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A power cycle receives QH by heat transfer from a hot reservoir at TH = 1200 K and rejects energy QC by heat transfer to a cold reservoir at TC = 400 K. For each of the following cases, determine whether the cycle operates reversibly, operates irreversibly, or is impossible.

a.QH = 900 kJ, Wcycle= 450 kJ
b. QH = 900 kJ, Qc = 300 kJ
c. Weycle = 600 kJ, Qc= 400 kJ
d. η = 75%

User Dennis L
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1 Answer

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Answer:

a) Irreversible, b) Reversible, c) Irreversible, d) Impossible.

Step-by-step explanation:

Maximum theoretical efficiency for a power cycle (
\eta_(r)), no unit, is modelled after the Carnot Cycle, which represents a reversible thermodynamic process:


\eta_(r) = \left(1-(T_(C))/(T_(H)) \right)* 100\,\% (1)

Where:


T_(C) - Temperature of the cold reservoir, in Kelvin.


T_(H) - Temperature of the hot reservoir, in Kelvin.

The maximum theoretical efficiency associated with this power cycle is: (
T_(C) = 400\,K,
T_(H) = 1200\,K)


\eta_(r) = \left(1-(400\,K)/(1200\,K) \right)* 100\,\%


\eta_(r) = 66.667\,\%

In exchange, real efficiency for a power cycle (
\eta), no unit, is defined by this expression:


\eta = \left(1-(Q_(C))/(Q_(H))\right) * 100\,\% = \left((W_(C))/(Q_(H)) \right)* 100\,\% = \left((W_(C))/(Q_(C) + W_(C)) \right)* 100\,\% (2)

Where:


Q_(C) - Heat released to cold reservoir, in kilojoules.


Q_(H) - Heat gained from hot reservoir, in kilojoules.


W_(C) - Power generated within power cycle, in kilojoules.

A power cycle operates irreversibly for
\eta < \eta_(r), reversibily for
\eta = \eta_(r) and it is impossible for
\eta > \eta_(r).

Now we proceed to solve for each case:

a)
Q_(H) = 900\,kJ,
W_(C) = 450\,kJ


\eta = \left((450\,kJ)/(900\,kJ) \right)* 100\,\%


\eta = 50\,\%

Since
\eta < \eta_(r), the power cycle operates irreversibly.

b)
Q_(H) = 900\,kJ,
Q_(C) = 300\,kJ


\eta = \left(1-(300\,kJ)/(900\,kJ) \right)* 100\,\%


\eta = 66.667\,\%

Since
\eta = \eta_(r), the power cycle operates reversibly.

c)
W_(C) = 600\,kJ,
Q_(C) = 400\,kJ


\eta = \left((600\,kJ)/(600\,kJ + 400\,kJ) \right)* 100\,\%


\eta = 60\,\%

Since
\eta < \eta_(r), the power cycle operates irreversibly.

d) Since
\eta > \eta_(r), the power cycle is impossible.

User Zoran Pavlovic
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