Answer to Question #207590 in Quantum Mechanics for shiv sharma

Question #207590

The wave function of a particle is 𝜓(𝑥) = { 𝐴𝑐𝑜𝑠( 2𝜋𝑥 𝐿 ) 𝑓𝑜𝑟 − 𝐿 4 ≤ 𝑥 ≤ 𝐿 4 0 elsewhere i) Determine the normalization constant A. ii) What is the probability that the particle will be found between x= 0 and x = L/6 if we measured its position? iii) Find the expectation values for the operators x, p, and p 2 .

Expert's answer

"\\int_{-L\/4}^{L\/4}\\psi^2(x)dx = 1"

Substituting the wavefunction, obtain:

"\\int_{-L\/4}^{L\/4}A^2\\cos^2(2\\pi x\/L)dx = 1\\\\"

Taking the integral, find:

"A^2\\left( \\dfrac{L}{2\\pi}\\right)\\dfrac{\\pi }{2} = 1\\\\\nA = \\dfrac{2}{\\sqrt{L}}"

The probability of finding the particle between 0 and L/8 is:

"\\int_{0}^{L\/8}\\psi^2(x)dx =\\int_{0}^{L\/8}A^2\\cos^2(2\\pi x\/L)dx = \\dfrac{1}{4} + \\dfrac{1}{2\\pi} \\approx 0.409"

Answer. "A = \\dfrac{2}{\\sqrt{L}},p = 0.409".

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Answer to Question #207590 in Quantum Mechanics for shiv sharma

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