x^2+bx+c = (x-p)(x-q) 

If the roots are rational they must be integers, such that b=-(p+q) and c=pq

For c to be odd, p and q are both odd, but then p+q is even.

For higher even degree, 2n, we get the same contradiction:

The constant term is the product of pq... from which they are all odd, but their sum (since there are an even number of them) is even, but b (from bx^(2n-1), the second term) must also be odd.