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Atomic arrangements in titanium-molybdenum solid solutions
ATOMIC
ARRANGEMENTS
IN TITANIUM-MOLYBDENUM
J. M. DUPOUY
SOLID
SOLUTIONS*
and B. L. AVERBACH?
The short range order and size effect coefficients as well as the thermal and static atomic displacements h&ve been measured in b.c.c. solid solutions of titanium-molybdenum using X-ray diffraction techniques. These solutions exhibit a strong preference for unlike near-neighbors even though a superlattice was not found. The size effect coefficients for the first shell of atoms were negative, indicating that the molybCenter-to-center distances bet,ween denum atoms were smaller than the titanium atoms in solution. the different pairs of nearest neighbor atoms were calculated from the size effect coefficients and the Ti-Ti and MO-MO distances tended to approach the average distance in the solution lattice parameters. At 75 per cent molybdenum the NO-MO distance at compositions between 20 and 50 at.% molybdenum. was smaller than in pure molybdenum and this was taken to indicate an electron exchange in the sohltion. ARRANGEMENT
D’ATOMES
DANS
LES
SOLUTIONS
SOLIDES
DE
TITANE
MOLYBDENE
L’ordre zt courte distance et des coefficients d’effet de dimension einsi que les dbplacements atomiques thermiques et statiques ont 6tB mesur& dans des solutions solides de titane molybdbne de reseau cubique cent& par diffraction de rayons X. Les solutions montrent une grande pr&f&ence pour leurs voisins non semblables, quoiqu’une surstructure n’a pas pu &re trouv8e. Les coefficients d’effet de dimension pour les atomes de la premihre orbite Btaient &g&ifs, co qui indique que les atomes de molybd8ne Btaient plus petits que les atomes de titan0 en solution. Les distances d’un centre iLl’autre entre deux paires diffbrentes d’atomes les plus rapprochbs ant BtB c&x&es d’aprbs le coefficient d’effet ou dimension et d’ap&s les param&res du rkseau. Les distances Ti-Ti et MO-MO tendent iLs’approcher de la distance moyenne dans la solution pour des teneurs entre 20 et 50% atomiques de molybdhne. Pour une teneur de 75% de molybdBne la distance Mo-Mo Qtait plus petite que celle dans le molybdene pur, ce qui indiquerait un &change d’6lectrons dans la solution. ATOMANORDNUNGEN
IN
FESTEN
LiiSUNGEN
AUS
TITAN
UND
MOLYBDliN
RGntgenographisch wurden die Nahordnungsund GrBssaneffekt-Koeffizienten und die therm&hen und statistischen Atomverschiebungen in k.r.z. festen Liisungen aus Titan und Molybdiin bestinunt. Diese Liisungen zeigen ein starkes Vorherrschen van ungleichen niichsten Nachbarn, obwohl keine tiberstruktur gefunden wurde. Die GrGsseneffekt-Koeffizienten der Atome erster Schale waren negativ; des weist darauf hin, dass die Molybdiinatome in der Liisung kleiner sind als die Titanatome. Die Mittelpunktsabstiinde zwischen verschiedenen Paaren niichstbenachbarter Atome wurden &us den Griisseneffekt-Koeffizienten und den Gitterparametern berechnet. Ti-Ti und M+Mo Abstiinde nlihern sich zwischen 20 und 50 At% Molybdiin dem durchschnittlichen Atomabstand in der LGsung an. Bei 75 At% MolybdBn ist der Mo-Mo-Abstand kleiner 81s in reinen Molybdiin, dies wurde alsAnzeichen eines Elektronenaustauschs in der LGsung gedeutet.
1. INTRODUCTION
The
arrangement
of
atoms
averaged in
a
binary
solid
of
the
individual
from the average determined
interatomic
by
distances
by the cell dimensions
is
expressed
in terms of the size effect coefficients for each shell, pi. The spectrum of elastic waves associated with the thermal motion of the atoms may be characterized
by the square of the dynamic
METALLURGICA,
VOL.
displacement
9, AUGUST
1961
position
in
the
lattice,
lattice, Q,
averaged
over
every
position
in the
may also be measured.
The short range order and size effect coefficients are determined from the diffuse scattering and thus provide
averages over small correlation distances in the lattice. In practice it is difficult to obtain information for distances greater than the sixth nearest neighbor, and in polycrystals data are frequently restricted to the first two atomic shells. On the other hand, the thermal and static displacements are determined from the intensities of the diffraction lines and are thus averaged over correlation distances
* Received December 14, 1960; revised February 8, 1961. t Department of Metallurgy, Massachusetts Institute of Technology, Cambridge, Massachusetts. This paper is based on the Sc.D. dissertation of J. Dupouy at M.I.T. ACTA
and
from the average lattice point and the square of this displacement
the short range order coefficients, ui, which indicate the preference for unlike or like neighbors in a particular shell. If the atoms are of different size, the deviation
time
q, or the Debye temperature, 0. If the atoms differ in size there is also a static displacement of each atom
solution may be described in terms of paramet,ers which can be measured by means of X-ray diffraction The average composition of the ith shells techniques. of atoms about an atom at the origin is described
over
which are large enough to provide coherent diffra.ction effects. These longer correlation distances are of the 755
ACTA
756
METALLURGICA,
order of 100 A or greater.
It is interesting
that a difference
in atomic
size produces
both
large
small
and
correlation
allows an independent evaluation although the method of averaging case. Titanium-molybdenum this study.
distances.
This
ofatomic
size effects, is different in each
solutions
The phase diagram(l)
to note effects at
were chosen
for
is shown in Fig. 1.
VOL.
9,
1961
was prepared at the Watertown compositions molybdenum. over
Arsenal.
The actual
were 19.5, 29.5, 40.5, 48.6 and 75.4 at. % Each button was remelted and turned
several
times
in order
to eliminate
dendritic
structure and the final ingot was a cube approximately 1.5 in. on edge. Attempts to use vacuum-sintered scattering
filings for diffuse
samples were unsuccessful.
Long sintering
There is a large b.c.c. phase field with no indication of There is a large ordered phases or compounds.
times were required in order to sharpen the diffracti m lines and to obtain sufficient mechanical strength;
difference in the scattering
the resulting specimens were invariably
contaminated
with
to
the combination atom,
power of these atoms, and
is fairly unique in that the heavier
molybdenum,
has a smaller
distance than the lighter titanium
nearest neighbor
atom.
This should
result in a negative value for the nearest neighbor size effect coefficient, before.
/?i, and this had never been observed
In addition,
the only
which had been investigated
other b.c.c.
previously
solutions
were lithium-
sufficient
hexagonal ingot
phase.
along
helium
in Vycor
1100°C.
at a logarithmic
are described in the following sections. attention is focussed on an improved method reduction
and the results are discussed 2. EXPERIMENTAL
only
the
for 24 hr at from
and the other was cooled
rate from 1100 to 350°C over a period
superficially
These samples were
contaminated; polishing
the surfaces followed
were
by electro-
polishing in a solution of 5 per cent perchloric in glacial acetic acid. These samples all showed marked preferred
METHOD
the
orientation,
but
subsequent
experiments
showed that the diffuse scattering was not affected by
pure molybdenum
arc-melted
containing
and 50 at. ‘A molybdenum University
temperature
cleaned by mechanical
in the final
directions;
and annealed
of data
The alloys were prepared from iodide titanium Ingots
tubing
of 20 days and then quenched.
(a) Materials
phere.
perpendicular
alloys Special
section.
form
One set of samples was water-quenched
a relatively
on five titanium-molybdenum
nitrogen
Solid samples were cut from each
three
the annealing
sma.11size effect.
and
specimens were packed in foils of a titanium-14 wt. % molybdenum, sealed under a partial pressure of
magnesium solid solutions,(2) and this system exhibited Measurements
oxygen
and
under an argon atmos-
approximately
20, 30, 40
were melted at New York
and an alloy with 75 at. % molybdenum
this amount
of texture.
Samples with random orientation measurements filings.
These
were obtained filings
were
for the Bragg line
by using loosely packed sealed
in Vycor
helium and annealed for 1 hr at 1050°C. time
was long
diffraction
enough
to
lines sufficiently
sharpen
under
The annealing the
high
angle
so that they could be well
resolved but was short enough to avoid contamination. The filings were then mixed with Duco cement and acetone to form a flat diffraction (b) X-Ray
sample.
measurements
The diffuse scattering measurements
were made with
monochromatic
CuK, radiation diffracted from a bent
silicon
cut
crystal
to
the
(111)
orientation.
The
detecting assembly consisted of a proportional counter and a pulse height analyser arranged to eliminate the one-third
wavelength
of the white radiation
(the one-
half component was eliminated by the silicon crystal), the cosmic background and the fluorescence radiation from titanium. Readings were recorded continuously
0
Ti
0.5 Alomic fraction
P MO
FIG. 1. Titanium-molybdenum phase diagram.
1.0 f40
on a horizontal spectrometer with the counter rotating at 0.25” in 2 8/min and measurements were made from 10 to 132’ in 2 8. Flat samples were used and the geometry focussing
of the system condition.
satisfied
the usual
double
DUPOUY
AVERBACH:
AND
The specimens were rotated around the axis normal to the reflecting surface to minimize the effects of preferred orientation and the coarse grain size. The diffuse intensity was found to be insensitive to the preferred orientation. Fig. 2 shows the scattering recorded from samples of the 30 % molybdenum with the greatest difference in texture. One sample was so highly textured that the (200), (220) and (222) lines were almost absent, yet the diffuse intensities for both samples were quite similar. In practice the diffuse intensity was recorded from each of three samples cut at different angles from the ingot and the intensities were averaged. In the case of the 50 ‘A alloy only two samples were available ; only one was availabte for the 75 % alloy. The intensities of the diffraction lines were measured with MoK, radiation and a scintillation counter. A holder filled with a mixture of powder and cement was pressed by a spring against the wall of a small chamber which could be filled with liquid nitrogen. The assembly was enclosed in an evacuated container which had a Mylar window glued with epoxy resin. IIeating tape was wrapped around the window to prevent the condensation of moisture. The temperature was measured by a thermocouple embedded in the powder. The diffraction lines were recorded and the areas under the peaks measured with a planimeter. The first four diffraction lines were ignored because of extinction effects, and the remaining eight to twelve lines were used for the determination of thermal and static displacements.
Ti-Mo
SOLID
SOLUTIONS
757
3. REDUCTION
OF DATA
(a) Thermal and static displacements
The integrated intensity of a diffraction line for a binary alloy is given by I = ANF2m(LP) exp [ -2( B, + B,) sin2 e/A21 (1) where A is a constant, Ii the number of atoms irradiated, m the multiplicity, F the structure factor, _l.Z the Lorentz-polarization factor (1 + cos2 2i3)/sin20 00s 8, B, the Debye-Waller factor for thermal displacements and B, the static displacement factor.(3) The thermal factor may be written in terms of the Debye temperature 0 as follows: 3,
= mk-p [tp(Y) 4 f//4:1
=
where m is the average mass of the atom in solution, h is Planck’s constant, k the Boltzmann constant, T the absolute temperature, y = O/T and v(y) is the Debye integral.t4) Plots of In I versus sin2 S/;l” were straight lines, indicating that the powder samples were quite random. Intensities were measured at 108 and at 295°K and values of 3, and B, were determined for each alloy. The mean square atomic displacements may be calculated from the relat,ionships : B, = 4?+G7 and
80
3, = 4n%hs2 .
\,
60
Ti -30 at~~~~percentMO Specimen 33 ---Specimen 31 i
40 0
-I I
0.5
I
1.0
(2)
I
I
1.5
2.0
I 2.5
I
3.0
I 3.5
I
x.. 20 sin8 A
Pra. 2. Comparison of scattering from two specimens with preferred orientation.
W4
758
ACTA
METALLURGICA,
VOL’.
9,
1961
hydrogen
were taken
incoherent
scattering of hydrogen was calculated from
the tables coefficients
The contribution
average 200-
I
’
/-*
0.4 -
2
I
I
I
I
I
I
-
02
-1 I
x (1 x\
I
I
form
of
the
pattern
to have the following
I
I,
*.
I
I,
tion -;‘. 1.0
are
listed in Table 1 and the variations of Debye temperature and B, are shown in Fig. 3. It is interesting to note that the thermal
and static
of the same magnitude
for each composition. Debye
displacements
temperature
but the present data extrapolate
close
to
300”K,
the
value
are There
of b.c.c.
estimated
in t$he Debye tempera-
on an absolute
scale@)
by
comparison with the scattering from lucite, (C,H@,) ; an intensity measurement at 130’ in 28 was used for standardization. Values for the coherent
and incoherent scattering factors for carbon were taken from Berghuis et aZ.(9) and Keating’lO), respecScattering factors for oxygen were taken from
Freema,n(ll). TALBE
Values
for the coherent
scattering
1. Thermal and static displacements Ti-Mo solutions
in
0.68 0.57 0.47 0.34 0.22
0.46 0.31 0.24 0.18 0.10
and
Averbach for b.c.c. lattices. Values of B, were obtained from the measurements of line intensities 1);
the scattering
for
both
elements
Templeton( temperature A
scattering
for titanium
were
were
taken
from
Dauben
and
It was thus possible to calculate the diffuse scattering from equation (4).
similar
arises from
factors
and for molybdenum from The dispersion corrections
contribution the static
to
the
atomic
diffuse
scattering
displacements.
This
sin2 0/n2]).
(5)
has the form :(20,21)
x
The modulating W(x)
(1
-
exp [-2B,
function
and was calculated
H(z)
is similar in form to
here for a b.c.c.
of
observed
for f.c.c. powder patterns.@n
B, were taken from the diffraction and the static diffuse intensity
powder
0.093 0.085 0.077 0.065 0.052
0.075 0.063 0.055 0.048 0.036
The values of
line data (Table 2)
contribution
was thus
ralcula,ted. The diffuse scattering in absolute units was corrected for polarization and for the contributions indicated above,
and the remaining
diffuse
scattering
which
describes the local atomic arrangement may be written as follows :(s)
I = mAmB(.fA -.fd2
1+
( co9 27rrix -
I-_-
300 314 335 385 449
func-
by Herbstein
pattern. The modulations were small and the function U(Z) was taken as unity. A similar situation was
(b) Short range order and size coeficients were placed
(4)
and fi the scattering
calculated
by
ture at 75 at. % molybdenum.
The intensities
sin2 ~9/1~])
to a value
Kaufman(5) ; the Debye temperature for pure molybdenum was taken as 380”K.‘69’) It is evident that there is a significant maximum
has been
taken from Watson’l’) James and Brindley’ls).
temperature and static displacement fw!tor.
for the
which
(Table
fraction MO
Values for the thermal and static displacements
data
exp [ -2B,
where mi is the atomic fraction
0.5
FIG. 3. Debye
0.2 0.3 0.4 0.5 0.75
The
for a powder
factor for the ith atom, and W(x) is a modulating
xi,
Atomic
tively.
with
to be the weighted
constituent.
has been shown by Warreno5)
\
Lx._
0
quite
each
assumed
x
1’ I
0.1 -’ I I
are no
of the Compton modified scattering
diffuse scattering
,’
0.3
titanium,
for
the
absorption
from the results of Bewiloguao3),
contribution
temperature
and
form :
0.5 -
“a
I
McWeenydz),
of Bewilogua(13). The mass were taken from Barrett?).
was calculated the total
from
sin SC&% +
27rr.x
i:=,
sin 27rr.x -2 29wix
(6)
where Ci is the number of atoms in the ith shell, TV = (distance to shell i)/a, a is the lattice parameter, x = 2a sin e/L, 1 is the X-ray wavelength,
and 8 is the
DUPOUY TABLE Specimen condition
Atom
quenched quenched slowly cooled quenched slowly cooled quenched slowly cooled quenched
Bragg angle.
AVERBACH:
AND
Ti-Mo
SOLID
fraction
%3
-0.29 -0.20 -0.27 -0.19 -0.29 -0.24
0.4
!
0.5 0.75
ui is
neighborhood transforms
where pi is the probability
p,lmB
(7)
of finding a B atom in the
ith shell about an ,4 atom at the origin.
The size effect
is given by
similar.
t%
-0.06 -0.04 -0.15 -0.14 -0.21 -0.12 -0.24 -0.12
0.08 0.07 0.10 0.06 0.12 0.05 0.11 0.07
0.02 0.04 0.04 0.02 0.03 0.03 0.04 0.07
i
The short range order parameter ui = 1 -
759
2. Short range order coefficients mi and size coefficients, /li
defined
parameter
SOLUTIONS
-0.079 -0.071 -0.073 -0.060 -0.063 -0.046 -0.056 -0.052
of the fourth
0.013 0.033 0.032 0.025 0.033 0.030 0.032 0.057
-
and sixth. shells.
for all of the alloys
The
were qualitatively
It was assumed therefore that the region in
the transform
from r = 0.4 to r = 1.3 was associated
only with the first two shells. Nineteen values of r were taken in this interval and values of yi, y2, /3i and /12 were obtained
by a least squares
fitting.
This
procedure
gave values of ui, tc2, ,$ and p2 which were
physically
plausible.
Values for CQand c+, were then
estimated
from
transform,
the
assuming
that
all
values above p2 were zero ; the transforms consistently indicated negligible values for cl3 and I+ The values of the local arrangement coefficients calculated in this where The &ha = (TAB - ri)/ri. 17 = f~lf~ and distance rbA is the distance between two A atoms with
manner are listed in Table 2.
one at the origin and the other in the ith shell, and ri is
synthesizing
the average distance to the ith shell determined the lattice parameter. The values
of ui and pi were derived
from
from
the
measurements of the diffuse intensity by means of a Fourier transform.(22) The transform may be written approximately F(r) =
arbitrary
scattering
(- g
(r-
with the observed
coefficients
damping
factor
in this way
diffuse intensity
A is
in Fig.
is quite good and was consistently
is estimated
It is difficult to calculate but the precision
to be ho.005
&O.Ol for u4 and a6 and *0.002
of the
for cc1 and cc2,
for B1 and /12.
Lattice parameters were also determined from spectrometer data during the course of the investiga-
ri)2)
K(x) = I/[m,r~(f,
calculated
the overall error accurately,
cipi;~2
The
by errors of the latter type.
curve
good for each set of data.
&$&-. exp (- g(r - riJ2)
(6).
values of r. On the other hand, the intensity curves are
5 ; the agreement
m
2 and equation
slowly varying errors have an effect only at very small
compared
exp ( -bb2x2) sin 2rrrx dx
(r - ri) t-Z--i=, b3
where
CX~and & listed in Table
may be made by using the values of
transforms are most affected by errors which oscillate with frequencies between 2nri and 2nri; constant or
typical
s0
exp
the diffuse intensity
very much influenced
as
&IX& S(z)
= ,f
A critical test of the coefficients
tion. -fs)2]
-
1,
b
is
an
to reduce the fluctuations
arising by cutting off the data at x(max) instead of infinity, and yi = ai - pi. A typical transform, evaluated by means of Lipson-Beever strips is shown in Fig. 4. It is obvious that contributions of u and /I to the first shell cannot be separated from the contributions to the second shell. The coefficients for the third shell are negligible, but there appear to be some contributions in the
These
values,
estimated
to
be
accurate
to
f0.003 A, are shown in Fig. 6 and agree reasonably well with other measurements.(l) Body-centered titanium does not exist at room temperature and the value for pure titanium is that obtained by Levinger(23) from extrapolations of similar curves with many alloying elements. The agreement in lattice parameters was taken to be an indication that the samples were not contaminated by hydrogen, oxygen or nitrogen
during
would have parameters.
heat
treatment.
had a significant
These
effect
impurities
on the lattice
760
ACTA
METALLURGICA,
VOL.
9,
1961
FIG. 4. Fourier transform for 0.5 MO, quenched alloy.
140
I
I
I
Cl20 .c5 $00 L t z 00 s =60 t
I
I
I
I
Experimental ---Calculated with coefficients from Fourier tronsform
-
E4020 0
I 1.0
I 0.5
0
I 1.5
I 2.0 X= 20 sin 8 A
I 2.5
I 3.0
I 3.5
FIG. 5. Local arrangement diffuse scattering, 0.5 MO, quenched alloy.
I
I 3.26
I
I
I
L
I -
Hansen et al 0
‘\’
I
this work
‘1
3.26
\
b ; ‘, E 0 $
3.24
J\ \
3.22
S 3
.\
3.20
\
\ 0
\ \
3.16
Atomic
fraction
MO
FIG. 6. Lattice parameters.
I
DUPOUY 4. DISCUSSION
AND
OF
AVERBACH:
thus
show
a strong
SOLID
‘761
SOLUTIONS
for a random f.c.c. solution,
RESULTS
All of the alloys exhibit sizeable negative values of a1 and
Ti-Mo
preference
for
unlike
and a similar calculation
for b.c.c. solutions was used to compute values of & from the values given in Table 1. The variation of
nearest neighbors. Values for ua and a, are positive, but a6 is again negative and quite large in magnitude. This pattern of short range order indicates a strong
& with composition was correctly predicted, but all of the values were too small and the correlation
tendency
range order in these solutions. The relationship between
support
to form
an ordered
of this is indicated
solution,
and further
in that the slowly cooled
solutions exhibited more intense short range order than the quenched alloys. However, no evidence of a superlattice was found in the slowly cooled samples. The average number of molybdenum about a titanium
atom is listed for each composition
in Table 3. The intensity the 75 at. % molybdenum
~_
fraction MO
-_--
Number
I i
of molybdenum neighbors quenched
/-:ydom
0.2 0.3 0.4 o.;, 0.5 _~_____ __~.
of the short range order in alloy is indicated in that
3. Average number of molybdenum neighbors about a titanium atom
TABLE
Atom
nearest neighbors
;:;
~
4:o 6.0
t-
31: 7.5
relationship
and the individual
between
the
average
inter-
interatomic
distances
which may
be written as follows: r1 = mA2rLU1 + 2mAm,rA,l
uniquely
mAmBul [2r~~1 -
calculate
from
these
@aA1 +
the two
procedure
lattice
+ m,,2rBB1 (10)
.r~~l)l
in the case of b.c.c. solutions.
to
approximate The
It:;
is assumed
was not found.
It is also evident that the size effect coefficients and the static displacements occurrence
for these solutions
of negative
values
of &
are large. indicates
clearly, denum
using equation (8), that the heavier molybatoms have the smaller center-to-center This was expected from the distance in solution. nearest neighbor distances in the pure materials. However, the values for pa were consistently positive and quite sizeable, pairs
This requires that MO-MO second
have
a separation
larger than
that
deduced from the lattice parameter. This would only seem reasonable if a second neighbor MO-MO pair has a high probability of including a titanium atom in between,
inter-
individual
It is
distances
relationships
and
an
was used.
parameters
exhibit
a large
negative
that the MO-MO and Ti-Ti
distances
in
the solution are the same as in the pure materials, the
it is surprising that a superlattice
neighbor
individual
deviation from Vegard’s law and this suggests that Ti-Mo distances are smaller than the average. If it
an average of 7.5 out of a possible 8 nearest neighbors about a titanium alloy are molybdenum alloys, and
The
additional
impossible
______ slowly cooled __~_~
the
atomic distance deduced from the lattice parameter or
where rl = al/3/2
nearest
of the high degree of short
atomic distances and the nearest neighbor size effect coefficient #I1 are given in equation (8). There is an
f
3.1 1
failed because
nearest
1.9
~
probably
calculated
values
of & are of the correct
rich alloys.
If only the Ti-Ti
as indicated reasonable
tions of molybdenum. to retain
their
If the MO-MO pairs are assumed
original
the resultant
Ti-Ti
distances
are reasonable at high concentrations of titanium unrealistic in molybdenum-rich alloys.
and
An approximate set of distances was obtained by using the reasonable values of Ti-Ti and MO-MO in Fig. 7 and the resultant Several
Borie has derived such a relationship(20)
values
distances are shown in Fig. 7(b) ; the Ti-Ti
Thus, nearest
values of c.
are
of molybdenum
since they are little affected by the values chosen for Ti-Ti, but the values are implausible in dilute solu-
with the high
the presence of atoms of different size, it should be possible to calculate the values of p1 from the observed
to
varies
in Fig. 7(a) ; the MO-MO distances at the high concentrations
and this is quite consistent
inverse is true for the titanium atoms. Since both the static displacements and the size effect coefficients arise from the same basic effect, i.e.
pairs are assumed
retain their original size, the MO-MO distance
degree of short range order observed.
neighbor MO-MO pairs are closer together and second neighbor MO-MO pairs are farther apart than the the corresponding average interatomic spacings;
sign but
considerably larger in absolute value in titanium-rich alloys and considerably smaller in the molybdenum-
features
independent calculation.
curve is shown
of these interatomic
in Fig. 8.
distances
are
of the detailed assumptions made in the In the region of 20 at. “/g molybdenum
the Ti-Ti distance must be smaller than in pure titanium and in the 75 % molybdenum region the MO-MO distance must be smaller than in pure molybdenum . One of the striking features of the MO-MO distances is the apparent decrease below the pure metal value, even though the molybdenum atom is the smaller to begin with. There are insufficient data to
ACTA
762
METALLURGICA,
VOL.
9,
1961 5. CONCLUSIONS
This
work
indicates
that
titanium-molybdenum
b.c.c. solid solutions exhibit a very strong short range order which
extends
for relatively
large correlation
distances in the lattice. The static displacements and size effect coefficients show that the atoms are of very much different denum
atoms,
size in solution,
and the molyb-
which are smaller than the titanium
atoms, become even smaller in the vicinity of 75 at. % molybdenum. The Debye temperature also exhibits a
2.7 -
maximum in the vicinity of MosTi. There was no evidence for a superlattice or compound in any of these
alloys
although
the
short
range
order
did
increase on slow cooling. ACKNOWLEDGMENTS
The authors would like to acknowledge the assistance of the Office of Naval Research
and the U.S. Atomic
Energy Commission in providing
the financial support
for this research. They are also grateful Abrahamson at the Watertown Arsenal assistance
in alloy preparation
of New York many
2.7 0
I 0.2
I I 0.4 0.6 Atomic fraction MO
I 0.8
I
provide a unique explanation but it would appear that the molybdenum atom would have to lose one or more electrons in forming these solutions. be considered
toward compound
evidence formation
for a strong
of the materials.
and to Dr. Margolin
for his help in providing We
are also indebted
to
Professor M. B. Bever, Dr. Roy Kaplow and Dr. Giinter Nagorsen of M.I.T. for valuable discussions and other assistance.
FIG. 7. Nearest neighbor distances (a) assuming Ti-Ti constant (b) assuming MO-MO constant,.
also
University
to Dr. for his
This could tendency
at 75 at. % molybdenum.
REFERENCES 1. M. HANSEN. E. L. KAMEN. H. 11. KESSLER and D. J. MCPRIRSCJN;Trans. Amer.’ Inst. Min. (Metall.) Engrs 191, 881 (1951). 2. F. H. HERBSTEINand B. L. AVERBACH,Actcc Met. 4, 414 (1956). 3. K. HUANG, PTOC. Roy. Sot. A190, 102 (1947). 4. R. W. JAMES, The Crystalline State Vol. 2. Bell, London (1950). 5. L. KAUFMAN, Acta Met. 7, 575 (1959).
FIG. 8. Probable nearest neighbor distances. b-
2.7
2.6 Atomic
fraction
MO
DUPOUY
AND
AVERBACH:
6. A. Euczax in Wien-Ha,rme’ H~~buch der Expe~~e~t~~phyeik Bd. 6, Teil 1. Springer, Berlin (1929). 7. M. BLACKMAN in Handbuch der PhysitC Bd. 7, Teil 1, S. 325. Springer, Berlin (1955). 8. B. E. WARREN and B. L. AVERBACH, Modern Research Techniquues in Physical Metallurgy p, 95. American Society for Metals, Cleveland (1953). 9. J. BERQHUIS, I. M. HAANPPEL, M. POTTERS, B. C. LOOPSTRA, C. H. MCGILLAVRY and A. L. VEENENDAAL, Acta Cr.@., Camb. 8, 478 (1955). 10. D. T. KEATINO and G. H. VINEYARD, A& Cry&., Camb. 9, 895 (1956). 11. A. FREEMAN, Acta Cry&, Camb. 12, 261 (1959); 12, 929 (1959). 12. R. MCWEENY, Acta Cry&, Camb. 4, 513 (1961). 13. L. BEWILOQUA, Phys. 2. 32, 740 (1931). 14. C. S. BARRETT, Structure of Metals. McGraw-Hill, New York (1952).
Ti-Mo
SOLID
SOLUTIONS
763
15. B. E. WARREN, Acta Csyst., Camb. 6, 803 (1953). 16. F. H. HERBSTEIN and B. L. AVERBACH. Acta Cwst.. Camb. ” 8, 843 (1955). 17. R. E. WATSON, Tech. Rep. No. 12, Solid State ano! Mole-
cular Theory Group, M.I.T. (1959). 18. R. W. JAMES and G. W. BRINDLEY, 2. Kristallogr.
19. 20. 21.
22. 23.
78,
470 (1931). C. H. DAUBEN and D. H. TEMPLETON, Acta Cry&, Camb. 8, 841 (1955). B. BORIE, Acta Cry&., Camb. 10, 89 (1957). C. R. HOVSKA and B. L. AYERBACH, J. Appl. Phye. 80, 1532 (1959). P. A. FLINN, B. L. AVERBACN and P. S. RUDMAN, dcta Cry& Camb. 7, 153 (1954). B. W. LEVINQER, Trans. Amer. Inst. Min. (Metall.) Engrs 197, 195 (1953).
ARRANGEMENTS
IN TITANIUM-MOLYBDENUM
J. M. DUPOUY
SOLID
SOLUTIONS*
and B. L. AVERBACH?
The short range order and size effect coefficients as well as the thermal and static atomic displacements h&ve been measured in b.c.c. solid solutions of titanium-molybdenum using X-ray diffraction techniques. These solutions exhibit a strong preference for unlike near-neighbors even though a superlattice was not found. The size effect coefficients for the first shell of atoms were negative, indicating that the molybCenter-to-center distances bet,ween denum atoms were smaller than the titanium atoms in solution. the different pairs of nearest neighbor atoms were calculated from the size effect coefficients and the Ti-Ti and MO-MO distances tended to approach the average distance in the solution lattice parameters. At 75 per cent molybdenum the NO-MO distance at compositions between 20 and 50 at.% molybdenum. was smaller than in pure molybdenum and this was taken to indicate an electron exchange in the sohltion. ARRANGEMENT
D’ATOMES
DANS
LES
SOLUTIONS
SOLIDES
DE
TITANE
MOLYBDENE
L’ordre zt courte distance et des coefficients d’effet de dimension einsi que les dbplacements atomiques thermiques et statiques ont 6tB mesur& dans des solutions solides de titane molybdbne de reseau cubique cent& par diffraction de rayons X. Les solutions montrent une grande pr&f&ence pour leurs voisins non semblables, quoiqu’une surstructure n’a pas pu &re trouv8e. Les coefficients d’effet de dimension pour les atomes de la premihre orbite Btaient &g&ifs, co qui indique que les atomes de molybd8ne Btaient plus petits que les atomes de titan0 en solution. Les distances d’un centre iLl’autre entre deux paires diffbrentes d’atomes les plus rapprochbs ant BtB c&x&es d’aprbs le coefficient d’effet ou dimension et d’ap&s les param&res du rkseau. Les distances Ti-Ti et MO-MO tendent iLs’approcher de la distance moyenne dans la solution pour des teneurs entre 20 et 50% atomiques de molybdhne. Pour une teneur de 75% de molybdBne la distance Mo-Mo Qtait plus petite que celle dans le molybdene pur, ce qui indiquerait un &change d’6lectrons dans la solution. ATOMANORDNUNGEN
IN
FESTEN
LiiSUNGEN
AUS
TITAN
UND
MOLYBDliN
RGntgenographisch wurden die Nahordnungsund GrBssaneffekt-Koeffizienten und die therm&hen und statistischen Atomverschiebungen in k.r.z. festen Liisungen aus Titan und Molybdiin bestinunt. Diese Liisungen zeigen ein starkes Vorherrschen van ungleichen niichsten Nachbarn, obwohl keine tiberstruktur gefunden wurde. Die GrGsseneffekt-Koeffizienten der Atome erster Schale waren negativ; des weist darauf hin, dass die Molybdiinatome in der Liisung kleiner sind als die Titanatome. Die Mittelpunktsabstiinde zwischen verschiedenen Paaren niichstbenachbarter Atome wurden &us den Griisseneffekt-Koeffizienten und den Gitterparametern berechnet. Ti-Ti und M+Mo Abstiinde nlihern sich zwischen 20 und 50 At% Molybdiin dem durchschnittlichen Atomabstand in der LGsung an. Bei 75 At% MolybdBn ist der Mo-Mo-Abstand kleiner 81s in reinen Molybdiin, dies wurde alsAnzeichen eines Elektronenaustauschs in der LGsung gedeutet.
1. INTRODUCTION
The
arrangement
of
atoms
averaged in
a
binary
solid
of
the
individual
from the average determined
interatomic
by
distances
by the cell dimensions
is
expressed
in terms of the size effect coefficients for each shell, pi. The spectrum of elastic waves associated with the thermal motion of the atoms may be characterized
by the square of the dynamic
METALLURGICA,
VOL.
displacement
9, AUGUST
1961
position
in
the
lattice,
lattice, Q,
averaged
over
every
position
in the
may also be measured.
The short range order and size effect coefficients are determined from the diffuse scattering and thus provide
averages over small correlation distances in the lattice. In practice it is difficult to obtain information for distances greater than the sixth nearest neighbor, and in polycrystals data are frequently restricted to the first two atomic shells. On the other hand, the thermal and static displacements are determined from the intensities of the diffraction lines and are thus averaged over correlation distances
* Received December 14, 1960; revised February 8, 1961. t Department of Metallurgy, Massachusetts Institute of Technology, Cambridge, Massachusetts. This paper is based on the Sc.D. dissertation of J. Dupouy at M.I.T. ACTA
and
from the average lattice point and the square of this displacement
the short range order coefficients, ui, which indicate the preference for unlike or like neighbors in a particular shell. If the atoms are of different size, the deviation
time
q, or the Debye temperature, 0. If the atoms differ in size there is also a static displacement of each atom
solution may be described in terms of paramet,ers which can be measured by means of X-ray diffraction The average composition of the ith shells techniques. of atoms about an atom at the origin is described
over
which are large enough to provide coherent diffra.ction effects. These longer correlation distances are of the 755
ACTA
756
METALLURGICA,
order of 100 A or greater.
It is interesting
that a difference
in atomic
size produces
both
large
small
and
correlation
allows an independent evaluation although the method of averaging case. Titanium-molybdenum this study.
distances.
This
ofatomic
size effects, is different in each
solutions
The phase diagram(l)
to note effects at
were chosen
for
is shown in Fig. 1.
VOL.
9,
1961
was prepared at the Watertown compositions molybdenum. over
Arsenal.
The actual
were 19.5, 29.5, 40.5, 48.6 and 75.4 at. % Each button was remelted and turned
several
times
in order
to eliminate
dendritic
structure and the final ingot was a cube approximately 1.5 in. on edge. Attempts to use vacuum-sintered scattering
filings for diffuse
samples were unsuccessful.
Long sintering
There is a large b.c.c. phase field with no indication of There is a large ordered phases or compounds.
times were required in order to sharpen the diffracti m lines and to obtain sufficient mechanical strength;
difference in the scattering
the resulting specimens were invariably
contaminated
with
to
the combination atom,
power of these atoms, and
is fairly unique in that the heavier
molybdenum,
has a smaller
distance than the lighter titanium
nearest neighbor
atom.
This should
result in a negative value for the nearest neighbor size effect coefficient, before.
/?i, and this had never been observed
In addition,
the only
which had been investigated
other b.c.c.
previously
solutions
were lithium-
sufficient
hexagonal ingot
phase.
along
helium
in Vycor
1100°C.
at a logarithmic
are described in the following sections. attention is focussed on an improved method reduction
and the results are discussed 2. EXPERIMENTAL
only
the
for 24 hr at from
and the other was cooled
rate from 1100 to 350°C over a period
superficially
These samples were
contaminated; polishing
the surfaces followed
were
by electro-
polishing in a solution of 5 per cent perchloric in glacial acetic acid. These samples all showed marked preferred
METHOD
the
orientation,
but
subsequent
experiments
showed that the diffuse scattering was not affected by
pure molybdenum
arc-melted
containing
and 50 at. ‘A molybdenum University
temperature
cleaned by mechanical
in the final
directions;
and annealed
of data
The alloys were prepared from iodide titanium Ingots
tubing
of 20 days and then quenched.
(a) Materials
phere.
perpendicular
alloys Special
section.
form
One set of samples was water-quenched
a relatively
on five titanium-molybdenum
nitrogen
Solid samples were cut from each
three
the annealing
sma.11size effect.
and
specimens were packed in foils of a titanium-14 wt. % molybdenum, sealed under a partial pressure of
magnesium solid solutions,(2) and this system exhibited Measurements
oxygen
and
under an argon atmos-
approximately
20, 30, 40
were melted at New York
and an alloy with 75 at. % molybdenum
this amount
of texture.
Samples with random orientation measurements filings.
These
were obtained filings
were
for the Bragg line
by using loosely packed sealed
in Vycor
helium and annealed for 1 hr at 1050°C. time
was long
diffraction
enough
to
lines sufficiently
sharpen
under
The annealing the
high
angle
so that they could be well
resolved but was short enough to avoid contamination. The filings were then mixed with Duco cement and acetone to form a flat diffraction (b) X-Ray
sample.
measurements
The diffuse scattering measurements
were made with
monochromatic
CuK, radiation diffracted from a bent
silicon
cut
crystal
to
the
(111)
orientation.
The
detecting assembly consisted of a proportional counter and a pulse height analyser arranged to eliminate the one-third
wavelength
of the white radiation
(the one-
half component was eliminated by the silicon crystal), the cosmic background and the fluorescence radiation from titanium. Readings were recorded continuously
0
Ti
0.5 Alomic fraction
P MO
FIG. 1. Titanium-molybdenum phase diagram.
1.0 f40
on a horizontal spectrometer with the counter rotating at 0.25” in 2 8/min and measurements were made from 10 to 132’ in 2 8. Flat samples were used and the geometry focussing
of the system condition.
satisfied
the usual
double
DUPOUY
AVERBACH:
AND
The specimens were rotated around the axis normal to the reflecting surface to minimize the effects of preferred orientation and the coarse grain size. The diffuse intensity was found to be insensitive to the preferred orientation. Fig. 2 shows the scattering recorded from samples of the 30 % molybdenum with the greatest difference in texture. One sample was so highly textured that the (200), (220) and (222) lines were almost absent, yet the diffuse intensities for both samples were quite similar. In practice the diffuse intensity was recorded from each of three samples cut at different angles from the ingot and the intensities were averaged. In the case of the 50 ‘A alloy only two samples were available ; only one was availabte for the 75 % alloy. The intensities of the diffraction lines were measured with MoK, radiation and a scintillation counter. A holder filled with a mixture of powder and cement was pressed by a spring against the wall of a small chamber which could be filled with liquid nitrogen. The assembly was enclosed in an evacuated container which had a Mylar window glued with epoxy resin. IIeating tape was wrapped around the window to prevent the condensation of moisture. The temperature was measured by a thermocouple embedded in the powder. The diffraction lines were recorded and the areas under the peaks measured with a planimeter. The first four diffraction lines were ignored because of extinction effects, and the remaining eight to twelve lines were used for the determination of thermal and static displacements.
Ti-Mo
SOLID
SOLUTIONS
757
3. REDUCTION
OF DATA
(a) Thermal and static displacements
The integrated intensity of a diffraction line for a binary alloy is given by I = ANF2m(LP) exp [ -2( B, + B,) sin2 e/A21 (1) where A is a constant, Ii the number of atoms irradiated, m the multiplicity, F the structure factor, _l.Z the Lorentz-polarization factor (1 + cos2 2i3)/sin20 00s 8, B, the Debye-Waller factor for thermal displacements and B, the static displacement factor.(3) The thermal factor may be written in terms of the Debye temperature 0 as follows: 3,
= mk-p [tp(Y) 4 f//4:1
=
where m is the average mass of the atom in solution, h is Planck’s constant, k the Boltzmann constant, T the absolute temperature, y = O/T and v(y) is the Debye integral.t4) Plots of In I versus sin2 S/;l” were straight lines, indicating that the powder samples were quite random. Intensities were measured at 108 and at 295°K and values of 3, and B, were determined for each alloy. The mean square atomic displacements may be calculated from the relat,ionships : B, = 4?+G7 and
80
3, = 4n%hs2 .
\,
60
Ti -30 at~~~~percentMO Specimen 33 ---Specimen 31 i
40 0
-I I
0.5
I
1.0
(2)
I
I
1.5
2.0
I 2.5
I
3.0
I 3.5
I
x.. 20 sin8 A
Pra. 2. Comparison of scattering from two specimens with preferred orientation.
W4
758
ACTA
METALLURGICA,
VOL’.
9,
1961
hydrogen
were taken
incoherent
scattering of hydrogen was calculated from
the tables coefficients
The contribution
average 200-
I
’
/-*
0.4 -
2
I
I
I
I
I
I
-
02
-1 I
x (1 x\
I
I
form
of
the
pattern
to have the following
I
I,
*.
I
I,
tion -;‘. 1.0
are
listed in Table 1 and the variations of Debye temperature and B, are shown in Fig. 3. It is interesting to note that the thermal
and static
of the same magnitude
for each composition. Debye
displacements
temperature
but the present data extrapolate
close
to
300”K,
the
value
are There
of b.c.c.
estimated
in t$he Debye tempera-
on an absolute
scale@)
by
comparison with the scattering from lucite, (C,H@,) ; an intensity measurement at 130’ in 28 was used for standardization. Values for the coherent
and incoherent scattering factors for carbon were taken from Berghuis et aZ.(9) and Keating’lO), respecScattering factors for oxygen were taken from
Freema,n(ll). TALBE
Values
for the coherent
scattering
1. Thermal and static displacements Ti-Mo solutions
in
0.68 0.57 0.47 0.34 0.22
0.46 0.31 0.24 0.18 0.10
and
Averbach for b.c.c. lattices. Values of B, were obtained from the measurements of line intensities 1);
the scattering
for
both
elements
Templeton( temperature A
scattering
for titanium
were
were
taken
from
Dauben
and
It was thus possible to calculate the diffuse scattering from equation (4).
similar
arises from
factors
and for molybdenum from The dispersion corrections
contribution the static
to
the
atomic
diffuse
scattering
displacements.
This
sin2 0/n2]).
(5)
has the form :(20,21)
x
The modulating W(x)
(1
-
exp [-2B,
function
and was calculated
H(z)
is similar in form to
here for a b.c.c.
of
observed
for f.c.c. powder patterns.@n
B, were taken from the diffraction and the static diffuse intensity
powder
0.093 0.085 0.077 0.065 0.052
0.075 0.063 0.055 0.048 0.036
The values of
line data (Table 2)
contribution
was thus
ralcula,ted. The diffuse scattering in absolute units was corrected for polarization and for the contributions indicated above,
and the remaining
diffuse
scattering
which
describes the local atomic arrangement may be written as follows :(s)
I = mAmB(.fA -.fd2
1+
( co9 27rrix -
I-_-
300 314 335 385 449
func-
by Herbstein
pattern. The modulations were small and the function U(Z) was taken as unity. A similar situation was
(b) Short range order and size coeficients were placed
(4)
and fi the scattering
calculated
by
ture at 75 at. % molybdenum.
The intensities
sin2 ~9/1~])
to a value
Kaufman(5) ; the Debye temperature for pure molybdenum was taken as 380”K.‘69’) It is evident that there is a significant maximum
has been
taken from Watson’l’) James and Brindley’ls).
temperature and static displacement fw!tor.
for the
which
(Table
fraction MO
Values for the thermal and static displacements
data
exp [ -2B,
where mi is the atomic fraction
0.5
FIG. 3. Debye
0.2 0.3 0.4 0.5 0.75
The
for a powder
factor for the ith atom, and W(x) is a modulating
xi,
Atomic
tively.
with
to be the weighted
constituent.
has been shown by Warreno5)
\
Lx._
0
quite
each
assumed
x
1’ I
0.1 -’ I I
are no
of the Compton modified scattering
diffuse scattering
,’
0.3
titanium,
for
the
absorption
from the results of Bewiloguao3),
contribution
temperature
and
form :
0.5 -
“a
I
McWeenydz),
of Bewilogua(13). The mass were taken from Barrett?).
was calculated the total
from
sin SC&% +
27rr.x
i:=,
sin 27rr.x -2 29wix
(6)
where Ci is the number of atoms in the ith shell, TV = (distance to shell i)/a, a is the lattice parameter, x = 2a sin e/L, 1 is the X-ray wavelength,
and 8 is the
DUPOUY TABLE Specimen condition
Atom
quenched quenched slowly cooled quenched slowly cooled quenched slowly cooled quenched
Bragg angle.
AVERBACH:
AND
Ti-Mo
SOLID
fraction
%3
-0.29 -0.20 -0.27 -0.19 -0.29 -0.24
0.4
!
0.5 0.75
ui is
neighborhood transforms
where pi is the probability
p,lmB
(7)
of finding a B atom in the
ith shell about an ,4 atom at the origin.
The size effect
is given by
similar.
t%
-0.06 -0.04 -0.15 -0.14 -0.21 -0.12 -0.24 -0.12
0.08 0.07 0.10 0.06 0.12 0.05 0.11 0.07
0.02 0.04 0.04 0.02 0.03 0.03 0.04 0.07
i
The short range order parameter ui = 1 -
759
2. Short range order coefficients mi and size coefficients, /li
defined
parameter
SOLUTIONS
-0.079 -0.071 -0.073 -0.060 -0.063 -0.046 -0.056 -0.052
of the fourth
0.013 0.033 0.032 0.025 0.033 0.030 0.032 0.057
-
and sixth. shells.
for all of the alloys
The
were qualitatively
It was assumed therefore that the region in
the transform
from r = 0.4 to r = 1.3 was associated
only with the first two shells. Nineteen values of r were taken in this interval and values of yi, y2, /3i and /12 were obtained
by a least squares
fitting.
This
procedure
gave values of ui, tc2, ,$ and p2 which were
physically
plausible.
Values for CQand c+, were then
estimated
from
transform,
the
assuming
that
all
values above p2 were zero ; the transforms consistently indicated negligible values for cl3 and I+ The values of the local arrangement coefficients calculated in this where The &ha = (TAB - ri)/ri. 17 = f~lf~ and distance rbA is the distance between two A atoms with
manner are listed in Table 2.
one at the origin and the other in the ith shell, and ri is
synthesizing
the average distance to the ith shell determined the lattice parameter. The values
of ui and pi were derived
from
from
the
measurements of the diffuse intensity by means of a Fourier transform.(22) The transform may be written approximately F(r) =
arbitrary
scattering
(- g
(r-
with the observed
coefficients
damping
factor
in this way
diffuse intensity
A is
in Fig.
is quite good and was consistently
is estimated
It is difficult to calculate but the precision
to be ho.005
&O.Ol for u4 and a6 and *0.002
of the
for cc1 and cc2,
for B1 and /12.
Lattice parameters were also determined from spectrometer data during the course of the investiga-
ri)2)
K(x) = I/[m,r~(f,
calculated
the overall error accurately,
cipi;~2
The
by errors of the latter type.
curve
good for each set of data.
&$&-. exp (- g(r - riJ2)
(6).
values of r. On the other hand, the intensity curves are
5 ; the agreement
m
2 and equation
slowly varying errors have an effect only at very small
compared
exp ( -bb2x2) sin 2rrrx dx
(r - ri) t-Z--i=, b3
where
CX~and & listed in Table
may be made by using the values of
transforms are most affected by errors which oscillate with frequencies between 2nri and 2nri; constant or
typical
s0
exp
the diffuse intensity
very much influenced
as
&IX& S(z)
= ,f
A critical test of the coefficients
tion. -fs)2]
-
1,
b
is
an
to reduce the fluctuations
arising by cutting off the data at x(max) instead of infinity, and yi = ai - pi. A typical transform, evaluated by means of Lipson-Beever strips is shown in Fig. 4. It is obvious that contributions of u and /I to the first shell cannot be separated from the contributions to the second shell. The coefficients for the third shell are negligible, but there appear to be some contributions in the
These
values,
estimated
to
be
accurate
to
f0.003 A, are shown in Fig. 6 and agree reasonably well with other measurements.(l) Body-centered titanium does not exist at room temperature and the value for pure titanium is that obtained by Levinger(23) from extrapolations of similar curves with many alloying elements. The agreement in lattice parameters was taken to be an indication that the samples were not contaminated by hydrogen, oxygen or nitrogen
during
would have parameters.
heat
treatment.
had a significant
These
effect
impurities
on the lattice
760
ACTA
METALLURGICA,
VOL.
9,
1961
FIG. 4. Fourier transform for 0.5 MO, quenched alloy.
140
I
I
I
Cl20 .c5 $00 L t z 00 s =60 t
I
I
I
I
Experimental ---Calculated with coefficients from Fourier tronsform
-
E4020 0
I 1.0
I 0.5
0
I 1.5
I 2.0 X= 20 sin 8 A
I 2.5
I 3.0
I 3.5
FIG. 5. Local arrangement diffuse scattering, 0.5 MO, quenched alloy.
I
I 3.26
I
I
I
L
I -
Hansen et al 0
‘\’
I
this work
‘1
3.26
\
b ; ‘, E 0 $
3.24
J\ \
3.22
S 3
.\
3.20
\
\ 0
\ \
3.16
Atomic
fraction
MO
FIG. 6. Lattice parameters.
I
DUPOUY 4. DISCUSSION
AND
OF
AVERBACH:
thus
show
a strong
SOLID
‘761
SOLUTIONS
for a random f.c.c. solution,
RESULTS
All of the alloys exhibit sizeable negative values of a1 and
Ti-Mo
preference
for
unlike
and a similar calculation
for b.c.c. solutions was used to compute values of & from the values given in Table 1. The variation of
nearest neighbors. Values for ua and a, are positive, but a6 is again negative and quite large in magnitude. This pattern of short range order indicates a strong
& with composition was correctly predicted, but all of the values were too small and the correlation
tendency
range order in these solutions. The relationship between
support
to form
an ordered
of this is indicated
solution,
and further
in that the slowly cooled
solutions exhibited more intense short range order than the quenched alloys. However, no evidence of a superlattice was found in the slowly cooled samples. The average number of molybdenum about a titanium
atom is listed for each composition
in Table 3. The intensity the 75 at. % molybdenum
~_
fraction MO
-_--
Number
I i
of molybdenum neighbors quenched
/-:ydom
0.2 0.3 0.4 o.;, 0.5 _~_____ __~.
of the short range order in alloy is indicated in that
3. Average number of molybdenum neighbors about a titanium atom
TABLE
Atom
nearest neighbors
;:;
~
4:o 6.0
t-
31: 7.5
relationship
and the individual
between
the
average
inter-
interatomic
distances
which may
be written as follows: r1 = mA2rLU1 + 2mAm,rA,l
uniquely
mAmBul [2r~~1 -
calculate
from
these
@aA1 +
the two
procedure
lattice
+ m,,2rBB1 (10)
.r~~l)l
in the case of b.c.c. solutions.
to
approximate The
It:;
is assumed
was not found.
It is also evident that the size effect coefficients and the static displacements occurrence
for these solutions
of negative
values
of &
are large. indicates
clearly, denum
using equation (8), that the heavier molybatoms have the smaller center-to-center This was expected from the distance in solution. nearest neighbor distances in the pure materials. However, the values for pa were consistently positive and quite sizeable, pairs
This requires that MO-MO second
have
a separation
larger than
that
deduced from the lattice parameter. This would only seem reasonable if a second neighbor MO-MO pair has a high probability of including a titanium atom in between,
inter-
individual
It is
distances
relationships
and
an
was used.
parameters
exhibit
a large
negative
that the MO-MO and Ti-Ti
distances
in
the solution are the same as in the pure materials, the
it is surprising that a superlattice
neighbor
individual
deviation from Vegard’s law and this suggests that Ti-Mo distances are smaller than the average. If it
an average of 7.5 out of a possible 8 nearest neighbors about a titanium alloy are molybdenum alloys, and
The
additional
impossible
______ slowly cooled __~_~
the
atomic distance deduced from the lattice parameter or
where rl = al/3/2
nearest
of the high degree of short
atomic distances and the nearest neighbor size effect coefficient #I1 are given in equation (8). There is an
f
3.1 1
failed because
nearest
1.9
~
probably
calculated
values
of & are of the correct
rich alloys.
If only the Ti-Ti
as indicated reasonable
tions of molybdenum. to retain
their
If the MO-MO pairs are assumed
original
the resultant
Ti-Ti
distances
are reasonable at high concentrations of titanium unrealistic in molybdenum-rich alloys.
and
An approximate set of distances was obtained by using the reasonable values of Ti-Ti and MO-MO in Fig. 7 and the resultant Several
Borie has derived such a relationship(20)
values
distances are shown in Fig. 7(b) ; the Ti-Ti
Thus, nearest
values of c.
are
of molybdenum
since they are little affected by the values chosen for Ti-Ti, but the values are implausible in dilute solu-
with the high
the presence of atoms of different size, it should be possible to calculate the values of p1 from the observed
to
varies
in Fig. 7(a) ; the MO-MO distances at the high concentrations
and this is quite consistent
inverse is true for the titanium atoms. Since both the static displacements and the size effect coefficients arise from the same basic effect, i.e.
pairs are assumed
retain their original size, the MO-MO distance
degree of short range order observed.
neighbor MO-MO pairs are closer together and second neighbor MO-MO pairs are farther apart than the the corresponding average interatomic spacings;
sign but
considerably larger in absolute value in titanium-rich alloys and considerably smaller in the molybdenum-
features
independent calculation.
curve is shown
of these interatomic
in Fig. 8.
distances
are
of the detailed assumptions made in the In the region of 20 at. “/g molybdenum
the Ti-Ti distance must be smaller than in pure titanium and in the 75 % molybdenum region the MO-MO distance must be smaller than in pure molybdenum . One of the striking features of the MO-MO distances is the apparent decrease below the pure metal value, even though the molybdenum atom is the smaller to begin with. There are insufficient data to
ACTA
762
METALLURGICA,
VOL.
9,
1961 5. CONCLUSIONS
This
work
indicates
that
titanium-molybdenum
b.c.c. solid solutions exhibit a very strong short range order which
extends
for relatively
large correlation
distances in the lattice. The static displacements and size effect coefficients show that the atoms are of very much different denum
atoms,
size in solution,
and the molyb-
which are smaller than the titanium
atoms, become even smaller in the vicinity of 75 at. % molybdenum. The Debye temperature also exhibits a
2.7 -
maximum in the vicinity of MosTi. There was no evidence for a superlattice or compound in any of these
alloys
although
the
short
range
order
did
increase on slow cooling. ACKNOWLEDGMENTS
The authors would like to acknowledge the assistance of the Office of Naval Research
and the U.S. Atomic
Energy Commission in providing
the financial support
for this research. They are also grateful Abrahamson at the Watertown Arsenal assistance
in alloy preparation
of New York many
2.7 0
I 0.2
I I 0.4 0.6 Atomic fraction MO
I 0.8
I
provide a unique explanation but it would appear that the molybdenum atom would have to lose one or more electrons in forming these solutions. be considered
toward compound
evidence formation
for a strong
of the materials.
and to Dr. Margolin
for his help in providing We
are also indebted
to
Professor M. B. Bever, Dr. Roy Kaplow and Dr. Giinter Nagorsen of M.I.T. for valuable discussions and other assistance.
FIG. 7. Nearest neighbor distances (a) assuming Ti-Ti constant (b) assuming MO-MO constant,.
also
University
to Dr. for his
This could tendency
at 75 at. % molybdenum.
REFERENCES 1. M. HANSEN. E. L. KAMEN. H. 11. KESSLER and D. J. MCPRIRSCJN;Trans. Amer.’ Inst. Min. (Metall.) Engrs 191, 881 (1951). 2. F. H. HERBSTEINand B. L. AVERBACH,Actcc Met. 4, 414 (1956). 3. K. HUANG, PTOC. Roy. Sot. A190, 102 (1947). 4. R. W. JAMES, The Crystalline State Vol. 2. Bell, London (1950). 5. L. KAUFMAN, Acta Met. 7, 575 (1959).
FIG. 8. Probable nearest neighbor distances. b-
2.7
2.6 Atomic
fraction
MO
DUPOUY
AND
AVERBACH:
6. A. Euczax in Wien-Ha,rme’ H~~buch der Expe~~e~t~~phyeik Bd. 6, Teil 1. Springer, Berlin (1929). 7. M. BLACKMAN in Handbuch der PhysitC Bd. 7, Teil 1, S. 325. Springer, Berlin (1955). 8. B. E. WARREN and B. L. AVERBACH, Modern Research Techniquues in Physical Metallurgy p, 95. American Society for Metals, Cleveland (1953). 9. J. BERQHUIS, I. M. HAANPPEL, M. POTTERS, B. C. LOOPSTRA, C. H. MCGILLAVRY and A. L. VEENENDAAL, Acta Cr.@., Camb. 8, 478 (1955). 10. D. T. KEATINO and G. H. VINEYARD, A& Cry&., Camb. 9, 895 (1956). 11. A. FREEMAN, Acta Cry&, Camb. 12, 261 (1959); 12, 929 (1959). 12. R. MCWEENY, Acta Cry&, Camb. 4, 513 (1961). 13. L. BEWILOQUA, Phys. 2. 32, 740 (1931). 14. C. S. BARRETT, Structure of Metals. McGraw-Hill, New York (1952).
Ti-Mo
SOLID
SOLUTIONS
763
15. B. E. WARREN, Acta Csyst., Camb. 6, 803 (1953). 16. F. H. HERBSTEIN and B. L. AVERBACH. Acta Cwst.. Camb. ” 8, 843 (1955). 17. R. E. WATSON, Tech. Rep. No. 12, Solid State ano! Mole-
cular Theory Group, M.I.T. (1959). 18. R. W. JAMES and G. W. BRINDLEY, 2. Kristallogr.
19. 20. 21.
22. 23.
78,
470 (1931). C. H. DAUBEN and D. H. TEMPLETON, Acta Cry&, Camb. 8, 841 (1955). B. BORIE, Acta Cry&., Camb. 10, 89 (1957). C. R. HOVSKA and B. L. AYERBACH, J. Appl. Phye. 80, 1532 (1959). P. A. FLINN, B. L. AVERBACN and P. S. RUDMAN, dcta Cry& Camb. 7, 153 (1954). B. W. LEVINQER, Trans. Amer. Inst. Min. (Metall.) Engrs 197, 195 (1953).