DE FRACnONIBFS CONTINFIS OBSERJ^. It 



c—b c — .a 



-^ —-zzr poiito pou vtram- 



qiie integrationem xzz.i. Requiritiir autem vt fmt a-\^ 

 h-c-r Gtc—b-\-r numeri affiimatiui. Sin autem po- 

 natur breuitatis caiila a -\- b — c — r ::i:^ erit 



c— & c-a 



fx^'^ ''-'dx{i~J^) ^ (/>H-^x^)^ 



Jx^'^dx{i-x^)^{p+qx'')^ 



__ _n. 



cj3 — 63-H P^(c- f->)(g H-r) 



quae aequatio latiffime patet , et omnes hadenus erutas 

 fradliones coiitinuas fub fe comprchendit. 



§. 6$. Si quantitates ^ et ^ inter le commutentur ^ 

 prodibit fequens fradio continua 



_£_c 



/a:^-+-^-^ ^i' ( I - a-n ~(p + ^.v^) ^. 



cuius acko Talor erit jir- i^ 



, /v-^- ^jt^ ( I - x'-) ^ (;) + ^ Ji'') ^ 

 Qiiare cum fradliones hae continuae datain inter le teneant 

 rationem , icilicct ^ ad ^ hinc iequens orietur Theorema re- 



c-h c—a 



^. , ^ , cfx'''^^-'-'dx(i-x'')''{p-\-qx'')'' 

 ftituto loco g fuo valore ^, ^ 



Jx^^h-c^t-^^x ( I -:c^) '^(/?-f f v^) '^ 



a-c—r b—c—tr, 



(aA-b-c-r) fx''^''-' dx{i-x'') ' '{p-A-qx'') ^ 



Sub 



