let X be BCI-algebra; :: thesis: for IT being non empty Subset of X st IT is Ideal of X holds
for x, y being Element of IT holds { z where z is Element of X : z \ x <= y } c= IT
let IT be non empty Subset of X; :: thesis: ( IT is Ideal of X implies for x, y being Element of IT holds { z where z is Element of X : z \ x <= y } c= IT )
assume A1: IT is Ideal of X ; :: thesis: for x, y being Element of IT holds { z where z is Element of X : z \ x <= y } c= IT
let x, y be Element of IT; :: thesis: { z where z is Element of X : z \ x <= y } c= IT
A2: 0. X in IT by A1, Def18;
for ss being set st ss in { z where z is Element of X : z \ x <= y } holds
ss in IT hence { z where z is Element of X : z \ x <= y } c= IT by TARSKI:def 3; :: thesis: verum