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The ratio of the unsigned coefficients for the discriminants of $x^n+bx+c$ for $n=2$ to $5$ follow a simple pattern:

$\left (\frac{2^2}{1^1},\frac{3^3}{2^2},\frac{4^4}{3^3},\frac{5^5}{4^4} \right )=\left ( \frac{4}{1},\frac{27}{4},\frac{256}{27},\frac{3125}{256} \right )$

corresponding to the discriminants

$(b^2-4c, -4b^3-27c^2,-27b^4+256c^3,256b^5+3125c^4).$

Does the pattern for the ratios extend to higher orders? (An online reference would be appreciated.)

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    See also section 6 of "Discriminating deltas, depressed equations, and generalized Catalan numbers" (http://tcjpn.wordpress.com/2012/06/13/depressed-equations-and-generalized-catalan-numbers/) to relate the tangents of the discriminant curve to the equation $x^n + b x + c = 0$.2016-08-01

2 Answers 2

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Yes. Sketch: $b$ is a symmetric polynomial of degree $n-1$ in the roots and $c$ is a symmetric polynomial of degree $n$, whereas the entire discriminant is a symmetric polynomial of degree $n(n-1)$. It follows that the discriminant is a linear combination of $b^n$ and $c^{n-1}$, and the coefficients can be determined by setting $b = 0, c = -1$ and then $b = -1, c = 0$ and reducing to the computation of the discriminant of $x^n - 1$.

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    @QiaochuYuan oh that makes sense. Thanks!2015-01-30
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Use the relation between the disciminant of $f$ and the resultant of $f$ and $f'$. The resultant is easy to calculate since $f'$ is so simple.

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    The idea of the resultant of $f$ and $g$ is that it should be zero if and only if $f$ and $g$ have$a$common (non-constant) factor. That happens if and only if there are polynomials $a$ and $b$ with degree $a$ less than degree $g$, and degree $b$ less than degree $f$, such that $af+bg=0$. And by considering this as a system of linear equations in the coefficients, this happens if and only if the Sylvester matrix is singular.2012-06-22