let a, b be Nat; ( a,b are_coprime implies a + b,((a |^ 2) + (b |^ 2)) + (a * b) are_coprime )
assume A1:
a,b are_coprime
; a + b,((a |^ 2) + (b |^ 2)) + (a * b) are_coprime
A2:
|.(((a |^ 2) + (b |^ 2)) - (((1 - 2) * a) * b)).| in NAT
by INT_1:3;
((a + b) |^ 2) gcd (((a |^ 2) + (b |^ 2)) + (a * b)) =
|.(((a |^ 2) + (b |^ 2)) - (((1 - 2) * a) * b)).| gcd |.1.|
by A1, Th74
.=
1
by NEWTON:51, A2
;
then
(a + b) |^ 2,((a |^ 2) + (b |^ 2)) + (a * b) are_coprime
;
hence
a + b,((a |^ 2) + (b |^ 2)) + (a * b) are_coprime
by Th73; verum