) so ( y&» 



//£ = 9,777556"S 



/5 — 0,5991792 hincque £ = 3,9735 

 //r = 9, 1775798 



//e = 9,77<S759° 



/£ = 0,5980795 hincque 6=3,9635 

 Hic ergo quoque euidens eft, terminos (3, y, £, e etc. continuo 

 magis a limite v^ = 4 recedere et continuo magis ad alterum 

 limitem (J)= 2 appropinquare. 



§. 24. Intcrim tamen manifeftum eft, fi ftatuatur exafte 

 a=4, tum omnes fequentes terminos prorfus eundem valo- 

 rem efle retenturos ; ftatim vero ac littera a \el tantillum fu- 

 perauerit limitem 4 , fequentes terminos continuo magis eum 

 effe fuperaturos , quemadmodum fequens calculus , fumendo 

 a=4, 01 oftendct. 



/a = 0,6031444 ideoque a = 4, 0100 



llr — 9, 17 75798 



//(3 = 9,7807242 



/|3 = 0,6035652 hincque (3 = 4,0138 

 //r = 9, 1775798 



//y = 9,78ii450 



/y = 0,6041502 hincque y = 4, 0293 

 //r = 9, 1775798 



//£ = 9,78173°° 



/£=0,6049645 hincque £ = 4, 0268 

 //r = 9, 1775798 



_ — 



//e = 9, 7825443 



/e = o, 6061000 hincque 6 = 4,0373 



hinc 



