mrspeedybob said:
It does not, therefore it does not work. I'm trying to understand why it does not work.It shouldn't matter what the efficiency of the thermocouples is. The waste heat gets sunk into the intake air which eventually becomes the exhaust air. The idea is that the heat gets trapped, going in circles. A little bit gets turned into electricity each time around but it shouldn't matter how many times around it goes.
I had forgotten about kinetic energy of the air, thanks for bringing that up.
My input is the chemical energy of the fuel, although any heat source would work.
My outputs are the kinetic energy of the exhaust. Since kinetic energy is proportional to V2 this can be reduced by running the engine at a slower speed.
A second output is the heat energy left in the exhaust after the last thermocouple. This can be brought arbitrarily close to zero by making the intake and exhaust tubes very long, using a very large number of thermocouples, and running the engine very slowly.
The third output is the electricity generated by the thermocouples.
That's all I can think of. Minimizing the first two seems to me to be an engineering issue. I don't see any principal that prevents them from getting arbitrarily close to zero.
If my input air is 300 kelvin and the combination of conduction through the thermocouples and energy from my fuel raises it to 900 kelvin then, according to the wikipedia quote, my maximum efficiency should be 600/900, or about 67%. I don't understand where the other 33% is going?
Most of the thermocouples aren't at the exhaust end. Most of the thermocouples are on the hot end of the tube. The temperature on the hot end of the tube is much higher than the ambient temperature seen at the exhaust.
The thermocouples at the beginning of the series aren't 100% efficient. This is because there is a finite, maybe large, difference between the temperatures at both ends of the thermocouple. So they would make a large amount of entropy.
Thermocouples are irreversible engines. They make entropy. The bigger the difference in temperature at the two reservoirs, the faster they make entropy. So the thermocouples at the beginning of the series (the hot end) would be extremely inefficient.
The efficiency of a thermocouple is still limited by the Carnot formula. Therefore, the thermocouples at the exhaust end will be highly inefficient for a different reason. They don't make entropy, but they still have to move the entropy from hot to cold. The temperature difference is small at the exhaust end. So they will still be inefficient.
Thermocouples are not 100% efficient. Generally, a good thermocouple runs at about 30% of the Carnot efficiency. Since the laws of thermodynamics are "local", the theromocouples can't respond directly to the exhaust temperature. The relevant temperatures for each thermocouple is inside the tube in the immediate area and the temperature outside the tube.
Even if you replaced each thermocouple by a Carnot engine, the efficiency of the total series will be less than 100%. The efficiency of the entire series would have to be less than the efficiency of the first Carnot cycle in the series.
So you are making too errors here.
1) The efficiency of a thermocouple does not exceed the efficiency of a Carnot engine.
2) Thermodynamics is local, not global.
Here is a link to an article on thermocouples.
http://en.wikipedia.org/wiki/Thermoelectric_cooling
“Thermoelectric junctions are generally only around 5–10% as efficient as the ideal refrigerator (Carnot cycle), compared with 40–60% achieved by conventional compression cycle systems (reverse Rankine systems using compression/expansion). Due to the relatively low efficiency, thermoelectric cooling is generally only used in environments where the solid state nature (no moving parts, maintenance-free, compact size) outweighs pure efficiency.”
