AKA, the spherical horse in a vacuum.
The energy is not converted into cooling, but into flow of some liquid, which happen to vaporise at the right time. The energy is flowing into the fridge at all times and flows out of the heat exchanger at all times, the heat taken is not shipped somewhere, but is dissipated into the machine, converted into various kinds of energy, etc, and only smal part of it is radiated at the proper place.
Also, does the 2nd heuristic of thermodynamics not apply to a working machine?
It's not forcing the heat to lower, it's the same flow of heat from hot to cold.
I fail to see what is increasing there, only re-distribution of heat/energy.
A fridge works by compressing a gas to the point where it turns into a liquid. That will cause the liquid to heat up, because it has to give off evaporation heat. To compress it to this point, you'll need at least as much work as the heat released from the liquid. The liquid then heats up and is let to cool down to room temperature. Then it's pumped still under pressure into the fridge where it is let to expand. Expanding will cause the liquid to evaporate, which needs evaporation heat. That means the liquid will cool down and then draw heat from the stuff inside the fridge.
Ok, let's imagine a fridge that's perfectly insulated, cooling down a mass of air. Flowing through the cooling pipes is something like freon.
Here is the proof that all the intermediate steps don't cause any change of entropy, only the initial and end state:
I'm gonna be using O as mass flow of freon and q as evaporation heat.
First, we compress freon:
A/t = P = Q/t = O * q
Compressing freon will heat it up:
O * q = O * c * Delta-T
Delta-T = q / c
Because q and c are positive numbers, Delta-T is positive, which means increase of temperature.
The change of entropy:
Delta-S/t = O * c * Ln((T+Delta-T)/T)
Since (T+Delta-T)/T is larger then one, the natural log is greater then one, which means that change of entropy per unit of time is positive.
Then we let the liquid freon cool off:
Delta-S/t = O*c*Ln(T/(T+Delta-T)) and now, T/(T+Delta-T) is negative.
These two changes are exactly the same, because the two logarithms are exactly opposite:
Ln((T+Delta-T)/T) = -Ln(T/(T+Delta-T))
Ln(T+Delta-T) - Ln(T) = -(Ln(T) - Ln(T+Delta-T))
Ln(T+Delta-T) - Ln(T) = Ln(T+Delta-T) - Ln(T)
^^ so you see, when first compressing and cooling down freon, that causes no change of entropy. Same goes with the second cycle of cooling it down and heating it up once in the fridge. Therefore, if all the states in between do not cause a change of entropy, the change is only dependent on the initial and end state.
---------- Post added at 08:06 PM ---------- Previous post was at 07:53 PM ----------
Delta-S = m*c*Ln[T1/T]
Delta-S = 845 J/K (again, positive)
I guess nobody noticed the error here...
It's supposed to be
Delta-S = m*c*Ln[T/T1]
Delta-S = -845 J/K, which makes it negative, however, it doesn't change the end result. The entropy is still positive.
The change from heating up the air was 963 J/K and the change from cooling water is -845. The only difference is that it brings the result to 118 J/K, instead of 1808.
But the point stands, the entropy of the system has increased.
