ways,
|Φ〉 =
1
√
2
|a+;a−〉−1
√
2
|a−;a+〉|Φ〉 =1
√
2
|b+;b−〉−1
√
2
|b−;b+〉|Φ〉 =1
√
2
|c+;c−〉−1
√
2
|c−;c+〉 (17.44)The probability amplitude for measuring|Φ〉in a state|a+;b+〉is given by
〈a+;b+|Φ〉=1
√
2
〈a+;b+|a+;a−〉−1
√
2
〈a+;b+|a−;a+〉 (17.45)The last term vanishes because it involves the inner product〈a+|a−〉= 0 for the first particle.
The first term also simplifies by using〈a+|a+〉= 1 for the first particle, and we are left with,
〈a+;b+|Φ〉=1
√
2
〈b+|a−〉 (17.46)where the inner product is for the particle 2. Hence, the probability we seek is given by
P(a+,b+) =|〈a+;b+|Φ〉|^2 =1
2
|〈b+|a−〉|^2 (17.47)To compute the last inner product, we express the states|bβ〉in terms of the states|aα〉. This
is the same formula as for expressing a general state|n±〉in terms of|z±〉, but now the angleθ
betweennandzbecomes the angleθabbetween the vectorsaandb,
|b+〉 = cosθab
2
|a+〉+eiφsinθab
2
|a−〉|b−〉 = cos
θab
2
|a−〉−e−iφsin
θab
2
|a+〉 (17.48)Here, we have omitted an overall phase which is immaterial inevaluating the probabilities, and we
find the probability amplitude to be,
〈a+|b−〉=−e−iφsin
θab
2(17.49)
and the probability,
P(a+,b+) =1
2
sin^2
θab
2(17.50)
The phaseφis immaterial in calculating this probability. Note that, in the limit whereb→a,
the probabilityP(a+,b+)→0. This is consistent with the fact that the spin must be perfectly
anti-correlated when measured along the same axis byAandB. Also, we haveP(a+,b+)→ 1 /2 as