phy-4600/notes/random

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2016-03-14 00:07:19 +00:00
In position space,
⌠ ∞
❬φₙ❙Ψ❭ ≐ ⎮ dx φₙ⃰(x) Ψ(x).
⌡-∞
But for just 3L/4 to L,
⌠L
⎮ dx φₙ⃰(x) Ψ(x).
⌡3L/4
Since this is a particle in an infinite square well,
φₙ(x) = √⎛2͟⎞ sin⎛n͟π͟x͟⎞ and Ψ(x) = ∑ cₙ φₙ(x).
⎝L⎠ ⎝ L ⎠ ⁿ
So the probability to calculate is
⌠L
⎮ dx √⎛2͟⎞ sin⎛n͟π͟x͟⎞ ∑ cₙ φₙ(x).
⌡3L/4 ⎝L⎠ ⎝ L ⎠ ⁿ
The evaluation of the last piece of this expression is elucidated by the identity
sin(u)sin(v) = 1/2 (cos(u-v) - cos(u+v)), i.e.
sin(2nπ) sin(³/₂nπ) = ¹/₂(cos(1/2nπ) - cos(7/2nπ)).
So when n is odd, this product disappears, and when n is even one of the sin² terms disappears. The other sin² will always return 0, since regardless of the integer n, its argument is an integer multiple of π.