Na figura abaixo, ABCD é um paralelogramo, DQ é perpendicular à reta que contém BC e o segmento CP é perpendicular a AB.[br][br] [img 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[/img][br][br]Com base nessas informações, marque as alternativas corretas.
Na figura abaixo, as três circunferências de centro B, C, D são tangentes duas a duas e inscritas num mesmo ângulo. Calcular o diâmetro da circunferência intermediária, sabendo-se que os raios das outras duas circunferências são 2,5 cm e 4,9 cm. 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[/img][br]O diâmetro é:
Na figura abaixo, considere os quadrados de lados x, 6 e 9.
O perímetro do quadrado de lado x é:
Um triângulo [b]ABC[/b], retângulo em[b] C, [/b]movimenta-se no plano de coordenadas. Os vértices [b]A[/b] e[b] B [/b]deslizam sobre os eixos [i][b]Ox[/b][/i] e [i][b]Oy[/b][/i] , respectivamente, a partir da posição inicial em que [b]A[/b] coincide com a origem, até a posição final, em que[b] B [/b]coincide com a origem. [b]D [/b]é o ponto médio do segmento [math]\textbf\overline{AB}[/math]. A construção seguinte ilustração tal situação. [br]
a) Durante o movimento, em algum momento, ocorrerá congruência entre os triângulos [b]AOB[/b] e [b]ABC[/b].[br](Justifique a resposta)
b) A trajetória do ponto[b] D [/b]está contida em uma circunferência.[br](Justifique a resposta)
c) A trajetória do ponto[b] C [/b]está contida em uma reta que passa pela origem.[br](Justifique a resposta)
O dono de um sítio pretende colocar uma haste de sustentação para melhor firmar dois postes de comprimentos iguais a 6 m e 4 m. A figura representa a situação real na qual os postes são descritos pelos [br]segmentos AC e BD e a haste é representada pelo segmento EF, todos perpendiculares ao solo, que é indicado pelo segmento de reta AB. Os segmentos AD e BC representam cabos de aço que serão instalados. [br][br] 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[/img][br]Qual deve ser o valor do comprimento da haste EF?
6-Sabe-se que ângulos que determinam um mesmo arco na circunferência são congruentes. A partir dessa informação e usando seus conhecimentos sobre semelhança de triângulos, resolva os seguintes itens:
a) Mostre que na figura seguinte PA x PC = PB x PD. [br][br][img]data:image/png;base64,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[/img][br][br]
b) Calcule o valor de x[br][br] [img]data:image/png;base64,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[/img]
7-Calcule o valor de x: [br][br][img]data:image/png;base64,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[/img]
8-Sabendo que a reta AD é tangente à circunferência e que [b]A[/b] é o centro, calcule o raio do círculo da figura abaixo:[br] [img]data:image/png;base64,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[/img][br]