let A, B, C be Point of (TOP-REAL 2); ( A,B,C is_a_triangle implies ( not angle (A,B,C) is zero & not angle (B,C,A) is zero & not angle (C,A,B) is zero & not angle (A,C,B) is zero & not angle (C,B,A) is zero & not angle (B,A,C) is zero ) )
assume A1:
A,B,C is_a_triangle
; ( not angle (A,B,C) is zero & not angle (B,C,A) is zero & not angle (C,A,B) is zero & not angle (A,C,B) is zero & not angle (C,B,A) is zero & not angle (B,A,C) is zero )
then
( B,C,A is_a_triangle & C,A,B is_a_triangle & B,A,C is_a_triangle & A,C,B is_a_triangle & C,B,A is_a_triangle )
by MENELAUS:15;
hence
( not angle (A,B,C) is zero & not angle (B,C,A) is zero & not angle (C,A,B) is zero & not angle (A,C,B) is zero & not angle (C,B,A) is zero & not angle (B,A,C) is zero )
by A1, Lm7; verum