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The ground-state wave function of a hydrogen atom is:

ρν/α, Ψ1, () =- Μπαρ

where r is the distance from the nucleus and a0 is the Bohr radius (53 pm). Following the Born approximation, calculate the probability, i.e., |ψ|^2dr, that the electron will be found somewhere within a small sphere of radius, r0, 1.0 pm centred on the nucleus.

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Answer #1

be Free 22-gen putting - a=53pm, ro=1 pm a=53% To = a putt in abone egh = 4 [ 560 - 1206 ) 453 +4 ] - ulo. 00017 - 0 .00943-0Y has ēro As = 53pm - 90=53% r = 1pm Hence Required probability 1412 de dz is volume element - 294 meteo. uruido e a urgzdr l

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