[list][*]Habilidades da BNCC – Não existe uma habilidade da BNCC que trate especificamente dos postulados da geometria espacial.[/*][/list][br][list][*]Tempo – 1 tempo de 50 minutos.[/*][/list][br][list][*] Objetivo Geral – Compreender o 1º Postulado da Determinação.[/*][/list][br][list][*]Objetivos Específicos[/*][/list] [br]  Identificar que dois pontos determinam uma única reta;[br]  Compreender o conceito de retas coincidentes.   [br][br][list][*]Conteúdos[/*][/list][br]  Conceito de Reta;[br]  Conceito de Reta Coincidente;[br]  1º Postulado da Determinação. [br][br][list][*]Recursos Necessários[/*][/list][br]  Projetor Multimídia;[br]  Impressões;[br]  Computadores ou smartphones com o Geogebra 3D;[br]  Internet para baixar as construções ou pendrive com as construções prontas; [br]  Caneta de Quadro Branco;[br]  Apagador;[br]  Quadro Branco;[br][br][list][*]Procedimentos/Resumo da Aula[/*][/list] 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[/img][br][br]·    [br][list][*]Orientações Pedagógicas[/*][/list][br] [justify]  Na fase de construção os alunos devem seguir o passo a passo para realizar a construção da reta, caso os alunos não estejam familiarizados com o Geogebra 3D o professor pode realizar a construção junto com os alunos fazendo-a com uma projeção utilizando um projetor multimídia ou na falta deste recurso o professor pode já utilizar a construção pronta que está disponibilizada em no Livro – Atividades Investigativa de Geometria Espacial. A fase de concepções espontâneas servirá para o professor verificar se os alunos compreendem o conceito de retas concorrentes, o professor pode propor um debate com todos os alunos a fim de chegar às definições solicitadas, pois estas serão de extrema importância para a conclusão da atividade. Na fase de perguntas/hipóteses os alunos serão questionados sobre as construções e experimentações que realizarão e a partir destas criarão suas hipóteses que deverão ser experimentadas na fase de experimentação, nesta atividade os alunos podem ter dificuldades de tornar as retas coincidentes, o professor pode orientar os alunos a verificarem as equações das retas na janela de álgebra[br]para terem certeza de que as retas são coincidentes. Com todas as experimentações, indagações e hipóteses testadas, os alunos vão aos poucos conjecturando que dois pontos determinam uma única reta além disso que qualquer outra reta coincidente também passará pelos pontos A e B. Caso os alunos tenham dificuldades o professor pode intervir para que o aluno consiga prosseguir na construção do conhecimento ou pode solicitar que um outro aluno que já tenha conseguido auxilie o aluno com dificuldade.[/justify][br][br]