Na rysunku przedstawiono fragment wykresu funkcji y=f(x), który jest złożony z dwóch półprostych AD i CE oraz dwóch odcinków AB i BC, gdzie A=(-1,0), B=(1,2), C=(3,0), D=(-4,3), E=(6,3)."data:image/png;base64,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" 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1. Zadania
2. Funkcja liniowa
3. Zadanie #1928