= ̄h^2(
χ 00 −1
2
√
2
(
χ(1)+χ(2)− −χ(1)−χ(2)+ +χ(1)+χ(2)− −χ(1)−χ(2)+))
= ̄h^2 (1−1)χ 00 = 0 ̄h^2 χ 0021.8.4 Adding anyℓplus spin
We wish to write the states of total angular momentumjin terms of the product statesYℓmχ±. We
will do this by operating with theJ^2 operator and setting the coefficients so that we have eigenstates.
J^2 ψjmj=j(j+ 1) ̄h^2 ψjmjWe choose to write the the quantum numbermjasm+^12. This is really just the defintion of the
dummy variablem. (Other choices would have been possible.)
The z component of the total angular momentum is just the sum of the z components from the
orbital and the spin.
mj=ml+ms
There are only two product states which have the rightmj=m+^12. If the spin is up we needYℓm
and if the spin is down,Yℓ(m+1).
ψj(m+ (^12) )=αYℓmχ++βYℓ(m+1)χ−
audio
We will find the coefficientsαandβso thatψwill be an eigenstate of
J^2 = (~L+S~)^2 =L^2 +S^2 + 2LzSz+L+S−+L−S+.
So operate on the right hand side withJ^2.
J^2 ψj,m+ 12 = α ̄h^2
[
ℓ(ℓ+ 1)Ylmχ++3
4
Ylmχ++ 2m1
2
Ylmχ++
√
ℓ(ℓ+ 1)−m(m+ 1)√
1 Yl(m+1)χ−]
+ β ̄h^2[
ℓ(ℓ+ 1)Yℓ,m+1χ−+3
4
Yℓ,m+1χ−+ 2(m+ 1)(
− 1
2
)
Yℓ,m+1χ−+
√
ℓ(ℓ+ 1)−(m+ 1)m√
(1)Ylmχ+]
And operate on the left hand side.
J^2 ψj,m+^12 =j(j+ 1) ̄h^2 ψj,m+^12 =j(j+ 1) ̄h^2(
αYlmχ++βYℓ,(m+1)χ−)
Since the two terms are orthogonal, we can equate the coefficientsfor each term, giving us two
equations. TheYℓmχ+term gives
αj(j+ 1) =α(
ℓ(ℓ+ 1) +
3
4
+m)
+β√
ℓ(ℓ+ 1)−m(m+ 1).