Al observar la foto que le saque a mi flor veo que los pétalos son blancos en su interior y rojas en su exterior. ¿Quiero saber si crece en forma proporcional la parte interior blanca de la flor con la parte exterior roja?[br][br][br][u]Solución[/u][br][br]Marco los puntos E, F, G  formando el triángulo EFG. [br]Necesito encontrar el centro de la circunferencia inscripta en el triángulo; para ello trazo las bisectrices de los tres ángulos; dado que el punto de intersección de estas es el centro de la circunferencia que se denomina incentro (H )[br]Realizo una simetría central del punto E con centro en H determinando E`  [br]Por propiedad de la simetría que el segmento  n [img]data:image/png;base64,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[/img] es igual a p [img]data:image/png;base64,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[/img].[br]Coordenadas de los puntos E = (0,06;5,26) y H=(3,05; 3,95)[br][img]data:image/png;base64,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[/img][br]Coordenadas de los puntos H=(3,05; 3,95) y E = (6,05;2,63) [br][img]data:image/png;base64,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[/img][br][br]p = 3,277 aproximo por redondeo a los centésimos [math]\longrightarrow[/math] p = 3,27[br][br]Debido a las aproximaciones las longitudes de n y p no son iguales pero si aproximo a los décimos n [math]\cong[/math][img width=11,height=20]file:///C:/Users/naty0/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png[/img] p[br][br][br]Posteriormente realizo la transformación del triángulo EFG en sí mismo, manteniendo su forma pero cambiando su tamaño. [br]Aplico una homotecia de centro H y razón 2.[br]Por propiedad de la homotecia el segmento q [img]data:image/png;base64,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[/img] es igual a 2n. [br][br]q = 2n     [math]\longrightarrow[/math][img width=12,height=20]file:///C:/Users/naty0/AppData/Local/Temp/msohtmlclip1/01/clip_image006.png[/img] q = 2 x 3, 26 [math]\longrightarrow[/math][img width=12,height=20]file:///C:/Users/naty0/AppData/Local/Temp/msohtmlclip1/01/clip_image006.png[/img] q = 6,52     [br][br]Compruebo esto encontrando la longitud q a través de la fórmula de distancia.[br]Coordenadas de H=(3,05;3,95) y E[sub]1[/sub]´=(-2,93;6,57)[br][img]data:image/png;base64,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[/img][br][br][br][u]Conclusión[/u][br][br]Luego de realizar trabajar con geogebra aplicando simetría y homotecia puedo concluir que existe una proporcionalidad entre la parte blanca y la parte roja de mi flor de azucena. Una vez más puedo ver lo que siempre nos dice la profe “la matemática esta en todos lados”.[br][br][br][br][br][br][br][br][br][br][br][br]