let C be Simple_closed_curve; for S being Segmentation of C
for i, j being Nat st 1 <= i & i < j & j < len S & i,j are_adjacent holds
Segm (S,i) meets Segm (S,j)
let S be Segmentation of C; for i, j being Nat st 1 <= i & i < j & j < len S & i,j are_adjacent holds
Segm (S,i) meets Segm (S,j)
let i, j be Nat; ( 1 <= i & i < j & j < len S & i,j are_adjacent implies Segm (S,i) meets Segm (S,j) )
assume that
A1:
1 <= i
and
A2:
i < j
and
A3:
j < len S
and
A4:
i,j are_adjacent
; Segm (S,i) meets Segm (S,j)
(Segm (S,i)) /\ (Segm (S,j)) = {(S /. (i + 1))}
by A1, A2, A3, A4, Th26;
hence
Segm (S,i) meets Segm (S,j)
; verum