Key points are not available for this paper at this time.
A treatment of the magnetic resonance is given for a particle with spin in a constant field H₀ and under the action of an arbitrary alternating field with circular frequency perpendicular to H₀. A method of finding a solution, valid at any time, is given which converges the better the smaller the deviations from a rotating field or the larger H₀. It is shown that in the lowest order correction the shape of the resonance curve is unchanged but that it is shifted by a percentage amount {H₁^2}16 {{H₀}^2} where H₁ is the effective amplitude of the oscillating field. This also involves a correction in the values of the magnetic moments thus obtained towards smaller values which however in all practical cases is negligibly small.
Bloch et al. (Fri,) studied this question.