1) Abra o Geogebra 3D;[br][br]2) Construa pontos A, B e C de modo que A, B e C sejam pontos do plano XY, utilize a ferramenta 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[/img]para vincular os pontos A, B e C ao plano XY;[br][br]3) Utilize a ferramenta [img]data:image/png;base64,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[/img] e construa o plano p formado pelos pontos A, B e C.[br][br]4) Marque um ponto D fora do plano p.[br][br]5) Utilize a ferramenta [img]data:image/png;base64,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[/img] e construa o plano q formado pelos pontos A, B e D, altere a cor do plano q para melhorar a visualização;[br][br][br][br]
a) Você sabe o que significa pontos colineares e não colineares? Explique com suas palavras.[br]
b) Você sabe o que significa planos coincidentes? Explique com suas palavras.
c) Os dois planos construídos são distintos, pois possuem pontos que não são comuns, por exemplo, [img]data:image/png;base64,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[/img]. Mantendo o ponto C fixo e movendo o ponto D com a ferramenta [img]data:image/png;base64,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[/img] é possível tornar estes dois planos distintos em planos coincidentes? Movimente o ponto D e tente tornar os planos coincidentes, em caso de dúvida verifique as equações de cada plano na janela de álgebra e verifique se estão iguais.
d) Qual foi a posição do ponto D que permitiu que os planos fossem coincidentes?
e) Suponha que fossem marcados pontos E, F, G... fora do no plano XY e fossem construídos os planos formados pelos planos ABE, ABF, ABG, ... ao mover os pontos E, F, G ... pelo espaço quais são as posições que planos ABE, ABF, ABG, ... serão coincidentes com o plano p?
f) O que você pode concluir nessa experimentação? Escreva com suas palavras.