let a be Nat; for n being prime Nat holds n * a divides ((a + 1) |^ n) - ((a |^ n) + 1)
let n be prime Nat; n * a divides ((a + 1) |^ n) - ((a |^ n) + 1)
L1:
( a > 0 implies (n * a) * 1 divides ((a + 1) |^ n) - ((a |^ n) + (1 |^ n)) )
by Th55;
( a = 0 implies n * a divides ((a + 1) |^ n) - ((a |^ n) + 1) )
;
hence
n * a divides ((a + 1) |^ n) - ((a |^ n) + 1)
by L1; verum