FROPRIETATE GAVDENTIVM, i8p 



«Jentes , quae aequalis effe debet o , fequens (pofito qzz 



JK) V.b^-^-hqdx.b^^-^-JAdx.b^-V.b^-Ldxdq.bt 



\\\ IV 



— Ldxdq.bt — hdxdq.b'^ etc. donec ad pundlum z 



erit perucntum. Abrcifllie autem OC refpondet valor 



II 



L; quare fi punAum z in c incideret haberetiir prae- 



I I 1 



ter terminos \. b^^-^hqdx. b^ ^JAdx.bt-N.bt 



tmtum —Ldxdq. b^. Sin autem'ih vf incideret ha» 



n in 

 beretur —dxdq.b^{L--\-L) et refponderet abfcifllie 

 AC-hdx. Sumto autem in ipfo punfto 2, et pofito 

 abfcifliie interuallo CZ — ndx erit terminus adiiciendus 

 et refpondens abfciflae 2. — 0C-{^ndx ifte —dxdq, 



II III IV 



^g(L-|-L-f-L HL'''"). At cura fit n 



II 

 numcrus infinitus, erit ifte terminus —-~dxdq.b^{nL 



«VL" n^ddL^ n^dV^ 



etc. ). 



1.2 1.2.3 l.£. 3.4 



§. 37. Cum autem diftantia 02, fit data ideoque 

 conflans, ponutur ta —a, erit x-^ndx — a.^ hincque 



n — °-j^. Qiio fubftituto erit terminus ifte ab V.^6 



I II 



'-\-L.qdx.b^-hM.dx.b^ — Y.b^ auferendus fequens: 



dq.bti{a-x)L-\- -— dx- -h -rm^- etc. ] 

 At /Ldx fi poft integrationem ponatur «locojf, abit 

 in hanc exprefiTionem : 



Aa 3 /Ldx 



