Nesta atividade iremos explorar através da experimentação o postulado da interseção, queremos concluir que se dois planos distintos possuem um ponto em comum, então existe uma única reta que passa por esse ponto e que pertence aos dois planos.[br][br]

[br]1)  Abra o Geogebra 3D;[br][br]2)  Utilize a ferramenta [img]data:image/png;base64,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[/img]e marque os pontos A, B, C, D e E quaisquer no espaço, de modo que os cinco pontos não fiquem no mesmo plano.[br][br]3)  Utilize a ferramenta [img]data:image/png;base64,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[/img] e construa os planos p e q utilizando os pontos A, B e C e os pontos A, D e E respectivamente.[br][br][br]

4) Utilize a ferramenta [img]data:image/png;base64,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[/img]e clique sobre os planos p e q.[br][br][br]