Na figura estão representados o triângulo e a circunferência centrada no ponto Q e circunscrita ao triângulo.[br][img]data:image/png;base64,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[/img][br]O ponto Q é necessariamente que ponto notável do triângulo [ABC]?[br][br]Exercício retirado de MathSuceess.

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[/img]

Na figura estão representados o triângulo e a circunferência centrada no ponto D e inscrita no triângulo.[br][img]data:image/png;base64,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[/img][br]O ponto D é necessariamente que ponto notável do triângulo [ABC]?[br][br]Exercício retirado de MathSuceess.