let k, m be Nat; for C being compact non horizontal non vertical Subset of (TOP-REAL 2) st m > k holds
dist (((Gauge (C,m)) * (1,1)),((Gauge (C,m)) * (2,1))) < dist (((Gauge (C,k)) * (1,1)),((Gauge (C,k)) * (2,1)))
let C be compact non horizontal non vertical Subset of (TOP-REAL 2); ( m > k implies dist (((Gauge (C,m)) * (1,1)),((Gauge (C,m)) * (2,1))) < dist (((Gauge (C,k)) * (1,1)),((Gauge (C,k)) * (2,1))) )
assume A1:
m > k
; dist (((Gauge (C,m)) * (1,1)),((Gauge (C,m)) * (2,1))) < dist (((Gauge (C,k)) * (1,1)),((Gauge (C,k)) * (2,1)))
[(1 + 1),1] in Indices (Gauge (C,k))
by Th7;
hence
dist (((Gauge (C,m)) * (1,1)),((Gauge (C,m)) * (2,1))) < dist (((Gauge (C,k)) * (1,1)),((Gauge (C,k)) * (2,1)))
by A1, Th5, Th10; verum