One of the most efficient engines ever developed operated between 2100 K and 700 K. Its actual efficiency is 40%. If its efficiency is N/5 fraction of maximum possible efficiency, then N is equal to

The efficiency of a carnot cycle is 1/6. If on reducing the temperature of the sink by 65^@C , the efficiency becomes 1/3. If final temperature of the sink is N times 65K then .N. is equal to

A carnot engine operating between temperatures T_1 and T_2 has efficiency 1/6 When T, is lowered by 62 K, its efficiency increases to 1/3 . Then T_1 and T_2 are, respectively:

When the absolute temperature of the source of a Carnot heat engine is increased by 25%, its efficiency increases by 80%. The new efficiency of the engine is

Efficiency of a Carnot engine is 50% when temperature of outlet is 500 K. In order to increase efficiency up to 60% keeping temperature of intake the same what is temperature of outlet

Two carnot engines A and B are operated in series. The first one A receives heat at 8 K and rejects to a reservoir at temperature TK. The second engine B receives the heat rejected by the first engine and in turn rejects to a heat reservoir at 2K. Calculate the temperature TK when the efficiencies of the two engines are equal.