OfUSCULA . 
C — fJDjCh.^^jp* 
qux eft fccunda ex propofitis . Haec du^la in — dematur a 
prima ^ 
^^-^^^•^^•^^-^3_4^5.V_2^^.DjSh.^(p,Ch.^(b 
\ 4-2 ^ ^ . D y Ch. q (p 
qux prima eft ex propofitis . Quarta duda in ^ dematuf 
€x tertia ^ 
^ ^^-4^?* (— 2^^DjSh.^^. Ch 
( +gg — 2qq.DyCh.q(p 
qux ex propofitis en: uUima . Itaque integranres aequationes 
quartam , quintam , & fextam nancifcemur fummatorias 
^ _2 Sh. qO? 
, S h . ^ 0) -r^ ■ ( — lgq^h.q(p.Ch.q(p 
( + 2g'5'Gh.^(|) 
( — ^shTT? 
( — qCh. q(p 
(i^^sTTT?' ) 
Syi(p^^h.q(p , ♦( — 2^^Sh .^q?. Ch .^0) ^Q^E.I. 
( -4-^^ — 2 ' C h.^33 ) 
VIII. Manifefium ell, fuperiores integrationes deficere, 
Ut hos quoque cafus abfoh/am , adverto DjySh.^^ — - 
1 
2 Djy S h . f 05 . C h. f (|)H-D^ C h . <7 cf) —o. Hoc cerro cogno- 
fces per adualem diiferentiationc-ra . Fiat integratio cum addi- 
tione conflantis );Sh.^9iii2_)iSh . q(D,Ch.qc^-\-y Ch.q^D^ A, 
Ut rite determinetur fiat (p~Of & j/ — i , & proveniet 
