let A, B, C, P be Point of (TOP-REAL 2); ( A,B,C is_a_triangle & angle (C,B,A) < PI & A,B,P are_mutually_distinct & angle (P,B,A) = (angle (C,B,A)) / 3 & angle (B,A,P) = (angle (B,A,C)) / 3 & angle (A,P,B) < PI implies |.(A - P).| * (sin ((PI / 3) - ((angle (A,C,B)) / 3))) = |.(A - B).| * (sin ((angle (C,B,A)) / 3)) )
assume that
A1:
A,B,C is_a_triangle
and
A2:
angle (C,B,A) < PI
and
A3:
A,B,P are_mutually_distinct
and
A4:
angle (P,B,A) = (angle (C,B,A)) / 3
and
A5:
angle (B,A,P) = (angle (B,A,C)) / 3
and
A6:
angle (A,P,B) < PI
; |.(A - P).| * (sin ((PI / 3) - ((angle (A,C,B)) / 3))) = |.(A - B).| * (sin ((angle (C,B,A)) / 3))
A7:
(((angle (C,B,A)) / 3) + ((angle (B,A,C)) / 3)) + ((angle (A,C,B)) / 3) = PI / 3
by A1, A2, Lm12;
A8:
((angle (A,P,B)) + (angle (P,B,A))) + (angle (B,A,P)) = PI
by A3, A6, EUCLID_3:47;
|.(A - P).| * (sin (PI - (((angle (C,B,A)) / 3) + ((angle (B,A,C)) / 3)))) = |.(A - B).| * (sin ((angle (C,B,A)) / 3))
by A3, A4, EUCLID_6:6, A8, A5;
hence
|.(A - P).| * (sin ((PI / 3) - ((angle (A,C,B)) / 3))) = |.(A - B).| * (sin ((angle (C,B,A)) / 3))
by A7, Thm1; verum