Is there an intuitive way of visualising complex roots? – math.stackexchange.com

Is there an intuitive way of visualising complex roots? – math.stackexchange.com

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Consider the function $f(x)$ such that $f(x) = x^2-4x+13$. By considering the discriminant, it can immediately be seen that the function has no real roots, since $b^2-4ac = (-4)^2-4(13) = -36$ and ...

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