Let q=e^(i*2*pi*t),
If u(t) is ramanujan's octic continued fraction,is it true that the generator of the octahedral group can be expressed as a continued fraction of the form

(u(2t))^2=(2*q^(1/2))/(1-q+(q*(1+q)^2)/(1-q^3+(q^2*(1+q^2)^2)/(1-q^5+(q^3*(1+q^3)^2/(1-q^7+.....
For |q|<1