2 62 T. Formiila Polynomiorum. 
©itru^s m = 5, n = ^; oii Uiivt [n] = f, [n— r] 
= e, c. \\ y. ^^(atrot biffc fiJt-jU 6 (Jo«fficiciucr, c, f\ fa« 
^ lilW ^/r(b^I^c)^ ^ -1:4 T(b)^ 
= loa^TCb^^pe)^ loa^ T(b ^ d)' 
5aT(b^K)^ 4^ T(b)^ 
91u er T(b-P»^^e)- = sbe 2cd; 
T(b^-^^pd;' = 3bni ^ ?^;bT(c)^ = 3h^d ^ 3be$ 
T(b^c)* =:4b^c; 
T(b)^ =b^ 
©evaf faace T(a^^ ^f)^ = sa^f^- I0.2a'(be>^cd) ^ io.3a^(bM^bc^) 
4^ 5.4ab^c »-P b^* 
§. 10. 
^CJHÆtfntng 4* Q5^ttagter man Utct neme gormekti^ 
T(a4.^[n]r = ma--^[n] ^ ^f^^ a"^-^ T(b 4< ^ [n-- 
f^i;^:^!^^ T(b ^ ^Tn^2])3 ^ ^ ^ 
' J,*!2* 3°°°' 
Sit SalccefficKnterne wii te fwf!ilte ©efc; Btyort feen føgte 
^mm foniiiila polynomiaiis l^at ^iirfteSfm af en fqmiula binomialis. 
I?) Mik Sele af Soefficientcrne, f^maf a*"~^ ei? eii gactiji^/ 
fiifeeé famkt paa smgan^, JDer gitjes a(iit) m af ^cnu 
c) 3)e 
