let n be Nat; for a, b being Element of REAL n st a <= b holds
not ClosedHyperInterval (a,b) is empty
let a, b be Element of REAL n; ( a <= b implies not ClosedHyperInterval (a,b) is empty )
assume
a <= b
; not ClosedHyperInterval (a,b) is empty
then
ClosedHyperInterval (a,a) c= ClosedHyperInterval (a,b)
by Th49;
then
{a} c= ClosedHyperInterval (a,b)
by Th48;
hence
not ClosedHyperInterval (a,b) is empty
; verum