let m, n be Nat; ex k being Nat st
( (divSeq m,n) . k = 0 & (modSeq m,n) . k = 0 )
set f = modSeq m,n;
consider k being Nat such that
A1:
(modSeq m,n) . k = 0
by Lm6;
take
k + 1
; ( (divSeq m,n) . (k + 1) = 0 & (modSeq m,n) . (k + 1) = 0 )
A2:
k + 0 < k + 1
by XREAL_1:8;
hence
(divSeq m,n) . (k + 1) = 0
by A1, Th18; (modSeq m,n) . (k + 1) = 0
thus
(modSeq m,n) . (k + 1) = 0
by A1, A2, Th14; verum