XZ2 



DE DinSOKlBrS 



♦ p- p-i p. p-t. p-i 



Neivtoni efle a^ = i -^ i ''i^ i -hp-+- — - 4- :; — ;; ;p 



I. 2. 3- 4- 

 numems dcterminatus , cuadet terminus vltimus ~, o , ob 

 numeros naturales omnes , et confequcnter cti:im primos , 

 fucccduie a p fubtrii<flos \ fcd hoc pido icrminiis pcnulti- 

 miis cuadci i , et tcrmini inrernvviii riiiiidi qnidcni po- 

 terunt per 2 , i. 3 , 2. 3. 4. , ctc. fed nullus liorum 

 diuiforum qiudrabit in p , ob luinc primum \ ergo in ca- 

 fo particulari feries acquirct hanc facicm 2p— i-+-p-|- 

 pa4-p(3-hp(3-i-pa-i-p-hi-}-o , ex qua fit 2^-2— p 



(2-^2a4-2(3) , et confcquenter — - — -2-t-ia-i-2(3, 



numero intcgro , et pari. 



^. 19. Memlni C^/^^rmw«w E///rn/;» aliqnando com- 

 municalfe mccum , numerum talem vniucrfalcm a-\- 1 ^h 

 Vaa-w nunqnam diuidi poflTc pcr w. Hnius dcmonftra- 

 tio hacc nunc mihi fuccurrit. Ponam cffe m diuiforcm , 

 et quotum prodentcm ^, crit fic a-^i-^-^^za-mzzbm. 

 Vt aufcratur irrationalitas , fumatur V3.a-m — e ^ vndc crt 



<j— , tf-|- 1 ~ ,quae fubltituta numc- 



2 2 



ff'-f-W-f-2-4-2tf 



nim vniucrfilem propofitum reddunt hnnc ;; , 



vel hunc , in paullo nuitatam fbrmam rcdadum , 



