let A, B, C be Point of (TOP-REAL 2); ( B <> A implies ((sin (angle (B,A,C))) + (sin (angle (C,B,A)))) * (|.(C - B).| - |.(C - A).|) = ((sin (angle (B,A,C))) - (sin (angle (C,B,A)))) * (|.(C - B).| + |.(C - A).|) )
assume
B <> A
; ((sin (angle (B,A,C))) + (sin (angle (C,B,A)))) * (|.(C - B).| - |.(C - A).|) = ((sin (angle (B,A,C))) - (sin (angle (C,B,A)))) * (|.(C - B).| + |.(C - A).|)
then
|.(C - B).| * (sin (angle (C,B,A))) = |.(C - A).| * (sin (angle (B,A,C)))
by EUCLID_6:6;
hence
((sin (angle (B,A,C))) + (sin (angle (C,B,A)))) * (|.(C - B).| - |.(C - A).|) = ((sin (angle (B,A,C))) - (sin (angle (C,B,A)))) * (|.(C - B).| + |.(C - A).|)
; verum