let n be Nat; for X being set
for B being SetSequence of X st B is V56() holds
(inferior_setsequence B) . n = B . n
let X be set ; for B being SetSequence of X st B is V56() holds
(inferior_setsequence B) . n = B . n
let B be SetSequence of X; ( B is V56() implies (inferior_setsequence B) . n = B . n )
assume
B is V56()
; (inferior_setsequence B) . n = B . n
then
((inferior_setsequence B) . (n + 1)) /\ (B . n) = B . n
by Th44, XBOOLE_1:28;
hence
(inferior_setsequence B) . n = B . n
by Th21; verum