Relation of Boubaker Polynomials to Fermat Polynomials

Theorem
The Boubaker polynomials are related to Fermat polynomials by:
 * $B_n \left({x}\right) = \dfrac 1 {\left({\sqrt 2}\right)^n} F_n \left({\dfrac {2 \sqrt 2 x} 3}\right) + \dfrac 3 {\left({\sqrt 2}\right)^{n-2}} F_{n-2} \left({\dfrac {2 \sqrt 2 x} 3}\right): \quad n = 0, 1, 2, \ldots$