[b][size=100]O que é o Tangram?[/size][/b] [br]O Tangram é um quebra-cabeças geométrico chinês formado por 7 peças: são 2 triângulos grandes, 2 pequenos, 1 médio, 1 quadrado e 1 paralelogramo. [br]Utilizando todas essas peças sem sobrepô-las, é possível formar várias figuras.[br][br]É dado a figura de um Tangram, construído no GeoGebra, em cima da malha quadriculada. Observe que cada uma de suas peças possuem um ponto preto em uma de suas extremidades, este ponto permite que a peça seja rotacionada.
1) Quais figuras geométricas são encontradas no Tangram?
2) É possível criar novas figuras geométricas a partir da junção de 2 ou mais peças do Tangram? Que figuras são essas?
Agora, observe que a junção das peças do Tangram formam um quadrado de lado 4, ou seja, quatro "quadradinhos" da malha quadriculada do geogebra. [br][br]Quantos "quadradinhos" existem neste quadrado maior (que compõe todas as peças do Tangram)? E quantos "quadradinhos" existem em cada uma das peças? [br][br]A partir dessas perguntas é possível montar a seguinte tabela: [br][br][table][tr][td][b]Peça (cor) [/b][/td][td][b]Quadradinhos[/b][/td][/tr][tr][td]Amarela[/td][td]4[/td][/tr][tr][td]Vermelha[/td][td]4[/td][/tr][tr][td]Azul[/td][td]2[/td][/tr][tr][td]Laranja[/td][td]2[/td][/tr][tr][td]Verde[/td][td]2[/td][/tr][tr][td]Rosa[/td][td]1[/td][/tr][tr][td]Roxo[/td][td]1[/td][/tr][tr][td]Total[/td][td]16[/td][/tr][/table][br][br][br]A partir dos dados dessa tabela, é possível montar uma relação de cada peça com o total: [math]\frac{Peça}{Total}[/math][br][br]1) Peça Amarela: [math]\frac{4}{16}=\frac{1}{4}[/math][br][br]2) Peça Vermelha: [math]\frac{4}{16}=\frac{1}{4}[/math][br][br]3) Peça Azul: [math]\frac{2}{16}=\frac{1}{8}[/math][br][br]4) Peça Laranja: [math]\frac{2}{16}=\frac{1}{8}[/math][br][br]5) Peça Verde: [math]\frac{2}{16}=\frac{1}{8}[/math][br][br]6) Peça Rosa: [math]\frac{1}{16}[/math][br][br]7) Peça Roxa: [math]\frac{1}{16}[/math][br][br][br][b]O que é porcentagem? [/b][br]A porcentagem indica uma taxa ou proporção calculada em relação ao número 100 (por cem), ou seja, é uma fração em que o denominador é 100. A porcentagem é representada pelo símbolo %.[br][br]É possível encontrar uma fração equivalente as frações acima, com denominador igual a 100? [br][br]Exemplo: a peça amarela representa [math]\frac{1}{4}[/math] da figura. Como eu posso transformar essa fração em outra com denominador 100? Que número multiplica a fração e o resultado é uma fração com denominador 100?[br][br][math]\frac{1}{4}\times\frac{\bigcirc}{\bigcirc}=\frac{\bigcirc}{100}[/math] → [math]\frac{1}{4}\times\frac{25}{25}=\frac{25}{100}[/math][br][br]Isso significa que a peça amarela representa 25% do total da figura do Tangram. [br][br][br][b]Agora, faça você mesmo as porcentagens das demais peças do Tangram. [/b]
3) Qual a porcentagem da peça verde do Tangram?
4) Qual a porcentagem da peça rosa do Tangram?
5) Volte na figura do Tangram e tente recriar a seguinte imagem: [br][br][img]data:image/png;base64,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[/img]
6) Usando o número de figuras indicado abaixo, indicando a fração e o percentual correspondente do Tangram, construa: [br]a) um triângulo com duas peças, [br]b) um quadrado com cinco peças.