Thermo-Calc software package

Slides:

Advertisements

Similar presentations

The thermodynamics of phase transformations

Advertisements

Control of Chemical Reactions. Thermodynamic Control of Reactions Enthalpy Bond Energies – Forming stronger bonds favors reactions. – Molecules with strong.

Lecture 18Multicomponent Phase Equilibrium1 Thermodynamics of Solutions Let’s consider forming a solution. Start with X A moles of pure A and X B moles.

Mechanical & Aerospace Engineering West Virginia University Phase Diagram (1)

CHAPTER 8 Phase Diagrams 8-1.

The Advanced Chemical Engineering Thermodynamics The retrospect of the science and the thermodynamics Q&A -1- 9/16/2005(1) Ji-Sheng Chang.

Thermodynamic Property Relations

Control of Chemical Reactions. Thermodynamic Control of Reactions Enthalpy Bond Energies – Forming stronger bonds favors reactions. – Molecules with strong.

Introduction to Materials Science, Chapter 9, Phase Diagrams University of Virginia, Dept. of Materials Science and Engineering 1 Development of microstructure.

EXPERIMENT # 9 Instructor: M.Yaqub

Chapter Outline: Phase Diagrams

How to calculate the total amount of  phase (both eutectic and primary)? Fraction of  phase determined by application of the lever rule across the entire.

Lecture 9 Phase Diagrams 8-1.

Physical Chemistry content Physical Chemistry 1 (BSC) Thermodynamics Terms The thermodynamic system First law of thermodynamics Work, heat, internal energy,

Kinetics and Thermodynamics of Simple Chemical Processes 2-1 Chemical thermodynamics: Is concerned with the extent that a reaction goes to completion.

Introduction to Materials Science, Chapter 9, Phase Diagrams University of Virginia, Dept. of Materials Science and Engineering 1 Growth of Solid Equilibrium.

Microstructure and Phase Transformations in Multicomponent Systems

CHAPTER 16: SPONTANEITY, ENTROPY, & FREE ENERGY Dr. Aimée Tomlinson Chem 1212.

© University of South Carolina Board of Trustees Chapt. 17 Thermodynamics Sec. 4 2 nd Law - Quantitative.

Thermodynamic data A tutorial course Session 1: Introduction and unary data (part 1) Alan Dinsdale “Thermochemistry of Materials” SRC.

H Davies, D I Head, J Gray, P Quested

Calculations of phase diagrams using Thermo-Calc software package Equilibrium calculation using the Gibbs energy minimisation 1. The Gibbs energy for a.

Bell Ringer 2NO(g) + O 2 (g) 2NO 2 (g)  H = -27 kcal Reaction Progress Energy AB CD Source: 2004 VA Chemistry EOC Exam Which graph represents the reaction.

 Thermodynamics?  Therma (heat) + Dynamics (study of the causes of motion and changes in motion)  Heat = energy (1 st law?)  Wiki: the branch of physical.

Thermodynamic data A tutorial course Session 2: unary data (part 2) Alan Dinsdale “Thermochemistry of Materials” SRC.

Chapter 19 Part 4: Predicting reactions & the Third Law of Thermodynamics.

Phase Diagrams melting / production process / alloying (strength, Tm...) heat treatment microstructure material properties system (e.g. Cu-Ni) components.

Thermodynamics and the Phase Rule

Classical Thermodynamics of Solutions

Chemical compositions of equilibrated phases One phase areas: the determination of the chemical composition of a single phase is automatic: it has the.

 Course number: 527 M1700  Designation: Graduate course  Instructor: Chao-Sung Lin, MSE Dept., (office), (lab)  Office hours: 2 ~

Thermodynamics and the Phase Rule

Phase diagrams of unary and binary systems

Potential diagrams Chemical potential, intensive and extensive parameters Types of phase diagrams Unary diagrams Binary diagrams Ternary diagrams Volatility.

Exam #3 1. You should know from memory:

Material Science & Metallurgy Non Equilibrium Cooling

Thermodynamics and the Phase Rule

Phase Diagrams 8-1.

Solution of Thermodynamics: Theory and applications

Figure 6.2 Comparison among the Debye heat capacity, the Einstein heat capacity, and the actual heat capacity of aluminum.

Introduction to Materials Science and Engineering

An Introduction to MTDATA

} C = 1 F = 2 P = 1 Gibbs phase rule F = C – P + 2

Classical Thermodynamics of Multicomponent Systems

Solid Solution Thermal Equilibrium Diagram

Classical description of a single component system

Katsuyo Thornton,1 Paul Mason,2 Larry Aagesen3

Liquid-Liquid Phase Equilibrium

Unit 10: Thermodynamics.

Phase diagrams by thermodynamic calculations

Chapter 4 Revision.

2/16/2019 9:54 PM Chapter 9 Phase Diagrams Dr. Mohammad Abuhaiba, PE.

CHAPTER 8 Phase Diagrams 1.

CHAPTER 8 Phase Diagrams 1.

Non equilibrium systems

Christa Trandum, Peter Westh, Kent Jørgensen, Ole G. Mouritsen

CHAPTER 8 Phase Diagrams 1.

Introduction to the Phase Diagrams MME 293: Lecture 05

WARM UP: Any questions on test review?

Thermo-Calc software package

Phase diagrams of pure substances

Thermodynamics Lecture 3

Interpretation of Phase Diagrams

Phase diagrams and phase transitions of unary systems

C = 2 Gibbs phase rule F = C – P + 2 Pressure Temp. Comp. xA F = 3

T l s Full solubility liquid Phase diagram solid g(n) Gibbs Energy

Mechanical Properties of Isomorphous Alloys

Katsuyo Thornton,1 Paul Mason,2 Larry Aagesen3

Presentation transcript:

Thermo-Calc software package Calculations of phase diagrams using Thermo-Calc software package Content Equilibrium calculation using the Gibbs energy minimisation 1. The Gibbs energy for a system 2. The Gibbs energy for a phase Unary system: Sn (calculation of melting temperature, plotting thermodynamic functions) Phase diagram for the Sn-Bi system (Temperature - Composition) Calculation of invariant reaction (T, phase compositions, enthalpy) Calculation of thermodynamic properties of liquid phase Calculation of phase fraction diagram for Bi concentration 5, 25 and 43 mol.% Scheil solidification simulation for Sn-Bi alloys Calculation of phase diagram for Fe-C system Stable diagram 2. Metastable diagram

The Gibbs for a system and for a phase xB 1+3+5: G135=n1G1+n3G3+n5G5 1+2+4: G124=n1G1+n2G2+n4G4 1+3+4: G134=n1G1+n3G3+n4G4 2+4+5: G245=n2G2+n4G4+n5G5 2+4+6: G246=n2G2+n4G4+n6G6 2+3+5: G235=n2G2+n3G3+n5G5 3+4+6: G346=n3G3+n4G4+n6G6 3+5+6: G356=n3G3+n5G5+n6G6 xA

The Gibbs for a system and for a phase

The Gibbs for a system and for a phase

Property diagrams for unary system (Sn) Tm=505 K (232°C) L=Sn-Bct DHtr=-7.029 kJ/mol

Phase diagram of the Sn-Bi phase diagram

Gm-curves for the Sn-Bi phase diagram

Calculation of enthalpy (DH) of reaction 1Liq=A(Sn)+B(Bi) Stoichiometric coefficients A and B of invariant reaction are calculated by Lever rule b a c=X(Bi) - X(Sn) a=X(Bi) - XLiq b=XLiq - X(Sn) A=a/c B=b/c X(Sn) XLiq X(Bi) DH(Tinv)=ADH(Sn)+BDH(Bi)-DHLiq DH(412K)=-7.717 kJ/mol-at.

Calculation of thermodynamic properties of liquid phase Thermodynamic functions of mixing (enthalpy, entropy, Gibbs energy) in Liquid phase at 300°C Activity of Bi and Sn in Liqiud phase at 300°C

Phase fraction diagrams II III I II III

Scheil solidification simulation D.R. Askeland, P.P. Phule „The science and engineering of materials“ p. 370 ξ(liq)n – fraction of liquid calculated by lever rule at Tn

Scheil solidification simulation for Sn-5Bi alloy

Scheil solidification simulation for Sn-25Bi alloy

Scheil solidification simulation for Sn-43Bi alloy

Phase relations in the Fe-C system Fig.1. Stable diagram Fig. 2. Metastable diagram