Bounds on Zeros: Let f be a polynomial function whose leading coefficient is 1: f(x) = x[sup:xxfs6yl8]n[/sup:xxfs6yl8] + a [sub:xxfs6yl8]n-1[/sub:xxfs6yl8] x [sup:xxfs6yl8]n-1[/sup:xxfs6yl8] + … + a[sub:xxfs6yl8]1[/sub:xxfs6yl8]x + a[sub:xxfs6yl8]0[/sub:xxfs6yl8].
The bound M on the zeros of f is the smaller of the sum of the absolute values of a[sub:xxfs6yl8]0[/sub:xxfs6yl8] through a [sub:xxfs6yl8]n-1[/sub:xxfs6yl8] or 1 + the coefficient with the largest absolute value.
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