(7) Relative population of two energy (atomic or molecular) levels is given by Boltzmann distribution law which is mathematically represented as: kgT Here Ni, N, represent number of atoms/molecules in ith and jth energy levels, respectively; g. g represent degeneracy ofith and jth energy levels, respectively; E E; represent energies ofi and jt levels, repsectively represents Boltzmann constant and T represents temperature in kelvin. For non-degenerate states g = 1· (a) Find the population ratio between n-2 and n-1 levels for a gas of hydrogen atoms at 25 C and at 1000 K (b) What can you conclude from your values in (a)? (7) Relative population of two energy (atomic or molecular) levels is given by Boltzmann distribution law which is mathematically represented as: kgT Here Ni, N, represent number of atoms/molecules in ith and jth energy levels, respectively; g. g represent degeneracy ofith and jth energy levels, respectively; E E; represent energies ofi and jt levels, repsectively represents Boltzmann constant and T represents temperature in kelvin. For non-degenerate states g = 1· (a) Find the population ratio between n-2 and n-1 levels for a gas of hydrogen atoms at 25 C and at 1000 K (b) What can you conclude from your values in (a)?