The equation of state of gas is given `(P + (aT^(2))/(V))V^( c) = (RT + b)` where `a, b, c` and `R` are constant. The isotherms can be represented by `P = AV^(m) - BV^(n)`, where `A` and `B` depend only on temperature and

The van der wasl's equation of a gas is (P+(aT^(2))/V) V^(c)=(RT+b) . Where a, b, c and R are constant. If the isotherm is represented by P=AV^(m)-BV^(n) , where A and B depends on temperature:

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

The velocity v of a particle at time A is given by v = at+ (b)/(l +c) where a ,b and c are constant The dimensions of a,b and c are respectively

The velocity v of a particle at time t is given by v=at+b/(t+c) , where a, b and c are constants. The dimensions of a, b, c are respectively :-

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

The equation fo state of a gas is given by (P+(a)/(V^(3)))(V-b^(2))=cT , where P,V,T are pressure, volume and temperature respectively, and a,b,c are constants. The dimesions of a and b are respectively

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