Borgnakke Sonntag
Fundamentals of Thermodynamics SOLUTION MANUAL CHAPTER 12
8e
Updated June 2013
Borgnakke and Sonntag th
Fundamentals of Thermodynamics 8 Edition Borgnakke and Sonntag CONTENT CHAPTER 12 SUBSECTION
In-Text concept questions Study guide problems Clapeyron equation Property Relations, Maxwell, and those for Enthalpy, internal Energy and Entropy Volume Expansivity and Compressibility Equations of State Generalized Charts Mixtures Helmholtz EOS Review problems
PROB NO.
a-f 1-15 16-33 34-43 44-59 60-81 82-120 121-133 134-138 139-148
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Borgnakke and Sonntag 12.54
Consider the speed of sound as defined in Eq. 12.41. Calculate the speed of sound for liquid water at 20°C, 2.5 MPa, and for water vapor at 200°C, 300 kPa, using the steam tables. From Eq. 12.41:
c2 =
(∂∂ρP)s = -v (∂∂Pv)s 2
Liquid water at 20oC, 2.5 MPa, assume
(∂∂Pv)s ≈ (∆∆Pv)
T
Using saturated liquid at 20oC and compressed liquid at 20oC, 5 MPa, 9995 5-0.0023 MJ (0.001 002+0.000 ) ( ) 2 0.000 9995-0.001 002 kg 2
c2 = -
= 2.002×106 =>
J kg
c = 1415 m/s
Superheated vapor water at 200oC, 300 kPa v = 0.7163 m3/kg, s = 7.3115 kJ/kg K At P = 200 kPa & s = 7.3115 kJ/kg K: T = 157oC,
v = 0.9766 m3/kg
At P = 400 kPa & s = 7.3115 kJ/kg K: T = 233.8oC, v = 0.5754 m3/kg c2 = -(0.7163)2 =>
0.400-0.200 (0.5754-0.9766 ) MJ = 0.2558 × 10 m2/s2 kg 6
c = 506 m/s
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Borgnakke and Sonntag 12.b
If I raise the temperature in a constant pressure process, does g go up or down? From the definition and variation in Gibbs function, see Eq.12.15 and Maxwells relation Eq.12.21 last one, we get dg = –s dT so Gibbs function decreases as temperature increases.
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Borgnakke and Sonntag 12.c
If I raise the pressure in an isentropic process, does h go up or down? Is that independent upon the phase? Tds = 0 = dh – vdP , so h increases as P increases, for any phase. The magnitude is proportional to v (i.e. large for vapo r and small for liquid and solid phases)
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Borgnakke and Sonntag 12.d
If I raise the pressure in a solid at constant T , does s go up or down? In Example 12.4, it is found that change in s with P at constant T is negatively related to volume expansivity (a positive value for a solid), dsT = - v so raising P decreases s.
α P dPT
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Borgnakke and Sonntag 12.e
What does it imply if the compressibility factor is larger than 1? A compressibility factor that is greater than one comes from domination of intermolecular forces of repulsion (short range) over forces of attraction (long range) – either high temperature or very high density. This implies that the density is lower than what is predicted by the ideal gas law, the ideal gas law assumes the molecules (atoms) can be pressed closer together.
12.f
What is the benefit of the generalized charts? Which properties must be known besides the charts themselves? The generalized charts allow for the approximate calculations of enthalpy and entropy changes (and P,v,T behavior), for processes in cases where specific data or equation of state are not known. They also allow for approximate phase boundary determinations. It is necessary to know the critical pressure and te mperature, as well as ideal-gas specific heat.
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Borgnakke and Sonntag
Concept-Study Guide Problems
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Borgnakke and Sonntag
12.1
The slope dP/dT of the vaporization line is finite as you approach the critical point, yet hfg and vfg both approach zero. How can that be? The slope is
dP dT sat =
hfg Tvfg
Recall the math problem what is the limit of f(x)/g(x) when x goes towards a point where both functions f and g goes towards zero. A finite limit for the ratio is obtained if both first derivatives are different from zero so we have dP/dT → [dhfg /dT] / d(Tvfg)/dT as T → Tc
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Borgnakke and Sonntag 12.2
In view of Clapeyron’s equation and Fig. 2.4, is there something special about ice I versus the other forms of ice? Yes. The slope of the phase boundary dP/dT is negative for ice I to liquid whereas it is positive for all the other ice to liquid interphases. This also means that these other forms of ice are all heavier than liquid water. The pressure must be more than 200 MPa ≈ 2000 atm so even the deepest ocean cannot reach that pressure (recall about 1 atm per 10 meters down).
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Borgnakke and Sonntag 12.3
If we take a derivative as (∂P/∂T)v in the two-phase region, see Figs. 2.7 and 2.8, does it matter what v is? How about T? In the two-phase region, P is a function only of T, and not dependent on v. The slope is the same at a given T regardless of v. The slope becomes higher with higher T and generally is the highest near the critical point. P L
T
C.P. V
S
v
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Borgnakke and Sonntag 12.4
Sketch on a P-T diagram how a constant v line behaves in the compressed liquid region, the two-phase L-V region and the superheated vapor region? P v >v small c
v < v Cr.P. c
S
L
V
v medium v large T
v < vc
P
L
C.P.
v > vc
S V
T
vmedium v
large
v The figures are for water where liquid is denser th an solid.
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Borgnakke and Sonntag 12.5
If I raise the pressure in an isothermal process does h go up or down for a liquid or solid? What do you need to know if it is a gas phase? Eq. 12.25:
∂h
∂v
(∂ )T = v – T (∂ )P = v[1 - TαP]
P T Liquid or solid, αP is very small, h increases with P ; For a gas, we need to know the equation of state.
12.6
The equation of state in Example 12.3 was used as explicit in v. Is it explicit in P? Yes, the equation can be written explicitly in P. RT P= C v+ 3 T
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Borgnakke and Sonntag 12.7
Over what range of states are the various coefficients in Section 12.5 most useful? For solids or liquids, where the coefficients are essentially constant ov er a wide range of P’s and T’s.
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Borgnakke and Sonntag 12.8
For a liquid or a solid is v more sensitive to T or P? How about an ideal gas? For a liquid or solid, v is much more sensitive to T than P. For an ideal gas, v = RT/P , varies directly with T, inversely with P.
12.9
Most equations of state are developed to cover which range of states? Most equations of state are developed to cover the gaseous phase, from low to moderate densities. Many cover high-density regions as well, including the compressed liquid region. To cover a wider region the EOS must be more complex and usually has many terms so it is only useful on a computer.
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Borgnakke and Sonntag 12.10
Is an equation of state valid in the two-phase regions? No. In a two-phase region, P depends only on T. There is a discontinuity at each phase boundary. It is actually difficult to determine the phase boundary from the EOS.
12.11
As P → 0, the specific volume v → ∞. For P → ∞, does v → 0? At very low P, the substance will be essentially an ideal gas, Pv = RT, so that v becomes very large. However at very high P, the substance eventually must become a solid, which cannot be compressed to a volume approaching zero.
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Borgnakke and Sonntag 12.12
Must an equation of state satisfy the two conditions in Eqs. 12.49 and 12.50? It has been observed from experimental measurements that substances do behave in that manner. If an equation of state is to be accurate in the near-critical region, it would have to satisfy these two conditions. If the equation is simple it may be overly restrictive to impose these as it may lead to larger inaccuracies in other regions.
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Borgnakke and Sonntag 12.13
At which states are the departure terms for h and s small? What is Z there? Departure terms for h and s are small at very low pressure or at very high temperature. In both cases, Z is close to 1 and this is the ideal gas region.
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Borgnakke and Sonntag 12.14
The departure functions for h and s as defined are always positive. What does that imply for the real substance h and s values relative to ideal gas values? Real-substance h and s are less than the corresponding ideal-gas values. This is true for the range shown in the figures, Pr < 10. For higher P the isotherms do bend down and negative values are possible. Generally this means that there are slightly attractive forces between the molecules leading to some binding energy that shows up as a negative potential energy (thus smaller h and u) and it also give a little less chaos (smaller s) due to the stronger binding as compared to ideal gas. When the pressure becomes large the molecules are so close together that the attractive forces turns into repulsive forces and the departure terms are negative.
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Borgnakke and Sonntag 12.15
What is the benefit of Kay’s rule versus a mix ture equation of state? Kay’s rule for a mixture is not nearly as a ccurate as an equation of state for the mixture, but it is very simple to use and it is general. For common mixtures new mixture EOS are becoming available in which case they are preferable for a greater accuracy in the calculation.
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Borgnakke and Sonntag
Clapeyron Equation
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Borgnakke and Sonntag 12.16
An approximation for the saturation pressure can be ln Psat = A – B/T, where A and B are constants. Which phase transition is that suitable for, and what kind of property variations are assumed? Clapeyron Equation expressed for the three ph ase transitions are shown in Eqs. 12.5-12.7. The last two leads to a natural log function if integrated and ideal gas for the vapor is assumed. dPsat hevap = Psat dT RT2 where hevap is either hfg or hig. Separate the variables and integrate -1
Psat dPsat = hevap R -1 T-2 dT ln Psat = A – B/T ;
B = hevap R -1
if we also assume hevap is constant and A is an integration constant. The function then applies to the liquid-vapor and the solid-vapor interphases with different values of A and B. As hevap is not excactly constant over a wide interval in T it means that the equation cannot be used for the total domain.
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Borgnakke and Sonntag 12.17
Verify that Clapeyron’s equation is satisfied for R-410A at 10oC in Table B.4.
Clapeyron Eq.:
B.4:
dPsat dPg hfg = = dT Tvfg dT
P = 1085.7 kPa,
hfg = 208.57 kJ/kg,
vfg = 0.02295 m3/kg
Slope around 10oC best approximated by cord from 5oC to 15oC dPg 1255.4 – 933.9 = = 32.15 kPa/K , dT 15 – 5 hfg 208.57 = 32.096 kPa/K = Tvfg 283.15 × 0.02295 This fits very well. Use CATT3 to do from 9 to 11oC for better approximation as the saturated pressure is very non-linear in T.
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Borgnakke and Sonntag 12.18
In a Carnot heat engine, the heat addition changes the working fluid from saturated liquid to saturated vapor at T , P. The heat rejection process occurs at lower temperature and pressure (T − ∆T ), (P − ∆P). The cycle takes place in a piston cylinder arrangement where the work is boundary work. Apply both the first and second law with simple approximations for the integral equal to work. Then show that the relation between ∆P and ∆T results in the Clapeyron equation in the limit ∆T → dT .
T T T −∆T
2
1
P
P P- ∆P
4
3
s
sfg at T q H = Tsfg;
2
T
P- ∆P
3
4
1
P
T- ∆ T v
vfg at T
q L = (T-∆T)sfg ;
wnet = q H - q L = ∆Tsfg
The boundary movement work, w = ⌠ ⌡ Pdv 3
4
w NET = P(v2-v1) + ⌠ ⌡ Pdv + (P - ∆P)(v4 - v3) + ⌠ ⌡ Pdv 2
1
Approximating, 3
⌠ ⌡ Pdv ≈ (P 2
Collecting terms:
4
∆P
) (v3 - v2); 2
w NET ≈ ∆P[(
⌠ ⌡ Pdv ≈ (P 1
v2+v3
v1+v4
2
2
) - (
∆P 2
) (v1 - v4)
)]
(the smaller the ∆P, the better the approximation) sfg ∆P
⇒ ∆T ≈
In the limit as
1 2(v2 + v3)
− 2(v1 + v4)
1
∆T → 0:
v3 → v2 = vg ,
v4 → v1 = vf
lim ∆P dPsat sfg & ∆T→0 = ∆T dT = vfg
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Borgnakke and Sonntag 12.19
Verify that Clapeyrons equation is satisfied for carbon dioxide at 6oC in Table B.3. dPsat dPg hfg = = dT Tvfg dT
Clapeyron Eq.:
B.3:
P = 4072.0 kPa,
hfg = 211.59 kJ/kg,
vfg = 0.00732 m3/kg
Slope around 6oC best approximated by cord from 4oC to 8oC dPg dT hfg
=
4283.1 – 3868.8 = 103.575 kPa/K , 8–4
=
211.59 kJ/kg = 103.549 kPa/K 279.15 × 0.00732 K m3/kg
Tvfg This fits very well.
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Borgnakke and Sonntag 12.20
Use the approximation given in problem 12.16 and Table B.1 to determine A and B for steam from properties at 25oC only. Use the equation to predict the saturation pressure at 30oC and compare to table value. dPsat
= Psat (-B)(-T -2) dT so we notice from Eq.12.7 and Table values from B.1.1 and A.5 that ln Psat = A – B/T
⇒
hfg 2442.3 kJ/kg B= = = 5292 K R 0.4615 kJ/kg-K Now the constant A comes from the saturation pressure as A = ln Psat + B/T = ln 3.169 +
5292 = 18.9032 273.15 + 25
Use the equation to predict the saturation pressure at 30oC as ln Psat = A – B/T = 18.9032 -
5292 = 1.4462 273.15 + 30
Psat = 4.2469 kPa compare this with the table value of Psat = 4.246 kPa and we have a very accurate approximation.
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Borgnakke and Sonntag 12.21
A certain refrigerant vapor enters a steady flow c onstant pressure condenser at 150 kPa, 70°C, at a rate of 1.5 kg/s, and it exits as saturated liquid. Calculate the rate of heat transfer from the condenser. It may be assumed that the vapor is an ideal gas, and also that at saturation, vf << vg. The following quantities are known for this refrigerant: ln Pg = 8.15 - 1000 /T ;
CP = 0.7 kJ/kg K
with pressure in kPa and temperature in K. The molecular mass is 100. Solution: Refrigerant: State 1 T1 = 70oC P1 = 150 kPa State 2 P2 = 150 kPa x2 = 1.0 Energy Eq.:
State 3
P3 = 150 kPa x3 = 0.0
q = h3 - h1 = (h3 - h2) + (h2 - h1) = - hfg T3 + CP0(T2 - T1)
1 3
Get the saturation temperature at the given p ressure ln (150) = 8.15 - 1000/T2 => T2 = 318.5 K = 45.3oC = T3 Now get the enthalpy of evaporation hfg T3 dPg hfg = , dT Tvfg d ln Pg dT
dPg d ln Pg hfg = Pg = P dT dT RT2 g
RT vfg ≈ vg = , Pg = +1000/T2 = hfg/RT2
hfg = 1000 × R = 1000 × 8.3145/100 = 83.15 kJ/kg Substitute into the energy equation q = -83.15 + 0.7(45.3 - 70) = -100.44 kJ/kg
1 3
. QCOND = 1.5(-100.44) = -150.6 kW
T
P
1 3
2
3
1 v
2 s
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Borgnakke and Sonntag 12.22
Calculate the values hfg and sfg for nitrogen at 70 K and at 110 K from the Clapeyron equation, using the necessary pressure and specific volume values from Table B.6.1. dPg hfg sfg = = dT Tvfg vfg
Clapeyron equation Eq.12.7:
For N2 at 70 K, using values for Pg from Table B.6 at 75 K and 65 K, and also vfg at 70 K,
∆Pg ∆Τ
hfg ≈ T(vg-vf )
(76.1-17.41 ) = 215.7 kJ/kg 75-65
= 70(0.525 015)
sfg = hfg/T = 3.081 kJ/kg K Table B.6.1:
hfg = 207.8 kJ/kg
and sfg = 2.97 kJ/kg K
Comparison not very close because Pg not linear function of T. Using 71 K & 69 K from the software, we can then get
(44.56-33.24 ) = 208.0 kJ/kg 71-69
hfg = 70(0.525 015) At 110 K,
(1938.8-1084.2 ) = 134.82 kJ/kg 115-105
hfg ≈ 110(0.014 342) sfg = hfg/T = Table B.6.1:
134.82 = 1.226 kJ/kg K 110
hfg = 134.17 kJ/kg
and sfg = 1.22 kJ/kg K
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Borgnakke and Sonntag 12.23
Find the saturation pressure for refrigerant R-410A at –80oC assuming it is higher than the triple point temperature. The lowest temperature in Table B.4 for R-410A is -60oC, so it must be extended to -80oC using the Clapeyron Eq. 12.7 integrated as in example 12.1 Table B.4 at T1 = -60oC = 213.15 K: P1 = 64.1 kPa, R = 0.1145 kJ/kg-K ln
P hfg (T - T1) 279.96 (193.15 - 213.15) = = = -1.1878 P1 R T × T 0.1145 193.15 × 213.15 1
P = 64.1 exp(-1.1878) = 19.54 kPa
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Borgnakke and Sonntag 12.24
Ammonia at –70oC is used in a special application at a quality of 50%. Assume the only table available is B.2 that goes down to –50oC. To size a tank to hold 0.5 kg with x = 0.5, give your best estimate for the saturated pressure and the tank volume. To size the tank we need the volume and thus the specific volume. If we do not have the table values for vf and vg we must estimate those at the lower T. We therefore use Clapeyron equation to extrapolate from –50oC to –70oC to get the saturation pressure and thus vg assuming ideal gas for the vapor. The values for vf and hfg do not change significantly so we estimate Between -50oC and –70oC:
hfg = 1430 kJ/kg
and at –70oC we get: vf = 0.001375 m3/kg The integration of Eq.12.7 is the same as in Example 12.1 so we get ln
P2 hfg T2 - T1 1430 -70 + 50 = ( ) = = -1.2923 P1 R T2T1 0.4882 203.15 × 223.15
P2 = P1 exp(-1.2923) = 40.9 exp(-1.2923) = 11.2 kPa vg = RT2/P2 =
0.4882 × 203.15 = 8.855 m3/kg 11.2
v2 = (1-x) vf + x vg = 0.5 × 0.001375 + 0.5 × 8.855 = 4.428 m3/kg V2 = mv2 = 2.214 m3 P
A straight line extrapolation will give a negative pressure. T -70 -50
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Borgnakke and Sonntag 12.25
Use the approximation given in problem 12.16 and Table B.4 to determine A and B for refrigerant R-410A from properties at 0oC only. Use the equation to predict the saturation pressure at 5oC and compare to table value. dPsat
= Psat (-B)(-T -2) dT so we notice from Eq.12.7 and Table values from B.4.1 and A.5 that ln Psat = A – B/T
B=
⇒
hfg 221.37 kJ/kg = = 1933.4 K R 0.1145 kJ/kg-K
Now the constant A comes from the saturation pressure as A = ln Psat + B/T = ln 798.7 +
1933.4 = 13.7611 273.15
Use the equation to predict the saturation pressure at 5oC as ln Psat = A – B/T = 13.7611 -
1933.4 = 6.8102 273.15 + 5
Psat = 907 kPa compare this with the table value of Psat = 933.9 kPa and we have an approximation 3% low. Notice hfg decreases so we could have used a lower value for the average in the interval.
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Borgnakke and Sonntag
12.26
The triple point of CO2 is -56.4oC. Predict the saturation pressure at that point using Table B.3.
The lowest temperature in Table B.3 for CO2 is -50oC, so it must be extended to -56.4oC = 216.75 K using the Clapeyron Eq. 12.7 integrated as in Ex. 12.1 Table B.3:
at T1 = -50oC = 223.15 K,
Table A.5:
P1 = 682.3 kPa, hfg = 339.73 kJ/kg
R = 0.1889 kJ/kg-K
P hfg (T - T1) 339.73 (216.75 - 223.15) ln = = = -0.23797 P1 R T × T 0.1889 216.75 × 223.15 1 P = 682.3 exp(-0.23797) = 537.8 kPa Notice from Table 3.2: P = 520.8 kPa so we are 3% high. As hfg becomes larger for lower T’s we could have estimated a mo re suitable value for the interval from -50 to -56.4oC
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Borgnakke and Sonntag 12.27
Helium boils at 4.22 K at atmospheric pressure, 10 1.3 kPa, with hfg = 83.3 kJ/kmol. By pumping a vacuum over liquid helium, the pressure can be lowered, and it may then boil at a lower temperature. Estimate the necessary pressure to produce a boiling temperature of 1 K and one of 0.5 K. Solution: Helium at 4.22 K: P1 = 0.1013 MPa, dPSAT hFG hFGPSAT = ≈ dT TvFG RT2
⇒
hFG = 83.3 kJ/kmol
P2 hFG 1 1 ln = − [ ] P1 R T1 T2
For T2 = 1.0 K: ln
P2
83.3 1 1 [ ] = − 101.3 8.3145 4.22 1.0
=> P2 = 0.048 kPa = 48 Pa
For T2 = 0.5 K: ln
P2
83.3 1 1 [ ] = − 101.3 8.3145 4.22 0.5
P2 = 2.1601×10-6 kPa = 2.1601
10-3 Pa
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Borgnakke and Sonntag 12.28
Using the properties of water at the triple point, de velop an equation for the saturation pressure along the fusion line as a function of temperature. Solution: The fusion line is shown in Fig. 2.3 as the S-L interphase. From Eq.12.5 we have dPfusion dT
=
hif Tvif
Assume hif and vif are constant over a range of T’s. We do not have any simple models for these as function of T other than curve fitting. Then we can integrate the above equation from the triple point (T1, P1) to get the pressure P(T) as P – P1 =
hif vif
ln
T T1
Now take the properties at the triple point from B.1.1 and B.1.5 P1 = 0.6113 kPa,
T1 = 273.16 K
vif = vf – vi = 0.001 – 0.0010908 = - 9.08 × 10−5 m3/kg hif = hf – hi = 0.0 – (-333.4) = 333.4 kJ/kg The function that approximates the pressure becomes P = 0.6113 – 3.672
× 106
ln
T T1
[kPa]
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Borgnakke and Sonntag 12.29
Using thermodynamic data for water from Tables B.1.1 and B.1.5, estimate the freezing temperature of liquid water at a pressure of 30 MPa. P H2O
dPif hif = ≈ const dT Tvif
30 MPa
T.P. T
At the triple point, vif = vf - vi = 0.001 000 - 0.001 090 8 = -0.000 090 8 m3/kg hif = hf - hi = 0.01 - (-333.40) = 333.41 kJ/kg dPif 333.41 = = -13 442 kPa/K dT 273.16(-0.000 090 8)
⇒
at P = 30 MPa, (30 000-0.6) T ≈ 0.01 + = -2.2 oC (-13 442)
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Borgnakke and Sonntag 12.30
Ice (solid water) at −3°C, 100 kPa, is compressed isothermally until it becomes liquid. Find the required pressure. Water, triple point T = 0.01oC , P = 0.6113 kPa Table B.1.1: vf = 0.001 m3/kg, hf = 0.01 kJ/kg, Tabel B.1.5:
vi = 0.001 0908 m3/kg, hi = -333.4 kJ/kg dPif hf - hi 333.4 = = = -13 442 kPa/K dT (vf - vi)T -0.0000908 × 273.16
Clapeyron
∆P ≈
dPif dT
∆T = -13 442(-3 - 0.01) = 40 460 kPa
P = Ptp + ∆P = 40 461 kPa
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Borgnakke and Sonntag 12.31
From the phase diagram for carbon dioxide in Fig. 2.5 and 2.4 for water what can you infer for the specific volume change during melting assuming the liquid has a higher h than the solid phase for those two substances.
The saturated pressure versus temperature has a positive slope for carbon dioxide and a negative slope for water. Clapeyron
dPif hf - hi = dT (vf - vi)T
So if we assume hf - hi > 0 then we notice that the volume change in the melting gives Water: vf - vi < 0 so vf < vi Carbon dioxide:
vf - vi > 0
so
vf > vi
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Borgnakke and Sonntag 12.32
A container has a double wall where the wall cavity is filled with carbon dioxide at room temperature and pressure. When the container is filled with a cryogenic liquid at 100 K the carbon dioxide will freeze so that the wall cavit y has a mixture of solid and vapor carbon dioxide at the sublimation pressure. Assume that we do not have data for CO2 at 100 K, but it is known that at −90°C: Psat = 38.1 kPa, hIG = 574.5 kJ/kg. Estimate the pressure in the wall cavity at 100 K. Solution: For CO2 space: at T1 = -90 oC = 183.2 K , P1 = 38.1 kPa, hIG = 574.5 kJ/kg For T2 = TcO2 = 100 K: Clapeyron ln
dPSUB hIG hIGPSUB ≈ = dT TvIG RT2
P2 hIG 1 1 574.5 1 1 − − [ ] [ ] = −13.81 = = P1 R 183.2 100 0.188 92 183.2 100
or P2 = P1 × 1.005×10-6
⇒
P2 = 3.83×10-5 kPa = 3.83 10-2 Pa
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Borgnakke and Sonntag 12.33
Small solid particles formed in combustion should be investigated. We would like to know the sublimation pressure as a function of temperature. The only information available is T , hFG for boiling at 101.3 kPa and T , hIF for melting at 101.3 kPa. Develop a procedure that will allow a determination of the sublimation pressure, Psat(T ).
P
T NBP = normal boiling pt T.
Solid
T NMP = normal melting pt T.
101.3 kPa P TP
TTP = triple point T.
Liquid Vap. T
1) TTP ≈ T NMP
T TP TNMPTNBP T
P
TP
⌠ hFG ⌠ (1/PSAT) dPSAT ≈ RT2 dT ⌡ ⌡
2)
TP
0.1013 MPa
T NMP
Since hFG ≈ const ≈ hFG NBP the integral over temperature becomes ln
PTP
≈ 0.1013
hFG NBP R
[T
1
NBP
-
1 ] TTP
→
get PTP
3) hIG at TP = hG - hI = (hG - hF) + (hF - hI) ≈ hFG NBP + hIF NMP Assume hIG ≈ const. again we can evaluate the integral
ln
PSUB = PTP
P
T SUB
⌠ ⌡ (1/PSUB) dPSUB ≈
PTP
hIG 1 ⌠ hIG 1 2 dT ≈ R [T − T] ⌡ RT TP TTP
or PSUB = fn(T)
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Borgnakke and Sonntag
Property Relations
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Borgnakke and Sonntag 12.34
Use Gibbs relation du = Tds – Pdv and one of Maxwell’s relations to find an expression for (∂u/∂P)T that only has properties P, v and T involved. What is the value of that partial derivative if you have an ideal gas? du = Tds – Pdv
divide this by dP so we get
∂u ∂s ∂v ∂PT = T ∂PT – P ∂PT =
∂v ∂v – P ∂T P ∂P T
–T
where we have used Maxwell Eq.12.19. Now for an ideal gas we get RT Ideal gas: Pv = RT ⇒ v = P then the derivatives are ∂v R ∂v ∂TP = P and ∂PT = –RTP –2 and the derivative of u is
∂u ∂PT =
R ∂v ∂v – P = –T – P( –RTP –2) = 0 P ∂T P ∂P T
–T
This confirms that u is not sensitive to P and only a function of T.
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Borgnakke and Sonntag 12.35
The Joule-Thomson coefficient µ J is a measure of the direction and magnitude of the temperature change with pressure in a throttling process. For any three properties x,y,z use the mathematical relation ∂x ∂y ∂z ∂y ∂z ∂x = –1 z x y to show the following relations for the Joule-Thomson coefficient: ∂v T – v ∂T P RT2 ∂Z ∂T µ J = = = CP PCP ∂T P ∂P h Let x = T, y = P and z = h and substitute into the relations as:
∂T ∂P h
∂P ∂h ∂h ∂T = –1 T P ∂h ∂T P
Then we have the definition of specific heat as CP = term
∂T = ∂P h
µ J =
–
so solve for the first
1 ∂P 1 ∂h / = – CP ∂h T CP ∂P T
The last derivative is substituted with Eq.12.25 so we get
∂T = ∂P h
µ J =
∂v – v ∂T P
T
CP
If we use the compressibility factor then we get ZR RT ∂Z v RT ∂Z ∂v Pv = ZRT ∂T = P + P ∂T = T + P ∂T P P P so then
∂v T – v = v ∂T P
RT2 ∂Z RT2 ∂Z + – v = P ∂T P ∂T P P
and we have shown the last expression also. ∂v T – v ∂T P RT2 ∂Z ∂T µ J = = = CP PCP ∂T P ∂P h
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Borgnakke and Sonntag 12.36
Find the Joule-Thomson coefficient for an ideal gas from the expression given in Problem 12.35
∂T µ J = = ∂P h
∂v – v ∂T P
T
CP
RT2 ∂Z = PCP ∂T P
For an ideal gas: v = RT/P so then the partial derivative RT ∂v R ∂v T – v = – v = v – v = 0 ∂T = P P P ∂T P For an ideal gas Z = 1 so the very last derivative of Z is also zero.
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Borgnakke and Sonntag 12.37
Start from Gibbs relation dh = Tds + vdP and use one of Maxwell’s equation to get (∂h/∂v)T in terms of properties P, v and T. Then use Eq.12.24 to also find an expression for (∂h/∂T)v. Find
(∂∂hv)T and (∂∂Th)v
dh = Tds + vdP
⇒
and use Eq.12.18
(∂∂vh)T = T (∂∂vs )T + v(∂∂Pv)T
=T
(∂∂TP)v + v(∂∂Pv)T
Also for the second first derivative use Eq.12.24
(∂∂Th)v = T(∂∂Ts )v + v(∂∂TP)v = Cv + v(∂∂TP)v
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Borgnakke and Sonntag 12.38
From Eqs. 12.23 and 12.24 and the knowledge that C p > Cv what can you conclude about the slopes of constant v and constant P curves in a T-s diagram? Notice that we are looking at functions T(s, P or v given). Solution: The functions and their slopes are: ∂T Constant v: T(s) at that v with slope ∂s v ∂T Constant P: T(s) at that P with slope ∂s P Slopes of these functions are now evaluated using Eq.12.23 and Eq.12.24 as
∂T ∂s -1 T ∂s P = ∂TP = C p -1 T ∂T ∂s ∂s v = ∂Tv = C v Since we know C p > Cv then it follows that T/Cv > T/C p and therefore
∂T ∂s v
>
∂T ∂s P
which means that constant v-lines are steeper than constant P lines in a T-s diagram.
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Borgnakke and Sonntag 12.39
Derive expressions for (∂ T/ ∂ v)u and for (∂ h/∂ s)v that do not contain the properties h, u, or s. Use Eq. 12.30 with du = 0.
∂T
∂u
∂u
( ∂v )u = - (∂v)T/(∂T)v =
∂P ∂T)v
P - T(
Cv
(see Eqs. 12.33 and 12.34)
∂h ∂P ∂T = T + v = T v ) ( ) ( ∂s v ∂s v ∂v )s (Eq.12.20) ∂P T( )v ∂T ∂T ∂s ∂s ( ∂v )s = - (∂v)T/(∂T)v = - C (Eq.12.22) v ∂h vT ∂P ( ∂s )v = T + C (∂T)v v
As dh = Tds + vdP => (
But
⇒
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Borgnakke and Sonntag
12.40
Evaluate the isothermal changes in the internal energy, the enthalpy and the entropy for an ideal gas. Confirm the results in Chapters 3 and 6. We need to evaluate duT, dhT and dsT for an ideal gas: P = RT/v. From Eq.12.31 we get duT = [ T
∂P
R
(∂T)v – P ] dvT = [ T ( v ) – P ] dvT = [ P – P] dvT = 0
From Eq.12.27 we get using v = RT/P dhT = [ v – T (
∂v R ) ] dP = [ v – T ( ) ] dPT = [ v – v ] dPT = 0 T P ∂T P
These two equations confirms the statements in chapter 5 that u and h are functions of T only for an ideal gas. From Eq.12.32 or Eq.12.34 we get
∂v ∂T)P dPT
dsT = – (
=
∂P
(∂T)v dvT
R R = – dPT = dv P v T so the change in s can be integrated to find s2 – s1 = –R ln
P2 v2 = R ln P1 v1
when T2 = T1
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Borgnakke and Sonntag 12.41
Develop an expression for the variation in temperature with pressure in a constant entropy process, (∂ T/ ∂ P)s, that only includes the properties P–v – T and the specific heat, C p. Follow the development for Eq.12.32.
∂s
∂T
(∂P)T
-(
∂v ∂T)P
T
∂v
(∂P)s = - ∂s = - (C /T) = C (∂T)P P P (∂T)P ∂s
∂v
{(∂P)T = -(∂T)P, Maxwell relation Eq. 12.23 and the other is Eq.12.27}
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Borgnakke and Sonntag 12.42
Use Eq. 12.34 to get an expression for the derivative (∂T/∂v)s. What is the general shape of a constant s process curve in a T-v diagram? For an ideal gas can you say a little more about the shape? Equation 12.34 says dT ∂P + ( )v dv T ∂T so then in a constant s process we have ds = 0 and we find ∂T T ∂P ( ∂v )s = − C (∂T)v v ds = Cv
As T is higher the slope is steeper (but negative) unless the last term (∂P/∂T)v counteracts. If we have an ideal gas this last term can be determined ∂P R ⇒ (∂T)v = v P = RT/v ∂T T R P ( ∂v )s = − C v = − C v v and we see the slope is steeper for higher P and a little lower for higher T as Cv is an increasing function of T.
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Borgnakke and Sonntag 12.43
Show that the P-v-T relation as P(v – b) = RT satisfies the mathematical relation in Problem 12.35.
∂x ∂y z
∂y ∂z ∂z ∂x = –1 x y
Let (x, y, z ) be (P, v, T) so we have ∂P ∂v ∂T ∂v ∂T ∂P = –1 T P v The first derivative becomes, P = RT/(v – b) ∂P ∂v = –RT (v – b)-2 = – P/(v – b) T The second derivative, v = b + RT/P ∂v ∂T = R/P P The third derivative, T = (P/R)(v – b) ∂T ∂P = (v – b)/R v Substitute all three derivatives into the relation
∂P ∂v T
RT R v – b RT 1 ∂v ∂T × P × R = – (v – b) × P = – 1 ∂T ∂P = – 2 P v (v – b)
with the last one recognized as a rewrite of the original EOS.
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Borgnakke and Sonntag
Volume Expansivity and Compressibility
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Borgnakke and Sonntag 12.44
What are the volume expansivity α p, the isothermal compressibility βT, and the adiabatic compressibility βs for an ideal gas? The volume expansivity from Eq.12.37 and ideal gas v = RT/P gives 1 R 1 ∂v 1 α p = v(∂T)P = v ( P ) = T The isothermal compressibility from Eq.12.38 and ideal gas gives 1 ∂v 1 1 βT = − v(∂P)T = − v ( − RT P−2 ) = P The adiabatic compressibility βs from Eq.12.40 and ideal gas 1 ∂v βs = − v(∂P)s
From Eq.12.32 we get for constant s (ds = 0) ∂T T ∂v T R v (∂P)s = C (∂T)P = C P = C p p p and from Eq.12.34 we get Cv ∂P Cv v Cv ∂v (∂T)s = − T (∂T)v = − T R = − P Finally we can form the desired derivative Cv v ∂v ∂v ∂T v (∂P)s = (∂T)s (∂P)s = − P C = − kP p 1 ∂v βs = − v(∂P)s
= (−
1 v 1 1 − = = βT ) ( ) v kP kP k
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Borgnakke and Sonntag 12.45
Assume a substance has uniform properties in all directions with V = LxLyLz and show that volume expansivity α p = 3δT. Hint: differentiate with respect to T and divide by V. V = LxLyLz From Eq.12.37 1 ∂V α p = V( ∂T )P =
LyLz LxLyLz
=
∂ LxLyLz 1 ( LxLyLz ∂T )P
∂L
LxLz
( ∂Tx)P + L
xLyLz
∂L
L Ly
( ∂Ty)P + L Lx
x yLz
∂L
( ∂Tz)P
1 ∂ Lx 1 ∂ Ly 1 ∂ Lz ( ) + ( ) + ( ) = Lx ∂T P Ly ∂T P Lz ∂T P = 3 δT This of course assumes isotropic properties (the same in all directions).
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Borgnakke and Sonntag 12.46
Determine the volume expansivity, α P, and the isothermal compressibility, β T, for water at 20°C, 5 MPa and at 300°C, and 15 MPa using the steam tables. Water at 20oC, 5 MPa (compressed liquid) 1 ∂v 1 ∆v αP = v(∂T)P ≈ v(∆T)P
;
1 ∂v 1 ∆v βT = - v(∂P)T ≈ - v(∆P)T
Estimate by finite difference using values at 0oC, 20oC and 40oC,
αP ≈
1 0.001 0056 - 0.000 9977 = 0.000 1976 oC-1 0.000 9995 40 - 0
Using values at saturation, 5 MPa and 10 MPa, 1
βT ≈ - 0.000 9995
0.000 9972 - 0.001 0022 = 0.000 50 MPa-1 10 - 0.0023
Water at 300oC, 15 MPa (compressed liquid)
αP ≈
1 0.001 4724 - 0.001 3084 = 0.002 977 oC-1 0.001 377 320 - 280 1
βT ≈ - 0.001 377
0.001 3596 - 0.001 3972 = 0.002 731 MPa-1 20 - 10
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Borgnakke and Sonntag 12.47
Use the CATT3 software to solve the previous problem. The benefit of the software to solve for the p artial derivatives is that we can narrow the interval over which we determine the slope. Water at 20oC, 5 MPa (compressed liquid) 1 ∂v 1 ∆v αP = v(∂T)P ≈ v(∆T)P
;
1 ∂v 1 ∆v βT = - v(∂P)T ≈ - v(∆P)T
Estimate by finite difference using values at 19oC, 20oC and 21oC,
αP ≈
1 0.000 9997 - 0.000 9993 = 0.000 40 oC-1 0.000 9995 21 - 19
Using values at saturation, 4.5 MPa and 5.5 MPa, 1
βT ≈ - 0.000 9995
0.000 9993 - 0.000 9997 = 0.000 40 MPa-1 5.5 - 4.5
Water at 300oC, 15 MPa (compressed liquid)
αP ≈
1 0.001 385 - 0.001 369 = 0.011 619 oC-1 0.001 377 302 - 298 1
βT ≈ - 0.001 377
0.001 373 - 0.001 381 = 0.002 905 MPa-1 16 - 14
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Borgnakke and Sonntag 12.48
A cylinder fitted with a piston contains liquid methanol at 20°C, 100 kPa and volume 10 L. The piston is moved, compressing the methanol to 20 MPa at constant temperature. Calculate the work required for this process. Th e isothermal compressibility of liquid methanol at 20°C is 1.22 × 10-9 m2/N. 2
2 ⌠ ∂v P( )T dPT = -⌠ vβT PdPT ⌡ Pdv = 1w2 = ⌠ ⌡ ∂P ⌡ 1 1
For v ≈ constant & 1w2 =
-
vβT 2
βT ≈ constant
the integral can be evaluated
(P - P ) 2 2
2 1
For liquid methanol, from Table A.4: V1 = 10 L, 1W2 =
ρ = 787 m3/kg
m = 0.01 × 787 = 7.87 kg
0.01×1220 (20)2 - (0.1)2 2
[
] = 2440 J = 2.44 kJ
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Borgnakke and Sonntag 12.49
For commercial copper at 25oC (see table A.3) the speed of sound is about 4800 m/s. What is the adiabatic compressibility βs?
From Eq.12.41 and Eq.12.40 c2 =
(∂∂ρP)s = −v (∂∂Pv)s = 2
1
=
(∂∂Pv)s ρ
1 v
1
βsρ
Then we get using density from Table A.3 1
1
βs = c2ρ = 48002 × 8300 = 5.23 10
9
kPa
s2 m3 1000 1 = 2 2 m kg 4800 × 8300 kPa
1
Cu
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Borgnakke and Sonntag 12.50
Use Eq. 12.32 to solve for (∂T/∂P)s in terms of T, v, C p and α p. How large a temperature change does 25oC water (α p = 2.1 × 10-4 K -1) have, when compressed from 100 kPa to 1000 kPa in an isentropic process?
From Eq.12.32 we get for constant s (ds = 0) and Eq.12.37
(∂∂TP)s = CT p (∂∂Tv )P = CT p α p v Assuming the derivative is constant for the isentropic compression we estimate with heat capacity from Table A.3 and v from B.1.1
∂T T ∆Ts = (∂P)s ∆Ps = C α p v ∆Ps p
=
273.15 + 25 × 2.1 × 10-4 × 0.001003 × (1000 – 100) 4.18
= 0.013 K
barely measurable.
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Borgnakke and Sonntag 12.51
Sound waves propagate through a media as pressure waves that cause the media to go through isentropic compression and exp ansion processes. The speed of sound c is defined by c 2 = (∂ P/∂ρ )s and it can be related to the adiabatic compressibility, which for liquid ethanol at 20°C is 9.4 × 10-10 m2/N. Find the speed of sound at this temperature.
c2 =
(∂∂ρP)s = −v (∂∂Pv)s =
1
2
1 v
From Table A.4 for ethanol,
⇒
c=
(940×101
) ×783
-12
=
(∂∂Pv)s ρ
1
βsρ
ρ = 783 kg/m3 1/2
= 1166 m/s
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Borgnakke and Sonntag 12.52
Use Table B.3 to find the speed of sound for carbon dioxide at 2500 kPa near 100oC. Approximate the partial derivative numerically. c2 =
(∂∂ρP)s = −v (∂∂Pv)s 2
We will use the 2000 kPa and 3000 kPa table entries. We need to find the change in v between two states with the same s at those two pressures. At 100oC, 2500 kPa:
s = (1.6843 + 1.5954)/2 = 1.63985 kJ/kg-K, v = (0.03359 + 0.02182)/2 = 0.027705 m3/kg
2000 kPa, s = 1.63985 kJ/kg-K: 3000 kPa, s = 1.63985 kJ/kg-K:
(∆∆Pv) = − 0.027705
c2 ≈ −v2 c=
2
s
v = 0.031822 m3/kg v = 0.0230556 m3/kg
3000 - 2000 kJ J = 87 557.8 0.0230556-0.031822 kg kg
87 557.8 = 295.9 m/s
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Borgnakke and Sonntag 12.53
Use the CATT3 software to solve the previous problem. At 100oC, 2500 kPa:
s = 1.636 kJ/kg-K, v = 0.02653 m3/kg
101oC, s = 1.636 kJ/kg-K:
v = 0.02627 m3/kg, P = 2.531 MPa
99oC, s = 1.636 kJ/kg-K:
v = 0.02679 m3/kg, P = 2.469 MPa
(∆∆Pv) = − 0.02653
c2 ≈ −v2 c=
s
2
2531 - 2469 kJ J = 83 919.5 0.02627 - 0.02679 kg kg
83 919.5 = 289.7 m/s
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