Article Type : Research Article
Authors : Run Xu, Lim S, Reddy NS, Nam T, Ahn HJ and Kim K
Keywords : Modelling; TiAl; Dentrite; The secondary arm space; analysis; Temperature; Cooling rate; Composition difference; Gibbs free energy
According to the secondary dentrite arm
space L and composition at solid and liquid interface in solidification the
line model of temperature and cooling rate in dendrite has been established.
Meantime the cooling rate and the secondary arm space has been discussed. In
the intersection the cooling rate of solid and liquid ?T is gained. According
to dentrite therefore the secondary dendrite arm space can determine
temperature. According to Y changing from pure X to pure Y ie. The temperature
will change from maximum to minimum at Al composition in materials like TiAl.
The period one of cooling rate is from 40K/s to 15 K/s in speed of 4860mm/hr at
the solidified length to be 150mm. The cooling rate will decrease with
increasing solidified length. For engineering use the speed is better when the
speed is higher like 4,860mm/h when the cooling rate attains from 15K/s to
40K/s with the secondary arm space increasing with the maximum value. When
cooling rate is 4,860mm/hr the biggest one in these three conditions will
happen with 40K/s when it is 10?m. When DS is 2.8J/ (mol·K) the DG changes from
800J to -2000J with the temperature increases same in TiAl.
The change of temperature
in the solid and liquid in solidification transformation can deduce the related
formula. The curve expresses its trend better. From this relation their
secondary dendrite arm space composition will change when the transformation happens.
It is known that the temperature in solidification can solve their
relationship. In this study in terms of these equations the deduction and
analysis is done and the error analysis to them is done. Here the solid and
liquid equation is explored within line and find the simple formula which make
us to calculate the cooling rate rapidly [1,2]. Therefore in this study the
model of temperature and composition has been established to observe the trend
and intrinsic relationship between them. Then the error is checked with
variance to both of constant. TiAl as a promise materials has been searched and
developed for many years. However the cooling rate with compositions is not
much yet, so in this study the equation is established through temperature and composition
according to the phase diagram. It is modelled with cooling rate and
composition difference too in directional solidification test. The detail value
is combined through phase equilibrium line and it is compared with thermal
dynamics. The research scope is from 0 to pure Al here [3]. On the other side
the relationship with cooling rate and energy difference & temperature has
been investigated according to varied speed and ?S respectively for the
application. According to the solidified crystalline and phase diagram the
application will be known. In addition relationship between cooling rate and
energy difference & temperature are drawn for further research in this
study. To calculate the cooling rate is our destination in the end in terms of
the composition in TiAl alloys. Therefore the establishment equation between
temperature and cooing rate in terms of the equilibrium diagram [3-6].
Calculation and Discussion
The
relationship between the secondary dendrtie space and temperature
It is supposed that
T=KL -- (1)
K is constant, L is the
second dendrite arm space.
Then K=T/L
Since T=aCcom+b
[3]--(2)
Substitute (2) into (1)
it has
K= (aCcom+b) L
-- (3)
And supposed that
Ccom =0.06, L=20?m ---
(4)
Because it has
K=44.260 K?m. --- (5)
So T=44.260*L ---- (6)
This is the temperature
equation with L which is the secondary dentrite arm space.
As seen in Figure 1 the relationship between temperature and secondary dendrite space is exhibited according to the equation above. When the secondary dentrite arm space L increases from 10?m to 130?m the temperature will increase from 300? to 5,600? in TiAl. The bigger space expresses that the higher temperature. So the whole dendtire may be expressed in terms of the whole space changing. Because it is supposed that Ccom =0.06 and L=20?m the whole space and temperature will change a certain with the two parameter changing. At the tip of dentrite the temperature attains high value and then temperature will become low. It fits to the principle well (Figure 1).
Figure 1: The relationship between temperature and dentrite second space in TiAl.
(a) v=1860mm/hr; ls=150mm
(b) v=2860mm/hr; ls=150mm
(c) v=3860mm/hr; ls=150mm
(d) v=4860mm/hr; ls=150mm
(e) v=1860mm/hr; ls=350mm
(f) v=2860mm/hr; ls=350mm
(g) v=3860mm/hr; ls=350mm
(h) v=4860mm/hr; ls=350mm
Figure 2: The relationship between cooling rate and dentrite secondary arm space with various solidified speed v at the two solidified length Ls in TiAl.
Figure 3: The linear relationship between Gibbs free energy difference and temperature in TiAl.
As seen in Figure 2(a~h)
when the drawing speed increases from 1860~4860mm/hr with the solidified length
of 150mm and 350 mm the cooling rate will increase from 15K/s, 24K/s, 32K/s
& 40K/s and 7K/s, 10K/s, 13K/s &18K/s at the place of 10?m to 1.5K/s,
2K/s,3K/s &4K/s and 0.5K/s,1K/s, 1.5K/s & 2K/s at the same one of 120?m
in TiAl respectively. At the solidified length to be 350mm it has maximum value
of cooling rate with 40K/s under the condition of 4860mm/hr. Meantime the
minimum cooling rate is 0.5K/s under 1860mm/hr and solidified length of
150mm. It expresses that the cooling
rate decreases with the drawing speed becomes bigger (Figure 2,3).
Gibbs free energy is
defined as below
From Figure 3 DG
decreases with temperature increasing. It decreases with entropy DS maintaining
2.8J/mol/K. This is the result of concentration of liquid and solid in terms of
composition. When DS is 2.8J/ (mol·K) the DG changes from 800J to -2000J with
the temperature increases from 850K to 1900K respectively. G is Gibbs free
energy and DH is enthalpy [3-4]. It is supposed that enthalpy is constant in
this study. It means that when DS becomes big the Gibbs free energy DG will
decrease.
In Ti-Al
H=3.3KJ/mol?
·
At
solid and liquid interface in solidification the line model of temperature and
dentrite secondary arm space in solidified course has been established.
Meantime the cooling rate and secondary arm space L has been discussed. In the
intersection the cooling rate of solid and liquid ?T is gained. Composition
difference has been deduced and analysed according to dentrite therefore the
dentrite secondary arm space can determine temperature. When the secondary arm
space in dentrite is from 10 to 130?m the temperature changes from 300? to
5,600?. Y changes from pure X to pure Y the temperature will change from
maximum to minimum with increasing secondary arm space in materials like TiAl.
·
The
period one of cooling rate is from 25K/s to 145 K/s in speed of 8,860mm/hr. For
engineering use the speed is better when the speed is higher like 7,860mm/h
when the cooling rate attains from 20K/s to 77K/s with the secondary arm space
increasing to minimum value 4860mm/hr. When cooling rate is 8860mm/hr the
biggest one in these three conditions will happen with 145K/s mentioned above.
·
When
DS is 2.8J/ (mol·K) the DG changes from800J to -2000J with the temperature
increases from 850K to 1900K. From diagram the concentration of Al is measured
to be 1.6at% in 46Al at%. The calculation value is thought to be phase forming
element due to the minus. That has been the low concentration with solid
solution in TiAl.
This work was supported
by the Korea of Science and Engineering Fund, under the Specified Base program?96-0300-11-01-3).
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