In the relation: `P=(alpha)/(beta)e^(-(alphaZ)/(ktheta)),P` is pressure `Z` is distance `k` is Boltzmann constant and `theta` is the temperature. The dimensional formula of `beta` will be

In the relation: P=(alpha)/(beta)e^(-(alphaZ)/(ktheta)),P is pressure Z is distance k is Boltzmann constant and theta ils the temperature. The dimensional formula of beta will bes

In the relaction p = (a)/(beta) e ^((aZ)/(k theta ) , p is pressure Z is distance .k is Boltamann constant and theta is the teperations . The dimensional formula of beta will be

In the equation ((1)/(pbeta))=(y)/(k_(B)T) , where p is the pressure, y is the distance, k_(B) is Boltzmann constant and T is the tempreture. Dimensions of beta are

The force of interaction between two atoms is given by F= alpha beta exp(-(x^2)/(alphakt)) , where x is the distance ,k is the Boltzmann constant and T is temperature and alpha " and " beta are two constans. The dimension of beta is :

F=alphabetae^((-(x)/(alphakt))) k = Boltzmann constant t = temperature x = distance The dimensions of beta is

The energy E of a particle varies with time t according to the equation E=E_0sin(alphat).e^((-alphat)/(betax)) , where x is displacement from mean position E_0 is energy at infinite position and alpha and beta are constants . Dimensional formula of alpha is

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

Dimensional formula for stefan’s constant is: (here K denotes the temperature)

An equation is given as (p +(a)/(V^(2))) = b(theta)/(V) ,where p= pressure V= volumen and theta = absolute temperature. If a and b are constants, then dimensions of a will be

if power P and linear mass density are related as P=alpha/(beta^2+lambda^2) , then find the dimensions of alpha and beta