Um quadrado com área igual a 36 cm² foi recortado nas seis peças da figura. Foram feitos oito cortes retos, quatro de um mesmo tamanho maior e outros quatro de um mesmo tamanho menor, em ângulos múltiplos de 45°.[br][br][img]data:image/png;base64,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[/img][br][br]a) Desenhe no quadrado abaixo como poderiam estar as peças antes de recortadas.[br][br][img]data:image/png;base64,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[/img][br][br]b) Qual é a área de uma peça pentagonal?[br][br]c) Qual é a razão entre as áreas da menor e da maior peça quadrada?