tag:blogger.com,1999:blog-12965070681345562082024-03-12T04:52:38.895+00:00Ajuda alunosEste blog é destinado a ajudar alunos com dificuldades de aprendizagem ou para colocação de dúvidas relativas ao meu site http://www.ajudaalunos.com para o mesmo efeito.
Gostava que fosse um espaço de partilha de experiências escolares entre os alunos e também com professores.Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.comBlogger87125tag:blogger.com,1999:blog-1296507068134556208.post-7636300264599302082020-07-14T18:20:00.000+01:002020-07-14T18:20:50.181+01:00Pandemia por Covid-19Olá a todos!<br />
<br />
Deixo-vos aqui alguns vídeos sobre os cuidados que devemos ter neste tempo de Pandemia...<br />
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<iframe allow="accelerometer; autoplay; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/oug368Ih9Xc" width="560"></iframe>
<iframe allow="accelerometer; autoplay; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/eLfKq5NvVFM" width="560"></iframe><br />
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<iframe allow="accelerometer; autoplay; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/lFncWvWMGZU" width="560"></iframe><br />
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<iframe allow="accelerometer; autoplay; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/SvN453XQxqk" width="560"></iframe><br />
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<iframe allow="accelerometer; autoplay; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/bnZ9vRr7_vI" width="560"></iframe><br />
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<iframe allow="accelerometer; autoplay; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/-8rjBmku5lw" width="560"></iframe>Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-85817358388206392462018-08-06T13:56:00.004+01:002020-07-14T16:17:52.353+01:00Escola.org<br />
Olá a todos!<br />
<br />
Aqui vos deixo um site com exercícios interativos.<br />
O site está organizado de forma simples.<br />
Podem encontrar os temas que vos interessa clicando em Ctrl+F. Abre depois um espacinho com uma lupa e só têm de escrever sobre o que querem encontrar.<br />
Bons exercícios!<br />
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<a href="https://www.escola.org/exercicios/?ity_ef_rule=list">https://www.escola.org/exercicios/?ity_ef_rule=list</a>Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-12646782748935587492018-07-19T14:30:00.003+01:002020-07-14T16:15:48.185+01:00Lista de links para questionários online Ciências Naturais (Kahoot)<br />
<div align="center" style="margin-bottom: .0001pt; margin: 0cm; text-align: center;">
<b><span style="color: #741b47; font-family: "arial" , "sans-serif"; font-size: 18.0pt;">Lista
de links para questionários online Ciências Naturais (Kahoot)</span></b><span style="color: black; font-size: 13.5pt;"><o:p></o:p></span><br />
<b><span style="color: #741b47; font-family: "arial" , "sans-serif"; font-size: 18.0pt;"><br /></span></b>
<span style="color: #741b47; font-family: "arial" , "helvetica" , sans-serif; font-size: x-small;"><b>(podes instalar a app Kahoot no teu telemóvel e divertires-te a fazer os questionários)</b></span></div>
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<b style="mso-bidi-font-weight: normal;"><span style="color: black; font-size: 16.0pt; mso-bidi-font-size: 13.5pt;">.
Revisões:<o:p></o:p></span></b></div>
<div style="margin-bottom: .0001pt; margin: 0cm;">
<span style="color: black; font-size: 13.5pt;">- </span><a href="https://create.kahoot.it/share/revisoes-plantas-1-ciclo/386c8f9c-636e-47db-8752-21e30e26560c"><span style="font-size: 13.5pt;">1º ciclo</span></a><span style="color: black; font-size: 13.5pt;"> plantas<o:p></o:p></span></div>
<div style="margin-bottom: .0001pt; margin: 0cm;">
<span style="color: black; font-size: 13.5pt;">- </span><a href="https://play.kahoot.it/#/k/82033738-9d30-4717-bcc2-18d3e3dab16e"><span style="font-size: 13.5pt;">5º ano</span></a><span style="color: black; font-size: 13.5pt;"><o:p></o:p></span></div>
<div style="margin-bottom: .0001pt; margin: 0cm;">
<span style="color: black; font-size: 13.5pt;">- </span><a href="https://play.kahoot.it/#/k/ef0ead76-21fd-4e52-8325-84b35ee68467"><span style="font-size: 13.5pt;">1º ciclo</span></a><span style="color: black; font-size: 13.5pt;"> animais<o:p></o:p></span></div>
<div style="margin-bottom: .0001pt; margin: 0cm;">
<a href="https://play.kahoot.it/#/k/6b42d517-995b-45f3-bf89-27a78eeec938"><span style="font-size: 13.5pt;">- 1º ciclo</span></a><span style="color: black; font-size: 13.5pt;"> animais<o:p></o:p></span></div>
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<div style="margin-bottom: .0001pt; margin: 0cm;">
<span style="color: black; font-size: 13.5pt;">.</span><a href="https://play.kahoot.it/#/k/01ce58f3-2400-4e4e-aaf7-297d33950fd9"><span style="font-size: 13.5pt;">Educação sexual</span></a><span style="color: black; font-size: 13.5pt;"><o:p></o:p></span></div>
<div align="center" style="margin-bottom: .0001pt; margin: 0cm; text-align: center;">
<b><span style="color: #741b47; font-family: "Arial","sans-serif"; font-size: 18.0pt;">5º ano<o:p></o:p></span></b></div>
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<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 4; vertical-align: baseline;">
<span style="border: 1pt none windowtext; color: #99cc00; font-family: Arial, sans-serif; letter-spacing: -0.3pt; padding: 0cm;"><span style="font-size: large;">A ÁGUA, O AR, AS
ROCHAS E O SOLO – MATERIAIS TERRESTRES</span></span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 22.5pt; letter-spacing: -.3pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<b><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">A importância das rochas e do solo na
manutenção da vida</span></b><b><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">A Terra como
um planeta especial </span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">O solo como
material terrestre de suporte de vida </span></b><a href="https://create.kahoot.it/share/o-solo/a5e6d784-a590-42a5-b256-5dc9666e72ba"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<a href="https://create.kahoot.it/share/os-solos-e-rochas/340dc20c-2bbd-41e1-9583-7893cea8c787"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Solo e rochas</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">Importância
das rochas e dos minerais </span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">- </span><a href="https://create.kahoot.it/share/rochas-e-minerais/df27d562-4889-4b15-91e0-9873074774e6"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a>
(minerais)</div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">- </span></b><a href="https://create.kahoot.it/share/revisoes-cn5-rochas/62147111-e167-43ff-afdf-d48be93433c4"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-bidi-font-size: 11.0pt;">Quiz
1</span></a>(rochas)</div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<a href="https://create.kahoot.it/share/minerais-2-ciclo/98c58c0e-8af6-4718-a1d3-a25a9976ee80"><span style="font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt;">- Minerais</span></a><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-bidi-font-weight: bold; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<b><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">A importância da água para os seres vivos</span></b><b><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">A importância
da água para os seres vivos</span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <span style="mso-spacerun: yes;"> </span></span><a href="https://create.kahoot.it/share/a-importancia-da-agua-para-os-seres-vivos/821595ee-24e3-4da8-9134-30fed864d692"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<a href="https://create.kahoot.it/share/ciclo-da-agua/ca763461-f9f0-4237-9663-1b9f8186a4c5"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Ciclo da água</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<a href="https://create.kahoot.it/share/os-estados-fisicos-da-agua/7bdf614d-0351-4ae6-966b-dbd5cb793186"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Estados físicos da
água</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">A importância
da qualidade da água para a atividade humana</span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<b><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">A importância do ar para os seres vivos</span></b><b><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">A importância
da atmosfera para os seres vivos </span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> </span><a href="https://create.kahoot.it/share/importancia-do-ar/1a920397-b6d2-4150-bb6b-427d3f38b78d4"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> </span><a href="https://create.kahoot.it/share/o-ar/b8d6df8a-8188-4327-8e9e-fb32b654baf7"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz 1</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 4; vertical-align: baseline;">
<span style="border: 1pt none windowtext; color: #99cc00; font-family: Arial, sans-serif; letter-spacing: -0.3pt; padding: 0cm;"><span style="font-size: large;">DIVERSIDADE DE SERES
VIVOS E SUAS INTERAÇÕES COM O MEIO</span></span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 22.5pt; letter-spacing: -.3pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<b><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">Diversidade nos animais </span></b><a href="https://create.kahoot.it/share/diversidade-de-animais/fef8b21c-2fdd-4e90-900e-68197ca5649e"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz</span></a><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">, </span><a href="https://create.kahoot.it/share/diversidade-dos-animais/d6490ae1-b743-4bca-a964-b6553f620ec7"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">1</span></a><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">, </span><a href="https://create.kahoot.it/share/diversidade-dos-animais/f1902bb7-c0ca-44ba-afcb-9d353be75860"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">2</span></a><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">, </span><a href="https://create.kahoot.it/share/os-animais-5-ano/cd4200f2-454d-4030-af4b-0d9c7a9626a9"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">3</span></a><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">, </span><a href="https://create.kahoot.it/share/os-animais/ef0ead76-21fd-4e52-8325-84b35ee68467"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">4</span></a><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">, </span><a href="https://create.kahoot.it/share/animais/6b42d517-995b-45f3-bf89-27a78eeec938"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">5</span></a><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">Características
dos organismos em função dos ambientes onde vivem </span></b><a href="https://create.kahoot.it/share/mais-questoes-revestimento-dos-animais/d71149a1-cc22-4f9a-a83d-18b860373c85"><span style="font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt;">Revestimento</span></a><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-bidi-font-weight: bold; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">, </span><a href="https://create.kahoot.it/share/revestimentos-do-corpo-dos-animais/ed77eae5-6ea9-4be5-9075-d6380ec35b6e"><span style="font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt;">Revestimento 1</span></a><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-bidi-font-weight: bold; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">, </span><a href="https://create.kahoot.it/share/locomocao-dos-animais/4a65647d-debe-44d6-95ab-21ef493b3aad"><span style="font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt;">Locomoção</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">Diversidade
de regimes alimentares </span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">Diversidade
de processos reprodutivos </span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> </span><a href="https://create.kahoot.it/share/revisoes-sobre-reproducao-dos-animais/c24f331f-3d45-4598-8b20-9d23a1588f3b"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">Influência
dos fatores abióticos nas adaptações morfológicas e comportamentais dos animais</span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> </span><a href="https://create.kahoot.it/share/fatores-do-meio-que-influenciam-os-seres-vivos/475695b0-1476-4760-a93d-b47fb800c146"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">A importância
da proteção da biodiversidade animal </span></b><a href="https://create.kahoot.it/share/conservacao-da-biodiversidade/cb6f4089-7040-4bd9-8d18-bdc9e72b8708"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<a href="https://create.kahoot.it/share/perda-da-biodiversidade/5963a53d-09ee-4c64-a09a-85c94fb55609"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Perda de
biodiversidade</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<b><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">Diversidade nas plantas</span></b><b><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">A influência
dos fatores abióticos nas adaptações morfológicas das plantas </span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">Importância
da proteção da diversidade vegetal</span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 4; vertical-align: baseline;">
<span style="border: 1pt none windowtext; color: #99cc00; font-family: Arial, sans-serif; letter-spacing: -0.3pt; padding: 0cm;"><span style="font-size: large;">UNIDADE NA DIVERSIDADE
DOS SERES VIVOS</span></span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 22.5pt; letter-spacing: -.3pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<b><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">Célula – unidade básica de vida <o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">- </span><a href="https://create.kahoot.it/share/microscopio-otico-composto/1f552434-7c0c-4015-af4f-8c08381f514f"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz</span></a></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-bidi-font-weight: bold; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">- </span><a href="https://create.kahoot.it/share/microscopio-e-celula-ciencias-naturais-5-ano/711f115b-5cdc-4ac2-af4f-9e35183c69f6"><span style="font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt;">O microscópio e a célula</span></a><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-bidi-font-weight: bold; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">O
microscópio <o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">- </span><a href="https://play.kahoot.it/#/k/1f552434-7c0c-4015-af4f-8c08381f514f"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">A célula
como unidade básica da vida </span></b><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"> <o:p></o:p></span></div>
<div class="MsoNormal" style="background: white; line-height: normal; margin-bottom: 12.0pt; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; mso-line-height-alt: 15.6pt; mso-outline-level: 5; vertical-align: baseline;">
<b><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT; padding: 0cm;">Diversidade a partir da unidade – níveis
de organização hierárquica</span></b><b><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<b><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;">Classificação
dos seres vivos <o:p></o:p></span></b></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<br /></div>
<div class="MsoNormal" style="background: white; line-height: normal; vertical-align: baseline;">
<a href="https://create.kahoot.it/share/a-completar-ciencias-naturais-5-ano/e31c4bf8-774e-4c76-a3ca-620567819316"><span style="font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-bidi-font-size: 11.0pt;">Quiz revisões 5º ano</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></div>
<div class="MsoNormal">
<br /></div>
<div align="center" style="margin-bottom: .0001pt; margin: 0cm; text-align: center;">
<b><span style="color: #741b47; font-family: "Arial","sans-serif"; font-size: 18.0pt;">6º ano<o:p></o:p></span></b></div>
<div align="center" style="margin-bottom: .0001pt; margin: 0cm; text-align: center;">
<br /></div>
<h4 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: 1pt none windowtext; color: #99cc00; font-family: Arial, sans-serif; font-weight: normal; letter-spacing: -0.3pt; padding: 0cm;"><span style="font-size: large;">PROCESSOS VITAIS COMUNS AOS SERES VIVOS</span></span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 22.5pt; font-weight: normal; letter-spacing: -.3pt;"><o:p></o:p></span></h4>
<div style="background: white; margin-bottom: 12.0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; vertical-align: baseline;">
<br /></div>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Trocas nutricionais entre o
organismo e o meio: nos animais</span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt;"><o:p></o:p></span></h5>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">A importância de uma
alimentação equilibrada e segura </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/nutrientes/12632a1d-e1a0-48e0-a044-dfaa94d25938"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Nutrientes</span></a><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/higiene-e-seguranca-alimentar/baaa0e64-7277-4bc3-bb1d-69b0df2a0329"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Higiene e segurança
alimentar</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/dia-mundial-da-alimentacao/86e5755a-3b3d-4020-928b-ebac23e91d65"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Dia mundial da
Alimentação</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://play.kahoot.it/#/k/e3442f8c-a5d4-4832-979d-a48d20f50090"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz3</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Sistema digestivo do ser
humano </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://play.kahoot.it/#/k/3d4283e3-59c1-46fb-93be-21f3e333d99b"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Sistemas digestivos das aves e
dos ruminantes</span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Relação entre respiração
externa e respiração celular </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Órgãos respiratórios dos
animais </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Sistema respiratório
humano </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/sistema-respiratorio/fc066a2c-21e2-457e-aacd-8a1ee5f6dd4a"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">,<span style="mso-spacerun: yes;"> </span><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/sistema-respiratorio/c21b91de-e4cc-4cc8-92fb-b337c75e8d32"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz1</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Sistema cardiovascular
humano </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://play.kahoot.it/#/k/29784e83-4cae-41a4-a8fc-6335f17272e8"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 16.0pt; mso-bidi-font-size: 17.0pt;">, (sistema cardiovascular)<o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="background: yellow; color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt; mso-highlight: yellow;">- </span><a href="https://create.kahoot.it/share/o-sangue/283928d4-cede-4aad-a5b1-8405cf4a882e"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz1</span></a><span style="background: yellow; mso-highlight: yellow;"> </span><span style="background: yellow; color: #666666; font-family: "Arial","sans-serif"; font-size: 16.0pt; mso-bidi-font-size: 17.0pt; mso-highlight: yellow;">(Sangue)</span><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 16.0pt; mso-bidi-font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 16.0pt; mso-bidi-font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/circulacao-do-sangue/29784e83-4cae-41a4-a8fc-6335f17272e8"><span style="font-family: "Arial","sans-serif"; font-size: 16.0pt; mso-bidi-font-size: 17.0pt;">Circulação
do sangue</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Sistema urinário humano </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/sistema-excretor/d61d27c4-7d6a-4799-abd7-28a4b5f02993"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a>
sistema excretor<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><span style="mso-spacerun: yes;"> </span><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/sistema-urinario/7269eccd-ecfb-4ed2-a448-3808c6129998"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz1</span></a><b><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;"><o:p></o:p></span></b></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">O papel da pele na função
excretora <o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">- </span></strong><a href="https://play.kahoot.it/#/k/d61d27c4-7d6a-4799-abd7-28a4b5f02993"><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz</span></a><strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;"><o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<br /></div>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Trocas nutricionais entre o
organismo e o meio: nas plantas</span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt;"><o:p></o:p></span></h5>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">A importância da fotossíntese
na obtenção de alimento pelas plantas</span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/as-plantas-fotossintese-6-ano/75c370be-868c-4b76-9657-545b5c4feae0"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">, </span><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 16.0pt; mso-bidi-font-size: 17.0pt;">(todos conteúdos)<o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/as-plantas-6-ano/c87affa3-aa49-477d-b75f-699714f33953"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz1</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">,<span style="mso-spacerun: yes;"> </span><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://play.kahoot.it/#/k/d31db259-9d69-4de9-9185-987bf77c912b"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz2</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">A importância das plantas como
fonte de nutrientes, de matéria-prima e de renovação do ar atmosférico </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; text-align: justify; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Reprodução das plantas, </span></strong><a href="https://create.kahoot.it/share/alimentacao-e-reproducao-das-plantas/d31db259-9d69-4de9-9185-987bf77c912b"><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz</span></a><strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;"><o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: 12.0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; vertical-align: baseline;">
<br /></div>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Transmissão de vida: reprodução
no ser humano <o:p></o:p></span></h5>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; font-weight: normal; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;">- </span><a href="https://play.kahoot.it/#/k/1fcc3cc1-88e5-4fee-86b4-c744f660381b"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; font-weight: normal; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz</span></a><span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; font-weight: normal; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;">,<span style="mso-spacerun: yes;"> </span><o:p></o:p></span></h5>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; font-weight: normal; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;">- </span><a href="https://play.kahoot.it/#/k/0f2609eb-29a8-429d-b59b-bbd100534d60"><span style="border: none windowtext 1.0pt; font-family: "Arial","sans-serif"; font-size: 18.5pt; font-weight: normal; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz1</span></a><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; font-weight: normal; mso-bidi-font-weight: bold;"><o:p></o:p></span></h5>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">A puberdade como fase do
crescimento humano </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Sistemas reprodutores humanos</span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/sistema-reprodutor-humano-2/7d95013c-3b26-4aec-a44a-c564666832e3"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Processo de reprodução
humana </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/reproducao-humana-e-crescimento/1fcc3cc1-88e5-4fee-86b4-c744f660381b"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; font-weight: normal; mso-bidi-font-family: Arial; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;">- </span></strong><a href="https://create.kahoot.it/share/transmissao-da-vida/0f2609eb-29a8-429d-b59b-bbd100534d60"><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz 1</span></a><strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; font-weight: normal; mso-bidi-font-family: Arial; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;"><o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<a href="https://create.kahoot.it/share/educacao-sexual-cidadania/54eb7a69-cd73-493c-82e6-9a3ad665795c"><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Educação sexiual</span></a><strong><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-weight: normal; mso-bidi-font-weight: bold; mso-border-alt: none windowtext 0cm; padding: 0cm;"><o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: 12.0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; vertical-align: baseline;">
<br /></div>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Transmissão de vida: nas
plantas</span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt;"><o:p></o:p></span></h5>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Reprodução nas plantas com
semente <o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">- </span></strong><a href="https://play.kahoot.it/#/k/c87affa3-aa49-477d-b75f-699714f33953"><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz</span></a><strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">,<span style="mso-spacerun: yes;"> </span><o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">- </span></strong><a href="https://play.kahoot.it/#/k/d31db259-9d69-4de9-9185-987bf77c912b"><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz1</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: 12.0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; vertical-align: baseline;">
<br /></div>
<h4 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: 1pt none windowtext; color: #99cc00; font-family: Arial, sans-serif; font-weight: normal; letter-spacing: -0.3pt; padding: 0cm;"><span style="font-size: large;">AGRESSÕES DO MEIO E INTEGRIDADE DO ORGANISMO</span></span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 22.5pt; font-weight: normal; letter-spacing: -.3pt;"><o:p></o:p></span></h4>
<div style="background: white; margin-bottom: 12.0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; vertical-align: baseline;">
<br /></div>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Microrganismos <o:p></o:p></span></h5>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<strong><span style="color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-weight: normal;">- </span></strong><a href="https://create.kahoot.it/share/microrganismos/a1430259-b47a-45fa-ba97-3853482f0b3b"><span style="font-family: "inherit","serif"; font-size: 17.0pt; font-weight: normal; mso-bidi-font-weight: bold;">Quiz</span></a><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt; font-weight: normal; mso-bidi-font-weight: bold;"><o:p></o:p></span></h5>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Papel dos microrganismos para o
ser humano <o:p></o:p></span></strong></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">- </span></strong><a href="https://play.kahoot.it/#/k/a1430259-b47a-45fa-ba97-3853482f0b3b"><span style="border: none windowtext 1.0pt; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Agressões causadas por alguns
agentes patogénicos </span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
<div style="background: white; margin-bottom: .0001pt; margin: 0cm; vertical-align: baseline;">
<span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;">- </span><a href="https://create.kahoot.it/share/microrganismos-patogenicos/00219b0f-d4c4-4d00-8b7a-cc4e4780e42a"><span style="font-family: "Arial","sans-serif"; font-size: 17.0pt;">Quiz</span></a><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"><o:p></o:p></span></div>
<div style="background: white; margin-bottom: 12.0pt; margin-left: 0cm; margin-right: 0cm; margin-top: 0cm; vertical-align: baseline;">
<br /></div>
<h5 style="background: white; margin-bottom: .0001pt; margin: 0cm; mso-line-height-alt: 15.6pt; vertical-align: baseline;">
<span style="border: none windowtext 1.0pt; color: olive; font-family: "Arial","sans-serif"; font-size: 18.5pt; mso-border-alt: none windowtext 0cm; padding: 0cm;">Higiene e problemas sociais</span><span style="color: #444444; font-family: "Arial","sans-serif"; font-size: 18.5pt;"><o:p></o:p></span></h5>
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<strong><span style="border: none windowtext 1.0pt; color: #666666; font-family: "inherit","serif"; font-size: 17.0pt; mso-bidi-font-family: Arial; mso-border-alt: none windowtext 0cm; padding: 0cm;">Influência da higiene e da
poluição na saúde humana</span></strong><span style="color: #666666; font-family: "Arial","sans-serif"; font-size: 17.0pt;"> <o:p></o:p></span></div>
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Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-2954127520082691022018-07-19T14:28:00.003+01:002020-10-08T12:16:11.284+01:00Lista de links para questionários online Matemática (Kahoot)<br />
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<b><span face=""arial" , "helvetica" , sans-serif" style="color: #741b47; font-size: large;">Lista de links para questionários online Matemática (Kahoot)</span></b></div>
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<b style="color: #741b47; font-family: Arial, Helvetica, sans-serif; font-size: small;">(podes instalar a app Kahoot no teu telemóvel e divertires-te a fazer os questionários)</b><br />
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<b><span face="Arial, sans-serif" style="font-size: 16pt;">. Revisões:<o:p></o:p></span></b></div>
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<a href="https://create.kahoot.it/share/matematica-basica-calculo/cce8bbd5-28c5-4701-8253-1197e608c8ea"><span face=""Arial","sans-serif"" style="font-size: 16pt; line-height: 150%; mso-bidi-font-size: 13.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">1º ciclo expressões numéricas com números inteiros</span></a><span face="Arial, sans-serif" style="font-size: 16pt; line-height: 150%;"><o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/matematicando-desafio/536db44d-72ff-456f-a846-0f1647a55d7d"><span face=""Arial","sans-serif"" style="font-size: 16pt; line-height: 150%; mso-bidi-font-size: 13.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Desafio matemática inicial</span></a><span face="Arial, sans-serif" style="font-size: 16pt; line-height: 150%;"><o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/fracoes-2-ciclo/bcecd286-1621-469f-aaa9-d3d690fba310"><span face=""Arial","sans-serif"" style="font-size: 16pt; line-height: 150%; mso-bidi-font-size: 13.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Revisões 1º ciclo números racionais</span></a><span face="Arial, sans-serif" style="font-size: 16pt; line-height: 150%;"> , </span><a href="https://create.kahoot.it/share/fracoes/227e75a5-a98f-450b-ba3f-889adf9a119b"><span face=""Arial","sans-serif"" style="font-size: 16pt; line-height: 150%; mso-bidi-font-size: 13.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">outro</span></a><span face="Arial, sans-serif" style="font-size: 16pt; line-height: 150%;">, </span><a href="https://create.kahoot.it/share/fracoes-5-ano/b3db1c77-65fe-44de-a98d-a7844434ecf9"><span face=""Arial","sans-serif"" style="font-size: 16pt; line-height: 150%; mso-bidi-font-size: 13.5pt; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">outro</span></a><span face="Arial, sans-serif" style="font-size: 16pt; line-height: 150%;"><o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/treino-do-calculo-mental-2-ciclo/9187ff0a-6af5-4815-a2a9-581675845d18"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Cálculo mental</span></a><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/poligonos/474a1ad3-1aec-49c6-93ca-e0ad78375f58"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Polígonos</span></a><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/jogo-da-adicao-e-subtracao-5-ano/61b087f3-23a8-4f49-8427-5ea799c26594"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Jogo adição e subtração númerois
inteiros</span></a><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/matematica-5-ano/370fd47e-61f6-4b0e-8ac8-9f96bfe6bd3e"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Vários 1º ciclo</span></a><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/conhecimentos-gerais-de-matematica-1-ciclo/1bc6c83c-d748-4c99-ad03-30ab9036837a"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Revisões 1º ciclo</span></a><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman";"> <o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/matematicos-famosos/aee87ea2-5fb2-447e-8b0b-4eb8291a1a16"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Matemáticos famosos</span></a><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></div>
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<b><span face=""Arial","sans-serif"" style="color: #741b47; font-size: 18pt;">5º ano<o:p></o:p></span></b></div>
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<span face=""Open Sans","sans-serif"" style="font-size: 18.5pt; font-weight: normal;">Números e Operações<o:p></o:p></span></h2>
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<span face=""Open Sans","sans-serif"" style="font-size: 18.5pt;">Números racionais não negativos<o:p style="font-weight: normal;"></o:p></span></h3>
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<span face=""Helvetica","sans-serif"" style="font-size: 15pt; mso-bidi-font-family: "Times New Roman";">- Simplificação de
frações;<br />
- Frações irredutíveis;<br />
- Redução de duas frações ao mesmo denominador;<br />
- Ordenação de números racionais representados por frações;<br />
- Adição, subtração, multiplicação e divisão de números racionais não negativos
representados na forma de fração;<br />
- Representação de números racionais na forma de numerais mistos; adição e
subtração de números racionais representados por numerais mistos;<br />
- Aproximações e arredondamentos de números racionais;<br />
- Problemas de vários passos envolvendo números racionais representados na
forma de frações, dízimas, percentagens e numerais mistos.<o:p></o:p></span></div>
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<span style="color: black;"><a href="https://create.kahoot.it/share/a-matematica-e-a-musica/333dc95f-23eb-4a9e-bb0b-032a9ed72f1d"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Frações e a música</span></a><span face=""Helvetica","sans-serif"" style="font-size: 15pt; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></span></div>
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<span face=""Open Sans","sans-serif"" style="font-size: 18.5pt;">Números naturais<o:p style="font-weight: normal;"></o:p></span></h3>
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<span face=""Helvetica","sans-serif"" style="font-family: inherit; font-size: 15pt; mso-bidi-font-family: "Times New Roman";">- Critérios de
divisibilidade por 3, 4 e 9;<br />
- Determinação do máximo divisor comum de dois números naturais por inspeção
dos divisores de cada um deles;<br />
- Algoritmo de Euclides;<br />
- Números primos entre si; números obtidos por divisão de dois dados números
pelo respetivo máximo divisor comum; irredutibilidade das frações de termos
primos entre si;<br />
- Determinação do mínimo múltiplo comum de dois números naturais por inspeção
dos múltiplos de cada um deles;<br />
- Relação entre o máximo divisor comum e o mínimo múltiplo comum de dois
números;<br />
- Problemas envo</span><span face=""Helvetica","sans-serif"" style="font-family: arial; mso-bidi-font-family: "Times New Roman";">lvendo</span><span face=""Helvetica","sans-serif"" style="font-family: inherit; font-size: 15pt; mso-bidi-font-family: "Times New Roman";"> o cálculo do mínimo múltiplo comum e do máximo divisor
comum de dois números.<o:p></o:p></span></div>
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<a href="https://create.kahoot.it/share/numeros-naturais-multiplos-e-divisores/22bf94c1-2236-47f1-b2d0-8a00f0d70b51" target="_blank"><span style="color: black; font-family: inherit;"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;">Múltiplos e divis</span><span style="font-size: 15pt;">ores</span></span></a></div>
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<span style="font-family: inherit;"><span face=""Helvetica","sans-serif"" style="font-size: 15pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;"><a href="https://create.kahoot.it/share/conhecimentos-basicos-de-matematica-2-ciclo/8d47ef08-0c89-4f6a-8472-4eca94a84580">Link</a> (conhecimentos básicos de matemática)</span><span face=""Helvetica","sans-serif"" style="font-size: 15pt; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></span></div>
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<span face=""Helvetica","sans-serif"" style="font-family: inherit; font-size: 15pt; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-theme-font: major-fareast;"><a href="https://create.kahoot.it/share/divisores-e-multiplos-5-ano/8036904d-63d8-4775-a77f-0728fae0e035">Link</a> (múltiplos e divisores)</span><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; mso-bidi-font-family: "Times New Roman";"><o:p></o:p></span></div>
<h2 style="text-align: left;">Geometria e Medida</h2><div class="MsoNormal">
<span face=""Helvetica","sans-serif"" style="font-family: arial; line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><a href="https://create.kahoot.it/share/geometria-circunferencia-e-angulos/29a42b21-b0af-4f40-8c76-ed3276cfb0a3">Circunferência e ângulos</a></span></div><span style="font-family: arial;">
Ângulos, paralelismo e perpendicularidade
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<span style="font-family: arial;"><span face=""Helvetica","sans-serif"" style="line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><a href="https://create.kahoot.it/share/poligonos-e-angulos-5-ano/61e15697-4940-4def-af77-0fb29079d344" target="_blank">Polígonos e ângulos</a></span><span face=""Helvetica","sans-serif"" style="color: #555555; font-size: 15pt; line-height: 150%; mso-bidi-font-family: "Times New Roman"; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: PT;"><o:p></o:p></span></span></div><span style="font-family: arial;">
- Ângulo igual à soma de outros dois; definição e construção com régua e compasso;<br /> - Bissetriz de um ângulo; construção com régua e compasso;<br /> - Ângulos complementares e suplementares;<br /> - Igualdade de ângulos verticalmente opostos;<br /> - Semirretas diretamente e inversamente paralelas;<br /> - Ângulos correspondentes e paralelismo;<br /> - Ângulos internos, externos e pares de ângulos alternos internos e alternos externos determinados por uma secante num par de retas concorrentes; relação com o paralelismo;<br /> - Ângulos de lados diretamente e inversamente paralelos; pares de ângulos de lados perpendiculares. </span></div><div><span style="font-family: arial;"><br /></span></div><div><span style="font-family: arial;"><a href="https://www.blogger.com/#">Link</a> </span></div><div><br /><h2 style="text-align: left;"> Triângulos e quadriláteros </h2><span style="font-family: arial;"> - Ângulos internos, externos e adjacentes a um lado de um polígono;<br /> - Ângulos de um triângulo: soma dos ângulos internos, relação de um ângulo externo com os internos não adjacentes e soma de três ângulos externos com vértices distintos;<br /> - Triângulos acutângulos, obtusângulos e retângulos; hipotenusa e catetos de um triângulo retângulo;<br /> - Ângulos internos de triângulos obtusângulos e retângulos;</span></div><div><span style="font-family: arial;"><br />
<a href="https://www.blogger.com/#">Link</a><br /> - Paralelogramos; ângulos opostos e adjacentes de um paralelogramo;<br /> - Critérios de igualdade de triângulos: critérios LLL, LAL e ALA; construção de triângulos dados os comprimentos de lados e/ou as amplitudes de ângulos internos;<br /> - Relações entre lados e ângulos num triângulo ou em triângulos iguais;<br /> - Igualdade dos lados opostos de um paralelogramo;<br /> - Desigualdade triangular;<br /> - Pé da perpendicular traçada de um ponto para uma reta e, num dado plano, perpendicular a uma reta num ponto;<br /> - Distância de um ponto a uma reta e entre retas paralelas; altura de um triângulo e de um paralelogramo. </span></div><div><span style="font-family: arial;"><br /></span><h2 style="text-align: left;"><span style="font-family: arial;"> Problemas </span></h2><span style="font-family: arial;"> - Problemas envolvendo as noções de paralelismo, perpendicularidade, ângulos e triângulos. <br /></span><h2 style="text-align: left;"><span style="font-family: arial;"> Área </span></h2><span style="font-family: arial;"> - Área de retângulos de lados de medida racional;<br /> - Fórmulas para a área de paralelogramos e triângulos; <br /> <a href="https://www.blogger.com/#">Link</a><br /> - Problemas envolvendo o cálculo de áreas de figuras planas. <br /> Amplitude de ângulos <br /> - Medidas de amplitudes de ângulos;<br /> - O grau como unidade de medida de amplitude; minutos e segundos de grau;<br /> - Utilização do transferidor para medir amplitudes de ângulos e para construir ângulos de uma dada medida de amplitude;<br /> - Problemas envolvendo adições, subtrações e conversões de medidas de amplitude expressas em forma complexa e incomplexa. <br /></span> <br /><h2 style="text-align: left;"> Álgebra </h2> Expressões algébricas e propriedades das operações <br /><span style="font-family: arial;"> - Prioridades convencionadas das operações de adição, subtração, multiplicação e divisão; utilização de parêntesis;<br /> - Propriedades associativa e comutativa da adição e multiplicação e propriedades distributivas da multiplicação em relação à adição e subtração;<br /> - Elementos neutros da adição e da multiplicação e elemento absorvente da multiplicação de números racionais não negativos;<br /> - Utilização do traço de fração com o significado de quociente de números racionais;<br /> - Inversos dos números racionais positivos;<br /> - Produto e quociente de quocientes de números racionais; inverso de um produto e de um quociente de números racionais;<br /> - Cálculo de expressões numéricas envolvendo as quatro operações aritméticas e a utilização de parêntesis;<br /> - Linguagem natural e linguagem simbólica. <br /> <a href="https://www.blogger.com/#">Revisão números racionais</a> <br /> <br /></span><h2 style="text-align: left;"><span style="font-family: arial;"> Organização e Tratamento de Dados </span></h2><h3 style="text-align: left;"><span style="font-family: arial;"> Gráficos cartesianos </span></h3><span style="font-family: arial;"> - Referenciais cartesianos, ortogonais e monométricos;<br /> - Abcissas, ordenadas e coordenadas;<br /> - Gráficos cartesianos. <br /></span><h3 style="text-align: left;"><span style="font-family: arial;"> Representação e tratamento de dados </span></h3><span style="font-family: arial;"> - Tabelas de frequências absolutas e relativas;<br /> - Gráficos de barras e de linhas;<br /> - Média aritmética;<br /> - Problemas envolvendo a média e a moda;<br /> - Problemas envolvendo dados em tabelas, diagramas e gráficos. <br /> <a href="https://www.blogger.com/#">link</a> <br /> <a href="https://www.blogger.com/#">Link 1</a> <br /> <a href="https://www.blogger.com/#">Revisões 5º ano matemática</a> </span><br /> <br /> <br /> 6º ano <br /> <br /> <br /> Números e Operações <br /> Números naturais <br /> - Números primos;<br /> - Crivo de Eratóstenes;<br /> - Teorema fundamental da aritmética e aplicações. <br /> Números racionais positivos e negativos <br /> <a href="https://www.blogger.com/#">Link</a> <br /> - Números racionais negativos;<br /> - Simétrico e valor absoluto de um número racional;<br /> - Semirreta de sentido positivo associada a um número; ordenação de números racionais;<br /> - Conjunto dos números inteiros relativos e conjunto dos números racionais. <br /> Adição e subtração de números racionais <br /> - Segmentos de reta orientados; orientação positiva e negativa de segmentos orientados da reta numérica;<br /> - Adição de números racionais; definição e propriedades;<br /> - Subtração e soma algébrica de números racionais; definição e propriedades;<br /> - Módulo da diferença de dois números como medida da distância entre os pontos que representam esses números na reta numérica. <br /> <a href="https://www.blogger.com/#">Link</a> <br /> <a href="https://www.blogger.com/#">Decimais frações e percentagem relações</a> <br /> <a href="https://www.blogger.com/#">Revisões números racionais</a> <br /> <br /> Geometria e Medida <br /> Figuras geométricas planas <br /> <a href="https://www.blogger.com/#">Link</a> <br /> - Ângulo ao centro e setor circular;<br /> - Polígonos inscritos numa circunferência;<br /> - Retas e segmentos de reta tangentes a uma circunferência;<br /> - Polígonos circunscritos a uma circunferência;<br /> - Apótema de um polígono. <br /> Sólidos geométricos e propriedades <br /> <a href="https://www.blogger.com/#">Link</a> <br /> - Prismas; prismas oblíquos e regulares;<br /> - Pirâmides;<br /> - Bases, faces laterais e vértices de prismas e pirâmides;<br /> - Pirâmides regulares;<br /> - Cilindros; bases, eixo, geratrizes e superfície lateral de um cilindro;<br /> - Cones; base, vértice, eixo, geratrizes e superfície lateral de um cone;<br /> - Cilindros e cones retos;<br /> - Relação entre o número de arestas e de vértices de um prisma (ou pirâmide) e da respetiva base;<br /> - Poliedros convexos;<br /> - Relação de Euler;<br /> - Planificações de sólidos;<br /> - Problemas envolvendo sólidos geométricos e respetivas planificações. <br /> <a href="https://www.blogger.com/#">Revisões sólidos</a> <br /> Área <br /> <a href="https://www.blogger.com/#">Perímetro e área de polígonos</a> <br /> - Fórmula para o perímetro do círculo; aproximação por perímetros de polígonos regulares inscritos e circunscritos;<br /> - Fórmula para a área de polígonos regulares;<br /> - <a href="https://www.blogger.com/#">Fórmula para a área do círculo</a>; aproximação por áreas de polígonos regulares inscritos;<br /> - Problemas envolvendo o cálculo de perímetros e áreas de polígonos e círculos. <br /> <a href="https://www.blogger.com/#">Sólidos e áreas</a> <br /> <a href="https://www.blogger.com/#">Círculo e cirfunferência</a> <br /> <a href="https://www.blogger.com/#">Perímetros e áreas</a> <br /> Volume <br /> - Fórmula para o volume do paralelepípedo retângulo com dimensões de medida racional;<br /> - Fórmulas para o volume do prisma reto e do cilindro reto;<br /> - Problemas envolvendo o cálculo de volumes de sólidos. <br /> <a href="https://www.blogger.com/#">Áreas e volume 6º ano</a> <br /> Isometrias do plano <br /> - Reflexão central como isometria; invariância da amplitude de ângulo;<br /> - Mediatriz de um segmento de reta; construção da mediatriz utilizando régua e compasso;<br /> - Reflexão axial como isometria; invariância da amplitude de ângulo; eixos de simetria; a bissetriz de um ângulo como eixo de simetria;<br /> - Rotação de sentido positivo ou negativo como isometria; invariância da amplitude de ângulo;<br /> - Imagem de um segmento de reta por uma isometria;<br /> - Construção de imagens de figuras planas por reflexões centrais e axiais e por rotações;<br /> - Simetrias de rotação e de reflexão; <a href="https://www.blogger.com/#">Simetria conceito</a><br /> - Problemas envolvendo as propriedades das isometrias e utilizando raciocínio dedutivo;<br /> - Problemas envolvendo figuras com simetrias de rotação e de reflexão axial. <br /> <a href="https://www.blogger.com/#">Link revisões</a> <br /> <a href="https://www.blogger.com/#">Link revisões 1</a> <br /> <a href="https://www.blogger.com/#">Link</a> <br /> <a href="https://www.blogger.com/#">Link ótimo</a> <br /> <br /> Álgebra <br /> Potências de expoente natural <br /> <a href="https://www.blogger.com/#">link</a> <br /> - Potência de base racional não negativa;<br /> - Regras operatórias das potências de base racional não negativa;<br /> - Prioridade das operações;<br /> - Linguagem simbólica e linguagem natural em enunciados envolvendo potências. <br /> Sequências e regularidades <br /> - Determinação de termos de uma sequência definida por uma lei de formação recorrente ou por uma expressão geradora;<br /> - Determinação de expressões geradoras de sequências definidas por uma lei de formação recorrente;<br /> - Problemas envolvendo a determinação de uma lei de formação compatível com uma sequência parcialmente conhecida. <br /> Proporcionalidade direta <br /> - Noção de grandezas diretamente proporcionais e de constante de proporcionalidade direta;<br /> - Proporções; extremos, meios e termos de uma proporção; propriedades; regra de três simples;<br /> - Escalas em mapas;<br /> - Problemas envolvendo a noção de proporcionalidade direta entre grandezas mutuamente dependentes. <br /> <a href="https://www.blogger.com/#">Link</a> <br /> <br /> Organização e Tratamento de Dados <br /> Representação e tratamento de dados <br /> <a href="https://www.blogger.com/#">Link</a> <br /> <a href="https://www.blogger.com/#">Link 1</a> <br /> - População e unidade estatística;<br /> - Variáveis quantitativas e qualitativas;<br /> - Gráficos circulares;<br /> - Análise de conjuntos de dados a partir da média, moda e amplitude;<br /> - Problemas envolvendo dados representados de diferentes formas. <br />
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Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-24096962901852808962017-03-17T22:30:00.000+00:002020-07-14T16:38:38.101+01:00SuperTmatik<br />
Gostas de jogar o jogo do SuperTmatik?<br />
<br />
Queres jogar online?<br />
<br />
Podes ir ao site Eudactica.pt e clicar no link: <a href="http://www.supertmatik.net/app/cartas">http://www.supertmatik.net/app/cartas</a>/ Neste caso é<br />
<br />
Junta-te a um colega/amigo, pega numa caneta e num papel e diverte-te.<br />
<br />Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-85752191793720738862016-08-27T14:14:00.001+01:002016-08-27T14:14:50.697+01:00Descobre Portugal em númerosOlá a todos,<br />
<br />
soube da existência de um site onde podes encontrar imensa informação sobre o nosso país, relativamente a:<br />
- Ambiente<br />
- Ciência e tecnologia<br />
- Cultura e desporto<br />
- Educação<br />
- Emprego<br />
- Família<br />
- Justiça<br />
- População<br />
- Saúde<br />
- Turismo<br />
<br />
Vê o vídeo de apresentação:<br />
<br />
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<iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/7UFJdB7_Yd8/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/7UFJdB7_Yd8?feature=player_embedded" width="320"></iframe></div>
<br />
Tens aqui a página web da Pordata kids ("Por" de Portugal, "data" de números e "kids" do inglês que quer dizer criança). Basta clicar nela para abrir.<br />
<br />
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<a href="http://www.pordatakids.pt/Inicio" target="_blank"><img alt="http://www.pordatakids.pt/Inicio" height="223" 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" width="400" /> </a><br />
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Podes descarregar jogos no site em : http://www.pordatakids.pt/Jogos Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-51987629428122373982016-07-29T18:25:00.000+01:002016-07-31T21:48:37.320+01:00Erro nos links...<span style="font-family: "verdana" , sans-serif;">Olá caros alunos,</span><br />
<span style="font-family: "verdana" , sans-serif;"><br />
</span><br />
<span style="font-family: "verdana" , sans-serif;">venho pedir-vos que se encontrarem algum problema em abrir um link de um jogo, ou de uma ficha me informem, por exemplo, fazendo um comentário.</span><br />
<span style="font-family: "verdana" , sans-serif;">Para facilitar a entrada nos diferentes links, arranja um programa que bloqueie os Pop-ups.</span><br />
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-k2SAqUbojy6v0HkvEFT1Twt54vEujv_DCuw_VnNpPOEFWH10zijVM93G5j4V3IFi2kRZomsdKwyhNzLSsBP9y8zRmTWdjGr9RXvs6PJ9tfFsVQTLgvxvY2P4EZ5ge16i0gNhaz3v7dDu/s1600-h/crianca012.gif"><span style="font-family: "verdana" , sans-serif;"><img alt="" border="0" id="BLOGGER_PHOTO_ID_5392880835873686050" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-k2SAqUbojy6v0HkvEFT1Twt54vEujv_DCuw_VnNpPOEFWH10zijVM93G5j4V3IFi2kRZomsdKwyhNzLSsBP9y8zRmTWdjGr9RXvs6PJ9tfFsVQTLgvxvY2P4EZ5ge16i0gNhaz3v7dDu/s400/crianca012.gif" style="cursor: hand; display: block; height: 210px; margin: 0px auto 10px; text-align: center; width: 200px;" /></span></a><br />
<span style="font-family: "verdana" , sans-serif;">Bom trabalho!!</span>Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-67162426009564637932016-07-29T12:30:00.000+01:002016-07-29T12:48:18.864+01:00Contactar o autor do blog.Olá a todos.<br />
<br />
Caso estejam interessados em colocar-me alguma questão, façam-no mais abaixo ou <a href="https://docs.google.com/forms/d/1RIRR7k91dg18RCg4EHby2CdoAGbg7AVZKuwCqoR-b0w/viewform?embedded=true" target="_blank"><b>aqui</b></a>.<br />
Não se esqueçam de deixar o email.<br />
Só respondo a mensagens que têm haver com as disciplinas de matemática ou ciências naturais de 1º e 2º ciclo! Podem ver a resposta <a href="https://docs.google.com/spreadsheet/ccc?key=0Ah38YhU92CTHdHV6OEJGaFowZTgyYU4wZHZWYjVvZkE#gid=0" target="_blank">aqui</a>.<br />
<br />
<iframe frameborder="0" height="400" marginheight="0" marginwidth="0" src="https://docs.google.com/forms/d/1RIRR7k91dg18RCg4EHby2CdoAGbg7AVZKuwCqoR-b0w/viewform?embedded=true#start=invite" width="600">A carregar...</iframe>Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-53377895420617660642016-07-28T20:18:00.000+01:002016-07-31T21:48:02.927+01:00Grupo para colocar questões e opiniões<span style="font-family: "verdana" , sans-serif;">Olá!</span><br />
<span style="font-family: "verdana" , sans-serif;"><br />
</span><br />
<span style="font-family: "verdana" , sans-serif;">Hoje aprendi a criar um grupo com a possibilidade de criar um fórum.</span><br />
<span style="font-family: "verdana" , sans-serif;">Assim podemos discutir alguma temática aqui apresentada, ou podem colocar dúvidas sobre algum conteúdo. Para isso basta ter uma conta no google, como por exemplo ter um email do Gmail!</span><br />
<span style="font-family: "verdana" , sans-serif;"><br />
</span><br />
<span style="font-family: "verdana" , sans-serif;">Cliquem em <a href="http://groups.google.com/group/ajudaalunos">http://groups.google.com/group/ajudaalunos</a></span><br />
<span style="font-family: "verdana" , sans-serif;"><br />
</span><br />
<div class="separator" style="clear: both; text-align: center;">
<a href="http://groups.google.com/group/ajudaalunos" target="_blank"><img alt="http://groups.google.com/group/ajudaalunos" border="0" height="222" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgB4LvZRzZdIpE8oht9lHyTFPlrezCdzkjnEJWg69O-xyySH8gsk8LTJ-FiW_8ejUG5mcQ4ntehsXZd_fB7r5_17aT52NfgpAPf2ZWsKEelqd1m6UHDN0IwI46yq7Q7S_ZZS2u2V-NrTgqT/s400/3.png" width="400" /></a></div>
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<a href="http://groups.google.com/group/ajudaalunos"><span style="font-family: "verdana" , sans-serif;"></span></a>Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-90828718049607905292016-07-27T21:30:00.000+01:002016-07-29T12:56:18.860+01:00Página no FacebookPode utilizar a página do Facebook: <br />
<br />
<a href="https://www.facebook.com/groups/132117906817594/">https://www.facebook.com/groups/132117906817594/</a><br />
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AJUDAALUNOS com material, novidades, atividades, tarefas, etc, sobre matemática e ciências naturais.<br />
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<a href="https://www.facebook.com/groups/132117906817594/" target="_blank"><img alt=" https://www.facebook.com/groups/132117906817594/" border="0" height="196" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgdxMriD3Qw5efd2q8RYK4nqOY7kAbDsmNdJE7My7_a8Qw0FEdB3VXvcQkoP9EViahNTTMZ84J_fzwTkkR1fH_RDxBcttmpVYKd0dlW3qGeM_bmq9mBsTlLXKBKUi9ZrJtd4BNE_qwplY4S/s1600/1.jpg" width="320" /></a></div>
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<br />Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-38744577569214093742015-01-19T19:53:00.002+00:002020-07-14T16:40:00.134+01:00Propriedades do ar e dos gases<br />
Aqui vos deixo algumas experiências para demonstrar as propriedades do ar e seus componentes.<br />
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Propriedades do ar- Ar tem peso<b><br /></b>
<iframe allowfullscreen="" frameborder="0" height="315" src="//www.youtube.com/embed/0vHkwbI2yUI?list=PLe-Yz0737TdRwqJ9aAPh3HOGxqanwCmZA" width="560"></iframe>
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Propriedades do ar - Ar pode ser comprimido<br />
<iframe allowfullscreen="" frameborder="0" height="315" src="//www.youtube.com/embed/JugA7VS1Mak" width="420"></iframe>
Propriedade do ar - Ar ocupa espaço<br />
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<iframe allow="autoplay; encrypted-media" allowfullscreen="" frameborder="0" height="410" src="https://www.youtube.com/embed/3CELE4Alnl8" width="729"></iframe>
Propriedade do oxigénio- Comburente<br />
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<iframe allow="autoplay; encrypted-media" allowfullscreen="" frameborder="0" height="410" src="https://www.youtube.com/embed/rWT1yHz5rF4" width="729"></iframe>
Propriedade do nitrogénio ou azoto - Incomburente<br />
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<iframe allowfullscreen="" frameborder="0" height="315" src="//www.youtube.com/embed/c9utVkLBN9w" width="560"></iframe><br />
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<iframe allowfullscreen="" frameborder="0" height="315" src="//www.youtube.com/embed/ruNfRo1jQyU" width="560"></iframe>
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Propriedade do dióxido de carbono - Incomburente<br />
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(Vejam a conclusão mais abaixo)<br />
<iframe allowfullscreen="" frameborder="0" height="315" src="//www.youtube.com/embed/0wT7LEctO-g" width="560"></iframe>
<span style="background-color: white; color: #333333; font-family: "arial" , sans-serif; font-size: 13px; line-height: 17px;"> </span><br />
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"O que apagou a vela? A garrafa apenas se aproximou da chama e ela já se apagou. O que ocorreu? Ao colocar Bicarbonato de Sódio na garrafa com vinagre, ocorreu uma reação química que libertou dióxido de carbono. Esse gás se acumulou na garrafa e, quando ela foi tombada em direção à chama, escorreu em direção à vela tomando o lugar do Gás Oxigénio (Comburente essencial para que ocorra a combustão). Assim, a chama se apagou por falta de Oxigénio.<br />
<br />
Carlos Eduardo Godoy<br />
<br />
Professor de Ciências da Natureza e Tecnologia<br />
<br />
www.cecgodoy.pro.br"
<iframe allow="autoplay; encrypted-media" allowfullscreen="" frameborder="0" height="425" src="https://www.youtube.com/embed/n1qzfYNZdKU" width="710"></iframe>Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-55921947969600542192014-11-28T22:40:00.000+00:002014-11-28T22:40:19.040+00:00Educação ambiental para a sustentabilidade<br />
Deixo-vos com uma apresentação em powerpoint sobre este tema.<br />
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É importante que percebam a situação do nosso planeta e saibam o que podemos fazer para evitar todos os problemas.<br />
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<iframe allowfullscreen="" frameborder="0" height="355" marginheight="0" marginwidth="0" scrolling="no" src="//www.slideshare.net/slideshow/embed_code/42143856" style="border-width: 1px; border: 1px solid #CCC; margin-bottom: 5px; max-width: 100%;" width="425"> </iframe> </div>
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<strong> <a href="https://www.slideshare.net/lilifg1/educao-ambiental-42143856" target="_blank" title="Educação ambiental">Educação ambiental</a> </strong> from <strong><a href="https://www.slideshare.net/lilifg1" target="_blank">Liliana Guerreiro</a></strong> </div>
Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-82558444793751882392014-10-08T19:52:00.002+01:002014-10-11T07:44:48.801+01:00Simulacro de um sismo<span style="font-family: Verdana, sans-serif;">Olá a todos,</span><br />
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<span style="font-family: Verdana, sans-serif;">convido-os a convidar os vossos professores, colegas e amigos a fazer um simulacro de um sismo na próxima segunda feira. </span><br />
<span style="font-family: Trebuchet MS, sans-serif;"><br /><br />A terra vai tremer em Portugal exactamente às 10h13 da próxima segunda-feira, dia 13. E eis o que todos têm a fazer: baixar-se, para evitar uma queda, abrigar-se sob uma mesa e esperar um minuto até que o sismo passe.<br /><br /><br /> Calma, é apenas um exercício nacional de preparação dos cidadãos para o risco sísmico. A Autoridade Nacional de Protecção Civil (ANPC) está a convidar toda a população a participar – onde quer que as pessoas estejam, nas escolas, empresas, em centros comerciais ou em casa. Se os portugueses aderirem em força, muitas mortes ou ferimentos podem ser evitados num terramoto real no país.<br /><br /><br /> Num sismo, o desespero pode fazer com que qualquer um corra para a rua, com medo de que a casa lhe caia em cima. Mas o mais seguro, segundo a ANPC, é proteger-se logo que o tremor é sentido. <br /><br /><br /> A primeira atitude é baixar-se, para evitar que o corpo seja derrubado ou arremessado contra o chão. Depois, deve-se procurar refúgio debaixo de uma mesa sólida e lá permanecer até que o sismo passe. “Se estivermos dentro de casa, é esta a atitude mais segura”, garante Anabela Saúde, responsável pela área da comunicação na ANPC. “Há um consenso sobre o facto de grande parte dos danos corporais num sismo ter a ver com a queda de objectos sobre as pessoas”, completa."<br /></span>
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<a href="http://www.publico.pt/ecosfera/noticia/na-proxima-segundafeira-tire-um-minuto-para-atirarse-para-baixo-da-mesa-1672058">http://www.publico.pt/ecosfera/noticia/na-proxima-segundafeira-tire-um-minuto-para-atirarse-para-baixo-da-mesa-1672058</a></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><span style="background-color: white; color: #222222; font-size: 16px; line-height: 24px;"><br /></span></span>Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-26950697518558630002014-07-09T21:17:00.000+01:002014-07-09T21:17:37.969+01:00SegurançaOlá a todos!<br />
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Como ando a fazer uma formação sobre a Proteção Civil e sobre os cuidados a ter quando acontece um sismo, um incêndio ou outro incidente deixo-vos:<br />
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<li>uns panfetos sobre situações que nos podem acontecer e formas de diminuir os riscos de ficarmos feridos. (basta clicares em cada palavra sublinhada e uma janela abrir-se-á.</li>
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O que fazer quando há um <a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Documents/Inc_Escola_SabesFazer.pdf" target="_blank">Incêndio na escola</a>???<br />
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E quando há um <a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Documents/Sismos_crian_preparado.pdf" target="_blank">Sismo ou tremor de terra</a>?<br />
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Quando há <a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Documents/Seca_PouparAgua.pdf" target="_blank">falta de água</a> deves...<br />
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Deparas-te com uma situação de<a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Documents/Inund_SabesFazer.pdf" target="_blank"> inundação </a>como deves reagir?<br />
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Nesta época do ano estamos na altura dos <a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Documents/Inc_Floresta_Evitar.pdf" target="_blank">incêndios florestais</a>. Como agir nestes casos?<br />
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Agir durante um <a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Documents/Inc_casa_SabesFazer.pdf" target="_blank">incêndio em casa</a>...<br />
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Agora que estás de férias deves ter em conta algumas regras se fores para a <a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Documents/Seguran%C3%A7a%20no%20Campo%20e%20na%20Montanha.pdf" target="_blank">montanha ou para o campo</a>.<br />
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Podes ouvir alguns conselhos sobre incêndios, água, calor e cheias/inundações, <a href="http://www.proteccaocivil.pt/educid/RecInformativosPedagogicos/Pages/Audio.aspx" target="_blank">aqui</a>.<br />
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<li> alguns vídeos que deves ver com atenção e mostrar aos teus amigos e familiares, sobre os cuidados a ter com a tua segurança e dos outros.</li>
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No próximo filme podes aprender como deves proceder quando há um incêndio ou sismo na tua escola.<br />
<b><span style="font-size: large;">Pode salvar-te!</span></b><br />
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<iframe allowfullscreen="" frameborder="0" height="315" src="//www.youtube.com/embed/enVBHO9rISQ" width="420"></iframe><br />
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Já ouviste falar no Tinoni e companhia, deixo-te um filme sobre isso: (para veres outros clica onde diz, <b>Lista de Reprodução</b> e escolhe outro filme) Diverte-te e aprende. <b><span style="font-size: large;">Assim estás a proteger-te!</span></b><br />
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<iframe allowfullscreen="" frameborder="0" height="315" src="//www.youtube.com/embed/mIlMVzuukp4?list=PL829DEC609060070C" width="560"></iframe>Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-18810124025926327032014-04-14T19:10:00.002+01:002014-04-14T19:10:17.105+01:00Blog sobre animaisOlá caros alunos,<br />
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aqui vos deixo um blog que estou a criar, em conjunto com alunos meus, sobre <a href="http://bianimais.blogspot.pt/" target="_blank">BI dos animais</a>.<br />
O objetivo é criar B.I. de animais diferentes para tornar esta página mais rica!<br />
Se estiveres interessado em participar neste projeto envia, via email, o documento que queres ver publicado!<br />
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<a href="http://bianimais.blogspot.pt/" target="_blank"><img alt=" BI dos animais" border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiB1hVAtmCjfgGg0_CbnHvA58qxcnssTuaQLbCvKCcZD8B_NXcw0AOvH6AxqWT4mOJ5uKjUuGBWNpeVRlM1Pz48O17RgBWfyf1igKYr7ahL0hODLW6KYp4x_xoeuT6n2FTa8q21evV0kN2S/s1600/1.jpg" height="151" width="320" /></a></div>
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Boas pesquisas!Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-75817278498698002392014-03-14T20:41:00.000+00:002018-10-14T20:09:35.077+01:00Dia do Pi<span style="font-family: "arial" , "helvetica" , sans-serif;">Hoje comemora-se o dia do Pi.</span><br />
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<span style="font-family: "arial" , "helvetica" , sans-serif;">Os alunos a partir do 2º ciclo ficam a conhecer o pi e aqui vos deixo algumas informações sobre ele.</span><br />
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: 16px;">O </span><b style="font-size: 16px;">Dia do Pi </b><span style="font-size: 16px;">é comemorado anualmente no dia </span><b style="font-size: 16px;">14 de Março.</b><span style="font-size: 16px;"> A escolha da data 3 de Março para o Dia do Pi prende-se com o facto da notação americana das datas ser mês/dia e não dia/mês. </span></span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: 16px;">Assim, nos</span><b style="font-size: 16px;"> Estados Unidos da América</b><span style="font-size: 16px;">, a </span><b style="font-size: 16px;">notação do dia 14 de Março é 3/14</b><span style="font-size: 16px;">, a aproximação mais conhecida de Pi (3,141592653589793238462643383...)</span></span><br />
O auge das comemorações acontece à 1:59 da tarde (porque 3,14159 = π arredondado até a 5ª casa decimal).<br />
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<span style="font-family: "arial" , "helvetica" , sans-serif;">Origem do Dia do Pi</span></h2>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">A primeira comemoração do Dia do Pi aconteceu em 1988, em São Francisco, no Museu Exploratorium. Larry Shaw, considerado por muitos o "Príncipe do Pi", foi o fundador desta data comemorativa.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">O que é o Pi?</span></h2>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">O Pi é o número mais famoso da história. </span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">Representado pela<b> letra grega p</b>, tem origem na relação entre o perímetro de uma circunferência e seu diâmetro. </span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">Curiosamente embora seja um número, não pode ser escrito com um número finito de algarismos.</span></div>
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O número pi (representado habitualmente pela letra grega<a href="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcSlBfdIoZbVgSvROqoAPKXwDfqhTbQ00xRY63eb5KNX3frfxfEWLQ"><img border="0" src="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcSlBfdIoZbVgSvROqoAPKXwDfqhTbQ00xRY63eb5KNX3frfxfEWLQ" /></a> é o número irracional mais famoso da história, que tem origem na relação entre o perímetro de uma circunferência e seu diâmetro; por outras palavras, se uma circunferência tem perímetro e diâmetro então aquele número é igual a pi. É representado pela letra grega <a href="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcSlBfdIoZbVgSvROqoAPKXwDfqhTbQ00xRY63eb5KNX3frfxfEWLQ"><img border="0" src="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcSlBfdIoZbVgSvROqoAPKXwDfqhTbQ00xRY63eb5KNX3frfxfEWLQ" /></a>A letra grega (lê-se: pi), foi adotada para o número a partir da palavra grega para perímetro, provavelmente por William Jones em 1706, e popularizada por Leonhard Euler alguns anos mais tarde.<br />
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Se pensarmos que ao dar a volta à Lua seguindo um dos seus círculos máximos, percorremos aproximadamente 10920 Km e se dividirmos este valor pelo diâmetro da Lua que é 3476 Km iremos verificar que esta razão é de 3,14154200…, este número é-nos familiar, é aproximadamente 3,14.<br />
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No dia 14 de Março é também celebrado o aniversário de nascimento de Albert Einstein (nascido a 14 de março de 1879)<br />
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Em 14 de março de 2004, <a href="http://pt.wikipedia.org/wiki/Daniel_Tammet">Daniel Tammet</a> recitou pi até o 22514ª dígito, obtendo o recorde europeu pelo feito.<br />
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A música do pi... (cada tecla/som corresponde a um algarismo do pi!)<br />
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Sobre o pi...</div>
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Mais informações sobre o pi...<br />
<a href="http://www.educ.fc.ul.pt/icm/icm98/icm11/">http://www.educ.fc.ul.pt/icm/icm98/icm11/</a>Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-91387898076570659142014-01-03T21:45:00.005+00:002018-10-14T20:13:56.166+01:00Sustentabilidade ambientalHoje vamos aprender o que quer dizer o conceito de Sustentabilidade ambiental.<br />
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Nunca antes se ouviu falar tanto nessa palavra quanto nos dias atuais: <a href="http://www.atitudessustentaveis.com.br/">Sustentabilidade</a>. Mas, afinal de contas, o que é sustentabilidade?<br />
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“Na prática” sustentabilidade representa promover a exploração de áreas ou o uso de recursos planetários (naturais ou não), de forma a prejudicar o menos possível o equilíbrio entre o <a href="http://www.atitudessustentaveis.com.br/atitudes-sustentaveis/meio-ambiente-tenha-atitudes-sustentaveis/">meio ambiente</a> e as comunidades humanas e toda a biosfera que dele dependem para existir.<br />
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Pode parecer um conceito difícil de ser pôr em prática e, em muitos casos, com gastos muito elevados. No entanto, não é bem assim. Mesmo nas atividades humanas que provocam grandes prejuízos no meio ambiente como a exploração mineira; a extração vegetal, a agricultura em larga escala; o fabrico de papel e celulose e todas as outras; a aplicação de práticas sustentáveis nesses negócios; revelou-se viável a nível monetário e em muitos deles trouxe mais dinheiro.<br />
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Assim, os projetos empresariais que tenham por base a <a href="http://www.atitudessustentaveis.com.br/categoria/sustentabilidade/">sustentabilidade</a>, começaram a multiplicar-se e a espalhar-se por vários lugares antes degradados do planeta. Muitas comunidades que antes viviam sofrendo com doenças de todo tipo; provocadas por indústrias poluidoras instaladas na sua vizinhança viram a sua qualidade de vida ser recuperada, aos poucos e melhorada ao longo do desenvolvimento desses<a href="http://www.atitudessustentaveis.com.br/imoveis-sustentaveis/empreendimentos-sustentaveis-onda-sustentabilidade/"> projetos sustentáveis</a>. <br />
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A exploração e a extração de recursos com mais eficiência e com a garantia da possibilidade de recuperação das áreas degradadas é a chave para que a sustentabilidade seja uma prática bem sucedida e aplicada com muito mais frequência aos grandes <a href="http://www.atitudessustentaveis.com.br/atitudes-sustentaveis/empreendimentos-sustentaveis-saida-planeta/">empreendimentos</a>.<br />
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De uma forma simples, podemos afirmar que garantir a sustentabilidade de um projeto ou de uma região determinada; é dar garantias de que mesmo explorada essa área continuará a dar recursos e bem estar natural, econômico e social para as comunidades que nela vivem por muitas e muitas gerações. Mantendo a força vital e a capacidade de regenerar-se mesmo diante da ação contínua e da presença da mão humana.<br />
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A <a href="http://www.atitudessustentaveis.com.br/sustentabilidade/sustentabilidade-ambiental-o-que-e-a-sustentabilidade-ambiental/">Sustentabilidade Ambiental</a> é a capacidade de manter o ambiente natural viável à manutenção das condições de vida para as pessoas e para as outras espécies. <br />
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Isso garante, ainda, a qualidade de vida para o homem, tendo em conta a habitabilidade, a beleza do ambiente e a sua função como fonte de energias renováveis. <br />
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A adoção das medidas que dêem sustentação ambiental garante, em médio e longo prazo, um planeta em boas condições para o desenvolvimento das diversas formas de vida, inclusive a humana, garantindo a manutenção dos recursos naturais (florestas, matas, rios, lagos, oceanos) necessários para a qualidade de vida das próximas gerações.<br />
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Exemplos de ações sustentáveis e ambientais:<br />
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- procura de substitutos ecologicamente aceitável, como as energias renováveis, ao petróleo, que além de altamente poluente, tende a esgotar-se ainda mais rápido por conta do aumento do consumo ao longo dos séculos XX e XXI;<br />
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- Exploração dos recursos minerais (petróleo, carvão, minérios) de forma controlada, racionalizada e com planeamento;<br />
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- utilização da agricultura orgânica/biológica, termo usado para designar a produção de alimentos e outros produtos vegetais que não faz uso de produtos químicos sintéticos ou organismos geneticamente modificados, que agridem a natureza e são prejudiciais à saúde. A agricultura orgânica ganha caráter sustentável, pois persegue três objetivos principais: a conservação do meio ambiente, a formação de unidades agrícolas lucrativas e a criação de comunidades agrícolas prósperas;<br />
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<a href="http://imagens9.publico.pt/imagens.aspx/719809?tp=UH&db=IMAGENS"><img border="0" height="398" src="https://imagens9.publico.pt/imagens.aspx/719809?tp=UH&db=IMAGENS" width="640" /></a><br />
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- exploração dos recursos vegetais de florestas e matas, garantindo o replantação das plantas;<br />
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<a href="http://www.visenergia.com.br/images/eucalipto.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://www.visenergia.com.br/images/eucalipto.jpg" data-original-height="533" data-original-width="800" height="424" width="640" /></a></div>
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- preservação de áreas verdes não exploradas economicamente; <br />
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- uso de fontes de energia limpas e renováveis (eólica, geotérmica e hidráulica); <br />
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- reciclagem dos resíduos sólidos e exploração do gás libertado em aterros sanitários como fonte de energia; <br />
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<a href="http://1.bp.blogspot.com/-2QQdH4Le_vc/Vh2DicC80RI/AAAAAAAAClc/td0wRRoA-Q4/s320/reciclagem.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-2QQdH4Le_vc/Vh2DicC80RI/AAAAAAAAClc/td0wRRoA-Q4/s320/reciclagem.jpg" data-original-height="225" data-original-width="320" /></a></div>
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- consumo controlado da água, visando evitar o desperdício, além da
assunção de medidas que visem a não poluição dos recursos hídricos; </div>
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<a href="http://photos1.blogger.com/blogger/1042/3093/1600/Dicas.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="640" src="https://photos1.blogger.com/blogger/1042/3093/1600/Dicas.jpg" width="515" /></a><br />
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- Desenvolvimento da gestão sustentável nas empresas para diminuir o desperdício de matéria-prima e desenvolvimento de produtos com baixo consumo de energia.Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-35644632789294566242013-11-15T23:18:00.000+00:002020-07-14T16:56:14.185+01:00Múltiplos e divisoresNo conjunto dos números naturais podemos identificar múltiplos e divisores de um determinado número.<br />
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O <b><span style="font-size: large;">múltiplo de um número</span></b> é um número se pode obter multiplicando o primeiro por qualquer número natural. Por exemplo, os múltiplos de 2 são todos os números pares, que terminam em 0, 2, 4, 6 e 8.<br />
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Em linguagem mais simples os múltiplos de um número designam-se pelos números da tabuada desse número.<br />
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Escreve-se:<br />
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M2={0, 2, 4, 6, 8, 10, 12, 14, 16, 18, ...}<br />
M3={0, 3, 6, 9, 12, 15, 18, 21, 24, 27, ...}<br />
M10={0,10, 20, 30, 40, 50, 60, ...}<br />
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Podemos concluir que:<br />
- o zero é múltiplo de qualquer número;<br />
- o conjunto de múltiplos de um qualquer número é infinito.<br />
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O <b><span style="font-size: large;">divisor de um número</span></b> é um número que pode dividir o primeiro. Quando se refere a "poder dividir" quer dizer que na divisão inteira o resto é sempre zero.<br />
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Em linguagem corrente pode afirmar-se que os dividores de um número são as tabuadas onde aquele primeiro número se encontra.<br />
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Por exemplo os divisores de 4, são o 1, 2 e 4. Os divisores de 21 são, 1, 3, 7 e 21.<br />
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Escreve-se:<br />
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D4={1, 2, 4}<br />
D21={1, 3, 7, 21}<br />
D100={1, 2, 4, 5, 10, 20, 25, 50, 100}<br />
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Podemos concluir que:<br />
- um é divisor de qualquer número;<br />
- o conjunto dos divisores de qualquer número é finito.<br />
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Podemos observar algumas <b><span style="font-size: large;">propriedades dos divisores</span></b><br />
<b><br /></b><u>1ª propriedade</u><br />
<u><br /></u>
Num produto de fatores, um divisor comum dos fatores é também divisor do resultado (produto).<br />
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12 x 4 = 28<br />
(3 x 2 x 2) x (2 x 2)<br />
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28 é então divisível por 4 e 2, ou seja, os divisores comuns do 12 e do 4.<br />
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4 x 10 = 40<br />
(2 x 2) x (2 x 5) <br />
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40 é divisível por 2, 4 ou seja os divisores comuns de 4 e de 10.<br />
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<u>2ª propriedade</u><br />
<u><br /></u>
Se um número natural é divisor de dois outros números, então também é divisor da soma e da diferença desses dois números.<br />
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12 + 4 = 16<br />
(2 x 6) +(2 x 2)<br />
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O divisor comum entre o 4 e o 12 é o número 2, logo o 2 também é divisor de 16.<br />
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21 - 6 = 15<br />
(3 x 7) - (3 x 2)<br />
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O divisor comum entre 21 e 6 é o número 3, logo 3 também é divisor de 15.<br />
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<u>3ª propriedade</u><br />
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Numa divisão inteira, os divisores comuns do dividendo e do divisor também são divisores do resto.<br />
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<a href="https://slideplayer.com.br/slide/10224104/33/images/17/Dada+uma+divis%C3%A3o+inteira%2C.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="600" data-original-width="800" height="240" src="https://slideplayer.com.br/slide/10224104/33/images/17/Dada+uma+divis%C3%A3o+inteira%2C.jpg" width="320" /></a></div>
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<u>4ª propriedade</u><br />
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Numa divisão inteira, os divisores comuns ao divisor e ao resto também são do dividendo.<br />
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Faz os seguintes exercícios:<br />
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- <a href="http://www.atividadesdematematica.com/atividade-de-matematica-para-o-7-ano/multiplos-e-divisores">http://www.atividadesdematematica.com/atividade-de-matematica-para-o-7-ano/multiplos-e-divisores</a><br />
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- <a href="http://www.clq1.com.br/clq/noticias/files/314/Multiplos_e_divisores6.pdf">http://www.clq1.com.br/clq/noticias/files/314/Multiplos_e_divisores6.pdf</a><br />
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- <a href="http://quintalestudante.blogspot.pt/2013/07/atividades-com-multiplos-divisores-e.html">http://quintalestudante.blogspot.pt/2013/07/atividades-com-multiplos-divisores-e.html</a><br />
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- <a href="http://www.ajudaalunos.com/Quiz_mat/html_inteiros/numprimos%20quiz.htm">http://www.ajudaalunos.com/Quiz_mat/html_inteiros/numprimos%20quiz.htm</a></div>
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Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com8tag:blogger.com,1999:blog-1296507068134556208.post-65618310670798523302013-11-07T21:33:00.003+00:002020-10-08T10:41:33.635+01:00Curiosidades na ciência!<div class="separator"><br /></div><div class="separator">Olá a todos,</div>
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como sou muito curiosa deixo-vos algumas curiosidades interessantes sobre as ciências... Cada uma delas foi obtida a partir de pesquisas feitas na internet!<br />
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<a href="http://www.colegiovascodagama.pt/ciencias3c/setimo/curiosidades.html">Curiosidades do planeta Terra</a><br />
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<span style="background-color: yellow;">Por que perdemos os dentes de leite?</span><br />
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Desde o nascimento, as raízes dos dentes de leite e dos dentes definitivos estão dentro das gengivas. Os dentes de leite nascem entre os 6 meses e os 2 anos de idade. Perto dos 6 anos, as raízes dos dentes definitivos desenvolvem-se e os dentes de leite caem para dar lugar a eles.<br />
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<a href="http://sorridentsfranchising.files.wordpress.com/2010/08/samuel-sem-dentes-004-2.jpg"><img border="0" src="https://blogger.googleusercontent.com/img/proxy/AVvXsEhSWg4kMojxbxt_ozO3e_lWSuvcszuBBqyTjGm6YEUwdISSQONmJme8D-TQmKE8Xj4i9woD_eRrGjS002jS20DaMZ_v7PH6W7ndeP488pFgKhOzBoSEVT3tMI3q-qToFDfSfoIY7-bDAh45IcLr77CgDQzu2lOYNeLZD3twhGe8ttDUx87wt-FEbP4R9lGNc7Qzs4fx=" /></a></div>
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<span style="background-color: yellow;">Até que idade crescemos?</span><br />
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O crescimento dos ossos começa com o nascimento e vai até, mais ou menos, até aos 20 anos. Porém, o esqueleto não é o único a modificar-se. Na adolescência, todo o corpo muda: é a puberdade. Quando ficamos adultos, o corpo não cresce mais.<br />
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<a href="https://s-media-cache-ak0.pinimg.com/236x/73/97/5e/73975efea55f54a119476e183a2d4d7c.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://s-media-cache-ak0.pinimg.com/236x/73/97/5e/73975efea55f54a119476e183a2d4d7c.jpg" width="202" /></a></div>
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<span style="background-color: yellow;">Por que é que os nossos dentes não têm a mesma forma?</span><br />
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Os dentes da frente, incisivos servem para cortar os alimentos. Eles são chatos e cortantes. Os caninos rasgam os alimentos. Eles são muito pontiagudos. Os molares são grandes e largos, servem para triturar a comida.<br />
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<br /><div style="text-align: center;"><a href="https://encrypted-tbn2.gstatic.com/images?q=tbn:ANd9GcR7EdoclcTT-dtPhEHXnW0oFWooRq_mLltsDJj-aFdOTwgtpTzi_yYh3dw" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://encrypted-tbn2.gstatic.com/images?q=tbn:ANd9GcR7EdoclcTT-dtPhEHXnW0oFWooRq_mLltsDJj-aFdOTwgtpTzi_yYh3dw" /></a></div>
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<span style="background-color: yellow;">Para que serve a saliva?</span><br />
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A saliva é importante para matar os micróbios e deixar a boca húmida. Quando comemos, a saliva molha os alimentos e assim começa a digestão. Isso facilita muito o trabalho de todo o sistema digestivo!<br />
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<br /><div style="text-align: center;"><a href="https://encrypted-tbn3.gstatic.com/images?q=tbn:ANd9GcQFBqNFdFt_Mc2T1NQapWYMFlDfU4DeISI4JbsAU-1njQWVdJkA"><img border="0" src="https://encrypted-tbn3.gstatic.com/images?q=tbn:ANd9GcQFBqNFdFt_Mc2T1NQapWYMFlDfU4DeISI4JbsAU-1njQWVdJkA" /></a></div>
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<span style="background-color: yellow;">Porque ficamos bronzeados quando apanhamos sol?</span><br />
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A pele é muito sensível a certos raios do sol, os ultravioletas. Para se proteger, ela fabrica uma substância escura, a melanina. Quando ficamos expostos ao sol, essa substância é fabricada em maior quantidade e ficamos bronzeados. Mas não podemos esquecer-nos do protetor solar.<br />
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<a href="http://beleza.culturamix.com/blog/wp-content/gallery/4-249/erros-mais-graves-no-uso-do-protetor-solar-11.jpg"><br /></a>
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<span style="background-color: yellow;">Por que é que as pessoas morrem?</span><br />
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Na velhice, os órgãos já não funcionam tão bem. O corpo cansa-se e tem mais dificuldade para se defender das doenças. No final da vida, o coração deixa de bater, o cérebro e os demais órgãos deixam de funcionar.<br />
<br /><div style="text-align: center;"><a href="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcRmcokX6Q6lX41KGfhFq0pUcTTS2tzsltrIp5Two1V0NmGPT8ZdzA"><img border="0" src="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcRmcokX6Q6lX41KGfhFq0pUcTTS2tzsltrIp5Two1V0NmGPT8ZdzA" /></a></div>
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<span style="background-color: yellow;">Qual a diferença entre cobras e serpentes?</span><br />
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É comum chamar a todos os animais Ofídios (que não tem membros, são répteis) cobras. Mas essa designação está incorreta. Existe uma espécie de ofídios que tem o nome de Naja e que se denomina por cobra. Todas as outras espécies são chamadas de serpentes. Este erro é comum nos portugueses, pois quando estes chegaram ao Brasil, encontraram as serpentes, e chamaram-nas de cobras, assim como nomearam de índios os seus habitantes, pois acreditaram primeiramente terem chegado à Índia.<br />
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Em alguns países, cobra é uma palavra usada somente para falar das najas, encontradas na África e na Ásia.<br />
<br /><div style="text-align: center;"><a href="http://www.naturephoto-cz.com/photos/sevcik/naja-indiana--naja-naja-2.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="230" src="https://blogger.googleusercontent.com/img/proxy/AVvXsEg7iBnAmcLUwOsLRy0BPs6zF56OkWRvH84uuT9PCvfrPflcArEILJ49MCGRvYmCq_9HG6pz5M9zOKPUZhfm0w8fW4tYj_lG2vxS5W_rTY4WpHp5JTvOiPuysNx8ex5_N347P3CrB1h65m8PLr68Od3MsAON_znThOk-0CoobhkBkdKHzDKkzTd2ew=" width="320" /></a></div>
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Naja<br />
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<span style="background-color: yellow;">Por que as formigas se deslocam em fila indiana?</span><br />
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É para não se perder! Andando, a formigas colocam no seu caminho uma substância cheirosa que todas as formigas de uma mesma família reconhecem. Basta seguir esse caminho cheiroso para voltar para casa!<br />
<br /><div style="text-align: center;"><a href="http://thumbs.dreamstime.com/x/linha-branco-das-formigas-3d-da-fila-isolou-se-11717133.jpg"><img border="0" src="https://blogger.googleusercontent.com/img/proxy/AVvXsEhroFaWO5Xewns3p_ZsFifnG3JJNWZHQ4GAT673hnKwYM7z5HrwnMidSgfslEn_aD97ktnjuR3lew5amZqYcPrfFoV1FtU5TPgtJOA0f1z-3GSw3xLsOKI5JYGLA0-MnAFtiXqnFg650Tz-sRnWO8x_eYIjqvYR4fVnDr4f_lw4T5urxudIKwbw6p-8Fk2XYuKYIxEDUjdko83_=" /></a></div>
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<span style="background-color: yellow;">Por que é que as abelhas fabricam mel?</span><br />
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O mel serve para alimentar as outras abelhas e as larvas que vivem nas colmeias. As colmeias são enormes "fábricas" de mel. Para os apicultores, basta colher essa iguaria tomando cuidado com as picadas!<br />
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<a href="https://beira.pt/coolkids/wp-content/uploads/sites/7/2014/08/abelha_com_mel.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="500" data-original-width="800" height="250" src="https://beira.pt/coolkids/wp-content/uploads/sites/7/2014/08/abelha_com_mel.png" width="400" /></a></div>
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<span style="background-color: yellow;">Um cavalo sofre quando as ferraduras são colocadas?</span><br />
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Os cascos dos cavalos são de queratina, uma proteína bem dura, de que também são feitos os chifres dos bois e as nossas unhas. Por isso, o cavalo não sofre quando as ferraduras são colocadas, pelo menos não mais do que quando cortamos as unhas!<br />
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<a href="https://www.wikihow.com/images_en/thumb/2/25/Shoe-a-Horse-Step-7-Version-3.jpg/v4-728px-Shoe-a-Horse-Step-7-Version-3.jpg.webp" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="546" data-original-width="728" height="300" src="https://www.wikihow.com/images_en/thumb/2/25/Shoe-a-Horse-Step-7-Version-3.jpg/v4-728px-Shoe-a-Horse-Step-7-Version-3.jpg.webp" width="400" /></a></div>
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<a href="https://encrypted-tbn2.gstatic.com/images?q=tbn:ANd9GcSnbLxwa3zvUVeltLah8mMKaar7fwn9yD2-ewhLW4ylCXQVl4cI"><img border="0" src="https://encrypted-tbn2.gstatic.com/images?q=tbn:ANd9GcSnbLxwa3zvUVeltLah8mMKaar7fwn9yD2-ewhLW4ylCXQVl4cI" /></a><br />
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<span style="background-color: yellow;">Qual é a maior baleia do mundo?</span><br />
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É a baleia-azul. Adulta pode medir 30 metros de comprimento! No entanto, ela só come animais minúsculos. Se não for caçada pode viver mais de 50 anos.<br />
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<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgFbUKyLGKyJi1ms7sy8bmJJhwXGXm4CKjuwzgzM7WcknR-vXquXtdjRJf_Pn7-I7j1DnnFRXhJ8ydomjPrxmcH3NJz9AiK2bGlkofblTuHJ0dBq9lOtyBzkEqk1x0D3atmw56QvHUXPEde/s500/Baleia+azul.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="332" data-original-width="500" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgFbUKyLGKyJi1ms7sy8bmJJhwXGXm4CKjuwzgzM7WcknR-vXquXtdjRJf_Pn7-I7j1DnnFRXhJ8ydomjPrxmcH3NJz9AiK2bGlkofblTuHJ0dBq9lOtyBzkEqk1x0D3atmw56QvHUXPEde/s320/Baleia+azul.jpg" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div>
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<span style="background-color: yellow;">Por que as baleias expelem grande jatos de água?</span><br />
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As baleias podem mergulhar quase meia hora prendendo a respiração, mas elas são obrigadas a subir para respirar. É o ar que a baleia assopra ao voltar à superfície, misturando com a água, que faz esse jato impressionante.<br />
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj5HUyloxUQkAp-oucGq1_9sQ_XcFnuGOWMi3IafA_rr5jRZC9ESwIzB_gKAU1atIMcNW9xKMzqqXwWNydX_IfBQ2RD0xL96m_6zULI4-VZfDtvsVLZtBuS8IpURtZErQ6CthotUHesjsA/s1600/TV+Lagartixa+-+Animal+da+semana+-+Baleia-azul+%25286%2529.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="633" data-original-width="950" height="265" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj5HUyloxUQkAp-oucGq1_9sQ_XcFnuGOWMi3IafA_rr5jRZC9ESwIzB_gKAU1atIMcNW9xKMzqqXwWNydX_IfBQ2RD0xL96m_6zULI4-VZfDtvsVLZtBuS8IpURtZErQ6CthotUHesjsA/w400-h265/TV+Lagartixa+-+Animal+da+semana+-+Baleia-azul+%25286%2529.jpg" width="400" /></a></div>
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<span style="background-color: yellow;">Todos os tubarões são perigosos?</span><br />
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Existem mais de 350 espécies de tubarão. Algumas são ferozes, mas a maioria é inofensiva. O tubarão-anão mede 20 centímetros. O tubarão-baleia, o maior peixe do mundo, mede 15 metros, mas não é perigoso. Os mais temíveis são o tubarão-branco, o tubarão-tigre, que come tudo que encontra, o tubarão-azul, tubarão martelo...<br />
<br /><div style="text-align: center;"><a href="http://amotubarao.files.wordpress.com/2011/01/5-sharkpopdm_830x900.jpg"><img border="0" height="400" src="https://blogger.googleusercontent.com/img/proxy/AVvXsEiQtTyhtJ-S-vgojSePdP5mXEXVNWqlJ1VUf-KPGUoZE9RZrKAFzDjiiJergkHG-k8dsAXpQiBr-xvKsq8hVAo0UaQMb0B9SgXez3iFtBF285tWXqm1NBqGlkv6WmAt-sq9ALE1HTAzBYLyXLm1_hL8iKbKdd-FM-17YV7F6OgNXmLmKIVDKg=" width="368" /></a></div>
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<br /><div style="text-align: center;"><a href="http://upload.wikimedia.org/wikipedia/commons/7/7d/Parts_of_a_shark-pt.svg"><img border="0" height="168" src="https://blogger.googleusercontent.com/img/proxy/AVvXsEhufXFV7DR1mbl8XI8xR1bupqfkXpFUINRGzybxMahRtbLnynUNZY90ALh0nsN_g0vO-yEbqeB6HVuqAVhBOAN4ZFz8tdveXmGBLfbheyfNusId-OdzpmgqIv5rNSUjsYxL-7cR1kMR3HRO4KcZndBEqbTYaVl1LSJXXXHVWQXp93E2_Ndt6SwQ4IU=" width="400" /></a></div>
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<span style="background-color: yellow;">Qual é a menor ave do mundo?</span><br />
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É o beija-flor, também chamado colibri. Ele alimenta-se do néctar das flores e põe dois ovos do tamanho de pequenas ervilhas! O beija-flor bate as asas a toda velocidade e é capaz de fazer vôos rasantes atingindo mais de 50 quilómetros por hora.<br />
<br /><div style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg7xN4fWLsPlc80DDSNPgRgaAPhNIamjdkaLJAhMLWLVa0T4pfHJ-u3GPa4FghwEIzGa9MY3fwQ2nZYpbD9bH7ICU1D0MuWOnc5SMpINTGfYSL5DwglQCRJ9Le09kweARkUGjUGuufyK9E/s1600/Beija-flor.jpg"><img border="0" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg7xN4fWLsPlc80DDSNPgRgaAPhNIamjdkaLJAhMLWLVa0T4pfHJ-u3GPa4FghwEIzGa9MY3fwQ2nZYpbD9bH7ICU1D0MuWOnc5SMpINTGfYSL5DwglQCRJ9Le09kweARkUGjUGuufyK9E/s320/Beija-flor.jpg" width="320" /></a></div>
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<span style="background-color: yellow;">Quais os animais mais antigos?</span><br />
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Os animais passaram do mar à terra há 414 milhões de anos. Os primeiros animais terrestres do mundo incluem dois tipos de centípedes e uma pequena aranha encontrada entre restos de plantas.<br />
<br /><div style="text-align: center;"><a href="http://hypescience.com/wp-content/uploads/2012/11/104392973_da224cfc4a_z.jpg"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/proxy/AVvXsEjHmrh-9V3b0kBU_4oM1ryXxtCievLnq5zR7_Vgm7gNgg0jF41FHDpyR1yN7f15fOMUaZChX7XhHoaUn4GIyIjnjnnbnyYOXT234r6nML2_8pn3iVJIxGEVhNXQdydyLjWHIQ_w3xHX1_XTDwiRpfHhkhdpbEz-a8-YkaeGGecNdTL6XU7QJXh8_j1yWw=" width="298" /></a></div>
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<br />
<span style="background-color: yellow;">Quais os animais mais barulhentos?</span><br />
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O mais barulhento dos animais terrestres é o bugio das Américas Central e do Sul. Os machos possuem uma estrutura óssea na parte superior da traqueia que permitem que o som tão forte. Seus gritos assustadores foram descritos como um misto de latido de cão e zurro de asno, ampliado mil vezes. Os seus gritos podem ser ouvidos até 5 km de distância.<br />
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<a href="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcREOPyBlD18F3MEf7eRXJCRzWT_gazlKNnY2SPkyJbdaGODyB1TCQ"><img border="0" src="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcREOPyBlD18F3MEf7eRXJCRzWT_gazlKNnY2SPkyJbdaGODyB1TCQ" /></a><br />
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<div class="separator" style="clear: both; text-align: center;">
<iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/jfoFgStYfNc/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/jfoFgStYfNc?feature=player_embedded" width="320"></iframe></div>
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<span style="background-color: yellow;">Quais os animais mais fortes?</span><br />
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Em proporção com o seu tamanho, os animais mais fortes são os besouros gigantes, encontrados principalmente nos trópicos. Testes realizados com o besouro-rinoceronte demonstravam que pode suportar no seu dorso 850 vezes o próprio peso. Para efeito de comparação, um homem pode levantar (com um auxílio de suporte) apenas 17 vezes o próprio peso.<br />
<br /><div style="text-align: center;"><a href="https://encrypted-tbn3.gstatic.com/images?q=tbn:ANd9GcTdnYylpRc3btGjNIaifwFaaC1yGywkWymvSlLHXb05F8uRYmGhew"><img border="0" src="https://encrypted-tbn3.gstatic.com/images?q=tbn:ANd9GcTdnYylpRc3btGjNIaifwFaaC1yGywkWymvSlLHXb05F8uRYmGhew" /></a></div>
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<span style="background-color: yellow;">Qual o animal com a mordida mais forte?</span><br />
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Um tubarão pardo de 2 m de comprimento pode exercer uma força de 60 Kg entre as suas mandíbulas. Apesar de não terem medido as mordidas de tubarões maiores, como o tubarão branco, deve ser ainda mais forte.<br />
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgLHYNBhYG-Y-JoBJB0iLv2Mv8xeOV6_QpYKuT0AMu1-xIp7dwayHIO3P-hoJN9wDJ2ytSj8_J8yGxbxPuqcX03Mqy3lJthBlpx7yK6NvJ08VAPI1i5hzEax4TQx5fcs3WnnzKdw920ikc/s400/areia.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="256" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgLHYNBhYG-Y-JoBJB0iLv2Mv8xeOV6_QpYKuT0AMu1-xIp7dwayHIO3P-hoJN9wDJ2ytSj8_J8yGxbxPuqcX03Mqy3lJthBlpx7yK6NvJ08VAPI1i5hzEax4TQx5fcs3WnnzKdw920ikc/s400/areia.jpg" width="320" /></a></div>
<div style="text-align: center;">
Um género de tubarão-pardo, o tubarão-areia</div>
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<span style="background-color: yellow;">Qual o animal com olfato mais aguçado?</span><br />
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O olfato mais aguçado existente na natureza é o do macho da borboleta imperador que segundo experiências feitas na Alemanha em 1961, pode detetar a substância sexual produzida por uma fêmea virgem à distância de 11 Km, contra o vento. Os recetores localizados nas antenas do macho são tão sensíveis que são capazes de detetar uma única molécula de substância.<br />
<br /><div style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiiHSLvdsGtA3FyFUlODa0zlzUB-4dBmToM9HsY5-O7KNV7KgIUL9GN6OxMsRAxDJLIgKvwhlkIP5mhmsPX6T4XK5pLPPZGv3sJMAXxxoF9EIOQxjGvzai2BJHyTwGv4asqqTq0NFeJAOM7/s400/09.jpg"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiiHSLvdsGtA3FyFUlODa0zlzUB-4dBmToM9HsY5-O7KNV7KgIUL9GN6OxMsRAxDJLIgKvwhlkIP5mhmsPX6T4XK5pLPPZGv3sJMAXxxoF9EIOQxjGvzai2BJHyTwGv4asqqTq0NFeJAOM7/s320/09.jpg" /></a></div>
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<span style="background-color: yellow;">Qual o animal com mais venenoso?</span><br />
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Os pequenos e brilhantes sapos das Américas Central e do Sul segregam algumas das toxinas mais mortais conhecidas. A espécie é tão perigosa que os cientistas precisam de usar luvas grossas para manipulá-la, no caso de terem cortes ou arranhões nas suas mãos.<br />
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<div class="separator" style="clear: both; text-align: center;">
<a href="http://i52.photobucket.com/albums/g37/philipe3d/mundo%20gump/ra141.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="240" src="https://i52.photobucket.com/albums/g37/philipe3d/mundo%20gump/ra141.jpg" width="320" /></a></div>
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<a href="http://ambientalistasemrede.org/os-8-sapos-mais-venenosos-do-mundo/">Phyllobates terribilis</a><br />
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<span style="background-color: yellow;">MAMÍFEROS</span><br />
<div>
<br /></div>
<div>
- Maior<span style="background-color: yellow;"><br /></span>O maior mamífero do planeta é a baleia azul.<br />
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<div>
- Mais pesado<br />
Uma baleia fêmea pesando 190 t e medindo 27,6 m de comprimento foi capturada no Atlântico Sul.<br />
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- Mais longo<br />
O mais longo exemplar já registado foiuma baleia fêmea medindo 33,58 m que encalhou na praia de Grytvi, Geórgia do Sul, em 1909.<br />
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- Maior mamífero terrestre<br />
Em média, os elefantes machos atingem a altura de 3 a 3,7 e pesam de 4 a 7 t. O maior exemplar já registado foi um macho morto a tiros em Macusso, Angola. Deitado de lado, o elefante media 4,16 m em uma linha projetada do ponto mais alto do dorso até a base da pata dianteira, indicando uma altura de 3,96 m quanto em pé. O seu peso foi calculado em mais de 12,24 t.<br />
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<span style="background-color: yellow;">CARNÍVOROS</span><br />
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- Maior terrestre<br />
O maior carnívoro terrestre é o urso polar, cujos machos pesam de 400 a 600 Kg e medem de 2,4 a 2,6 m do focinho à cauda.<br />
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- Mais pesado<br />
Um urso polar com 907 Kg e cerca de 3,5 m do focinho à cauda foi abatido a leste de Kotzebue, Alasca, EUA.<br />
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- Menos pesado<br />
A <a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgN2xyvZmxdudCe6AWM21ePhzteTwg6c_WB6_q9SA0mJGURa2oqAWpAbS4V6MYJ7hQRP_mxZm-svDPQnD0bhoPPdjJ_o03ZSHm7OzyrwaxCqAFyYhHcuZ_2psDn4eKbBo0Rtzd0OxVF_h6E/s400/Mustela_nivalis_-British_Wildlife_Centre-4.jpg">doninha anã</a> possui corpo de 11 a 26 cm, cauda de 1,3 a 8,7 cm e pesa de 30 a 200 g, sendo os menores indivíduos são as fêmeas que habitam a Sibéria e os Alpes.<br />
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<span style="background-color: yellow;">Por que soluçamos?</span><br />
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<img src="https://blogger.googleusercontent.com/img/proxy/AVvXsEhLmPfIzU8aZxNCqbOV_RX8tVIdNCvyLn0GT0eVUonwyKOgf7xVGp66lXiNJ-k6wymTDOFhxacCow_2nkrDfngk_AOvqbVSbpU9OTyJX_k-9x3gVgR2qS-hXRheBWR-yZXyNsaEAF86UVa2PiWvtrgqqSqXCRNpu_rF8i13=" /><br />
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O soluço é resultado de uma contração involuntária do diafragma, um fino músculo que separa o tórax do abdómen e que, juntamente com os músculos intercostais externos, é responsável pelo controle da respiração. Os seus movimentos de contração e relaxamento permitem que inspiremos e expiremos o ar e são controlados por um nervo, situado logo acima do estômago.<br />
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Os soluços surgem a partir de uma irritação de um nervo, cujas causas podem ser diversas (distensão gástrica pela ingestão de bebidas com gás, deglutição de ar ou alimentação em grande volume; mudanças súbitas da temperatura de alimentos ingeridos; modificações da temperatura corporal, como sauna seguida de duche gelado; ingestão de bebidas alcoólicas; ou até mesmo gargalhadas). Quando ele fica ou é sensibilizado, envia uma mensagem para o diafragma se contrair, o que dispara o soluço.<br />
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O característico barulhinho "hic, hic" surge quando ocorre o fecho súbito da glote (abertura superior da laringe, onde se localizam as cordas vocais), produzindo vibração nas cordas vocais.<br />
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<span style="background-color: yellow;">Como acontece o reflexo da tosse?</span><br />
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<img src="https://blogger.googleusercontent.com/img/proxy/AVvXsEhzVNGTTieiR22v79s_crEzN4fEx4ZPVqwCjl7vsXMvFtEgQVz_Pv9Nudom-r7Eydgghdi_oSnA1rj4QqbFFUCW7xkYC7JUR_Mz206YkRrvsbk3qLoiCl_svCBhsGzUm6C2D-2fqWS6YD4aO9JbTyoSggfc-Q3mRpLDixA=" /><br />
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Os brônquios e a traqueia são tão sensíveis a um toque leve, que quantidades mínimas de material estranho ou substâncias que causam irritação iniciam o reflexo da tosse. Impulsos nervosos provocam:<br />
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- inspiração de até 2,5 litros de ar;<br />
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- fecho da epiglote e das cordas vocais para aprisionar o ar no interior dos pulmões;<br />
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- contração forte dos músculos abdominais e dos músculos intercostais internos, empurrando o diafragma e provocando aumento rápido de pressão nos pulmões;<br />
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- abertura súbita das cordas vocais e da epiglote e liberação do ar dos pulmões sob alta pressão.<br />
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Desta forma, o ar que é expelido de forma explosiva dos pulmões para o exterior se move tão rapidamente que carrega consigo qualquer material estranho que esteja presente nos brônquios e na traqueia.<br />
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Como acontece o reflexo do espirro?<br />
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<img src="https://blogger.googleusercontent.com/img/proxy/AVvXsEj2UtE8qiux7zwfjahAQoA2Io6UD0peavah-YSIuAfbjPmv5XsNlDHNtp7jhaUx1WDnFxNH64qAD5yFyOCJZcz_cCL9_ggaU9SZiyP7c6y8jwGGBUBrlvbd_Wsgx_4AnoHkgWPmmMFtndyDJ49RqTgMFtRpTwguTuSFpDeAmQ=" /><br />
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O reflexo do espirro é muito parecido com o reflexo da tosse, exceto pelo fato de se aplicar às vias nasais, ao invés das vias respiratórias inferiores: o estímulo que inicia o reflexo do espirro é a irritação das vias nasais. Uma série de reações semelhantes às do reflexo da tosse acontece, grandes quantidades de ar passam rapidamente pelo nariz, ajudando, assim, a limpar as vias nasais.<br />
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<span style="background-color: yellow;">Você sabia que:</span><br />
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- o ar que sai das narinas durante o espirro atinge em média 150 Km/hora?<br />
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- ao espirrarmos espalhamos aproximadamente 40 mil gotículas de saliva?<br />
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Pois é, por isto o espirro é uma excelente fonte de transmissão de doenças respiratórias.<br />
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Porque é impossível espirrar de olhos abertos?<br />
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<img src="https://blogger.googleusercontent.com/img/proxy/AVvXsEjS6bcQu2meLbocTc17Frl6QtwZcHRT5ELr4MDfsnEa5BINSeDc82_TF-kpcJJLsjZMDSY0_aTK_GPeQc7fvzCImvpxuXLa4ms-_I_FKJBGD9zBN6FmLEJpbnPPyMKcm6ozZ4sCP9MjcCEuyYwqK9Hr18JvZKNHJOEZSEQ=" /><br />
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Esclarecendo o mito: não é porque os olhos podem sair da órbita que os fechamos ao espirrar!<br />
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Quando uma partícula estranha entra no corpo pelas vias nasais, estimula os receptores locais que avisam o encéfalo que é hora de entrar em ação.<br />
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Ao receber a mensagem, o encéfalo reage imediatamente à invasão, gerando uma série de impulso motores que contraem o abdômen, o tórax e o diafragma, até chegar ao nervo facial.<br />
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Os reflexos que chegam ao nervo facial também desencadeiam movimentos para expulsar a partícula estranha. Essas contrações atingem diversos músculos da face, incluindo o músculo orbicular, que controla o abrir e o fechar dos olhos. Como resultado de todo esse esforço, fechamos os olhos.</div>
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<span style="background-color: yellow;">Mitos à Refeição</span><br />
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1. A água à refeição engorda?<br />
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FALSO. A água nunca engorda, nem à refeição nem fora dela. A água não fornece nenhum nutriente energético, não contém açúcar, nem gordura, nem proteínas. A percentagem de água presente no corpo humano é de 60%, no caso de haver retenção de água pelo organismo, poderá influenciar o peso. No entanto um indivíduo saudável não faz retenção de líquidos. Esta é uma situação associada a algumas doenças e que deve ser sempre acompanhada pelo médico.<br />
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2. Posso Comer toda a fruta que quiser?<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh1FLstMeF8Sf-ekJLdZE56z1IyBKfR2CIiQIiYOlFHPC0A2GDjULFmQdHvR8wf2k39D41NOia3V7-AjlzJ5evGb4Sb8JRoLRlZaOlteSFiHL0e2xuOjzPrmsFF8qBLRvAzfxCdccaCIow9/s1600/frutas-vitaminas-070508.jpg"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh1FLstMeF8Sf-ekJLdZE56z1IyBKfR2CIiQIiYOlFHPC0A2GDjULFmQdHvR8wf2k39D41NOia3V7-AjlzJ5evGb4Sb8JRoLRlZaOlteSFiHL0e2xuOjzPrmsFF8qBLRvAzfxCdccaCIow9/s400/frutas-vitaminas-070508.jpg" /></a><br />
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FALSO. A fruta contém frutose, um açúcar simples que pode ser consumido diariamente mas sem exagero. A quantidade de fruta recomendada diariamente é de 3 a 4 peças.<br />
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3. A sopa engorda?<br />
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FALSO. Antigamente a sopa era a base da alimentação dos portugueses e como tal estava adaptada às suas necessidades energéticas. Actualmente o papel da sopa mudou mas as receitas também…<br />
As sopas actuais são sobretudo de legumes e fornecem muito poucas calorias. São uma excelente forma de iniciar o almoço e o jantar e muito adequas para quem quer perder peso.<br />
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4. Laranja com leite faz mal?</div>
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FALSO. Quando adicionamos alimentos com muita acidez ao leite, este pode coalhar. Muito provavelmente foi neste facto que se baseou o mito. Mas nenhum alimento tem a acidez do estômago. Aí o leite vai forçosamente coalhar, ainda que não seja ingerido com laranjas…<br />
Do ponto de vista nutricional, a laranja é rica em vitamina C e o leite é rico em cálcio. Quando se juntam a nível digestivo a Vitamina C favorece a absorção do cálcio. Por isso uma laranja consumida com leite ou outro derivado são uma combinação excelente.<br />
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5. O pão engorda?<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhrt6V4l4kU69BUYzRe0oyIGahC1HJtXJNDhWx1ysF3sRHJtk2CYOa7yI0mmDUmd1Xnzp6j-4jxNgWtLk_WVWxw6zBPgwmSoaypt0m-wyZ_QkWyDcJEPCUQSH5ydW8T9zXkm1j4xSfHD4_t/s1600/sem+nome.png"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhrt6V4l4kU69BUYzRe0oyIGahC1HJtXJNDhWx1ysF3sRHJtk2CYOa7yI0mmDUmd1Xnzp6j-4jxNgWtLk_WVWxw6zBPgwmSoaypt0m-wyZ_QkWyDcJEPCUQSH5ydW8T9zXkm1j4xSfHD4_t/s200/sem+nome.png" /></a></div>
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FALSO. Frequentemente ouve-se dizer que para emagrecer não se deve comer pão. Este, como qualquer alimento, deve ser consumido com moderação, no entanto, não é um alimento proibido para quem quer emagrecer. O grande problema não é o pão por si só, mas sim o que lhe juntamos…<br />
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6. Não se deve beber água quando se sua após exercício físico intenso?<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjxrBl4xUhwELAw_p2YPbn1w0zQUAZLBp4vVbIu8a98en8KNnSZd2zp7p94I3mu5yJeRg8K4fol0iSzBuWCwHQz_JOJF98uBHaTUwThklpdKtrzihxpkeZ862q0Dy7OiIw-4azPnCqRNyqr/s1600/GUA_1_%257E1.PNG"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjxrBl4xUhwELAw_p2YPbn1w0zQUAZLBp4vVbIu8a98en8KNnSZd2zp7p94I3mu5yJeRg8K4fol0iSzBuWCwHQz_JOJF98uBHaTUwThklpdKtrzihxpkeZ862q0Dy7OiIw-4azPnCqRNyqr/s320/GUA_1_%257E1.PNG" /></a><br />
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FALSO. Sempre que se realiza exercício físico intenso há eliminação de grandes quantidades de água que se liberta durante o trabalho muscular para permitir a manutenção da temperatura corporal. Sendo a água o maior constituinte do nosso organismo (60-70% do nosso peso), tem que ser reposta o mais rapidamente possível para evitar a desidratação. Deve ser consumida à temperatura ambiente para não causar eventuais choques térmicos.</div>
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"https://images-blogger-opensocial.googleusercontent.com/gadgets/proxy?url=http%3A%2F%2F2.bp.blogspot.com%2F-IqMAPqXqyVk%2FTfKXHkJTGxI%2FAAAAAAAAAFc%2FxlEqVvJHvBg%2Fs320%2FGUA_1_%25257E1.PNG&container=blogger&gadget=a&rewriteMime=image%2F*" with "https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjxrBl4xUhwELAw_p2YPbn1w0zQUAZLBp4vVbIu8a98en8KNnSZd2zp7p94I3mu5yJeRg8K4fol0iSzBuWCwHQz_JOJF98uBHaTUwThklpdKtrzihxpkeZ862q0Dy7OiIw-4azPnCqRNyqr/s320/GUA_1_%257E1.PNG" -->Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-91554572709225733552013-09-25T21:18:00.001+01:002020-10-08T11:39:21.476+01:00Triângulos<div>
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<span face=""verdana" , sans-serif">Os <span style="background-color: #fff2cc; color: #a64d79;">triângulos</span> são figuras geométricas poligonais com três lados.</span><br />
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<span face=""verdana" , sans-serif">No nosso dia a dia encontramos imensos triângulos.</span><br />
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<span face=""verdana" , sans-serif">Existem dois grupos de triângulos em relação ao comprimento do seus lados e aos seus ângulos internos.</span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhPmjHG0GdghRQIIpTEyRXprHlVqdhjsFE586zXsl0QYzXX43b1NhvWFRm370eltJ-U53dmx9IxKBLNsUgrTHIEuIsyxihIn2IiycQtUg_y5o3MEnhr3SEEdKj2vLHFKbi72WFtxT1Fe5SX/s400/27371_html_m1d2a7536.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="238" data-original-width="400" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhPmjHG0GdghRQIIpTEyRXprHlVqdhjsFE586zXsl0QYzXX43b1NhvWFRm370eltJ-U53dmx9IxKBLNsUgrTHIEuIsyxihIn2IiycQtUg_y5o3MEnhr3SEEdKj2vLHFKbi72WFtxT1Fe5SX/s320/27371_html_m1d2a7536.jpg" width="320" /></a></div>
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<span face=""verdana" , sans-serif">Nota que tanto no triângulo retângulo, como no triângulo obtusângulo, dois dos seus ângulos internos são agudos, ou seja, possuem menos do que 90º de amplitude.</span></div>
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<span face=""verdana" , sans-serif">O <b>triângulo retângulo</b> possui três lados com designações especiais. O lado oposto ao ângulo reto chama-se <b>hipotenusa</b> e os lados a ele adjacentes chamam-se <b>catetos</b>.</span><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjruqynMey1JQiPfPHjeLyL2uZPqQ3pHLmkz2UfxcbeWSufAEPHXOj3SPjr-ti364dudi8G6lKAr7vf5muttKyNbHoOrJ8cB_mEtPr3X2GQ5yu1uBW6K02gkmGOtQP6bjmTn8U7EnABzz7O/s1600/triangulo_retangulo.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjruqynMey1JQiPfPHjeLyL2uZPqQ3pHLmkz2UfxcbeWSufAEPHXOj3SPjr-ti364dudi8G6lKAr7vf5muttKyNbHoOrJ8cB_mEtPr3X2GQ5yu1uBW6K02gkmGOtQP6bjmTn8U7EnABzz7O/s320/triangulo_retangulo.gif" width="320" /></a></div>
<span face=""verdana" , sans-serif"><br /></span><span face=""verdana" , sans-serif"><br /></span><span face=""verdana" , sans-serif"><b>Propriedades dos triângulos</b></span><br />
<span face=""verdana" , sans-serif"><b><br /></b></span><span face=""verdana" , sans-serif"><b>- </b>Num triângulo ao maior lado opõe-se o maior ângulo e ao menor lado opõe se o menor </span><span face=""verdana" , sans-serif">ângulo, e vice-versa.</span><br />
<span face=""verdana" , sans-serif"><br /></span><span face=""verdana" , sans-serif">- N</span><span face=""verdana" , sans-serif">um triângulo a medida do comprimento de qualquer lado é menor do que a soma das </span><span face=""verdana" , sans-serif">medidas dos comprimentos dos outros dois. A </span><span face=""verdana" , sans-serif">esta propriedade dá-se o nome de <b>desigualdade triangular</b>.</span><br />
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<a href="https://sites.google.com/site/cexcelente/sala-de-aula/matematica-6o-ano/mensagemsemtitulo-2/desigualdade%20triangular%20(2).jpg?attredirects=0" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://sites.google.com/site/cexcelente/sala-de-aula/matematica-6o-ano/mensagemsemtitulo-2/desigualdade%20triangular%20(2).jpg?attredirects=0" width="289" /></a></div>
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<span face=""arial" , "tahoma" , "helvetica" , "freesans" , sans-serif" style="background-color: white; color: black; font-size: 15px; line-height: 20px;">A<a href="http://www.geogebratube.org/student/m19942">pplet em geogebra - Desigualdade triangular ( clica no link)</a></span></div>
<span face=""verdana" , sans-serif"><br /></span><span face=""verdana" , sans-serif">- Num triângulo a <b>altura</b></span><span face=""verdana" , sans-serif"> relativamente ao lado, designado por base, é o </span><span face=""verdana" , sans-serif">segmento de reta que une o vértice oposto à base com o pé da</span><br />
<span face=""verdana" , sans-serif">perpendicular traçada desse vértice para a reta que contém a base.</span><br />
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<a href="http://n.i.uol.com.br/licaodecasa/ensmedio/matematica/area-triangulo.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="269" src="https://n.i.uol.com.br/licaodecasa/ensmedio/matematica/area-triangulo.gif" width="320" /></a></div>
<span face=""verdana" , sans-serif"><br /></span><span face=""verdana" , sans-serif"><br /></span><span face=""verdana" , sans-serif">- O <u>ângulo externo</u> de um triângulo <u>é igual à soma dos ângulos internos</u> que lhe são <u>não adjacentes</u>. </span><br />
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<a href="http://t3.gstatic.com/images?q=tbn:ANd9GcQMNlfmhaqY5bIho4Yvr_Swgjuy-CZHdgfGxuelMNKwU8dAT2ifig" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://t3.gstatic.com/images?q=tbn:ANd9GcQMNlfmhaqY5bIho4Yvr_Swgjuy-CZHdgfGxuelMNKwU8dAT2ifig" /></a></div>
<span face=""verdana" , sans-serif"><br /></span><span face=""verdana" , sans-serif">- Num triângulo a soma dos três ângulos externos com vértices distintos é igual a um ângulo giro.</span><br />
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<a href="http://t1.gstatic.com/images?q=tbn:ANd9GcTMMWXs3US04QRdj_6sms33Y-6a--3Qh3XrRV_8HnUXHuMfgSvo" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://t1.gstatic.com/images?q=tbn:ANd9GcTMMWXs3US04QRdj_6sms33Y-6a--3Qh3XrRV_8HnUXHuMfgSvo" /></a></div>
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<a href="https://mundoeducacao.bol.uol.com.br/upload/conteudo_legenda/9c8291212733b6df57ee4304716f075c.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="380" data-original-width="330" height="320" src="https://mundoeducacao.bol.uol.com.br/upload/conteudo_legenda/9c8291212733b6df57ee4304716f075c.jpg" width="277" /></a></div>
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<span face=""verdana" , sans-serif">- Experimenta fazer a experiência que te é proposta de seguida. Pegas num triângulo, pintas os seus vértices e depois cortas-os. No fim junta-os. O que verificas?</span></div>
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<span face=""verdana" , sans-serif">Vais verificar que a <b>soma dos ângulos internos de qualquer triângulo</b> é sempre igual a 180º, ou seja <b>é um ângulo raso</b>.</span></div>
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<a href="https://image.slidesharecdn.com/angulostriangulos-101130132636-phpapp01/95/angulos-e-triangulos-25-638.jpg?cb=1422673568" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="479" data-original-width="638" height="240" src="https://image.slidesharecdn.com/angulostriangulos-101130132636-phpapp01/95/angulos-e-triangulos-25-638.jpg?cb=1422673568" width="320" /></a></div>
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<span face=""verdana" , sans-serif">- Num triângulo a lados iguais, opõem-se ângulos iguais e vice-versa.</span></div>
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<a href="http://image.slidesharecdn.com/triangulosrelaoladoseangulos-121025170715-phpapp01/95/triangulos-relao-lados-e-angulos-3-638.jpg?cb=1351203019" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="479" data-original-width="638" height="240" src="https://image.slidesharecdn.com/triangulosrelaoladoseangulos-121025170715-phpapp01/95/triangulos-relao-lados-e-angulos-3-638.jpg?cb=1351203019" width="320" /></a></div>
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<span face=""verdana" , sans-serif">- Em triângulos iguais, a lados iguais opõem-se ângulos iguais e vice-versa.</span></div>
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<b><span face=""verdana" , sans-serif">Construção de triângulos</span></b><br />
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<span face=""verdana" , sans-serif">Tendo o comprimento de um lado e a amplitude de dois dos ângulos internos</span><br />
<span face=""verdana" , sans-serif"><br /><iframe allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/N5IgGQ-HlO4" width="560"></iframe> <span face=""verdana" , sans-serif"><br /></span><br /><span face=""verdana" , sans-serif">Tendo em conta o comprimento de dois dos lados e um dos ângulos</span></span><br />
<span face=""verdana" , sans-serif"><br /><iframe allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/5-heDyeeNIQ" width="560"></iframe><br /><span face=""verdana" , sans-serif"><br /></span><br /><span face=""verdana" , sans-serif">Tendo em conta o comprimento dos três lados do triângulo</span><br /><span face=""verdana" , sans-serif"><br /></span><br /><span face=""verdana" , sans-serif"><iframe allowfullscreen="" class="youtube-player" frameborder="0" height="390" src="https://www.youtube.com/embed/4jVOqymZ_8s" title="YouTube video player" type="text/html" width="480"></iframe></span><br /><span face=""verdana" , sans-serif"><br /></span><br /><span face=""verdana" , sans-serif"><br /></span><br /><span face=""verdana" , sans-serif">Construir um triângulo equilátero</span><br /><span face=""verdana" , sans-serif"><br /></span></span></div>
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<b><span face=""verdana" , sans-serif">Casos em que os triângulos são geometricamente iguais</span></b></div>
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<iframe allowfullscreen="" frameborder="0" height="356" marginheight="0" marginwidth="0" mozallowfullscreen="" scrolling="no" src="https://www.slideshare.net/slideshow/embed_code/14889515" style="border: 1px solid rgb(204, 204, 204); margin-bottom: 5px;" webkitallowfullscreen="" width="427"></iframe><br />
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<b><a href="http://www.slideshare.net/helenaborralho/triangulos-relao-lados-e-angulos" target="_blank" title="Triangulos relação lados e angulos">Triangulos relação lados e angulos</a> </b>from <b><a href="http://www.slideshare.net/helenaborralho" target="_blank">Helena Borralho</a></b><br />
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<span face=""verdana" , sans-serif"><b>1º caso: </b>Dois triângulos são iguais se os três lados de um são iguais aos três lados do outro.</span><br />
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<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIO-B5XUQT9rly9d3D6EbTlRZjqAS_gealEL8J8mzGeHy3dxtFQbK8q69QeK2MqxXafD_3xAATPiN2jMd9-wqArUOf_o1yLopOTMuCXEOkd7eFVX_WZHI_p0I-2UzZS27PozayMrpc7ZnH/s300/caso-de-semelhanca-LLL-300x187.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="187" data-original-width="300" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhIO-B5XUQT9rly9d3D6EbTlRZjqAS_gealEL8J8mzGeHy3dxtFQbK8q69QeK2MqxXafD_3xAATPiN2jMd9-wqArUOf_o1yLopOTMuCXEOkd7eFVX_WZHI_p0I-2UzZS27PozayMrpc7ZnH/s0/caso-de-semelhanca-LLL-300x187.png" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div>
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<span face=""verdana" , sans-serif"><b>2º caso: </b>Dois triângulos são iguais quando têm dois lados iguais e o ângulo por eles formado é igual.</span><br />
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<img alt="Ver a imagem de origem" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgzrsi8jN5qdVL-U0ZLDQb0NF1AGBcPcoPBW65w5qmwnsemIdW-Q5mJX0ZcRw2q4ZU4hyE_ex90zLK1NMw1nq86Tk1DPIfGu2VXepfSv_uDNxdwUAYv5D8xJ6Z3tBP1q_XcOf3FiGGwxA/s1600/crit%C3%A9rio+ig+lal.png" /></div>
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<span face=""verdana" , sans-serif"><b>3º caso: </b>Dois triângulos são iguais se têm lado igual e os dois ângulos adjacentes a esse lado iguais.</span><br />
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<img alt="Resultado de imagem para critério lll" src="https://th.bing.com/th/id/OIP.X644acBhLyYN1JRHRNumUgHaDv?w=348&h=176&c=7&o=5&pid=1.7" /></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiZeA-sUtNlm-2mxXat8TnSEooazpvca7o_bpDrW48JI-0QgxVXTFk0aCSKeW8v9oMq7XeWRTd8qontxpAfqCJm7XavSlgShWTqgy-dgNfwJCpSW_do2zppyLF9GvAxUZEFyfojWBYLbf4U/s1600/image002.jpg" style="margin-left: 1em; margin-right: 1em;"><span face=""verdana" , sans-serif"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiZeA-sUtNlm-2mxXat8TnSEooazpvca7o_bpDrW48JI-0QgxVXTFk0aCSKeW8v9oMq7XeWRTd8qontxpAfqCJm7XavSlgShWTqgy-dgNfwJCpSW_do2zppyLF9GvAxUZEFyfojWBYLbf4U/s320/image002.jpg" wt="true" /></span></a></div>
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<iframe allowfullscreen="" frameborder="0" height="511" marginheight="0" marginwidth="0" mozallowfullscreen="" scrolling="no" src="https://www.slideshare.net/slideshow/embed_code/12947179" style="border: 1px solid rgb(204, 204, 204); margin-bottom: 5px;" webkitallowfullscreen="" width="479"></iframe></div>
<div style="margin-bottom: 5px;">
<b><a href="http://www.slideshare.net/helenaborralho/figuras-no-plano-12947179" target="_blank" title="Figuras no plano">Figuras no plano</a> </b>from <b><a href="http://www.slideshare.net/helenaborralho" target="_blank">Helena Borralho</a></b></div>
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<h3 style="font-family: arial; margin: 3px; padding: 0px; text-align: center;">
<a href="http://www.authorstream.com/Presentation/borralho-1663330-tri-ngulos-7/" target="_blank">TRIÂNGULOS_7</a></h3>
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More <a href="http://www.authorstream.com/" target="_blank">PowerPoint presentations</a> from <a href="http://www.authorstream.com/borralho/" target="_blank">helena</a><br />
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<i><span face=""verdana" , sans-serif">Para aprenderes mais sobre o que falámos clica nos seguintes links:</span></i></div>
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<i><span face=""verdana" , sans-serif"><br /></span></i></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">.Ângulos</span></div>
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<span face=""verdana" , sans-serif">- <a href="http://www.scribd.com/doc/7622864/Angulos-e-TriAngulos">http://www.scribd.com/doc/7622864/Angulos-e-TriAngulos</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.slideshare.net/cleusamoreira/angulos-1977206">http://www.slideshare.net/cleusamoreira/angulos-1977206</a></span></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">.Triângulos</span></div>
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<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.scribd.com/doc/15831634/TRIANGULOS">http://www.scribd.com/doc/15831634/TRIANGULOS</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.scribd.com/doc/10241150/Class-TriAngulos1">http://www.scribd.com/doc/10241150/Class-TriAngulos1</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.slideshare.net/elizabeteborges/no-mundo-dos-tringulos">http://www.slideshare.net/elizabeteborges/no-mundo-dos-tringulos</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.slideshare.net/helenaborralho/tringulos-1492283">http://www.slideshare.net/helenaborralho/tringulos-1492283</a></span></div><div class="separator" style="border: currentcolor; clear: both;"><br /></div><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen="" class="BLOG_video_class" height="266" src="https://www.youtube.com/embed/9hrtqP7DHOo" width="320" youtube-src-id="9hrtqP7DHOo"></iframe></div><br /><div class="separator" style="border: currentcolor; clear: both;"><br /></div>
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<i><span face=""verdana" , sans-serif">Faz os seguintes exercícios online sobre estes temas:</span></i></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/Quiz1/angtriquadri6.htm">http://www.ajudaalunos.com/Quiz1/angtriquadri6.htm</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.qualjogo.com/jogos/games/Math_Triangles.html">http://www.qualjogo.com/jogos/games/Math_Triangles.html</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.malhatlantica.pt/netescola/triangulosproblemas.htm">http://www.malhatlantica.pt/netescola/triangulosproblemas.htm</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.malhatlantica.pt/netescola/triangulos.htm">http://www.malhatlantica.pt/netescola/triangulos.htm</a></span></div>
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<span face=""verdana" , sans-serif">- <a href="http://www.prof2000.pt/users/rccastro/quiz/Classifica%C3%A7%C3%A3o%20de%20tri%C3%A2ngulos1.htm">http://www.prof2000.pt/users/rccastro/quiz/Classifica%C3%A7%C3%A3o%20de%20tri%C3%A2ngulos1.htm</a>~</span></div>
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<span face=""verdana" , sans-serif">- </span><a href="http://www.amblesideprimary.com/ambleweb/mentalmaths/protractor.html"><span face=""verdana" , sans-serif">http://www.amblesideprimary.com/ambleweb/mentalmaths/protractor.html</span></a></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<i><span face=""verdana" , sans-serif">Imprime os seguintes exercícios e resolve-os:</span></i></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/fichas/FTriangQuad.doc">http://www.ajudaalunos.com/matematica/fichas/FTriangQuad.doc</a></span></div>
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<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/fichas/Fichatra6trianquadrisime.doc">http://www.ajudaalunos.com/matematica/fichas/Fichatra6trianquadrisime.doc</a></span></div>
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<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/fichas/fichatrab6triangulosrectas.doc">http://www.ajudaalunos.com/matematica/fichas/fichatrab6triangulosrectas.doc</a></span></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
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<i><span face=""verdana" , sans-serif">De seguida tens testes de avaliação sobre o que foi falado:</span></i></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/testes/TesteTriangQuad.doc">http://www.ajudaalunos.com/matematica/testes/TesteTriangQuad.doc</a></span></div>
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<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/testes/Testeangulostriquadri6.doc">http://www.ajudaalunos.com/matematica/testes/Testeangulostriquadri6.doc</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/testes/testetriquadrisimetrias6.pdf">http://www.ajudaalunos.com/matematica/testes/testetriquadrisimetrias6.pdf</a> </span></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- </span><a href="http://www.amblesideprimary.com/ambleweb/mentalmaths/protractor.html"><span face=""verdana" , sans-serif">http://www.amblesideprimary.com/ambleweb/mentalmaths/protractor.html</span></a></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<i><span face=""verdana" , sans-serif">Imprime os seguintes exercícios e resolve-os:</span></i></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/fichas/FTriangQuad.doc">http://www.ajudaalunos.com/matematica/fichas/FTriangQuad.doc</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/fichas/Fichatra6trianquadrisime.doc">http://www.ajudaalunos.com/matematica/fichas/Fichatra6trianquadrisime.doc</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/fichas/fichatrab6triangulosrectas.doc">http://www.ajudaalunos.com/matematica/fichas/fichatrab6triangulosrectas.doc</a></span></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<i><span face=""verdana" , sans-serif">De seguida tens testes de avaliação sobre o que foi falado:</span></i></div>
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<span face=""verdana" , sans-serif"><br /></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/testes/TesteTriangQuad.doc">http://www.ajudaalunos.com/matematica/testes/TesteTriangQuad.doc</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/testes/Testeangulostriquadri6.doc">http://www.ajudaalunos.com/matematica/testes/Testeangulostriquadri6.doc</a></span></div>
<div class="separator" style="border: currentcolor; clear: both;">
<span face=""verdana" , sans-serif">- <a href="http://www.ajudaalunos.com/matematica/testes/testetriquadrisimetrias6.pdf">http://www.ajudaalunos.com/matematica/testes/testetriquadrisimetrias6.pdf</a> </span></div>
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<div class="separator" style="clear: both; text-align: center;"><br /></div><br />Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-72962863451764988832013-09-25T20:52:00.000+01:002018-10-14T20:32:26.282+01:00Fazer dobragens em papel!<div style="text-align: center;">
<span style="font-family: "verdana" , sans-serif;">Olá caros alunos,<br />
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</span><br />
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<span style="font-family: "verdana" , sans-serif;">hoje lembrei-me de vos deixar umas ideias para fazerem em casa.</span></div>
<span style="font-family: "verdana" , sans-serif;"><br />
</span><br />
<div>
<span style="font-family: "verdana" , sans-serif;">Não sei se já ouviram falar de uma arte japonesa o Origami. Pois é <span class="Apple-style-span" style="line-height: 19px;"><b>Origami</b> é a arte de dobrar o papel. A origem da palavra provém do papel, que ao juntar as duas palavras a pronúncia fica "origami". Geralmente começamos com um pedaço de papel quadrado ou quadriculado</span>, cujas faces podem ser de cores diferentes.</span></div>
<span style="font-family: "verdana" , sans-serif;"><br />
</span><br />
<div align="center">
<span class="Apple-style-span" style="line-height: 19px;"><b><span style="color: #000099; font-family: "verdana" , sans-serif;">Dobragens em papel<br />
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</span><br />
<span class="Apple-style-span" style="line-height: 19px;"><span class="Apple-style-span" style="font-family: "verdana" , sans-serif; line-height: normal;"><b><span style="color: #008040;">A História de Sadako</span></b><span style="color: #008040;"> </span><br />
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<span class="Apple-style-span" style="line-height: 19px;"><span class="Apple-style-span" style="font-family: "verdana" , sans-serif; line-height: normal;">"Depois da destruição de Hiroshima em 1945, muitas doenças surgiram entre os sobreviventes. Uma das vítimas foi Sadako Sassaki dois anos depois do dia da explosão, começou a sentir os efeitos da Bomba Atômica aos 12 anos; o seu diagnóstico foi: Leucemia. Quando Sadako estava no hospital, um amigo trouxe-lhe alguns papéis coloridos e dobrou um pássaro (TSURU). Disse que esse pássaro é sagrado no Japão, vive mil anos e tem o poder de conceder desejos. Se uma pessoa dobrar mil Tsurus e fizer o seu pedido a cada um deles, ele será atendido. Sadako, começou então a dobrar Tsurus e pedir para sarar, porém a sua doença agravava-se cada dia. Sadako então desejou pedir a Paz Mundial. Sadako dobrou muitíssimos TSURUS até ao dia 25/10/1955, quando morreu. Os seus amigos dobraram os Tsurus restantes a tempo para seu enterro. Mas eles queriam mais, desejaram pedir pôr todas as crianças que estavam a morrer, em consequência da explosão da Bomba Atômica. Então formaram um clube e começaram a pedir dinheiro para um monumento.<br />
Estudantes de mais de 3.000 escolas no Japão e de 9 outros países contribuíram, e em 5 de maio de 1958, o Monumento da Paz das Crianças foi inaugurado no parque da Paz de Hiroshima. Todos os anos no Dia da Paz (06/08) pessoas do mundo inteiro enviam Tsurus de papel para o Parque. As crianças desejam espalhar ao mundo a mensagem esculpida à base do monumento de Sadako:<br />
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<b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhtlivW1QMvgDEfP30b3mWtSDlVKIYkljlAJLotrYD1INL4M-cIDLxvemwWV9nVXZomd81_aTad0NuwK59oUscHzRhxIIVosnwWxHKB4Odw-9t5YeW2Zq3e1VU7e6zxUiAzoi6POs8w_S0c/s1600-h/sadaku.jpg"><img alt="" border="0" id="BLOGGER_PHOTO_ID_5329788613013186210" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhtlivW1QMvgDEfP30b3mWtSDlVKIYkljlAJLotrYD1INL4M-cIDLxvemwWV9nVXZomd81_aTad0NuwK59oUscHzRhxIIVosnwWxHKB4Odw-9t5YeW2Zq3e1VU7e6zxUiAzoi6POs8w_S0c/s200/sadaku.jpg" style="float: left; height: 200px; margin: 0px 10px 10px 0px; width: 134px;" /></a>Este é nosso Grito</b><br />
<b>Esta é nossa oração:</b><br />
<b>Paz no mundo</b> <br />
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Sadako onde estiver, saiba que sua mensagem está sendo conhecida no mundo todo, esperamos que seja também cumprida." (extraído do site: <a href="http://sites.mpc.com.br/chavemagica/origami.htm">http://sites.mpc.com.br/chavemagica/origami.htm)</a><br />
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<span class="Apple-style-span" style="line-height: 19px;"><span class="Apple-style-span" style="font-family: "verdana" , sans-serif; line-height: normal;">Ora bem, vamos colocar mãos à obra e fazer alguns "Origamis". Para isso deixo-vos alguns vídeos sobre isso. No fim podem optar por procurar gráficos em outros sites.<br />
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<span class="Apple-style-span" style="line-height: 19px;"><span class="Apple-style-span" style="font-family: "verdana" , sans-serif; line-height: normal;">Um sapo que salta!</span></span></div>
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<span class="Apple-style-span" style="line-height: 19px;"><span class="Apple-style-span" style="font-family: "verdana" , sans-serif; line-height: normal;">Um peixe</span></span></div>
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<span style="font-family: "verdana" , sans-serif;">Pinguim</span></span></span></div>
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Um coração</div>
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Um flor chamada Lily</div>
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Um passarinho - Tsuru (História da menina)</div>
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Aqui vai o site com gráficos para fazerem sozinhos...</div>
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<a href="http://www.fazerorigami.blogspot.com/">http://www.fazerorigami.blogspot.com/</a><br />
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Achei a ideia de fazer um abecedário em origami muito interessante e por isso encontrei este site: <a href="http://en.origami-club.com/abc/index.html">http://en.origami-club.com/abc/index.html</a><br />
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Para o acompanhar, podem fazer algo que o possa ilustrar, tipo para a letra A, Anjo, B, Banana e assim sucessivamente. Vejam aqui: <a href="http://www.pragentemiuda.org/2011/01/alfabeto-ilustrado-em-origami.html">http://www.pragentemiuda.org/2011/01/alfabeto-ilustrado-em-origami.html</a></div>
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<a href="http://www.origami-club.com/en/">http://www.origami-club.com/en/</a><span class="Apple-style-span"> (clica no objecto que queres fazer e depois clicas em diagram)</span></div>
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Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.com8tag:blogger.com,1999:blog-1296507068134556208.post-40234599509265241192013-07-31T21:41:00.003+01:002018-10-14T20:42:49.099+01:00M.d.c. e M.m.c.<span style="font-family: "verdana" , sans-serif;">Verifica as relações existentes entre o máximo divisor comum e o mínimo múltiplo comum.</span><br />
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<span style="font-family: "verdana" , sans-serif;">Vê o seguinte vídeo:</span><br />
<span style="font-family: "verdana" , sans-serif;"><br /></span><iframe allow="autoplay; encrypted-media" allowfullscreen="" frameborder="0" height="361" src="https://www.youtube.com/embed/LoiM5d7Kors" width="642"></iframe>
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<span style="font-family: "verdana" , sans-serif;">Resolve a seguinte ficha sobre estes assuntos:</span><br />
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<a href="http://www.equipeexpoente.com.br/single-post/2018/10/10/MMC-e-Relacao-entre-MMC-e-MDC-Exercicios">http://www.equipeexpoente.com.br/single-post/2018/10/10/MMC-e-Relacao-entre-MMC-e-MDC-Exercicios</a></div>
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<span style="font-family: "verdana" , sans-serif;"><b>Uma relação entre o m.m.c. e o m.d.c. é:</b></span></div>
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<span style="font-family: "verdana" , sans-serif; text-indent: 35.4pt;">O m.d.c.(a, b) multiplicado pelo m.m.c.(a, b) é igual ao produto de a por b, isto é:</span></div>
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<span style="font-family: "verdana" , sans-serif;">m.d.c.(a, b) x m.m.c.(a, b) = a x b </span></div>
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<span style="font-family: "verdana" , sans-serif;"> Por exemplo:</span></div>
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<span style="font-family: "verdana" , sans-serif;">m.d.c.(12, 15) x m.m.c.(12, 15) = 12 x 15 = 180</span></div>
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<span style="font-family: "verdana" , sans-serif;"><u>Por exemplo</u>:</span></div>
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<span style="font-size: 11pt;"><span style="font-family: "verdana" , sans-serif;"> Determinar o m.m.c. e o m.d.c. entre 15 e 20.</span></span></div>
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<span style="font-family: "verdana" , sans-serif;"><span style="font-size: 11pt;">1- O primeiro passo é determinar o m.d.c. ou o m.m.c. entre 15 e 20.</span></span></div>
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<span style="font-family: "verdana" , sans-serif;"><span style="font-size: 11pt;">2- O m.d.c.(15, 20) = 5, e 5 é divisor comum mais pequeno que existe entre estes dois números.</span></span></div>
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<span style="font-family: "verdana" , sans-serif; font-size: 11pt;">3- Sabendo que 15 </span><span style="font-family: "verdana" , sans-serif; font-size: 11pt;">x</span><span style="font-family: "verdana" , sans-serif; font-size: 11pt;"> 20 = 300, e tomando a relação m.d.c.(15, 20) x </span><span style="font-family: "verdana" , sans-serif; font-size: 11pt;">m.m.c.(15, 20) = 15 x </span><span style="font-family: "verdana" , sans-serif; font-size: 11pt;">20, fazemos:</span></div>
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<span style="font-family: "verdana" , sans-serif;"><span style="font-size: 11pt;">m.m.c.(15, 20) = (15 x</span><span style="font-size: 11pt;"> </span><span style="font-size: 11pt;">20) : m.d.c.(15, 20)</span></span></div>
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<span style="font-family: "verdana" , sans-serif;"><span style="font-size: 11pt;">m.m.c.(15,20) = 300 : 5 = 60</span></span></div>
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<span style="font-size: 11pt;"><span style="font-family: "verdana" , sans-serif;">4- Donde se obtém que o m.m.c.(15, 20) é igual a 300 dividido por 5, ou seja m.d.c.(15, 20) = 60.</span></span></div>
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<div style="font-family: "century gothic";">
<a href="https://www.blogger.com/goog_1823440967"><br /></a></div>
<span style="font-family: century gothic;"><a href="https://pt.khanacademy.org/math/pre-algebra/pre-algebra-factors-multiples/pre-algebra-greatest-common-divisor/e/gcf-and-lcm-word-problems">https://pt.khanacademy.org/math/pre-algebra/pre-algebra-factors-multiples/pre-algebra-greatest-common-divisor/e/gcf-and-lcm-word-problems</a></span><br />
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Liliana Guerreirohttp://www.blogger.com/profile/09123772632490699572noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-25907332441896953592013-07-23T21:55:00.000+01:002020-07-14T16:45:59.007+01:00Circunferência e círculo<div class="separator" style="clear: both;">
<span style="font-family: "verdana" , sans-serif;">Os <b>círculos</b> são figuras geométricas que se designam por "discos". O círculo é o conjunto de pontos localizados dentro de uma circunferência.</span></div>
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<span style="font-family: "verdana" , sans-serif;">A <b>circunferência</b> é a linha que limita o círculo, ou seja, é o conjunto de todos os pontos que se encontram à mesma distância de um ponto central (designado por centro da circunferência).</span></div>
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<a href="http://t1.gstatic.com/images?q=tbn:ANd9GcRub2h6wAzqy50y2ER70OD7vs2J39jG07kOhE4C3KP4H5JW5c4R" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://t1.gstatic.com/images?q=tbn:ANd9GcRub2h6wAzqy50y2ER70OD7vs2J39jG07kOhE4C3KP4H5JW5c4R" height="200" width="187"></a></div>
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<span style="font-family: "verdana" , sans-serif;">Na imagem anterior a <span style="color: red;"><b>circunferência</b></span> está a representada a vermelho e o <span style="color: #6aa84f;"><b>círculo</b> </span>a verde.</span></div>
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<span style="font-family: "verdana" , sans-serif;">Podes observar outros elementos:</span></div>
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<span style="font-family: "verdana" , sans-serif;">- a <b>corda</b>, que é um segmento de recta que une dois pontos da circunferência.</span></div>
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<span style="font-family: "verdana" , sans-serif;">- o <b>diâmetro</b>, que é uma corda, mas é especial pois passa pelo<b> centro</b> da circunferência, o ponto O.</span></div>
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<span style="font-family: "verdana" , sans-serif;">- o <b>raio</b>, que é um segmento de recta que une o centro e um ponto qualquer da circunferência.</span></div>
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<span style="font-family: "verdana" , sans-serif;">Deve ter-se em conta que <u>o diâmetro (d) é o dobro do raio (r)</u>.</span></div>
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<span style="font-family: "verdana" , sans-serif;"><b>Relações entre ângulos, retas e polígonos</b></span></div>
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<span style="font-family: "verdana" , sans-serif;">- Numa circunferência podemos ter um ângulo cujo vértice seja o centro da circunferência. A este ângulo chama-se <b>ângulo ao centro</b>. Podemos ter por outro lado um <b>ângulo inscrito</b> na circunferência cujo vértice fica num dos pontos da circunferência.</span></div>
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<a href="http://funnymath9f.weebly.com/uploads/2/5/8/6/25866229/3285615_orig.png?433" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://funnymath9f.weebly.com/uploads/2/5/8/6/25866229/3285615_orig.png?433" height="223" width="400"></a></div>
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<span style="font-family: "verdana" , sans-serif;">- Num círculo podemos observar um <b>setor circular</b>, que é uma interseção de um ângulo ao centro com o círculo.</span></div>
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<a href="http://www.brasilescola.com/upload/e/Untitled-1(106).jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://www.brasilescola.com/upload/e/Untitled-1(106).jpg"></a></div>
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<span style="font-family: "verdana" , sans-serif;">- Na próxima figura podemos observar vários <b>polígonos inscritos numa circunferência</b>, pois os seus <u>vértices são pontos da circunferência</u>.</span></div>
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<span style="font-family: "verdana" , sans-serif;">- A próxima reta s é <b>tangente à circunferência</b>, pois passa por um ponto pertencente à circunferência. Essa reta é perpendicular ao raio apresentado.</span></div>
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- <span style="font-family: "verdana" , sans-serif;">De seguida, podes observar <b>polígonos circunscritos a uma circunferência</b>, pois os seus lados são tangentes à circunferência.</span></div>
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<span style="font-family: "verdana" , sans-serif;">- Num polígono regular inscrito numa circunferência, os <span style="text-align: center;">segmentos que unem o centro da circunferência aos pés das perpendiculares </span><span style="text-align: center;">tiradas do centro para os lados do polígono são todos iguais e designam-se por </span><span style="text-align: center;"><b>apótemas</b>.</span></span></div>
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Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.com2tag:blogger.com,1999:blog-1296507068134556208.post-58980175648442193552013-07-22T21:16:00.000+01:002013-07-22T19:12:59.186+01:00Vamos de férias!<div>
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<span style="font-family: Verdana, sans-serif;">Espero que este blog vos tenha ajudado, em conjunto com o site Ajudaalunos.</span><br />
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<span style="font-family: Verdana, sans-serif;">Tive pena pois não obtive, por parte dos meus alunos, um grande interesse em visitar este site. De qualquer forma fico contente que tenha ajudado muitos outros.</span><br />
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<span style="font-family: Verdana, sans-serif;">Tenho pena de não ter mais tempo para tornar estes cantinhos do saber mais completos, mas tentarei fazer sempre melhor e melhor...</span></div>
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<span style="font-family: Verdana, sans-serif;">Para o ano cá estaremos de novo. E não deixem de comentar para me ajudar a melhorar este cantinho.</span></div>
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<span style="font-family: Verdana, sans-serif;">Divirtam-se muito!! E boas férias!</span></div>
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Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.com0tag:blogger.com,1999:blog-1296507068134556208.post-20541265004742547972013-04-22T12:00:00.000+01:002013-04-22T14:16:04.443+01:00Dia da terra!<span style="font-family: Verdana, sans-serif;">Olá caros alunos, </span><br />
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<span class="Apple-style-span" style="font-family: Verdana, sans-serif;">não sei se se aperceberam mas hoje é <span class="Apple-style-span" style="color: #6600cc; font-weight: bold;">DIA DA TERRA</span>. </span></div>
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<span class="Apple-style-span" style="font-family: Verdana, sans-serif; line-height: 19px;">O <span class="Apple-style-span" style="font-weight: bold;">Dia da Terra</span> foi criado em 1970, pelo Senador norte-americano<span class="Apple-style-span" style="font-style: italic;"> Gaylord Nelson</span>, que convocou o primeiro protesto nacional contra a poluição, protesto esse coordenado a nível nacional por <span class="Apple-style-span" style="font-style: italic;">Denis Hayes</span>. Esse dia conduziu à criação da Agência de Protecção Ambiental dos Estados Unidos (EPA).<br />
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A partir de 1990, o dia 22 de Abril foi adotado mundialmente como o Dia da Terra, dando um grande impulso aos esforços de reciclagem a nível mundial e ajudando a preparar o caminho para a <a href="http://www.blogger.com/" target="_blank" zref="">Cimeira do Rio</a> (1992).<br />
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Atualmente, uma organização internacional (<a href="http://www.earthday.net/" style="text-decoration: none;"><span class="Apple-style-span" style="color: black;"><em>REDE DIA DA TERRA</em></span></a>) coordena eventos e atividades que celebram este dia.</span><br />
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<span class="bold"><span class="Apple-style-span" style="color: #000099;"><span class="Apple-style-span" style="font-family: Verdana, sans-serif; font-weight: bold;">Veja algumas dicas para reduzir o consumo de energia e combater as alterações climáticas:<span class="Apple-style-span" style="color: #ffcc99;"><span class="bold"><span class="Apple-style-span"></span></span></span></span></span></span></div>
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<span class="bold"><span class="Apple-style-span"><span class="Apple-style-span"><span style="font-family: Verdana, sans-serif;"><span class="bold"><span class="Apple-style-span"><span class="Apple-style-span" style="color: #3333ff;">Em casa:</span></span></span><span class="Apple-style-span" style="font-weight: bold;"><span class="Apple-style-span" style="color: #3333ff;"> </span><span class="Apple-style-span"><span class="Apple-style-span"></span></span></span></span></span></span></span></div>
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<span class="bold"><span class="Apple-style-span"><span class="Apple-style-span"><span class="Apple-style-span"><span class="Apple-style-span"><span style="color: #134f5c; font-family: Verdana, sans-serif;"><span class="Apple-style-span"><span class="Apple-style-span">- </span></span><span class="Apple-style-span"><span class="Apple-style-span">Use a máquina de lavar roupa na capacidade máxima, optando pela lavagem em água fria. Poupará energia e a roupa durará mais tempo;</span></span></span></span></span></span></span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Prefira lâmpadas de baixo consumo. Estas utilizam menos 80% de energia e duram até oito vezes mais que as lâmpadas comuns.</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Na altura de comprar um eletrodoméstico, certifique-se do nível de energia e água que despende, optando por eletrodomésticos classificados com a Categoria A;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Descongele o congelador antes que a camada de gelo atinja mais de 3 mm de espessura: conseguirá atingir poupanças energéticas até 30%. Ajuste o termóstato do frigorífico a uma temperatura de 6ºC e do congelador a 18ºC;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Sempre que escovar os dentes ou se ensaboar no duche, feche a torneira.</span></span></div>
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<span class="bold"><span class="Apple-style-span" style="color: #3333ff; font-family: Verdana, sans-serif;">No trabalho:</span></span></div>
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<span style="color: #134f5c; font-family: Verdana, sans-serif;"><span class="bold"><span class="Apple-style-span"><span class="Apple-style-span">- </span></span></span><span class="Apple-style-span"><span class="Apple-style-span">Desligue o monitor do computador durante a pausa para refeição. Poderá programar para que se desligue automaticamente (basta que procure esta facilidade nas opções de proteção de ecrã). </span></span><span class="Apple-style-span"><span class="Apple-style-span">Não deixe o equipamento ligado no final de cada dia de trabalho;</span></span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Utilize equipamentos de baixo consumo energético;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Apague as luzes ao sair do escritório ou do local de trabalho. Não acenda luzes que não são necessárias, procure aproveitar a luz natural o máximo possível;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif; font-size: small;">- Recicle e reutilize o papel. Procure imprimir e fotocopiar em ambos os lados das folhas.</span></span></div>
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<span class="bold"><span class="Apple-style-span" style="color: #3333ff; font-family: Verdana, sans-serif;">Nas deslocações:</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Prefira a bicicleta. Não só fará mais exercício como ajudará na redução das emissões de dióxido de carbono. Opte pelo uso de transportes públicos em vez do seu automóvel, sempre que possível;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Partilhe o seu transporte com familiares, amigos ou vizinhos, se o automóvel tiver mesmo de ser o seu meio de deslocação de eleição;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Desligue o motor sempre que estiver parado por mais de 30 segundos;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Verifique a pressão dos pneus, já que uma diferença, mesmo que mínima, quanto aos valores da pressão correta pode significar um aumento de combustível na ordem dos 5%.</span></span></div>
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<span class="bold"><span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">Atitudes menos consumistas:</span></span></span></div>
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<span style="color: #134f5c; font-family: Verdana, sans-serif;"><span class="bold"><span class="Apple-style-span"><span class="Apple-style-span">- </span></span></span><span class="Apple-style-span"><span class="Apple-style-span">Recicle, reutilize e repare. Ações deste tipo reduzem o consumo e, por conseguinte, a produção de dióxido de carbono proveniente da produção industrial;</span></span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Partilhe as subscrições de revistas e jornais com amigos e familiares. Depois de lê-los, utilize-os para limpar espelhos ou recicle-os;</span></span></div>
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<span class="Apple-style-span"><span class="Apple-style-span" style="color: #134f5c; font-family: Verdana, sans-serif;">- Quando for ao supermercado, leve os seus próprios sacos e eleja verduras e frutas sem invólucro.</span></span><br />
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Brisa_do_mar (Liliana Guerreiro)http://www.blogger.com/profile/11334198639844230437noreply@blogger.com0