If for an ideal gas its volume is compressed by a factor of 3, and the gas has cooled down as a result, by what factor is the pressure changed?
1 Answer
I'm getting that it's more than three times.
First of all, here are our assumptions:
- Adiabatic means heat flow is
q = 0 in and out of the container. That means any temperature changes are only due to the compression work. - This is a reversible process by implication (because we aren't given the external pressure applied to the piston).
- That means it is insulated and closed. We can also say it is rigid.
- We have a monatomic ideal gas, so we can use
PV = nRT . It also means that in the context of the equipartition theorem (K = N/2nRT ), its kinetic energy is presumably all in linear motion (no rotation, no vibration, no electronic excitations).
We are told that
w_"rev" = -int_(V_1)^(V_2)PdV ,
which is the cause for
Also, by compressing the gas, we conceptually have that the particles move closer together and the gas cools down; since
- the majority of the kinetic energy for a monatomic ideal gas comes from its translational/linear motion, and
- we've restricted its linear motion,
it must decrease in temperature. Mathematically:
Delta(PV) = nRDeltaT Since
Vdarr , if we hadDeltaP = 0 , then
PDeltaV + cancel(VDeltaP)^(0) = nRDeltaT ,and
Tdarr .
If we did have
P_1V_1 = P_2V_2 , andP_1/P_2 prop V_2/V_1 ,i.e. dividing the volume by three means tripling the pressure.
In comparison, since the heat flow cannot escape the adiabatic container, the additional temperature change must have gone into compression in an adiabatic enclosure. So, the more the temperature decreases , the more the volume decreases, and the more the pressure must increase to balance out the additional volume decrease.
Or, mathematically:
V_1/V_2 prop T_1/T_2 andP_2/P_1 prop V_1/V_2 meaning that as
Tdarr ,Vdarr andPuarr relative to the case whereDeltaT = 0 (where the new pressure would have been three times as large).
Therefore, since the pressure would have tripled if
