SEQUÊNCIA: Teorema de Pitágoras
[size=200][color=#073763][size=150][size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size][br][/size][/color][color=#980000][center]Você já deve ter ouvido falar no famoso "Teorema de Pitágoras"...[/center][/color][/size][size=150][color=#073763]O objetivo desta atividade é mostrar [u]o que é[/u] esse teorema, estudar os [u]conceitos[/u] envolvidos e trabalhar algumas de suas [u]aplicações[/u].[br]Para isso, antes vamos considerar algumas definições importantes para o tema.[/color][/size]
[color=#073763][size=150][size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size][/size][/color][u][color=#980000][size=200][br]Teorema[/size][/color][br][br][/u][size=150][color=#073763]O que você entende quando ouve a palavra "teorema"?[br][/color][i][color=#980000]Teorema é uma afirmação matemática que pode ser demonstrada por meio de um processo lógico.[/color][/i][color=#073763][br]O teorema que vamos estudar, faz uma afirmação a respeito dos lados de um triângulo retângulo. Seu nome faz homenagem a um filósofo grego que viveu entre 570 a.C. e 495 a.C.[/color][/size]
[size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size]
[u][color=#980000][size=200]Triângulo Retângulo[/size][/color][br][br][/u][color=#073763][size=150]Para entender o teorema de Pitágoras, é necessário conhecermos algumas características do triângulo retângulo.[br][br]- O triângulo retângulo é um triângulo que possui um ângulo [b][u]reto[/u][/b] (ângulo que mede 90[sup]o[/sup]). [br]Símbolo de ângulo reto: [/size][/color][img]data:image/png;base64,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[/img][br][br][size=150][color=#073763]- Os lados adjacentes ao ângulo reto (lados juntos ao ângulo reto) são chamados [/color][color=#980000][u][b]catetos[/b][/u][/color][color=#073763].[br][br]- O lado oposto ao ângulo reto é chamado de [/color][color=#980000][u][b]hipotenusa[/b][/u][/color][color=#073763].[br][br][/color][/size][center][img]data:image/png;base64,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[/img][br][br][br][size=100]______________________________________________________________________________________________________________________________________________________________[/size][size=100][/size][/center][center][/center]
[color=#980000][size=200]Explore o aplicativo abaixo e verifique esses conceitos:[br][/size] [i][size=100][center](Para usar o modo tela cheia, clique na figura no canto direito inferior)[/center][/size][/i][/color][center][size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size][/center]
[u][size=200][size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size][color=#980000][br]Área do quadrado[br][br][/color][/size][/u][size=150][color=#073763]Vamos revisar um conceito que utilizaremos daqui a pouco: Área do quadrado. [br][/color][justify][color=#073763]A [b]área[/b] de uma figura plana informa o tamanho de sua região. E, para calcular a área de um quadrado, basta saber a medida de um de seus lados (já que todos os lados são iguais) e elevar essa medida a 2, ou seja, "elevar ao quadrado".[br][br]Veja os exemplos:[/color][/justify][/size][justify][color=#073763][/color][/justify][justify][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img][br][br][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/justify]
[color=#980000][u][size=200]O teorema de Pitágoras[br][/size][/u][/color][color=#073763][br][size=150]Agora, vamos enfim descobrir o que diz o teorema de Pitágoras...[br]Esse teorema relaciona as medidas dos três lados de um triângulo retângulo (os dois catetos e a hipotenusa) e pode ser demonstrado de diversas maneiras.[/size][/color]
[size=200][size=100][color=#073763][size=100]______________________________________________________________________________________________________________________________________________________________[/size][br][/color][/size][color=#980000]Explore o aplicativo abaixo e descubra o famoso teorema de Pitágoras. [/color][/size][i][size=100][center][color=#980000][br](Para usar o modo tela cheia, clique na figura no canto direito inferior)[/color][/center][/size][/i][center][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/center]
[size=200][size=100][color=#073763][size=100]______________________________________________________________________________________________________________________________________________________________[/size][br][/color][/size][/size][center][size=200][color=#980000][/color][/size][/center][justify][/justify][center][size=200][color=#980000][/color][/size][/center][justify][/justify][center][size=200][color=#980000]Agora que você já conhece o teorema de Pitágoras, [br]use o aplicativo abaixo e explore exemplos [br]numéricos.[/color][/size][i][size=100][/size][/i][/center][i][size=100][center][/center][/size][/i][i][size=100][center][/center][/size][/i][i][size=100][center][color=#980000][br](Para usar o modo tela cheia, clique na figura no canto direito inferior)[/color][/center][/size][/i][center][size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size][/center]
[color=#980000][u][size=200][i]Teste os seus conhecimentos...[br][br][/i][/size][/u](Para usar o modo tela cheia, clique na figura no canto direito inferior)[/color]
[size=200][size=100][color=#073763][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/color][/size][u][br][color=#980000]Usando o teorema de Pitágoras em um problema[br][/color][/u][/size][color=#073763][br][size=150]Leia o problema: [/size][br][br][i][size=150][size=200]Um campo de futebol mede 120 m de comprimento e 80 m de largura. Quantos metros um jogador percorrerá se correr toda a diagonal do campo?[/size][/size][/i][/color]
[size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size][center][size=200][color=#980000][br]Use o aplicativo abaixo para ver como podemos [br]solucionar esse problema.[/color][/size][/center][i][size=100][center][color=#980000](Para usar o modo tela cheia, clique na figura no canto direito inferior)[/color][/center][/size][/i][center][size=100][size=100]______________________________________________________________________________________________________________________________________________________________[/size][/size][/center]
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[img]https://cdn.pensador.com/img/frase/pi/ta/pitagoras_pensem_o_que_quiserem_de_ti_faz_aquilo_que_te_l2jwmml.jpg[/img]