Interaja com o [i]applet [/i]abaixo por alguns minutos. Em seguida, responda às questões que se seguem. Atividade adaptada de https://www.geogebra.org/m/uyr8axdj
No [i]applet [/i]acima, movimente o controle deslizante "Transferir as Placas". A Pilha 1 possui a mesma quantidade de placas da Pilha 2?
Movimente o controle deslizante "Movimentar plano". A quantidade de placas da Pilha 2 continuam as mesmas? a medida da Altura 2 foi modificada? A Altura 1 e a Altura 2 possuem as mesmas medidas? Justifique sua resposta.
Sabendo que cada chapa possui o mesmo volume, podemos afirmar que o volume da Pilha 1 é igual ao volume da Pilha 2? Como podemos calcular o volume total das Pilhas de Placas ?
[i]Dois sólidos, [math]Sólido_1[/math] e [math]Sólido_2[/math], os quais possuem a mesma altura, apoiados em um mesmo plano horizontal [math]\alpha[/math], e um plano [math]\beta[/math], paralelo a [math]\alpha[/math], que determina nos sólidos[/i][i] duas regiões planas, [math]Área_1[/math] e [math]Área_2[/math]. Nesse caso, se [math]Área_1[/math] = [math]Área_2[/math] para qualquer plano[/i][i][math]\beta[/math], temos que o volume do [math]Sólido1[/math] é igual ao volume do [math]Sólido_2[/math].[/i]
Interaja com o [i]applet [/i]abaixo e em seguida, responda a questão que segue.
No [i]applet [/i]acima, calcule a área da base do prisma triangular e a área da base do paralelepípedo reto-retângulo. Em seguida movimente o ponto "S" para altura = 5 cm e encontre os volumes dos prismas. Os volumes são iguais ou diferentes? Por que?
No prisma hexagonal regular abaixo a altura mede [math]2\sqrt{3}[/math] cm, a aresta da base mede 2 cm . 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[/img][br][br]O volume deste Prisma é:
O volume do prisma reto acima é: