let n be Nat; for seq being Real_Sequence st seq is V96() holds
(inferior_realsequence seq) . n <= (inferior_realsequence seq) . (n + 1)
let seq be Real_Sequence; ( seq is V96() implies (inferior_realsequence seq) . n <= (inferior_realsequence seq) . (n + 1) )
A1:
min (((inferior_realsequence seq) . (n + 1)),(seq . n)) <= (inferior_realsequence seq) . (n + 1)
by XXREAL_0:17;
assume
seq is V96()
; (inferior_realsequence seq) . n <= (inferior_realsequence seq) . (n + 1)
hence
(inferior_realsequence seq) . n <= (inferior_realsequence seq) . (n + 1)
by A1, Th46; verum