1-Sabendo que as retas [i]f[/i], [i]g [/i]e [i]h [/i]são paralelas, determine o comprimento do segmento MN.[br][br] [img 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[/img]
2-Sabendo que as retas [i]f[/i], [i]g [/i]e [i]h [/i]são paralelas, determine o comprimento do segmento DF.[br] [br] [img 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[/img]
3 (Dolce & Pompeu)-Um feixe de 4 paralelas determina sobre uma transversal três segmentos que medem 5 cm, 6 cm e 9 cm, respectivamente. Determine os comprimentos dos segmentos que esse mesmo feixe determina sobre uma outra transversal, sabendo que o segmento compreendido entre a primeira e quarta paralela mede 60 cm.
4-Na figura seguinte, CD pertence a bissetriz do ângulo [math]\ \hat{C}[/math] e o perímetro do triângulo ABC é 15. Determine AC. 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[/img]
5 (Dolce & Pompeu)-Os lados de um triângulo medem 5 cm, 6 cm e 7 cm. Em quanto é preciso prolongar o lado menor para que ele encontre a bissetriz do ângulo externo oposto?