Na figura abaixo, as peças do Tangram foram unidas para formar um quadrado.[br][br]Você já descobriu aqui que:[br][list][*]a área do triângulo grande é o dobro da área do triângulo médio[br][/*][*]o triângulo médio, o quadrado e o paralelogramo têm a mesma área[/*][*]a área do triângulo médio é o dobro da área do triângulo pequeno[/*][/list][br][br][img]data:image/png;base64,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[/img]
Agora considere as peças do Tangram como frações do quadrado que elas formam na imagem.[br][br]Compare as áreas das peças e responda às seguintes questões.
Se o [color=#1e84cc][i]quadrado grande[/i][/color], construído com todas as peças do Tangram, representar [color=#1e84cc][i]um inteiro[/i][/color], atribua um valor fracionário a cada uma das outras peças do Tangram.[br]Explique sua resposta.
triângulo médio, paralelogramo, quadrado: [math]\frac{1}{8}[/math][br]triângulo pequeno: [math]\frac{1}{16}[/math][br]triângulo grande: [math]\frac{1}{4}[/math]
Entre as peças do Tangram existem dois [color=#1e84cc]triângulos pequenos[/color] (congruentes): se [color=#1e84cc]um deles[/color] representa [color=#1e84cc]um[br]inteiro[/color], atribua um valor fracionário a cada uma das outras peças do Tangram.[br]Neste caso, os valores correspondentes às demais peças são inteiros ou fracionários?[br]Explique sua resposta.
triângulo médio, paralelogramo, quadrado: [math]2[/math][br]triângulo grande: [math]4[/math]
Entre as peças do Tangram existe um [color=#1e84cc]quadrado pequeno[/color]: se ele representar [color=#1e84cc]um inteiro[/color], atribua um valor fracionário a cada uma das outras peças do Tangram.[br]Explique sua resposta.
triângulo médio, paralelogramo: [math]1[/math][br]triângulo pequeno: [math]\frac{1}{2}[/math][br]triângulo grande: [math]2[/math]
Among the Tangram pieces there is a [i][color=#1e84cc]medium triangle[/color][/i]: if it represents [color=#1e84cc][i]one whole[/i][/color], assign a fraction value to each of the other Tangram pieces.[br]Explain your answer.
paralelogramo, quadrado: [math]1[/math][br]triângulo pequeno: [math]\frac{1}{2}[/math][br]triângulo grande: [math]2[/math]