Advertisements
Advertisements
प्रश्न
Prove that, in Bohr model of hydrogen atom, the time period of revolution of an electron in nth orbit is proportional to n3.
सिद्धांत
Advertisements
उत्तर
Using Bohr’s theory:
Centripetal force = Electrostatic force
`(mv^2)/r = (kZe^2)/r^2`
⇒ r = `(kZe^2)/(mv^2)` ...(i)
Angular momentum is quantised, i.e.,
mvr = `(nh)/(2pi)`
⇒ r = `(nh)/(2pimv)` ...(ii)
Equating (i) and (ii),
`(nh)/(2pimv) = (kZe^2)/(mv^2)`
v = `(2pikZe^2)/(nh)` ...(iii)
Putting Eq. (iii) in (ii),
r = `(n^2h^2)/(2pim xx 2pikZe^2)`
= `(n^2h^2)/(4pi^2mkZe^2)` ...(iv)
ω = `v/r`
T = `(2pi)/omega`
= `(2pir)/v`
= `(n^3h^3)/(4pi^2mk^2Z^2e^4)` ...(Putting the values of v and r from (iii) and (iv))
shaalaa.com
या प्रश्नात किंवा उत्तरात काही त्रुटी आहे का?
