Abstract

It is shown that the symbolic binomial expansions for the Clebsch-Gordan and Racah coefficients are exact for n=1 (where n+1 indicates the number of terms in the series expansions). When exact, these binomial forms reveal polynomial zeros of degree one, which are trivial structure zeros, hitherto considered as 'non-trivial' zeros, along with polynomial zeros of degree >or=2.

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