.71478270079129427201898487962108409673134559709443031939645700411546117738335\
879706770213413096294533561547227555717895434127457058654186783324525211448435\
423370160734747472156550615029635220251467885538763575736849440141040232425552\
364704664879061099570515393895856312208463669793487083110116620844381148478166\
953397235099760820248716126335472464734965931893615249427223312525010786175723\
903850094286618856777573472030439593602004416562703436281430743460123517870481\
605658651710683396096658326275655282564938079930443149087689479702230621110332\
425071472991466740480185001283536160284031917506648494911514005453049419741227\
682161417117934301981301137112382110439175900888848785626934265741110708345544\
731999904108101036079296059394893034776038533840976912765053467151339515952296\
425034733122079333744376059531233173573812633038639781766805813536012423214277\
007401299039458343003042376467569131088941308597225474822014342730622766746260\
22472480156659330677754354367566446245619515011589704068286465445
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The Tribonacci constant, is such that 1/(1-x-x^2-x^3) once expanded into
a series will give coefficients proportional to approx.
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