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
If K is Boltzman's constant the quantity (PV)/(KT) represents (A) mass of gas (B) number of moles of gas (C) energy of gas (D) number of molecules of gas
A quantity A appears in an equation. Pressure =(Ae^(-Af//kT))/(B) T represent temperature 'f' frequency & 'k' boltzmann constant. Kinetic energy of a gas molecule is given by =(3)/(2)kT . What is the dimension of B in length?
A formula is given as P=(b)/(a)sqrt(1+(k.theta.t^(3))/(m.a)) where P = pressure, k = Boltzmann's constant, theta= temperature, t= time, 'a' and 'b' are constants. Dimensional formula of 'b' is same as
