[list][*]Público-Alvo – 9º Ano do Ensino Fundamental e 2º Ano do Ensino Médio.[/*][/list][list][*][justify]Habilidades da BNCC - (EF09MA19) Resolver e elaborar problemas que envolvam medidas de volumes de prismas e de cilindros retos, inclusive com uso de expressões de cálculo, em situações cotidianas. (EM13MAT504) Investigar processos de obtenção da medida do volume de prismas, pirâmides, cilindros e cones, incluindo o princípio de Cavalieri, para a obtenção das fórmulas de cálculo da medida do volume dessas figuras.[/justify][br][/*][/list][list][*]Tempo – 2 tempos de 50 minutos.[/*][/list][br][list][*] Objetivo Geral – Conjecturar a fórmula do Volume de um Prisma.[/*][/list][br][list][*]Objetivos Específicos[/*][/list] [br]  Relembrar o conceito de Volume de um sólido geométrico;[br]  Relembrar as definições de prisma;[br]  Relembrar a fórmula para calcular o volume de um prisma;[br]  Relembrar o Princípio de Cavalieri.[br][br][list][*]Conteúdos[/*][/list][br]  Volume;[br]  Prisma;[br]  Princípio de Cavalieri.[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][list][*]Orientações Pedagógicas[/*][/list][br][justify]  Na fase de construção só é preciso pesquisar a construção que será utilizada, caso os alunos não consigam o professor pode realizar mostrar aos alunos fazendo 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 Investigativas de Geometria Espacial. A fase de concepções espontâneas servirá para o professor verificar os conceitos que os alunos já tenham ou não tenham definidos, necessitam conhecer as definições de volume, volume de um bloco retangular que será um axioma e o conceito de princípio de Cavalieri para comparar os sólidos, 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. Com todas as experimentações, indagações e hipóteses testadas, os alunos vão aos poucos percebendo as características que devem estar presentes para que os volumes entre os prismas possuam a mesma medida, respeitando as características de terem as mesmas alturas e áreas iguais em suas seções transversais. 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]