300 likes | 424 Vues
This course is approximately at this level. CHEMISTRY E182019. CH6. Entropy, Gibbs energy, 2 nd law of thermodynamics. Rudolf Žitný, Ústav procesní a zpracovatelské techniky ČVUT FS 2010. Entropy s. CH6. ENTROP Y dq = T ds. … heat dq transferred to a system (ideally, reversibly ).
E N D
This course is approximately at this level CHEMISTRYE182019 CH6 Entropy, Gibbs energy, 2nd law of thermodynamics Rudolf Žitný, Ústav procesní a zpracovatelské techniky ČVUT FS 2010
Entropy s CH6 ENTROPYdq = T ds …heat dq transferred to a system (ideally, reversibly)
Entropy s CH6 s-entropyrepresents probability of a macroscopic state(macrostate is something, that can be measured, for example temperatures, concentrations, length of macromolecules). This probability is proportional to the number of microstates (possible configurations, e.g. arrangements of macromolecular chains, location of molecules in space).The probability of a macrostate can be calculated, but it is not quite easy, see next. Spontaneous processes (chemical reactions, phase changes…) proceed in the direction of increasing probability and therefore are characterised by entropy increase. This is the second law of thermodynamics. Entropy of insulated system always increases.
p1 p2 Entropy – microstates spatial distribution CH6 Let us assume, that the system is a vessel containing only 2 molecules. We distinguish how many molecules are in the left and in the right part of the vessel. There exist only 3 possible macrostates: 1) two molecules are left, 2) one left and one right and 3) two molecules are right. In the first macrostate there exists only one microstate (both molecules , are left). The second macrostate can be realised by 2 microstates (molecule is left in the first, or is right in the second microstate). The macrostate with just one molecule in both parts has the highest number of possible arrangements (2), the highest probability and the highest entropy. In this way, for example diffusion is described: the highest entropy corresponds to the uniform distribution of components in space. Similar case is irreversible expansion of gas to vacuum or flow of gas between two vessels at different pressures.
Example of microstates corresponding to one macrostate (the same total energy). Different microstates correspond for example to collision of molecules (one is slow down the other accelerated) Energy level Entropy – microstates energy distribution CH6 Gas contained in a vessel increases its entropy when heated. In this case the macrostate corresponds to overall energy distributed to discrete energy levels of individual molecules. Microstate is a particular distribution of molecules to different energies. Temperature T1 Lower temperature T2 Less number of possible arrangements (microstates) corresponding to lower total energy. Entropy decreases with decreasing temperature. Energy level
Entropy – microstatesconformation CH6 Macromolecule of elastomer (rubber) can be assumed as a chain of hinge-connected rods of monomers. Macrostate is the distance of endpoints of this chain. As soon as the macromolecule is fully extended there exists the only linear arrangement of hinges and only one microstate. Unloaded macromolecule has lower end-to-end distance, and number of possible arrangements increases. Entropy of stretched polymer decreases and temperature of insulated filaments increases when stretched or compressed. Entropy decrease (dq=Tds) would correspond to the heat removal from the system. But alas! System is insulated therefore the heat cannot escape and this is manifested by the temperature increase. This is quite different situation comparing classical materials (metallic strip cools down when stretched, and metals expand with increasing temperature, while elastomers shrink). Remark: Position of hinges in the coiled chain is restricted not only by the overall length, but also by discretized relative angles between segments due to directional bonds. When counting number of possible arrangements (microstates) the hinges should be localized in a lattice.
Entropy - Boltzmann CH6 Previous analysis can be generalised to Boltzmann equation S- entropy, k-Boltzmann constant, W-number of microstates. It means that as soon as there exists only one microstate (one possible arrangement of elements with respect the space and energy levels) the entropy is ZERO. This state corresponds zero thermodynamic temperature (absence of motion) and ideal crystallographic lattice (zero energy and only one possible arrangement of atoms in a lattice). Remark: Entropy S is extensional and additive quantity. If entropies of subsystems are S1,S2, resulting entropy of the whole system is S=S1+S2=k(lnW1W2), because probability of 2 independent phenomena is product of probabilities.
Entropy - Clausius CH6 Thermodynamic definition of entropy was suggested by Clausius where ds is the specific entropy change of system corresponding to the heat dq [J/kg] added in a reversible way at temperature T [K]. in a reversible process it is possible to return back to to the initial state without any change of the system environment For irreversible processes the entropy is defined by INEQUALITY δq < T dsheat transferred to the system is less than the product T.ds Equalityδq=T ds holds only for ideal reversible processes (without friction). Entropy increase dsis given by heat supplied from environment δq/Tplus internal heat generated by viscous friction.
Entropy - Clausius CH6 Using first law of thermodynamic it is possible to evaluate entropy change between two different macrostates (initial macrostate p1,T1,v1,h1,s1 and final macrostate p2,T2,v2,h2,s2) from the Clausius definition as Entropy change can be calculated easily for IDEAL GAS Entropy change for isobaric processes (e.g phase changes, evaporation)
δQ T2 T1 Entropy - Clausius CH6 Example: Consider insulated closed system that contains two bodies at different temperatures. Heat dQ is reversibly removed from hot body at temperature T1 and added to the colder body at temperature T2. dS= - δQ/T1+ δQ/T2 = δQ (T1-T2)/(T1T2) Entropy change of two whole system is positive dS>0 , even if there is no heat transferred from outside. Positive value is a consequence of process IRREVERSIBILITY.
Entropy Boltzmann-Clausius CH6 Relationship between thermodynamical and statistical definition can be explained on example of a cylinder filled by n-molecules of gas and closed with piston, maintaining constant pressure. Number of cells v=T Number of microstates W1=v for 1 molecule W2=v2 for 2 molecules W3=v3 for 3 molecules … W=vn for n-molecules v v-1 pV=nRT V ~ T ~ V 3 2 1 Statistical approach. Thermodynamical approach.
Entropy change in chemical reaction CH6 The entropy change during chemical reactions is caused by the fact that energy of products is different than energy of reactants (manifested by released/absorbed heat) and also by change of spatial configurations (reactions producing more molecules increase entropy due to increased number of possible configurations). As soon as the reactants and products are at standard conditions (298 K and 100 kPa) the standard entropy change can be calculated from tabulated values of entropy in a similar way like the enthalpy of reaction where are stoichiometric coefficients of reactants (R) and products (P).
Spontaneity of chemical reaction CH6 Second law insists that spontaneous reaction proceeds in closed and insulated systems only if entropy increases – but reactor is not an insulated system, and entropy change of surroundings must be also considered Entropy change due to reaction heat (enthalpy) supplied to or removed from environment for exothermic or endothermic reactions respectively Entropy change of reactants and products inside reactor. Affected by reaction heat and by irreversible precesses inside reactor. H heat transferred from environment Chemical reactor
Spontaneity of chemical reaction CH6 This term is positive for endothermic reactions and negative for exothermic reactions Entropy change is usually positive if there are more molecules of products than reactants The energy changes are usually greater than the entropy changes. Therefore exothermic reactions are usually spontaneous (but not always, sometimes negative entropy changes prevail).
Spontaneity of chemical reaction CH6 • Combustion of methane • CH4+2O2CO2+2H2O • exothermic (H<0) • entropy change is nearly zero (S<0) (three molecules of reactants form three molecules of products) • Potential energy change prevails (forward reaction is spontaneous at any temperature) (Adiabatic flame temperature 1950 oC)
Fluidised bed combustor CaSO4 Air Coal+CaO Spontaneity of chemical reaction CH6 • Reduction of sulphur oxides • (technology for SO2 removal from flue gas) • CaO+SO3CaSO4 • exothermic (H<0) • decreases chaos (S<0) (two molecules form only one molecule) • Potential energy change prevails (formard reaction is spontaneous up to 2400 K)
Spontaneity of chemical reaction CH6 • Steam reforming • CH4+H2OCO+3H2 • endothermic (H>0) • increases chaos (S>0) (2 molecules form 4 molecule) • The reaction can be spontaneous only at high temperatures (>900K)
N2,H2 Ni catalyst NH 3 Spontaneity of chemical reaction CH6 • Ammonia synthesis • N2+3H22NH3 • exothermic (H<0) • decreases chaos (S<0) (4 molecules form 2 molecule) • Potential energy change prevails (up to 400 K) – in practice reaction temperature is much higher 800K but pressure is also higher 20-60 MPa
Gibbs energy CH6 Combined effect of entropy and energy upon the reaction spontaneity (or other processes, e.g. phase changes), carried out at constant pressure and temperature can be expressed by specific Gibbs energy g = h - Ts or [J/kg] [J/kg] [K][J/kgK] At constant temperature the Gibbs energy change ΔG=ΔH-TΔS is negative for spontaneous processes. See previous analysis of the chemical reaction spontaneity Gibbs energy change at standard conditions can be calculated in the same way as reaction enthalpy or entropy changes using tabulated Gibbs energies of formation
S<0, H<0 forward H2 NH3 H2 back N2 S>0, H>0 NH3 H2 Gibbs energy N2+3H22NH3 CH6 Principal question is: At what temperatures the forward reaction prevails and when prevails the backward reaction? The temperature when direction changes is characterized by the same rate of forward and backward reactions (equlibrium), therefore… G=H-TS<0 backward reaction prevails Reaction rate of forward reaction G=H-TS>0 G=H-TS<0 forward reaction prevails G=0 Reaction rate of back reaction G=H-TS>0 400 K T
Gibbs energy at equilibrium CH6 Principal question is: At what temperatures the forward reaction prevails and when prevails the backward reaction? The temperature when direction changes is characterized by the same rate of forward and backward reactions (equlibrium), therefore… …and assuming that the reaction enthalpy as well as the entropy change depend only slightly upon temperature ….
Helmholtz energy CH6 Gibbs energy G G = H - TS was historically called „free enthalpy“ and the Helmoltz energy F F = U – TS „free energy“. The both are suitable criteria for spontaneity of processes. While criterion G<0 is relevant for processes at constant pressure (e.g. phase changes), the criterion F<0 holds for isochoric processes (F is a suitable measure of deformation energy and therefore is useful for solid mechanics). First law TdS=dU+pdV d(H-TS)=dH-TdS-SdT=dU+pdV+Vdp-TdS-SdT=Vdp-SdT Consequence: dG=0 at constant pressure and temperature (e.g. at phase or chemical changes, gibbs energy of reactants is the same as products) First law TdS=dU+pdV d(U-TS)=dU-TdS-SdT=-pdV-SdT Consequence: dF=0 at constant volume and temperature (e.g. at isothermal deformation of incompressible solid)
G Your glow isheating, F Ami my temptation sweet, Ami C not negative being, Dmi E I cannot proceed. Relax – Gibbs energy CH6
x D Thermocouple V EnthalpyTutorial Syringe CH6 Calculate temperature, pressure, enthalpy, internal energy, entropy changes First law (ideal gas, adiabatic compression) Example: V2/V1=0.5 cv=0.714 kJ/kg.K cp=1 kJ/kg.K M=28.96 kg/kmol T1=300 K
x D Thermocouple V EnthalpyTutorial Syringe CH6 Gas temperature measurement This is a problem, because the mass of air inside the syringe is small (20 ml ~ 0.02 g) and also corresponding energy is small H ~ 2 J Thermal capacity of thermocouple is higher (mass of tiny thermocouple of diameter 1mm and length 10mm is ~ 0.06 g) and therefore the recorded temperature will be significantly less than the predicted 396 K.
Entropy Tutorial CH6 Given volume V0 containing the mixture of nA moles of gas A and nB moles of gas B. Calculate entropy changes necessary for separation of A and B into separate volumes V0/2. The separation can be technically realised in two steps 1.Step using piston with semipermeable membrane (permeable only to gas B with smaller molecules) 2.Step. Permeable mebrane is replaced by an impermeable piston (or pores are closed)
Entropy Tutorial CH6 Both steps are assumed ISOTHERMAL and ideal gas state equation can be applied for both gases. 1.Step. Heat must be removed by isothermal compression of gas A 2.Step. Heat must be added to gas A, and removed from B Resulting entropy change is the sum of heats
Gibbs energyTutorial Fischer Tropf CH6 Ammonia synthesis N2+3H22NH3is realized in industrial scale by Fischer Tropf synthesis. Ammonia is used for production of fertilizers, plasts and explosives (NH4)2SO4 ammonium sulfate ammonium nitrate NH4NO3 (NH4)3PO4 HNO3, ammonium phosphate nitric acid
Gibbs energyTutorial Fischer Tropf CH6 The lower is temperature, the greater is yield of the chemical reaction.
Gibbs energyTutorial Fischer Tropf CH6 Gibbs energy of ammonia synthesis N2+3H22NH3can be calculated from entropies, enthalpies anf gibbs energies of formation (notice the fact that these values are zero for nitrogen and hydrogen – they are elements in the most stable state) Check result using entropy Temperature at equilibrium of forward and backward reaction