let f be non trivial FinSequence of (TOP-REAL 2); <*(NE-corner (L~ f))*> is_in_the_area_of f
set g = <*(NE-corner (L~ f))*>;
let n be Nat; SPRECT_2:def 1 ( n in dom <*(NE-corner (L~ f))*> implies ( W-bound (L~ f) <= (<*(NE-corner (L~ f))*> /. n) `1 & (<*(NE-corner (L~ f))*> /. n) `1 <= E-bound (L~ f) & S-bound (L~ f) <= (<*(NE-corner (L~ f))*> /. n) `2 & (<*(NE-corner (L~ f))*> /. n) `2 <= N-bound (L~ f) ) )
assume A1:
n in dom <*(NE-corner (L~ f))*>
; ( W-bound (L~ f) <= (<*(NE-corner (L~ f))*> /. n) `1 & (<*(NE-corner (L~ f))*> /. n) `1 <= E-bound (L~ f) & S-bound (L~ f) <= (<*(NE-corner (L~ f))*> /. n) `2 & (<*(NE-corner (L~ f))*> /. n) `2 <= N-bound (L~ f) )
dom <*(NE-corner (L~ f))*> = {1}
by FINSEQ_1:2, FINSEQ_1:38;
then
n = 1
by A1, TARSKI:def 1;
then
<*(NE-corner (L~ f))*> /. n = |[(E-bound (L~ f)),(N-bound (L~ f))]|
by FINSEQ_4:16;
then
( (<*(NE-corner (L~ f))*> /. n) `1 = E-bound (L~ f) & (<*(NE-corner (L~ f))*> /. n) `2 = N-bound (L~ f) )
by EUCLID:52;
hence
( W-bound (L~ f) <= (<*(NE-corner (L~ f))*> /. n) `1 & (<*(NE-corner (L~ f))*> /. n) `1 <= E-bound (L~ f) & S-bound (L~ f) <= (<*(NE-corner (L~ f))*> /. n) `2 & (<*(NE-corner (L~ f))*> /. n) `2 <= N-bound (L~ f) )
by SPRECT_1:21, SPRECT_1:22; verum