T. Forrriula Polynomiorum. 
^emc?rfm'n<J 2* gormeten enbe^ ^\)ot: a^"—"^ = a° = i , tiaac 
€7potirnten m erc ft &ecft 'lif* W^cii t)en cubeø c^faa, naau numeriis 
termini cr faa^a«^ at [n], efkc [n— i] dUt [n— 2] 0. tutxil [n— (m— i)]^ 
i bet oprinOdige 9)c^i)nDmium b Hhcx^i- dx^ »i^Hh falDee fammen meb b; f^i 
ba bHhcx4*dx^4:^>i* 6car;tibcc ubi b, faa ece bc, fom jlPufk være for 
OliUIer* D(| naar ben (n— m>t O^^^^^ff'^^'^^^ a»4^bx>i^cx^»^4^ jTPiii 
t?«rc ben førfle^ ncnUtfj a, faa tlitjer famme 0?uf uDi b^cxHhdx^'i ^^* 
S)eraf folgec oøfaa at ben anbcn Koefficient ubi a'4-bxHhcx^H['>{< 
tUtjeir altib ma"^~*b, fom forben er fagt; t&i ^ec er [n] =: b, 09 
T(b Hh* [n-i])^ = o. 
^emcerfmng 3* 3)en tilbere Ubt)iffino af 35e(ette ubi 5ormefe» 
jFeer efter ben famme gormci \)eb @u6jli(ufioncr ; famme fcb ^ifer: 
Syempef i* 9{t an^it^oe ben perbe Eocficient (ben til x^) ubi ben 
femte ?)otent6 af aHhbx*cx-Hhdx5>i^+* 
^er cr m = 5, n = 4; 
[n]=:d, [n-i] = c, [0-2] = b, [n-a] — a; 
berfor T(a+*d)> — 5a^d Hh f^a^ T(b^t'c)^ * |^;^a^-T(b)\ 
mu cre T(b)5 = b% 
03 T(bHhc)^ = abc; 
berfor T(åHh*d)^ == ^a^^d Hh io , sa^bc * ioa^b\ 
^,J?enipe{ 2, Cab m = 5, n = 5; faa BCIwr [n] = 
{H"-!] = d, [n—a] =: c, [n— 3] = b, [n-- 4] — a5 øg T(a»f\^e)»' 
_ 5a^e *^^a^:T,(bHhi^ ^^l^^a^T(b^cy Hh j ;^f|~aT(b)*, 
'mu ^ac man T(b>^4-d)^ = 2bd Hh T(c)^ = ebd * ; 
T(bHhc)3 =:3b^-c; (Dicjlen ere SKug 
T(b)^ = b^ 
S)eraf faaee T{d,^i^y = ^a^e Hh ioa'(2bd4-c^) Hh 10 . sa^b^c ^ 5ab^ 
8 la €j*em^ 
