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W trapezie prostokątnym ABCD dłuższa podstawa AB ma długość 8. Przekątna AC tego trapezu ma długość 4 i tworzy z krótszą podstawą trapezu kąt o mierze 30 textdegree (zobacz rysunek). Oblicz długość przekątnej BD tego trapezu. style="width: 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data-filename="maj19 31.png">

Zadanie 1922

Ekspresowy Kurs Maturalny z matematyki

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W trapezie prostokątnym ABCD dłuższa podstawa AB ma długość 8. Przekątna AC tego trapezu ma  długość  4  i  tworzy  z  krótszą  podstawą trapezu kąt  o  mierze  30\textdegree  (zobacz  rysunek).  Oblicz  długość przekątnej BD tego trapezu.


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