Please solve question 1.34 :) 1.34 Calculate α and K for a gas for which P(V-b) RT
the equation of state of a gas is given by p(v-b)=RT find the expansivity of this gas.... Please help with this. The equation of state of a gas is given by P(v-b) RT , find the expansivity of this gas. Simplify your answer to the simplest possible form. The equation of state of a gas is given by P(v-b) RT , find the expansivity of this gas. Simplify your answer to the simplest possible form.
For a Van der Waals gas, the following equations hold. P = nRT/(V−nb) − a(n/V)2 dU = CV dT + a(n/V)2 dV For chlorine gas, CV,m = 25.6 J K−1 mol−1, a = 6.343 bar L2 mol−2, and b = 0.0542 L mol−1. Calculate q, w, ΔU, and ΔH, in joules, when one mole of chlorine gas is expanded isothermally and reversibly at 449 K from 7.0 L to 15.0 L.
Calculate the isothermal compressibility and the expansion coefficient of a perfect gas and a van der Waals ga:s (ii) Show, using Euler's chain relation, that KTR α(Vin-b) (iii) Make use of the definitions of the coefficient of thermal expansion, α, and 1. (i) (15) the isothermal compressibility, KT, and start from the expression for the total differential dV in terms of T and P to show that: OT
2. Derive an expression for (as) for a gas with the equation of state: P(V-nB) = nRT, where B is a constant. 2. Derive an expression for (as) for a gas with the equation of state: P(V-nB) = nRT, where B is a constant.
For a gas following V= RT/P + (b - a/RT) what is the inversion temperature of the Joule-Thomson coefficient? Below the inversion temperature (where mu_JT = 0), what is the sign of mu_JT? does this imply heating or cooling? B) For a gas following v = BI+ (b-) what is the inversion bemperature for the Most = T (Jl. - V Joule Thomson coefficient (2)? Cp Below the inversion temperature (where Matod, what is the sign of Maga? Does this...
Physical Chemistry A gas is well described with the following equation of state P = RT/V - b - a/squareroot T 1/V (V + b) where a = 452.0 bar.dm^6.mol^2.K^1/2 and b = 0.08217 dm^3.mol^-1. If 1.14 moles of the gas have a volume of 2L at 685K, calculate: 1- the pressure of the gas using the provided equation of state. 2- the pressure assuming that the gas is an ideal gas. 3- The compressibility factor (z) of the gas...
Atomic gas which obeys Van der Waals equation of state RT= (P+ a/ V2) (V-b) has internal energy (per mole) of u = 3/2 RT - a/V where 'V' is volume of mole in temperature T. In the beginning, the gas temperature is T1 and volume V1. The gas is let to expand adiabatically so that its final volume is V2. What is the final temperature of the gas?
Atomic gas which obeys Van der Waals equation of state RT= (P+ a/ V2) (V-b) has internal energy (per mole) of u = 3/2 RT - a/V where 'V' is volume of mole in temperature T. In the beginning, the gas temperature is T1 and volume V1. The gas is let to expand adiabatically so that its final volume is V2. What is the final temperature of the gas?
Describe how to calculate the work for a gas that follows the equation of state: LaTeX: PV=\text RT+\alpha P P V = R T + α P if the process is carried out reversibly and isothermally. How would this quantity compare it the work is carried out in a single step?