Quando fizeste variar o valor das amplitudes dos ângulos internos o que aconteceu à soma dessas amplitudes?

Seleciona a opção que completa corretamente a propriedade dos triângulos:[br][br]"A soma das amplitudes dos ângulos internos de um triângulo é sempre ________________ 180º."

Descobre a amplitude do terceiro ângulo interno do triângulo dado na figura. [br]Mostra como pensaste.[br][img]data:image/png;base64,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[/img]

Quando fizeste variar o valor das amplitudes dos ângulos externos o que aconteceu à soma dessas amplitudes?

Seleciona a opção que completa corretamente a propriedade dos triângulos:[br][br]"A soma das amplitudes dos ângulos externos de um triângulo é sempre ________________ 360º."

Descobre a amplitude do terceiro ângulo externo do triângulo dado na figura. [br]Mostra como 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[/img]