Find out the degeneracy of hydrogen atom that has the energy
equal to ` - (R_H)/9` (`R_H` = Rydberg constant ).

An electron makes a transition from orbit n = 4 to the orbit n = 2 of a hydrogen atom. The wave length of the emitted radiations (R = Rydberg's constant) will be

An electron makes a transition from orbit n = 4 to the orbit n = 2 of a hydrogen atom. The wave number of the emitted radiations (R = Rydberg's constant) will be

Using Bohr's postulates, derive the expression for the total energy of the electron revolving in n^(th) orbit of hydrogen atom. Find the wavelength of H_(alpha) line, given the value of Rydberg constant, R = 1.1 xx 10^(7) m^(1)

The wave number of the spectral line in the emission spectrum of hydrogen will be equal to (8)/(9) times the Rydberg's constant if the electron jumps from …………..:-

What is the maximum degeneracy of a level of H-atom, where e^(-) has energy, E_(n) =- (R)/(9) ?

What is the lowest energy of the spectral line emitted by the hydrogen atom in the Lyman series? (h = Planck's constant, c = velocity of light, R = Rydberg's constant).

A stationary hydrogen atom emits photn corresponding to the first line of Lyman series. If R is the Rydberg constant and M is the mass of the atom, then the velocity acquired by the atom is

The symbol ""_(1)^(3)H indicates that the given hydrogen atom has a mass number equal to ....... and atomic number equal to ......

Hydrogen atom: The electronic ground state of hydrogen atom contains one electron in the first orbit. If sufficient energy is provided, this electron can be promoted to higher energy levels. The electronic energy of a hydrogen-like species (any atom//ions with nuclear charge Z and one electron) can be given as E_(n)=-(R_(H)Z^(2))/(n^(2)) where R_(H)= "Rydberg constant," n= "principal quantum number" Calculate the following : (a) the kinetic energy (in eV) of an electron in the ground state of hydrogen atom. (b) the potential energy (in eV) of an electron in the ground state of hydrogen atom.

The ionization energy of hydrogen atom is 13.6 eV. Calculate Rydberg's constant for hydrogen.