let i, j be ordinal Element of RAT+ ; ( i in j implies i < j )
A1:
j in omega
by ARYTM_3:31;
i in omega
by ARYTM_3:31;
then reconsider x = i, y = j as Element of REAL+ by A1, ARYTM_2:2;
assume A2:
i in j
; i < j
then
x <=' y
by A1, ARYTM_2:18;
then A3:
ex x9, y9 being Element of RAT+ st
( x = x9 & y = y9 & x9 <=' y9 )
by ARYTM_2:def 5;
i <> j
by A2;
hence
i < j
by A3, ARYTM_3:66; verum