Hinc iam binac partcs cadem poreflate ipfiiis x aHc<ftae 

 in vnam contrahantiir, ac rcCultabit pro A rcquens forma: 

 Azijr^ — jr*- .t'(i -ATx) — .v'(i — .r.v)^i —x') 

 — X"(i-A-'](i-:r')^i-A-*) — etc. 



vbi duo termini primi x x — x^ iam funt eiioluti; fequcn- 

 tes autcm procedunt per has potellates: x\ x% x"^ x'\ x^* 



quarum cxponcntcs binario crcfcunt. 



§. 3. Ponaraus nunc fimili modo vt ante 



A — .V A* - -V* — B, ita vt fit 



B = ^x'ii-xxj + x'(i-xx)(i-x') 

 -i-x" (i —xx}{i ~x'){i -jr*)-|-etc. 



cuius omncs tcrmini habcnt fjfiorcm communem i — xx, 

 quo euolutp finguli termini in binas partes difccrpantiir, 

 vti fcquitur: 



B-x'-\-x^(i-x')-i-x"(i-x')(i~x')+x"{j-x')(i-x*)(i-x-)ctc, 

 -jr'-A-"(i-jr')-;r"(i-.r')(i-j»')-jr'*(i-A'')(i-x*)(i-.v')etc. 



Hic itcrum bini termini, qui eardcm potenatcm ipfius x 

 habent pracfixam, in vnam colligantur et prodibit: 



B=zx'-x'^-x"(i-x')-A"{i^x'){i-x*) 

 -x"(i-x')(i-jf*)(i -.v*)-etc. 

 vbi i?.m potcnates ipflus x crcfcunt ternario. 



vt fit 



f. 4. Statuatur nunc porro B — a:' — j:" — C, ita 



C = r" (t - .r04-.v"(i -jr')(i -.v*) 

 4 Jr'\ I -;r') (i - jf*) (i - J>r') + etr. 



ct lAm finculi rcrn.ini pcr cnolutionem fadloris i — jr* in 

 binas parte^ rcfoluantur, fictquc: 



Cr 



