GASES AND VAPOUR MIXTURES 445
dharm
\M-therm\Th9-3.pm5
- In a mixture of gases, the partial pressure pi of any constituent gas can be found by
(a)pi = niRT/V (b)pi = miRT/Vi
(c)pi = niR 0 T/Vi (d)pi = niR 0 T/V
where, R = Characteristic gas constant,
R 0 = Universal gas constant,
V = Volume of the mixture,
Vi = Volume of the ith constituent, and
T = Temperature of the mixture. - Mole fraction of a component of gas mixture is equal to
(a)1/f (b) f^2
(c)f (d) f/p
where, f = Volume fraction, and
p = Pressure of the mixture. - In a gaseous mixture the specific volume of each component is given by
(a)V/m (b) Vi/mi
(c)V/mi (d) none of the above.
where, V = Volume of the mixture,
Vi = Volume of the ith component,
m = Mass of mixture, and
mi = Mass of the ith component.
Answers
- (b) 2. (d) 3. (d) 4. (c) 5. (c).
Theoretical Questions
- Define the following terms :
(i) Partial pressure (ii) Mole fraction
(iii) Volume fraction of a gas constituent in a mixture. - Explain briefly Dalton’s law and Gibbs-Dalton law.
- State and explain Amagat’s law or Leduc’s law.
- Prove that the molar analysis is identical with the volumetric analysis, and both are equal to the ratio of
the partial pressure to the total pressure. - Prove the following relation
M =
Σ
Σ
nM
n
ii
i
1
m
M
fi
∑ i
where, M = Molecular weight of the mixture,
ni = Number of moles of an any constituent,
mfi = Mass fraction of the constituent, and
Mi = Molecular weight of the constituent.
Unsolved Examples
- 0.45 kg of carbon monoxide (28) and 1 kg of air at 15°C are contained in a vessel of volume 0.4 m^3.
Calculate the partial pressure of each constituent and the total pressure in the vessel. The gravimetric
analysis of air is to be taken as 23.3% oxygen (32) and 76.7% nitrogen (28).
[Ans. pO 2 = 0.4359 bar ; pN 2 = 1.64 bar, pCO = 0.962 bar]