Dany jest okrąg o środku S. Punkty K, L i M leżą na tym okręgu. Na łuku KL tego okręgu są oparte kąty KSL i KML, których miary alpha i beta spełniają warunek alpha + beta = 111^ circ . 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" data-filename="katalpha.PNG" style="width: 309px;">Wynika stąd, że

1. Zadania
2. Figury płaskie (Planimetria)
3. Zadanie #1882