The equation of the state of some gases can be expressed as `(P +(a)/(V^(2))(V-b)=RT` . Here P is the pressure, V is the volume, T is the absolute temperature and a, b, R are constants. The dimensions of `(a)/(b)` are

The equation of state of some gases can be expressed as (P+ (a)/(V^(2)))(V-b)= RT , where P is the pressure, V is the volume, T is the absolute temperature and a, b & R are constants. The dimensions of 'a' are : -

The equation of state of some gases can be expressed as , (P+(a)/(V^(2)))(V-b)=RY where P is the pressure, V the volume, T the absolute temperature and a, b, R are constants. The dimensions of 'a' are -

The equation of state of some gases can be expressed as (P + (a)/(V^(2))) = (R theta)/(V) where P is the pressure V the volume, theta The temperature and a and b are constant .The dimensional formula of a is

The van der Waal's equation of state for some gases can be expressed as : (P + (a)/( V^(2))) ( V - b) = RT Where P is the pressure , V is the molar volume , and T is the absolute temperature of the given sample of gas and a, b , and R are constants. The dimensions of constant b are

The van der Waal's equation of state for some gases can be expressed as : (P + (a)/( V^(2))) ( V - b) = RT Where P is the pressure , V is the molar volume , and T is the absolute temperature of the given sample of gas and a, b , and R are constants. The dimensions of a are

The van der Waal's equation of state for some gases can be expressed as : (P + (a)/( V^(2))) ( V - b) = RT Where P is the pressure , V is the molar volume , and T is the absolute temperature of the given sample of gas and a, b , and R are constants. In the above problem , the dimensional formula for RT is same as that of

The van der Waal's equation of state for some gases can be expressed as : (P + (a)/( V^(2))) ( V - b) = RT Where P is the pressure , V is the molar volume , and T is the absolute temperature of the given sample of gas and a, b , and R are constants. The dimensionsal representation of ab// RT is

The van der Waal's equation of state for some gases can be expressed as : (P + (a)/( V^(2))) ( V - b) = RT Where P is the pressure , V is the molar volume , and T is the absolute temperature of the given sample of gas and a, b , and R are constants. Which of the following does not have the same dimensional formula as that for RT?

The Vander wall equation for 1 mole of a real gas is (P+ (a/V^2))(V-b) =RT where P is the pressure, V is the volume, T is the absolute temperature, R is the molar gas constant and a, b are Vander waal constants. The dimensions of a is the same as those of

The gas equation for n moles of a real gas is (P+(a)/(V^(2)))(V-b) = nRT where P is the pressure, V is the volume, T is the absolute temperature, R is the molar gas constant and a, b are arbitrary constants. Which of the following have the same dimensions as those of PV ?