An ideal diatomic gas is expanded so that the amount of heat transferred to the gas is equal to the decrease in its internal energy.
The process can be represented by the equation `TV^(n) =` constant, where the value of `n` is

An ideal diatomic gas is expanded so that the amount of heat transferred to the gas is equal to the decrease in its internal energy. If in the process, the initial temperature of the gas be T_(0) and the final volume by 32 times the initial volume, the work done ( in Joules ) by the gas during the process will be

An ideal diatomic gas is expanded so that the amount of heat transferred to the gas is equal to the decrease in its internal energy. If in the above process, the initial temperature of the gas be T_(0) and the final volume by 32 times the initial volume, the work done ( in joules ) by the gas during the process will be

An ideal diatomic gas is expanded so that the amount of heat transferred to the gas is equal to the decrease in its internal energy. The molar specific heat of the gas in this process is given by C whose value is

An ideal diatomic gas is expanded so that the amount of heat transferred to the gas is equal to the decrease in its internal energy. The molar specific heat of the gas in this process is given by C whose value is

An ideal gas of adiabatic exponent gamma is expanded so that the amount of heat transferred to the gas is equal to the decrease of its internal energy. Then, the equation of the process in terms of the variables T and V is

An ideal gas of adiabatic exponent gamma is expanded so that the amount of heat transferred to the gas is equal to the decrease of its internal energy. Then, the equation of the process in terms of the variables T and V is

One mole of an ideal gas, whose adiabatic exponent equal to gamma , is expanded so that the amount of heat transferred to the gas is equal to the decrease in internal energy. Find the equation of the process in the variables T, V

A ideal gas whose adiabatic exponent equals gamma is expanded so that the amount of heat transferred to the gas is equal to twice of decrease of its internal energy. The equation of the process is TV^((gamma-1)/k)= constant (where T and V are absolute temeprature and volume respectively.

A ideal gas whose adiabatic exponent equals gamma is expanded so that the amount of heat transferred to the gas is equal to twice of decrease of its internal energy. The equation of the process is TV^((gamma-1)/k)= constant (where T and V are absolute temeprature and volume respectively.