" Energy of the n^(th) orbit "-...

" Energy of the `n^(th)` orbit "-

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Frequancy =f_(1) , Time period = T, Energy of n^(th) orbit = E_(n) , radius of n^(th) orbit =r^(n) , Atomic number = Z, Orbit number = n : {:(,"Column-I",,"Column-II",),((A),f,(p),n^(3),),((B),T,(q),Z^(2),),((E),E_(n),(r ),(1)/(n^(2)),),((D),(1)/(r_(n)),(s),Z,):}

The energy of n^(th) orbit is given by E_(n) = ( -Rhc)/(n^(2)) When electron jumpsfrom one orbit to another orbit then wavelength associated with the radiation is given by (1)/(lambda) = RZ^(2)((1)/(n_(1)^(2)) - (1)/ (n_(2)^(2))) When electron of 1.0 gm atom of Hydrogen undergoes transition giving the spectral line of lowest energy is visible region of its atomic spectra, the wavelength of radiation is

The energy of n^(th) orbit is given by E_(n) = ( -Rhc)/(n^(2)) When electron jumps from one orbit to another orbit then wavelength associated with the radiation is given by (1)/(lambda) = RZ^(2)((1)/(n_(1)^(2)) - (1)/ (n_(2)^(2))) The ratio of wavelength H_(alpha) of Lyman Series and H_(alpha) of Pfund Series is

In Bohr's orbit , kinetic energy of an electron in the n^(th) orbit of an atom in terms of angular momentum is propotional to

In Bohr's orbit, kinetic energy of an electron in the n^(th) orbit of an atom in terms of angular momentum is

How will you express, the energy of the electron in the n^(th) orbit , in terms of the Rydberg constant, planck's constant and the velocity of light ?

{:(Column I,Column II),((A)"Radius of" n^(th) "orbit",(p)"Inversely proportional to Z"),((B)"Energy of" n^(th)"orbit",(q)"Integral multiple of"(h)/(2pi)),((C)"Velocity of electron" " in " n^(th) "orbit",(r)"Proportional to n^(2)"),((D)"Angular momentum",(s)"Inversely proportional to n"),(,(t)"Inversely proportional too" n^(2)):}

If an electron is moving in the n^(th) orbit of the hydrogen atom, then its velocity (v_(n)) for the n^(th) orbit is given as :

" Energy of the `n^(th)` orbit "-

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