let a, b, c, d, e, f, r be Real; ( ((1 - r) * |[a,b,1]|) + (r * |[c,d,1]|) = |[e,f,1]| implies ((1 - r) * |[a,b]|) + (r * |[c,d]|) = |[e,f]| )
assume
((1 - r) * |[a,b,1]|) + (r * |[c,d,1]|) = |[e,f,1]|
; ((1 - r) * |[a,b]|) + (r * |[c,d]|) = |[e,f]|
then |[e,f,1]| =
|[((1 - r) * a),((1 - r) * b),((1 - r) * 1)]| + (r * |[c,d,1]|)
by EUCLID_5:8
.=
|[((1 - r) * a),((1 - r) * b),(1 - r)]| + |[(r * c),(r * d),(r * 1)]|
by EUCLID_5:8
.=
|[(((1 - r) * a) + (r * c)),(((1 - r) * b) + (r * d)),((1 - r) + r)]|
by EUCLID_5:6
;
then
( e = ((1 - r) * a) + (r * c) & f = ((1 - r) * b) + (r * d) )
by FINSEQ_1:78;
then |[e,f]| =
|[((1 - r) * a),((1 - r) * b)]| + |[(r * c),(r * d)]|
by EUCLID:56
.=
((1 - r) * |[a,b]|) + |[(r * c),(r * d)]|
by EUCLID:58
.=
((1 - r) * |[a,b]|) + (r * |[c,d]|)
by EUCLID:58
;
hence
((1 - r) * |[a,b]|) + (r * |[c,d]|) = |[e,f]|
; verum