Carnot cycle is based on 4 reversible processes.
(1) Reversible isothermal expansion from A to B.
ΔEAB = 0 ,
(2) Reversible adiabatic expansion from B to C
ΔEBC = nCV(T2 -T1)
WBC = ΔEBC
(3) Isothermal compression from C to D
ΔECD = 0,
(4) Adiabatic compression from D to A.
ΔEDA = nCV(T1 - T2)
WDA = ΔEDA
ΔECycle = 0
For BC,
For ΔA,
Wcycle = -nR(T1 - T2)ln V2/V1
Efficiency of any engine may be given as
ΔEcycle = qcyc wcycle
This means ΔS is a state function
Another thermodynamic quantities that helps in predicting the spontaneity of a process is Gibbs free energy or Gibbs energy of Gibbs function. It is denoted by G
It is given by the equation
G = H -TS
where H is the heat content, T is the absolute temperature and S is the entropy of the system.
G1 = H1 -TS1 for the initial state
G2 = H2 -TS2 for the final state
G2 -G1 = (H2 -H1) -T (S2 -S1)
ΔG = ΔH -TΔS
ΔG = G2 -G1 is the change in Gibbs free energy of the system
ΔH = H2 -H1 is the enthalpy change of the system
ΔS = S2 -S1 is the entropy change of the system.
ΔG = ΔH -TΔS is known as Gibbs – Helmoholtz equation.
−ΔG = nEF |
where
If all the reactants and products of the cell reaction are in their standard states i.e. 298 K and one atmosphere pressure, the above relation is written as
−ΔG° = nFE° |
where ΔG° is the standard free energy change,
ΔG° is the standard EMF of the cell.
In a fuel cell, it is found that the heat evolved is not completely converted into energy i.e. useful work.
The ratio ΔG / ΔH is called the efficiency of the fuel cell.
The total entropy change when the system is not isolated from the surrounding is given by ΔS = ΔSsystem + ΔSsurrounding
Consider a process being carried out at constant temperature and pressure.
Suppose the heat is lost by the surrounding and gained by the system.If the heat lost by the surrounding is represented by qp then by definition of entropy change
ΔSsurrounding = − qp /T
At constant pressure,
qP = ΔH
ΔSsurrounding = − ΔH /T
ΔStotal = ΔSsystem − ΔH /T
ΔStotal = ΔS − ΔH /T
Multiplying throughout by T ,we get
TΔStotal = TΔS – ΔH
ΔG = ΔH -TΔS
TΔStotal = – ΔG
ΔG = − TΔStotal
(a) If ΔStotal is positive, the process is spontaneous .
(b) If ΔStotal is zero, the process is in equilibrium.
(c) If ΔStotal is negative ,the direct process is non spontaneous, the reverse process may be spontaneous.
The criteria in terms of free energy change for the spontaneity of the process will be as follow:
(i) If ΔG is negative, the process will be spontaneous.
(ii) If ΔG is zero, the process is in equilibrium.
(iii) If ΔG is positive, the direct process is non spontaneous, the reverse process may be spontaneous.
According to Gibbs energy equation,
ΔG = ΔH -TΔS
This equation combines in itself the factors which decides the spontaneity of a process, namely:
(a) the energy factor, ΔH
(b) the entropy factor, TΔS
ΔG is the resultant of energy factor and entropy factor.
Depending upon the signs of ΔH and TΔS and their relative magnitude, the following possibilities arises:
(a) When both ΔH and TΔS are negative i.e. energy factors favours the process but randomness factors opposes it. Then
(i) If ΔH > TΔS the process is spontaneous and ΔG is negative.
(ii) If ΔH < TΔS the process is non spontaneous and ΔG is positive.
(iii) If ΔH = TΔS, the process is in equilibrium and ΔG is zero.
(b) When both ΔH and TΔS are positive i.e. energy factor opposes the process but randomness factor favours it. Then
(i) If ΔH > TΔS the process is non-spontaneous and ΔG is positive.
(ii) If ΔH < TΔS the process is spontaneous and ΔG is negative.
(iii) If ΔH = TΔS, the process is in equilibrium and ΔG is zero.
(c) When ΔH is negative and TΔS is positive i.e. energy factor as well as the randomness factor favour the process. The process will be highly spontaneous and ΔG will be highly negative.
(d) When ΔH is positive but TΔS is negative i.e. energy factor as well as the randomness factor opposes the process. The process will be highly non-spontaneous and ΔG will be highly positive.
(i) If ΔG is negative the process is spontaneous.
(ii) If ΔG is zero, the process does not occur or the system is in equilibrium.
(iii) If ΔG is positive the process does not occur in the forward direction. It may occur in the backward direction.
The spontaneity of a process depends upon
(a) the energy factor
(b) the randomness or entropy factor
The resultant ΔG = ΔH – T ΔS would change with temperature and so would spontaneity of the process.
ΔH is always positive i.e. this factor opposes the process.
(a) If TΔS is negative, this factor will also oppose the process and process will be non spontaneous.
(b) If TΔS is positive then the process can occur if magnitude of the factor TΔS is greater than the magnitude of ΔH. The reaction is then said to be entropy driven. The magnitude of the factor,TΔS is affected by temperature as follow:
(i) If the temperature is very low such that TΔS < ΔH in magnitude, ΔG will be positive and hence the process will be non spontaneous.
(ii) If the temperature is moderate such as TΔS > ΔH slightly in magnitude , ΔG will be slightly negative. Hence the process will be spontaneous but slow.
(iii) If the temperature is high, TΔS will be much greater than ΔH in magnitude so that ΔG is highly negative. Hence the process will not only be spontaneous but fast.
An endothermic reaction which may be non-spontaneous at low temperature may become spontaneous at high temperature.
This is the reason why endothermic reactions are carried out at high temperature.
ΔH is always negative i.e. this factor always favours the process.
If TΔS is positive , this factor will favour the process and the process will always be spontaneous.
If TΔS is negative, then the process can occur only if the magnitude of ΔH is very large so that ΔG is negative. The reaction is then said to be enthalpy driven.
The magnitude of TΔS and hence, the spontaneity of the reaction is affected by temperature as follow :
(i) If the temperature is so high that TΔS > ΔH in magnitude, ΔG will be positive and the process will be non- spontaneous.
(ii) If the temperature is made so low that TΔS < ΔH in magnitude, ΔG will be negative and the process will be spontaneous.
An exothermic reaction which may be non-spontaneous at high temperature may become spontaneous at low temperature.
Standard free energy change of a reaction is defined as the change in free energy which takes place when the reactants in the standard state are converted into products in their standard state.
The free energy change during a process can be calculated from the standard free energy of formation of the different reactants and products involved, taking standard free energy of formation of elements as zero i.e. for any process or reaction,
ΔrG° = (sum of the standard free energy of formation of products) – ( Sum of the standard free energy of formation of reactants)
ΔrG° = ∑ΔfG°( products) – ∑ΔfG°(Reactants)
Standard free energy of formation of a compound is defined as the free energy change which take place when one mole of the compound is formed from its elements taken in their standard state.
Standard free energy of formation of elementary substances is taken as zero.
127 videos|244 docs|87 tests
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1. What is Gibbs energy change and how does it determine if a process is spontaneous or nonspontaneous? |
2. How is Gibbs energy change related to the equilibrium constant of a reaction? |
3. Can a process with a negative Gibbs energy change be nonspontaneous under certain conditions? |
4. How does the Gibbs energy change differ for an exothermic reaction compared to an endothermic reaction? |
5. What role does temperature play in determining the spontaneity of a process based on Gibbs energy change? |
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