set X = REAL * ;
set mi = ((n * n) + (3 * n)) + 1;
let F1, F2 be Element of Funcs (REAL * ),(REAL * ); :: thesis:
assume that
A5: dom F1 = REAL * and
A6: for f being Element of REAL * holds F1 . f = f,(((n * n) + (3 * n)) + 1) := (Argmin (OuterVx f,n),f,n),(- 1) and
A7: dom F2 = REAL * and
A8: for f being Element of REAL * holds F2 . f = f,(((n * n) + (3 * n)) + 1) := (Argmin (OuterVx f,n),f,n),(- 1) ; :: thesis:

let xx be set ; :: thesis:
assume xx in dom F1 ; :: thesis:
then reconsider h = xx as Element of REAL * by A5;
thus F1 . xx = h,(((n * n) + (3 * n)) + 1) := (Argmin (OuterVx h,n),h,n),(- 1) by A6
.= F2 . xx by A8 ; :: thesis:

end;