2. Rankine cycle
Many of the impracticalities associated with the Carnot cycle can be eliminated
by superheating the steam in the boiler and condensing it completely in the
condenser. The cycle that results is the Rankine cycle, which is the ideal cycle
for vapor power plants. The ideal Rankine cycle does not involve any internal
irreversibilities.
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3. Rankine cycle energy analysis
Steady-flow energy equation
The thermal efficiency can be
interpreted as the ratio of the
area enclosed by the cycle on
a T-s diagram to the area
under the heat-addition
process.
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4. Example 1
Consider a 210-MW steam power plant that operates on a simple ideal Rankine
cycle. Steam enters the turbine at 10 MPa and 500°C and is cooled in the
condenser at a pressure of 10 kPa. Show the cycle on a T-s diagram with respect
to saturation lines, and determine (a) the quality of the steam at the turbine
exit, (b) the thermal efficiency of the cycle, and (c) the mass flow rate of the
steam.
Answers: (a) 0.793,
(b) 40.2 percent, (c) 165 kg/s
Repeat the problem if the isentropic efficiencies for both pump and turbine equal
85 percent.
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5. Example 2
Consider a coal-fired steam power plant that produces 300 MW of electric
power. The power plant operates on a simple ideal Rankine cycle with
turbine inlet conditions of 5 MPa and 450°C and a condenser pressure of
25 kPa. The coal has a heating value (energy released when the fuel is
burned) of 29,300 kJ/kg. Assuming that 75 percent of this energy is
transferred to the steam in the boiler and that the electric generator has
an efficiency of 96 percent, determine
(a) the overall plant efficiency (the ratio of net electric power output to
the energy input as fuel)
(b) the required rate of coal supply.
Answers: (a) 24.5 percent, (b) 150 t/h
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6. Example 3
Consider a 210-MW steam power plant that operates on a simple Rankine cycle.
Steam enters the turbine at 10 MPa and 500°C and is cooled in the condenser at a
pressure of 10 kPa. Show the cycle on a T-s diagram with respect to saturation
lines, and determine (a) the quality of the steam at the turbine exit, (b) the
thermal efficiency of the cycle, and (c) the mass flow rate of the steam.
In this problem, the isentropic efficiencies for both pump and turbine equal 85
percent.
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7. Example 4
Geothermal resource exists as saturated liquid at 230°C. The geothermal liquid is
withdrawn from the production well at a rate of 230 kg/s, and is flashed to a pressure
of 500 kPa by an essentially isenthalpic flashing process where the resulting vapor is
separated from the liquid in a separator and directed to the turbine. The steam leaves
the turbine at 10 kPa with a moisture content of 10 percent and enters the condenser
where it is condensed and routed to a reinjection well along with the liquid coming off
the separator. Determine
(a) the mass flow rate of steam through the
turbine
(b) the isentropic efficiency of the turbine
(c) the power output of the turbine
(d) the thermal efficiency of the plant (the ratio
of the turbine work output to the energy of
the geothermal fluid relative to standard
ambient conditions).
Answers: (a) 38.2 kg/s, (b) 0.686, (c) 15.4 MW, (d)
7.6 percent
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8. Deviation from ideal cycle
The actual vapor power cycle differs from the ideal Rankine cycle as a result of
irreversibilities in various components. (Fluid friction and heat loss)
Isentropic efficiencies
(a) Deviation of actual vapor power cycle from the ideal Rankine cycle.
(b) (b) The effect of pump and turbine irreversibilities on the ideal Rankine cycle.
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10. Carnot Cycle
The Carnot cycle is the most efficient cycle operating between two specified
temperature limits.
1-2 isothermal heat
addition in a boiler
2-3 isentropic
expansion in a turbine
3-4 isothermal heat
rejection in a condenser
4-1 isentropic
compression in a
compressor
T-s diagram of two Carnot vapor cycles.
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11. Impracticality of Carnot Cycle
The Carnot cycle is not a suitable model for power cycles. Because:
Process 1-2 Limiting the heat transfer processes to two-phase systems severely limits the
maximum temperature that can be used in the cycle (374°C for water)
Process 2-3 The turbine cannot handle steam with a high moisture content because of the
impingement of liquid droplets on the turbine blades causing erosion and wear.
Process 4-1 It is not practical to design a compressor that handles two phases.
The cycle in (right) is not suitable since it requires isentropic compression to
extremely high pressures and isothermal heat transfer at variable pressures.
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