10 · GASES, LIQUIDS AND SOLIDS1.Theaverage speedof gas particles at a particular temperature depends upon the
mass of the gas molecules, with smaller molecules (such as N 2 ) moving faster
than heavier ones (like Cl 2 ). Even relatively heavy molecules travel at average
speeds of several hundred metres per second at room temperature!2.The average speed of molecules in a gas also increaseswith the temperature of the
gas, but the spread of speeds is greater at higher temperatures.Ideal gas equation
The kinetic theory of gases reduces to a remarkably simple mathematical form,
known as the ideal gas equation.PVnRTwherePis the pressure of a gas (Pa), Vis the volume of gas (m^3 ),Tthe gas tempera-
ture (K), and nthe number of moles of gas. Ris the ‘universal gas constant’ with a
value of 8.3145 J mol^1 K^1.Key points about the ideal gas equation
1.The ideal gas equation shows that P,V,nandTare not independent. These vari-
ables cannot take on any values we like – nature has dictated that if three of them
are known, then the fourth is fixed.2.The equation contains no factor which is specificto any gas. The type of gas
(helium, chlorine, oxygen, water vapour, etc.) is irrelevant.3.The rearranged forms of the ideal gas equation are often used in calculations:
nRT PV nRT PV
V—— ; T——; P—— ; n——
PnRV RT4.The inter-relationships between P,V,nandT, summarized in the gas laws of
Charles, Boyle and Avogadro, are ‘inbuilt’ into the ideal gas equation, and the
equation makes the separate use of these laws in calculations redundant. For
example, the ideal gas equation shows that if the pressure and the number of
moles of gas does not change, then Vis proportional to T. In other words, it pre-
dicts Charles’ law.10.5
162
Molecular speedNumber of moleculeshaving speed shownCl 2 (300 K)N 2 (300 K)N 2 (3000 K)Fig. 10.9The spread of molecular speeds in chlorine and nitrogen gases.