When a polyatomic gas undergoes an adiabatic process, its temperature and volume are related by the equation `TV^(n)` =constant, the value of `n` will be

When a polyatomic gas undergoes an adiabatic process, its tempertaure and volume are related by the equation TV^(n) = constant, the value of n will be

When a polyatomic gas undergoes an adiabatic process, its temperature and volume are related by the equation TI^(-1) =constant, the value of n will be

A monoatomic gas undergoes adiabatic process. Its volume and temperature are related as TV^(P) = constant. The value of p will be {:((1),1.33,(2),1.67),((3),0.67,(4),0.33):}

The ideal gas equation for an adiabatic process is

For a monoatomic ideal gas undergoing an adiabatic change, the relation between temperature and volume TV^(x) = constant, where x is

A gas undergoes a process in which its pressure P and volume V are related as VP^(n) = constant. The bulk modulus of the gas in the process 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 process can be represented by the equation TV^(n) = constant, where the value of n is