Standard deviation 1. Calculate o2 = (E²) – (E)² for a particle in a box in the state described by ¥(x) = √3(x) + 2√₁(x), where (x) are eigenfunctions of the particle in a box problem. 2. Show that of is zero for any eigenstate of the particle in a box problem.
Standard deviation 1. Calculate o2 = (E²) – (E)² for a particle in a box in the state described by ¥(x) = √3(x) + 2√₁(x), where (x) are eigenfunctions of the particle in a box problem. 2. Show that of is zero for any eigenstate of the particle in a box problem.
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![Standard deviation
1. Calculate o = (E²) — (E)² for a particle in a box in the state described by
V(x) = √3(x) + 2√₁(x),
where (x) are eigenfunctions of the particle in a box problem.
2. Show that of is zero for any eigenstate of the particle in a box problem.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F12f51b64-c3b4-40b6-b565-16b387e10bf1%2Fe10231ba-2732-4e68-b5f3-9290f723bd5c%2Fskpfcwl_processed.png&w=3840&q=75)
Transcribed Image Text:Standard deviation
1. Calculate o = (E²) — (E)² for a particle in a box in the state described by
V(x) = √3(x) + 2√₁(x),
where (x) are eigenfunctions of the particle in a box problem.
2. Show that of is zero for any eigenstate of the particle in a box problem.
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