THEOREMATI<; ANALYTICI. 2;, 9 



Quum vero nuiic cx ruprji allatis §. III., conflet 

 effe 



cuiJens eft terminos 



{Px- d. \l/'_x (px ci . ^ X v[)'ji ; 



cx aequatione nnodo allata eliminari pofle , fi ad 

 vjy ^ 4- Cp r vp' / addatur tars tundio ipfius ^, cuius 

 pcr X expredae primus terminus fit 'L^^L^ ^ (juae 

 proprietas manifefto coiripetit ipfi ^— ^^*J- , tum au- 

 tem fiet 



^ (I>x'dJ.!T a4)'y_ g)xM3 <t)A4/A? I -^^ 



^ .... d^, "..... dl^'^^^^' 

 lam autem liqnct ad terminos- '>^---H )'i-i-*f-»'>i 



$£2^.v{/x , (^x^ dd.<^x\i/ x __ (Pxddit lx^.^i^x -^^' dd.^x ^\y x 



elimioandos requiri , .vt addatur ^J:^±J.^ atque fi-, 

 mili ratione hoc ratiociniiim "vlterius profcquendo ,, 

 etiam tcrmini diff,rentialia altiorum graduum inuol- 

 ventes eliminari poCTunt , adeo vt rcmaneat folus 

 primus terminus ',',-:x> 



VIII. Si T defignet fundionem quamcunquc 

 ipGus t , ope Thcorematis huius valor fundio- 



nis 



: .h 



