Hinc igitiir erit 



^Cpfin. C>^"'cor. (p_ ^(ffl- i)</(|)fm. 0"- ' 

 (i -cof. Cpj"' — ~ (i~cof. (p)'"-' "" 

 (3(m- l- i)i(Pfin.(I)"* 

 ~ (I -cof.Cp )"•-+■' * • 

 Cum vero fit 



f^n, Cp' — ( I 4- cof. (p ) ( I - cof. (p ) ; fiet 

 ^^=:H-cof.(pi hinc 



p ( ;« +i)^(pfin. (p™ _ (3(OT-4-i)^(pfin.(p'" -' fin. CP' 



(~i-cof(p)"^ "" ( I - cof. (p)'^ • I - cof. (p 



_ {3 ( w -f- I ) ^ (p fin. (p^-'(i ^-cofCp ) 

 — ~ (T- cof. (pr - 



Fiet igitur 



</(pfin. (p^-^cof^p _ «(^-^^/(Pfin.^p^^-^cof.^PCr-cof.^P) 

 (i-cof.(p)'" """^ (i-cof.(p)'^ 



(3(w + i)</(pfin. (P"^-^(i4-cof.(p ) ^ 

 ~ (i-coi:(p)'" "' 



fiue 



-a(/;/- I )( i-coC (p)4-(3(w-i- I Xi + cof. ([))=:-. I. 



Quae aequalitas fubfiftere nequit nifi fit 



a(;«-i)-i-(3(w-t-i)=:o. 

 a(w-i)-(3(;«-i-i)=i. 

 vnde coUigitur 



et hinc habetur integrale quaefitum; 



