Na realização de uma determinada experiência, foi necessário encher, com água, um recipiente, com a forma de um prisma, inicialmente vazio. A quantidade de água que sai da torneira, por unidade de tempo, até o recipiente ficar cheio, é [b]constante[/b].[justify][br]Com esta atividade pretende-se que consigas perceber qual é a relação entre da altura da água, num recipiente, com o tempo que decorre desde o início até ao enchimento do mesmo. Identificar gráficos de recipientes a partir das caraterísticas das suas formas.[br][/justify][br][b]Questões essenciais: [/b][br]Qual é a relação entre a altura de um recipiente e o tempo de enchimento, de acordo com as caraterísticas das suas formas?[justify][br][br]Que caraterísticas, das suas formas, terão os recipientes para que o seu gráfico represente uma função de proporcionalidade direta?[/justify]
[b]Experiência 1[/b][br][br]Observa um recipiente com a forma de um prisma, clica em "play" para veres o enchimento do recipiente.[br]
Qual dos seguintes gráficos poderá traduzir a variação da[br]altura da água, no recipiente, com o tempo que decorre desde o início do seu enchimento?
Após terem refletido em grupo e escrito a vossa resposta, podes confirmá-la. Para isso, vais clicar[br]em "G[u]ráfico”[/u] e volta a clicar em "play" para assistires a passo a passo a representação gráfica.[br][br]
[b]Experiência 2[/b][br][br]Vamos estudar um segundo recipiente. Vais repetir o mesmo procedimento da experiência anterior.[br]Observa um recipiente com a forma de uma pirâmide, clica em "play" para veres o o enchimento do recipiente.[br][br][br][br][br]
Qual dos seguintes gráficos poderá traduzir a variação da altura da água, no recipiente, com o tempo que decorre desde o início do seu enchimento?
Em grupo tenta explicar qual dos gráficos pode representar esta variação.[br][br] [br]Após terem refletido em grupo e escrito a vossa resposta, podes confirmá-la. Para isso, vais clicar em “G[u]ráfico”[/u] e volta a clicar em "play" para assistires a passo a passo a representação gráfica.[br][br] [br][br]
[b]Experiência 3[/b][br][br]Vamos estudar um terceiro recipiente. Vais repetir o mesmo procedimento da experiência anterior.[br]Observa um recipiente com a forma de uma esfera, clica em "play" para veres o enchimento do recipiente.[br][br][br][br][br]
Qual dos seguintes gráficos poderá traduzir a variação da altura da água, no recipiente, com o tempo que decorre desde o início do seu enchimento?
Em grupo tenta explicar qual dos gráficos pode representar esta variação.[br][br] [br]Após terem refletido em grupo e escrito a vossa resposta, podes confirmá-la. Para isso, vais clicar em “G[u]ráfico”[/u] e volta a clicar em "play" para assistires a passo a passo a representação gráfica.[br][br] [br][br]
Em grupo tenta explicar qual dos gráficos pode representar esta variação.[br][br] [br]Após terem refletido em grupo e escrito a vossa resposta, podem confirmá-la. Para isso, vais clicar em “G[u]ráfico”[/u] e volta a clicar em "play" para assistires a passo a passo a representação gráfica.[br][br] [br][br]
Qual das três representações gráficas representa uma função de proporcionalidade direta? Porquê?
Tarefa 3[br][br]O gráfico seguinte traduz a variação da altura da água, num recipiente, com o tempo que decorre desde o[br]início do seu enchimento.[br][img]data:image/png;base64,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[/img][br][br][br][br]
Qual dos seguintes recipientes poderá traduzir a variação da altura da água, com o tempo que decorre desde o início do seu enchimento?