Opdscuia 4^1 



49/»t'-l-63m4.20_ • 4m'4-2m 4m^-Him-4-2 IGm'+ ^ O^'-t-S 

 ^2~~" 2 "^ 2 2 



25m'+357n4r12 



• • "^ T~ 



49m"--t-77m+30_ 4m'-»-(;/;i-f-2 , 4m'-4-Gm-|-2 l6ni'-+-20r«-f-6 

 2 3 2" 2 



, ,25m'4-45m+20 

 + -2 • 



-.(Tandem animadvertendiim est series generales 



lU 'Yu 



. n'-+-n 4n'-f-2« 9n'4-3fj 16n'--\-in 



v. ^^^— . — — — . pip 



2 ' 2 ' 2 ' 2 



„«_|_3n-}-2 4n'4-6»4-2 9/r+9»4-2 16n'+12«4-2 

 c' - |2~^ :•» 2 ' 2 ' ^ 2^^''"'" •''•■"■' ' 



n''+5n-4-6 4n-+10n4-6 9«=_f-1 5n-i-6 1 6/»"--|-20n-f.6 'J 



' 2 ' 2 ' 2 * 2 ^^*^*" 



„''^_7^+12 4«'4-l4w4-12 9«»+21n+12 1 6n'-f-28n4-1 2 

 2 ' 2 ' 2 ' 2 



etc. etc. etc. etc. 



seu potius earum termini generales 



«■ m' -+- n n» 



2 

 n»m'4-3nm+2 J» 



2 0£ 4- ^ 



n' m' -f- 5 n m -4- 6 i" 



n" m" -I- 7 n m -f> 1 2 



2 



decomponi posse in tot numeros triidngnlares qnot sunt qnadrata 

 in quae n'' divisibilis est, dummodo aequaliones inde emer- 

 gentes inter indeterminatas quantitates h, a, g, /, etc. numeris 

 integris resolvi possint. Sit ex. gr. «'^o'_j-/?»'+c'4.6?=4-e'-t-/= 

 4-etc.j unusquisque terminoriim generalium ponatur = 



) , r-l'l!. <i'.I'.V M 



