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Question P. Can a polynomial $P(x)=\sum_{n=0}^ma_nx^n$ with coefficients $a_n\in\{-1,1\}$ (and $P(1)=0$) have a multiple root in the interval $(\tfrac12,1)$? Yes. The following four Littlewood polyn …

Subst $k = p - 2n \ge 0$ and $s = r - i$ to get the symmetric $$\sum_{s \ge 0,i \ge 0} [s + i \le 2n + k] \frac{(-1)^{s+i} (3n+k-s-i-1)! (2n^2 + nk - is)}{i!(n-i)!(2n + k-i)! s!(n-s)!(2n + k-s)!}$$ Bu …

$$\frac{1}{2\pi}\int_0^\infty \frac{\sqrt t}{(t + a^2) (t - x + \tfrac14)} \textrm{d}t = \frac{1}{2a + \sqrt{1 - 4x}}$$ So just take $a = \tfrac12 + x$.