the structure factorthe structure factor · structure factor (fhkl) 2( ) 1 ij i n ihu kv lw hkl i i...
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The Structure FactorThe Structure Factor
Suggested ReadingP 303 312 i D G f & M HPages 303-312 in DeGraef & McHenry
Pages 59-61 in Engler and Randle
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Structure Factor (Fhkl)
2 ( )
1
i j iN
i hu kv lwhkl i
i
F f e
• Describes how atomic arrangement (uvw)
1i
influences the intensity of the scattered beam.
It tells us which reflections (i e peaks hkl) to• It tells us which reflections (i.e., peaks, hkl) to expect in a diffraction pattern.
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Structure Factor (Fhkl)
• The amplitude of the resultant wave is given by a ratio of amplitudes:ratio of amplitudes:
amplitude of the wave scattered by all atoms of a UCli d f h d b lhklF
• The intensity of the diffracted wave is proportional
amplitude of the wave scattered by one electronhkl
• The intensity of the diffracted wave is proportional to |Fhkl|2.
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Some Useful Relations
ei = e3i = e5i = … = -1e2i = e4i = e6i = … = +1
eni = (-1)n, where n is any integery geni = e-ni, where n is any integer
eix + e-ix =2 cos x
Needed for structure factor calculationsNeeded for structure factor calculations
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Fhkl for Simple Cubic
• Atom coordinate(s) u,v,w:– 0,0,0
2 ( )
1
i j iN
i hu kv lwhkl i
iF f e
0,0,0
2 (0 0 0 )i h k l2 (0 0 0 )i h k lhklF fe f
No matter what atom coordinates or plane indices you substitute into the No matter what atom coordinates or plane indices you substitute into the structure factor equation for simple cubic crystals, the solution is always
non-zero.
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Thus, all reflections are allowed for simple cubic (primitive) structures.
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Fhkl for Body Centered Cubic
• Atom coordinate(s) u,v,w:– 0,0,0;
2 ( )
1
i j iN
i hu kv lwhkl i
iF f e
0,0,0;– ½, ½, ½.
2 h k li 2
2 (0) 2 2 2h k li
ihklF fe fe
1 i h k lF f ehkl
When h+k+l is even Fhkl = non-zero → reflection.
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When h+k+l is odd Fhkl = 0 → no reflection.
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Fhkl for Face Centered Cubic
• Atom coordinate(s) u,v,w:– 0,0,0;
2 ( )
1
i j iN
i hu kv lwhkl i
iF f e
0,0,0;– ½,½,0;– ½,0,½;– 0,½,½.
2 2 22 0 2 2 2 2 2 2h k h l k li i iif f f f
2 0 2 2 2 2 2 2i
hklF fe fe fe fe
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1 i h k i h l i k lhklF f e e e
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Fhkl for Face Centered Cubic 1 i h k i h l i k l
hklF f e e e
• Substitute in a few values of hkl and you will find the following:the following:
– When h,k,l are unmixed (i.e. all even or all odd), then Fhkl = 4f. [NOTE: zero is considered even]
F 0 f i d i di (i bi ti f dd– Fhkl = 0 for mixed indices (i.e., a combination of odd and even).
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Fhkl for NaCl Structure
• Atom coordinate(s) u,v,w:– Na at 0,0,0 + FC transl.;
2 ( )
1
i j iN
i hu kv lwhkl i
iF f e
Na at 0,0,0 FC transl.;• 0,0,0;• ½,½,0;
½ 0 ½
This means these coordinates• ½,0,½;
• 0,½,½.
coordinates(u,v,w)
– Cl at ½,½,½ + FC transl.• ½,½,½; ½,½,½
1 1 ½ 0 0 ½The re-assignment of coordinates is
• 1,1,½; 0,0,½• 1,½,1; 0,½,0• ½,1,1. ½,0,0
gbased upon the equipoint concept in
the international tables for crystallography
9• Substitute these u,v,w values into Fhkl equation.
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Fhkl for NaCl Structure – cont’d
• For Na: 2 ( )
1
i j iN
i hu kv lwhkl i
iF f e
2 (0) ( ) ( ) ( )i i h k i h l i k lf e e e e
( ) ( ) ( ) ( )
( ) ( ) ( )1Na
i h k i h l i k lNa
f e e e e
f e e e
• For Cl:
2 ( ) 2 ( ) 2 ( )( ) 2 2 2l k hi h k i h l i k li h k l
Clf e e e e
( ) ( ) ( ) ( )
( ) ( ) ( )
2 2 2 2
( )
2 2i h k l i i ih k h l k lCl
i h k l i i iCl
f e e e e
f e e e e
l k h
l k hThese terms are all positive and even. Whether the exponent is odd or
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Whether the exponent is odd or even depends solely on the remaining
h, k, and l in each exponent.
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Fhkl for NaCl Structure – cont’d2 ( )
1
i j iN
i hu kv lwhkl i
iF f e
• Therefore Fhkl:
( ) ( ) ( )
( ) ( ) ( ) ( )
1 i h k i h l i k lhkl Na
i h k l i i iCl
F f e e e
f e e e e
l k h Clf e e e e
which can be simplified to*:
( ) ( ) ( ) ( )1i h k l i h k i h l i k lhkl Na ClF f f e e e e
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Fhkl for NaCl Structure
When hkl are even Fhkl = 4(fNa + fCl)Primary reflectionsPrimary reflections
When hkl are odd F = 4(f f )When hkl are odd Fhkl = 4(fNa - fCl)Superlattice reflections
When hkl are mixed Fhkl = 0N fl tiNo reflections
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(200)100
80
90NaCl
CuKα radiation
(220)%)
60
70
Inte
nsit
y (
50
I
30
40
(111)
(222)
(400)
(420)
(422) (600)(442)
10
20
13
(111)
(311)
(400)
(331)(333)(511)
(440)(531)
20 30 40 50 60 70 80 90 100 110 120
2θ (°)0
10
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Fhkl for L12 Crystal Structure
• Atom coordinate(s) u,v,w:– 0,0,0; A B
2 ( )
1
i j iN
i hu kv lwhkl i
iF f e
0,0,0;– ½,½,0;– ½,0,½;
A
– 0,½,½.
2 2 22 (0) 2 2 2 2 2 2h k h l k li i ii 2 (0) 2 2 2 2 2 2
A B B BiF f e f e f e f ehkl
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( ) ( ) ( )A B
i h k i h l i k lF f f e e ehkl
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Fhkl for L12 Crystal Structure
( ) ( ) ( )A B
i h k i h l i k lF f f e e ehkl
(1 0 0) Fhkl = fA + fB(-1-1+1) = fA – fB
(1 1 0) Fhkl = fA + fB(1-1-1) = fA – fBA B
(1 1 1) Fhkl = fA + fB(1+1+1) = fA +3 fB
(2 0 0) Fhkl = fA + fB(1+1+1) = fA +3 fB
(2 1 0) Fhkl = fA + fB(-1+1-1) = fA – fB(2 1 0) Fhkl fA fB( 1 1 1) fA fB
(2 2 0) Fhkl = fA + fB(1+1+1) = fA +3 fB
(2 2 1) Fhkl = fA + fB(1-1-1) = fA – fB
(3 0 0) Fhkl = fA + fB(-1-1+1) = fA – fB
(3 1 0) Fhkl = fA + fB(1-1-1) = fA – fB
(3 1 1) Fhkl = fA + fB(1+1+1) = fA +3 fB
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(3 1 1) Fhkl fA + fB(1+1+1) fA +3 fB
(2 2 2) Fhkl = fA + fB(1+1+1) = fA +3 fB
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Intensity (%)
100(111)
Example of XRD pattern from a material with an
L12 crystal structure A B
80
90
100 A B
60
70
80
40
50
60
(200)
30
40
(220) (311)
2 θ (°)
10
20
(100)(110)
(210) (211) (221)(300)
(310)
(222)
(320) (321)
16
( )
20 25 30 35 40 45 50 55 60 65 70 75 80 85 90 95 100 105 110 1150
( ) ( )
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Fhkl for MoSi2
• Atom positions:– Mo atoms at 0,0,0; ½,½,½
Si t t 0 0 0 0 ½ ½ ½ ½ ½ ½ 1/3
c
– Si atoms at 0,0,z; 0,0,z; ½,½,½+z; ½,½,½-z; z=1/3– MoSi2 is actually body centered tetragonal with
a = 3.20 Å and c = 7.86 Å z
c c ac
x y
x y
z
xy
zb
x
y
z
a
b
a b ab
Viewed down z-axis
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a a
Viewed down x-axis Viewed down y-axis
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Fhkl for MoSi2
Substitute in atom positions:
( )2
1
i j iN
i hu kv lwhkl i
i
F f e
• Mo atoms at 0,0,0; ½,½,½• Si atoms at 0,0, ; 0,0,z; ½,½,½+z; ½,½,½-z; z=1/3
5 h k l h k l h k ll l
52 2 22 ( ) 2 ( )2 (0) 2 2 2 2 2 6 2 2 63 3
5
h k l h k l h k ll li i ii iiF f e f e f e f e f e f ehkl Mo Mo Si Si Si Si
l ll l h k h k 52 ( ) 2 ( ) 3 33 31
l ll l i h k i h ki ii h k lF f e f e e e eMo Si
Now we can plug in different values for h k l to determine the structure factor.F h k l 1 0 0• For h k l = 1 0 0
5(0) (0 )(0) (0)3 33 3
1 0 1 02 ( ) 2 ( )1 0 021
0(1 1) (1 1 1 1) 0
i ii iihkl Mo Si
hkl
Mo Si
F f e f e e e eF
f f
18
2
( ) ( )
You will soon learn that intensity is proportional to ; there is NO REFLECTION!
Mo S
l
i
hkF
f f
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Now we can plug in different values for h k l to determine the structure factor
Fhkl for MoSi2 – cont’dNow we can plug in different values for h k l to determine the structure factor.• For h k l = 0 0 1
5(1) (1)1 13 33 3
0 0 0 02 ( ) 2 ( )0 0 10
i ii iihkl Mo SiF f e e f e e e e
223(1 ) (2 ( ) )
(1 1) ( 1 1) 0
i iMo Si
Mo si
f e f COS ef f
• For h k l = 1 1 0
2 0 NO REFLECTION!hklF
1 1 0 1 1 0 1 1 00 2 (0) 2 (0)
2 (0) (0) 2 2(1 ) ( )(2) (4)
i i ii ihkl Mo Si
i i iMo Si
Mo si
F f e e f e e e e
f e f e e e ef f
If you continue for different h k l combinations trends will emerge this will lead you
2 POSITIVE! YOU WILL SEE A REFLECTION
hklF
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• If you continue for different h k l combinations… trends will emerge… this will lead you to the rules for diffraction…h + k + l = even
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100 (103)
80
90
(110)
MoSi2CuKα radiation
%)
60
70(101)
(110)
Inte
nsit
y (
50
I
30
40(002)
(213)
10
20(112) (200)
(202) (211) (116)
(301)
(206)
(303)
2020 30 40 50 60 70 80 90 100 110 120
2θ (°)0
10(006) (204) (222)
(301) (303)
(312) (314)
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Fhkl for MoSi2 – cont’d
2000 JCPDS International Centre for Diffraction Data All rights reserved
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2000 JCPDS-International Centre for Diffraction Data. All rights reservedPCPDFWIN v. 2.1
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Structure Factor (Fhkl) for HCP
2 ( )i j iN
i hu kv lwF f
• Describes how atomic arrangement (uvw)
( )
1
i j ihkl i
i
F f e
• Describes how atomic arrangement (uvw) influences the intensity of the scattered beam.
i.e.,
• It tells us which reflections (i.e., peaks, hkl) to expect in a diffraction pattern from a given crystal structure with atoms located at positions u v w
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structure with atoms located at positions u,v,w.
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• In HCP crystals (like Ru Zn Ti and Mg) the• In HCP crystals (like Ru, Zn, Ti, and Mg) the lattice point coordinates are:
– 0 0 0
– 1 2 13 3 2
• Therefore, the structure factor becomes:22 h k li 2
3 3 21i
hkl iF f e
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• We simplify this expression by letting:p y p y g2 1
3 2h kg
which reduces the structure factor to:
21 ighkl iF f e
• We can simplify this once more using:
1hkl iF f e
from which we find:2ix ix 2cosix ixe e x
2 2 2 24 cos h k lF f 4 cos3 2hkl iF f
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Selection rules for HCP
0 when 2 3 and oddh k n l 2
22
when 2 3 1 and even3 when 2 3 1 and odd
ihkl
f h k n lF
f h k n l
2
3 when 2 3 1 and odd4 when 2 3 and even
i
i
f h k n lf h k n l
For your HW problem, you will need these things to do the structure factor calculation for Ru.
HINT: It might save you some time if you already had the ICDD card for Ru.ad t e C ca d o u
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List of selection rules for different crystals
Crystal Type Bravais Lattice Reflections Present Reflections AbsentSimple Primitive, P Any h,k,l Nonep , y
Body-centered Body centered, I h+k+l = even h+k+l = odd
Face-centered Face-centered, F h,k,l unmixed h,k,l mixed
NaCl FCC h,k,l unmixed h,k,l mixed
Zincblende FCC Same as FCC, but if all even and h+k+l4N then absent
h,k,l mixed and if all even and h+k+l4N then absent
Base-centered Base-centered h,k both even or both odd h,k mixed
Hexagonal close-packed Hexagonal h+2k=3N with l evenh+2k=3N1 with l oddh+2k=3N1 with l even
h+2k=3N with l odd
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What about solid solution alloys?
• If the alloys lack long range order, then youIf the alloys lack long range order, then you must average the atomic scattering factor.
falloy =xAfA + xBfB
where xn is an atomic fraction for the atomic iconstituent
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Exercises
• For CaF2 calculate the structure factor and determine the selection rules for alloweddetermine the selection rules for allowed reflections.
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