CVIVSDAiM INTEGRALIS. 131 



•vndc pro cxponcnte 1 n erit 



..+,6....(.»-.)(^j(.-4)(-4)....C-i^-)= 

 ,.3. 5....^-™-0{ri;)(r^K-4)--C-^) 



Simili modo fi communis diuifor fit 3 pro cx- 

 ponente 3 n repcrietur 



i...+.S..(3»-=)(3«-i)(H;)(n;)(Hii)(i:)..-C-^) 



quae aequatio concinnius ita exhiberi poteft ; 



I. 2 4. 5. 7. 8. 10 {'^m—^)[% m —i) 



3*- <5\ 9' (3^-3)' """ 



ij^J (t^J (^)' 



In gencre autem fi communis diuifor fit d et ex- 

 ponens dn habcbitur. 



[rf. = rf.3rf....(rfm-«')(jl^)(ll)(l4.) {'i^)-f= 



,. .. 3. + ....(rf/»-i)(,-i^)(/^.)(ij) Ci^) 



quae aequatio ficile ad quosuis cafus accommodari 

 poteft vnde fequens Theorema notari merctur. 



T h e o r e m a. 



59. Si a fuerit diuifor communis numcrorum 



w ct n haecque formula (t) denotct \alorem inte- 



R 2. gralis 



