Długość krawędzi podstawy ostrosłupa prawidłowego czworokątnego jest równa 6. Pole powierzchni całkowitej tego ostrosłupa jest cztery razy większe od pola jego podstawy. Kąt alpha jest kątem nachylenia krawędzi bocznej tego ostrosłupa do płaszczyzny podstawy (zobacz rysunek). Oblicz cosinus kąta alpha. style="width: 50%;""data:image/png;base64,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" data-filename="m19 34.png">

1. Zadania
2. Geometria w przestrzeni (Stereometria)
3. Zadanie #1925