If the value of Rydberg constant is `1.097xx10^(7) m^(-1)` , what will be the wavelengths of the emitted radiations in case of the following transitions in a hydrogen atom ?
(iii) From n=5 to n=3

If the value of Rydberg constant is 1.097xx10^(7) m^(-1) , what will be the wavelengths of the emitted radiations in case of the following transitions in a hydrogen atom ? (ii) From n=5 to n=1

If the value of Rydberg constant is 1.097xx10^(7) m^(-1) , what will be the wavelengths of the emitted radiations in case of the following transitions in a hydrogen atom ? (i) From n=5 to n=2

If the value of Rydberg constant is 1.097xx10^(7) m^(-1) , what will be the wavelengths of the emitted radiations in case of the following transitions in a hydrogen atom ? (iv) From n= oo to n=1

Given the value of Rydberg constant is 10^7m^(-1) , the wave number of the last line of the Balmer series in hydrogen spectrum will be

If the value of Rydberg constant of hydrogen is 109737 cm^-1 determine the longest and shortest wavelengths of the Balmer series.

If the value of Rydberg constant of hydrogen is 109737 cm^(-1) , determine the longest and the shortest wavelength of the Balmer series.

Calculate the wavalength of radiation emitted when electron in a hydrogen atom jumps from n=oo to n=1 .

The ionization energy of hydrogen atom in the ground state is 1312 kJ "mol"^(-1) . Calculate the wavelength of radiation emitted when the electron in hydrogen atom makes a transition from n = 2 state to n = 1 state (Planck’s constant, h = 6.626 xx 10^(-34) Js , velocity of light, c = 3 xx 10^8 m s^(-1) , Avogadro’s constant, N_A = 6.0237 xx 10^23 "mol"^(-1) ).

Calculate the wavelength and energy of radiation emitted for the electronic transition from infinity to stationary state one of the hydrogen atom.

What is the wavelength of llight emitted when the electron in a hydrogen atom undergoes transition from an energy level with n=4 to an energy level with n=2 ?