let a be Nat; for t, u being Integer holds (- t) mod a = ((u * a) - (t mod a)) mod a
let t, u be Integer; (- t) mod a = ((u * a) - (t mod a)) mod a
thus ((u * a) - (t mod a)) mod a =
(((0 + (u * a)) mod a) - ((t mod a) mod a)) mod a
by INT_6:7
.=
((0 mod a) - (t mod a)) mod a
.=
(0 - t) mod a
by INT_6:7
.=
(- t) mod a
; verum