Answer:
The final temperature is
and the maximum amount of workdone is .
Explanation:
Assume that is the reservior having temperature and heat capicity and is the reservior having temperature and heat capicity .
The work will be extracted till that both the reservior reach the thermal equilibrium. Let the final temperature of both the reservior is .
Let total heat is extracted by the heat engine from the reservior and its temperature decreases from to and heat is rejected by the heat engine to the reservior and its temperature decreases from to .
So, The maximum amount of work done,
Now, as the heat engine is reversible, so change is entropy for the universe is 0, which means sum of change in entropy for the ststem as well as surrounding is 0.
As shown in figure, the system is the reversible engine, so, change is entropy for the system is 0. Hence, change in entropy for the the surrounding is 0.
As temperature of is changing fron to , so, change in entropy of surrounding due to transfer of is .
Similarly, change in entropy of surrounding due to transfer of is .
As the net change in entropy of the surrounding is 0.
[taking anti-log both the sides]
This is the required final temperature.
Now, from equarion (i), the maximum amount of work done is
As
From equation ,
This is the required maximum workdone.