1 < len (GoB f) by GOBOARD7:32;
then 1 + 1 <= len (GoB f) by NAT_1:13;
then A2: ((GoB f) * (2,(width (GoB f)))) `2 = ((GoB f) * (1,(width (GoB f)))) `2 by A1, GOBOARD5:1;
(((1 / 2) * (((GoB f) * (1,(width (GoB f)))) + ((GoB f) * (2,(width (GoB f)))))) + |[0,1]|) `2 = (((1 / 2) * (((GoB f) * (1,(width (GoB f)))) + ((GoB f) * (2,(width (GoB f)))))) `2) + (|[0,1]| `2) by TOPREAL3:2
.= ((1 / 2) * ((((GoB f) * (1,(width (GoB f)))) + ((GoB f) * (2,(width (GoB f))))) `2)) + (|[0,1]| `2) by TOPREAL3:4
.= ((1 / 2) * ((((GoB f) * (1,(width (GoB f)))) `2) + (((GoB f) * (1,(width (GoB f)))) `2))) + (|[0,1]| `2) by A2, TOPREAL3:2
.= (1 * (((GoB f) * (1,(width (GoB f)))) `2)) + 1 by EUCLID:52 ;
then A3: ((1 / 2) * (((GoB f) * (1,(width (GoB f)))) + ((GoB f) * (2,(width (GoB f)))))) + |[0,1]| = |[((((1 / 2) * (((GoB f) * (1,(width (GoB f)))) + ((GoB f) * (2,(width (GoB f)))))) + |[0,1]|) `1),((((GoB f) * (1,(width (GoB f)))) `2) + 1)]| by EUCLID:53;
(((GoB f) * (1,(width (GoB f)))) + |[(- 1),1]|) `2 = (((GoB f) * (1,(width (GoB f)))) `2) + (|[(- 1),1]| `2) by TOPREAL3:2
.= (((GoB f) * (1,(width (GoB f)))) `2) + 1 by EUCLID:52 ;
then A4: ((GoB f) * (1,(width (GoB f)))) + |[(- 1),1]| = |[((((GoB f) * (1,(width (GoB f)))) + |[(- 1),1]|) `1),((((GoB f) * (1,(width (GoB f)))) `2) + 1)]| by EUCLID:53;
let p be Point of (TOP-REAL 2); :: thesis: ( p in LSeg ((((GoB f) * (1,(width (GoB f)))) + |[(- 1),1]|),(((1 / 2) * (((GoB f) * (1,(width (GoB f)))) + ((GoB f) * (2,(width (GoB f)))))) + |[0,1]|)) implies p `2 > ((GoB f) * (1,(width (GoB f)))) `2 )
assume p in LSeg ((((GoB f) * (1,(width (GoB f)))) + |[(- 1),1]|),(((1 / 2) * (((GoB f) * (1,(width (GoB f)))) + ((GoB f) * (2,(width (GoB f)))))) + |[0,1]|)) ; :: thesis: p `2 > ((GoB f) * (1,(width (GoB f)))) `2
then p `2 = (((GoB f) * (1,(width (GoB f)))) `2) + 1 by A4, A3, TOPREAL3:12;
hence p `2 > ((GoB f) * (1,(width (GoB f)))) `2 by XREAL_1:29; :: thesis: verum