i6« Aloysii Casinelu 



Ex qiiibiis cxpressionibus deducimus lerminum generalem 

 seriei (B) esse. 



lA-+-230;n-1 H-1 1 00^ J ^-1-2695-!: \ ■/ 



+4045 2;^-^ +3824 — — 



(„_1) . . . („_6) („_1) . . . («_7) . (n—1) ...(«— 8) 



^^^^^ -2.3X5:6— +^^^-23.4X6.7- +^°^Sx4:5-:6:W-^ . 



Quod atlinet ad coellicienies numericos 



24,250,1100,2695,4045,3824,2230,735,105 

 e formula generali inveniemus esse 

 24=24 



250=274 —24 

 1100=1624 —2.274 +24 

 2695=6769 -3.1624 + 2.274 -24 

 4045=22449 —4.6769 + 6.1624 — 4.274 +24 

 3824=632765—5.22449 +10.6769 —10.1624 + 5.274 —24 

 2230=157773—6.632765+15.22449 —20.6769 +15.1624 — 6.274 +24 

 735=357423—7.157773+21.632765—35.22449 +35.6769 -21.1624+ 7.274-24 

 105=749463—8.357423+28.157773—56.632763+70.22449—56.6769+28.1624-8.274+24 



Ex quibus deducimus terminum generale seriei nolum es- 

 se si dati sint priores uovem termini ipsius. 



