Find the dimensions of a in the formula `(p+a/V^2)(V-b)=RT`

For a moles of gas ,Van der Weals equation is (p = (a)/(V^(-2))) (V - b) = nRT ltbr. Find the dimensions of a a and b , where p = pressure of gas ,V = volume of gas and T = temperature of gas .

In the formula , p = (nRT)/(V-b) e ^(a/(RTV)) find the dimensions of a and b, where p = pressure , n= number of moles , T = temperture , V = volume and R = universal gas constant .

Find dimension formula of polarisation ?

Find out the units and dimensions of the constants a and b in the vander waal.s equation ( P + ( a )/(V ^(2)))(V -b) =RT.

The equation of state of a real gas is given by (P+a/V^(2)) (V-b)=RT where P, V and T are pressure, volume and temperature resperature and R is the universal gas constant. The dimensions of the constant a in the above equation is

If the equation of state of a gas is expressed as (P + a/(V^2)) (V - b) = RT where P is the pressure, V is the volume and T the absolute temperature and a, b , R are constants, then find the dimensions of 'a' and 'b' ?

According to Vander Wall's equation pressure (P) , volume (V) and temperature (T) are related as (P+(a)/(V^(2)))(V-b)=RT [for 1 mole of gas] Then dimension of (ab)/(V^(2)) is equivalent to :-

( alpha)/( t^(2)) = Fv + ( beta)/(x^(2)) Find the dimension formula for [ alpha] and [ beta] ( here t = time , F = force , v = velocity , x = distance).

The equation of state for real gas is given by ((p + (a)/(V^(2))(V - b) = RT . The dimension of the constant a is ………………. .

If epsilon_(0), B, V represent permitivity of free space, magnitude of magnetic field and volume of space respectively, then the dimension of epsilon_(0)B^(2)V is [M^(a)L^(b)T^(c)] . Find a+b+c .