let i be Element of NAT ; :: thesis:
let G be Go-board; :: thesis:
assume that
A1: 1 <= i and
A2: i < len G ; :: thesis:
let x be set ; :: according to TARSKI:def 3 :: thesis:
assume A3: x in LSeg (((1 / 2) * ((G * i,1) + (G * (i + 1),1))) - |[0 ,1]|),((1 / 2) * ((G * i,1) + (G * (i + 1),1))) ; :: thesis:
then reconsider p = x as Point of (TOP-REAL 2) ;
consider r being Real such that
A4: p = ((1 - r) * (((1 / 2) * ((G * i,1) + (G * (i + 1),1))) - |[0 ,1]|)) + (r * ((1 / 2) * ((G * i,1) + (G * (i + 1),1)))) and
A5: 0 <= r and
A6: r <= 1 by A3;

per cases by A6, XXREAL_0:1;

case r = 1 ; :: thesis:

then p = (0. (TOP-REAL 2)) + (1 * ((1 / 2) * ((G * i,1) + (G * (i + 1),1)))) by A4, EUCLID:33
.= 1 * ((1 / 2) * ((G * i,1) + (G * (i + 1),1))) by EUCLID:31
.= (1 / 2) * ((G * i,1) + (G * (i + 1),1)) by EUCLID:33 ;
hence p in {((1 / 2) * ((G * i,1) + (G * (i + 1),1)))} by TARSKI:def 1; :: thesis:

end;

case A7: r < 1 ; :: thesis:

set r3 = (1 - r) * (1 / 2);
set s3 = r * (1 / 2);
set s2 = (G * 1,1) `2 ;
set r1 = (G * i,1) `1 ;
set r2 = (G * (i + 1),1) `1 ;
A8: (((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * i,1) `1 ))) + ((r * (1 / 2)) * (((G * i,1) `1 ) + ((G * i,1) `1 ))) = (G * i,1) `1 ;
A9: i + 1 <= len G by A2, NAT_1:13;
0 <> width G by GOBOARD1:def 5;
then A10: 1 <= width G by NAT_1:14;
i < i + 1 by XREAL_1:31;
then A11: (G * i,1) `1 < (G * (i + 1),1) `1 by A1, A9, A10, GOBOARD5:4;
then A12: ((G * i,1) `1 ) + ((G * i,1) `1 ) < ((G * i,1) `1 ) + ((G * (i + 1),1) `1 ) by XREAL_1:8;
then A13: (r * (1 / 2)) * (((G * i,1) `1 ) + ((G * i,1) `1 )) <= (r * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 )) by A5, XREAL_1:66;
A14: 1 - r > 0 by A7, XREAL_1:52;
then A15: (1 - r) * (1 / 2) > (1 / 2) * 0 by XREAL_1:70;
then ((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * i,1) `1 )) < ((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 )) by A12, XREAL_1:70;
then A16: (G * i,1) `1 < (((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))) + ((r * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))) by A13, A8, XREAL_1:10;
(G * 1,1) `2 < ((G * 1,1) `2 ) + (1 - r) by A14, XREAL_1:31;
then A17: ((G * 1,1) `2 ) - (1 - r) < (G * 1,1) `2 by XREAL_1:21;
A18: 1 <= i + 1 by A1, NAT_1:13;
A19: G * (i + 1),1 = |[((G * (i + 1),1) `1 ),((G * (i + 1),1) `2 )]| by EUCLID:57
.= |[((G * (i + 1),1) `1 ),((G * 1,1) `2 )]| by A18, A9, A10, GOBOARD5:2 ;
A20: ((G * i,1) `1 ) + ((G * (i + 1),1) `1 ) < ((G * (i + 1),1) `1 ) + ((G * (i + 1),1) `1 ) by A11, XREAL_1:8;
then A21: (r * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 )) <= (r * (1 / 2)) * (((G * (i + 1),1) `1 ) + ((G * (i + 1),1) `1 )) by A5, XREAL_1:66;
A22: Int (cell G,i,0 ) = { |[r9,s9]| where r9, s9 is Real : ( (G * i,1) `1 < r9 & r9 < (G * (i + 1),1) `1 & s9 < (G * 1,1) `2 ) } by A1, A2, Th27;
A23: (((1 - r) * (1 / 2)) * (((G * (i + 1),1) `1 ) + ((G * (i + 1),1) `1 ))) + ((r * (1 / 2)) * (((G * (i + 1),1) `1 ) + ((G * (i + 1),1) `1 ))) = (G * (i + 1),1) `1 ;
((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 )) < ((1 - r) * (1 / 2)) * (((G * (i + 1),1) `1 ) + ((G * (i + 1),1) `1 )) by A15, A20, XREAL_1:70;
then A24: (((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))) + ((r * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))) < (G * (i + 1),1) `1 by A21, A23, XREAL_1:10;
A25: G * i,1 = |[((G * i,1) `1 ),((G * i,1) `2 )]| by EUCLID:57
.= |[((G * i,1) `1 ),((G * 1,1) `2 )]| by A1, A2, A10, GOBOARD5:2 ;
p = (((1 - r) * ((1 / 2) * ((G * i,1) + (G * (i + 1),1)))) - ((1 - r) * |[0 ,1]|)) + (r * ((1 / 2) * ((G * i,1) + (G * (i + 1),1)))) by A4, EUCLID:53
.= ((((1 - r) * (1 / 2)) * ((G * i,1) + (G * (i + 1),1))) - ((1 - r) * |[0 ,1]|)) + (r * ((1 / 2) * ((G * i,1) + (G * (i + 1),1)))) by EUCLID:34
.= ((((1 - r) * (1 / 2)) * ((G * i,1) + (G * (i + 1),1))) - |[((1 - r) * 0 ),((1 - r) * 1)]|) + (r * ((1 / 2) * ((G * i,1) + (G * (i + 1),1)))) by EUCLID:62
.= ((((1 - r) * (1 / 2)) * ((G * i,1) + (G * (i + 1),1))) - |[0 ,(1 - r)]|) + ((r * (1 / 2)) * ((G * i,1) + (G * (i + 1),1))) by EUCLID:34
.= ((((1 - r) * (1 / 2)) * |[(((G * i,1) `1 ) + ((G * (i + 1),1) `1 )),(((G * 1,1) `2 ) + ((G * 1,1) `2 ))]|) - |[0 ,(1 - r)]|) + ((r * (1 / 2)) * ((G * i,1) + (G * (i + 1),1))) by A19, A25, EUCLID:60
.= ((((1 - r) * (1 / 2)) * |[(((G * i,1) `1 ) + ((G * (i + 1),1) `1 )),(((G * 1,1) `2 ) + ((G * 1,1) `2 ))]|) - |[0 ,(1 - r)]|) + ((r * (1 / 2)) * |[(((G * i,1) `1 ) + ((G * (i + 1),1) `1 )),(((G * 1,1) `2 ) + ((G * 1,1) `2 ))]|) by A19, A25, EUCLID:60
.= (|[(((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))),(((1 - r) * (1 / 2)) * (((G * 1,1) `2 ) + ((G * 1,1) `2 )))]| - |[0 ,(1 - r)]|) + ((r * (1 / 2)) * |[(((G * i,1) `1 ) + ((G * (i + 1),1) `1 )),(((G * 1,1) `2 ) + ((G * 1,1) `2 ))]|) by EUCLID:62
.= (|[(((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))),(((1 - r) * (1 / 2)) * (((G * 1,1) `2 ) + ((G * 1,1) `2 )))]| - |[0 ,(1 - r)]|) + |[((r * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))),((r * (1 / 2)) * (((G * 1,1) `2 ) + ((G * 1,1) `2 )))]| by EUCLID:62
.= |[((((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))) - 0 ),((((1 - r) * (1 / 2)) * (((G * 1,1) `2 ) + ((G * 1,1) `2 ))) - (1 - r))]| + |[((r * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))),((r * (1 / 2)) * (((G * 1,1) `2 ) + ((G * 1,1) `2 )))]| by EUCLID:66
.= |[((((1 - r) * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 ))) + ((r * (1 / 2)) * (((G * i,1) `1 ) + ((G * (i + 1),1) `1 )))),(((((1 - r) * (1 / 2)) * (((G * 1,1) `2 ) + ((G * 1,1) `2 ))) - (1 - r)) + ((r * (1 / 2)) * (((G * 1,1) `2 ) + ((G * 1,1) `2 ))))]| by EUCLID:60 ;
hence p in Int (cell G,i,0 ) by A17, A16, A24, A22; :: thesis:

end;

hence x in (Int (cell G,i,0 )) \/ {((1 / 2) * ((G * i,1) + (G * (i + 1),1)))} by XBOOLE_0:def 3; :: thesis: