Inversion temperature `(T_(i)=(2a)/(Rb))` is defined as the temperature of gas is lower than `T_(i)` then it will cool down. What will happen to a gas if it is adiabatically expanded at 600 K if its Boyle's temperature is 290 K?

Inversion temperature (T_(i)=(2a)/(Rb)) is defined as the temperature above which if gas is expanded adiabatically it gets warm up but if temperature of gas is lower than T_(i) then it will cool down. What will happen to gas if it is adiabatically expanded at 50^(@)C if its Boyle's temperature is 20^(@)C

The ratio of the inversion temperature of a gas to its Boyle temperature is

An ideal monatomic gas at 300 K expands adiabatically to 8 times its volume . What is the final temperature ?

If the critical temperature of a gas is 300 K then the ratio of its inversion and Boyle's temperature will be

An ideal monoatomic gas at 300K expands adiabatically to twice its volume. What is the final temperature?

The graph between the (velocity^(2)) and temperature T of a gas is

Pressure of a gas at S.T.P. is doubled and the temperature is raised to 546 K. What is the final volume of the gas ?

A gas expands with temperature according to the relation V=KT^(2/3) .Work done when the temperature changes by 60K is.

When the pressure of 5 L of N_(2) is double and its temperature is raised from 300 K to 600 K, the final volume of the gas would be

Sketch shows the plot of Z v/s P for a hypothetical gas for one mole at three distint temperature. Boyle's temperature is the temperature at which gas shows ideal behaviour over a pressure range in the low pressure region.Boyle's temperature (T_b)=a/(Rb) .If a plot is obtained at temperature well below Boyle's temperature then the curve will show negative deviation, in low pressure region and positive deviation in the high pressure region. Near critical temperature the curve is more likely as CO_2 and the temperature well above critical temperature curve is more like H_2 at 0^@C as shown above.At high pressure suppose all the constant temperature curve varies linearly with pressure according to the following equation : Z=1+(Pb)/(RT) ( R=2 cal "mol"^(-1) K^(-1) ) Which of the following is correct :