let P(x)=x^6 + ax^5 + bx^4 + cx^3 + dx^2 + ex + f
If f is a prime number, how many distinct linear factors with integral coefficients can P(x) at most have?
Thanks very much.
recall that the product of the roots will be f/1
If f is prime, then the only possible rational roots will be
±1, ±f
Since f and -f cannot both be roots (why?) there can be at most 3 rational roots.
Furthermore, since f is positive (why?), -1 cannot be a root, since then the polynomial will end with "-f" instead of f.
SO, only 1 and f can be roots.