Na rysunku przedstawiony jest fragment paraboli będącej wykresem funkcji kwadratowej f. Wierzchołkiem tej paraboli jest punkt W=({2},{ -4}). Liczby 0 i 4 to miejsca zerowe funkcji f. style="width: 100%;""data:image/png;base64,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" data-filename="Wykres maj19 8-10.png">Największa wartość funkcji f w przedziale langle 1, 4 rangle jest równa
Na rysunku przedstawiony jest fragment paraboli będącej wykresem funkcji kwadratowej . Wierzchołkiem tej paraboli jest punkt . Liczby i to miejsca zerowe funkcji .
Największa wartość funkcji w przedziale jest równa
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