Adiabatic process
- This article covers adiabatic processes in thermodynamics. For adiabatic processes in quantum mechanics, see adiabatic process (quantum mechanics). For atmospheric adiabatic processes, see lapse rate.
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The factual accuracy of this article is disputed.
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In thermodynamics, an adiabatic process or an isocaloric process is a thermodynamic process in which no heat is transferred to or from the working fluid. The term "adiabatic" literally means impassable (from Greek ἀ-διὰ-βαῖνειν, not-through-to pass), corresponding here to an absence of heat transfer. For example, an adiabatic boundary is a boundary that is impermeable to heat transfer and the system is said to be adiabatically (or thermally) insulated; an insulated wall approximates an adiabatic boundary. Another example is the adiabatic flame temperature, which is the temperature that would be achieved by a flame in the absence of heat loss to the surroundings. An adiabatic process that is reversible is also called an isentropic process. Additionally, an adiabatic process that is irreversible and extracts no work is in an isenthalpic process, such as viscous drag, progressing towards a nonnegative change in entropy.
One opposite extreme—allowing heat transfer with the surroundings, causing the temperature to remain constant—is known as an isothermal process. Since temperature is thermodynamically conjugate to entropy, the isothermal process is conjugate to the adiabatic process for reversible transformations.
A transformation of a thermodynamic system can be considered adiabatic when it is quick enough that no significant heat is transferred between the system and the outside. At the opposite extreme, a transformation of a thermodynamic system can be considered isothermal if it is slow enough so that the system's temperature remains constant by heat exchange with the outside.
[edit] Adiabatic heating and cooling
Adiabatic heating and cooling are processes that commonly occur from a change in the pressure of a gas. Adiabatic heating occurs when the pressure of a gas is increased. Diesel engines rely on adiabatic heating during their compression stroke to elevate the temperature sufficiently to ignite the fuel. Similarly jet engines rely upon adiabatic heating to create the correct compression of the air to enable fuel to be injected and ignition to then occur.
Adiabatic heating also occurs in the Earth's atmosphere when an air mass descends, for example, in a katabatic wind or Foehn wind flowing downhill.
Adiabatic cooling occurs when the pressure of a substance is decreased as it does work on its surroundings. Adiabatic cooling does not have to involve a fluid. One technique used to reach very low temperatures (thousandths and even millionths of a degree above absolute zero) is adiabatic demagnetisation, where the change in magnetic field on a magnetic material is used to provide adiabatic cooling. Adiabatic cooling also occurs in the Earth's atmosphere with orographic lifting and lee waves, and this can form pileus or lenticular clouds if the air is cooled below the dew point.
Rising magma also undergoes adiabatic cooling before eruption.
Such temperature changes can be quantified using the ideal gas law, or the hydrostatic equation for atmospheric processes.
It should be noted that no process is truly adiabatic. Many processes are close to adiabatic and can be easily approximated by using an adiabatic assumption, but there is always some heat loss. There is no such thing as a perfect insulator.
[edit] Ideal gas (reversible case only)
 For a simple substance, during an adiabatic process in which the volume increases, the internal energy of the working substance must necessarily decrease The mathematical equation for an ideal fluid undergoing a reversible (i.e., no entropy generation) adiabatic process is
- Failed to parse (Missing texvc executable;
please see math/README to configure.): P V^{\gamma} = \operatorname{constant} \qquad
where P is pressure, V is volume, and
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \gamma = {C_{P} \over C_{V}} = \frac{\alpha + 1}{\alpha},
Failed to parse (Missing texvc executable;
please see math/README to configure.): C_{P}
being the specific heat for constant pressure and
Failed to parse (Missing texvc executable;
please see math/README to configure.): C_{V}
being the specific heat for constant volume.
Failed to parse (Missing texvc executable;
please see math/README to configure.): \alpha
comes from the number of degrees of freedom divided by 2 (3/2 for monatomic gas, 5/2 for diatomic gas).
For a monatomic ideal gas, Failed to parse (Missing texvc executable;
please see math/README to configure.): \gamma = 5/3
, and for a diatomic gas (such as nitrogen and oxygen, the main components of air) Failed to parse (Missing texvc executable;
please see math/README to configure.): \gamma = 7/5
. Note that the above formula is only applicable to classical ideal gases and not Bose-Einstein or Fermi gases.
For reversible adiabatic processes, it is also true that
- Failed to parse (Missing texvc executable;
please see math/README to configure.): P^{\gamma-1}T^{-\gamma}= \operatorname{constant}
- Failed to parse (Missing texvc executable;
please see math/README to configure.): VT^\alpha = \operatorname{constant}
where T is an absolute temperature.
This can also be written as
- Failed to parse (Missing texvc executable;
please see math/README to configure.): TV^{\gamma - 1} = \operatorname{constant}
[edit] Derivation of continuous formula
The definition of an adiabatic process is that heat transfer to the system is zero, Failed to parse (Missing texvc executable;
please see math/README to configure.): \delta Q=0
. Then, according to the first law of thermodynamics,
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \text{(1)} \qquad d U + \delta W = \delta Q = 0,
where dU is the change in the internal energy of the system and δW is work done
by the system. Any work (δW) done must be done at the expense of internal energy U, since no heat δQ is being supplied from the surroundings. Pressure-volume work δW done by the system is defined as
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \text{(2)} \qquad \delta W = P \, dV.
However, P does not remain constant during an adiabatic process but
instead changes along with V.
It is desired to know how the values of dP and
dV relate to each other as the adiabatic process proceeds.
For an ideal gas the internal energy is given by
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \text{(3)} \qquad U = \alpha n R T,
where R is the universal gas constant and n is the
number of moles in the system (a constant).
Differentiating Equation (3) and use of the ideal gas law, Failed to parse (Missing texvc executable;
please see math/README to configure.): P V = n R T
, yields
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \text{(4)} \qquad d U = \alpha n R \, dT = \alpha \, d (P V) = \alpha (P \, dV + V \, dP).
Equation (4) is often expressed as Failed to parse (Missing texvc executable;
please see math/README to configure.): d U = n C_{V} \, d T
because Failed to parse (Missing texvc executable;
please see math/README to configure.): C_{V} = \alpha R
.
Now substitute equations (2) and (4) into equation (1) to obtain
- Failed to parse (Missing texvc executable;
please see math/README to configure.): -P \, dV = \alpha P \, dV + \alpha V \, dP,
simplify:
- Failed to parse (Missing texvc executable;
please see math/README to configure.): - (\alpha + 1) P \, dV = \alpha V \, dP,
and divide both sides by PV:
- Failed to parse (Missing texvc executable;
please see math/README to configure.): -(\alpha + 1) {d V \over V} = \alpha {d P \over P}.
After integrating the left and right sides from Failed to parse (Missing texvc executable;
please see math/README to configure.): V_0
to V and from Failed to parse (Missing texvc executable;
please see math/README to configure.): P_0
to P and changing the sides respectively,
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \ln \left( {P \over P_0} \right) = {-{\alpha + 1 \over \alpha}} \ln \left( {V \over V_0} \right).
Exponentiate both sides,
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \left( {P \over P_0} \right) = \left( {V \over V_0} \right)^{-{\alpha + 1 \over \alpha}},
and eliminate the negative sign to obtain
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \left( {P \over P_0} \right) = \left( {V_0 \over V} \right)^{\alpha + 1 \over \alpha}.
Therefore,
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \left( {P \over P_0} \right) \left( {V \over V_0} \right)^{\alpha+1 \over \alpha} = 1
and
- Failed to parse (Missing texvc executable;
please see math/README to configure.): P V^{\alpha+1 \over \alpha} = P_0 V_0^{\alpha+1 \over \alpha} = P V^\gamma = \operatorname{constant}.
[edit] Derivation of discrete formula
The change in internal energy of a system, measured from state 1 to state 2, is equal to
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \text{(1)} \qquad \delta U = \alpha R n_2T_2 - \alpha R n_1T_1 = \alpha R (n_2T_2 - n_1T_1)
At the same time, the work done by the pressure-volume changes as a result from this process, is equal to
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \text{(2)} \qquad \delta W = P_2V_2 - P_1V_1
Since we require the process to be adiabatic, the following equation needs to be true
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \text{(3)} \qquad \delta U + \delta W = 0
Substituting (1) and (2) in (3) leads to
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \alpha R (n_2T_2 - n_1T_1) + (P_2V_2 - P_1V_1) = 0 \qquad \qquad \qquad
or
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \frac {(P_2V_2 - P_1V_1)} {-(n_2T_2 - n_1T_1)} = \alpha R \qquad \qquad \qquad
If it's further assumed that there are no changes in molar quantity (as often in practical cases), the formula is simplified to
this one:
- Failed to parse (Missing texvc executable;
please see math/README to configure.): \frac {(P_2V_2 - P_1V_1)} {-(T_2 - T_1)} = \alpha n R \qquad \qquad \qquad
[edit] Graphing adiabats
An adiabat is a curve of constant entropy on the P-V diagram. Properties of adiabats on a P-V diagram are:
- Every adiabat asymptotically approaches both the V axis and the P axis (just like isotherms).
- Each adiabat intersects each isotherm exactly once.
- An adiabat looks similar to an isotherm, except that during an expansion, an adiabat loses more pressure than an isotherm, so it has a steeper inclination (more vertical).
- If isotherms are concave towards the "north-east" direction (45 °), then adiabats are concave towards the "east north-east" (31 °).
- If adiabats and isotherms are graphed severally at regular changes of entropy and temperature, respectively (like altitude on a contour map), then as the eye moves towards the axes (towards the south-west), it sees the density of isotherms stay constant, but it sees the density of adiabats grow. The exception is very near absolute zero, where the density of adiabats drops sharply and they become rare (see Nernst's theorem).
The following diagram is a P-V diagram with a superposition of adiabats and isotherms:
The isotherms are the red curves and the adiabats are the black curves. The adiabats are isentropic. Volume is the horizontal axis and pressure is the vertical axis.
[edit] See also
[edit] References
[edit] External links
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