Transcript ptG_engines

PHYS1001
Physics 1 REGULAR
Module 2 Thermal Physics
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HEAT ENGINE
ap06/p1/thermal/ptG_engines.ppt
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HEAT ENGINES AND REFRIGERATORS
Heat engines: Entropy (§20.1 p673
§20.2 p675 §20.5 p682)
Heat engines: Carnot cycle (§20.6 p684
§20.7 p690)
Internal Combustion Engines: Otto & Diesel Cycles (§20.3 p678)
Refrigerators (§20.4 p680)
References: University Physics 12th ed Young & Freedman
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Heat engine: device that transforms heat partly into work
(mechanical energy) by a working substance undergoing a
cyclic process.
HEAT ENGINE
Cyclic process: W = |QH| - |QC|
Hot reservoir (heat source) TH
QH
Engine – working substance
W
QC
W>0
|QH| = |W|+|QC|
petrol engine: fuel + air
useful mechanical work output
Dissipative losses – friction, turbulence
Cold reservoir (heat sink) TC
petrol engine - hot
exhaust gases + cooling
system
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All heat engines absorb heat QH from a source at a relatively
high temperature (hot reservoir TH), perform some work W and
reject some heat QC at a lower temperature (cold reservoir TC).
First Law for a cyclic process: U = 0 = Qnet – W
 Qnet = |QH| - |QC| = W
Thermal efficiency, e represents the fraction of QH that is
converted to useful work.
e
Q
W
 1 C
QH
QH
Problem (Y & F Example 20.1)
A large truck is travelling at 88 km.h-1. The engine takes in 10 000 J of
heat and delivers 2 000 J of mechanical energy per cycle. The heat is
obtained by burning petrol (heat of combustion Lcomb = 5.0107 J.kg-1).
The engine undergoes 25 cycles per second.
Density of petrol  = 700 kg.m-3
(a) What is the thermal efficiency of the heat engine?
(b) How much heat is discarded each cycle?
(c) How much petrol is burnt per hour (kg.h-1)?
(d) What is the petrol consumption of the truck in L/100 km?
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Solution
ISEE
v = 88 km.h-1
QH = 1.0104 J/cycle
W = 2103 J/cycle
Lcomb = 5.0107 J.kg-1 f = 25 cycles.s-1
(a)
e=?
e = W / QH = (2103) / (1.0104) = 0.20 = 20% sensible
(b)
QC = ? J |QH| - |QC| = W
|QC| = 8.0103 J/cycle
(c)
QH =
8
1104
J/cycle QH /t =
(25)(1104)
J.s-1
=
2.5105
J.s-1
LC =
5.0107
J.kg-1
QH/t = (m/t) Lcomb m/t = (QH/t )/ Lcomb = (2.5105 ) / (5.0107) = 510-3 kg.s-1
m/t = (510-3)(60)(60) = 18 kg.h-1
(d)
fuel consumption = ? L/100 km
v = 88 km.h-1 v = d/t t = ? h
d = 100 km
t = d / v = 100 / 88 h = 1.1364 h
mass used traveling 100 km
m = (m/t)t = (18)(1.1364) = 20.455 kg
 = m V 103 L = 1 m3
volume used in traveling 100 km V = m /  = (20.455 / 700) m3 = 0.0292 m3 = 29.2 L
petrol consumption = 29.2 L/100 km
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Hot Reservoir
QH
W
Engine
Surroundings
QC= 0
Can a heat engine be 100% efficient in converting heat into mechanical work ?
Why does this engine violate the Second Law ?
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ENTROPY considerations:
S(engine) = 0
cyclic process
S(surrounding) = 0
no heat transfer to surroundings
S(hot reservoir) < 0
heat removed
S(total) < 0
violates Second Law
All heat engines (heat to work): efficiency, e < 1
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Hot reservoir
QH
W
Engine
QC
Cold reservoir
surroundings
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S(hot reservoir) = - |QH|/ TH
S(cold reservoir) = + |QC|/ TC
S(engine) = 0
(cyclic process)
S(surroundings) = 0
(no heat transfer to surroundings)
S(total) = - |QH|/ TH + |QC|/ TC
Useful work can only be done if S(total)  0

| QH| / TH  | QC | / TC
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An ideal engine e.g. Carnot Cycle
S = 0  | QH / TH | = | QC / TC |
e = W / QH
Sadi Carnot (1824) Frenchman
W = |QH| - |QC|
e = (|QH| - |QC| / QH)= 1 - |QC| / |QH|
e = 1 – TC / T H < 1
This is the absolute max
efficiency of a heat engine
NOTE: All heat (QH & QC) exchanges occurred isothermally in
calculating the efficiency e = 1 – TC / TH
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CARNOT CYCLE
Heat engine with the maximum possible efficiency consistent with 2nd
law.
All thermal processes in the cycle must be reversible - all heat transfer
must occur isothermally because conversion of work to heat is
irreversible.
When the temperature of the working substances changes, there must
be zero heat exchange – adiabatic process.
Carnot cycle – consists of two reversible isotherms and two reversible
adiabats
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Carnot Cycle
P
QH
adiabatic
isothermals
3
Diagram not to
scale, adiabats are
much steeper than
shown
4
2
W
1
QC released to
surroundings
V
NOTE: All heat (QH & QC) exchanges occurred isothermally in calculating
the efficiency e = 1 – TC / TH
QC
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1 and 2: “cold”
3 and 4: “hot”
QH
p
3
4
2
1
V
12
Isothermal
compression
23
Adiabatic
compression
34
Isothermal
expansion
41
Adiabatic
expansion
All energy exchanges are reversible – there are no non-recoverable energy losses
Isothermal change Q = n R T ln(Vf /Vi)
p
3
1  2: Isothermal compression
heat QC rejected to sink at constant
temperature TC.
|QC | = n R TC ln(V2 / V1)
4
2
e = 1 - |QC| / |QH| = 1 – TC ln(V2 / V1) / TH ln(V4 / V3)
TiVi-1 = TfVf-1
1
V
3  4: Isothermal expansion
heat QH supplied from source at constant temperature
|QH | = n R TH ln(V4 / V3)
Adiabatic change Q = 0
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1 and 2: “cold”
3 and 4: “hot”
Proof: e = 1 - |QC| / |QH| = 1 - TC / TH
(Eq. 1)
2  3: Adiabatic expansion
 1
T2V2 1  TV
3 3
4  1: Adiabatic expansion
 1
TV
 T4V4 1
1 1
T1  T2
 V1 
 
 V2 
 1
T3  T4
V 
 4
 V3 
 V1   V4 
  
 V2   V3 
 1
In practice, the Carnot cycle cannot be
used for a heat engine because the
slopes of the adiabatic and isothermal
lines are very similar and the net work
output (area enclosed by pV diagram)
is too small to overcome friction &
other losses in a real engine.
e = 1 - TC ln(V1 / V2) / TH ln(V4 / V3)
e  1
TC
TH
(Eq. 1)
Efficiency of Carnot engine - max possible efficiency
for a heat engine operating between TC and TH
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T
Carnot
eCarnot
Engine
1 C
TH
1
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TC = 25 oC
0.9
0.8
0.7
efficiency
0.6
The strength & hardness of metals
decreases rapidly above 750 oC
0.5
0.4
0.3
0.2
0.1
0
0
200
400
600
800
1000
1200
Temperature TH (oC)
“Re-author” Y&F Example 20.3
1400
1600
1800
2000
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Diathermal wall: A highly thermally conducting wall.
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CAR ENGINE
The four–stroke OTTO cycle
of a conventional petrol
engine
The four–stroke OTTO cycle of a conventional petrol engine
intake
stroke
compression
stroke
ignition
power
stroke
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exhaust
stroke
intake stroke: isobaric expansion
compression stroke: adiabatic compression
ignition: isochoric heating of gas
power stroke: adiabatic expansion of gas
exhaust stroke: isochoric cooling of gas / isobaric compression
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Intake1
Power 3
Compression 2
Exhaust 4
Otto Cycle
P
e  1
IGNITION
fuel
combustion
r  1
isothermals
adiabatic
3
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1
QH
power stroke
2
compression
stroke
W
Po
5
V2
4
1
intake stroke
exhaust stroke
QC
cooling of
exhaust gases
released to
surroundings
V
V1 = r V 2
r = compression ratio
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Otto Cycle
P
3
isothermals
adiabatic
QH
2
4
QC
Po
1
5
released to
surroundings
V
V2
V1
5  1: inlet stroke volume increases as piston moves down creating a
partial vacuum to aid air/fuel entering cylinder via the open inlet valve.
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Otto Cycle
P
3
isothermals
adiabatic
QH
2
4
QC
Po
1
5
released to
surroundings
V
V2
V1
1  2: compression stroke inlet valve closes piston moves up
compressing the air/fuel mixture adiabatically.
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Otto Cycle
P
3
isothermals
adiabatic
QH
2
4
QC
Po
1
5
released to
surroundings
V
V2
V1
2  3: ignition – spark plug fires igniting mixture - constant volume
combustion.
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Otto Cycle
P
isothermals
adiabatic
3
QH
2
4
Po
1
5
QC
released to
surroundings
V
V2
V1
3  4: expansion or power stroke – heated gas expands
adiabatically as the piston is pushed down doing work
(Vmax = r Vmin).
Compression ratio, r
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Otto Cycle
P
3
isothermals
adiabatic
QH
2
4
QC
Po
1
5
released to
surroundings
V
V2
V1
4  1 start of Exhaust stroke – outlet valve opens and mixture expelled
at constant volume then 1  5
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Otto Cycle
P
3
isothermals
adiabatic
QH
2
4
QC
Po
1
5
released to
surroundings
V
V2
V1
1  5: Exhaust stroke – piston moves up producing a compression at
constant pressure, Po (atmospheric pressure).
Otto cycle – standard petrol engine (4 stroke)
e  1
1
r
 1
Idealized model of the thermodynamic processes in a typical car engine.
For compression ratio, r ~ 8 and  = 1.4 (air)
TH (peak) ~ 1800 °C
TC (base) ~ 50 °C

e ~ 56% (ideal engine) e ~ 35% (real engine).
Efficiency increases with larger r  engine operates at higher
temperatures  pre–ignition  knocking sound and engine can be
damaged.
Octane rating – measure of anti-knocking – premium petrol r ~ 12.
In practice, the same air does not enter the engine again, but since an
equivalent amount of air does enter, we may consider the process as
cyclic.
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p
Comparison of theoretical and actual pV diagrams
for the four-stroke Otto Cycle engine.
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V
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Diesel Cycle
5 to 1: intake stroke
isobaric expansion
P
1 to 2: compression stroke
abiabatic compression
2
3
2 to 3: ignition
isobaric heating
Po
3 to 4: power stroke
adiabatic expansion
4 to 1: exhaust stroke (start)
isochoric cooling
1 to 5: exhaust stroke (finish)
isobaric compression
adiabatic isothermals
QH
4
5
V2
1
V1
Rudolf Diesel
QC
released to
surroundings
V
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Diesel Cycle
P
fuel
ignition
QH
2
isothermals
adiabatic
3
power stroke
compression
stroke
4
QC released to
Po
5
1
cooling of
exhaust gases
surroundings
V
V2
V1
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DIESEL CYCLE
No fuel in the cylinder at beginning of compression stroke. At the end of
the adiabatic compression high temperatures are reached and then fuel
is injected fast enough to keep the pressure constant. The injected fuel
because of the high temperatures ignites spontaneously without the need
for spark plugs.
Diesel engines operate at higher temperatures than petrol engines,
hence more efficient.
For r ~ 18 and  = 1.4 (air) TH (peak) ~ 2000 °C
e ~ 68% (ideal engine)
Petrol engine
TC (base) ~ 50 °C
real efficiency ~ 40 %
~ 56% (ideal engine)
real efficiency ~ 35 %
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Diesel engines
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• Heavier (higher compression ratios), lower power to weight ratio.
• Harder to start.
• More efficient than petrol engines (higher compression ratios).
• No pre-ignition of fuel since no fuel in cylinder during most of the compression
• They need no carburettor or ignition system, but the fuel-injection system
requires expensive high-precision machining.
• Use cheaper fuels less refined heavy oils – fuel does need to be
vaporized in carburettor, fuel less volatile hence safer from fire or
explosion.
• Diesel cycle – can control amount of injected fuel per cycle – less fuel used at
low speeds.
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http://people.bath.ac.uk/ccsshb/12cyl/
These engines were designed primarily for very large container ships.
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Problem
For the theoretical Otto cycle, calculate:
(a) max cycle temperature
(b) work per kilogram of fuel
(c) Efficiency
(d) Max efficiency Carnot engine working between same temperatures
Engine characteristics:
compression ratio = 8:1
cp = 1.005 kJ.kg-1.K-1 cV = 0.718 kJ.kg-1.K-1
Inlet conditions p = 97.5 kPa and T = 50 oC
Heat supplied = 950 kJ.kg-1
Solution
Identify / Setup
cp = 1.005 kJ.kg-1.K-1
cV = 0.718 kJ.kg-1.K-1
V1/ V2 = 8
p1 = 97.5103 Pa
T1 = 50 oC = 323 K
QH = 950 kJ.kg-1
TH = T3 = ? K
W = ? kJ.kg-1
e = ? eCarnot = ?
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e = W / |QH|
QV = m cV T
eCarnot = 1 – TC / TH
isothermals
adiabatic
3
QH
2
4
QC
Po
1
5
released to
surroundings
V
V2
Adiabatic change Q = 0 T V -1 = constant
Qp = m cp T
Otto Cycle
P
V1
 = cp / cV = 1.005 / 0.718 = 1.4
W = |QH| - |QC|
Adiabatic compression
Execute
-1
T2 / T1 = (V1/V2)
T2 = T1(V1 / V2)-1 = (323)(8)0.4 K = 742 K
Constant volume heating
QH = m cV (T3 – T2)
T3 = (QH/m)/cV +T2 = (950/0.718 + 742) K = 2065 K = 1792 oC
Adiabatic expansion
T4 / T3 = (V3 /V4)-1
T4 = T3(1/8)0.4 = 899 K
Constant volume heat rejection
QC = m cV (T4 – T3)  QC/m = (0.718)(899 - 323) kJ.kg-1 = 414 kJ.kg-1
W = |QH| - |QC| = (950 – 414) kJ.kg-1 = 536 kJ.kg-1
e = W / |QH| = 536 / 950 = 0.56
(real engine < 0.4)
eCarnot = 1 – TC / TH = 1 – 323 / 2067 = 0.84
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Calculate the
above quantities
for the diesel
cycle with a
compression
ratio = 20
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Diesel Cycle
P
adiabatic isothermals
QH
2
3
4
Po
5
V2
1
V1
QC
released to
surroundings
V
Adiabatic compression
V1 / V2 = 20
T2 / T1 = (V1/V2)-1 T2 = T1(V1 / V2)-1 = (323)(20)0.4 K = 1071 K
Isobaric heating
QH = m cp (T3-T2) QH/m = cp (T3 –T2)
T3 = T2 + (1/cp)(QH/m) = 1071 +(1/1.005)(950) K = 2016 K
Isobaric heating / Adiabatic expansion
V2 / T2 = V3 / T3 V3 / V2 = T3 / T2 V4 / V2 = 20 V2 = V4 / 20
V3 / V4 = (1/20)(T3/T2) = (1/20)(2016/1071) = 0.0941
T3V3-1 = T4V4-1
T4 = T3 (V3/V4)-1 = (2016)(0.0941)0.4 = 783 K
Isochoric cooling
QC = m cv (T4 – T1)
QC/m = cv (T4 – T1) = (0.718)(783 – 323) K = 330.3 kJ.kg-1
W = QH – QC = (950 – 330) kJ = 620 kJ.kg-1
e = W / QH = 620 / 950 = 0.65 e = 1- QC/QH = 1 – 330/950 = 0.65
The work output and efficiency are considerably higher than for Otto Cycle
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Example Consider two engines, the details of which are given in the following
diagrams. For both engines, calculate the heat flow to the cold reservoir and the
changes in entropy of the hot reservoir, cold reservoir and engine. Which engine
violates the Second Law? What is the efficiency of the working engine?
Solution
First Law: U = Qnet – W
Engine: cyclic process U = 0
 Qnet = W  |QH| - |QC|  |QC | = |QH| - W
Engine 1: |QC| = 1000 - 200 = 800 J
Engine 2: |QC| = 1000 - 300 = 700 J
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S(total) = - |QH|/ TH + |QC|/ TC
Engine 1: S = (- 2.5 + 2.7) J.K-1 = + 0.2 J.K-1 > 0
 Second Law validated
Engine 2: S = (- 2.5 + 2.3) J.K-1 = - 0.2 J.K-1 < 0
 Second Law not validated
Engine 1 is the working engine
efficiency, e = (work out / energy input)  100
= (200 / 1000)(100) = 20 %
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Semester 1, 2007 Examination question (5 marks)
A hybrid petrol-engine car has a higher efficiency than a petrol-only car
because it recovers some of the energy that would normally be lost as
heat to the surrounding environment during breaking.
(a)
If the efficiency of a typical petrol-only car engine is 20%, what efficiency
could be achieved if the amount of heat loss during breaking is halved?
(b)
Is it possible to recover all the energy lost as heat during braking and
convert it into mechanical energy? Explain your answer.
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Solution
Identify / Setup
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efficiency
e
W
Q  QC
Q
 H
 1 C
QH
QH
QH
Second Law of Thermodynamics
100% of heat can not be transformed into mechanical energy
e<1
Execute
(a)
e  1
QC
 0.2 
QH
Reduce heat loss by half
QC
 0.80
QH
QC
 0.40  e  0.6
QH
(b) Would require |QC| = 0, this would be a violation of the Second Law
e  1
QC
1 
QH
QC
0
QH

QC  0
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What is a heat pump ?
Better buy this quick:
500 % efficiency
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evaporator
gas absorbs
heat from
interior of frig.
|QH| = |Qc| + |W|
cold
compressor
heats gas by compression
hot
condenser
gas to liquid (high
pressure)
expansion value
rapid expansion:
liquid to gas,
sudden large drop
in temp (~35 oC)
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The compressor compresses the gas (e.g. ammonia). The compressed
gas heats up as it is pressurized (orange). The gas represents the
working substance eg ammonia and the compressor driven by an electric
motor does work W.
The condenser coils at the back of the refrigerator let the hot ammonia
gas dissipate its heat QH. The ammonia gas condenses into ammonia
liquid (dark blue) at high pressure gas (gas  liquid).
The high-pressure ammonia liquid flows through the expansion valve
The liquid ammonia immediately boils and vaporizes (light blue), its
temperature dropping to about –35 °C by the expansion. This makes the
inside of the refrigerator cold by absorption of heat QC .
The cold ammonia gas enters the compressor and the cycle repeats.
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Refrigeration Cycle
Heat engine operating in reverse – it takes heat from a cold place and gives it
off at a warmer place, this requires a net input of work.
|QH| = |QC| + |W|
Best refrigerator – one that removes the greatest amount of heat |QC| from
inside the refrigerator for the least expenditure of work |W|  coefficient of
performance, K (higher K value, better the refrigerator)
K
QC
W

QC
QH  QC
K = what we want / what we pay for
K = extraction of max heat from cold reservoir / least amount of work
p
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QH
W
QC
V
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Refrigerator
QH
Walls of room
QC
W<0
TC
refrigerator
Inside refrigerator
QC|Q=
Q|QHc-| +W|W|
H| =
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|QH| = |Qc| + |W|
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|QH| = |Qc| + |W|
PHYS1001 2009 Exam Question 10
In the figure above, cylinder A is separated from cylinder B by an adiabatic
piston which is freely movable. In cylinder A there is 0.010 mole of an ideal
monatomic gas with an initial temperature 300 K and a volume of 1.0x10 -4 m3.
In cylinder B, there is 0.010 mole of the same ideal monatomic gas with the
same initial temperature and the same volume as the gas in cylinder A.
Suppose that heat is allowed to flow slowly to the gas in cylinder A, and that
the gas in cylinder B undergoes the thermodynamic process of adiabatic
compression. Heat flows into cylinder A until finally the gas in cylinder B is
compressed to a volume of 0.5x10-5 m3. Assume that CV = 12.47 J.mol-1.K-1
and the ratio of heat capacities is  = 1.67. (a) Calculate the final temperature
and pressure of the ideal monatomic gas in cylinder B after the adiabatic
compression. (b) How much work does the gas in cylinder B do during the
compression? Explain the meaning of the sign of the work. (c) What is the
final temperature of the gas in the cylinder A? (Hint: the pressure exerted by
the gas in cylinder A on the piston is equal to that exerted by the gas in
cylinder B on the piston.) (d) How much heat flows to the gas in the cylinder A
during the process?
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