let a, b be Nat; ( b = 0 or b + a in seq (a,b) )
assume
b <> 0
; b + a in seq (a,b)
then
ex c being Nat st b = c + 1
by NAT_1:6;
then
1 <= b
by NAT_1:11;
then
( b + a is Element of NAT & 1 + a <= b + a )
by ORDINAL1:def 12, XREAL_1:6;
hence
b + a in seq (a,b)
; verum