A particle with zero (total) energy is described by the wavefunction, Ψ(x) =A cos((n?x/L)): −L/4≤ x ≤ L/4 = 0 : elsewhere. Determine the normalization constant A. Calculate the potential energy of the particle. What is the probability that the particle will be found between x= 0 and x=L/8?
A particle with zero (total) energy is described by the wavefunction, Ψ(x) =A cos((n?x/L)): −L/4≤ x ≤ L/4 = 0 : elsewhere. Determine the normalization constant A. Calculate the potential energy of the particle. What is the probability that the particle will be found between x= 0 and x=L/8?
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- A particle with zero (total) energy is described by the wavefunction,
Ψ(x) =A cos((n?x/L)): −L/4≤ x ≤ L/4
= 0 : elsewhere.
- Determine the normalization constant A.
- Calculate the potential energy of the particle.
- What is the probability that the particle will be found between x= 0 and x=L/8?
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