C -5 ) 



Si ponamus x :=: - p et hoc in cafii pro M et S fcri- 



M' 



bamus M' ec S' ^ eric ili' -AS' ec ^ = -t/ 



Ex aequatione CL) habemus ~-~t;t~ = -^6' -f ^'^ C^+i>} 



+ Z) ^S" (a; +/>)^ + P C^ + Z')^ • Quoniaui autem omties 

 termini in hac parte aequacionis func funcciones integrae 



vanabibs^:,' -^^^" quo^ue esc functio mtegra, h. e., 



M-JS dividi pocest ^qt x+p. Sic igitiir -^—' =0,^ 



unde 



Q^iBS-hCSCx'^p^^DSCx-^py^PCx'^py (11.) 

 Si ponamus x---p atque pro 0,^cribamus .g; eric: 



Ex aequatione (IT.) Bt^^y-zzCS^DSC^'^p') 

 -{-/^ (a- +/>)*. Eandemob racionem quam antea acculiraus^ 



Qj^BS dividi potest per ar+A ^^^^ ^^^^^^^ ^TZT' ^ ^ <> 

 imdeR- CS-i^DSCx-^p^^PCx^pf , _ _ (IJL) 



Six:=z:^p et tum il=:^% esc R'—CS'; undeC= 4. 



R — r* 9 

 Ex aequatione (III.) habemus --^t^t- =Z)5'+P(x-|-j!>), 



Pari modo continec iv — CiS" factorem x-^p. Sic igicur 

 ^^' z= 2^; turn r^z^'S+PCr+j^) . . . , , (IV.) 



Pofito X— _;> ec cum TzzT', eric T^zl^S' ec D— i> 



o 



De- 



