*44l ) 93 ( ^?S<- 



X fin. 0*"-"' _ d(^fin.(p^' * cof. 

 (i-cof.Cp)'" — '^^' (T-cof.(p)^ ' 

 irt adeo totum negotium ad integrationem formulac ; 

 //Cpfin.Cp^-^cor. (|) 



(i-cof.Cp)~ ^'^ reduaum. 



§. 5. Ad hoc integrale inueniendnm fingatur eius 

 forma: 



^ Qfln.Cl^^^-^cof. ^^ etfin .Cp"'-' (Sfin.Cl)'"-^' 



^ ^(i-cof. Cp )'"" — (i-cof.Cpf-" "^ (i-cof, CpJ'^~ "^ ^ ' 

 vnde fumendo difFerentialia fiet: 



^/(pfi n.Cp^^-^cof. Cp^afOT-O^CPfin.Clr-^ cof Cp 

 (i-cof.Cp)'" ~ " (i-cof.Cp)'"-' 



a(w- i)^Cpfin.Cp'" p(;»4-i)^Cpfin. Cp^^cor:^!) 



+ 



(i-cof.CD)"' ^ (i-cofCp)'"-^' 

 (3(w+ O^Cpfin.Cp'"-^' 



S^n-f-j 



( I - cof (p)" 



rcducenda binos priores terminos ad eundem denominato- 

 rem hanc induent formam: 



a {m-i )(i<P fin. Cp"*-" (cof (p- cof; (p^- fin.(pO 

 (i-cof.^p)"» 

 a'//;— iWcpfln.Cp''* 

 = - T''^^^^^""^" <"> cof. <})' + fin. (D- . . 



F-odem trodo bini pofleriores termini ad hanc reducuntur 

 expreffionem 



£(_w-j-_i_y^fln.^ 

 ~ ( 1 -col.(p)'^' • 



M 3 Hinc 



