MM-501 Phase Transformation in Solids
Fall Semester-2015
Engr. Muhammad Ali SiddiquiLecturer, Metallurgical Engineering Department, NED UET
BE: Mehran UET, 2007ME: NED UET, 2011
2
Lecture No: 021. Equilibrium2. One-component systems– Enthalpy and entropy dependence on P and T– Gibbs free energy dependence on P and T– Effect of pressure on the equilibrium phase
diagram for pure iron3. Phase Diagrams (Binary System)– Type I, II and III Phase Diagrams,
3
• Study of phase transformation concerned with how one or more phases in an alloy (or in a system) change into new phase or mixture of phases.
• The reason why a transformation occur….? because the initial state of the alloy is unstable relative to the final slate.
• A phase can be defined as a portion of a system whose properties and composition are homogeneous but physically distinct from other parts of the system.
• The Transformations that occur at constant temperature and pressure ,the stability of a system is determined by its Gibbs free energy (G).
Equilibrium
4
• The Gibbs free energy, G of a system is defined by the equation.
G = H - TS Where• H is the enthalpy, is the measure of the heat
content of the system.• T the absolute temperature, and • S the entropy of the system, is the measure of
the randomness of the system.
5
• Enthalpy is a measure of the heat content of the system and is given
H = E + PV• Where E, the internal energy of the system, P the
pressure, and V the volume.• E = internal energy arises from the total kinetic and
potential ener gies of the atoms within the system. • Kinetic energy can arise from atomic vibration in solids or
liquids and from translational and rotational energies for the atoms and molecules within a liquid or gas; whereas
• potential energy arises from the interactions, or bonds, between the atoms within the system.
6
H = E + PV…… For reference• If a transformation or reaction occurs the heat
that is absorbed or evolved will depend on the change in the internal energy of the system.
• However it will also depend on changes in the volume of the system and the term PV takes this into account, so that at constant pressure the heat absorbed or evolved is given by the change in H.
7
• When dealing with condensed phases (solids and liquids) the PV term is usually very small in comparison to E, that is H = E + PV. This is the very first approximation.
• A system is said to be in equilibrium when it is in the most stable state, i.e. shows no desire to change.
• An important consequence of the laws of classical thermodynamics is that at constant temperature and pressure a closed system will be in stable equilibrium if it has the lowest possible value of the Gibbs free energy, or in mathematical terms
• dG = 0 and graphically is shown as :
8
Fig: A schematic variation of Gibbs free energy with the arrangement of atoms. Configuration 'A' has the lowest free energy and is therefore the arrangement when the system is at stable equilibrium. Configuration 'B' is a metastable equilibrium.
Arrangment of Atoms
9
Equilibrium States:
dG = 0 dG = 0 dG ≠ 0
10
One-component systems
11
• Cp = Specific heat, quantity of heat (in joules) required to raise the temperature of the substance by one degree Kelvin
• The specific heat of most substances is easily measured and easily available.
• In general it varies with temperature as shown.
12
a. Variation of Specific Heat with Temperature
b. Variation of enthalpy (H) with absolute Temperature of a pure substance
c. Variation of entropy (S) with absolute Temperature of a pure substance
13
• Finally the variation of G with temperature shown in next Fig.
• which is obtained by combining Fig. b and c & using Equation G = H-TS.
14
• G decreases with increasing T at a rate given by - S.
Fig. Variation of Gibbs free energy with temperature.
15
• The relative positions of the free energy curves of solid and liquid phases are illustrated in Fig.
• Variation of enthalpy (H) and free energy (G) with temperature for the solid and liquid phases of a pure metal.
• L is the latent heat of melting,
• T m the equilibrium melting temperature.
16
17
18
Fig. Effect of pressure on the equilibrium phase diagram for pure iron
Pressure, Kbar
Type-I –Two Metals Completely Soluble in liquid and solid state
Figure: Determination o f a phase diagram by thermal analysis.
A) Cooling curves of six alloys of various compositions are determined experimentally. Temperature is shown on the vertical axis as a function of time on the horizontal axis. B) The fusion temperature and the liquidus and solidus temperatures are then plotted ,IS a function of composition to form the phase diagram.
Determination of Phase Composition
If an alloy consists of more than one phase, the amount of each phase present can be found by applying the lever rule to the phase diagram.The lever rule can be explained by considering a simple balance. The composition of the alloy is represented by the fulcrum, and the compositions of the two phases by the ends of a bar. The proportions of the phases present are determined by the weights needed to balance the system.
So,fraction of phase C1 = (C2 - C) / (C2 - C1)
and,fraction of phase C2 = (C - C1) / (C2 - C1).
Lever Rule: Determine the Phase Amount
Type-II- Two Metals Completely Soluble in Liquid State and Completely insoluble in the solid state. (Eutectic phase diagram)
Eutectic phase diagram describes behavior of the alloys, two components of which are completely soluble in liquid state and entirely insoluble in solid state.
This diagram has two liquidus curves, starting from the freezing points of the two metals and intersecting in a minimum point – eutectic point.
Type-III- Two Metals Completely Soluble in Liquid State but Partly soluble in the solid state
Summary
46
Thanks