A soma dos ângulos internos de um triângulo é:

Um triângulo pode ter dois ângulos de 90°?

Determine o valor do ângulo x 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[/img]

Determine o valor do ângulo 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[/img]

Determine o valor do [b]menor[/b] ângulo do triângulo de ângulos x + 10° , x - 30° e x + 50°.[br][br][img]data:image/png;base64,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[/img]