# Carnot Cycle

(Difference between revisions)
 Revision as of 19:11, 25 July 2010 (view source) (Created page with 'The Carnot cycle is a particular thermodynamic cycle proposed by Nicolas Léonard Sadi Carnot in 1824 and expanded by Benoit Paul Émile Clapeyron in the 1830s and 40s. It is th…')← Older edit Current revision as of 23:01, 8 July 2011 (view source) (9 intermediate revisions not shown) Line 19: Line 19: |} |} + + ==Properties and significance== + + ===The temperature-entropy diagram=== + + [[Image:A generalized thermodynamic cycle.jpg|300px|thumb|right|A generalized thermodynamic cycle taking place between a hot reservoir at temperature TH and a cold reservoir at temperature TC. By the second law of thermodynamics, the cycle cannot extend outside the temperature band from TC to TH. The area in red QC is the amount of energy exchanged between the system and the cold reservoir. The area in white W is the amount of work energy exchanged by the system with its surroundings. The amount of heat exchanged with the hot reservoir is the sum of the two. If the system is behaving as an engine, the process moves clockwise around the loop, and moves counter-clockwise if it is behaving as a refrigerator. The efficiency of the cycle is the ratio of the white area (work) divided by the sum of the white and red areas (total heat).]] + + The behaviour of a Carnot engine or refrigerator is best understood by using a temperature-entropy (TS) diagram, in which the thermodynamic state is specified by a point on a graph with entropy  (S) as the horizontal axis and temperature (T) as the vertical axis. For a simple system with a fixed number of particles, any point on the graph will represent a particular state of the system. A thermodynamic process will consist of a curve connecting an initial state (A) and a final state (B). The area under the curve will be: + + :$Q=\int_A^B T\,dS + \quad\quad(1)$ + + which is the amount of thermal energy transferred in the process. If the process moves to greater entropy, the area under the curve will be the amount of heat absorbed by the system in that process. If the process moves towards lesser entropy, it will be the amount of heat removed. For any cyclic process, there will be an upper portion of the cycle and a lower portion. For a clockwise cycle, the area under the upper portion will be the thermal energy absorbed during the cycle, while the area under the lower portion will be the thermal energy removed during the cycle. The area inside the cycle will then be the difference between the two, but since the internal energy of the system must have returned to its initial value, this difference must be the amount of work done by the system over the cycle. Referring to figure 2, mathematically, for a reversible process we may write the amount of work done over a cyclic process as: + + :$W = \oint PdV = \oint (dQ-dU)= \oint (TdS-dU) + \quad\quad\quad\quad(2)$ + + Since dU is an exact differential, its integral over any closed loop is zero and it follows that the area inside the loop on a T-S diagram is equal to the total work performed if the loop is traversed in a clockwise direction, and is equal to the total work done on the system as the loop is traversed in a counterclockwise direction. + + [[Image:A Carnot cycle taking place between a hot reservoir.jpg |300px|thumb|right|A Carnot cycle taking place between a hot reservoir at temperature ''T''H and a cold reservoir at temperature ''T''C.]] + + ===The Carnot cycle=== + + Evaluation of the above integral is particularly simple for the Carnot cycle. The amount of energy transferred as work is + + :    $W = \oint PdV = (T_H-T_C)(S_B-S_A)$ + + The total amount of thermal energy transferred between the hot reservoir and the system will be + + :    $Q_H=T_H(S_B-S_A)\,$ + + and the total amount of thermal energy transferred between the system and the cold reservoir will be + + :    $Q_C=T_C(S_B-S_A)\,$ + + The efficiency $\eta$ is defined to be: + + :$\eta=\frac{W}{Q_H}=1-\frac{T_C}{T_H} + \quad\quad\quad\quad\quad\quad\quad\quad\quad(3)$ + where + : $W$ is the work done by the system (energy exiting the system as work), + : $Q_H$ is the heat put into the system (heat energy entering the system), + : $T_C$ is the absolute temperature of the cold reservoir, and + : $T_H$ is the absolute temperature of the hot reservoir. + : $S_B$ is the maximum system entropy + : $S_A$ is the minimum system entropy + This efficiency makes sense for a heat engine, since it is the fraction of the heat energy extracted from the hot reservoir and converted to mechanical work. A Rankine cycle is usually the practical approximation. + + ===Carnot's theorem=== + + It can be seen from the above diagram, that for any cycle operating between temperatures $T_H$ and $T_C$, none can exceed the efficiency of a Carnot cycle. + + [[Image:A real engine.jpg|500px|thumb|right|A real engine (left) compared to the Carnot cycle (right). The entropy of a real material changes with temperature. This change is indicated by the curve on a T-S diagram. For this figure, the curve indicates a vapor-liquid equilibrium (''See Rankine cycle''). Irreversible systems and losses of heat (for example, due to friction) prevent the ideal from taking place at every step.]] + + '''Carnot's theorem''' is a formal statement of this fact: ''No engine operating between two heat reservoirs can be more efficient than a Carnot engine operating between those same reservoirs.'' Thus, Equation 3 gives the maximum efficiency possible for any engine using the corresponding temperatures.  A corollary to Carnot's theorem states that: ''All reversible engines operating between the same heat reservoirs are equally efficient.''  Rearranging the right side of the equation gives what may be a more easily understood form of the equation.  Namely that the theoretical maximum efficiency of a heat engine equals the difference in temperature between the hot and cold reservoir divided by the absolute temperature of the hot reservoir.  To find the absolute temperature in kelvins, add 273.15 degrees to the Celsius temperature.  Looking at this formula an interesting fact becomes apparent.  Lowering the temperature of the cold reservoir will have more effect on the ceiling efficiency of a heat engine than raising the temperature of the hot reservoir by the same amount.  In the real world, this may be difficult to achieve since the cold reservoir is often an existing ambient temperature. + + In other words, maximum efficiency is achieved if and only if no new entropy is created in the cycle. Otherwise, since entropy is a state function, the required dumping of heat into the environment to dispose of excess entropy leads to a reduction in efficiency. So Equation 3 gives the efficiency of any reversible heat engine. + + ===Efficiency of real heat engines=== + + Carnot realized that in reality it is not possible to build a thermodynamically reversible engine, so real heat engines are less efficient than indicated by Equation 3.  Nevertheless, Equation 3 is extremely useful for determining the maximum efficiency that could ever be expected for a given set of thermal reservoirs. + + Although '''Carnot's cycle''' is an idealisation, the expression + of Carnot efficiency is still useful. Consider the average temperatures, + + :    $\langle T_H\rangle = \frac{1}{\Delta S} \int_{Q_{in}} TdS$ + + :    $\langle T_C\rangle = \frac{1}{\Delta S} \int_{Q_{out}} TdS$ + + at which heat is input and output, respectively.  Replace ''TH'' and ''TC'' in Equation (3) by <''TH''> and <''TC''> respectively. + + For the Carnot cycle, or its equivalent, <''TH''> is the highest temperature available and <''TC''> the lowest. For other less efficient cycles, <''TH''> will be lower than ''TH'' , and <''TC''> will be higher than ''TC''. This can help illustrate, for example, why a reheater or a regenerator can improve thermal efficiency. + + ==References== + *Carnot, Sadi (1824). Réflexions sur la puissance motrice du feu et sur les machines propres à développer cette puissance. Paris: Bachelier. http://books.google.com/books?id=YcY9AAAAMAAJ. + *Carnot, Sadi; Thurston, Robert Henry (editor and translator) (1890). Reflections on the Motive Power of Heat and on Machines Fitted to Develop That Power. New York: J. Wiley & Sons.  (full text of 1897 ed.)) + *Feynman, Richard P.; Leighton, Robert B.; Sands, Matthew (1963). The Feynman Lectures on Physics. Addison-Wesley Publishing Company. pp. 44–4f. ISBN 0201021161. + *Halliday, David; Resnick, Robert (1978). Physics (3rd ed. ed.). John Wiley & Sons. pp. 541–548. ISBN 0471024562. + *Kittel, Charles; Kroemer, Herbert (1980). Thermal Physics (2nd ed. ed.). W. H. Freeman Company. ISBN 0-7167-1088-9. + * Kostic, M. (2008). [http://www.kostic.niu.edu/energy/WSEAS-EEESD08_588-357Kostic-Sadi%20Carnot%E2%80%99s%20Ingenious%20Reasoning.pdf Sadi Carnot’s Ingenious Reasoning of Ideal Heat-Engine Reversible Cycles], Proceedings of the 4th IASME/WSEAS International Conference on ENERGY, ENVIRONMENT, ECOSYSTEMS and SUSTAINABLE DEVELOPMENT (EEESD'08), Algarve, Portugal, June 11-13, 2008. In NEW ASPECTS OF ENERGY, ENVIRONMENT, ECOSYSTEMS and SUSTAINABLE DEVELOPMENT (Editors: T. Panagopoulos, T. Noronha Vaz , M. D. Carlos Antunes), WSEAS Press, 159-166. ISBN 978-960-6766-71-8. ([http://www.kostic.niu.edu/energy/WSEAS-EEESD08_588-357Kostic-Sadi%20Carnot%E2%80%99s%20Ingenious%20Reasoning.pdf full text]) + *http://en.wikipedia.org/wiki/Carnot_cycle - wikipedia.com + + ==External Links== + + *[http://hyperphysics.phy-astr.gsu.edu/hbase/thermo/carnot.html Hyperphysics] article on the Carnot cycle. + *[http://galileoandeinstein.physics.virginia.edu/more_stuff/flashlets/carnot.htm Interactive Java applet] showing behavior of a Carnot engine. + + + This entry is from Wikipedia, the leading user-contributed encyclopedia. It may not have been reviewed by professional editors (see [http://en.wikipedia.org/wiki/Wikipedia:General_disclaimer full disclaimer]).

## Current revision as of 23:01, 8 July 2011

The Carnot cycle is a particular thermodynamic cycle proposed by Nicolas Léonard Sadi Carnot in 1824 and expanded by Benoit Paul Émile Clapeyron in the 1830s and 40s. It is the most efficient existing cycle capable of converting a given amount of thermal energy into work or, conversely, creating a temperature difference (e.g. for refrigeration) by doing a given amount of work.

Every thermodynamic system exists in a particular thermodynamic state. When a system is taken through a series of different states and finally returned to its initial state, a thermodynamic cycle is said to have occurred. In the process of going through this cycle, the system may perform work on its surroundings, thereby acting as a heat engine. A system undergoing a Carnot cycle is called a Carnot heat engine, although such a 'perfect' engine is only theoretical and cannot be built in practice.

## The Carnot Cycle

The Carnot cycle when acting as a heat engine consists of the following steps:

1. Reversible isothermal expansion of the gas at the "hot" temperature, TH (isothermal heat addition). During this step (A to B on Figure 1, 1 to 2 in Figure 2) the expanding gas makes the piston work on the surroundings. The gas expansion is propelled by absorption of quantity Q1 of heat from the high temperature reservoir.
2. Isentropic (reversible adiabatic) expansion of the gas (isentropic work output). For this step (B to C on Figure 1, 2 to 3 in Figure 2) the piston and cylinder are assumed to be thermally insulated, thus they neither gain nor lose heat. The gas continues to expand, working on the surroundings. The gas expansion causes it to cool to the "cold" temperature, TC.
3. Reversible isothermal compression of the gas at the "cold" temperature, TC. (isothermal heat rejection) (C to D on Figure 1, 3 to 4 on Figure 2) Now the surroundings do work on the gas, causing quantity Q2 of heat to flow out of the gas to the low temperature reservoir.
4. Isentropic compression of the gas (isentropic work input). (D to A on Figure 1, 4 to 1 in Figure 2) Once again the piston and cylinder are assumed to be thermally insulated. During this step, the surroundings do work on the gas, compressing it and causing the temperature to rise to TH. At this point the gas is in the same state as at the start of step 1.
 Figure 1: A Carnot cycle acting as a heat engine, illustrated on a temperature-entropy diagram. The cycle takes place between a hot reservoir at temperature TH and a cold reservoir at temperature TC. The vertical axis is temperature, the horizontal axis is entropy. Figure 2: A Carnot cycle acting as a heat engine, illustrated on a pressure-volume diagram to illustrate the work done.

## Properties and significance

### The temperature-entropy diagram

A generalized thermodynamic cycle taking place between a hot reservoir at temperature TH and a cold reservoir at temperature TC. By the second law of thermodynamics, the cycle cannot extend outside the temperature band from TC to TH. The area in red QC is the amount of energy exchanged between the system and the cold reservoir. The area in white W is the amount of work energy exchanged by the system with its surroundings. The amount of heat exchanged with the hot reservoir is the sum of the two. If the system is behaving as an engine, the process moves clockwise around the loop, and moves counter-clockwise if it is behaving as a refrigerator. The efficiency of the cycle is the ratio of the white area (work) divided by the sum of the white and red areas (total heat).

The behaviour of a Carnot engine or refrigerator is best understood by using a temperature-entropy (TS) diagram, in which the thermodynamic state is specified by a point on a graph with entropy (S) as the horizontal axis and temperature (T) as the vertical axis. For a simple system with a fixed number of particles, any point on the graph will represent a particular state of the system. A thermodynamic process will consist of a curve connecting an initial state (A) and a final state (B). The area under the curve will be:

$Q=\int_A^B T\,dS \quad\quad(1)$

which is the amount of thermal energy transferred in the process. If the process moves to greater entropy, the area under the curve will be the amount of heat absorbed by the system in that process. If the process moves towards lesser entropy, it will be the amount of heat removed. For any cyclic process, there will be an upper portion of the cycle and a lower portion. For a clockwise cycle, the area under the upper portion will be the thermal energy absorbed during the cycle, while the area under the lower portion will be the thermal energy removed during the cycle. The area inside the cycle will then be the difference between the two, but since the internal energy of the system must have returned to its initial value, this difference must be the amount of work done by the system over the cycle. Referring to figure 2, mathematically, for a reversible process we may write the amount of work done over a cyclic process as:

$W = \oint PdV = \oint (dQ-dU)= \oint (TdS-dU) \quad\quad\quad\quad(2)$

Since dU is an exact differential, its integral over any closed loop is zero and it follows that the area inside the loop on a T-S diagram is equal to the total work performed if the loop is traversed in a clockwise direction, and is equal to the total work done on the system as the loop is traversed in a counterclockwise direction.

A Carnot cycle taking place between a hot reservoir at temperature TH and a cold reservoir at temperature TC.

### The Carnot cycle

Evaluation of the above integral is particularly simple for the Carnot cycle. The amount of energy transferred as work is

$W = \oint PdV = (T_H-T_C)(S_B-S_A)$

The total amount of thermal energy transferred between the hot reservoir and the system will be

$Q_H=T_H(S_B-S_A)\,$

and the total amount of thermal energy transferred between the system and the cold reservoir will be

$Q_C=T_C(S_B-S_A)\,$

The efficiency η is defined to be:

$\eta=\frac{W}{Q_H}=1-\frac{T_C}{T_H} \quad\quad\quad\quad\quad\quad\quad\quad\quad(3)$

where

W is the work done by the system (energy exiting the system as work),
QH is the heat put into the system (heat energy entering the system),
TC is the absolute temperature of the cold reservoir, and
TH is the absolute temperature of the hot reservoir.
SB is the maximum system entropy
SA is the minimum system entropy

This efficiency makes sense for a heat engine, since it is the fraction of the heat energy extracted from the hot reservoir and converted to mechanical work. A Rankine cycle is usually the practical approximation.

### Carnot's theorem

It can be seen from the above diagram, that for any cycle operating between temperatures TH and TC, none can exceed the efficiency of a Carnot cycle.

A real engine (left) compared to the Carnot cycle (right). The entropy of a real material changes with temperature. This change is indicated by the curve on a T-S diagram. For this figure, the curve indicates a vapor-liquid equilibrium (See Rankine cycle). Irreversible systems and losses of heat (for example, due to friction) prevent the ideal from taking place at every step.

Carnot's theorem is a formal statement of this fact: No engine operating between two heat reservoirs can be more efficient than a Carnot engine operating between those same reservoirs. Thus, Equation 3 gives the maximum efficiency possible for any engine using the corresponding temperatures. A corollary to Carnot's theorem states that: All reversible engines operating between the same heat reservoirs are equally efficient. Rearranging the right side of the equation gives what may be a more easily understood form of the equation. Namely that the theoretical maximum efficiency of a heat engine equals the difference in temperature between the hot and cold reservoir divided by the absolute temperature of the hot reservoir. To find the absolute temperature in kelvins, add 273.15 degrees to the Celsius temperature. Looking at this formula an interesting fact becomes apparent. Lowering the temperature of the cold reservoir will have more effect on the ceiling efficiency of a heat engine than raising the temperature of the hot reservoir by the same amount. In the real world, this may be difficult to achieve since the cold reservoir is often an existing ambient temperature.

In other words, maximum efficiency is achieved if and only if no new entropy is created in the cycle. Otherwise, since entropy is a state function, the required dumping of heat into the environment to dispose of excess entropy leads to a reduction in efficiency. So Equation 3 gives the efficiency of any reversible heat engine.

### Efficiency of real heat engines

Carnot realized that in reality it is not possible to build a thermodynamically reversible engine, so real heat engines are less efficient than indicated by Equation 3. Nevertheless, Equation 3 is extremely useful for determining the maximum efficiency that could ever be expected for a given set of thermal reservoirs.

Although Carnot's cycle is an idealisation, the expression of Carnot efficiency is still useful. Consider the average temperatures,

$\langle T_H\rangle = \frac{1}{\Delta S} \int_{Q_{in}} TdS$
$\langle T_C\rangle = \frac{1}{\Delta S} \int_{Q_{out}} TdS$

at which heat is input and output, respectively. Replace TH and TC in Equation (3) by <TH> and <TC> respectively.

For the Carnot cycle, or its equivalent, <TH> is the highest temperature available and <TC> the lowest. For other less efficient cycles, <TH> will be lower than TH , and <TC> will be higher than TC. This can help illustrate, for example, why a reheater or a regenerator can improve thermal efficiency.

## References

• Carnot, Sadi (1824). Réflexions sur la puissance motrice du feu et sur les machines propres à développer cette puissance. Paris: Bachelier. http://books.google.com/books?id=YcY9AAAAMAAJ.
• Carnot, Sadi; Thurston, Robert Henry (editor and translator) (1890). Reflections on the Motive Power of Heat and on Machines Fitted to Develop That Power. New York: J. Wiley & Sons. (full text of 1897 ed.))
• Feynman, Richard P.; Leighton, Robert B.; Sands, Matthew (1963). The Feynman Lectures on Physics. Addison-Wesley Publishing Company. pp. 44–4f. ISBN 0201021161.
• Halliday, David; Resnick, Robert (1978). Physics (3rd ed. ed.). John Wiley & Sons. pp. 541–548. ISBN 0471024562.
• Kittel, Charles; Kroemer, Herbert (1980). Thermal Physics (2nd ed. ed.). W. H. Freeman Company. ISBN 0-7167-1088-9.
• Kostic, M. (2008). Sadi Carnot’s Ingenious Reasoning of Ideal Heat-Engine Reversible Cycles, Proceedings of the 4th IASME/WSEAS International Conference on ENERGY, ENVIRONMENT, ECOSYSTEMS and SUSTAINABLE DEVELOPMENT (EEESD'08), Algarve, Portugal, June 11-13, 2008. In NEW ASPECTS OF ENERGY, ENVIRONMENT, ECOSYSTEMS and SUSTAINABLE DEVELOPMENT (Editors: T. Panagopoulos, T. Noronha Vaz , M. D. Carlos Antunes), WSEAS Press, 159-166. ISBN 978-960-6766-71-8. (full text)
• http://en.wikipedia.org/wiki/Carnot_cycle - wikipedia.com