Cuando fotografié mi cactus observe que algo de matemática tenía, vi que las espinas forman circunferencias. Me interesó  ver si esto es cierto y encontrar una relación entre las circunferencias aplicando GEOGEBRA. [br][u]Procedimiento[/u][br]Marco los puntos C, D, E  formando el triángulo CDE ¿Queremos saber si las espinas del cactus tienen una relación determinada?[br]Necesito encontrar  la circunferencia circunscripta en el triángulo; para ello trazo las mediatrices de los tres lados; dado que el punto de intersección de estas es el centro de la circunferencia que se denomina[br]circuncentro (F )[br]Realizo la transformación del triángulo EFG en sí mismo,  donde se mantiene la forma pero cambiando su tamaño, es decir una homotecia. [br]Aplicó la homotecia de centro F y razón 2 a cada uno de los lados del triángulo obteniendo [br]C [math]\longrightarrow[/math][img width=12,height=20]file:///C:/Users/naty0/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png[/img] C´ E [math]\longrightarrow[/math][img width=12,height=20]file:///C:/Users/naty0/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png[/img] E´ D[img width=12,height=20]file:///C:/Users/naty0/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png[/img][math]\longrightarrow[/math] D´[br]Geogebra me da los valores de los lados de cada uno de los triángulos.[br]Lado CD= 2,87      lado homotético  C´D´= 5,73[br]Lado DE = 2,42   lado homotético D´E´=4,84[br]Lado EC =2,35    lado homotético E´C´= 4,71[br]¿Los lados son proporcionales? [br]Si ocurre que lado C´D´= 2 x CD (1) entonces son proporcionales. [br]Calculo algebraicamente la longitud de cada uno de los segmentos aplicando la fórmula de distancia. [br]Lado CD= 2,87      lado homotético  C´D´= 5,73. Coordenadas de los puntos C = (2,86;1) y D=(5,56; 0,04)[br][img]data:image/png;base64,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[/img][br][br]Hago en (1) C´D´= 2 x CD    ……. C´D´= 2 x2.865  …….. [b]C´D´= 5,73 [/b] [br][br]Lado DE = 2,42   lado homotético D´E´=4,84. Coordenadas de los puntos D = (5,56; 0,04) y E = (3,52;-1,26)[br][br][img]data:image/png;base64,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[/img][br] d= 2,412 es un valor muy cercano a d= 2,42[br]Hago en (1)  D´E´= 2 x DE    ……. D´E´= 2 x 2.42  …….. [b]D´E´=4,84[/b]  [br][br]Lado EC =2,35    lado homotético E´C´= 4,71 Coordenadas de los puntos E = (3,52;-1,26) y C = (2,86;1)[br][br][img]data:image/png;base64,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[/img][br][br]d= 2,35 [br]Hago en (1) E´C´= = 2 x EC    ……. E´C´= = 2 x 2,35  …….. [b]E´C´=4,7[/b]  [br][br][b]Los lados son proporcionales. [/b][br][br]Con ayuda de geogebra trazo una circunferencia que pase por los puntos homotéticos E´, C´ y D´. Como los[br]triángulos son homotéticos las circunferencias también lo son. [br]Calculamos el área de las circunferencias[br]Circunferencia k   área = π x r[sup]2[/sup]      (r =radioCircunferenciak)[br]área =π x (1,49)[sup]2 [/sup]área =6,9 por aproximación por redondeo área = 7[br]Circunferencia p   área = π x r[sup]2[/sup]      (r =radioCircunferenciap)[br]área =π x (2,98)[sup]2 [/sup]área = 27,89 por aproximación por redondeo área = 27,9[br]Si tomamos las áreas de las circunferencias y hacemos el cociente entre ellas 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f7kyZM9Kmk7v8Fq4jtUFKUllempU6ecv+Vr8DLLsnD16lUAz76PqE9liZ6S32m1sBV+t9veDZENa2FhITD7mWjAnTt3ruU1uXc6OzuLwcFBTE9PQ1EUrK2tRToocrM2uj8OHTrkNEyvXr3qm11teHg4VDnicGxSeE+ePAkM9vKdw8RzYe8f3lM2BarVaraqqnYmk7ErlUrLNJhardYyx9VvqoiY9tLNNC2RoUqeP2qaZkuCA797eIt7wooyydND3HfRUhSl5/Mv3RmZ5Lt6uRNXeH1H8vakUqnAhBFemZmClh2GPDVJTjbh3v/oMK1jI9sedhqSPKdZJAbxS2biNRXNb2qW/Dn39LAwU7D8yh1mapHfMjazP+TPyslHRDIT8R2G3ZatODY7fU8UjbhOwYpXaWIozA3UxQ/YK2DK86u7me/pztjkfsjZktyazWbHz4vKfCtuyO6+NWbQd+i3Pe7K12tb/OZ+bzZIy9m8/PZFmCC9kW3vZq5wUHrNoONULqPXMSVnMpM/268gvZn9Ydt24H7waowEbctWHJsM0luDQXobM03Tzufztq7rLZWgqqp2KpUKDHRyZeSXsMCLSDsqZwxTFMVOpVKhE5GIhBTurGPitmxbdb9b98Hv7mFomhZqm8T2yPtA0zQ7k8kEng0Q799MljXR05K/S7ncYh2dUmd2u+0iAIRNxGKaZlu+7KDjRs5uFyahhhxMRK/UKy1jp3LLjVe/xmbQMja6P4RCodDSkBVpRr0CYZh90Mtjs9O2UDSCjud+Sth2zCYg7zCLi4s4ffo0AKBSqcR2zmkv5XI5Z+TkbjvcdvO2E9HmRTJwLJfLdZzLFvekGb3y/fffA3g2aGQ3Bmgi2j6q1Wqoucm0dbZsdPf58+e3alWx0Wg0sLCwAEVRYn1TcSKisAzD6HcRdpVIgvTy8jJ0XUez2fQc1q6qauAN03eqr776CgAwOTnJqRdEFHu3b9+GoigwTbOtLhdJYi5evNjnUu4u/41iIefPn8fevXvbsltZloWZmRlMTk5GsZptZ25uDpqmYXx8vN9F6SuRVGW7JhPYjN287bT9HD9+HLOzs56diqmpKc717oOeDhzL5XKYmZnBo0ePmCuXiGibqlarGBkZ2bWDX/upZ0Hasizs378fk5OTu74nSUS0nYmBv0tLS30uye4TyeluL9evX8fa2houXLjQq1UQEVGPVatVlMtllEqlfhdlV+pJT1r0otPpNEc1ExFtY8lkEo8fP8bjx4/7XZRdqSc9adGL5ihAIqLtS/SiC4VCv4uya0Xek2YvmohoZ2Avuv8i70mLXnQsbvFFREQbInrR+Xy+30XZ1SLtSYte9NGjRzkKkIhoG0smk7h79y6n0PZZpD1p0Yv+7LPPolwsERFtIdGLzmazDNB9FmlPOpFIQNd19qKJiLYx9qLjg7eqJCIiiqktuwsWERERdYdBmoiIKKYYpImIiGKKQZqIiCimGKSJiIhiikGaiIgophikiYiIYopBmoiIKKYYpImIiGKKQZqIiCimGKSJiIhiikGaiIgophikiYiIYopBmoiIKKYYpImIiGKKQZqIiCimGKSJiIhiikGaiIgophikiYiIYopBmoiIKKb+B/GXBxza94A0AAAAAElFTkSuQmCC[/img][br][br]El valor 4 es el cuadrado de la razón k = 2, razón utilizada para efectuar la homotecia. [br][br][u]Conclusión[/u][br]Luego de aplicarle algunos conceptos (mediatriz, homotecia, area) matemáticos puedo decir que las espinas de mi cactus guardan una relación, crecen siguiendo un patrón circular. [br][br][br] [br][br][br] [br][br][br]