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Edited in link to above

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edited Jan 29, 2021 at 20:18

See the discussion aboveabove.

Also, if $f(x) = x^n + \cdots + a_{n-1}x + a_n$$f(x) = x^n + \dotsb + a_{n-1}x + a_n$, then

for $n = 2$, $\operatorname{Res}(f(x), f(-x)) = 2^2a_2a_1^2$

for $n = 3$, $\operatorname{Res}(f(x), f(-x)) = 2^3a_3(a_3 - a_1a_2)^2$

for $n = 4$, $\operatorname{Res}(f(x), f(-x)) = 2^4a_4(a_4a_1^2 - a_1a_2a_3 + a_3^2)^2$

for $n = 4$, $\operatorname{Res}(f(x), f(-x)) = 2^4a_4(a_4a_1^2 - a_1a_2a_3 + a_3^2)^2$.

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created Jan 29, 2021 at 4:09

See the discussion above.

Also, if $f(x) = x^n + \cdots + a_{n-1}x + a_n$, then

for $n = 2$, $\operatorname{Res}(f(x), f(-x)) = 2^2a_2a_1^2$

for $n = 3$, $\operatorname{Res}(f(x), f(-x)) = 2^3a_3(a_3 - a_1a_2)^2$

for $n = 4$, $\operatorname{Res}(f(x), f(-x)) = 2^4a_4(a_4a_1^2 - a_1a_2a_3 + a_3^2)^2$