The efficiency of a heat engine is `1//6`Its efficiency double when the temperature of sink decrease by `62^(@)C` its efficiency doubles.Then,What is the temperature of source?

An engine has an efficiency of 0.25 when temperature of sink is reduced by 58^(@)C , If its efficiency is doubled, then the temperature of the source is

An engine has an efficiency of 1/6 . When the temperature of sink is reduced by 62^(@)C , its efficiency is doubled. Temperature of the source is

An engine has an efficiency of 1/6 . When the temperature of sink is reduced by 62^(@)C , its efficiency is doubled. Temperature of the source is

A cannot engine has efficiency (1)/(6) . If temperature of sink is decreased by 62^(@)C then its efficiency becomes (1)/(3) then the temperature of source and sink:

A Carnot engine has an efficiency of 20% . When temperature of sink is reduced by 80°C its efficiency is doubled. The temperature of source is

A Carnot engine has an efficiency of 1//6 . When the temperature of the sink is reduced by 62^(@)C , its efficiency is doubled. The temperature of the source and the sink are, respectively.

A reversible engine converts one-sixth of heat input into work. When the temperature of sink is reduced by 62^(@)C, its efficiency is doubled. Find the temperature of the source and the sink,

The efficiency of a camot's engine is 2/5. When the temperature of the source is increased by 20 ^(@)C then its efficiency is found to increase to 9/20. Calculate the temperature of source and sink.

The efficiency of Carnot's enegine is 50% . The temperature of its sink is 7^(@)C . To increase its efficiency to 70% . What is the increase in temperature of the source?

The efficiency of a cannot's engine is 20%. When the temperature of the source is increased by 25^(@)C, then its efficiency is found to increase to 25%. Calculate the temperature of source and sink.