Physical Chemistry Third Edition

(C. Jardin) #1

18.4 Excited States of the Helium Atom 773


Probability Densities for Excited States


The probability density for finding the two electrons irrespective of spins is obtained
by integrating the square of the wave function over the spin coordinates. Consider the
state corresponding toΨ 1 in Eq. (18.4-2a). The probability of finding electron 1 in
the volume elementd^3 r 1 and electron 2 in the volume elementd^3 r 2 irrespective of
spins is

(Probability)

1

2

([ψ 1 s(1)ψ 2 s(2)−ψ 2 s(1)ψ 1 s(2)])d^3 r 1 d^3 r 2

×


α(1)∗α(2)∗α(1)α(2)ds(1)ds 2



1

2

[ψ 1 s(1)ψ 2 s(2)−ψ 2 s(1)ψ 1 s(2)]^2 d^3 r 1 d^3 r 2



1

2

[ψ 1 s(1)^2 ψ 2 s(2)^2 −ψ 1 s(1)ψ 2 s(2)ψ 2 s(1)ψ 1 s(2)

−(ψ 2 s(1)ψ 1 s(2)ψ 1 s(1)ψ 2 s(2)+ψ 2 s(1)^2 ψ 1 s(2)^2 ]d^3 r 1 )d^3 r 2 (18.4-3)

where we have used the fact that the 1sand 2sspace orbitals are real and the fact that
the spin functions are normalized. The probability of finding electron 1 in the volume
elementd^3 r 1 is obtained by integrating over the coordinates of particle 2:

(
Probability of finding
particle 1 ind^3 r 1

)



1

2


[ψ 1 s(1)^2 ψ 2 s(2)^2 −ψ 1 s(1)ψ 2 s(2)ψ 2 s(1)ψ 1 s(2)

−(ψ 2 s(1)ψ 1 s(2)ψ 1 s(1)ψ 2 s(2)+ψ 2 s(1)^2 ψ 1 s(2)^2 ]d^3 r 2 )d^3 r 2



1

2

(ψ 1 s(1)^2 +ψ 2 s(1)^2 )d^3 r 1 (18.4-4)

The second and third terms in Eq. (18.4-3) vanish because of orthogonality when the
coordinates of particle 2 are integrated. This probability is the average of what would
occur if electron 1 occupied orbital 1 and what would occur if it occupied orbital 2,
which is reasonable since we cannot say which electron occupies which orbital. The
expression for electron 2 is the same function. For the two-electron system the total
probability of finding some electron in a volumed^3 r 1 is the sum of the probabilities
for the two electrons:
(
Probability of finding
an electron ind^3 r 1

)

(ψ 1 s(r 1 )^2 +ψ 2 s(r 1 )^2 )d^3 r 1 (18.4-5)

When this probability density is multiplied by−e, the electron charge, it is the charge
density (charge per unit volume) due to the electrons. The other three wave functions
represented in Eq. (18.4-2) give the same results.

Exercise 18.3
Show that the other three wave functions in Eq. (18.4-2) give the same result for the charge
density.
Free download pdf