The polynomial xn + n xn-1 + a2xn-2 + ... + a0 has n roots whose 16th powers have sum n. Find the roots.
Solution
Answer: all the roots are -1.
Suppose the roots are r1, r2, ... , rn. Note that ∑ ri = -n. Applying Cauchy to 1, ri, we have
n2 = |∑ ri|2 ≤ (∑ 12) |∑ ri2|, so |∑ ri2| ≥ n.
Applying Cauchy to 1, ri2, we have:
n2 ≤ |∑ ri2|2 ≤ ∑ 12 |∑ ri4|, so |∑ri4 ≥ n.
Similarly, applying Cauchy to 1, ri4, we have:
n2 ≤ |∑ ri4|2 ≤ n |∑ ri8|, so |∑ ri8| ≥ n.
Finally, applying Cauchy to 1, ri8, we have:
n2 ≤ |∑ ri8| ≤ n |∑ ri16|, so |∑ ri16| ≥ n.
But |∑ ri16| = n. Hence all the above inequalities are equalities. So, particular, |∑ ri2| = n. We have equality in Cauchy iff the ratio of the corresponding terms is equal. Hence, considering the first inequality, we must have all ri equal. Hence all the roots are -1.
© John Scholes
jscholes@kalva.demon.co.uk
28 Dec 2002
Last corrected/updated 28 Dec 02