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Highly excited states for hydrogen like ...

Highly excited states for hydrogen like atom (alos called Ryburg states) with nucleus Charge Ze are defined by their principal qunatum number n, where `n lt lt 1`. Which of the following statement(s) is (are) true?

A

Releative change in the radii of two consecutive orbitals does not depend on `Z`

B

Relative change in the radii of two consecutive orbitals varies as `1//n`

C

Relative change in the energy of two consecutive orbitals varies as `1//n^(2)`

D

Relative change in the angular momenta of two consecutive orbitals varies as `1//n`

Text Solution

Verified by Experts

The correct Answer is:
A, B, D
As radius `r prop n^(2)/z`
`implies (Deltar)/r=(((n+1)/z)^(2)-(n/z)^(2))/((n/z)^(2))=(2n+1)/n^(2) ~~2/n prop 1/n`
as energy `E prop z^(2)/n^(2)`
`implies (DeltaE)/E=(z^(2 )/n^(2)-z^(2)/((n+1)^(2)))/(z^(2)/((n+1)^(2)))=((n+1)^(2)-n^(2))/(n^(2).(n+1)^(2)).(n+1)^(2)`
`implies (DeltaE)/E=(2n+1)/n^(2) cong (2n)/n^(2) prop 1/n`
as angular momentum `L=(nh)/(2pi)`
`implies (DeltaL)/(L)=(((n+1)h)/(2pi)-(nh)/(2pi))/((nh)/(2pi))=1/n prop 1/n`
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