Área[br][br][list][*]Área da base (A[sub]base[/sub]): área da superfície poligonal que forma a base.[/*][*]Área lateral (A[sub]lateral[/sub]): soma das áreas das faces laterais (superfícies triangulares).[/*][*]Área total (A[sub]total[/sub]): soma da área lateral com a área da base.[br][br]A área total pode ser expressa da seguinte forma:[/*][/list][br][img]data:image/png;base64,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[/img][br][br]
Explore o simulador de área e volume de pirâmides a seguir:[br][br][list][*]O botão deslizando n permite variar o número de lados (que é indicado abaixo, em "Nº de lados"). [/*][*]O botão deslizando "lado" permite alterar o tamanho/medida dos lados (que é indicado abaixo, em "Medida lado").[/*][*]O botão deslizante h permite variar a altura da pirâmide (que é indicada abaixo, em "Altura (h)").[/*][*]O botão deslizando o permite visualizar a planificação da pirâmide escolhida.[/*][/list][br]Abaixo de todos os botões, há as informações da área e do volume da pirâmide escolhida.[br][br]Agora:[br]i) Escolha um número de lados, defina uma medida de lado e uma altura, e observe a área e volume obtidos.[br][br]ii) Agora, sem alterar as demais informações, aumente o número de lados e observe o que acontece.[br][br]iii) O que aconteceu quando você aumentou apenas o número de lados? Por quê?
Área[br][list][*]Área Lateral: soma das áreas das faces laterais (retangulares). [br][/*][*]Área da Base: depende do polígono que a determina. [/*][*]Área Total: soma das áreas das faces laterais com a área da base. [/*][/list][br][br]Observe o simulador de prisma a seguir, em que estão identificadas as três pirâmides. Clique no fundo branco para rotacioná-lo e enxergá-lo melhor.[br][br]
O simulador a seguir apresenta uma representação de um prisma e uma de uma pirâmide. Observe que a pirâmide tem 1/3 do volume do prisma apresentado. Varie a medida da base (usando o botão deslizando h) e a altura (usando o botão deslizando H), e observe como a área e o volume de ambos variam.[br][br]Escreva abaixo suas observações.