let A be Subset of R^1 ; :: thesis: ( A = IRRAT implies Cl A = the carrier of R^1 )
assume A1:
A = IRRAT
; :: thesis: Cl A = the carrier of R^1
the carrier of R^1 c= Cl A
proof
let x be
set ;
:: according to TARSKI:def 3 :: thesis: ( not x in the carrier of R^1 or x in Cl A )
assume
x in the
carrier of
R^1
;
:: thesis: x in Cl A
then reconsider p =
x as
Element of
RealSpace by METRIC_1:def 14, TOPMETR:24;
now let r be
real number ;
:: thesis: ( r > 0 implies Ball p,r meets A )reconsider pr =
p + r as
Element of
RealSpace by METRIC_1:def 14, XREAL_0:def 1;
assume
r > 0
;
:: thesis: Ball p,r meets Athen consider Q being
real irrational number such that A2:
p < Q
and A3:
Q < pr
by Th50, XREAL_1:31;
reconsider P =
Q as
Element of
RealSpace by METRIC_1:def 14, XREAL_0:def 1;
P - p < pr - p
by A3, XREAL_1:11;
then
dist p,
P < r
by A2, Th34;
then A4:
P in Ball p,
r
by METRIC_1:12;
Q in A
by A1, Th37;
hence
Ball p,
r meets A
by A4, XBOOLE_0:3;
:: thesis: verum end;
hence
x in Cl A
by GOBOARD6:95, TOPMETR:def 7;
:: thesis: verum
end;
hence
Cl A = the carrier of R^1
by XBOOLE_0:def 10; :: thesis: verum