Let $f$ and $g$ be a quadratic funtcions. Assume that $|f(x)|\geq |g(x)|$ for all $x\in\mathbb{R}$. How to show that $|d_f|\geq|d_g|$, where $d_h$ denote the discriminant of an arbitrary quadratic function $h$?
2026-04-11 23:53:20.1775951600
discriminant of a quadratic function
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