let p be Prime; for a being Element of (GF p) ex n1 being Nat st a = n1 mod p
let a be Element of (GF p); ex n1 being Nat st a = n1 mod p
reconsider a = a as Element of Segm p ;
( 0 <= a & a < p )
by NAT_1:44;
then
a = a mod p
by NAT_D:63;
hence
ex n1 being Nat st a = n1 mod p
; verum