now :: thesis: ( not 2 divides 619 & not 3 divides 619 & not 5 divides 619 & not 7 divides 619 & not 11 divides 619 & not 13 divides 619 & not 17 divides 619 & not 19 divides 619 & not 23 divides 619 )
619 = (2 * 309) + 1 ;
hence not 2 divides 619 by NAT_4:9; :: thesis: ( not 3 divides 619 & not 5 divides 619 & not 7 divides 619 & not 11 divides 619 & not 13 divides 619 & not 17 divides 619 & not 19 divides 619 & not 23 divides 619 )
619 = (3 * 206) + 1 ;
hence not 3 divides 619 by NAT_4:9; :: thesis: ( not 5 divides 619 & not 7 divides 619 & not 11 divides 619 & not 13 divides 619 & not 17 divides 619 & not 19 divides 619 & not 23 divides 619 )
619 = (5 * 123) + 4 ;
hence not 5 divides 619 by NAT_4:9; :: thesis: ( not 7 divides 619 & not 11 divides 619 & not 13 divides 619 & not 17 divides 619 & not 19 divides 619 & not 23 divides 619 )
619 = (7 * 88) + 3 ;
hence not 7 divides 619 by NAT_4:9; :: thesis: ( not 11 divides 619 & not 13 divides 619 & not 17 divides 619 & not 19 divides 619 & not 23 divides 619 )
619 = (11 * 56) + 3 ;
hence not 11 divides 619 by NAT_4:9; :: thesis: ( not 13 divides 619 & not 17 divides 619 & not 19 divides 619 & not 23 divides 619 )
619 = (13 * 47) + 8 ;
hence not 13 divides 619 by NAT_4:9; :: thesis: ( not 17 divides 619 & not 19 divides 619 & not 23 divides 619 )
619 = (17 * 36) + 7 ;
hence not 17 divides 619 by NAT_4:9; :: thesis: ( not 19 divides 619 & not 23 divides 619 )
619 = (19 * 32) + 11 ;
hence not 19 divides 619 by NAT_4:9; :: thesis: not 23 divides 619
619 = (23 * 26) + 21 ;
hence not 23 divides 619 by NAT_4:9; :: thesis: verum
end;
then for n being Element of NAT st 1 < n & n * n <= 619 & n is prime holds
not n divides 619 by XPRIMET1:18;
hence 619 is prime by NAT_4:14; :: thesis: verum