let i, j be Integer; for p being Prime
for a, b being Element of (GF p) st a = i mod p & b = j mod p holds
a - b = (i - j) mod p
let p be Prime; for a, b being Element of (GF p) st a = i mod p & b = j mod p holds
a - b = (i - j) mod p
let a, b be Element of (GF p); ( a = i mod p & b = j mod p implies a - b = (i - j) mod p )
assume A1:
( a = i mod p & b = j mod p )
; a - b = (i - j) mod p
then
- b = (p - j) mod p
by Th16;
then a - b =
(i + (p - j)) mod p
by A1, Th15
.=
((i - j) + (1 * p)) mod p
;
hence
a - b = (i - j) mod p
by NAT_D:61; verum