THEOR. CIRCA DIFISORES WMER. cet.. 173 



Theorema 5^. 



Omnes diiiiforcs primi numerorum huius formae aa— 

 bb funt vel 2 vcl 3 , vel 11 vd in his formulis conti- 



n A 

 O J 



nentur : 



1 3 2 w/ Jh I ; 

 132«/ 3^-25; 

 1 3 2 /« 47" 3 5 i 

 . i32w4:4^; 

 132W-4- 37; 



132;«- 

 132;«; 



1 3 2 w 

 132;// 

 1327;/- 



.17 



41 

 31 



quae reuocantur ad has 

 65;« -4- I 

 66 ;/;-£■ 1 7 

 5(5;« -4- 25 

 66?fi^ 29 

 55;;; -f- 31 



Theorema 5;^. 



Omnes diuifores primi uumerorum huins formae a a - :is 

 bb funt vel 2 vel 5 vel 7 vel in his formulis continentur • 



14.0;;;-!- 9; 140;;;-}- 59 



1 40 ;;; -1- 1 9 ; 



i4o;;;--J5 23 ; 

 140/;;-}- 33 ; 



140;;; -4- I ; 

 140;;/+ 29 • 

 1 40 ;;; -f- 1 3 ; 

 i40/;;-4- 43 • 



1 40 ;/;-+- 3 1 

 1 40 ;;; -j- 57 

 140;/; ^- 17 



Theorema 58. 



Omnes diuifores primi numerorum huius fonmae aa-^o 

 bb funt vel 2 vel 3 vcl 5 vei in his formulis contincntur 



i2o;/;^3 I ; 

 I20;;/-f- 37 ; 

 1 20 /;/ + 1 7 ; 



iiom A- 49 

 120;;; -4- 29 



120 //»-4;- 13 ; 

 120OT J- 7 j 

 120 ;/;-[- 19 ; 



Theorema 59. 



Omncs diuiforcs primi numcrorum huius {()rmae aa- 10$ 

 bb funt vcl 2 vel 3 vcl 5 vel 7 vcl coniincntur in his 

 formulis 



Y 3 420 



