' T" Formula Polynomioriim. ' ^»7^ 
tn t\<\cUhe^ for hen (ni'i^i)te. max nhl famiit^ø Jormef i^etm for m 
fcst.'ié m »-p I,, faa <?ii§\>er. I>ec! mnUlplknn mcD a,, og en^yer ^im^ 
mtalmf^Uimt Midjer tif famme JDcd |en§^renDe w^i ^ot^iufc« m 
^ (S t n i n § 
Sen fremf^tffe ^ofpnomialfonitel ^at ben famme ofminbeflge 
'liotciitfer, f)t)ié €Tpønenrei? m Sref effer negatiDe JJaf* 
^eDité* ©fc'tte 6c^ifc$ lett^fl \3e^ et anDet SJc^iiø, fom fa« gi^es 
for 5^o(i;uonvia(fornivUn* 
= a HH y / clfec 
y — bx ^ cx^ >!< ^ [n— 2]x"-5 ^ [n«-.i]x"-^ ^ Mx''""^ ^ 
y^ =: x-(b ^ CX ^ ^ [n— 2]x"-4. ^ [n^ijx"-? ^ ^)^^ 
y5 = x^=(b >^ CX >^ [n— 2]x"""^ ' 
y'" = x'"" (b q^cx^^ [a^(m--.i)]x"-"^~' ^ 
2) (Siibt?it)ere - 
(a 4^ bx ^ CX* ^ ^.y" — a"" ^ ma^-""y >i< '^iJ^:^^ a,"^-^ ^ 
1.^.3-^ 
S)effc pntcr ©feb efter ^inomiaf formelen^ 03 gtc^tter ogfaa |iJor m cr eiu^tt 
3) Df>faa l^or Eipfttgen ubi Slo* 2 pnber @teb^ BHtJcr ben nu Soeft^ 
cktit, bet er Socficknten for x"""^ ubi (a-^y)"'' cOer ubt (a-pbx^pcx^^ 4^)% 
©umtttcn af a((e €o^fftcicuter for x""*"^/ fom cr snbe^of^^n ubi ma"'''~'^y, 
^'""""^^ ma^'-^-y^ o* f. p., cikt ubi en^vjer ^otenté af y, f» y'^ \mU 
lipliccrct mcb be« bertil ^ørcnbe SBitiomiaScoefficignt og meb a^^^^'v 
