set GG = [:I[01] ,I[01] :];
set SS = [:R^1 ,R^1 :];
0 in the carrier of I[01] by BORSUK_1:86;
then [0 ,0 ] in [:the carrier of I[01] ,the carrier of I[01] :] by ZFMISC_1:106;
then reconsider x = [0 ,0 ] as Point of by BORSUK_1:def 5;
reconsider PA = { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } as closed Subset of by Th25;
set P0 = { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } ;
A1: [:I[01] ,I[01] :] is SubSpace of [:R^1 ,R^1 :] by BORSUK_3:25;
A2: { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } = PA /\ ([#] [:I[01] ,I[01] :])

proof

thus { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } c= PA /\ ([#] [:I[01] ,I[01] :]) :: according to XBOOLE_0:def 10 :: thesis:

proof

let x be set ; :: according to TARSKI:def 3 :: thesis:
A3: the carrier of [:I[01] ,I[01] :] c= the carrier of [:R^1 ,R^1 :] by A1, BORSUK_1:35;
assume x in { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } ; :: thesis:
then A4: ex p being Point of st
( x = p & p `2 <= 1 - (2 * (p `1 )) ) ;
then x in the carrier of [:I[01] ,I[01] :] ;
then reconsider a = x as Point of by A3;
a `2 <= 1 - (2 * (a `1 )) by A4;
then x in PA ;
hence x in PA /\ ([#] [:I[01] ,I[01] :]) by A4, XBOOLE_0:def 4; :: thesis:

end;

let x be set ; :: according to TARSKI:def 3 :: thesis:
assume A5: x in PA /\ ([#] [:I[01] ,I[01] :]) ; :: thesis:
then x in PA by XBOOLE_0:def 4;
then ex p being Point of st
( x = p & p `2 <= 1 - (2 * (p `1 )) ) ;
hence x in { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } by A5; :: thesis:

end;

x `1 = 0 by MCART_1:7;
then x `2 <= 1 - (2 * (x `1 )) by MCART_1:7;
then x in { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } ;
hence { p where p is Point of : p `2 <= 1 - (2 * (p `1 )) } is non empty closed Subset of by A1, A2, PRE_TOPC:43; :: thesis: