User blog comment:QuasarBooster/Beklemishev's Worms python code/@comment-3427444-20180322054347/@comment-30754445-20180322230411

Found them!

I mis-remembered, though I got the general ball-park correctly. The approximate value I got for Worm[3] is about fω×3+1(4).

A more accurate representation of the answer I've got can be written in PGN (Psi's Geometric Notation) as:

[ 3 (1) 6,8,10,12,14,16 (1) 19,21,23,25,...,53,55,57 (1) 60,62,64,66,...,168,170,172,175 ; 173 ]

And since you probably asking yourself "what the heck does that mean"?, here is the corresponding expansion with the FGH:

fω×33(fω×2+56(fω×2+48(fω×2+310(fω×2+212(fω×2+114(fω×216(fω+1919(fω+1821(fω+1723(fω+1625(...(fω+253(fω+155(fω57(f5960(f5862(f5764(f5666(...(f5168(f4170(f3172(f2175(570)))))...))))))))...)))))))))))