^4. 'DE ^QKmnr. irRmscnmmrr, 



.qul valor loco y rubAitii.Uur inTormiilrA' ^^'^f^^^m 

 ficqne exprimetur x pcr z et nouam conlliniem arbi- 

 ^trjriam i/b, qui n^alor .erit iotcgrdle ^completum ^tmis 

 ; aequationis dififercntialis :: 



,V(A-+-Cxj(;h-E^«) — «■fy(A-i-C*2-t-£^*} 



33. Statuamus .n A~«n j/, nc fjmamus Talo- 

 !rem ipfius ^l ium efle inuentum , atque es praceedea* 

 tibus colhgimus , ;Ti capiatur 



jyVA(A-4-Cfefe-j--Efe<)-f-J'VA(AH-"Cj.'V-4-Ey *) 



•■* — A. — Elikjy ~ 



foteli^xzzin^^^Jl.y. Cum igitur cafu r,— t Hc 

 ifeirj', ivalor hinc pro rx inuentus djbit \alorem ipfius 

 ,k pro cafu m ~-2, ^nde reperitur u*, \t fit 11. ji— 3 n.7. 

 Qiii valor porro pro ^k fnmtus '-eum -praebebit valorem 

 ipfius X, vt iiat;II xzz^U.y^ Ticque, quousque lubueri^ 

 ;progredi licet. 



'34-. Inuento nutem 'valore ipfius t, vt flt ^.«; 

 rrwTI.j/, erit is integrale particulare huius aequaiioiirs 

 fdiffiirentialis : 



^ X ^___ ; ; H y 



-,V(A •+■ Cjcx-f- E**J — fV (A.-+-Cyy-+-'Ey) 



^um vero capiatur 



'•^ — " .A — Eizkxx 



ficque obtinebitur valor integrahs iipfius rs xoiiTpletus jyra 

 hac aequatione >difrerentiali : 



d 2 ^_ ^ r nd y 



V(A -t-Caz-f-jEz"*) ^[\-^Cyy.+-'Ey*) 



«crit iCnim H.s — IX.j^-t-II a — 11 ■^-HiPiTrj' 



Tab. I. -35- Contemplcmur nunc ^tiam in geneie formu- 



W^ i. hm latius i^at^mein , camque ad lineam tairuntn 



