[i]Dados dos segmentos AB y CD, construye el rombo cuyas diagonales son los dos segmentos anteriores.[/i][br][br][br]Dibujamos dos segmentos AB y CD utilizando la herramienta [b]Segmento[/b], no la herramienta Segmento de longitud fija, para que sea posible modificar su medida sin más que arrastrar los vértices.[br][br][img width=269,height=78]data:image/png;base64,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[/img][br][br]Llevamos la diagonal mayor a cualquier posición de la vista gráfica, para lo que utilizaremos la herramienta [b]Compás[/b], como ya hicimos en el ejemplo 1.[br][br][img width=423,height=171]data:image/png;base64,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vez marcado un punto en la circunferencia ya tendremos el segmento mayor.[br]Como las dos diagonales se cortan en el punto medio y son perpendiculares, trazaremos la mediatriz al segmento anterior. Para ello, utilizamos  la  herramienta  [b]Mediatriz  [/b][b][img width=18,height=24]data:image/png;base64,R0lGODlhEgAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAAASABgAhAAAAAAAAAAAEQAAAgsAAA0AAAAACAAABAAANwAAMQAAOQAAKgAAOwAALgAAOgAAQgAASgAATwAAQQAAfwAAmQAAgQAAkAAAswAAuwAAxwAAxgAA/9IAAN4AAP8AAAECAwVIICCOZEl6Zlqiasu2cCyPwjw+FGK+ZJJtlRRPNIBcFKpXALBcwFhLG8EmKnSoy+FMK2JgIsLUZKNphEsOi8RFbbt3b25M/gwBADs=[/img] [/b]que encontramos en el bloque de [b]Construcciones[/b].[br][br][img 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[/img][br][br]Obtenemos el punto de intersección del segmento EF con la mediatriz.[br][br][br][img width=298,height=227]data:image/png;base64,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[/img][br][br]A continuación tenemos que trasladar el segundo segmento sobre la mediatriz. Para ello, utilizaremos la herramienta [b]Circunferencia (Centro-radio) [/b]para trazar sobre el punto de intersección G.[br][br]Observamos que el segmento correspondiente a la diagonal menor es f.[br][br][img 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que aparezca la etiqueta bastará con pulsar el botón  derecho sobre el segmento, marcando la opción [b]Mostrar etiqueta[/b].[br][br][img 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Mvmxcj/AK6rWhaf6o/7xrM1X/kGXX/X2n/o1a0rP/VH/eNaR+EynuULX/kMz/8AXrH/AOhvXD6lplvP8WdKvb28nFtZ+H2vTHhGTEcigjDKeDnJxzkDBFdxa/8AIZn/AOvWP/0N6jfTtAv4lkv7eOSd7E2MpYMCYWILJx2yKVT4iofCcNpNjo0Ph7T9f1nTV1LxBrMlxc2dg/zea0x3AbT8oAQLlj90Zro/h3oknhyS80mWYSyQWltvKnKqWaZiq/7Izgewq/rPhrwf4h+zf2rp0FyLWPyoAwcbE9BjHoKd4f0vSvDl5eLp/k2+nyRRJBAgc7CpctnI7l/WoLOqoqp/adn/AM9v/HT/AIUf2nZ/89v/AB0/4UAW6Kqf2nZ/89v/AB0/4Uf2nZ/89v8Ax0/4UAW6Kqf2nZ/89v8Ax0/4Uf2nZ/8APb/x0/4UAW6Kqf2nZ/8APb/x0/4Uf2nZ/wDPb/x0/wCFAFuiqn9p2f8Az2/8dP8AhR/adn/z2/8AHT/hQBboqp/adn/z2/8AHT/hR/adn/z2/wDHT/hQBboqp/adn/z2/wDHT/hR/adn/wA9v/HT/hQBboqp/adn/wA9v/HT/hR/adn/AM9v/HT/AIUAW6Kqf2nZ/wDPb/x0/wCFH9p2f/Pb/wAdP+FAFuiqn9p2f/Pb/wAdP+FH9p2f/Pb/AMdP+FAFuiqn9p2f/Pb/AMdP+FH9p2f/AD2/8dP+FAFuiqn9p2f/AD2/8dP+FH9p2f8Az2/8dP8AhQBboqp/adn/AM9v/HT/AIUf2nZ/89v/AB0/4UAW6Kqf2nZ/89v/AB0/4Uf2nZ/89v8Ax0/4UAW6Kqf2nZ/89v8Ax0/4Uf2nZ/8APb/x0/4UAW6Kqf2nZ/8APb/x0/4Uf2nZ/wDPb/x0/wCFAFuiqn9p2f8Az2/8dP8AhR/adn/z2/8AHT/hQBboqp/adn/z2/8AHT/hR/adn/z2/wDHT/hQBboqp/adn/z2/wDHT/hR/adn/wA9v/HT/hQBn+J/MbSrmGGcQXE1tNHDITjDleOa4TwhaCyub0tpj2CT/ZRDG7bsbQQ4zk4y2Wx716S2oWLjDSKw90P+FJ9t07+8n/fs/wCFAGTqn/ILuv8Ar7X/ANGpWjZ/6k/7xrN1Jg+kXLrna10hBI6jzVrSsj+5b/eNax+Fmctyjaf8hmf/AK9Y/wD0N608n1NZdn/yGJ/+vWP/ANDetOpqfEOn8IuT6mjJ9TSUVBYuT6mjJ9TSUUALk+poyfU0lFAC5PqaMn1NJRQAuT6mjJ9TSUUALk+poyfU0lFAC5PqaMn1NJRQAuT6mjJ9TSUUALk+poyfU0lFAC5PqaMn1NJRQAuT6mjJ9TSUUALk+poyfU0lFAC5PqaBuPTJpKzRZ215ql6bqJZvKESxh+QoK5OB9aANTD+jUYf0aqH9kaZ/z4W//fNNOmaOJREbW0Eh6ISNx/DOaLgaOH9Gow/o1UP7J0rdt+xW27GduOcUi6XpLMyrZ2rFThgBkg+h9KYF/DejUZPqaoto2lspH2GEZHVRgj6Gqskkj+FI5GkfzHt4wz5+Y5Kg8+vJpAbOH9Gow/o1UTo2lqxAsIMDjlaa2laUilmsrZVHVmGAKLgaGH9Gow/o1Z6aXpMiB47O1dT0ZQCPzFO/sfTP+fC3/wC+aAL2H9Gow/o1Uf7H0z/nwt/++aT+x9M/58Lf/vmgC/h/RqMP6NWe2laUgy1lbKOmSMU7+x9M/wCfC3/75oAvYf0akO4dc1R/sfTP+fC3/wC+ai+yW9nqtkbWJYRKJVkVMgMAoIyPY0AO1v8A5BUn/XSL/wBGrVux/wBQ3+8aqa3/AMgmT/rpF/6MWrNgf3Df7xrWPwsynuUrL/kMT/8AXrH/AOhvWpWVY/8AIXn/AOvWP/0N61amp8TKp/CFFFFQWFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVnJKItS1DIJy0X/oFaNY0zEalfYH8UX/AKBQBZur5orO4kiQtIkTMi+rAEgfnXn+keGPDmseCY9b1GMz6nc25up9WMrCaKXGSVbPyBSMbR0xiu13n0Nc1ceBPD1zeSTyWk4SWTzZbVLh1t5H6ktGDtOTyaVhnOvrviW4/s6/0y38/VJ/Doaec4DIokyXVT95yOg6ZNd74UbRofD1tLooZ7a4HmtM5zLM5+80h6l85znoeKFsrdNTGoqjLciD7OCDhRHndjH1qPT9MtNLku3s43jF3KZpI9xKBz1Kr0XPfHU1RNjfF0pIGDzVBv8AkUIf+uEP81oRiZF4PWkf/kUIT/0wh/mtIZovdL5jcHqa43xJHba54y0bRdTVn0traa5NsWIW5mUqFVsfeABJ210UjsJH4P3jWXrOi2Gv2scGoQuwicSRSRuY5Im/vKw5Bo6gZV02i+CYtaXQ7kWN09tHMNPKNLDES2xZFjHO5icYB5OPrWFF4y8VWVh4igu553ubaziurKe9so7d/mk28xqSAp/2ua6WDwfokGmXlgLWWSO9x9olmmZ5nI+6TITn5cDHpiobfwLoVul2Fiu3a8iEVxJLdO7yKGDDLE5yCB+HFAFS48ReJfDp1aDUNRttTlWxjurWU2whWKR5BGVIU/MoJByeeKs6vrXiTwn4WupL3UIdUvZJ4oraeOz2um/glolOGxztA69617vR7C+nnlurfzjPbfZJFYna0Wc4x6571QtvB+iW2mXeni2mmiu9vnPPO8kh2/dw5ORt7Y6UAjlrjxFqupeH9QsNT+3XKQ3VnLDd3mmmydszDKFOhxgEEetW9a8aeIrfxBNd2N1LPpUGopaSRLp6rbhS4TBmY7mfJP3BgEelb1v4P0e3tJrcR3UonkjkklnuXklYodyDeTnAPb3NQXfgTQL6+lu54LotJN9oMS3LiJZcg71TOA2R19z60+oHbtdKGIweDUDSiXU7DAIwZv8A0AVVMjE5I5p0BJ1Oyz6y/wDoApAixrnGkSf9dIv/AEYtSadOrQPjs5H6Cote/wCQNL/10i/9GLVbRifssuf+ep/kK2h8LMam6JrD/kLz/wDXrH/6G9atYWJkuDPBceU5jEbZiDggEkdSMdTT/P1D/n/T/wABV/8Aiqc6cnJsUKkVFI2qKxfP1D/n/T/wFX/4ql8/UP8An/T/AMBV/wDiqj2Ui/aRNmisXz9Q/wCggn/gKv8A8VSG41AD/j/X/wABV/8AiqPZSD2sTbormjqeoCTb9uXr/wA+q/8AxVWRdagRn7en/gKv/wAVT9jIPaxNyisP7RqH/P8Ap/4Cr/jS/aNQ/wCf9f8AwFX/AOKo9jMPaxNuisT7RqH/AD/r/wCAq/40hutQH/L+v/gKv+NHsZh7WJuUVgm81Af8v6/+Aq/40n23UP8An+X/AMBV/wAaPYzD2sTforn/ALdqH/P8v/gKv+NJ9v1D/n9X/wABl/xo9jIPaxOhornv7Q1D/n9X/wABl/xpP7R1D/n9X/wGX/Gj2Ug9rE6KiufW+v2P/H8v/gKv+NSi41Aj/j/T/wABV/8AiqXspB7WJt0Vi+fqH/QQT/wFX/4ql8/UP+f9P/AVf/iqPZSD2kTZorF8/UP+f9P/AAFX/wCKo8/UP+f9P/AVf/iqPZSD2kTaorF8/UP+f9P/AAFX/wCKo8/UP+ggn/gKv/xVHspB7SJtVVn061uZvOkjbzNoUskjISB67SM1mtc6gP8Al/T/AMBV/wAajN9fj/l9X/wFX/Gn7KQe1iaX9kWf92b/AMCZP/iqP7Is/wC7N/4Eyf8AxVZn2+//AOf1f/AZf8aX7fqH/P8AL/4Cr/jR7GYe1iaX9kWf92b/AMCZP/iqP7Is/wC7N/4Eyf8AxVZv27UP+f5f/AVf8aik1HUl+7fJ/wCAq/8AxVHsZh7WJrHR7FlIZJipGCDcSEH/AMeq28EL25t2jUwldhjxxj0rn49Q1Jut8n/gKv8A8VUv23UP+f5P/AVf/iqPYyD2sTR/siyAwEnx/wBfMn/xVH9kWf8Adn/8CZP/AIqs/wC2ah/z/L/4Cr/jR9s1D/n+T/wFX/Gj2Mw9rE0P7Is/7s//AIEyf/FUf2RZ/wB2f/wJk/8Aiqz/ALZqH/P8v/gKv+NH2vUP+f8AT/wFX/Gj2Mw9rE0P7Is/7s//AIEyf/FUf2RZ/wB2f/wJk/8Aiqz/ALXqH/P8n/gKv+NH2vUP+f5P/AVf8aPYzD2sTQ/siz/uz/8AgTJ/8VR/ZFn/AHZ//AmT/wCKrP8Ateof8/yf+Aq/40fa9Q/5/k/8BV/xo9jMPaxND+yLP+7P/wCBMn/xVSQada203nRxt5m3aGeRnIB6gbicVl/a9Q/5/wBP/AVf8aDeah/z/J/4Cr/8VR7GYe1iWfEbFdBnYdQ8X/o1Kr+HpDLp7sy4JlP8hWfeXl1cp9muLsPCzKWVbdVJ2kMOc8cgVUvPGWn+Fnjsrm1uJXkTzgYtuACSuOT1+U1cYOK1IlJSeh//2Q==[/img][br][br]Seleccionamos la herramienta [b]Circunferencia (Centro-radio)[/b], haciendo clic sobre el punto G, marcando como radio la mitad del segmento f, por lo que escribiremos f/2 al preguntar el radio.[br][br]Obtendremos una nueva circunferencia cuyo diámetro corresponderá a la diagonal menor.[br][br]Basta con obtener lo puntos de intersección de esta circunferencia con la mediatriz para tener los dos[br]vértices que faltaban del rombo. Para obtenerlos utilizaremos  la herramienta  [b]Intersección  [/b][b][img width=24,height=21]data:image/png;base64,R0lGODlhGAAVAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAAAYABUAhAAAAAAAAAwAAAgAACIAADMAADQAADIAADgAACQAAE0AAEAAAEcAALkAAP8AAPIAAOUAAAECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwU8ICCOZGmSQXCurMq+KCzPpkuj9j3mOj8rCwHAJ2M4HgXdzgBpHJQpESLROxFr1+ErG7PSuDNwWEkuk30hADs=[/img] [/b]y para dibujar el rombo lo haremos con la herramienta [b]Polígono[/b].[br][br][br][img 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observar que al mover los puntos A, B, C o D, el rombo cambiará pero siempre seguirá  manteniendo sus características.