Post on 09-Mar-2021
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Chapter 6: Ionic Compounds andThe Lattice Energy
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Review of the Previous Lecture
1. Solid state lattices vary in terms of packing efficiency Packing: Simple Cubic < Body-centered < Close-packed layers
2. Atom contribution differs in the unit cell depending on location Corner: 1/8 Edge: 1/4 Face: 1/2 Inside the unit cell: 1
3. Lattice types 1:1 Cation:Anion 1:2 Cation:Anion
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Let’s consider how some of these lattices are related byions filling in the holes of a common lattice type.
Ca2+ Zn2+
Na+
Bi3-
4CCP: Cubic close-packing.
A. Calculation of UO may appear straightforward, equal to the potential energy of a cation and anion interacting:
Use Coulomb’s Law
E = in kJ mol-1
1. Lattice Energy (U)
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Energy released when ions come together from infinite separation to form a crystal.
M+(g) + X- (g) MX (s)Uo
4πϵoro
Z+Z-e2Z+ , Z- = Charges on the ionsϵo = Permittivity of vacuum
= 8.854185 x 10-12 C2J-1m-1
ro = Distance between the ions = r++ r- (pm)e = Charge on electron = 1.6210x10-19 C
Plot of potential energy of ions coming together.
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E = 4πϵoro
Z+Z-e2
+
+
‐
‐
ro
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The problem with this model is that it assumes thateach cation only experiences attraction from one anionwithin the crystalline lattice.
1. Lattice Energy (U)
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B. Must account for close and long-range interactions
Na+
Nearest neighbors to Na+:6 attractions to Cl- at distance r
1. Lattice Energy (U)
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B. Must account for close and long-range interactions
Na+
Nearest neighbors to Na+:6 attractions to Cl- at distance r
2nd Nearest neighbors to Na+:12 repulsions from Na+
at distance √2 r
1. Lattice Energy (U)
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B. Must account for close and long-range interactions
Na+
Nearest neighbors to Na+:6 attractions to Cl- at distance r
2nd nearest neighbors to Na+:12 repulsions from Na+
at distance √2 r
3rd nearest neighbors to Na+:8 attractions to Cl-
at distance √3 r
1. Lattice Energy (U)
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B. I. The Madelung Constant (M or in some textbooks A)
Geometric factor that sums all the attractions and repulsions in a crystal form.
Madelung Constant
Nearest neighbors to Na+:6 attractions to Cl- at distance r
2nd nearest neighbors to Na+:12 repulsions from Na+
at distance √2 r
3rd nearest neighbors to Na+:8 attractions to Cl-
at distance √3 r
1. Lattice Energy (U)
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C. Lattice Energy for known lattices
Born-Mayer equation:
4πϵo ro ro
- NM│Z+ │ │ Z- │ e2 1 - ρΔU = N = Avogadro’s number = 6.022x1023 mol-1
M = Madelung Constant (Look it up)ρ = A constant dependent on the
compressibility of the crystal
in kJ mol-1
1. Lattice Energy (U)
13Copyright © 2014 Pearson Education, Inc.
1. Lattice Energy (U)
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D. Lattice Energy for unknown lattices
Kapustinskii equation:
ro
- 107,000 υ │Z+ │ │ Z- │ΔU = υ= Number of ions in the ionic compoundin kJ mol-1
2. Born-Haber Cycle
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Recall Hess’s Law: Enthalpy is independent of the path.
Let’s consider the enthalpy of formation of an ionic lattice:
M(s) + ½ X2 (s) MX(s)ΔHfEnthalpy of formation
2. Born-Haber Cycle
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Recall Hess’s Law: Enthalpy is independent of the path.
Let’s consider the enthalpy of formation of an ionic lattice:
M(s) + ½ X2 (s) MX(s)
M(g) M+(g)
X (g) X-(g)
ΔHsubsublimation
ΔHIEIonization Energy
ΔHAatomization
ΔHEAElectron Affinity
ΔHfEnthalpy of formation
ΔULattice Energy
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A Born-Haber thermochemicalcycle of an ionic compoundgives the enthalpy changeassociated with the formation ofthe ionic lattice.
2. Born-Haber Cycle
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Recall Hess’s Law: Enthalpy is independent of the path.
Let’s consider the enthalpy of formation of an ionic lattice:
M(s) + ½ X2 (s) MX(s)
M(g) M+(g)
X (g) X-(g)
ΔHsubsublimation
ΔHIEIonization Energy
ΔHAatomization
ΔHEAElectron Affinity
ΔHfEnthalpy of formation
ΔULattice Energy
+ ΔHf = ΔHsub + ΔHA + ΔHIE + ΔHEA + ΔU
2. Born-Haber Cycle
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ΔHsub , ΔHA , ΔHIE , ΔHEA : Terms that can be looked up in tables.
ΔHEA , ΔU : Terms that are negative values. Recall that ΔHEA = - Electron Affinity
ΔHf = ΔHsub + ΔHA + ΔHIE + ΔHEA + ΔU
Let’s consider the thermodynamic drive for the formation of a solid state lattice:
Gibbs free energy ΔG = ΔH - TΔS
Where ΔG = Negative values for a thermodynamically favorable process
ΔH = ΔHf
2. Born-Haber Cycle
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ΔHf = ΔHsub + ΔHA + ΔHIE + ΔHEA + ΔU
ΔG = ΔH - TΔS
The formation of a solid state lattice is a process that results in a more orderly state for atoms in the compound. Therefore TΔS is a negative value ΔHf must be very negative to make ΔG negative ΔU must be very negative to make ΔHf very negative
Why can’t we have NaCl2?
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ΔHf = ΔHsub + ΔHA + ΔHIE + ΔHEA + ΔU
Na(s) + Cl2 (s) NaCl2(s)ΔHfEnthalpy of formation
Na(s) + Cl2 (s) NaCl2(s)
Na2+(g)
2Cl-(g)
ΔHfEnthalpy of formation
ΔULattice Energy
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Remove two electrons from Narequires high second ΔHIE Value of ΔU will not be
negative enough to overcomethe value of ΔHIE
3. Size Effects
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Factors that affect ionic radii
I. Left to right in Periodic Table, ↓ Ionic radius of cation
II. ↑ Ionic charge of cation, ↓ Ionic radius Greater pull on e-
III. As coordination number of cation ↑ , ↑ Ionic radius
IV. The number of unpaired electrons affects the ionic radius of transition metals
3. Size Effects
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V. The radius ratio of cation/anion (r+/r-) can dictate coordination number and geometry of the cation.
r+/r- Coordination Number Geometry<0.15 2 Linear
0.15‐0.22 3 Trigonal Planar0.22‐0.41 4 Tetrahedral
0.41 4 Square Planar0.41‐0.73 6 Octahedral>0.73 8 Cubic
4. Covalent character in ionic bonds
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Must consider a certain amount of covalency in ionic bonds via polarization.
Polarization induced by one ion to the oppositely charged ion ↑ by
1. Small, highly charged cations2. Large, highly charged anions3. The number of unpaired electrons of cation
Results of polarization
1. High melting points2. Solubility in polar solvents3. Higher covalent character in a bond, shorter bond lengths