let i1, i2 be natural Number ; ( i1 + 1 <= i2 implies ( i1 -' 1 < i2 & i1 -' 2 < i2 & i1 <= i2 ) )
assume A1:
i1 + 1 <= i2
; ( i1 -' 1 < i2 & i1 -' 2 < i2 & i1 <= i2 )
then A2:
i1 < i2
by NAT_1:13;
i1 -' 1 <= i1
by Th35;
hence A3:
i1 -' 1 < i2
by A2, XXREAL_0:2; ( i1 -' 2 < i2 & i1 <= i2 )
A4:
(i1 -' 1) -' 1 = i1 -' 2
by Th45;
reconsider i1 = i1 as Nat by TARSKI:1;
(i1 -' 1) -' 1 <= i1 -' 1
by Th35;
hence
( i1 -' 2 < i2 & i1 <= i2 )
by A1, A3, A4, XXREAL_0:2, NAT_1:13; verum