Uma empresa que organiza eventos de formatura confecciona canudos de diplomas a partir de folhas de papel quadradas. Para que todos os canudos fiquem idênticos, cada folha é enrolada em torno de um cilindro de madeira de diâmetro d em centímetros, sem folga, dando-se 5 voltas completas em torno do tal cilindro. Ao final, amarra-se um cordão no meio do diploma, bem ajustado, para que não ocorra o desenrolamento, como ilustrado na figura.[br] [img]https://multiensino.files.wordpress.com/2015/08/questc3a3o-170.png?w=700[/img][br]Em seguida, retira-se o cilindro de madeira do meio do papel enrolado, finalizando a confecção do diploma. Considere que a espessura da folha de papel original seja desprezível.[br]Qual é a medida, em centímetros, do lado da folha de papel usado na confecção do diploma?

a) O ponto A é o centro.[br][br] [img width=228,height=204]data:image/png;base64,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[/img]

b) O ponto C é o centro.[br][br] [img]data:image/png;base64,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[/img]

C) O ponto H é o centro e [math]\overrightarrow{JK}[/math] é tangente a circunferência.[br][br] [img width=451,height=303]data:image/png;base64,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[/img]

a) O ponto O é o centro.[br][br] [img]data:image/png;base64,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[/img]

b) O ponto O é o centro.[br][br] 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[/img]

4 (Dolce & Pompeu-adaptado) Determine o perímetro e a área da figura sombreada, sabendo que ela é formada por arcos de 10 m que são centrados em A, B e C. 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[img]data:image/png;base64,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[/img]

5-Calcule o comprimento de um circunferência e a área do círculo cujo raio mede 4 cm.

6 (Dolce & Pompeu) O comprimento de uma circunferência é [math]12\pi[/math] cm. Determine o raio de outra circunferência cujo comprimento é a quarta parte da primeira.

7 (Dolce & Pompeu) Uma pista circular foi construída por duas circunferências concêntricas, cujos comprimentos são 1500 m e 1200 m, aproximadamente. Quanto mede sua largura?

a) O ponto A é o centro.[br][br] 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[/img]

b) O ponto A é o centro.[br][br] [img 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[/img]

9-Determine a área do segmento circular:[br][br] [img width=283,height=259]data:image/png;base64,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[/img]