1) Antes de abrir o Geogebra e visualizar o applet da atividade, responda:
a) Você sabe explicar o que é o sólido geométrico chamado de Bloco Retangular? Sabe o nome dado às suas dimensões? Escreva com as suas palavras.
b) Quais objetos do mundo físico possuem o formato de um bloco retangular?
c) O que é um paralelepípedo retângulo?
d) O que é um cubo? Qual a sua relação com o paralelepípedo retângulo?[br]
e) Você sabe explicar o que é o volume de um corpo qualquer? Escreva com as suas palavras.
2) Abra Geogebra 3D.[br][br]
2) Em seguida clique na ferramenta [img]data:image/png;base64,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[/img] e busque por VOLUME DE UM CUBO da autora Cátia[br]Almeida.
4) Movimente os controles deslizantes das Dimensões e do Número de cubinhos e observe o que[br]muda na figura inicial. Responda:
a) Quais são as funcionalidades de cada um dos controles deslizantes, ou seja, o que cada um muda na figura inicial?
b) Qual a relação entre os controles dimensões e número de cubinhos, ou seja, o que cada um muda no outro?
c) Qual é a relação entre o número de cubinhos azuis e o volume do bloco retangular laranja?
d) É possível preencher todo o bloco retangular laranja com cubinhos azuis? [br][br]
5) Como você deve ter percebido anteriormente, a quantidade de cubinhos azuis representa o volume do bloco retangular laranja sendo preenchido, ou seja, a quantidade total destes que preenchem o bloco retangular laranja é o volume da figura, logo podemos considerar cada bloquinho azul como uma unidade de volume. Faça alguns experimentos alterando as dimensões do bloco retangular e preencha a tabela abaixo:[br][img]data:image/png;base64,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[/img][br]
6) Você consegue montar uma relação entre os valores das dimensões e o total de cubinhos azuis que preenchem o bloco laranja todo? Escreva com as suas palavras.
7) Considerando v (volume), c (comprimento), l (largura) e a (altura) do bloco retangular, conjecture uma fórmula matemática que relacione o volume com o comprimento, largura e altura.