Let $P$ be a polynomial of degree $n \geq 2$ with rational coefficients such that $P$ has $n$ pairwise distinct real roots forming an arithmetic progression. Prove that among the roots of $P$ there are two that are also roots of some degree $2$ polynomial with rational coefficients.
Školjka 
be a polynomial of degree 
with rational coefficients such that 
pairwise distinct real roots forming an arithmetic progression. Prove that among the roots of 
polynomial with rational coefficients.