For a hydrogen atom, the energies that an electron can have are given by the expression, `E=-13.58//n^(2)eV`, where n is an integer. The smallest amount of energy that a hydrogen atom in the ground state can absorb is:

The energy of the electron in the hydrogen atom is given by the expression E_N=-1312/(n^2) KJ where n is an integer . The smallest amount of energy that a hydrogen atom in the ground state can absorb is

In a hydrogen atom, if energy of an electron in ground state is 13.6 eV, then the energy in the 2nd excited state is

Calculate the energy required to excite an electron in hydrogen atom from the ground state to the next higher state, if the ionsation energy for the hydrogen atom is 13.6 eV .

In a hydrogen atom, if energy of an electron in ground state is 13.6eV, then the energy in the nearest excited state is

Energy of an electron in the nth orbit hydrogen atom is given by E_n = - (13.6)/(n^2) eV How much energy is required to take an electron from the ground state to the first excited state?

The ionization energy of the hydrogen atom is 13.6eV. The potential energy of the electron in n=2 state of hydrogen atom is

For Bohr.s model of the hydrogen atom, the energy of the electron in its ground state is found to be -13.6eV . (i) Draw an energy level diagram for the hydrogen atom and mark the value of energy (in eV) at n=2 and n=oo . (ii) Obtain the maximum energy of a photon emitted by the hydrogen atom in eV.

Total energy of an electron in the hydrogen atom in the ground state is -13.6 eV. The potential energy of this electron is