Верхний рисунок с трапецией

Дана окружность с центром О и её диаметры AB и CD. Определи периметр треугольника AOD, если CB — 14 см, AB — 60 см.

Объяснение:

Рассмотрим ∆АОD и ∆СОВ. ОА = ОВ = СО = OD (радиусы одной окружности), углы СОВ и АOD равны, так как вертикальные, тогда ∆АОD = ∆СОВ по двум сторонам и углу между ними.

CO < CD в два раза, так как радиус меньше диаметра окружности. Поэтому, СО = ОВ = 50 см:2 = 25 см. P∆COB = 25 см+ 25см + 5 см = 55 см = P∆AOD.

1. Все радиусы одной окружности имеют равную длину.

2. AOD = COB.

3. Paod = 55 см.

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