[justify](ENEM) João propôs um desafio a Bruno, seu colega de classe: ele iria descrever um deslocamento pela pirâmide a seguir e Bruno deveria desenhar a projeção desse deslocamento no plano da base da pirâmide.[br][br][img]data:image/png;base64,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[/img][br][br]O deslocamento descrito por João foi: mova-se pela pirâmide, sempre em linha reta, do ponto A ao ponto E, a seguir do ponto E ao ponto M, e depois de M a C.[br]O desenho que Bruno deve fazer é:[br][br]Observação: Analise a construção acima para responder a questão.[/justify]