Предмет: Математика, автор: Arnaera

В равнобедренном треугольнике ABC (AB=BC) медиана AD пересекает биссектрису CK в точке O, при этом AD ⊥ CK. Найти отношение : S_OKBD:S_ABC .

Ответы

Автор ответа: Аноним

0

Т.к. СО⊥AD и СО биссектриса, ΔADC равнобедренный, AC = CD = DB = a.
Sabc = 1/2 AC·CB·sin∠C = 1/2 a·2a·sin∠C = a²·sin∠C
Sadc = 1/2 AC·CD·sin∠C = 1/2 a²·sin∠C
Scod = 1/2 Sadc = 1/4 a²·sin∠C = 1/4 Sabc
Биссектриса треугольника делит противолежащую сторону на отрезки, пропорциональные прилежащим сторонам:
BK / AK = BC / AC = 2a / a = 2 / 1
ΔBCK и ΔACK имеют одинаковую высоту, проведенную к сторонам BK и AK, поэтому их площади относятся как длины этих отрезков:
Sbck / Sack = 2 / 1 ⇒Sbck = 2/3 Sabc
Sokbd = Sbck - Scod = 2/3 Sabc - 1/4 Sabc = 5/12 Sabc
Sokbd / Sabc = 5/12

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