deffunc H₁( Element of X, Element of X, Element of Y, Element of Y, Element of Z, Element of Z) -> Element of REAL = In ((((dist ($1,$2)) + (dist ($3,$4))) + (dist ($5,$6))),REAL);
consider F being Function of [:[: the carrier of X, the carrier of Y, the carrier of Z:],[: the carrier of X, the carrier of Y, the carrier of Z:]:],REAL such that
A1: for x1, y1 being Element of X
for x2, y2 being Element of Y
for x3, y3 being Element of Z
for x, y being Element of [: the carrier of X, the carrier of Y, the carrier of Z:] st x = [x1,x2,x3] & y = [y1,y2,y3] holds
F . (x,y) = H₁(x1,y1,x2,y2,x3,y3) from METRIC_3:sch 2();
take F ; :: thesis:
let x1, y1 be Element of X; :: thesis:
let x2, y2 be Element of Y; :: thesis:
let x3, y3 be Element of Z; :: thesis:
let x, y be Element of [: the carrier of X, the carrier of Y, the carrier of Z:]; :: thesis:
assume ( x = [x1,x2,x3] & y = [y1,y2,y3] ) ; :: thesis:
then F . (x,y) = H₁(x1,y1,x2,y2,x3,y3) by A1;
hence F . (x,y) = ((dist (x1,y1)) + (dist (x2,y2))) + (dist (x3,y3)) ; :: thesis: