c15 JWBS043-Rogers September 13, 2010 11:28 Printer Name: Yet to Come
PROBLEMS AND EXAMPLES 245
or
d^2 e−αr
dr^2
+
2
r
de−αr
dr
+
2 me
^2
(
E+
e^2
4 π^2 ε 0 r
)
e−αr= 0
We can carry out the differentiations, divide through bye−αr, and segregate the
terms into those that depend onr(terms 2 and 4) and those that do not (terms
1 and 3):
α^2 −
2
r
α+
2 me
^2
(
E+
e^2
4 π^2 ε 0 r
)
= 0
α^2 −
2
r
α+
2 meE
^2
+
2 me
^2
e^2
4 π^2 ε 0 r
= 0
so
α^2 +
2 meE
^2
=
2
r
α−
2 me
^2
e^2
4 π^2 ε 0 r
The basis! functionφ=e−αris a negative exponential, so there must be some value
ofrfor which the right-hand side of the equation becomes zero. But the left-hand
side of the equation is a group of constants, which add up to a single constant. If this
constant is zero for one value ofr, it must be zero for all. Thus,
α^2 +
2 meE
^2
= 0
where= 2 hπThe consequences of this simple equation are very important:
α^2 =−
2 meE
^2
E(r)=−
^2
2 me
α^2
and
2
r
α−
2 me
^2
e^2
4 π^2 ε 0 r
= 0
2
r
α=
2 me
^2
(
e^2
4 π^2 ε 0
) 2
1
r