A E QV ATl NI S. itfi 



5i i rr o ; huins aequationis : 



I. dy-\-ayydx~accX~ 4 dx, integrate erit: 



CICX — * -1 li2 



S\ ici; huius aequationis : 



II. dy-\-ayydx~accx *dx? integrale erit : 



— T J —j I 



*cx M-^i-.-^^- 1 . *l~acx 3 +i-+-frc 

 .HyX Z=. « m^-LJ^-^L ■ 3 -^ 



^ i -f- _; v ^c l "+- ~Tc 



$t izzz huius aequationis : 



III. dy-\-ayydxzzaccx s dx > integrale erfc 



W-ii, ^"* I | 3.4 | . g'3. ♦. S X? , _ t.2.^4. 5.6 f££ 



1 "T- 2 . s * oc "T" ,. 4 . s * _* c» 



Si J zz 3 ; huius aequanofris : 



— H 



IV. dy-\-ayydxzzaccx J dx> integrale erit • 



*yx 



gCX 7 | 4. 5 i 3.4.7. 6 X7 l 3.3.4.5.6.7 *7 l _l»2*?;4. y.6.7.» «7 



" 3.7 2. 4.7 2 " OC J.*.'.7* a 2 C J ' 2.4.6.8- 7* ' Q* C? 



12 3 



. 5' 4 X7 ■ 3. 3. 4. ? 07 } I. 2. ?. 4 . 5> -5 X7_ 



1 "T" 3 , j ac ""* a .+. r 2 * « 2 c* "T" 2 . 4 , 6 . ~ 7 -~" «* c 



Atquc ex his cafibus analogia patet, cuius ope omnium 

 cafuum , qui quidem integrationem admittunt , integra- 

 lia algebraica expedite formari poterunt, 



Scholion. 



5. De his integralibus autem probe notaridum eft, 



*a xion effe completa , neque ideo aeque Jate patere 9 



Tom.IX.JMou.Comi». X ac 



