The temperatures `T_(1) and T(2)` of two heat reservoirs in an ideal carnot engine are `1500^(@)C and 500^(@)C`. Which of these (a) increasing `T_(1) by 100^(@)C` or (b) decreasing `T_(2) by 100^(@)C` would result in greater improvement of the efficiency of the engine?

The temperatures `T_(1) and T(2)` of two heat reservoirs in an ideal c

1.	The temperatures `T_(1) and T(2)` of two heat reservoirs in an ideal carnot engine are `1500^(@)C and 500^(@)C`. Which of these (a) increasing `T_(1) by 100^(@)C` or (b) decreasing `T_(2) by 100^(@)C` would result in greater improvement of the efficiency of the engine?
Answer» Here, `T_(1)= 1500^(@)C= (1500+273)K` `= 1773K` `T_(2)= 500^(@)C= 500+273= 773K` `eta = 1 -(T_(2))/(T_(1))= 1 -(773)/(1773)= (1000)/(1773)` (a) Increasing `T_(1) by 100^(@)C` `T_(1)= 1600+273= 1873K, T_(2)=773K` `eta_(1)= 1 -(T_(2))/(T_(1))= 1 -(773)/(1873)= (1100)/(1873)` (b) Decreasing `T_(2) by 100^(@)C` `T_(1)= 1500+273= 1773K` `T_(2)=(500-100)+273= 673K` `eta_(2)= 1 -(T_(2))/(T_(1))= 1 -(673)/(1773)= (1100)/(1773)` Clearly, `eta_(2) gt eta_(1)`. Therefore, (b) is better choice.

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The temperatures `T_(1) and T(2)` of two heat reservoirs in an ideal carnot engine are `1500^(@)C and 500^(@)C`. Which of these (a) increasing `T_(1) by 100^(@)C` or (b) decreasing `T_(2) by 100^(@)C` would result in greater improvement of the efficiency of the engine?

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