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Przyprostokątna LM trójkąta prostokątnego KLM ma długość 3, a przeciwprostokątna KL ma długość 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" data-filename="trojkat-zad14.PNG" style="width: 520.828px;">Wtedy miara alpha kąta ostrego LKM tego trójkąta spełnia warunek:

Zadanie 1880

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Przyprostokątna LM trójkąta prostokątnego KLM ma długość 3, a przeciwprostokątna KL ma długość 8.  


Wtedy miara \alpha kąta ostrego LKM tego trójkąta spełnia warunek:

Zaznacz prawidłową odpowiedź:


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