The pressure of an ideal gas is written as `p=(2E)/(3V)`.Here E refers to

The energy density u/V of an ideal gas is related to its pressure P as

van der Waal's equation for calculating the pressure of a non ideal gas is (P+(an^(2))/(V^(2)))(V-nb)=nRT van der Waal's suggested that the pressure exerted by an ideal gas , P_("ideal") , is related to the experiventally measured pressure, P_("ideal") by the equation P_("ideal")=underset("observed pressure")(underset(uarr)(P_("real")))+underset("currection term")(underset(uarr)((an^(2))/(V^(2)))) Constant 'a' is measure of intermolecular interaction between gaseous molecules that gives rise to nonideal behavior. It depends upon how frequently any two molecules approach each other closely. Another correction concerns the volume occupied by the gas molecules. In the ideal gas equation, V represents the volume of the container. However, each molecule does occupy a finite, although small, intrinsic volume, so the effective volume of the gas vecomes (V-nb), where n is the number of moles of the gas and b is a constant. The term nb represents the volume occupied by gas particles present in n moles of the gas . Having taken into account the corrections for pressure and volume, we can rewrite the ideal gas equation as follows : underset("corrected pressure")((P+(an^(2))/(V^(2))))underset("corrected volume")((V-nb))=nRT AT relatively high pressures, the van der Waals' equation of state reduces to

The pressure p and volume V of an ideal gas both increase in a process.

The pressure and volume of an ideal gas are related as p alpha 1/v^2 for process A rarrB as shown in figure . The pressure and volume at A are 3p_0 and v_0 respectively and pressure B is p_0 the work done in the process ArarrB is found to be [x-sqrt(3)]p_0v_0 find

Assertion Pressure of a gas id given as p=2/3E. Reason In the above expession, E represnts kinetic energy of the gas per unit volume.

At low pressures, the van der Waals equation is written as [P+(a)/(V^(2))]V=RT The compressibility factor is then equal to

The pressure P and volume V of an ideal gas both decreases in a process.

Temperature of an ideal gas is 300 K . The final temperature of the gas when its volume changes from V " to " 2V in the process p=alphaV (here alpha is a positive constant) is

Temperature of an ideal gas is 300 K. The change in temperature of the gas when its volume changes from V to 2V in the process p = aV (Here, a is a positive constant) is

The average kinetic energy of the molecules of an ideal gas at 10 ^@ C has the value (E). The temperature at which the kinetic energy of the same gas becomes (2 E) is.