tag:blogger.com,1999:blog-57514815979904509772024-02-07T03:33:43.366-03:00easymatica.com.br EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.comBlogger251125tag:blogger.com,1999:blog-5751481597990450977.post-73867026657259991452020-07-17T03:07:00.000-03:002020-07-17T03:30:32.535-03:00<div dir="ltr" style="text-align: left;" trbidi="on">
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" width="400" /></span></span></b></div>
<div class="separator" style="clear: both; text-align: center;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #00b0f0;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></b></div>
<div class="separator" style="clear: both; text-align: center;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #00b0f0;"><span style="font-family: "arial" , "helvetica" , sans-serif;">MINDSET DE CRESCIMENTO</span></span></b></div>
<div class="MsoNormal" style="line-height: 115%;">
<br /></div>
<div class="MsoNormal" style="line-height: 115%; text-align: justify;">
<blockquote style="text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;">INTELIGÊNCIA</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;"></span></b><span style="font-family: "times new roman" , serif;">Acreditam que o cérebro é como um
músculo que pode ser treinado e, portanto, que a inteligência pode ser
desenvolvida. Isso leva a um desejo de aprender e de melhorar cada vez mais.</span> </blockquote>
<blockquote style="text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;">DESAFIOS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;"></span></b><span style="font-family: "times new roman" , serif;">Uma mentalidade de crescimento
produz pessoas que abraçam desafios. Eles entendem que, primeiro, você abraça
desafios, porque sabe que vai sair mais forte do outro lado.</span> </blockquote>
<blockquote style="text-align: justify;">
<br />
<div style="text-align: left;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;">CONTRA
TEMPOS E DIFICULDADES</span></b> </div>
</blockquote>
<blockquote style="text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;"></span></b><span style="font-family: "times new roman" , serif;">Da mesma forma, obstáculos –
contratempos externos – não lhe desencorajam. Sua autoimagem não está atada ao
seu sucesso e a como você parecerá aos outros; falhas são uma oportunidade para
aprender, então, independente do que aconteça você vence.</span> </blockquote>
<blockquote style="text-align: justify;">
<br />
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;">ESFORÇOS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;"></span></b><span style="font-family: "times new roman" , serif;">Esforço
é visto não como algo sem finalidade, mas sim como algo necessário para crescer
e se tornar mestre em habilidades úteis.</span> </blockquote>
<blockquote style="text-align: justify;">
<br />
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;">CRÍTICAS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b style="mso-bidi-font-weight: normal;"><span style="color: #7030a0; font-family: "times new roman" , serif;"></span></b><span style="font-family: "times new roman" , serif;">Criticismo e feedback negativo são
fontes de informação. Pessoas com uma mentalidade de crescimento sabem que elas
podem mudar e melhorar, então o feedback negativo não é percebido como sendo
diretamente sobre elas como pessoas, mas sim sobre as habilidades que tem no
momento.</span> </blockquote>
<br />
<blockquote style="text-align: justify;">
<b><span style="color: #7030a0; font-family: "times new roman" , serif;">SUCESSO DOS OUTROS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">O sucesso de outros é visto como
fonte de inspiração e informação. Para a pessoas com mentalidade de
crescimento, sucesso não é visto como um jogo em que, para um ganhar, os outros
tem que perder.</span> </blockquote>
<br />
<blockquote style="text-align: justify;">
<b><span style="color: #7030a0; font-family: "times new roman" , serif;">PERFORMANCE</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #7030a0; font-family: "times new roman" , serif;"></span></b><span style="font-family: "times new roman" , serif;">Como resultado principal dessa
mentalidade, as pessoas alcançam níveis cada vez mais altos de realização. À
medida que melhoram, elas criam um feedback positivo que as encoraja a
continuar aprendendo e melhorando.</span> </blockquote>
<blockquote style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span>
<br />
<h2 style="text-align: center;">
<span style="font-family: "times new roman" , serif;">
<b style="color: #00b0f0;"><span style="font-family: "arial" , "helvetica" , sans-serif;">MINDSET FIXA</span></b></span></h2>
<span style="font-family: "times new roman" , serif;">
</span></blockquote>
<br />
<blockquote style="text-align: justify;">
<br />
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;">INTELIGÊNCIA</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;"></span></b><span style="font-family: "times new roman" , serif;">Acreditam que a inteligência é
estática. Isso leva ao desejo de parecer inteligente. Pessoas que tem esta
crença acham que “elas são o que elas são”, mas isso não significa que elas
tenham menos desejo de ter uma autoimagem positiva do que qualquer outra
pessoa.</span> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;">DESAFIOS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;"></span></b><span style="font-family: "times new roman" , serif;">Por definição, um desafio é difícil e
o sucesso não é assegurado, então, em vez de arriscar, falhar e impactar
negativamente a sua autoimagem, as pessoas frequentemente evitam desafios e se
restringem apenas ao que sabem que fazem bem.</span> </blockquote>
<blockquote style="text-align: justify;">
<br />
<div style="text-align: left;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;">CONTRA TEMPOS E DIFICULDADES</span></b> </div>
</blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;"></span></b><span style="font-family: "times new roman" , serif;">O
mesmo com obstáculos. A diferença aqui, da forma que eu vejo, é que desafios são
coisas que você pode decidir fazer enquanto obstáculos são forças externas que
surgem no seu caminho.</span> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;">ESFORÇOS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;"></span></b><span style="font-family: "times new roman" , serif;">Para que serve trabalhar duro e se
esforçar se no final você vai continuar na mesma posição? Se a sua forma de ver
o mundo lhe diz que esforço é algo desagradável e que não gera retorno, então a
coisa mais inteligente a fazer é evitá-lo o máximo possível.</span> </blockquote>
<blockquote style="text-align: justify;">
<br />
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;">CRÍTICAS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;"></span></b><span style="font-family: "times new roman" , serif;">A utilidade do feedback negativo é
ignorado ou entendido como um insulto. A mentalidade fixa faz as pessoas
acreditarem que qualquer crítica às suas capacidades é uma crítica pessoal.
Isso desencoraja as pessoas mais próximas e elas acabam parando de dar
feedbacks, o que acaba por isolar ainda mais a pessoa de influências externas
que poderiam gerar alguma mudança.</span> </blockquote>
<blockquote style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span><b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;">SUCESSO DOS OUTROS</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;"></span></b><span style="font-family: "times new roman" , serif;">O sucesso dos outros é visto como
um ponto de comparação. Geralmente, pessoas com uma mentalidade fixa tentarão
convencer a si mesmas e as pessoas a sua volta que o sucesso do outro foi por
sorte (afinal, quase tudo é por causa da sorte no mundo da mente fixa) ou por
causa de ações questionáveis. Em alguns casos, elas tentarão até desvalorizar o
sucesso dos outros.</span> </blockquote>
<blockquote style="text-align: justify;">
<br />
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;">PERFORMANCE</span></b> </blockquote>
<blockquote style="text-align: justify;">
<b><span style="color: #ed7d31; font-family: "times new roman" , serif; mso-themecolor: accent2;"></span></b><span style="font-family: "times new roman" , serif;">Como resultado, elas não alcançam o
seu potencial total e suas crenças as retroalimentam. Elas não mudam ou se
desenvolvem muito com o tempo e, por isso, para elas isso confirma que “elas são
o que elas são”.</span></blockquote>
</div>
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</div>
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</div>
<div class="MsoNormal" style="line-height: 115%; text-align: justify;">
</div>
<div style="text-align: center;">
<br /></div>
</div>
EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-83562100686655403822020-04-22T02:35:00.001-03:002020-04-22T02:40:37.654-03:00EAD - ENSINO APÁTICO A DISTÂNCIA<div dir="ltr" style="text-align: left;" trbidi="on">
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</div>
<div class="MsoNormal" style="text-align: justify;">
<div class="separator" style="clear: both; text-align: center;">
<a href="https://1.bp.blogspot.com/-B6VYWzasw-I/Xp_YgsHrWeI/AAAAAAAApRE/U9mLpiTZaX0p80tlkJQDDy-vBhNQhnDfgCLcBGAsYHQ/s1600/EAD_ou_Presencial.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="922" data-original-width="1382" height="425" src="https://1.bp.blogspot.com/-B6VYWzasw-I/Xp_YgsHrWeI/AAAAAAAApRE/U9mLpiTZaX0p80tlkJQDDy-vBhNQhnDfgCLcBGAsYHQ/s640/EAD_ou_Presencial.jpg" width="640" /></a></div>
<span style="font-family: "times new roman" , serif;"><br /></span>
<span style="font-family: "times new roman" , serif;"><br /></span>
<span style="font-family: "times new roman" , serif;">Grandes transformações
sempre acontecem depois de grandes tragédias.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">É como em
um acidente de avião. Depois do trágico acidente acontece uma investigação, as
causas são apontadas e recomendações são dadas.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">As
empresas acatam as recomendações e aquele tipo de acidente dificilmente voltará
a acontecer.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Estamos no
meio de uma grande tragédia, milhares de pessoas morrendo antes da hora por
causa de um vírus.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Muitas
coisas vão mudar, várias recomendações serão dadas e com 99,9% de certeza não
teremos outras pandemias por esse mesmo vírus.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Mas o que
essa pandemia tem a ver com o ensino a distância?<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">É simples.
No meio das grandes crises também surgem grandes oportunidades.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">A educação
a distância ganhou destaque e do nada tornou-se a grande ideia para os alunos
que estão em casa.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Mas a
verdade é que essa grande ideia está a anos luz de ser uma solução, porque todos
que vejo usando essa ideia, usa da forma equivocada.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Se você é
mãe, é pai e está se acabando de dar aula para o seu filho, alguma coisa está
errada.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Muitas
escolas particulares, tentando justificar as mensalidades, estão
sobrecarregando seus professores que sobrecarregam seus alunos que sobrecarregam
seus pais, que pagam as mensalidades.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Pelo
volume de coisas que acontecem, os pais criam a percepção que o ensino continua
e está tudo certo, mas não está.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">O que
acontecia antes? Aulas, lista de exercícios, copiar de tal página a tal página,
resumir o texto tal...<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">O que está
acontecendo agora? Aulas, listas de exercícios, copiar de tal página a tal
página, resumir o texto tal...<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Essas
escolas principalmente estão perdendo a oportunidade de exercitar a criatividade
de seus alunos, mas para isso, a escola e o professor também precisam de
criatividades.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Lembra da
frase de Einstein: fazer a mesma coisa e esperar resultados diferentes é
insanidade. Não para essas escolas. Elas estão fazendo as mesmas coisas
esperando o mesmo resultado: a mensalidade no final do mês.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Ou você
acha mesmo que essa escola está preocupada com o aprendizado do seu filho?<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Claro que
você já entendeu o título do e-mail, mas e a solução?<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">A escola,
o professor preocupado com a aprendizagem do seu aluno vai fazer diferente.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Por
exemplo, o professor de matemática, de história e de sociologia, poderia
sugerir o filme O Jogo da Imitação. Depois criar perguntas despretensiosas como,
o que você achou do filme? Gostou? Qual parte você gostou mais?<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Depois o
professor vai direcionando conforme seus objetivos. Por exemplo, qual contexto
social no filme se assemelha muito com os dias de hoje? Qual conceito
matemático no filme é utilizado até hoje por todos? História e matemática, como
essas disciplinas se complementam no filme?<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Um outro
exemplo, procure uma palestra no TED Talk e envia para seus alunos. Dessas palestras
eles vão levar ensinamentos para a vida.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Tem uma
palestra no TED de uma cientista chamada Shannon Zirbel. O sonho dela era ir ao
espaço, mas no final ela acaba realizando o sonho de uma forma diferente.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Ela teve
um projeto aprovado pela NASA e esse projeto possibilitou levar painéis solares
ao espaço usando o princípio do origami.<o:p></o:p></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Sonho,
espaço, origami, NASA, matemática... percebeu como você pode conectar assuntos
e levar seu aluno a refletir?<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: "times new roman" , serif;">Poderia
continuar com mais exemplos, mas para não ficar muito longo eu quero te fazer
um convite:<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif;">Se
inscrever no Terceiro Workshop Geometria de Sucesso que acontecerá no mês de
maio.<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-family: "times new roman" , serif; font-size: 11.0pt; line-height: 107%;">Do dia 03/05 a 11/05.
No workshop vou apresentar estratégias para você ter a atenção do seu aluno e
realizar atividades que vão, sem dúvidas, melhorar o processo de ensino e
aprendizagem.</span></div>
<div style="text-align: justify;">
<span style="font-family: "times new roman" , serif; font-size: 11.0pt; line-height: 107%;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><span style="font-size: 14.6667px;">Pressione o link abaixo e faça a sua inscrição.</span></span></div>
<div style="text-align: justify;">
<span style="font-family: "times new roman" , serif;"><span style="font-size: 14.6667px;"><br /></span></span></div>
<div style="text-align: justify;">
<a href="https://geometriadesucesso.easymatica.com.br/tws">https://geometriadesucesso.easymatica.com.br/tws</a></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Abraço e te espero por lá.</div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Prof. Célio</div>
</div>
EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-27796366851921116112019-07-17T02:39:00.003-03:002019-07-17T02:39:30.225-03:00ICOSAEDRO - POLY<div dir="ltr" style="text-align: left;" trbidi="on">
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<a href="https://1.bp.blogspot.com/-T7yITCaC-a0/XS60XoSJePI/AAAAAAAAjEc/IJKQLsmsaFgE3T2U038Fq0sg2lAlWjYGACLcBGAs/s1600/icosaedro.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="646" data-original-width="1350" height="305" src="https://1.bp.blogspot.com/-T7yITCaC-a0/XS60XoSJePI/AAAAAAAAjEc/IJKQLsmsaFgE3T2U038Fq0sg2lAlWjYGACLcBGAs/s640/icosaedro.gif" width="640" /></a></div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-60254052546724199152019-02-17T22:11:00.001-03:002020-03-28T15:24:18.054-03:00LIVRO MINDSET - A NOVA PSICOLOGIA DE SUCESSO<div dir="ltr" style="text-align: left;" trbidi="on">
<div style="text-align: center;">
<span style="background-color: white; color: #333333; text-align: justify;">Leia a amostra GRÁTIS, são 40 páginas.</span></div>
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<div style="text-align: center;">
<iframe frameborder="0" height="500" scrolling="no" src="https://books.google.com.br/books?id=aizjDQAAQBAJ&lpg=PP1&dq=carol%20dweck&hl=pt-BR&pg=PT38&output=embed" style="border: 0px;" width="550"></iframe>
</div>
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<br /></div>
<div style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em; text-align: left;">
<img alt="Resultado de imagem para mindset" height="320" src="https://images.livrariasaraiva.com.br/imagemnet/imagem.aspx/?pro_id=9404582&qld=90&l=430&a=-1" width="220" /></div>
<div style="line-height: 150%; margin: 0cm 0cm 0.0001pt; text-align: justify;">
O teste é originário do livro
Mindset: A nova psicologia de sucesso, de Carol Dweck<o:p></o:p></div>
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<br /></div>
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<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">Clássico
da psicologia em versão revista e atualizada. Carol S. Dweck, professora de
psicologia na Universidade Stanford e especialista internacional em sucesso e
motivação. </span><br />
<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;"><br /></span>
<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">Desenvolveu, ao longo de décadas de pesquisa, um conceito
fundamental: a atitude mental com que encaramos a vida, que ela chama de
"mindset", é crucial para o sucesso. </span><br />
<span style="font-family: "times new roman", serif; font-size: 12pt;"><br /></span>
<span style="font-family: "times new roman", serif; font-size: 12pt;">Dweck revela de forma brilhante
como o sucesso pode ser alcançado pela maneira como lidamos com nossos
objetivos. </span><br />
<span style="font-family: "times new roman", serif; font-size: 12pt;"><br /></span>
<span style="font-family: "times new roman", serif; font-size: 12pt;">O mindset não é um mero traço de personalidade, é a explicação de
por que somos otimistas ou pessimistas, bem-sucedidos ou não. </span><br />
<span style="font-family: "times new roman", serif; font-size: 12pt;"><br /></span>
<span style="font-family: "times new roman", serif; font-size: 12pt;">Ele define nossa
relação com o trabalho e com as pessoas e a maneira como educamos nossos
filhos. É um fator decisivo para que todo o nosso potencial seja explorado.
(Google Books)</span></div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com1tag:blogger.com,1999:blog-5751481597990450977.post-16391288232690355802018-09-20T00:44:00.000-03:002018-09-20T00:44:37.533-03:00OS ELEMENTOS - O LIVRO MAIS IMPORTANTE QUE A GEOMETRIA JÁ TEVE<div dir="ltr" style="text-align: left;" trbidi="on">
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Os Elementos de Euclides é um tratado matemático e geométrico consistindo de 13 livros escrito pelo matemático grego Euclides em Alexandria por volta de 300 a.C.. Ele engloba uma coleção de definições, postulados, proposições e provas matemáticas das proposições. </div>
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Além de definições, postulados e noções comuns/axiomas, demonstra m-se 465 proposições, em sequência lógica, referentes à geometria euclidiana, a da régua e compasso, e à aritmética, isto é, à teoria dos números. Os seis primeiros livros dão conta da geometria plana; os três seguintes, da teoria dos números; o livro X, o mais complexo, estuda uma classificação de incomensuráveis/irracionais; e os três últimos abordam a geometria no espaço/estereometria.</div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-83782017831458582842018-08-14T19:19:00.000-03:002018-08-14T19:22:32.111-03:004 E-BOOKS PARA DESENVOLVIMENTO EM SALA DE AULA<div dir="ltr" style="text-align: left;" trbidi="on">
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Olá professor (a) de matemática, se você busca meios para fazer algo diferente com seus alunos, em um desses e-books você encontrará alguma atividade, questões de vestibulares, alguma ideia para o desenvolvimento em sala de aula. Para baixar qualquer um deles gratuitamente você só precisa ir até à página de download clicando na foto. Baixe agora.</div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-46027909792158255552018-08-01T13:29:00.002-03:002018-08-01T13:29:30.779-03:00O PRAZER DA ESTATÍSTICA - DOCUMENTÁRIO<div dir="ltr" style="text-align: left;" trbidi="on">
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-73155043134168492062018-08-01T13:27:00.002-03:002018-08-01T13:27:23.516-03:00A ESTATÍSTICA DO CORPO - DOCUMENTÁRIO<div dir="ltr" style="text-align: left;" trbidi="on">
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-68841557207141320262018-07-23T11:48:00.001-03:002018-07-23T11:51:50.974-03:0012 INCRÍVEIS TEMAS PARA FEIRA DE CIÊNCIAS<div dir="ltr" style="text-align: left;" trbidi="on">
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A feira de ciências é um momento único na escola, o empenho
dos alunos, o envolvimento de todos, a atmosfera em torno de um projeto assim é
contagiante.<o:p></o:p></div>
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Tirando a tensão das apresentações
o momento mais 'dramático' é na hora do sorteio dos temas. Primeiro pela
preferência que cada grupo tem por uma disciplina e depois o medo de pegar
matemática, sempre vejo a mesma tensão: o que vamos fazer?<o:p></o:p></div>
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E é natural o desespero porque
quando falamos ou ouvimos a palavra experimento em feira de ciências sempre vem
a imagem de algo acendendo, saindo fumaça, mudando de cor ou algo do tipo. E
quando você pensa em matemática fazendo essa relação você não encontra nada relacionado
e o desespero bate.<o:p></o:p></div>
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Ao seu modo, a matemática é rica em
experimentos, nunca podemos dizer para um aluno que é difícil mesmo e ele não
vai encontrar muita coisa para realizar em sua apresentação, é um erro
gigantesco.<o:p></o:p></div>
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Sempre que um grupo vem me procurar
para pedir algumas dicas para apresentação eu listo uns dez temas e explico
cada um e geralmente o grupo não consegue decidir na hora, eles anotam tudo e
depois decidem entre uma ou outra ou mais de uma.<o:p></o:p></div>
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Para facilitar a vida dos meus
alunos e também de professores, listei em um e-book 12 incríveis temas para
feira de ciências, que pode ser baixado facilmente clicando no link abaixo e
acima dessa postagem.<o:p></o:p></div>
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<a href="https://goo.gl/Qub6AT" target="_blank">BAIXAR TEMAS </a></div>
EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-6368761206610293742018-05-08T21:38:00.000-03:002018-05-08T21:43:08.103-03:00DOBRADURAS & MATEMÁTICA PARA SALA DE AULA<div dir="ltr" style="text-align: left;" trbidi="on">
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-86747135217216863492018-01-30T23:32:00.001-02:002018-03-13T22:48:38.196-03:005 FORMAS PARA CALCULAR A ÁREA DE UM TRIÂNGULO | REVISÃO 3 ANO<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">Sempre
estamos revisando algum conteúdo com nossas turmas, não é mesmo? Reuni 5 formas
diferentes de calcular a área de um triângulo, para que em cada uma delas
possamos revisar algum conteúdo que se perdeu.<o:p></o:p></span></div>
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<ol>
<li>base
vezes altura</li>
<li>determinante</li>
<li>semi
perímetro</li>
<li>teorema
das áreas</li>
<li>teorema
de Pick</li>
</ol>
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<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">Base
vezes altura dividido por 2 é a forma que todos no terceiro ano onde eu fiz a
revisão sabiam ou lembravam que em algum momento escolar viu esse processo. Em
seguida calculamos a área usando semi perímetro que tem mais continhas a fazer
e envolve raiz quadrada.<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">Usando
determinante estamos revendo conteúdo do segundo ano e iniciando conteúdo do
terceiro como a localização de pontos no plano.<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">Com
o teorema das áreas relembramos trigonometria e tudo que deriva dela, como as
razões trigonométricas, raiz não exata, divisão de fração entre outros. Esse
meio de resolução, também pode ser novidade para muitos.<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">O
teorema de Pick também pode ser uma novidade para muitos e uma oportunidade
para entender que sempre existem formas diferentes para resolver o mesmo
problema.<o:p></o:p></span></div>
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<span style="font-family: "times new roman" , serif; font-size: 12.0pt; line-height: 150%;">Todas
as informações necessárias para usar as 5 opções:<o:p></o:p></span></div>
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<strong> <a href="https://www.slideshare.net/CRFBIROBERTO/5-formas-para-calcular-a-rea-de-um-tringulo" target="_blank" title="5 FORMAS PARA CALCULAR A ÁREA DE UM TRIÂNGULO">5 FORMAS PARA CALCULAR A ÁREA DE UM TRIÂNGULO</a> </strong> de <strong><a href="https://www.slideshare.net/CRFBIROBERTO" target="_blank">EASYMATICA</a></strong> <br />
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Exemplo: Teorema de Pick x Teorema das áreas<br />
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-50758582780858452042017-12-06T00:21:00.000-02:002018-03-13T22:41:33.445-03:00DOBRADURAS & MATEMÁTICA - TRABALHO DOS ALUNOS DO SEGUNDO ANO 2017 - 2A 2B 2C 2D 2E<div dir="ltr" style="text-align: left;" trbidi="on">
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Conheça mais sobre esta ideia <a href="http://easymatica.com.br/" target="_blank">DOBRADURAS & MATEMÁTICA</a>. Uma oportunidade para fazer diferente em sala de aula. <a href="http://easymatica.com.br/" target="_blank">DOBRADURAS & MATEMÁTICA</a> é um projeto antigo que a muito tempo vem dando excelentes resultados.</div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-56840283215266915512017-11-27T00:18:00.002-02:002018-02-14T23:48:03.265-02:00A DIDÁTICA DA MATEMÁTICA<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-size: 1rem; letter-spacing: 0.1rem;">A Didática da Matemática, conhecida no Brasil como Educação Matemática, avivou as práticas de ensino pelo mundo. As diversas teorias em Educação Matemática sugerem amplos caminhos que podemos percorrer em busca de uma melhor prática pedagógica. Cito aqui alguns autores e suas teorias no qual tacitamente uso nas atividades aqui descritas. Guy Brousseau, Teoria das Situações Didáticas; Régine Douady, Dialética Ferramenta – Objeto; Ubiratan D´Ambrósio, Etnomatemática; Yves Chevallard, Teoria do Antropológico do Didático; Raymond Duval, Registro de Representação Semiótica e Gérard Vergnaud, Teoria dos Campos Conceituais.</span><br />
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<span style="font-size: 1rem; letter-spacing: 0.1rem;">Estes autores, entre outros, procuraram entender por meio de suas pesquisas como o saber matemático é construído em sala de aula. Entender estas teorias é abrir um leque de possibilidades em abordagens de ensino em sala de aula. A grande dificuldade é concatenar estas teorias entre si junto à nossa base curricular e a realidade das escolas estaduais de São Paulo e ao usual, como aplicabilidade, beleza, curiosidades.</span><br />
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<span style="font-size: 1rem; letter-spacing: 0.1rem;">Quando baseamos nossas atividades em teorias da Didática da Matemática, estamos procurando e observando os melhores meios para o desenvolvimento de futuras atividades. Por elas vamos observando o que funcionou, o que não funcionou, os pontos a serem melhorados, a melhor sequência, enfim, todos os aspectos positivos e negativos que surgiram durante a realização de tal atividade devem ser considerados para aprimorar as próximas.</span></div>
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O conteúdo deste livro é uma seleção de todas as atividades que realizei com alunos do Ensino Fundamental e Médio. Atividades abordadas de forma diferentes das habituais. Reuni atividades realizadas com todas as séries. São ideias simples e eficientes que foram surgindo a partir de leituras, vídeos, teses,palestras, comentários,</div>
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ATPC´s<a href="http://easymatica.com.br/#_ftn1" style="color: #f4a85e; font-size: 1rem; letter-spacing: 0.1rem; line-height: 1.5em; text-decoration-line: none;">[1]</a>,conversas com outros professores de matemática e de outras disciplinas, programas de televisão, séries, filmes entre outros.</div>
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As atividades não estão separadas ou divididas por série nem por conteúdo. Isto porque, para desenvolver a última atividade você não precisa ter conhecimento da primeira. Como exemplo, podemos usar o tema Maximizando área com a sétima série<a href="http://easymatica.com.br/#_ftn2" style="color: #f4a85e; font-size: 1rem; letter-spacing: 0.1rem; line-height: 1.5em; text-decoration-line: none;">[2]</a>, esse conteúdo pode ser desenvolvido em todas as séries, é uma questão de adaptação para cada uma delas. Em qualquer página você encontrará uma atividade que pode ser desenvolvida para uma ou mais séries, isto dependerá da criatividade de cada professor. Uma atividade desenvolvida para o sexto ano, por exemplo, pode ser adaptada para o nono ano ou outra série qualquer. Em todas as atividades há a informação da série em que elas foram desenvolvidas, mas isso não implica em reprodução para a mesma série. A ideia é que, todos os professores que queiram reproduzir uma atividade tenham a liberdade para adaptá-la ou recriá-la. A atividade sobre tabuada<a href="http://easymatica.com.br/#_ftn3" style="color: #f4a85e; font-size: 1rem; letter-spacing: 0.1rem; line-height: 1.5em; text-decoration-line: none;">[3]</a>, por exemplo, foi discutida com o primeiro ano do Ensino Médio e a Lei de Benford, que não é mencionada na Proposta Curricular, mas que abrange vários temas do Ensino Médio e Fundamental foi realizada também no primeiro ano. Todas as atividades podem ser adaptadas para qualquer série.</div>
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Para ter uma ideia melhor das atividades executadas e para ver alguns resultados, disponibilizo no livro, vários “QR Code” que os levarão para álbuns de fotografias, vídeos, textos, páginas no Facebook, blog etc. Os QR Code são fontes de informações rápidas e precisas. É um código de barra em duas dimensões capaz de armazenar de textos a vídeos. Para ter acesso às informações contidas nos códigos basta ter um celular com leitor, encontrado facilmente nas lojas de aplicativos para Smartphones.<br />
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Prefácio do livro Práxis Matemática<br />
Mais informações em <a href="http://easymatica.com.br/">easymatica.com.br</a></div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-69950535174474781122017-09-17T22:09:00.000-03:002017-09-17T22:27:37.068-03:00LIVRO PRÁXIS MATEMÁTICA, AULAS PARA TODOS, SORTEIO<div dir="ltr" style="text-align: left;" trbidi="on">
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-23470334146560892172017-07-15T19:13:00.000-03:002017-07-15T22:55:08.990-03:00MARYAM MIRZAKHANI, PRIMEIRA MULHER A GANHAR 'NOBEL DE MATEMÁTICA', MORRE AOS 40 ANOS<div dir="ltr" style="text-align: left;" trbidi="on">
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Maryam Mirzakhani lutou contra um câncer de mama por quatro anos.</div>
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Morreu neste sábado (15), vítima de câncer de mama, Maryam Mirzakhani, de 40 anos, a primeira mulher a ganhar a Medalha Fields, considerado Prêmio Nobel da Matemática. Ela lutava contra a doença há quatro anos.</div>
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Maryam era professora da Universidade de Stanford, nos Estados Unidos. Ela recebeu a Medalha Fields, em 2014, no mesmo ano do brasileiro Artur Ávila.</div>
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Dezenove anos antes, em 1995, a dupla já havia conquistado o mesmo feito: ouro na Olimpíada Internacional de Matemática (IMO, na sigla em inglês), segundo o Instituto de Matemática Pura e Aplicada (Impa). Foi o segundo ouro recebido na IMO. Na competição, ela também atingiu a nota perfeita.</div>
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Segundo o Impa, Maryam fez graduação em matemática na Sharif University of Technology em 1999 e doutorado na mesma área em Harvard, em 2004. Além da medalha Fields, Maryam recebeu o Prêmio Blumenthal 2009 para o Avanço da Pesquisa em Matemática Pura e o Prêmio Satter 2013 da American Mathematical Society.</div>
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Fonte G1</div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-69508429096782334182017-06-21T09:00:00.000-03:002018-03-13T22:43:21.443-03:00FOTOS LANÇAMENTO DO LIVRO PRÁXIS MATEMÁTICA <div dir="ltr" style="text-align: left;" trbidi="on">
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Pessoal que acompanha o blog pode adquirir um exemplar acessando o site da editora <a href="http://editoramultifoco.com.br/loja/product/praxis-matematica-aulas-para-todos/?utm_campaign=shareaholic&utm_medium=facebook&utm_source=socialnetwork" target="_blank">Multifoco RJ</a>. </div>
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<a href="http://easymatica.com.br/" target="_blank">Conheça mais do livro clicando neste link</a></div>
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Descrição</h2>
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Voltado para professores e alunos do ensino fundamental e médio, este livro reúne uma série de atividades recreativas, com muita matemática, demonstrações e contextualizações. Desenvolvidas com alunos de escolas pública da zona sul de São Paulo. Com conteúdos diversos de séries diferentes o leitor poderá acompanhar o desempenho de uma determinada série em determinado bimestre ou de um dia e ver que por mais simples que possa parecer uma atividade, muitos são os conceitos matemáticos que as fazem evoluir, incorporar como objeto matemático, quebrando intuições e se sustentando em lógica e padrões. E para dinamizar a leitura, códigos QR são disponibilizados abaixo das atividades direcionando o leitor para páginas, vídeos e fotos, todos contendo orientações sobre algumas construções ou a participação e resultados dos alunos envolvidos. Um livro dinâmico.</div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-25945594072729634872017-06-12T22:16:00.002-03:002017-06-12T22:24:56.354-03:00RELATÓRIO INFORMATIVO PRIMEIRO E SEGUNDO BIMESTRES<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="https://drive.google.com/file/d/0B1q0kKSLNXVWdnd0cXFhNmx4TEk/view?usp=sharing" target="_blank">RELATÓRIO GERAL PRIMEIRO E SEGUNDO BIMESTRES LINK PDF</a><br />
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<iframe allowfullscreen="" frameborder="0" height="714" marginheight="0" marginwidth="0" scrolling="no" src="//www.slideshare.net/slideshow/embed_code/key/3BepIWaEp0Gndt" style="border-width: 1px; border: 1px solid #ccc; margin-bottom: 5px; max-width: 100%;" width="668"> </iframe> <br />
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<strong> <a href="https://www.slideshare.net/CRFBIROBERTO/relatrio-comparativo-primeiro-e-segundo-bimestre" target="_blank" title="RELATÓRIO COMPARATIVO PRIMEIRO E SEGUNDO BIMESTRE ">RELATÓRIO COMPARATIVO PRIMEIRO E SEGUNDO BIMESTRE </a> </strong> de <strong><a href="https://www.slideshare.net/CRFBIROBERTO" target="_blank">easymatica</a></strong> </div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-11070237880225566372017-05-03T19:41:00.001-03:002017-05-03T19:41:11.863-03:00LIVRO: PRÁXIS MATEMÁTICA, AULAS PARA TODOS<div dir="ltr" style="text-align: left;" trbidi="on">
Olá à todos que visitam o blog, depois de um pouco mais de um ano de trabalho estou publicando um livro sobre atividades interessantes, diferenciadas, recreativas, que desenvolvi em sala de aula. É um livro muito prático com ideias simples e eficazes. O livro está disponível no site da editora <a href="http://editoramultifoco.com.br/loja/product/praxis-matematica-aulas-para-todos/" target="_blank">Multifoco Rio de Janeiro.</a><br />
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com1tag:blogger.com,1999:blog-5751481597990450977.post-13712256017277685052017-03-26T20:12:00.003-03:002017-03-26T20:13:51.110-03:0015 DICAS MATEMÁTICAS PARA OTIMIZAR SEU TEMPO RESOLVENDO PROVAS<div dir="ltr" style="text-align: left;" trbidi="on">
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<a href="https://drive.google.com/file/d/0B1q0kKSLNXVWQVFuVGxRVjRuZlk/view?usp=sharing" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="360" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiuAnSySw8ye17v0p_j7gjoj3K5RDCLkgtKP2QN1AP-CjeER9g5BfK1Hp2qhN51i8EaOKy2JbUWjlCCHvjLlzsl7lsVeYQnBIg9ir_yYXAvNm5DcAIgMZXxXKFiKGyou0tN9l4LErrutdE/s640/DICA+1.png" width="640" /></a></div>
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<iframe allowfullscreen="" frameborder="0" height="714" marginheight="0" marginwidth="0" scrolling="no" src="//www.slideshare.net/slideshow/embed_code/key/5qe0SkLlFHLhwD" style="border-width: 1px; border: 1px solid #ccc; margin-bottom: 5px; max-width: 100%;" width="668"> </iframe> <br />
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<strong> <a href="https://www.slideshare.net/CRFBIROBERTO/15-dicas-matemticas-para-otimizar-o-tempo-na-resoluo-de-provas" target="_blank" title="15 dicas matemáticas para otimizar o tempo na resolução de provas">15 dicas matemáticas para otimizar o tempo na resolução de provas</a> </strong> de <strong><a href="https://www.slideshare.net/CRFBIROBERTO" target="_blank">Profº. Célio</a></strong> </div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-86739111587840735582017-02-23T15:06:00.001-03:002017-02-23T15:06:19.438-03:00EXPERIMENTOS MATEMÁTICOS<div dir="ltr" style="text-align: left;" trbidi="on">
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Mais experimentos disponível no link abaixo (foto). Parceria do IME e Unicamp.</div>
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<a href="http://m3.ime.unicamp.br/recursos/midia:experimento" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="265" src="https://2.bp.blogspot.com/-aFSvt2vIZ9k/VfTTELQ0pKI/AAAAAAAAMhk/chocqUnaU3s/s640/unicamp.png" width="640" /></a></div>
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-43291984186198137882017-02-08T22:21:00.002-02:002017-02-08T22:21:11.383-02:00PHI BONACCI, A SEQUÊNCIA<div dir="ltr" style="text-align: left;" trbidi="on">
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-75645796165786924332016-12-31T22:03:00.000-02:002016-12-31T22:03:01.672-02:00ANO NOVO, NOVOS DESAFIOS!<div dir="ltr" style="text-align: left;" trbidi="on">
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Feliz 2017 à todos! Um ano indivisível</div>
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APPLET DE DANIEL MENTRARD
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EASYMATICAhttp://www.blogger.com/profile/01188141769242708239noreply@blogger.com0tag:blogger.com,1999:blog-5751481597990450977.post-28593852678441606132016-12-21T15:49:00.000-02:002016-12-21T15:49:27.084-02:00FELIZ NATAL À TODOS - UMA IMAGEM COM SIMETRIA ROTACIONAL DE ORDEM DOIS<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-family: "frutiger" , "frutiger linotype" , "univers" , "calibri" , "gill sans" , "gill sans mt" , "myriad pro" , "myriad" , "dejavu sans condensed" , "liberation sans" , "nimbus sans l" , "tahoma" , "geneva" , "helvetica neue" , "helvetica" , "arial" , sans-serif; font-size: 16px; line-height: 19px;">A imagem é invariante por simetrias de rotação de múltiplos inteiros de meia volta. Assim sendo invariante por rotações de meia voltam, e incluindo a identidade, estas duas rotações em torno do centro da imagem geram o grupo de simetrias da figura. Assim diz-se que a imagem tem simetria cíclica e de ordem dois. (Recebi o arquivo do <a href="http://www.geogebra.org.pt/" target="_blank">Instituto Geogebra Portugal IGP</a> por José Manuel dos Santos)</span></div>
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