The most common form and the
most accurate simple equation for the behaviour of a real gas is that proposed by Johannes
van der Waals in 1872.
He modified the ideal gas equations to allow for the fact that
two of the assumptions made in their derivation may not be correct, that is:
(a) the
volume of the molecules may not be negligible when compared with the volume of the gas,
and
(b) the forces between the molecules may not be negligible.
Clearly both
these effects become much more noticeable at high pressures and small volumes when the
molecules are packed tightly together.
Consider first the volume of the molecules. The
actual volume given in the equation must be reduced because the number of collisions will
be greater. The equation becomes:
where b is the effective volume of the molecules.
(It has been found that b is about 4.2 x the volume of the
molecules.)
Considering now the attractive forces between the gas molecules, you
can see that the pressure in the body of the gas is higher than that at the edges since
molecules are pulled back into the centre by other molecules. We assume the attraction to
be proportional to the number of molecules per unit volume (that is, to N/V).
The
number of impacts per second is also affected and both these numbers are proportional to
the density. So
pressure reduction = a/V2
where a is a constant.
Taking both these corrections into consideration, van der Waals' equation for one mole of a
gas thus becomes: