Na rysunku przedstawiony jest fragment wykresu funkcji liniowej f. Na wykresie tej funkcji leżą punkty A=(0,4) i B=(2,2). style="width: 50%;""data:image/png;base64,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" data-filename="maj19 19.png">Obrazem prostej AB w symetrii względem początku układu współrzędnych jest wykres funkcji g określonej wzorem

1. Zadania
2. Funkcja liniowa
3. Zadanie #1910