of as a "dynamic" quantity, in that it is a representative measure of the competing effects of the enthalpic^{[clarification needed]} and entropic driving forces involved in a thermodynamic process.
The temperature dependence of the Gibbs energy for an ideal gas is given by the Gibbs–Helmholtz equation and its pressure dependence is given by:
 <math>\frac{G}{N} = \frac{G}{N}^\circ + kT\ln \frac{p}Template:P^\circ</math>
if the volume is known rather than pressure then it becomes:
 <math>\frac{G}{N} = \frac{G}{N}^\circ + kT\ln \frac{V^\circ} </math>
or more conveniently as its chemical potential:
 <math>\frac{G}{N} = \mu = \mu^\circ + kT\ln \frac{p}Template:P^\circ.</math>
In nonideal systems, fugacity comes into play.
Derivation
The Gibbs free energy total differential natural variables may be derived via Legendre transforms of the internal energy.
 <math>\mathrm{d}U = T\mathrm{d}S  p \,\mathrm{d}V + \sum_i \mu_i \,\mathrm{d} N_i\,</math>.
Because S, V, and N_{i} are extensive variables, Euler's homogeneous function theorem allows easy integration of dU:^{[12]}
 <math>U = T S  p V + \sum_i \mu_i N_i\,</math>.
The definition of G from above is
 <math>G = U + p V  T S\,</math>.
Taking the total differential, we have
 <math>\mathrm{d} G = \mathrm{d}U + p\,\mathrm{d}V + V\mathrm{d}p  T\mathrm{d}S  S\mathrm{d}T\,</math>.
Replacing dU with the result from the first law gives^{[12]}
 <math>\begin{align}
\mathrm{d} G &= T\mathrm{d}S  p\,\mathrm{d}V + \sum_i \mu_i \,\mathrm{d} N_i + p \,\mathrm{d}V + V\mathrm{d}p  T\mathrm{d}S  S\mathrm{d}T\\ &= V\mathrm{d}p  S\mathrm{d}T + \sum_i \mu_i \,\mathrm{d} N_i \end{align}</math>.
The natural variables of G are then p, T, and {N_{i}}.
Homogeneous systems
Because some of the natural variables are intensive, dG may not be integrated using Euler integrals as is the case with internal energy. However, simply substituting the GibbsDuhem relation result for U into the definition of G gives a standard expression for G:^{[12]}
 <math>\begin{align}
G &= T S  p V + \sum_i \mu_i N_i + p V  T S\\ &= \sum_i \mu_i N_i \end{align}</math>.
This result applies to homogeneous, macroscopic systems, but not to all thermodynamic systems.^{[13]}
Gibbs free energy of reactions
To derive the Gibbs free energy equation for an isolated system, let S_{tot} be the total entropy of the isolated system, that is, a system that cannot exchange heat or mass with its surroundings. According to the second law of thermodynamics:
 <math> \Delta S_{tot} \ge 0 \,</math>
and if ΔS_{tot} = 0 then the process is reversible. The heat transfer Q vanishes for an adiabatic system. Any adiabatic process that is also reversible is called an isentropic <math> \left( {Q\over T} = \Delta S = 0 \right) \,</math> process.
Now consider a subsystem having internal entropy S_{int}. Such a system is thermally connected to its surroundings, which have entropy S_{ext}. The entropy form of the second law applies only to the closed system formed by both the system and its surroundings. Therefore a process is possible only if
 <math> \Delta S_{int} + \Delta S_{ext} \ge 0 \,</math>.
If Q is the heat transferred to the system from the surroundings, then −Q is the heat lost by the surroundings, so that <math>\Delta S_{ext} =  {Q \over T},</math> corresponds to the entropy change of the surroundings.
We now have:
 <math> \Delta S_{int}  {Q \over T} \ge 0 \,</math>
Multiplying both sides by T:
 <math> T \Delta S_{int}  Q \ge 0 \,</math>
Q is the heat transferred to the system; if the process is now assumed to be isobaric, then Q = ΔH:
 <math> T \Delta S_{int}  \Delta H \ge 0\, </math>
ΔH is the enthalpy change of reaction (for a chemical reaction at constant pressure). Then:
 <math> \Delta H  T \Delta S_{int} \le 0 \,</math>
for a possible process. Let the change ΔG in Gibbs free energy be defined as
 <math> \Delta G = \Delta H  T \Delta S_{int} \,</math> (eq.1)
Notice that it is not defined in terms of any external state functions, such as ΔS_{ext} or ΔS_{tot}. Then the second law, which also tells us about the spontaneity of the reaction, becomes:
 <math> \Delta G < 0 \,</math> favoured reaction (Spontaneous)
 <math> \Delta G = 0 \,</math> Neither the forward nor the reverse reaction prevails (Equilibrium)
 <math> \Delta G > 0 \,</math> disfavoured reaction (Nonspontaneous)
Gibbs free energy G itself is defined as
 <math> G = H  T S_{int} \,</math> (eq.2)
but notice that to obtain equation (1) from equation (2) we must assume that T is constant. Thus, Gibbs free energy is most useful for thermochemical processes at constant temperature and pressure: both isothermal and isobaric. Such processes don't move on a PV diagram, such as phase change of a pure substance, which takes place at the saturation pressure and temperature. Chemical reactions, however, do undergo changes in chemical potential, which is a state function. Thus, thermodynamic processes are not confined to the two dimensional PV diagram. There is a third dimension for n, the quantity of gas. For the study of explosive chemicals, the processes are not necessarily isothermal and isobaric. For these studies, Helmholtz free energy is used.
If an isolated system (Q = 0) is at constant pressure (Q = ΔH), then
 <math> \Delta H = 0 \,</math>
Therefore the Gibbs free energy of an isolated system is
 <math> \Delta G = T \Delta S \,</math>
and if ΔG ≤ 0 then this implies that ΔS ≥ 0, back to where we started the derivation of ΔG.
Useful identities
20x20px  This section may be confusing or unclear to readers. In particular, the physical situation is not explained. Also, the circle notation is not well explained (even in the one case where it is attempted). It's just bare equations. (March 2015) 
 <math>\Delta G = \Delta H  T \Delta S \,</math> (for constant temperature)
 <math>\Delta_r G^\circ = R T \ln K \,</math> (for a system at equilibrium)
 <math>\Delta_r G = \Delta_r G^\circ + R T \ln Q_r \,</math> (see Chemical equilibrium)
 <math>\Delta G = nFE \,</math>
 <math>\Delta G^\circ = nFE^\circ \,</math>
and rearranging gives
 <math>nFE^\circ = RT \ln K \,</math>
 <math>nFE = nFE^\circ  R T \ln Q_r \, \,</math>
 <math>E = E^\circ  \frac{R T}{n F} \ln Q_r \, \,</math>
which relates the electrical potential of a reaction to the equilibrium coefficient for that reaction (Nernst equation).
where
 ΔG = change in Gibbs free energy
 ΔH = change in enthalpy
 T = absolute temperature
 ΔS = change in entropy
 R = gas constant
 ln = natural logarithm
 Δ_{r}G = change of reaction in Gibbs free energy
 Δ_{r}G° = standard change of reaction in Gibbs free energy
 K = equilibrium constant
 Q_{r} = reaction quotient
 n = number of electrons per mole product
 F = Faraday constant (coulombs per mole)
 E = electrode potential of the reaction
Moreover, we also have:
 <math>K_{eq}=e^{ \frac{\Delta_r G^\circ}{RT}}</math>
 <math>\Delta_r G^\circ = RT(\ln K_{eq}) = 2.303\,RT(\log_{10} K_{eq})</math>
which relates the equilibrium constant with Gibbs free energy.
Gibbs free energy, the second law of thermodynamics, and metabolism
A chemical reaction will (or can) proceed spontaneously if the change in the total entropy of the universe that would be caused by the reaction is nonnegative. As discussed in the overview, if the temperature and pressure are held constant, the Gibbs free energy is a (negative) proxy for the change in total entropy of the universe. It's "negative" because S appears with a negative coefficient in the expression for G, so the Gibbs free energy moves in the opposite direction from the total entropy. Thus, a reaction with a positive Gibbs free energy will not proceed spontaneously. However, in biological systems (among others), energy inputs from other energy sources (including the sun and exothermic chemical reactions) are "coupled" with reactions that are not entropically favored (i.e. have a Gibbs free energy above zero). Taking into account the coupled reactions, the total entropy in the universe increases. This coupling allows endergonic reactions, such as photosynthesis and DNA synthesis, to proceed without decreasing the total entropy of the universe. Thus biological systems do not violate the second law of thermodynamics.
Standard energy change of formation
The standard Gibbs free energy of formation of a compound is the change of Gibbs free energy that accompanies the formation of 1 mole of that substance from its component elements, at their standard states (the most stable form of the element at 25 degrees Celsius and 101.3 kilopascals). Its symbol is Δ_{f}G˚.
All elements in their standard states (diatomic oxygen gas, graphite, etc.) have standard Gibbs free energy change of formation equal to zero, as there is no change involved.
 Δ_{f}G = Δ_{f}G˚ + RT ln Q_{f} ; Q_{f} is the reaction quotient.
At equilibrium, Δ_{f}G = 0 and Q_{f} = K so the equation becomes Δ_{f}G˚ = −RT ln K; K is the equilibrium constant.
Table of selected substances^{[14]}
Substance  State  Δ_{f}G°(kJ/mol)  Δ_{f}G°(kcal/mol) 

NO  g  87.6  20.9 
NO_{2}  g  51.3  12.3 
N_{2}O  g  103.7  24.78 
H_{2}O  g  228.6  −54.64 
H_{2}O  l  237.1  −56.67 
CO_{2}  g  394.4  −94.26 
CO  g  137.2  −32.79 
CH_{4}  g  50.5  −12.1 
C_{2}H_{6}  g  32.0  −7.65 
C_{3}H_{8}  g  23.4  −5.59 
C_{6}H_{6}  g  129.7  29.76 
C_{6}H_{6}  l  124.5  31.00 
See also
 Calphad
 Electron equivalent
 Enthalpyentropy compensation
 Free entropy
 Grand potential
 Thermodynamic free energy
References
 ^ Greiner, Walter; Neise, Ludwig; Stöcker, Horst (1995). Thermodynamics and statistical mechanics. SpringerVerlag. p. 101.
 ^ ^{a} ^{b} ^{c} Perrot, Pierre (1998). A to Z of Thermodynamics. Oxford University Press. ISBN 0198565526.
 ^ J.W. Gibbs, "A Method of Geometrical Representation of the Thermodynamic Properties of Substances by Means of Surfaces," Transactions of the Connecticut Academy of Arts and Sciences 2, Dec. 1873, pp. 382404 (quotation on p. 400).
 ^ Reiss, Howard (1965). Methods of Thermodynamics. Dover Publications. ISBN 0486694453.
 ^ International Union of Pure and Applied Chemistry Commission on Atmospheric Chemistry, J. G. (1990). "Glossary of Atmospheric Chemistry Terms (Recommendations 1990)". Pure Appl. Chem. 62 (11): 2167–2219. doi:10.1351/pac199062112167. Retrieved 20061228.
 ^ International Union of Pure and Applied Chemistry Commission on Physicochemical Symbols Terminology and Units (1993). Quantities, Units and Symbols in Physical Chemistry (2nd Edition). Oxford: Blackwell Scientific Publications. p. 251. ISBN 0632035838. Retrieved 20131220.
 ^ International Union of Pure and Applied Chemistry Commission on Quantities and Units in Clinical Chemistry, H. P.; International Federation of Clinical Chemistry Laboratory Medicine Committee on Quantities and Units (1996). "Glossary of Terms in Quantities and Units in Clinical Chemistry (IUPACIFCC Recommendations 1996)". Pure Appl. Chem. 68 (4): 957–1000. doi:10.1351/pac199668040957. Retrieved 20061228.
 ^ James Clerk Maxwell, Elizabeth Garber, Stephen G. Brush, and C. W. Francis Everitt (1995), Maxwell on heat and statistical mechanics: on "avoiding all personal enquiries" of molecules, Lehigh University Press, ISBN 0934223343, p. 248.
 ^ Chemical Potential  IUPAC Gold Book
 ^ Müller, Ingo (2007). A History of Thermodynamics  the Doctrine of Energy and Entropy. Springer. ISBN 9783540462262.
 ^ Katchalsky, A.; Curran, Peter, F. (1965). Nonequilibrium Thermodynamics in Biophysics. Harvard University Press. CCN 6522045.
 ^ ^{a} ^{b} ^{c} Salzman, William R. (20010821). "Open Systems". Chemical Thermodynamics. University of Arizona. Archived from the original on 20070707. Retrieved 20071011.
 ^ Brachman, M. K. (1954). "Fermi Level, Chemical Potential, and Gibbs Free Energy". The Journal of Chemical Physics 22 (6): 1152–1151. doi:10.1063/1.1740312.
 ^ CRC Handbook of Chemistry and Physics, 2009, pp. 54  542, 90th ed., Lide
External links
 IUPAC definition (Gibbs energy)
 Gibbs free energy calculator
 Gibbs energy  Florida State University
 Gibbs Free Energy  Eric Weissteins World of Physics
 Entropy and Gibbs Free Energy  www.2ndlaw.oxy.edu
 Gibbs Free Energy  Georgia State University
 Gibbs Free Energy Java Applet  University of California, Berkeley
 Gibbs Free Energy  Illinois State University
 Using Gibbs Free Energy for prediction of chemical driven material ageing