The relation between internal energy `U`, pressure `P` and volume `V` of a gas in an adiabatic process is
`U = a + bPV` where a and b are constant . What is the effective value of adiabatic constant Y.

The relation between internal energy U , pressure P and volume V of a gas in an adiabatic process is U = a + bPV where a and b are constants. What is the effective value of adiabatic constant gamma ?

The relation between internal energy U, pressure p and volume V of a gas in an adiabatic process is U=2a+bpV where a and b are constants. What is the effective value of adiabatic constant gamma ?

The relation between internal energy U, pressure P and volume V of a gas in an adiabatic process is U=a+bPV where a and b are positive constants. What is the value of gamma ?

The relation between internal energy U, pressure p and volume V of a gas in an adiabatic process is : U = a + bpV where a and b are constants. If the ratio of c_(p) and c_(v) of the gas is gamma , prove that, gamma = (b+1)/(b) .

The relation between internal energy U , pressure P and volume V of a gas in an adiabatic processes is : U = a+ bPV where a = b = 3 . Calculate the greatest integer of the ratio of specific heats [gamma] .

The relation between internal energy U , pressure P and volume V of a gas in an adiabatic processes is : U = a+ bPV where a = b = 3 . Calculate the greatest integer of the ratio of specific heats [gamma] .

The relation between internal energy U , pressure P and volume V of a gas in an adiabatic processes is : U = a+ bPV where a = b = 3 . Calculate the greatest integer of the ratio of specific heats [gamma] .