let n be Ordinal; for T being connected TermOrder of n
for b1, b2 being bag of n holds
( min (b1,b2,T) = b1 iff max (b1,b2,T) = b2 )
let T be connected TermOrder of n; for b1, b2 being bag of n holds
( min (b1,b2,T) = b1 iff max (b1,b2,T) = b2 )
let b1, b2 be bag of n; ( min (b1,b2,T) = b1 iff max (b1,b2,T) = b2 )
A1:
now assume A2:
max (
b1,
b2,
T)
= b2
;
min (b1,b2,T) = b1hence
min (
b1,
b2,
T)
= b1
;
verum end;
now assume A3:
min (
b1,
b2,
T)
= b1
;
max (b1,b2,T) = b2hence
max (
b1,
b2,
T)
= b2
;
verum end;
hence
( min (b1,b2,T) = b1 iff max (b1,b2,T) = b2 )
by A1; verum