let y be set ; for R being Relation
for x being set st x in R & y in R & x `1 = y `1 & x `2 = y `2 holds
x = y
let R be Relation; for x being set st x in R & y in R & x `1 = y `1 & x `2 = y `2 holds
x = y
let x be set ; ( x in R & y in R & x `1 = y `1 & x `2 = y `2 implies x = y )
assume
( x in R & y in R )
; ( not x `1 = y `1 or not x `2 = y `2 or x = y )
then
( x = [(x `1),(x `2)] & y = [(y `1),(y `2)] )
by Th23;
hence
( not x `1 = y `1 or not x `2 = y `2 or x = y )
; verum