( K(2e)² 4(-13.6 eV) -54.4 eV E, = 2ag n?
Singly ionized helium has a single orbiting electron, so the mathematics
of the Bohr hydrogen atom will apply, with one important difference: The charge of the nucleus is twice that of the single proton at the center of a hydrogen atom. This changes the energy levels; the magnitude of each energy is greater than the corresponding Bohr level by a factor of 22 = 4: The Balmer and Lyman series of spectral lines in hydrogen have analogs in singly ionized helium, but at shorter wavelengths; the photons corresponding to these transitions are beyond the visiblelight spectrum. The transitions that end on the n = 4 state produce a set of spectral lines called the Pickering series. The visible-light lines in this series were first seen in the light from certain hot stars, but some of the lines overlap the hydrogen Balmer series lines, so these lines were initially missed. This led to an initial mischaracterization of the source of the lines.
The Paschen series of wavelengths in the hydrogen spectrum correspond to transitions that end on m = 3. There is a series of wavelengths in the ionized helium spectrum that partially overlap this series, as the Pickering series partially overlaps the Balmer series. What is the end state for these transitions?
A. m = 5 B. m = 6
C. m = 8 D. m = 16
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