T. Formula Polynomiornm. 
f^cv fccc^ at gi\}cé 25 6ctn'cct<*»H' ^robucfcr, fom iffc fctw fAUilcg i ce« 
CumTiU'. 3<^9 ^^^^^^ f^^f^^f tocnbe "J^cfc, fom erc ØTulfi'r/ ueijiltq 4a''o 
O'jI ~^a^2fao, for at tøife ^ualogle« t t>m ga^^fH«^ (§* lo* e)* 
12. 
(Scejtlcunucttie 6tcocr fof ftevjle ®etcn paa niimeriis termini^ t)eef6 ogfaa 
paa Sxponcntai af iDcn potente, ^ttor(i( SocjftcieiUcciK ©et f!&(Ie 
(^aoiU* iffc bittere, naar (SjL'poncntcn m — n — i; t^t 6(it?ec faaimc ciibuu 
(løifc^ faa foranDi'fé ^crvcl) b(ct ^atcccfficieutcmic af bc cnf2lic ^tobncUt, 
ti^cu at 9)ut!i(]bct! af fatiuiK, foin ^etcrccieiic 5)cfc, forfiørrc«* 
g» Sjc* 3c^ai* n = 4, faa Mitter ben ficv^e Soeffkieut ubi bcii trebte 
5)otcnré {d^^bx^cx^ ^-hy T(a^>|-d)^ =: 3aM 3aT(b-^c}^ 
T(b)^ — 3a-d -^^ 3 . 2abc b% 
?aac§ in 5, faa 6H^ec 
T(a^.^d)^=5aM>p^^a^T(b>pc)->^5^l^^ ' 
= ^a'^d >-p 10 . 2aM)c ioa^b% 
©cftc fec6 umib^elbat* af bm atmiubcnc^^ Sormd; tl)i naar Srpcnenteu m 
^ar t>a\ ©førrelfe, at ubi bet fibfis Stp^'fé T(b [u--(m-^i)])'" ben 
(n— (m^i))te Sot'fficicnt blimv famme nicb b, faa eiibee ben, 09 cnjj^jeiv 
fceiere (S^i.toncnt fotanbccc Sinomiafcocjficieutenie iibl gøruKfciiv men Qi'on 
xtte nuxe enfdtc .^ctscca^ne ^robuctcr, 
Cnaar n < f a cubee ^ovmUn fov ben a, fom ben førjie goeffi«^ 
dent, ubgaaer tibaf T^ro^ucterne♦ 
got n — 2, elU'c for ben anhm (Eoeficient i eii|iJCf 5)otent<^ m, 
^av man, fom fcrfccn cc fagt, ma"^~^b, 03 for ben trébie rna'^'-'^b 
^^-O^LTjOa— b^ 
