. We are going to prove that
. On the contrary, suppose that
for some x. Then the discriminant of P(x) must be zero:Solution :
Consider . We are going to prove that
. On the contrary, suppose that
for some x. Then the discriminant of P(x) must be zero:
,
where
Since A and B are integers, it follows that A = B = 0.
Now note that 
, and since 
and 
have no roots, 
and 
, hence 
. Contradiction.