Contents of Today S.J.T.U. Phase Transformation and Applications Review previous Solutions Thermodynamic activity Partial molar quantities Relative partial molar quantities Entropy of mixing:ideal solution Enthalpy of mixing:ideal solution Graphical representation SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I Contents of Today Review previous Solutions Thermodynamic activity Partial molar quantities Relative partial molar quantities Entropy of mixing: ideal solution Enthalpy of mixing: ideal solution Graphical representation
Nomenclature S.J.T.U. Phase Transformation and Applications Solutions:溶液 Chemical potential:化学位(势) Thermodynamic activity:热力学活度 Ideal solution:理想溶液 Relative partial molar quantities:相对偏摩尔量 Entropy of mixing:混合熵 Graphical representation of partial molar quantities: 偏摩尔量的图示 SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I Nomenclature Solutions: 溶液 Chemical potential:化学位(势) Thermodynamic activity:热力学活度 Ideal solution:理想溶液 Relative partial molar quantities:相对偏摩尔量 Entropy of mixing:混合熵 Graphical representation of partial molar quantities: 偏摩尔量的图示
Introduction1:溶液? S.J.T.U. Phase Transformation and Applications Chemical changes among pure components and compounds Solutions:elements or compounds dissolved in one another 何谓溶液? 一 种物质以分子、原子或离子状态分散与另一种物质中所构成的均匀而 又稳定的体系叫溶液。 高等学校教材,无机化学第三版,上册(ISBN7-04-004581-8)328页 布朗运动? Many of the interesting properties of materials and many important chemical reactions take place Thermodynamics of these solutions SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I Introduction 1:溶液? Chemical changes among pure components and compounds Solutions: elements or compounds dissolved in one another Many of the interesting properties of materials and many important chemical reactions take place Thermodynamics of these solutions 何谓溶液? 一种物质以分子、原子或离子状态分散与另一种物质中所构成的均匀而 又稳定的体系叫溶液。 高等学校教材,无机化学第三版,上册(ISBN 7-04-004581-8) 328页 布朗运动?
Introduction2:溶液热力学? S.J.T.U. Phase Transformation and Applications 相变是物质由一个相向另一个相的传递过程 扩散是物质由高浓度区向低浓度区的传递过程 化学反应可以看作是物质由反应物向产物的传递过程 在传递过程中化学势将起决定作用。 在恒温恒压下, dG=∑4,dn 再由自由能判据dG≤0可得判据的另一形式(化学势判据): ∑4,dn,≤0 在相变过程中物质总是由化学势高的一相向转向化学势低的 一相,直到两相中的化学势相等为止。而物质在两相中存在的 化学势差△μ:是物质传递的动力。 SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I Introduction 2:溶液热力学? 在相变过程中物质i总是由化学势高的一相向转向化学势低的 一相,直到两相中的化学势相等为止。而物质在两相中存在的 化学势差 Δμ i 是物质传递的动力。 = ∑ i ii 在恒温恒压下, dG μ dn 再由自由能判据 dG≤0 可得判据的另一形式(化学势判据): 相变是物质由一个相向另一个相的传递过程 扩散是物质由高浓度区向低浓度区的传递过程 化学反应可以看作是物质由反应物向产物的传递过程 在传递过程中化学势将起决定作用。 ∑ ≤ 0 i ii μ dn
例子 S.J.T.U. Phase Transformation and Applications 在等温等压下,两相平衡是常见的,如复相黄铜(铜一锌合 金)中o黄铜和β黄铜的平衡。设系统0、B两相相接触,在 等温等压下,若组分B(例如铜)有dn.由相进入B相,则o 相中B组分减少dng,而B相中B组分增加dng;其吉布斯函 数变化分别为: o相 B相 dG=ug(-dnB) dG=u(dng) 总的吉布斯函数变化等于 dG=dG+dG(uug)(dng) 组分B有dn.由o相 进入B相 SJTU Thermodynamics of Materials Spring2007©X.寸.Jim Lecture 11 Solution
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I 例子 在等温等压下,两相平衡是常见的,如复相黄铜(铜-锌合 金)中α黄铜和β黄铜的平衡。设系统α 、β两相相接触,在 等温等压下,若组分B(例如铜)有dnB由α相进入β相,则α 相中B组分减少dnB ,而β相中B组分增加dnB ;其吉布斯函 数变化分别为: )( dG −= dnBBαα μ )( dG dnBBββ = μ 总的吉布斯函数变化等于 ))(( dGdGdG dnBBB α αββ −=+= μμ α相 β相 组分B有dnB由α相 进入β相
例子续1 S.J.T.U. Phase Transformation and Applications 系统达到平衡时,即 dG 0 因为dnB≠0 所以 哈=哈 上式表明,对于多组分多相系统的平衡条件是:“除系统中各 相的温度和压力必须相等外,任一组分在各相中的化学势也 必须相等。”即 0相 B相 哈=4唱=…=% SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I 例子续1 系统达到平衡时,即 dG = 0 因为 dnB ≠ 0 所以 αβ = μμ BB 上式表明,对于多组分多相系统的平衡条件是:“除系统中各 相的温度和压力必须相等外,任一组分在各相中的化学势也 必须相等。”即 βα γ BB "=== μμμ B α相 β相
例子续2 S.J.T.U. Phase Transformation and Applications 若上述转移过程可以实现,则 0相 β相 dG=(uu)(dng)0 所以 哈<g 组分B有dn由o相 进入B相 上式表明物质总是由化学势较高的相自发转移到化学势较 低的相,直到该物质在两相中的化学势相等。 对比水与水位、电流与电势的关系,也有某种势的意思, 所以称为化学势 SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I 例子续2 上式表明物质总是由化学势较高的相自发转移到化学势较 低的相,直到该物质在两相中的化学势相等。 对比水与水位、电流与电势的关系,也有某种“势”的意思, 所以称为化学势 若上述转移过程可以实现,则 −= 0 αβ < μμ BB 组分B有dnB由α相 进入β相 α相 β相
化学势判据 S.J.T.U. Phase Transformation and Applications ∑4sdnB≤0 ∑4,d,≤0 这一判据式讨论具体的平衡规律、过程的方向与限度! SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I 这一判据式讨论具体的平衡规律、过程的方向与限度! ∑ ≤ 0 B μ dnBB 化学势判据 ∑ ≤ 0 i ii μ dn
P,V,i(溶液组成)影响化学势 S.J.T.U. Phase Transformation and Applications 1,温度的影响 ∂G =-S OT) ,xi 2,压力的影响 气相 RT =V V= dG=RTdln P aP P T,xi 3,组成的影响:偏摩尔Gibbs自由能 活度.… 溶液热力学 理想溶液? SJTU Thermodynamics of Materials Spring 2007 ©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I P, V, Xi(溶液组成)影响化学势 S T G i xP ⎟ −= ⎠⎞ ⎜⎝⎛ ∂∂ , dT TC S P ∫ = 2980 0298 1,温度的影响 2,压力的影响 V P G i xT ⎟ = ⎠⎞ ⎜⎝⎛ ∂∂ , PRT V = 气相 = ln PRTdGd 3,组成的影响:偏摩尔Gibbs自由能 溶液热力学 活度… 理想溶液?
Thermodynamic activity(1) S.J.T.U. Phase Transformation and Applications Fugacity is defined for gases: dGi RTd(Infi) Thermodynamic activity of a component,i,is defined as: n0 The fugacity of the componentiin its standard state. The fugacity of a condensed phase is equal to the fugacity of the vapor phase in equilibrium with it. The fugacity of the vapor is equal to the pressure of the vapor,if the vapor in equilibrium with the condensed phase is ideal. SJTU Thermodynamics of Materials Spring2007©X.J.Jin Lecture 11 Solution I
Phase Transformation and Applications S. J. T. U. SJTU Thermodynamics of Materials Spring 2007 © X. J. Jin Lecture 11 Solution I )(ln i i = fRTdGd D i i i f f α ≡ Thermodynamic activity (1) Fugacity is defined for gases: Thermodynamic activity of a component, i, is defined as: D i f The fugacity of the component i in its standard state. The fugacity of a condensed phase is equal to the fugacity of the vapor phase in equilibrium with it. The fugacity of the vapor is equal to the pressure of the vapor, if the vapor in equilibrium with the condensed phase is ideal